__constr_Coq_Numbers_BinNums_positive_0_3 || nat || 0.744571789985
$equals3 || gcd_lcm || 0.695787155603
__constr_Coq_Numbers_BinNums_Z_0_2 || zero_zero || 0.69543630349
$equals3 || gcd_gcd || 0.689001287692
Coq_Numbers_BinNums_positive_0 || nat || 0.673013827035
Coq_Numbers_BinNums_N_0 || nat || 0.645203709764
Coq_Numbers_BinNums_Z_0 || nat || 0.622554774601
Coq_Init_Datatypes_nat_0 || nat || 0.614998985917
Coq_Classes_RelationClasses_Equivalence_0 || semilattice || 0.573117307862
Coq_Classes_RelationClasses_Equivalence_0 || lattic35693393ce_set || 0.527398001563
__constr_Coq_Numbers_BinNums_positive_0_3 || real || 0.52581942345
Coq_Classes_RelationClasses_Symmetric || semilattice || 0.500558910668
Coq_Classes_RelationClasses_Symmetric || lattic35693393ce_set || 0.497605095401
Coq_Classes_RelationClasses_Reflexive || semilattice || 0.495016444553
Coq_Classes_RelationClasses_Transitive || semilattice || 0.494195367882
Coq_Classes_RelationClasses_Reflexive || lattic35693393ce_set || 0.492190513736
Coq_Classes_RelationClasses_Transitive || lattic35693393ce_set || 0.491510546167
__constr_Coq_Numbers_BinNums_Z_0_2 || one_one || 0.486839549614
__constr_Coq_Numbers_BinNums_N_0_1 || one2 || 0.466836851733
__constr_Coq_Numbers_BinNums_N_0_2 || zero_zero || 0.453363469407
Coq_Init_Datatypes_bool_0 || rat || 0.436772241041
__constr_Coq_Numbers_BinNums_N_0_2 || one_one || 0.433863463084
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || size_nibble || 0.421110123294
__constr_Coq_Init_Datatypes_list_0_1 || nil || 0.413505124495
Coq_Classes_RelationClasses_StrictOrder_0 || trans || 0.409181854497
Coq_Classes_RelationClasses_StrictOrder_0 || wf || 0.382620504884
Coq_Setoids_Setoid_Setoid_Theory || semilattice || 0.379054574088
__constr_Coq_Numbers_BinNums_positive_0_3 || complex || 0.361836516199
__constr_Coq_Numbers_BinNums_N_0_2 || size_nibble || 0.337835688006
Coq_ZArith_Int_Z_as_Int_i2z || size_nibble || 0.33668838848
__constr_Coq_Numbers_BinNums_Z_0_1 || nat || 0.330026520857
__constr_Coq_Numbers_BinNums_Z_0_2 || size_nibble || 0.329628551155
__constr_Coq_Numbers_BinNums_Z_0_1 || one2 || 0.326559298544
Coq_Classes_RelationClasses_PreOrder_0 || trans || 0.30600324649
__constr_Coq_Numbers_BinNums_N_0_1 || nat || 0.302907089722
Coq_Lists_List_concat || concat || 0.297346523005
Coq_Classes_RelationClasses_PreOrder_0 || wf || 0.280855412372
Coq_Classes_RelationClasses_Transitive || trans || 0.277875914097
Coq_Classes_RelationClasses_Reflexive || trans || 0.27692219537
Coq_Init_Datatypes_app || append || 0.271364199148
Coq_QArith_QArith_base_Q_0 || nat || 0.264025936458
__constr_Coq_Init_Datatypes_nat_0_1 || nat || 0.258984879932
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || size_nibble || 0.256787778812
Coq_Classes_RelationClasses_Equivalence_0 || equiv_part_equivp || 0.25350487862
Coq_Classes_RelationClasses_StrictOrder_0 || antisym || 0.237471571063
Coq_Setoids_Setoid_Setoid_Theory || lattic35693393ce_set || 0.231489000826
Coq_Classes_RelationClasses_Equivalence_0 || transp || 0.230835751261
Coq_Classes_RelationClasses_Equivalence_0 || symp || 0.229992228383
Coq_Init_Datatypes_list_0 || list || 0.228276391831
__constr_Coq_Init_Datatypes_nat_0_2 || zero_zero || 0.227083112643
Coq_Classes_RelationClasses_StrictOrder_0 || bNF_Ca829732799finite || 0.218884414795
Coq_romega_ReflOmegaCore_ZOmega_term_stable || nat3 || 0.214695041777
Coq_Classes_RelationClasses_Reflexive || wf || 0.212639263724
Coq_Classes_RelationClasses_Transitive || wf || 0.209296990227
Coq_Classes_RelationClasses_Equivalence_0 || wf || 0.200043220333
__constr_Coq_Init_Datatypes_list_0_2 || cons || 0.193216211673
__constr_Coq_Init_Datatypes_nat_0_1 || one2 || 0.192694869714
__constr_Coq_Numbers_BinNums_positive_0_3 || one2 || 0.178111407032
Coq_Classes_RelationClasses_PreOrder_0 || antisym || 0.170535841343
__constr_Coq_Numbers_BinNums_Z_0_3 || zero_zero || 0.168585860485
__constr_Coq_Numbers_BinNums_Z_0_1 || int || 0.168143808168
Coq_Classes_RelationClasses_Equivalence_0 || trans || 0.16785220647
Coq_Init_Wf_well_founded || trans || 0.167790437119
Coq_Reals_Rdefinitions_R || nat || 0.167472376188
__constr_Coq_Numbers_BinNums_positive_0_3 || int || 0.167186559612
Coq_Classes_RelationClasses_Reflexive || antisym || 0.166951913818
Coq_QArith_QArith_base_Qeq || bNF_Ca1495478003natLeq || 0.158029778658
__constr_Coq_Numbers_BinNums_positive_0_3 || code_integer || 0.156191432158
Coq_Classes_RelationClasses_Transitive || antisym || 0.155905235523
Coq_Lists_List_flat_map || maps || 0.155742391739
Coq_Classes_RelationClasses_PreOrder_0 || bNF_Ca829732799finite || 0.155668099205
Coq_Init_Wf_well_founded || wf || 0.154823361736
Coq_Lists_List_map || map || 0.154476946808
__constr_Coq_Init_Datatypes_nat_0_2 || one_one || 0.154250825671
__constr_Coq_Init_Datatypes_bool_0_2 || nibble0 || 0.153200008265
Coq_Init_Peano_lt || bNF_Ca1495478003natLeq || 0.153164831937
__constr_Coq_Init_Datatypes_bool_0_1 || nibble0 || 0.148913589957
Coq_Numbers_Natural_BigN_BigN_BigN_t || nat || 0.140002302812
__constr_Coq_Init_Datatypes_bool_0_2 || nibble1 || 0.138093510212
Coq_Init_Peano_le_0 || bNF_Ca1495478003natLeq || 0.136778251001
__constr_Coq_Init_Datatypes_bool_0_1 || nibble1 || 0.134235925402
Coq_PArith_BinPos_Pos_to_nat || size_nibble || 0.131655545518
Coq_QArith_QArith_base_Qeq || less_than || 0.130026140357
Coq_Numbers_Integer_BigZ_BigZ_BigZ_t || nat || 0.128730083588
Coq_Lists_SetoidList_inclA || lexordp_eq || 0.125400704
Coq_Setoids_Setoid_Setoid_Theory || bNF_Wellorder_wo_rel || 0.124731633532
Coq_Init_Peano_lt || less_than || 0.122380476777
Coq_Sets_Integers_Integers_0 || code_pcr_natural code_cr_natural || 0.122280287546
Coq_ZArith_BinInt_Z_le || wf || 0.119575322886
__constr_Coq_Numbers_BinNums_Z_0_1 || nibble0 || 0.118602852862
Coq_Classes_RelationClasses_Reflexive || bNF_Ca829732799finite || 0.116404691917
Coq_Classes_RelationClasses_Transitive || bNF_Ca829732799finite || 0.114363703245
Coq_Lists_List_removelast || butlast || 0.111436141383
Coq_Numbers_Integer_Binary_ZBinary_Z_eqf || realrel || 0.111157440816
Coq_Structures_OrdersEx_Z_as_OT_eqf || realrel || 0.111157440816
Coq_Structures_OrdersEx_Z_as_DT_eqf || realrel || 0.111157440816
Coq_ZArith_BinInt_Z_eqf || realrel || 0.111157440816
Coq_ZArith_Int_Z_as_Int__1 || nibble0 || 0.109702347917
__constr_Coq_Numbers_BinNums_N_0_1 || nibble0 || 0.108754777713
Coq_Numbers_Natural_Binary_NBinary_N_eqf || realrel || 0.108292712379
Coq_NArith_BinNat_N_eqf || realrel || 0.108292712379
Coq_Structures_OrdersEx_N_as_OT_eqf || realrel || 0.108292712379
Coq_Structures_OrdersEx_N_as_DT_eqf || realrel || 0.108292712379
Coq_Lists_List_Forall2_0 || listrelp || 0.108205173178
__constr_Coq_Init_Datatypes_bool_0_2 || one2 || 0.10703839769
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || suc || 0.106739737403
Coq_Structures_OrdersEx_Z_as_OT_opp || suc || 0.106739737403
Coq_Structures_OrdersEx_Z_as_DT_opp || suc || 0.106739737403
__constr_Coq_Init_Datatypes_bool_0_2 || cis || 0.106582011544
Coq_Sets_Integers_nat_po || code_natural || 0.10652188403
Coq_Arith_PeanoNat_Nat_eqf || realrel || 0.10609690517
Coq_NArith_Ndigits_eqf || realrel || 0.10609690517
Coq_Structures_OrdersEx_Nat_as_DT_eqf || realrel || 0.10609690517
Coq_Structures_OrdersEx_Nat_as_OT_eqf || realrel || 0.10609690517
Coq_ZArith_BinInt_Z_opp || suc || 0.105180986125
Coq_Init_Peano_le_0 || less_than || 0.105010308389
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || zero_zero || 0.105001765449
Coq_Structures_OrdersEx_Z_as_OT_succ || zero_zero || 0.105001765449
Coq_Structures_OrdersEx_Z_as_DT_succ || zero_zero || 0.105001765449
__constr_Coq_Numbers_BinNums_N_0_1 || nibble1 || 0.104938697889
__constr_Coq_Numbers_BinNums_Z_0_1 || real || 0.104575837007
__constr_Coq_Numbers_BinNums_positive_0_3 || nibble0 || 0.103883196713
__constr_Coq_Init_Datatypes_bool_0_1 || one2 || 0.103817486756
__constr_Coq_Init_Datatypes_bool_0_1 || cis || 0.103662664853
__constr_Coq_Init_Datatypes_nat_0_2 || bit0 || 0.102884033102
Coq_ZArith_BinInt_Z_succ || zero_zero || 0.101846733673
__constr_Coq_Numbers_BinNums_Z_0_1 || nibble1 || 0.101734272463
Coq_ZArith_Znumtheory_prime_0 || positive2 || 0.101618875961
Coq_Numbers_Natural_Binary_NBinary_N_succ || zero_zero || 0.100336344401
Coq_Structures_OrdersEx_N_as_OT_succ || zero_zero || 0.100336344401
Coq_Structures_OrdersEx_N_as_DT_succ || zero_zero || 0.100336344401
Coq_NArith_BinNat_N_succ || zero_zero || 0.099926705014
Coq_Classes_RelationPairs_RelProd || lex_prod || 0.0982344459041
Coq_ZArith_Int_Z_as_Int__1 || nibble1 || 0.0966923377493
Coq_Lists_List_Forall2_0 || list_all2 || 0.0955216189527
Coq_ZArith_BinInt_Z_opp || list || 0.0955011285424
__constr_Coq_Numbers_BinNums_positive_0_3 || nibble1 || 0.0948152531455
Coq_Relations_Relation_Operators_Ltl_0 || lexordp2 || 0.0940062543149
Coq_Classes_RelationClasses_Transitive || semilattice_axioms || 0.093010641177
__constr_Coq_Init_Datatypes_nat_0_1 || real || 0.0908261172901
__constr_Coq_Numbers_BinNums_N_0_1 || cis || 0.0829335229799
Coq_ZArith_BinInt_Z_sub || gen_length || 0.0825504790049
__constr_Coq_Numbers_BinNums_Z_0_1 || cis || 0.0811077168944
Coq_Init_Wf_well_founded || antisym || 0.0809143503302
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibble0 || 0.0803215254995
Coq_FSets_FMapPositive_PositiveMap_E_bits_lt || bNF_Ca1495478003natLeq || 0.0770887558628
Coq_Init_Wf_well_founded || bNF_Ca829732799finite || 0.0762633493659
Coq_Classes_RelationClasses_Symmetric || semilattice_axioms || 0.0754454246811
Coq_Classes_RelationClasses_Reflexive || semilattice_axioms || 0.0733301672118
__constr_Coq_Numbers_BinNums_Z_0_1 || complex || 0.0722149879742
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eqf || realrel || 0.0721433232953
Coq_ZArith_BinInt_Z_lnot || id || 0.0716040776316
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibble1 || 0.0704701014443
Coq_Classes_RelationClasses_Equivalence_0 || antisym || 0.0703837377778
Coq_NArith_BinNat_N_succ || bit0 || 0.0703436658098
Coq_Init_Datatypes_app || splice || 0.0703012326082
Coq_Numbers_Natural_BigN_BigN_BigN_eqf || realrel || 0.0699692326619
Coq_ZArith_Int_Z_as_Int__1 || nibbleA || 0.0696666234985
Coq_ZArith_Int_Z_as_Int__1 || one2 || 0.0690642262138
Coq_NArith_BinNat_N_succ || bit1 || 0.0685862484654
Coq_ZArith_BinInt_Z_sub || rotate || 0.0685538048072
__constr_Coq_Numbers_BinNums_positive_0_2 || zero_zero || 0.0682430745992
__constr_Coq_Init_Datatypes_nat_0_2 || bit1 || 0.0676692028807
Coq_Lists_List_In || list_ex || 0.0675250352722
Coq_ZArith_Int_Z_as_Int__1 || nibbleB || 0.0669926689772
Coq_Lists_List_rev || rev || 0.066490211728
Coq_QArith_QArith_base_Qeq || pred_nat || 0.0662835969362
Coq_FSets_FMapPositive_PositiveMap_E_bits_lt || less_than || 0.0660100576382
Coq_Setoids_Setoid_Setoid_Theory || equiv_equivp || 0.0659211083603
Coq_ZArith_BinInt_Z_lnot || size_size || 0.0658021327152
Coq_ZArith_Int_Z_as_Int_i2z || nat_of_num || 0.0657399660908
Coq_Classes_RelationClasses_Symmetric || abel_semigroup || 0.065561757739
Coq_Init_Peano_lt || pred_nat || 0.0650644525876
Coq_Init_Datatypes_prod_0 || product_prod || 0.0648946240464
Coq_ZArith_Int_Z_as_Int__1 || nibble8 || 0.0647242979847
Coq_Numbers_Natural_Binary_NBinary_N_succ || bit1 || 0.0646887649941
Coq_Structures_OrdersEx_N_as_OT_succ || bit1 || 0.0646887649941
Coq_Structures_OrdersEx_N_as_DT_succ || bit1 || 0.0646887649941
Coq_Numbers_Natural_Binary_NBinary_N_divide || bNF_Ca1495478003natLeq || 0.064537273672
Coq_NArith_BinNat_N_divide || bNF_Ca1495478003natLeq || 0.064537273672
Coq_Structures_OrdersEx_N_as_OT_divide || bNF_Ca1495478003natLeq || 0.064537273672
Coq_Structures_OrdersEx_N_as_DT_divide || bNF_Ca1495478003natLeq || 0.064537273672
__constr_Coq_Numbers_BinNums_positive_0_3 || nibbleA || 0.0644274803524
Coq_ZArith_Znumtheory_prime_0 || positive || 0.0640100641159
__constr_Coq_Init_Datatypes_nat_0_1 || int || 0.0639623875368
Coq_Lists_SetoidPermutation_PermutationA_0 || semila1450535954axioms || 0.063848030933
__constr_Coq_Numbers_BinNums_positive_0_3 || nibbleB || 0.0636529274421
Coq_Classes_RelationClasses_Reflexive || abel_semigroup || 0.0636342801556
__constr_Coq_Numbers_BinNums_positive_0_3 || nibble8 || 0.0629755880665
Coq_QArith_QArith_base_Qlt || bNF_Ca1495478003natLeq || 0.0623915375477
Coq_Numbers_Integer_Binary_ZBinary_Z_land || binomial || 0.0621855564234
Coq_Structures_OrdersEx_Z_as_OT_land || binomial || 0.0621855564234
Coq_Structures_OrdersEx_Z_as_DT_land || binomial || 0.0621855564234
Coq_Arith_PeanoNat_Nat_divide || bNF_Ca1495478003natLeq || 0.0619830914641
Coq_Structures_OrdersEx_Nat_as_OT_divide || bNF_Ca1495478003natLeq || 0.0619830914641
Coq_Structures_OrdersEx_Nat_as_DT_divide || bNF_Ca1495478003natLeq || 0.0619830914641
Coq_Numbers_Integer_Binary_ZBinary_Z_land || root || 0.0616566673641
Coq_Structures_OrdersEx_Z_as_OT_land || root || 0.0616566673641
Coq_Structures_OrdersEx_Z_as_DT_land || root || 0.0616566673641
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || bNF_Ca1495478003natLeq || 0.0612353709264
Coq_Structures_OrdersEx_Z_as_OT_divide || bNF_Ca1495478003natLeq || 0.0612353709264
Coq_Structures_OrdersEx_Z_as_DT_divide || bNF_Ca1495478003natLeq || 0.0612353709264
__constr_Coq_Numbers_BinNums_positive_0_3 || nibbleC || 0.0609053322507
Coq_Structures_OrdersEx_PositiveOrderedTypeBits_lt || bNF_Ca1495478003natLeq || 0.0608793206098
Coq_ZArith_BinInt_Z_land || binomial || 0.0606265810617
__constr_Coq_Numbers_BinNums_positive_0_3 || nibbleD || 0.0604974465518
Coq_Numbers_Natural_Binary_NBinary_N_succ || bit0 || 0.0604197199651
Coq_Structures_OrdersEx_N_as_OT_succ || bit0 || 0.0604197199651
Coq_Structures_OrdersEx_N_as_DT_succ || bit0 || 0.0604197199651
Coq_ZArith_BinInt_Z_land || root || 0.0601231196715
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || nat_of_nibble || 0.0600156748993
__constr_Coq_Numbers_BinNums_N_0_1 || zero_Rep || 0.0599057144458
Coq_Classes_RelationClasses_Transitive || abel_semigroup || 0.0597098288872
__constr_Coq_Numbers_BinNums_positive_0_3 || nibbleF || 0.0594452686165
Coq_Lists_List_Forall_0 || listsp || 0.0591697521892
__constr_Coq_Numbers_BinNums_positive_0_3 || nibble3 || 0.058583666978
Coq_ZArith_Int_Z_as_Int__1 || nibbleC || 0.058206056626
__constr_Coq_Numbers_BinNums_positive_0_3 || nibble9 || 0.0578571571358
__constr_Coq_Numbers_BinNums_positive_0_3 || nibble5 || 0.0576386211781
Coq_ZArith_BinInt_Z_divide || bNF_Ca1495478003natLeq || 0.0573696873689
Coq_ZArith_Int_Z_as_Int__1 || ii || 0.0571607595664
__constr_Coq_Numbers_BinNums_positive_0_3 || nibble2 || 0.0570404531472
Coq_ZArith_Int_Z_as_Int__1 || nibbleD || 0.0569961425397
__constr_Coq_Numbers_BinNums_positive_0_3 || nibble4 || 0.0568577331005
Coq_Structures_OrdersEx_PositiveOrderedTypeBits_lt || less_than || 0.0568154340067
__constr_Coq_Numbers_BinNums_positive_0_3 || nibble7 || 0.0566823115011
__constr_Coq_Numbers_BinNums_positive_0_3 || nibbleE || 0.0566823115011
__constr_Coq_Numbers_BinNums_positive_0_3 || nibble6 || 0.0565136646006
Coq_QArith_QArith_base_Qlt || less_than || 0.0557141493071
Coq_Init_Peano_le_0 || pred_nat || 0.0553011799764
Coq_Classes_RelationClasses_Symmetric || trans || 0.0546549311588
Coq_MMaps_MMapPositive_PositiveMap_E_lt || bNF_Ca1495478003natLeq || 0.0545215785641
__constr_Coq_Numbers_BinNums_Z_0_1 || zero_Rep || 0.0541621798906
Coq_Classes_RelationClasses_Equivalence_0 || bNF_Ca829732799finite || 0.0541081720555
__constr_Coq_Init_Datatypes_nat_0_1 || complex || 0.0540292181661
Coq_ZArith_Int_Z_as_Int__1 || nibbleF || 0.0539873519504
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibbleA || 0.0532769077059
Coq_Numbers_Natural_Binary_NBinary_N_divide || less_than || 0.0529567575162
Coq_NArith_BinNat_N_divide || less_than || 0.0529567575162
Coq_Structures_OrdersEx_N_as_OT_divide || less_than || 0.0529567575162
Coq_Structures_OrdersEx_N_as_DT_divide || less_than || 0.0529567575162
Coq_Numbers_Natural_Binary_NBinary_N_lt || bNF_Ca1495478003natLeq || 0.0526159490663
Coq_Structures_OrdersEx_N_as_OT_lt || bNF_Ca1495478003natLeq || 0.0526159490663
Coq_Structures_OrdersEx_N_as_DT_lt || bNF_Ca1495478003natLeq || 0.0526159490663
Coq_NArith_BinNat_N_lt || bNF_Ca1495478003natLeq || 0.0523944652575
Coq_Numbers_Integer_Binary_ZBinary_Z_even || nibble_of_nat || 0.0520888597326
Coq_Structures_OrdersEx_Z_as_OT_even || nibble_of_nat || 0.0520888597326
Coq_Structures_OrdersEx_Z_as_DT_even || nibble_of_nat || 0.0520888597326
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || nat_of_num || 0.0520785163503
Coq_ZArith_Int_Z_as_Int__1 || nibble3 || 0.0516425318298
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibbleB || 0.0511948629386
__constr_Coq_Numbers_BinNums_Z_0_2 || cos_coeff || 0.0511017929239
Coq_MSets_MSetPositive_PositiveSet_E_lt || bNF_Ca1495478003natLeq || 0.0509850897425
Coq_Arith_PeanoNat_Nat_divide || less_than || 0.0509141996741
Coq_Structures_OrdersEx_Nat_as_DT_divide || less_than || 0.0509141996741
Coq_Structures_OrdersEx_Nat_as_OT_divide || less_than || 0.0509141996741
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || nibble_of_nat || 0.0508812247897
Coq_Structures_OrdersEx_Z_as_OT_odd || nibble_of_nat || 0.0508812247897
Coq_Structures_OrdersEx_Z_as_DT_odd || nibble_of_nat || 0.0508812247897
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || less_than || 0.0501235612435
Coq_Structures_OrdersEx_Z_as_OT_divide || less_than || 0.0501235612435
Coq_Structures_OrdersEx_Z_as_DT_divide || less_than || 0.0501235612435
Coq_ZArith_BinInt_Z_even || nibble_of_nat || 0.0498265607683
Coq_ZArith_Int_Z_as_Int_i2z || one_one || 0.0497550084041
Coq_MMaps_MMapPositive_PositiveMap_E_lt || less_than || 0.0497481779431
Coq_ZArith_Int_Z_as_Int__1 || nibble9 || 0.0497469304721
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibble8 || 0.0494310536165
Coq_Structures_OrdersEx_PositiveOrderedTypeBits_eq || bNF_Ca1495478003natLeq || 0.0494163298462
Coq_ZArith_Int_Z_as_Int__1 || nibble5 || 0.0491910741702
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || product_size_unit || 0.0482236037941
Coq_Init_Datatypes_app || gen_length || 0.0482156196253
Coq_ZArith_Int_Z_as_Int__1 || nibble2 || 0.0477029530798
Coq_ZArith_BinInt_Z_odd || nibble_of_nat || 0.0476876701176
Coq_Numbers_Natural_Binary_NBinary_N_even || nibble_of_nat || 0.0475220595334
Coq_NArith_BinNat_N_even || nibble_of_nat || 0.0475220595334
Coq_Structures_OrdersEx_N_as_OT_even || nibble_of_nat || 0.0475220595334
Coq_Structures_OrdersEx_N_as_DT_even || nibble_of_nat || 0.0475220595334
Coq_ZArith_Int_Z_as_Int__1 || nibble4 || 0.047258003268
Coq_Numbers_Integer_Binary_ZBinary_Z_log2_up || nibble_of_nat || 0.0471022678931
Coq_Structures_OrdersEx_Z_as_OT_log2_up || nibble_of_nat || 0.0471022678931
Coq_Structures_OrdersEx_Z_as_DT_log2_up || nibble_of_nat || 0.0471022678931
Coq_ZArith_BinInt_Z_log2_up || nibble_of_nat || 0.0469087791997
Coq_ZArith_Int_Z_as_Int__1 || nibble7 || 0.046835010201
Coq_ZArith_Int_Z_as_Int__1 || nibbleE || 0.046835010201
Coq_ZArith_BinInt_Z_divide || less_than || 0.046538116884
Coq_ZArith_Int_Z_as_Int__1 || nibble6 || 0.0464321897865
Coq_Numbers_Natural_Binary_NBinary_N_odd || nibble_of_nat || 0.0463484133461
Coq_Structures_OrdersEx_N_as_OT_odd || nibble_of_nat || 0.0463484133461
Coq_Structures_OrdersEx_N_as_DT_odd || nibble_of_nat || 0.0463484133461
Coq_Structures_OrdersEx_PositiveOrderedTypeBits_eq || less_than || 0.0460966650083
Coq_ZArith_Int_Z_as_Int_i2z || nat_of_nibble || 0.0460190360837
Coq_MSets_MSetPositive_PositiveSet_E_lt || less_than || 0.0459113138913
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || size_num || 0.0451914975731
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibbleC || 0.0443750184436
Coq_Lists_List_skipn || dropWhile || 0.0440997123149
Coq_Numbers_Integer_Binary_ZBinary_Z_log2 || nibble_of_nat || 0.0438568470869
Coq_Structures_OrdersEx_Z_as_OT_log2 || nibble_of_nat || 0.0438568470869
Coq_Structures_OrdersEx_Z_as_DT_log2 || nibble_of_nat || 0.0438568470869
Coq_Numbers_Integer_Binary_ZBinary_Z_lnot || nat_of_num || 0.0438394904429
Coq_Structures_OrdersEx_Z_as_OT_lnot || nat_of_num || 0.0438394904429
Coq_Structures_OrdersEx_Z_as_DT_lnot || nat_of_num || 0.0438394904429
Coq_Lists_SetoidList_equivlistA || lattic1693879045er_set || 0.0436731760741
Coq_ZArith_BinInt_Z_log2 || nibble_of_nat || 0.043461214157
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibbleD || 0.0434385182182
Coq_Reals_Rdefinitions_Rlt || bNF_Ca1495478003natLeq || 0.0431410378288
Coq_NArith_BinNat_N_odd || nibble_of_nat || 0.042970224322
Coq_Classes_RelationClasses_PER_0 || semilattice || 0.0429129290449
Coq_ZArith_BinInt_Z_lnot || nat_of_num || 0.0428897270445
Coq_Numbers_Natural_Binary_NBinary_N_lt || less_than || 0.0428275862603
Coq_Structures_OrdersEx_N_as_OT_lt || less_than || 0.0428275862603
Coq_Structures_OrdersEx_N_as_DT_lt || less_than || 0.0428275862603
Coq_NArith_BinNat_N_lt || less_than || 0.0426265180703
Coq_MMaps_MMapPositive_PositiveMap_E_eq || bNF_Ca1495478003natLeq || 0.0425752494715
Coq_Lists_SetoidList_equivlistA || semilattice_order || 0.0425486773419
Coq_Numbers_Natural_Binary_NBinary_N_log2_up || nibble_of_nat || 0.0424030658933
Coq_NArith_BinNat_N_log2_up || nibble_of_nat || 0.0424030658933
Coq_Structures_OrdersEx_N_as_OT_log2_up || nibble_of_nat || 0.0424030658933
Coq_Structures_OrdersEx_N_as_DT_log2_up || nibble_of_nat || 0.0424030658933
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || one2 || 0.0423101844636
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibble0 || 0.0420455676256
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibble0 || 0.0416675066141
Coq_Lists_SetoidPermutation_PermutationA_0 || semilattice_order || 0.041175527531
__constr_Coq_Init_Datatypes_bool_0_2 || nat_of_num || 0.04112222068
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibbleF || 0.0411123423906
Coq_ZArith_BinInt_Z_div || binomial || 0.0407725950729
Coq_ZArith_Int_Z_as_Int_i2z || product_size_unit || 0.0407209430298
Coq_Numbers_Natural_BigN_BigN_BigN_one || one2 || 0.0407094936491
Coq_Numbers_Integer_Binary_ZBinary_Z_lnot || one_one || 0.0406788182386
Coq_Structures_OrdersEx_Z_as_OT_lnot || one_one || 0.0406788182386
Coq_Structures_OrdersEx_Z_as_DT_lnot || one_one || 0.0406788182386
Coq_ZArith_BinInt_Z_lnot || one_one || 0.0401041845472
Coq_Classes_RelationClasses_Equivalence_0 || bNF_Wellorder_wo_rel || 0.0400560800387
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || one2 || 0.039943602099
__constr_Coq_Init_Datatypes_bool_0_1 || nat_of_num || 0.0398695915689
__constr_Coq_Numbers_BinNums_Z_0_2 || suc || 0.0396835787282
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibble3 || 0.0393021525242
Coq_Numbers_Natural_Binary_NBinary_N_log2 || nibble_of_nat || 0.0392845409205
Coq_NArith_BinNat_N_log2 || nibble_of_nat || 0.0392845409205
Coq_Structures_OrdersEx_N_as_OT_log2 || nibble_of_nat || 0.0392845409205
Coq_Structures_OrdersEx_N_as_DT_log2 || nibble_of_nat || 0.0392845409205
Coq_Reals_Rdefinitions_Rlt || less_than || 0.0389255999221
Coq_ZArith_BinInt_Z_le || distinct || 0.0387457111245
Coq_Lists_List_concat || listset || 0.0386107726381
Coq_MMaps_MMapPositive_PositiveMap_E_eq || less_than || 0.0385411248455
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibble1 || 0.0383936192934
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibble1 || 0.0378459248061
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibble9 || 0.0378404474766
Coq_ZArith_Int_Z_as_Int_i2z || size_num || 0.0374347578087
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibble5 || 0.0374121102273
__constr_Coq_Numbers_BinNums_Z_0_2 || nat_of_nibble || 0.0372147078688
Coq_ZArith_BinInt_Z_le || linorder_sorted || 0.0371945427961
Coq_MSets_MSetPositive_PositiveSet_E_eq || bNF_Ca1495478003natLeq || 0.0368239360241
Coq_NArith_BinNat_N_succ_double || bit1 || 0.0366846087018
__constr_Coq_Numbers_BinNums_Z_0_2 || cis || 0.03649867391
Coq_ZArith_BinInt_Z_mul || binomial || 0.0364726945395
Coq_FSets_FMapPositive_PositiveMap_E_bits_lt || pred_nat || 0.0364342584415
__constr_Coq_Numbers_BinNums_N_0_2 || nat_of_nibble || 0.0363241340867
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibble2 || 0.036266014788
Coq_Lists_List_skipn || drop || 0.036051425712
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibble4 || 0.035923510443
Coq_Numbers_Integer_Binary_ZBinary_Z_gcd || root || 0.0356760156289
Coq_Structures_OrdersEx_Z_as_OT_gcd || root || 0.0356760156289
Coq_Structures_OrdersEx_Z_as_DT_gcd || root || 0.0356760156289
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibble7 || 0.0355979839706
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibbleE || 0.0355979839706
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || csqrt || 0.0353432453801
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || csqrt || 0.0353432453801
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || csqrt || 0.0353432453801
Coq_ZArith_BinInt_Z_sqrt_up || csqrt || 0.0353432453801
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibble6 || 0.0352880511595
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || csqrt || 0.034969162115
Coq_Structures_OrdersEx_Z_as_OT_sqrt || csqrt || 0.034969162115
Coq_Structures_OrdersEx_Z_as_DT_sqrt || csqrt || 0.034969162115
Coq_Sorting_Sorted_StronglySorted_0 || pred_list || 0.034832046773
Coq_PArith_POrderedType_Positive_as_DT_lt || bNF_Ca1495478003natLeq || 0.0346860025803
Coq_PArith_POrderedType_Positive_as_OT_lt || bNF_Ca1495478003natLeq || 0.0346860025803
Coq_Structures_OrdersEx_Positive_as_DT_lt || bNF_Ca1495478003natLeq || 0.0346860025803
Coq_Structures_OrdersEx_Positive_as_OT_lt || bNF_Ca1495478003natLeq || 0.0346860025803
Coq_Sorting_Sorted_StronglySorted_0 || listsp || 0.0344109797382
Coq_ZArith_BinInt_Z_gcd || root || 0.0342605834109
Coq_ZArith_BinInt_Z_sqrt || csqrt || 0.0341581786557
Coq_Classes_RelationClasses_Equivalence_0 || abel_semigroup || 0.0339764860788
Coq_ZArith_Int_Z_as_Int__1 || product_Unity || 0.033947017726
Coq_PArith_BinPos_Pos_lt || bNF_Ca1495478003natLeq || 0.0338921269684
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || nat_of_num || 0.0336681929264
Coq_Init_Datatypes_list_0 || set || 0.0336137353654
Coq_Structures_OrdersEx_PositiveOrderedTypeBits_lt || pred_nat || 0.0334727905647
__constr_Coq_Numbers_BinNums_positive_0_3 || product_Unity || 0.0334149512139
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || ii || 0.033187793954
Coq_Classes_RelationClasses_Symmetric || antisym || 0.0328858090141
Coq_Numbers_Natural_BigN_BigN_BigN_eq || bNF_Ca1495478003natLeq || 0.0327809215817
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || nat_of_nibble || 0.03268334314
Coq_MSets_MSetPositive_PositiveSet_E_eq || less_than || 0.0324457888831
Coq_Lists_List_seq || upt || 0.0324043523114
Coq_Sorting_Sorted_LocallySorted_0 || pred_list || 0.0323556861397
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || cnj || 0.0321627107408
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || cnj || 0.0321627107408
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || cnj || 0.0321627107408
Coq_ZArith_BinInt_Z_sqrt_up || cnj || 0.0321575598
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || sqrt || 0.0321244339951
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || sqrt || 0.0321244339951
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || sqrt || 0.0321244339951
Coq_ZArith_BinInt_Z_sqrt_up || sqrt || 0.0321244339951
Coq_Sorting_Sorted_LocallySorted_0 || listsp || 0.0319901647657
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || cnj || 0.0318702207644
Coq_Structures_OrdersEx_Z_as_OT_sqrt || cnj || 0.0318702207644
Coq_Structures_OrdersEx_Z_as_DT_sqrt || cnj || 0.0318702207644
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || sqrt || 0.0318591781499
Coq_Structures_OrdersEx_Z_as_OT_sqrt || sqrt || 0.0318591781499
Coq_Structures_OrdersEx_Z_as_DT_sqrt || sqrt || 0.0318591781499
Coq_Relations_Relation_Operators_Desc_0 || pred_list || 0.0317506137882
__constr_Coq_Init_Datatypes_nat_0_2 || gcd_lcm || 0.031719558579
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || pred_numeral || 0.0316874021088
Coq_PArith_POrderedType_Positive_as_DT_le || bNF_Ca1495478003natLeq || 0.0315134258939
Coq_PArith_POrderedType_Positive_as_OT_le || bNF_Ca1495478003natLeq || 0.0315134258939
Coq_Structures_OrdersEx_Positive_as_DT_le || bNF_Ca1495478003natLeq || 0.0315134258939
Coq_Structures_OrdersEx_Positive_as_OT_le || bNF_Ca1495478003natLeq || 0.0315134258939
Coq_PArith_BinPos_Pos_le || bNF_Ca1495478003natLeq || 0.0314194084876
Coq_Relations_Relation_Operators_Desc_0 || listsp || 0.0313981709238
Coq_ZArith_BinInt_Z_sqrt || sqrt || 0.0312800157367
Coq_ZArith_BinInt_Z_sqrt || cnj || 0.0312282509884
Coq_romega_ReflOmegaCore_ZOmega_apply_right || suc_Rep || 0.0311813029804
Coq_romega_ReflOmegaCore_ZOmega_apply_left || suc_Rep || 0.0311813029804
Coq_Lists_List_Exists_0 || list_ex || 0.0308393365113
Coq_Numbers_Integer_Binary_ZBinary_Z_log2_up || num_of_nat || 0.0307985341639
Coq_Structures_OrdersEx_Z_as_OT_log2_up || num_of_nat || 0.0307985341639
Coq_Structures_OrdersEx_Z_as_DT_log2_up || num_of_nat || 0.0307985341639
__constr_Coq_Init_Datatypes_nat_0_2 || gcd_gcd || 0.0307816723906
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || cos_coeff || 0.03073119834
Coq_Structures_OrdersEx_Z_as_OT_opp || cos_coeff || 0.03073119834
Coq_Structures_OrdersEx_Z_as_DT_opp || cos_coeff || 0.03073119834
Coq_ZArith_BinInt_Z_log2_up || num_of_nat || 0.0306632010089
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || bNF_Ca1495478003natLeq || 0.0305983903962
Coq_Numbers_Natural_Binary_NBinary_N_sqrt || csqrt || 0.030580882032
Coq_NArith_BinNat_N_sqrt || csqrt || 0.030580882032
Coq_Structures_OrdersEx_N_as_OT_sqrt || csqrt || 0.030580882032
Coq_Structures_OrdersEx_N_as_DT_sqrt || csqrt || 0.030580882032
Coq_Lists_List_ForallOrdPairs_0 || pred_list || 0.0303135696645
Coq_Lists_List_Forall_0 || pred_list || 0.0303135696645
Coq_NArith_BinNat_N_double || bit0 || 0.0303020155243
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || csqrt || 0.0300422862638
Coq_NArith_BinNat_N_sqrt_up || csqrt || 0.0300422862638
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || csqrt || 0.0300422862638
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || csqrt || 0.0300422862638
Coq_Lists_List_ForallOrdPairs_0 || listsp || 0.0299913765758
Coq_Lists_List_In || list_ex1 || 0.029864898692
Coq_QArith_QArith_base_Qlt || pred_nat || 0.0297055414914
Coq_Classes_RelationClasses_PreOrder_0 || semilattice || 0.0296155792649
Coq_Classes_RelationClasses_Symmetric || wf || 0.0295724567861
Coq_Numbers_Integer_Binary_ZBinary_Z_even || num_of_nat || 0.0294394880477
Coq_Structures_OrdersEx_Z_as_OT_even || num_of_nat || 0.0294394880477
Coq_Structures_OrdersEx_Z_as_DT_even || num_of_nat || 0.0294394880477
Coq_PArith_POrderedType_Positive_as_DT_lt || less_than || 0.0292953459495
Coq_PArith_POrderedType_Positive_as_OT_lt || less_than || 0.0292953459495
Coq_Structures_OrdersEx_Positive_as_DT_lt || less_than || 0.0292953459495
Coq_Structures_OrdersEx_Positive_as_OT_lt || less_than || 0.0292953459495
Coq_Classes_RelationClasses_Irreflexive || transitive_acyclic || 0.0292308535361
Coq_Numbers_Natural_Binary_NBinary_N_gcd || root || 0.0291303472241
Coq_NArith_BinNat_N_gcd || root || 0.0291303472241
Coq_Structures_OrdersEx_N_as_OT_gcd || root || 0.0291303472241
Coq_Structures_OrdersEx_N_as_DT_gcd || root || 0.0291303472241
Coq_Numbers_Natural_Binary_NBinary_N_log2_up || num_of_nat || 0.0290763595137
Coq_NArith_BinNat_N_log2_up || num_of_nat || 0.0290763595137
Coq_Structures_OrdersEx_N_as_OT_log2_up || num_of_nat || 0.0290763595137
Coq_Structures_OrdersEx_N_as_DT_log2_up || num_of_nat || 0.0290763595137
Coq_MSets_MSetPositive_PositiveSet_t || nat || 0.028931566734
Coq_MMaps_MMapPositive_PositiveMap_E_lt || pred_nat || 0.0287894408789
__constr_Coq_Numbers_BinNums_N_0_2 || size_num || 0.0287446209313
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || num_of_nat || 0.0287254815683
Coq_Structures_OrdersEx_Z_as_OT_odd || num_of_nat || 0.0287254815683
Coq_Structures_OrdersEx_Z_as_DT_odd || num_of_nat || 0.0287254815683
Coq_Numbers_Integer_Binary_ZBinary_Z_log2 || num_of_nat || 0.0285383890536
Coq_Structures_OrdersEx_Z_as_OT_log2 || num_of_nat || 0.0285383890536
Coq_Structures_OrdersEx_Z_as_DT_log2 || num_of_nat || 0.0285383890536
Coq_PArith_BinPos_Pos_lt || less_than || 0.0285345295159
Coq_Numbers_Natural_Binary_NBinary_N_sqrt || sqrt || 0.0283924788842
Coq_NArith_BinNat_N_sqrt || sqrt || 0.0283924788842
Coq_Structures_OrdersEx_N_as_OT_sqrt || sqrt || 0.0283924788842
Coq_Structures_OrdersEx_N_as_DT_sqrt || sqrt || 0.0283924788842
Coq_Numbers_Natural_BigN_BigN_BigN_eq || less_than || 0.0283387834886
Coq_ZArith_BinInt_Z_log2 || num_of_nat || 0.0282643003813
Coq_ZArith_BinInt_Z_opp || cos_coeff || 0.0282617123183
Coq_Numbers_Natural_Binary_NBinary_N_divide || pred_nat || 0.0282125284763
Coq_NArith_BinNat_N_divide || pred_nat || 0.0282125284763
Coq_Structures_OrdersEx_N_as_OT_divide || pred_nat || 0.0282125284763
Coq_Structures_OrdersEx_N_as_DT_divide || pred_nat || 0.0282125284763
Coq_ZArith_BinInt_Z_even || num_of_nat || 0.0280614197589
Coq_Classes_RelationClasses_Equivalence_0 || semilattice_axioms || 0.0280491130754
__constr_Coq_Numbers_BinNums_positive_0_1 || zero_zero || 0.0280362897838
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || sqrt || 0.0280037051893
Coq_NArith_BinNat_N_sqrt_up || sqrt || 0.0280037051893
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || sqrt || 0.0280037051893
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || sqrt || 0.0280037051893
Coq_Classes_RelationClasses_PER_0 || lattic35693393ce_set || 0.0279627028383
__constr_Coq_Numbers_BinNums_Z_0_2 || size_num || 0.0279040730569
Coq_Structures_OrdersEx_PositiveOrderedTypeBits_eq || pred_nat || 0.0278507837235
Coq_Reals_ROrderedType_R_as_OT_eq || less_than || 0.0277016651575
Coq_Reals_ROrderedType_R_as_DT_eq || less_than || 0.0277016651575
Coq_Lists_List_firstn || takeWhile || 0.0274281957954
Coq_ZArith_Znumtheory_prime_0 || nat_nat_set || 0.0273271796895
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || bNF_Ca1495478003natLeq || 0.0272941651776
Coq_Structures_OrdersEx_Z_as_OT_lt || bNF_Ca1495478003natLeq || 0.0272941651776
Coq_Structures_OrdersEx_Z_as_DT_lt || bNF_Ca1495478003natLeq || 0.0272941651776
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || one_one || 0.0272088708239
Coq_Classes_SetoidClass_equiv || id_on || 0.027055136092
Coq_Arith_PeanoNat_Nat_divide || pred_nat || 0.0270449251615
Coq_Structures_OrdersEx_Nat_as_DT_divide || pred_nat || 0.0270449251615
Coq_Structures_OrdersEx_Nat_as_OT_divide || pred_nat || 0.0270449251615
Coq_Lists_SetoidPermutation_PermutationA_0 || lexord || 0.0270321234437
Coq_Lists_SetoidList_eqlistA_0 || lexord || 0.0270321234437
Coq_Numbers_Rational_BigQ_BigQ_BigQ_t || nat || 0.0268714021291
Coq_Numbers_Natural_Binary_NBinary_N_log2 || num_of_nat || 0.0268066057362
Coq_NArith_BinNat_N_log2 || num_of_nat || 0.0268066057362
Coq_Structures_OrdersEx_N_as_OT_log2 || num_of_nat || 0.0268066057362
Coq_Structures_OrdersEx_N_as_DT_log2 || num_of_nat || 0.0268066057362
Coq_ZArith_BinInt_Z_odd || num_of_nat || 0.0267880165954
Coq_ZArith_Int_Z_as_Int__2 || real || 0.0267751819341
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || less_than || 0.0265779207044
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || pred_nat || 0.0265747009805
Coq_Structures_OrdersEx_Z_as_OT_divide || pred_nat || 0.0265747009805
Coq_Structures_OrdersEx_Z_as_DT_divide || pred_nat || 0.0265747009805
Coq_Sorting_Mergesort_NatSort_sort || suc || 0.0265544704459
Coq_Sets_Relations_1_Order_0 || trans || 0.0264307702682
Coq_Numbers_Natural_Binary_NBinary_N_lcm || binomial || 0.0263972460317
Coq_NArith_BinNat_N_lcm || binomial || 0.0263972460317
Coq_Structures_OrdersEx_N_as_OT_lcm || binomial || 0.0263972460317
Coq_Structures_OrdersEx_N_as_DT_lcm || binomial || 0.0263972460317
Coq_ZArith_Zlogarithm_N_digits || int_ge_less_than2 || 0.0263159994562
Coq_ZArith_Zlogarithm_N_digits || int_ge_less_than || 0.0263159994562
Coq_Numbers_Natural_BigN_BigN_BigN_divide || bNF_Ca1495478003natLeq || 0.0262859875466
Coq_MSets_MSetPositive_PositiveSet_E_lt || pred_nat || 0.0262842548696
Coq_PArith_POrderedType_Positive_as_DT_le || less_than || 0.0261297052077
Coq_PArith_POrderedType_Positive_as_OT_le || less_than || 0.0261297052077
Coq_Structures_OrdersEx_Positive_as_DT_le || less_than || 0.0261297052077
Coq_Structures_OrdersEx_Positive_as_OT_le || less_than || 0.0261297052077
Coq_Numbers_Natural_Binary_NBinary_N_le || bNF_Ca1495478003natLeq || 0.0261209834302
Coq_Structures_OrdersEx_N_as_OT_le || bNF_Ca1495478003natLeq || 0.0261209834302
Coq_Structures_OrdersEx_N_as_DT_le || bNF_Ca1495478003natLeq || 0.0261209834302
Coq_NArith_BinNat_N_le || bNF_Ca1495478003natLeq || 0.0260746676296
Coq_PArith_BinPos_Pos_le || less_than || 0.0260411797666
Coq_Sets_Relations_1_Antisymmetric || trans || 0.0260354578133
__constr_Coq_Numbers_BinNums_positive_0_3 || rat || 0.0259739939986
Coq_Lists_SetoidList_NoDupA_0 || pred_list || 0.0259701239004
Coq_Numbers_Natural_BigN_BigN_BigN_one || ii || 0.0258946969599
Coq_ZArith_Int_Z_as_Int__3 || real || 0.0258362974722
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || cnj || 0.0258001851974
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || cnj || 0.0258001851974
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || cnj || 0.0258001851974
Coq_NArith_BinNat_N_sqrt_up || cnj || 0.0258001459895
Coq_Lists_SetoidList_NoDupA_0 || listsp || 0.0257320247316
Coq_Lists_SetoidList_equivlistA || lexord || 0.0256765310308
Coq_Sorting_Sorted_Sorted_0 || pred_list || 0.0256194147021
__constr_Coq_Numbers_BinNums_Z_0_2 || im || 0.0255291126408
Coq_Numbers_Natural_Binary_NBinary_N_sqrt || cnj || 0.0255055311471
Coq_NArith_BinNat_N_sqrt || cnj || 0.0255055311471
Coq_Structures_OrdersEx_N_as_OT_sqrt || cnj || 0.0255055311471
Coq_Structures_OrdersEx_N_as_DT_sqrt || cnj || 0.0255055311471
Coq_ZArith_BinInt_Z_lt || bNF_Ca1495478003natLeq || 0.0254135108072
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || product_size_unit || 0.0254005647677
Coq_Sorting_Sorted_Sorted_0 || listsp || 0.0253876018321
Coq_Sets_Cpo_Totally_ordered_0 || left_unique || 0.0253066109367
Coq_Numbers_Natural_Binary_NBinary_N_even || num_of_nat || 0.0251604601805
Coq_NArith_BinNat_N_even || num_of_nat || 0.0251604601805
Coq_Structures_OrdersEx_N_as_OT_even || num_of_nat || 0.0251604601805
Coq_Structures_OrdersEx_N_as_DT_even || num_of_nat || 0.0251604601805
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || ii || 0.0250224819609
Coq_Sets_Cpo_Totally_ordered_0 || left_total || 0.0249663839364
Coq_Classes_SetoidTactics_DefaultRelation_0 || semilattice_axioms || 0.0249137143506
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || bNF_Ca1495478003natLeq || 0.0249019906799
Coq_Sets_Cpo_Totally_ordered_0 || right_unique || 0.0248072437665
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibbleA || 0.0247995757849
Coq_Numbers_Integer_Binary_ZBinary_Z_quot || binomial || 0.024595349345
Coq_Structures_OrdersEx_Z_as_OT_quot || binomial || 0.024595349345
Coq_Structures_OrdersEx_Z_as_DT_quot || binomial || 0.024595349345
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || cis || 0.024513046386
Coq_Structures_OrdersEx_Z_as_OT_opp || cis || 0.024513046386
Coq_Structures_OrdersEx_Z_as_DT_opp || cis || 0.024513046386
Coq_Numbers_Natural_Binary_NBinary_N_odd || num_of_nat || 0.024507858952
Coq_Structures_OrdersEx_N_as_OT_odd || num_of_nat || 0.024507858952
Coq_Structures_OrdersEx_N_as_DT_odd || num_of_nat || 0.024507858952
Coq_ZArith_BinInt_Z_divide || pred_nat || 0.0244949326335
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibbleB || 0.0243905570685
Coq_Numbers_Integer_Binary_ZBinary_Z_le || bNF_Ca1495478003natLeq || 0.0242072995342
Coq_Structures_OrdersEx_Z_as_OT_le || bNF_Ca1495478003natLeq || 0.0242072995342
Coq_Structures_OrdersEx_Z_as_DT_le || bNF_Ca1495478003natLeq || 0.0242072995342
Coq_Sets_Relations_1_Transitive || trans || 0.0240816470473
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibble8 || 0.0240358716208
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || size_num || 0.0240169775493
Coq_ZArith_Int_Z_as_Int_i2z || pred_numeral || 0.0239724108738
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibbleA || 0.0238307097992
Coq_Sets_Relations_1_Reflexive || trans || 0.0237994933865
Coq_Lists_List_firstn || take || 0.023788290997
Coq_Init_Peano_lt || semilattice || 0.0237568636977
Coq_Reals_ROrderedType_R_as_OT_eq || bNF_Ca1495478003natLeq || 0.0236589705977
Coq_Reals_ROrderedType_R_as_DT_eq || bNF_Ca1495478003natLeq || 0.0236589705977
__constr_Coq_Numbers_BinNums_positive_0_3 || ii || 0.0236051574026
Coq_Numbers_Natural_BigN_BigN_BigN_divide || less_than || 0.0235458531987
Coq_Numbers_Integer_Binary_ZBinary_Z_div || binomial || 0.0235047627642
Coq_Structures_OrdersEx_Z_as_OT_div || binomial || 0.0235047627642
Coq_Structures_OrdersEx_Z_as_DT_div || binomial || 0.0235047627642
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibbleB || 0.0234171296505
Coq_Sets_Cpo_Totally_ordered_0 || right_total || 0.0232065433878
Coq_ZArith_BinInt_Z_quot || binomial || 0.0231591309099
Coq_ZArith_Zgcd_alt_Zgcd_alt || upt || 0.0231318370512
Coq_Numbers_Natural_Binary_NBinary_N_div || binomial || 0.023105963204
Coq_Structures_OrdersEx_N_as_OT_div || binomial || 0.023105963204
Coq_Structures_OrdersEx_N_as_DT_div || binomial || 0.023105963204
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibble8 || 0.0230590465826
__constr_Coq_Numbers_BinNums_N_0_2 || product_size_unit || 0.0229905857308
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibbleC || 0.0229688328609
Coq_Numbers_Natural_Binary_NBinary_N_lt || pred_nat || 0.0229135056276
Coq_Structures_OrdersEx_N_as_OT_lt || pred_nat || 0.0229135056276
Coq_Structures_OrdersEx_N_as_DT_lt || pred_nat || 0.0229135056276
Coq_NArith_BinNat_N_div || binomial || 0.0228606605045
Coq_NArith_BinNat_N_lt || pred_nat || 0.0227971097517
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibbleD || 0.0227615835126
Coq_MMaps_MMapPositive_PositiveMap_E_eq || pred_nat || 0.0227576998304
Coq_ZArith_BinInt_Z_le || bNF_Ca1495478003natLeq || 0.0227514329801
Coq_Init_Datatypes_app || cons || 0.0227465240684
__constr_Coq_Numbers_BinNums_N_0_2 || nat_of_num || 0.0226904565365
Coq_ZArith_BinInt_Z_opp || cis || 0.0226354856288
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || less_than || 0.0226335242927
Coq_Structures_OrdersEx_Z_as_OT_lt || less_than || 0.0226335242927
Coq_Structures_OrdersEx_Z_as_DT_lt || less_than || 0.0226335242927
Coq_NArith_BinNat_N_odd || num_of_nat || 0.022590236336
Coq_Sets_Cpo_Totally_ordered_0 || bi_total || 0.0225832973718
__constr_Coq_Numbers_BinNums_Z_0_2 || product_size_unit || 0.0225788354564
Coq_Numbers_Integer_Binary_ZBinary_Z_pow || binomial || 0.0225166649612
Coq_Structures_OrdersEx_Z_as_OT_pow || binomial || 0.0225166649612
Coq_Structures_OrdersEx_Z_as_DT_pow || binomial || 0.0225166649612
Coq_Classes_RelationClasses_Transitive || transitive_acyclic || 0.0225162420298
Coq_Numbers_Integer_Binary_ZBinary_Z_le || wf || 0.0224230796145
Coq_Structures_OrdersEx_Z_as_DT_le || wf || 0.0224230796145
Coq_Structures_OrdersEx_Z_as_OT_le || wf || 0.0224230796145
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || less_than || 0.0223663085538
__constr_Coq_Numbers_BinNums_N_0_2 || pred_numeral || 0.0223638885399
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || product_Unity || 0.022312126584
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibbleF || 0.0222314146094
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || one_one || 0.0221670012917
__constr_Coq_Numbers_BinNums_Z_0_2 || pred_numeral || 0.0220937942059
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || re || 0.0220214338424
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibbleC || 0.0219849265899
Coq_Numbers_Natural_Binary_NBinary_N_pow || binomial || 0.021898635475
Coq_Structures_OrdersEx_N_as_OT_pow || binomial || 0.021898635475
Coq_Structures_OrdersEx_N_as_DT_pow || binomial || 0.021898635475
Coq_Numbers_Natural_BigN_BigN_BigN_lt || bNF_Ca1495478003natLeq || 0.0218967477033
__constr_Coq_Init_Datatypes_nat_0_1 || code_integer || 0.0218281932251
Coq_Arith_PeanoNat_Nat_even || nibble_of_nat || 0.0218196204087
Coq_Structures_OrdersEx_Nat_as_DT_even || nibble_of_nat || 0.0218196204087
Coq_Structures_OrdersEx_Nat_as_OT_even || nibble_of_nat || 0.0218196204087
Coq_NArith_BinNat_N_pow || binomial || 0.0218112027461
Coq_Sets_Cpo_Totally_ordered_0 || bi_unique || 0.0218024762822
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibble3 || 0.0218019919324
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibbleD || 0.0217768506592
Coq_Numbers_Integer_Binary_ZBinary_Z_even || rcis || 0.0217346367555
Coq_Structures_OrdersEx_Z_as_OT_even || rcis || 0.0217346367555
Coq_Structures_OrdersEx_Z_as_DT_even || rcis || 0.0217346367555
Coq_romega_ReflOmegaCore_ZOmega_reduce || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_Tminus_def || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_Tred_factor6 || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_Tred_factor4 || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_Tred_factor3 || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_Tred_factor2 || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_Tred_factor1 || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_Tred_factor0 || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_Tmult_assoc_reduced || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_Tmult_opp_left || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_Tmult_plus_distr || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_Topp_one || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_Topp_mult_r || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_Topp_opp || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_Topp_plus || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_Tred_factor5 || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_T_OMEGA16 || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_T_OMEGA15 || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_T_OMEGA13 || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_T_OMEGA12 || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_T_OMEGA11 || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_T_OMEGA10 || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_Tmult_comm || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_Tplus_comm || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_Tplus_permute || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_Tmult_assoc_r || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_Tplus_assoc_r || zero_Rep || 0.0216402712099
Coq_romega_ReflOmegaCore_ZOmega_Tplus_assoc_l || zero_Rep || 0.0216402712099
Coq_MSets_MSetPositive_PositiveSet_lt || less_than || 0.0216371133907
Coq_Sets_Relations_1_Antisymmetric || wf || 0.0215280627305
Coq_Sets_Relations_1_Order_0 || wf || 0.0214449946852
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibble9 || 0.0214431561503
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || arcsin || 0.021357695106
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || arcsin || 0.021357695106
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || arcsin || 0.021357695106
Coq_ZArith_BinInt_Z_sqrt_up || arcsin || 0.021357695106
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibble5 || 0.0213357949904
Coq_Numbers_Natural_Binary_NBinary_N_le || less_than || 0.0212917639545
Coq_Structures_OrdersEx_N_as_OT_le || less_than || 0.0212917639545
Coq_Structures_OrdersEx_N_as_DT_le || less_than || 0.0212917639545
Coq_NArith_BinNat_N_le || less_than || 0.0212496840623
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibbleF || 0.0212453826201
Coq_ZArith_Zlogarithm_log_inf || int_ge_less_than2 || 0.0212140734712
Coq_ZArith_Zlogarithm_log_inf || int_ge_less_than || 0.0212140734712
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || rcis || 0.0211866927928
Coq_Structures_OrdersEx_Z_as_OT_odd || rcis || 0.0211866927928
Coq_Structures_OrdersEx_Z_as_DT_odd || rcis || 0.0211866927928
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || arcsin || 0.0211439384649
Coq_Structures_OrdersEx_Z_as_OT_sqrt || arcsin || 0.0211439384649
Coq_Structures_OrdersEx_Z_as_DT_sqrt || arcsin || 0.0211439384649
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibble2 || 0.0210432853178
Coq_Arith_PeanoNat_Nat_odd || nibble_of_nat || 0.0210426438352
Coq_Structures_OrdersEx_Nat_as_DT_odd || nibble_of_nat || 0.0210426438352
Coq_Structures_OrdersEx_Nat_as_OT_odd || nibble_of_nat || 0.0210426438352
Coq_Lists_List_In || listMem || 0.0209769288909
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibble4 || 0.0209543272272
__constr_Coq_Numbers_BinNums_Z_0_2 || nat_of_num || 0.0209202274079
Coq_Init_Peano_lt || lattic35693393ce_set || 0.0209139983237
Coq_ZArith_BinInt_Z_lt || less_than || 0.0209115589859
Coq_Numbers_Natural_Binary_NBinary_N_even || rcis || 0.0209052700407
Coq_NArith_BinNat_N_even || rcis || 0.0209052700407
Coq_Structures_OrdersEx_N_as_OT_even || rcis || 0.0209052700407
Coq_Structures_OrdersEx_N_as_DT_even || rcis || 0.0209052700407
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibble7 || 0.0208690948929
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibbleE || 0.0208690948929
Coq_Init_Peano_le_0 || semilattice || 0.0208562719287
Coq_romega_ReflOmegaCore_ZOmega_t_rewrite || rep_Nat || 0.0208384903709
Coq_romega_ReflOmegaCore_ZOmega_add_norm || rep_Nat || 0.0208384903709
Coq_romega_ReflOmegaCore_ZOmega_scalar_norm || rep_Nat || 0.0208384903709
Coq_romega_ReflOmegaCore_ZOmega_scalar_norm_add || rep_Nat || 0.0208384903709
Coq_romega_ReflOmegaCore_ZOmega_fusion_cancel || rep_Nat || 0.0208384903709
Coq_romega_ReflOmegaCore_ZOmega_fusion || rep_Nat || 0.0208384903709
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibble3 || 0.0208157687084
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibble6 || 0.0207873130437
Coq_ZArith_BinInt_Z_even || rcis || 0.0206976587862
Coq_Relations_Relation_Operators_symprod_0 || lex_prod || 0.0206938956956
Coq_ZArith_BinInt_Z_sqrt || arcsin || 0.0206797421026
Coq_Init_Peano_le_0 || lattic35693393ce_set || 0.0205847343023
Coq_ZArith_Int_Z_as_Int__2 || one2 || 0.0205827675428
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibble9 || 0.0204573652315
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibble5 || 0.0203502382952
Coq_Numbers_Natural_Binary_NBinary_N_odd || rcis || 0.0203495076317
Coq_Structures_OrdersEx_N_as_OT_odd || rcis || 0.0203495076317
Coq_Structures_OrdersEx_N_as_DT_odd || rcis || 0.0203495076317
Coq_Init_Peano_le_0 || wf || 0.0203243617479
Coq_Reals_Rdefinitions_Rlt || pred_nat || 0.0202693859673
__constr_Coq_Numbers_BinNums_Z_0_3 || one_one || 0.0202478567808
Coq_Relations_Relation_Operators_Ltl_0 || lexordp_eq || 0.0202159387727
Coq_ZArith_BinInt_Z_pow || binomial || 0.0201047610748
Coq_Numbers_Cyclic_ZModulo_ZModulo_Ptail || int_ge_less_than2 || 0.0200842076961
Coq_ZArith_Zlogarithm_log_near || int_ge_less_than2 || 0.0200842076961
Coq_Numbers_Cyclic_ZModulo_ZModulo_Ptail || int_ge_less_than || 0.0200842076961
Coq_ZArith_Zlogarithm_log_near || int_ge_less_than || 0.0200842076961
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibble2 || 0.0200586120504
$equals3 || id2 || 0.0200255794227
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || binomial || 0.0199898260091
Coq_Structures_OrdersEx_Z_as_OT_mul || binomial || 0.0199898260091
Coq_Structures_OrdersEx_Z_as_DT_mul || binomial || 0.0199898260091
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibble4 || 0.0199699938172
Coq_Numbers_Natural_BigN_BigN_BigN_lt || less_than || 0.0199536691136
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibble7 || 0.019885118263
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibbleE || 0.019885118263
Coq_Numbers_Natural_Binary_NBinary_N_mul || binomial || 0.0198794990885
Coq_Structures_OrdersEx_N_as_OT_mul || binomial || 0.0198794990885
Coq_Structures_OrdersEx_N_as_DT_mul || binomial || 0.0198794990885
Coq_Classes_RelationPairs_RelProd || bNF_Cardinal_cprod || 0.019878262994
Coq_Classes_RelationClasses_subrelation || finite_psubset || 0.0198249267801
Coq_ZArith_BinInt_Z_sqrt || dup || 0.0198065466041
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibble6 || 0.0198037074187
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || arctan || 0.0197532396301
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || arctan || 0.0197532396301
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || arctan || 0.0197532396301
Coq_ZArith_BinInt_Z_sqrt_up || arctan || 0.0197532396301
Coq_ZArith_BinInt_Z_odd || rcis || 0.0197313428347
Coq_ZArith_Int_Z_as_Int__3 || one2 || 0.0196996512209
Coq_Init_Peano_le_0 || distinct || 0.0196898767632
Coq_NArith_BinNat_N_mul || binomial || 0.0196666674192
Coq_Numbers_Integer_Binary_ZBinary_Z_le || less_than || 0.0196654757326
Coq_Structures_OrdersEx_Z_as_OT_le || less_than || 0.0196654757326
Coq_Structures_OrdersEx_Z_as_DT_le || less_than || 0.0196654757326
Coq_MSets_MSetPositive_PositiveSet_lt || bNF_Ca1495478003natLeq || 0.0196599873531
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || abs_Nat || 0.0196366290276
Coq_Structures_OrdersEx_Z_as_OT_succ || abs_Nat || 0.0196366290276
Coq_Structures_OrdersEx_Z_as_DT_succ || abs_Nat || 0.0196366290276
Coq_ZArith_BinInt_Z_add || pow || 0.0195736393418
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || arctan || 0.0195700369131
Coq_Structures_OrdersEx_Z_as_OT_sqrt || arctan || 0.0195700369131
Coq_Structures_OrdersEx_Z_as_DT_sqrt || arctan || 0.0195700369131
Coq_Sets_Relations_1_Reflexive || wf || 0.0195543271959
Coq_Numbers_Integer_Binary_ZBinary_Z_log2_up || rcis || 0.0195125911047
Coq_Structures_OrdersEx_Z_as_OT_log2_up || rcis || 0.0195125911047
Coq_Structures_OrdersEx_Z_as_DT_log2_up || rcis || 0.0195125911047
Coq_Classes_SetoidClass_equiv || measure || 0.0194807874868
Coq_Sets_Relations_1_Transitive || wf || 0.0194758498375
Coq_ZArith_BinInt_Z_log2_up || rcis || 0.0194248708276
Coq_NArith_BinNat_N_shiftr || pow || 0.0192237560521
Coq_Numbers_Cyclic_DoubleCyclic_DoubleBase_double_wB || upt || 0.0191913586247
Coq_Numbers_Cyclic_Int31_Cyclic31_phibis_aux || upt || 0.0191913586247
Coq_ZArith_BinInt_Z_sqrt || arctan || 0.019171301545
Coq_Numbers_Natural_Binary_NBinary_N_shiftr || pow || 0.019104080942
Coq_Structures_OrdersEx_N_as_OT_shiftr || pow || 0.019104080942
Coq_Structures_OrdersEx_N_as_DT_shiftr || pow || 0.019104080942
Coq_NArith_BinNat_N_shiftl || pow || 0.0190328488953
Coq_Numbers_Natural_Binary_NBinary_N_shiftl || pow || 0.0188851677298
Coq_Structures_OrdersEx_N_as_OT_shiftl || pow || 0.0188851677298
Coq_Structures_OrdersEx_N_as_DT_shiftl || pow || 0.0188851677298
Coq_Lists_List_NoDup_0 || distinct || 0.0188308668769
Coq_MSets_MSetPositive_PositiveSet_E_eq || pred_nat || 0.0187507949257
Coq_NArith_BinNat_N_odd || rcis || 0.0187334728368
Coq_Classes_RelationClasses_RewriteRelation_0 || semilattice_axioms || 0.0187071501617
Coq_ZArith_BinInt_Z_succ || abs_Nat || 0.0186359266309
Coq_Numbers_Natural_Binary_NBinary_N_log2_up || rcis || 0.0186173739085
Coq_NArith_BinNat_N_log2_up || rcis || 0.0186173739085
Coq_Structures_OrdersEx_N_as_OT_log2_up || rcis || 0.0186173739085
Coq_Structures_OrdersEx_N_as_DT_log2_up || rcis || 0.0186173739085
Coq_ZArith_BinInt_Z_sqrt || code_dup || 0.0183955635481
Coq_ZArith_BinInt_Z_le || less_than || 0.0183628006208
Coq_Classes_RelationClasses_Reflexive || transitive_acyclic || 0.0183311288124
Coq_Lists_SetoidPermutation_PermutationA_0 || lenlex || 0.0182842703097
Coq_Lists_SetoidList_eqlistA_0 || lenlex || 0.0182842703097
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || dup || 0.0182311086705
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || dup || 0.0182311086705
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || dup || 0.0182311086705
Coq_ZArith_BinInt_Z_sqrt_up || dup || 0.0182311086705
Coq_Numbers_Integer_Binary_ZBinary_Z_log2 || rcis || 0.0180498926762
Coq_Structures_OrdersEx_Z_as_OT_log2 || rcis || 0.0180498926762
Coq_Structures_OrdersEx_Z_as_DT_log2 || rcis || 0.0180498926762
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || dup || 0.0180122630834
Coq_Structures_OrdersEx_Z_as_OT_sqrt || dup || 0.0180122630834
Coq_Structures_OrdersEx_Z_as_DT_sqrt || dup || 0.0180122630834
Coq_ZArith_Int_Z_as_Int__2 || complex || 0.0179840836226
Coq_ZArith_BinInt_Z_log2 || rcis || 0.0178728419684
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || im || 0.0177791934204
Coq_Sorting_Permutation_Permutation_0 || ord_less || 0.0177196784963
Coq_Classes_RelationClasses_Equivalence_0 || asym || 0.0176677734841
Coq_Reals_ROrderedType_R_as_OT_eq || pred_nat || 0.0175158798258
Coq_Reals_ROrderedType_R_as_DT_eq || pred_nat || 0.0175158798258
Coq_Numbers_Natural_Binary_NBinary_N_sqrt || arcsin || 0.0174890422487
Coq_NArith_BinNat_N_sqrt || arcsin || 0.0174890422487
Coq_Structures_OrdersEx_N_as_OT_sqrt || arcsin || 0.0174890422487
Coq_Structures_OrdersEx_N_as_DT_sqrt || arcsin || 0.0174890422487
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || pred_numeral || 0.017480334722
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || arcsin || 0.0171983454733
Coq_NArith_BinNat_N_sqrt_up || arcsin || 0.0171983454733
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || arcsin || 0.0171983454733
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || arcsin || 0.0171983454733
Coq_Numbers_Natural_Binary_NBinary_N_log2 || rcis || 0.0171342108101
Coq_NArith_BinNat_N_log2 || rcis || 0.0171342108101
Coq_Structures_OrdersEx_N_as_OT_log2 || rcis || 0.0171342108101
Coq_Structures_OrdersEx_N_as_DT_log2 || rcis || 0.0171342108101
Coq_Init_Datatypes_app || set_Cons || 0.0170835072347
Coq_Lists_SetoidList_equivlistA || lenlex || 0.0170514905084
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || code_dup || 0.017014690839
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || code_dup || 0.017014690839
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || code_dup || 0.017014690839
Coq_ZArith_BinInt_Z_sqrt_up || code_dup || 0.017014690839
Coq_ZArith_Int_Z_as_Int__3 || complex || 0.0169396948925
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || code_dup || 0.0168210465526
Coq_Structures_OrdersEx_Z_as_OT_sqrt || code_dup || 0.0168210465526
Coq_Structures_OrdersEx_Z_as_DT_sqrt || code_dup || 0.0168210465526
Coq_Classes_RelationClasses_Symmetric || bNF_Ca829732799finite || 0.0165873822004
Coq_Classes_RelationClasses_Equivalence_0 || irrefl || 0.0164775405406
Coq_Classes_SetoidTactics_DefaultRelation_0 || abel_semigroup || 0.0164708830324
Coq_Classes_RelationClasses_PreOrder_0 || lattic35693393ce_set || 0.0164705101589
Coq_Classes_SetoidClass_equiv || measures || 0.0163914566549
Coq_Numbers_Natural_BigN_BigN_BigN_two || real || 0.016370883523
Coq_Numbers_Integer_BigZ_BigZ_BigZ_two || real || 0.0163424140723
Coq_ZArith_Int_Z_as_Int_i2z || re || 0.0163069934173
Coq_Numbers_Natural_Binary_NBinary_N_succ || abs_Nat || 0.0162525792963
Coq_Structures_OrdersEx_N_as_OT_succ || abs_Nat || 0.0162525792963
Coq_Structures_OrdersEx_N_as_DT_succ || abs_Nat || 0.0162525792963
Coq_Numbers_Natural_Binary_NBinary_N_lxor || pow || 0.0162371163076
Coq_Structures_OrdersEx_N_as_OT_lxor || pow || 0.0162371163076
Coq_Structures_OrdersEx_N_as_DT_lxor || pow || 0.0162371163076
Coq_Relations_Relation_Operators_le_AsB_0 || lex_prod || 0.0161858523465
Coq_Numbers_Natural_Binary_NBinary_N_sqrt || arctan || 0.0161496165227
Coq_NArith_BinNat_N_sqrt || arctan || 0.0161496165227
Coq_Structures_OrdersEx_N_as_OT_sqrt || arctan || 0.0161496165227
Coq_Structures_OrdersEx_N_as_DT_sqrt || arctan || 0.0161496165227
Coq_NArith_BinNat_N_succ || abs_Nat || 0.0161390634357
Coq_Numbers_Natural_Binary_NBinary_N_ldiff || pow || 0.0160375429963
Coq_Structures_OrdersEx_N_as_OT_ldiff || pow || 0.0160375429963
Coq_Structures_OrdersEx_N_as_DT_ldiff || pow || 0.0160375429963
Coq_Numbers_Natural_BigN_BigN_BigN_one || product_Unity || 0.0160354974112
Coq_PArith_POrderedType_Positive_as_DT_lt || pred_nat || 0.015909823307
Coq_PArith_POrderedType_Positive_as_OT_lt || pred_nat || 0.015909823307
Coq_Structures_OrdersEx_Positive_as_DT_lt || pred_nat || 0.015909823307
Coq_Structures_OrdersEx_Positive_as_OT_lt || pred_nat || 0.015909823307
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || arctan || 0.015901107559
Coq_NArith_BinNat_N_sqrt_up || arctan || 0.015901107559
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || arctan || 0.015901107559
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || arctan || 0.015901107559
Coq_NArith_BinNat_N_sub || pow || 0.0158737442044
Coq_Numbers_Natural_Binary_NBinary_N_sub || pow || 0.0158679539567
Coq_Structures_OrdersEx_N_as_OT_sub || pow || 0.0158679539567
Coq_Structures_OrdersEx_N_as_DT_sub || pow || 0.0158679539567
Coq_NArith_BinNat_N_ldiff || pow || 0.0158524417729
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || product_Unity || 0.0156500949429
Coq_PArith_BinPos_Pos_lt || pred_nat || 0.0154572370216
Coq_Lists_List_lel || listMem || 0.0154425230431
Coq_Classes_SetoidTactics_DefaultRelation_0 || lattic35693393ce_set || 0.0154221578671
Coq_Classes_RelationClasses_relation_equivalence || finite_psubset || 0.0153834852872
Coq_Numbers_Integer_Binary_ZBinary_Z_le || distinct || 0.0153389002352
Coq_Structures_OrdersEx_Z_as_OT_le || distinct || 0.0153389002352
Coq_Structures_OrdersEx_Z_as_DT_le || distinct || 0.0153389002352
Coq_ZArith_Zwf_Zwf_up || int_ge_less_than2 || 0.0151855790781
Coq_ZArith_Zwf_Zwf || int_ge_less_than2 || 0.0151855790781
Coq_ZArith_Zwf_Zwf_up || int_ge_less_than || 0.0151855790781
Coq_ZArith_Zwf_Zwf || int_ge_less_than || 0.0151855790781
Coq_Sets_Relations_1_Antisymmetric || antisym || 0.0151221070815
Coq_ZArith_BinInt_Z_sub || pow || 0.0151036146096
Coq_Numbers_Rational_BigQ_BigQ_BigQ_lt || less_than || 0.0150787001719
Coq_Numbers_Natural_Binary_NBinary_N_pred || sqr || 0.0150320685687
Coq_Structures_OrdersEx_N_as_OT_pred || sqr || 0.0150320685687
Coq_Structures_OrdersEx_N_as_DT_pred || sqr || 0.0150320685687
Coq_ZArith_Zgcd_alt_Zgcd_alt || upto || 0.0150143045941
Coq_Classes_RelationClasses_StrictOrder_0 || semilattice || 0.0150081154581
Coq_NArith_BinNat_N_pred || sqr || 0.0149876784243
Coq_PArith_BinPos_Pos_to_nat || nat_of_nibble || 0.0149797052821
Coq_ZArith_BinInt_Z_succ || one_one || 0.0149761355094
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || im || 0.0149174823014
Coq_Structures_OrdersEx_Z_as_OT_opp || im || 0.0149174823014
Coq_Structures_OrdersEx_Z_as_DT_opp || im || 0.0149174823014
Coq_Classes_SetoidTactics_DefaultRelation_0 || semilattice || 0.0148123486
Coq_Numbers_Natural_Binary_NBinary_N_lor || pow || 0.0147321663507
Coq_Structures_OrdersEx_N_as_OT_lor || pow || 0.0147321663507
Coq_Structures_OrdersEx_N_as_DT_lor || pow || 0.0147321663507
Coq_Numbers_Integer_Binary_ZBinary_Z_le || linorder_sorted || 0.0146874915688
Coq_Structures_OrdersEx_Z_as_OT_le || linorder_sorted || 0.0146874915688
Coq_Structures_OrdersEx_Z_as_DT_le || linorder_sorted || 0.0146874915688
Coq_Relations_Relation_Definitions_relation || set || 0.0146614903451
Coq_NArith_BinNat_N_lor || pow || 0.0146239909739
Coq_Lists_List_incl || listMem || 0.014609559987
Coq_NArith_BinNat_N_lxor || pow || 0.0145209208602
Coq_Numbers_Rational_BigQ_BigQ_BigQ_lt || bNF_Ca1495478003natLeq || 0.0144395400937
Coq_ZArith_BinInt_Z_lcm || upt || 0.0143586817434
Coq_ZArith_Zgcd_alt_fibonacci || int_ge_less_than2 || 0.0142931422063
Coq_ZArith_Zgcd_alt_fibonacci || int_ge_less_than || 0.0142931422063
Coq_Classes_RelationClasses_complement || transitive_rtrancl || 0.0142803331986
Coq_Sets_Relations_1_Order_0 || antisym || 0.0142111684598
Coq_Lists_SetoidPermutation_PermutationA_0 || lex || 0.0141434555468
Coq_Lists_SetoidList_eqlistA_0 || lex || 0.0141434555468
Coq_PArith_POrderedType_Positive_as_DT_le || pred_nat || 0.0141410505819
Coq_PArith_POrderedType_Positive_as_OT_le || pred_nat || 0.0141410505819
Coq_Structures_OrdersEx_Positive_as_DT_le || pred_nat || 0.0141410505819
Coq_Structures_OrdersEx_Positive_as_OT_le || pred_nat || 0.0141410505819
Coq_Numbers_Natural_BigN_BigN_BigN_eq || pred_nat || 0.0141019260375
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || code_integer_of_num || 0.0140982192141
Coq_PArith_BinPos_Pos_le || pred_nat || 0.014088608398
Coq_ZArith_Int_Z_as_Int_i2z || code_integer_of_num || 0.0139897468924
Coq_ZArith_BinInt_Z_opp || im || 0.0139474691319
Coq_ZArith_Int_Z_as_Int_i2z || im || 0.0138218764463
Coq_Classes_RelationClasses_PER_0 || semilattice_axioms || 0.013759472462
Coq_Classes_RelationClasses_PreOrder_0 || bNF_Wellorder_wo_rel || 0.0136108888118
Coq_Init_Peano_le_0 || linorder_sorted || 0.0135116194496
Coq_Lists_List_Exists_0 || listMem || 0.0135112332911
Coq_Numbers_Natural_Binary_NBinary_N_sqrt || sqr || 0.0134970803649
Coq_NArith_BinNat_N_sqrt || sqr || 0.0134970803649
Coq_Structures_OrdersEx_N_as_OT_sqrt || sqr || 0.0134970803649
Coq_Structures_OrdersEx_N_as_DT_sqrt || sqr || 0.0134970803649
Coq_Numbers_Integer_Binary_ZBinary_Z_lcm || upt || 0.0134737627756
Coq_Structures_OrdersEx_Z_as_OT_lcm || upt || 0.0134737627756
Coq_Structures_OrdersEx_Z_as_DT_lcm || upt || 0.0134737627756
Coq_Numbers_Natural_Binary_NBinary_N_sqrt || dup || 0.0134528038154
Coq_NArith_BinNat_N_sqrt || dup || 0.0134528038154
Coq_Structures_OrdersEx_N_as_OT_sqrt || dup || 0.0134528038154
Coq_Structures_OrdersEx_N_as_DT_sqrt || dup || 0.0134528038154
Coq_Numbers_Natural_Binary_NBinary_N_gcd || pow || 0.0134469181262
Coq_NArith_BinNat_N_gcd || pow || 0.0134469181262
Coq_Structures_OrdersEx_N_as_OT_gcd || pow || 0.0134469181262
Coq_Structures_OrdersEx_N_as_DT_gcd || pow || 0.0134469181262
Coq_ZArith_BinInt_Z_of_nat || int_ge_less_than2 || 0.0134315645712
Coq_ZArith_BinInt_Z_of_nat || int_ge_less_than || 0.0134315645712
Coq_Lists_SetoidList_equivlistA || lex || 0.0133800182019
Coq_Sets_Relations_1_Antisymmetric || bNF_Ca829732799finite || 0.0133681758569
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || int_ge_less_than2 || 0.0133528391322
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || int_ge_less_than || 0.0133528391322
Coq_Classes_RelationClasses_RewriteRelation_0 || abel_semigroup || 0.0132818652555
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || sqr || 0.0132255079045
Coq_NArith_BinNat_N_sqrt_up || sqr || 0.0132255079045
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || sqr || 0.0132255079045
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || sqr || 0.0132255079045
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || dup || 0.0131839497614
Coq_NArith_BinNat_N_sqrt_up || dup || 0.0131839497614
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || dup || 0.0131839497614
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || dup || 0.0131839497614
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || pred_nat || 0.0131752163488
Coq_Sets_Relations_1_Reflexive || antisym || 0.0131259465612
Coq_Numbers_Natural_Binary_NBinary_N_max || pow || 0.0130729686098
Coq_Structures_OrdersEx_N_as_OT_max || pow || 0.0130729686098
Coq_Structures_OrdersEx_N_as_DT_max || pow || 0.0130729686098
Coq_Numbers_Integer_Binary_ZBinary_Z_lnot || zero_zero || 0.0129350913597
Coq_Structures_OrdersEx_Z_as_OT_lnot || zero_zero || 0.0129350913597
Coq_Structures_OrdersEx_Z_as_DT_lnot || zero_zero || 0.0129350913597
__constr_Coq_Numbers_BinNums_positive_0_2 || one_one || 0.0129054836968
Coq_ZArith_BinInt_Z_gcd || upt || 0.0128975473212
Coq_Classes_RelationPairs_RelProd || product || 0.0128735579413
Coq_NArith_BinNat_N_max || pow || 0.0128463806425
Coq_ZArith_BinInt_Z_lnot || zero_zero || 0.01276605088
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || re || 0.0127608167134
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || bNF_Ca1495478003natLeq || 0.0127211422545
Coq_PArith_BinPos_Pos_shiftl_nat || pow || 0.0126926181807
Coq_Numbers_Integer_Binary_ZBinary_Z_gcd || upt || 0.012635767961
Coq_Structures_OrdersEx_Z_as_OT_gcd || upt || 0.012635767961
Coq_Structures_OrdersEx_Z_as_DT_gcd || upt || 0.012635767961
Coq_Sets_Multiset_meq || finite_psubset || 0.0126279780418
Coq_Numbers_Natural_Binary_NBinary_N_succ || pos || 0.0126166956553
Coq_Structures_OrdersEx_N_as_OT_succ || pos || 0.0126166956553
Coq_Structures_OrdersEx_N_as_DT_succ || pos || 0.0126166956553
Coq_Classes_RelationClasses_RewriteRelation_0 || lattic35693393ce_set || 0.0125743671196
Coq_Lists_List_NoDup_0 || linorder_sorted || 0.0125649013361
Coq_Classes_SetoidClass_equiv || transitive_trancl || 0.0125569237076
Coq_NArith_BinNat_N_succ || pos || 0.0125357185366
Coq_PArith_BinPos_Pos_to_nat || size_num || 0.012481729668
Coq_Numbers_Natural_Binary_NBinary_N_sqrt || code_dup || 0.0124749436632
Coq_NArith_BinNat_N_sqrt || code_dup || 0.0124749436632
Coq_Structures_OrdersEx_N_as_OT_sqrt || code_dup || 0.0124749436632
Coq_Structures_OrdersEx_N_as_DT_sqrt || code_dup || 0.0124749436632
Coq_Sets_Relations_1_Order_0 || bNF_Ca829732799finite || 0.0123871363283
Coq_Classes_RelationClasses_PER_0 || abel_semigroup || 0.0123278021505
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || code_dup || 0.0122387418246
Coq_NArith_BinNat_N_sqrt_up || code_dup || 0.0122387418246
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || code_dup || 0.0122387418246
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || code_dup || 0.0122387418246
Coq_MSets_MSetPositive_PositiveSet_lt || pred_nat || 0.0122001907124
Coq_Numbers_Cyclic_DoubleCyclic_DoubleBase_double_wB || upto || 0.0121606420775
Coq_Numbers_Cyclic_Int31_Cyclic31_phibis_aux || upto || 0.0121606420775
Coq_ZArith_Int_Z_as_Int_i2z || zero_zero || 0.0121186941879
Coq_Numbers_Natural_Binary_NBinary_N_sqrt || bitM || 0.0120677742081
Coq_NArith_BinNat_N_sqrt || bitM || 0.0120677742081
Coq_Structures_OrdersEx_N_as_OT_sqrt || bitM || 0.0120677742081
Coq_Structures_OrdersEx_N_as_DT_sqrt || bitM || 0.0120677742081
Coq_Sets_Relations_1_Transitive || antisym || 0.0120578129881
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || pred_nat || 0.0120508007918
Coq_Structures_OrdersEx_Z_as_OT_lt || pred_nat || 0.0120508007918
Coq_Structures_OrdersEx_Z_as_DT_lt || pred_nat || 0.0120508007918
Coq_Classes_RelationClasses_RewriteRelation_0 || semilattice || 0.0119905978067
__constr_Coq_Numbers_BinNums_Z_0_2 || bot_bot || 0.011958733107
Coq_Classes_SetoidClass_equiv || transitive_rtrancl || 0.0119411611541
Coq_Lists_List_rev || butlast || 0.0119339510616
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || bitM || 0.0118492903406
Coq_NArith_BinNat_N_sqrt_up || bitM || 0.0118492903406
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || bitM || 0.0118492903406
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || bitM || 0.0118492903406
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || less_than || 0.0118199289259
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || pos || 0.0118132738532
Coq_Structures_OrdersEx_Z_as_OT_succ || pos || 0.0118132738532
Coq_Structures_OrdersEx_Z_as_DT_succ || pos || 0.0118132738532
Coq_Numbers_Integer_BigZ_BigZ_BigZ_two || one2 || 0.0118038462609
Coq_ZArith_Zlogarithm_log_sup || int_ge_less_than2 || 0.0117873415697
Coq_ZArith_Zlogarithm_log_sup || int_ge_less_than || 0.0117873415697
Coq_Numbers_Natural_BigN_BigN_BigN_divide || pred_nat || 0.0117231540047
Coq_Numbers_Natural_Binary_NBinary_N_succ || code_Pos || 0.0117067875507
Coq_Structures_OrdersEx_N_as_OT_succ || code_Pos || 0.0117067875507
Coq_Structures_OrdersEx_N_as_DT_succ || code_Pos || 0.0117067875507
__constr_Coq_Numbers_BinNums_Z_0_2 || int_ge_less_than2 || 0.0116944592474
__constr_Coq_Numbers_BinNums_Z_0_2 || int_ge_less_than || 0.0116944592474
Coq_Numbers_Natural_BigN_BigN_BigN_two || one2 || 0.0116369267674
Coq_NArith_BinNat_N_succ || code_Pos || 0.011636546653
Coq_Arith_PeanoNat_Nat_even || num_of_nat || 0.0116067909466
Coq_Structures_OrdersEx_Nat_as_DT_even || num_of_nat || 0.0116067909466
Coq_Structures_OrdersEx_Nat_as_OT_even || num_of_nat || 0.0116067909466
Coq_Sets_Relations_1_Reflexive || bNF_Ca829732799finite || 0.0115375350451
Coq_PArith_BinPos_Pos_succ || bit1 || 0.0115238551793
Coq_PArith_BinPos_Pos_succ || bit0 || 0.0114275159576
__constr_Coq_Init_Datatypes_bool_0_2 || pos || 0.0114140786743
Coq_Sorting_Permutation_Permutation_0 || finite_psubset || 0.0114140746431
Coq_Numbers_Natural_Binary_NBinary_N_gcd || upt || 0.0114135328678
Coq_Structures_OrdersEx_N_as_OT_gcd || upt || 0.0114135328678
Coq_Structures_OrdersEx_N_as_DT_gcd || upt || 0.0114135328678
Coq_NArith_BinNat_N_gcd || upt || 0.011413229989
__constr_Coq_Numbers_BinNums_Z_0_1 || code_integer || 0.0113878167459
Coq_Numbers_Natural_Binary_NBinary_N_le || pred_nat || 0.0113392933323
Coq_Structures_OrdersEx_N_as_OT_le || pred_nat || 0.0113392933323
Coq_Structures_OrdersEx_N_as_DT_le || pred_nat || 0.0113392933323
Coq_NArith_BinNat_N_le || pred_nat || 0.0113151082002
Coq_NArith_BinNat_N_pred || bitM || 0.0112761091425
Coq_ZArith_BinInt_Z_succ || pos || 0.0112587180458
Coq_Arith_Factorial_fact || bit1 || 0.011234731247
Coq_Arith_PeanoNat_Nat_odd || num_of_nat || 0.0111868427619
Coq_Structures_OrdersEx_Nat_as_DT_odd || num_of_nat || 0.0111868427619
Coq_Structures_OrdersEx_Nat_as_OT_odd || num_of_nat || 0.0111868427619
Coq_Classes_RelationClasses_Symmetric || transitive_acyclic || 0.0111464840546
Coq_Numbers_Natural_Binary_NBinary_N_pred || bitM || 0.0111221475771
Coq_Structures_OrdersEx_N_as_OT_pred || bitM || 0.0111221475771
Coq_Structures_OrdersEx_N_as_DT_pred || bitM || 0.0111221475771
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || pred_nat || 0.0110788927281
__constr_Coq_Init_Datatypes_bool_0_1 || pos || 0.0110744667519
Coq_ZArith_BinInt_Z_lt || pred_nat || 0.0110675297744
Coq_Lists_List_rev || tl || 0.0110618058346
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || code_Pos || 0.0109374843131
Coq_Structures_OrdersEx_Z_as_OT_succ || code_Pos || 0.0109374843131
Coq_Structures_OrdersEx_Z_as_DT_succ || code_Pos || 0.0109374843131
Coq_Numbers_Natural_BigN_BigN_BigN_le || bNF_Ca1495478003natLeq || 0.0109169233381
Coq_Numbers_Integer_Binary_ZBinary_Z_ldiff || pow || 0.0109082927297
Coq_Structures_OrdersEx_Z_as_OT_ldiff || pow || 0.0109082927297
Coq_Structures_OrdersEx_Z_as_DT_ldiff || pow || 0.0109082927297
Coq_Arith_Wf_nat_gtof || measure || 0.0108478989709
Coq_Arith_Wf_nat_ltof || measure || 0.0108478989709
Coq_Numbers_Integer_Binary_ZBinary_Z_lxor || pow || 0.0108016365737
Coq_Structures_OrdersEx_Z_as_OT_lxor || pow || 0.0108016365737
Coq_Structures_OrdersEx_Z_as_DT_lxor || pow || 0.0108016365737
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || one_one || 0.0107324888494
Coq_Structures_OrdersEx_Z_as_OT_succ || one_one || 0.0107324888494
Coq_Structures_OrdersEx_Z_as_DT_succ || one_one || 0.0107324888494
Coq_Numbers_Natural_Binary_NBinary_N_add || pow || 0.0107060661142
Coq_Structures_OrdersEx_N_as_OT_add || pow || 0.0107060661142
Coq_Structures_OrdersEx_N_as_DT_add || pow || 0.0107060661142
Coq_PArith_BinPos_Pos_to_nat || product_size_unit || 0.0106457578022
Coq_ZArith_BinInt_Z_abs || suc || 0.0106409042266
Coq_Numbers_Integer_Binary_ZBinary_Z_shiftr || pow || 0.0106068387476
Coq_Numbers_Integer_Binary_ZBinary_Z_shiftl || pow || 0.0106068387476
Coq_Structures_OrdersEx_Z_as_OT_shiftr || pow || 0.0106068387476
Coq_Structures_OrdersEx_Z_as_OT_shiftl || pow || 0.0106068387476
Coq_Structures_OrdersEx_Z_as_DT_shiftr || pow || 0.0106068387476
Coq_Structures_OrdersEx_Z_as_DT_shiftl || pow || 0.0106068387476
Coq_ZArith_BinInt_Z_ldiff || pow || 0.0106068387476
Coq_Classes_RelationClasses_Asymmetric || transitive_acyclic || 0.0105575598467
Coq_Sets_Relations_1_Transitive || bNF_Ca829732799finite || 0.0105117521057
Coq_NArith_BinNat_N_add || pow || 0.0105005694961
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || im || 0.010469375648
Coq_ZArith_BinInt_Z_succ || code_Pos || 0.0104550554969
Coq_Numbers_Integer_Binary_ZBinary_Z_le || pred_nat || 0.0104225080246
Coq_Structures_OrdersEx_Z_as_OT_le || pred_nat || 0.0104225080246
Coq_Structures_OrdersEx_Z_as_DT_le || pred_nat || 0.0104225080246
Coq_Numbers_Natural_BigN_BigN_BigN_lt || pred_nat || 0.0104156050461
__constr_Coq_Init_Datatypes_bool_0_2 || ratreal || 0.0103913355086
Coq_ZArith_BinInt_Z_shiftr || pow || 0.0103525953118
Coq_ZArith_BinInt_Z_shiftl || pow || 0.0103525953118
Coq_Lists_List_NoDup_0 || null || 0.0103315457062
Coq_Arith_PeanoNat_Nat_max || pow || 0.0102907318515
Coq_Arith_PeanoNat_Nat_gcd || upt || 0.0102110694026
Coq_Structures_OrdersEx_Nat_as_DT_gcd || upt || 0.0102110694026
Coq_Structures_OrdersEx_Nat_as_OT_gcd || upt || 0.0102110694026
Coq_ZArith_BinInt_Z_lxor || pow || 0.0102034580265
Coq_Numbers_BinNums_Z_0 || int || 0.0101416293652
Coq_Numbers_Integer_Binary_ZBinary_Z_lor || pow || 0.0100676393478
Coq_Structures_OrdersEx_Z_as_OT_lor || pow || 0.0100676393478
Coq_Structures_OrdersEx_Z_as_DT_lor || pow || 0.0100676393478
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || bNF_Ca1495478003natLeq || 0.0100431032173
__constr_Coq_Init_Datatypes_bool_0_1 || ratreal || 0.0100361710267
__constr_Coq_Numbers_BinNums_N_0_1 || code_integer || 0.0100323682134
Coq_Numbers_Natural_BigN_BigN_BigN_le || less_than || 0.00998961215187
Coq_ZArith_Znumtheory_Zis_gcd_0 || ord_less || 0.00990298124531
Coq_MSets_MSetPositive_PositiveSet_eq || less_than || 0.00987397751935
Coq_ZArith_BinInt_Z_lor || pow || 0.00972242587493
Coq_ZArith_BinInt_Z_le || pred_nat || 0.00968415339755
Coq_Arith_PeanoNat_Nat_gcd || root || 0.00963612660855
Coq_Structures_OrdersEx_Nat_as_DT_gcd || root || 0.00963612660855
Coq_Structures_OrdersEx_Nat_as_OT_gcd || root || 0.00963612660855
Coq_Numbers_Integer_Binary_ZBinary_Z_sgn || sqr || 0.00948092996583
Coq_Structures_OrdersEx_Z_as_OT_sgn || sqr || 0.00948092996583
Coq_Structures_OrdersEx_Z_as_DT_sgn || sqr || 0.00948092996583
Coq_Arith_PeanoNat_Nat_sqrt_up || cnj || 0.00944681149675
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || cnj || 0.00944681149675
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || cnj || 0.00944681149675
Coq_Arith_PeanoNat_Nat_lcm || binomial || 0.00943100561933
Coq_Structures_OrdersEx_Nat_as_DT_lcm || binomial || 0.00943100561933
Coq_Structures_OrdersEx_Nat_as_OT_lcm || binomial || 0.00943100561933
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || code_integer_of_num || 0.00942344817581
Coq_Numbers_Integer_BigZ_BigZ_BigZ_two || complex || 0.00942239137359
Coq_Numbers_Natural_BigN_BigN_BigN_two || complex || 0.00941340012123
Coq_Structures_OrdersEx_Nat_as_DT_sub || pow || 0.00939992717137
Coq_Structures_OrdersEx_Nat_as_OT_sub || pow || 0.00939992717137
Coq_Arith_PeanoNat_Nat_sqrt || csqrt || 0.00939469922381
Coq_Structures_OrdersEx_Nat_as_DT_sqrt || csqrt || 0.00939469922381
Coq_Structures_OrdersEx_Nat_as_OT_sqrt || csqrt || 0.00939469922381
Coq_Arith_PeanoNat_Nat_sub || pow || 0.00939188167746
Coq_Init_Nat_add || pow || 0.0093408192187
Coq_Arith_PeanoNat_Nat_sqrt_up || csqrt || 0.00934029584939
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || csqrt || 0.00934029584939
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || csqrt || 0.00934029584939
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || sqr || 0.00928936164467
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || sqr || 0.00928936164467
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || sqr || 0.00928936164467
Coq_ZArith_BinInt_Z_sqrt_up || sqr || 0.00928936164467
Coq_Numbers_Natural_Binary_NBinary_N_succ || one_one || 0.00921163525687
Coq_Structures_OrdersEx_N_as_OT_succ || one_one || 0.00921163525687
Coq_Structures_OrdersEx_N_as_DT_succ || one_one || 0.00921163525687
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || less_than || 0.00919678169393
Coq_Arith_Wf_nat_gtof || id_on || 0.00919664993245
Coq_Arith_Wf_nat_ltof || id_on || 0.00919664993245
Coq_Lists_List_combine || bNF_Gr || 0.00919513834292
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || sqr || 0.00917603998461
Coq_Structures_OrdersEx_Z_as_OT_sqrt || sqr || 0.00917603998461
Coq_Structures_OrdersEx_Z_as_DT_sqrt || sqr || 0.00917603998461
Coq_NArith_BinNat_N_succ || one_one || 0.00917211681025
__constr_Coq_Init_Datatypes_nat_0_1 || zero_Rep || 0.00916018981113
Coq_Arith_Factorial_fact || bit0 || 0.00913930697195
Coq_Arith_PeanoNat_Nat_double || sqr || 0.00897439922365
Coq_Lists_SetoidPermutation_PermutationA_0 || min_ext || 0.00894713738235
Coq_Lists_SetoidList_eqlistA_0 || min_ext || 0.00894713738235
Coq_ZArith_BinInt_Z_sqrt || sqr || 0.00893153535165
Coq_PArith_BinPos_Pos_to_nat || nat_of_num || 0.00893011455093
Coq_Structures_OrdersEx_Nat_as_DT_pred || sqr || 0.00883352564631
Coq_Structures_OrdersEx_Nat_as_OT_pred || sqr || 0.00883352564631
Coq_ZArith_BinInt_Z_lcm || upto || 0.00882359955539
Coq_PArith_POrderedType_Positive_as_DT_pow || pow || 0.00882133052029
Coq_PArith_POrderedType_Positive_as_OT_pow || pow || 0.00882133052029
Coq_Structures_OrdersEx_Positive_as_DT_pow || pow || 0.00882133052029
Coq_Structures_OrdersEx_Positive_as_OT_pow || pow || 0.00882133052029
Coq_PArith_POrderedType_Positive_as_DT_succ || bit1 || 0.00881613482359
Coq_PArith_POrderedType_Positive_as_OT_succ || bit1 || 0.00881613482359
Coq_Structures_OrdersEx_Positive_as_DT_succ || bit1 || 0.00881613482359
Coq_Structures_OrdersEx_Positive_as_OT_succ || bit1 || 0.00881613482359
Coq_Init_Datatypes_sum_0 || product_prod || 0.00881515374087
Coq_PArith_BinPos_Pos_to_nat || pred_numeral || 0.00871806744675
Coq_Numbers_Integer_Binary_ZBinary_Z_sub || pow || 0.0086750537238
Coq_Structures_OrdersEx_Z_as_OT_sub || pow || 0.0086750537238
Coq_Structures_OrdersEx_Z_as_DT_sub || pow || 0.0086750537238
__constr_Coq_Numbers_BinNums_N_0_2 || code_integer_of_num || 0.00867460971413
Coq_Reals_Rfunctions_powerRZ || binomial || 0.0086209370912
Coq_Classes_RelationClasses_PER_0 || bNF_Wellorder_wo_rel || 0.00862000154124
Coq_Arith_PeanoNat_Nat_pred || sqr || 0.00859585851362
Coq_ZArith_Zdiv_eqm || int_ge_less_than2 || 0.00859249096599
Coq_ZArith_Zdiv_eqm || int_ge_less_than || 0.00859249096599
Coq_ZArith_BinInt_Z_sqrt_up || int_ge_less_than2 || 0.00855934260373
Coq_ZArith_BinInt_Z_sqrt_up || int_ge_less_than || 0.00855934260373
Coq_ZArith_BinInt_Z_sqrt || bitM || 0.00848942520985
Coq_Numbers_Integer_Binary_ZBinary_Z_sgn || bitM || 0.00847307227784
Coq_Structures_OrdersEx_Z_as_OT_sgn || bitM || 0.00847307227784
Coq_Structures_OrdersEx_Z_as_DT_sgn || bitM || 0.00847307227784
Coq_Lists_SetoidList_equivlistA || min_ext || 0.00839621969971
Coq_ZArith_BinInt_Z_rem || pow || 0.00835371588389
Coq_Arith_PeanoNat_Nat_sqrt || sqrt || 0.00834829987514
Coq_Structures_OrdersEx_Nat_as_DT_sqrt || sqrt || 0.00834829987514
Coq_Structures_OrdersEx_Nat_as_OT_sqrt || sqrt || 0.00834829987514
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || bitM || 0.00831909363542
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || bitM || 0.00831909363542
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || bitM || 0.00831909363542
Coq_ZArith_BinInt_Z_sqrt_up || bitM || 0.00831909363542
Coq_Arith_PeanoNat_Nat_sqrt_up || sqrt || 0.00831077523169
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || sqrt || 0.00831077523169
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || sqrt || 0.00831077523169
Coq_Arith_Wf_nat_gtof || measures || 0.00828765901388
Coq_Arith_Wf_nat_ltof || measures || 0.00828765901388
Coq_Structures_OrdersEx_Nat_as_DT_div || binomial || 0.00823644279509
Coq_Structures_OrdersEx_Nat_as_OT_div || binomial || 0.00823644279509
__constr_Coq_Numbers_BinNums_Z_0_2 || code_integer_of_num || 0.00823415459503
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || bitM || 0.00822773911466
Coq_Structures_OrdersEx_Z_as_OT_sqrt || bitM || 0.00822773911466
Coq_Structures_OrdersEx_Z_as_DT_sqrt || bitM || 0.00822773911466
Coq_Arith_PeanoNat_Nat_div || binomial || 0.00821789328161
Coq_PArith_POrderedType_Positive_as_DT_succ || bit0 || 0.00816545740726
Coq_PArith_POrderedType_Positive_as_OT_succ || bit0 || 0.00816545740726
Coq_Structures_OrdersEx_Positive_as_DT_succ || bit0 || 0.00816545740726
Coq_Structures_OrdersEx_Positive_as_OT_succ || bit0 || 0.00816545740726
Coq_Numbers_Rational_BigQ_BigQ_BigQ_lt || pred_nat || 0.00815796447765
Coq_ZArith_BinInt_Z_log2_up || int_ge_less_than2 || 0.00813406824098
Coq_ZArith_BinInt_Z_sqrt || int_ge_less_than2 || 0.00813406824098
Coq_ZArith_BinInt_Z_log2_up || int_ge_less_than || 0.00813406824098
Coq_ZArith_BinInt_Z_sqrt || int_ge_less_than || 0.00813406824098
Coq_Numbers_Integer_Binary_ZBinary_Z_abs || sqr || 0.00807896924211
Coq_Structures_OrdersEx_Z_as_OT_abs || sqr || 0.00807896924211
Coq_Structures_OrdersEx_Z_as_DT_abs || sqr || 0.00807896924211
Coq_Init_Peano_lt || wf || 0.00805132817984
Coq_ZArith_BinInt_Z_sgn || sqr || 0.00803955068952
Coq_ZArith_BinInt_Z_lt || wf || 0.00795353921507
Coq_Reals_Rpow_def_pow || binomial || 0.007915724344
Coq_ZArith_BinInt_Z_gcd || upto || 0.00785215382097
Coq_Numbers_Integer_Binary_ZBinary_Z_lcm || upto || 0.00785117656549
Coq_Structures_OrdersEx_Z_as_OT_lcm || upto || 0.00785117656549
Coq_Structures_OrdersEx_Z_as_DT_lcm || upto || 0.00785117656549
Coq_Arith_PeanoNat_Nat_sqrt || cnj || 0.00782132830191
Coq_Structures_OrdersEx_Nat_as_DT_sqrt || cnj || 0.00782132830191
Coq_Structures_OrdersEx_Nat_as_OT_sqrt || cnj || 0.00782132830191
__constr_Coq_Init_Datatypes_prod_0_1 || product_Pair || 0.00781516206688
Coq_Arith_PeanoNat_Nat_pow || binomial || 0.00779962331516
Coq_Structures_OrdersEx_Nat_as_DT_pow || binomial || 0.00779962331516
Coq_Structures_OrdersEx_Nat_as_OT_pow || binomial || 0.00779962331516
Coq_Classes_RelationClasses_StrictOrder_0 || lattic35693393ce_set || 0.00757881201009
__constr_Coq_Init_Datatypes_nat_0_2 || abs_Nat || 0.00757836465757
Coq_FSets_FMapPositive_append || pow || 0.00745126723385
__constr_Coq_Numbers_BinNums_Z_0_2 || re || 0.00743446734218
__constr_Coq_Numbers_BinNums_Z_0_2 || pos || 0.00742161712692
Coq_ZArith_BinInt_Z_sgn || bitM || 0.00741155959522
Coq_Lists_SetoidPermutation_PermutationA_0 || max_ext || 0.00739536491001
Coq_Lists_SetoidList_eqlistA_0 || max_ext || 0.00739536491001
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || sqr || 0.00734928955342
Coq_Structures_OrdersEx_Z_as_OT_opp || sqr || 0.00734928955342
Coq_Structures_OrdersEx_Z_as_DT_opp || sqr || 0.00734928955342
Coq_Numbers_Integer_Binary_ZBinary_Z_abs || bitM || 0.00733252848199
Coq_Structures_OrdersEx_Z_as_OT_abs || bitM || 0.00733252848199
Coq_Structures_OrdersEx_Z_as_DT_abs || bitM || 0.00733252848199
Coq_Classes_RelationClasses_Reflexive || reflp || 0.00732936043968
Coq_Numbers_Integer_Binary_ZBinary_Z_gcd || upto || 0.00732095534551
Coq_Structures_OrdersEx_Z_as_OT_gcd || upto || 0.00732095534551
Coq_Structures_OrdersEx_Z_as_DT_gcd || upto || 0.00732095534551
Coq_Numbers_Integer_Binary_ZBinary_Z_add || pow || 0.00729921759594
Coq_Structures_OrdersEx_Z_as_OT_add || pow || 0.00729921759594
Coq_Structures_OrdersEx_Z_as_DT_add || pow || 0.00729921759594
Coq_MSets_MSetPositive_PositiveSet_eq || bNF_Ca1495478003natLeq || 0.0072568267001
Coq_ZArith_BinInt_Z_log2 || int_ge_less_than2 || 0.00722326149844
Coq_ZArith_BinInt_Z_log2 || int_ge_less_than || 0.00722326149844
Coq_ZArith_BinInt_Z_of_N || int_ge_less_than2 || 0.00715324769294
Coq_ZArith_BinInt_Z_of_N || int_ge_less_than || 0.00715324769294
Coq_Arith_Wf_nat_inv_lt_rel || measure || 0.00714488250733
Coq_ZArith_BinInt_Z_abs || sqr || 0.00709509626226
Coq_PArith_BinPos_Pos_pow || pow || 0.00706752485317
Coq_Arith_PeanoNat_Nat_mul || binomial || 0.00706334348676
Coq_Structures_OrdersEx_Nat_as_DT_mul || binomial || 0.00706334348676
Coq_Structures_OrdersEx_Nat_as_OT_mul || binomial || 0.00706334348676
Coq_Lists_SetoidList_equivlistA || max_ext || 0.00701106692988
Coq_Arith_PeanoNat_Nat_even || rcis || 0.0070006334967
Coq_Structures_OrdersEx_Nat_as_DT_even || rcis || 0.0070006334967
Coq_Structures_OrdersEx_Nat_as_OT_even || rcis || 0.0070006334967
Coq_Numbers_Cyclic_Int31_Int31_phi || int_ge_less_than2 || 0.00698669556101
Coq_Numbers_Cyclic_Int31_Int31_phi || int_ge_less_than || 0.00698669556101
Coq_NArith_BinNat_N_shiftr_nat || pow || 0.00698187627178
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || bitM || 0.00691478388
Coq_Structures_OrdersEx_Z_as_OT_opp || bitM || 0.00691478388
Coq_Structures_OrdersEx_Z_as_DT_opp || bitM || 0.00691478388
Coq_NArith_BinNat_N_double || sqr || 0.00690153909192
Coq_NArith_BinNat_N_div2 || sqr || 0.00683244422444
Coq_Lists_List_In || member3 || 0.00682120165143
__constr_Coq_Numbers_BinNums_positive_0_1 || set || 0.00681429081053
Coq_Arith_PeanoNat_Nat_lxor || pow || 0.00679350023861
Coq_Structures_OrdersEx_Nat_as_DT_lxor || pow || 0.00679350023861
Coq_Structures_OrdersEx_Nat_as_OT_lxor || pow || 0.00679350023861
Coq_ZArith_BinInt_Z_pow_pos || pow || 0.00677470418701
Coq_Arith_Wf_nat_inv_lt_rel || id_on || 0.00676048868304
Coq_Arith_PeanoNat_Nat_odd || rcis || 0.00672434023868
Coq_Structures_OrdersEx_Nat_as_DT_odd || rcis || 0.00672434023868
Coq_Structures_OrdersEx_Nat_as_OT_odd || rcis || 0.00672434023868
Coq_Arith_PeanoNat_Nat_ldiff || pow || 0.00670914156837
Coq_Structures_OrdersEx_Nat_as_DT_ldiff || pow || 0.00670914156837
Coq_Structures_OrdersEx_Nat_as_OT_ldiff || pow || 0.00670914156837
Coq_ZArith_BinInt_Z_opp || sqr || 0.00670181402277
Coq_Arith_PeanoNat_Nat_shiftr || pow || 0.0066309200562
Coq_Arith_PeanoNat_Nat_shiftl || pow || 0.0066309200562
Coq_Structures_OrdersEx_Nat_as_DT_shiftr || pow || 0.0066309200562
Coq_Structures_OrdersEx_Nat_as_DT_shiftl || pow || 0.0066309200562
Coq_Structures_OrdersEx_Nat_as_OT_shiftr || pow || 0.0066309200562
Coq_Structures_OrdersEx_Nat_as_OT_shiftl || pow || 0.0066309200562
Coq_ZArith_BinInt_Z_abs || bitM || 0.00660109560583
Coq_Classes_RelationClasses_Symmetric || equiv_part_equivp || 0.00649085323467
Coq_ZArith_BinInt_Z_opp || bitM || 0.00647977043836
Coq_Sets_Multiset_multiset_0 || set || 0.00645368202478
Coq_Classes_RelationClasses_Transitive || equiv_part_equivp || 0.00644197249214
__constr_Coq_Numbers_BinNums_N_0_1 || nat_of_num || 0.00637107630243
Coq_Classes_RelationClasses_StrictOrder_0 || bNF_Wellorder_wo_rel || 0.00636837134294
__constr_Coq_Init_Datatypes_nat_0_1 || nat_of_num || 0.00633589974977
Coq_Arith_PeanoNat_Nat_sqrt || dup || 0.00627650870598
Coq_Structures_OrdersEx_Nat_as_DT_sqrt || dup || 0.00627650870598
Coq_Structures_OrdersEx_Nat_as_OT_sqrt || dup || 0.00627650870598
Coq_Arith_PeanoNat_Nat_sqrt_up || dup || 0.00623588878026
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || dup || 0.00623588878026
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || dup || 0.00623588878026
__constr_Coq_Numbers_BinNums_Z_0_2 || code_Pos || 0.0062085002521
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || pred_nat || 0.00618345927883
Coq_Classes_SetoidTactics_DefaultRelation_0 || transitive_acyclic || 0.00617112602532
Coq_NArith_BinNat_N_shiftl_nat || pow || 0.00615890653756
Coq_Arith_PeanoNat_Nat_lor || pow || 0.00615791206735
Coq_Structures_OrdersEx_Nat_as_DT_lor || pow || 0.00615791206735
Coq_Structures_OrdersEx_Nat_as_OT_lor || pow || 0.00615791206735
Coq_PArith_BinPos_Pos_to_nat || one_one || 0.00611622113574
Coq_Numbers_Cyclic_Int31_Int31_shiftl || sqr || 0.00610095056243
Coq_ZArith_BinInt_Z_abs || int_ge_less_than2 || 0.00607986848179
Coq_ZArith_BinInt_Z_abs || int_ge_less_than || 0.00607986848179
Coq_MSets_MSetPositive_PositiveSet_eq || pred_nat || 0.00607400007641
Coq_PArith_BinPos_Pos_to_nat || zero_zero || 0.00605792605859
Coq_Classes_RelationClasses_Reflexive || equiv_part_equivp || 0.00592814353146
Coq_Numbers_Integer_Binary_ZBinary_Z_even || numeral_numeral || 0.00587542236959
Coq_Structures_OrdersEx_Z_as_OT_even || numeral_numeral || 0.00587542236959
Coq_Structures_OrdersEx_Z_as_DT_even || numeral_numeral || 0.00587542236959
Coq_Numbers_Cyclic_Int31_Cyclic31_nshiftl || pow || 0.00584576174921
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || numeral_numeral || 0.00581213783138
Coq_Structures_OrdersEx_Z_as_OT_odd || numeral_numeral || 0.00581213783138
Coq_Structures_OrdersEx_Z_as_DT_odd || numeral_numeral || 0.00581213783138
Coq_ZArith_BinInt_Z_succ || dup || 0.00578527549503
Coq_Numbers_Rational_BigQ_BigQ_BigQ_eq || less_than || 0.00575487336408
Coq_ZArith_BinInt_Z_even || numeral_numeral || 0.00570386782084
Coq_Arith_PeanoNat_Nat_sqrt || arcsin || 0.00568754995845
Coq_Structures_OrdersEx_Nat_as_DT_sqrt || arcsin || 0.00568754995845
Coq_Structures_OrdersEx_Nat_as_OT_sqrt || arcsin || 0.00568754995845
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || int_ge_less_than2 || 0.00568561076782
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || int_ge_less_than2 || 0.00568561076782
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || int_ge_less_than2 || 0.00568561076782
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || int_ge_less_than || 0.00568561076782
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || int_ge_less_than || 0.00568561076782
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || int_ge_less_than || 0.00568561076782
Coq_Arith_Wf_nat_inv_lt_rel || measures || 0.00567553366226
Coq_Arith_PeanoNat_Nat_sqrt_up || arcsin || 0.00565679690814
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || arcsin || 0.00565679690814
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || arcsin || 0.00565679690814
__constr_Coq_Numbers_BinNums_positive_0_2 || set || 0.00562251970254
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || int_ge_less_than2 || 0.00559531030211
Coq_Structures_OrdersEx_Z_as_OT_sqrt || int_ge_less_than2 || 0.00559531030211
Coq_Structures_OrdersEx_Z_as_DT_sqrt || int_ge_less_than2 || 0.00559531030211
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || int_ge_less_than || 0.00559531030211
Coq_Structures_OrdersEx_Z_as_OT_sqrt || int_ge_less_than || 0.00559531030211
Coq_Structures_OrdersEx_Z_as_DT_sqrt || int_ge_less_than || 0.00559531030211
Coq_Arith_PeanoNat_Nat_gcd || pow || 0.0055915653525
Coq_Structures_OrdersEx_Nat_as_DT_gcd || pow || 0.0055915653525
Coq_Structures_OrdersEx_Nat_as_OT_gcd || pow || 0.0055915653525
Coq_ZArith_BinInt_Z_odd || numeral_numeral || 0.00556380988146
Coq_Arith_PeanoNat_Nat_sqrt || sqr || 0.00555911409752
Coq_Structures_OrdersEx_Nat_as_DT_sqrt || sqr || 0.00555911409752
Coq_Structures_OrdersEx_Nat_as_OT_sqrt || sqr || 0.00555911409752
Coq_Sets_Integers_Integers_0 || code_pcr_integer code_cr_integer || 0.00555215073433
Coq_Arith_PeanoNat_Nat_sqrt_up || sqr || 0.00552285659452
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || sqr || 0.00552285659452
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || sqr || 0.00552285659452
Coq_Classes_RelationClasses_Symmetric || reflp || 0.00550593617909
Coq_ZArith_BinInt_Z_succ || code_dup || 0.00549582940372
Coq_PArith_BinPos_Pos_to_nat || code_integer_of_num || 0.00548719595624
Coq_Classes_RelationClasses_Transitive || reflp || 0.00547223315308
Coq_Structures_OrdersEx_Nat_as_DT_max || pow || 0.00545863079427
Coq_Structures_OrdersEx_Nat_as_OT_max || pow || 0.00545863079427
Coq_Numbers_Integer_Binary_ZBinary_Z_log2_up || int_ge_less_than2 || 0.00543769632925
Coq_Structures_OrdersEx_Z_as_OT_log2_up || int_ge_less_than2 || 0.00543769632925
Coq_Structures_OrdersEx_Z_as_DT_log2_up || int_ge_less_than2 || 0.00543769632925
Coq_Numbers_Integer_Binary_ZBinary_Z_log2_up || int_ge_less_than || 0.00543769632925
Coq_Structures_OrdersEx_Z_as_OT_log2_up || int_ge_less_than || 0.00543769632925
Coq_Structures_OrdersEx_Z_as_DT_log2_up || int_ge_less_than || 0.00543769632925
Coq_Init_Nat_sub || pow || 0.00541900435782
Coq_ZArith_BinInt_Z_to_nat || numeral_numeral || 0.00540601114723
__constr_Coq_Numbers_BinNums_positive_0_1 || one_one || 0.0053303750475
Coq_Classes_RelationClasses_Irreflexive || abel_semigroup || 0.00531369075458
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || zero_zero || 0.00531015634346
__constr_Coq_Numbers_BinNums_N_0_1 || real || 0.0052720771844
Coq_ZArith_BinInt_Z_abs_N || numeral_numeral || 0.00526804159971
Coq_Arith_PeanoNat_Nat_sqrt || arctan || 0.005251582363
Coq_Structures_OrdersEx_Nat_as_DT_sqrt || arctan || 0.005251582363
Coq_Structures_OrdersEx_Nat_as_OT_sqrt || arctan || 0.005251582363
Coq_PArith_POrderedType_Positive_as_DT_mul || pow || 0.0052508970145
Coq_PArith_POrderedType_Positive_as_OT_mul || pow || 0.0052508970145
Coq_Structures_OrdersEx_Positive_as_DT_mul || pow || 0.0052508970145
Coq_Structures_OrdersEx_Positive_as_OT_mul || pow || 0.0052508970145
Coq_Arith_PeanoNat_Nat_sqrt_up || arctan || 0.00522532038825
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || arctan || 0.00522532038825
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || arctan || 0.00522532038825
__constr_Coq_Init_Datatypes_list_0_2 || append || 0.00521776034927
Coq_ZArith_BinInt_Z_abs_nat || numeral_numeral || 0.00521157140355
Coq_Numbers_Natural_BigN_BigN_BigN_le || pred_nat || 0.00520876967354
Coq_Relations_Relation_Operators_clos_trans_0 || transitive_trancl || 0.00517819567581
__constr_Coq_Numbers_BinNums_Z_0_1 || nat_of_num || 0.0051764410672
Coq_PArith_POrderedType_Positive_as_DT_max || pow || 0.00513391648199
Coq_PArith_POrderedType_Positive_as_OT_max || pow || 0.00513391648199
Coq_Structures_OrdersEx_Positive_as_DT_max || pow || 0.00513391648199
Coq_Structures_OrdersEx_Positive_as_OT_max || pow || 0.00513391648199
Coq_ZArith_BinInt_Z_to_N || numeral_numeral || 0.00513228782182
Coq_Lists_List_In || pred_list || 0.00512236578407
Coq_ZArith_Zlogarithm_log_sup || finite_psubset || 0.00510071162189
Coq_PArith_BinPos_Pos_mul || pow || 0.00509192326325
Coq_Arith_PeanoNat_Nat_sqrt || code_dup || 0.00507133097354
Coq_Structures_OrdersEx_Nat_as_DT_sqrt || code_dup || 0.00507133097354
Coq_Structures_OrdersEx_Nat_as_OT_sqrt || code_dup || 0.00507133097354
Coq_PArith_BinPos_Pos_max || pow || 0.00505226797741
Coq_PArith_POrderedType_Positive_as_DT_lt || wf || 0.00504236779515
Coq_PArith_POrderedType_Positive_as_OT_lt || wf || 0.00504236779515
Coq_Structures_OrdersEx_Positive_as_DT_lt || wf || 0.00504236779515
Coq_Structures_OrdersEx_Positive_as_OT_lt || wf || 0.00504236779515
Coq_Arith_PeanoNat_Nat_sqrt_up || code_dup || 0.00504023207168
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || code_dup || 0.00504023207168
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || code_dup || 0.00504023207168
Coq_Lists_List_combine || product_Sigma || 0.00501172848338
Coq_Arith_PeanoNat_Nat_sqrt || bitM || 0.00497302032205
Coq_Structures_OrdersEx_Nat_as_DT_sqrt || bitM || 0.00497302032205
Coq_Structures_OrdersEx_Nat_as_OT_sqrt || bitM || 0.00497302032205
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || zero_zero || 0.00494903891082
Coq_Arith_PeanoNat_Nat_sqrt_up || bitM || 0.00494386649337
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || bitM || 0.00494386649337
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || bitM || 0.00494386649337
Coq_PArith_BinPos_Pos_lt || wf || 0.00492714865507
Coq_Classes_RelationClasses_RewriteRelation_0 || transitive_acyclic || 0.004914389026
Coq_Numbers_Natural_Binary_NBinary_N_le || distinct || 0.00488313546328
Coq_Structures_OrdersEx_N_as_OT_le || distinct || 0.00488313546328
Coq_Structures_OrdersEx_N_as_DT_le || distinct || 0.00488313546328
Coq_NArith_BinNat_N_le || distinct || 0.00487425935772
Coq_Relations_Relation_Operators_symprod_0 || bNF_Cardinal_cprod || 0.00487278465716
Coq_Numbers_Integer_Binary_ZBinary_Z_log2 || int_ge_less_than2 || 0.00486311129348
Coq_Structures_OrdersEx_Z_as_OT_log2 || int_ge_less_than2 || 0.00486311129348
Coq_Structures_OrdersEx_Z_as_DT_log2 || int_ge_less_than2 || 0.00486311129348
Coq_Numbers_Integer_Binary_ZBinary_Z_log2 || int_ge_less_than || 0.00486311129348
Coq_Structures_OrdersEx_Z_as_OT_log2 || int_ge_less_than || 0.00486311129348
Coq_Structures_OrdersEx_Z_as_DT_log2 || int_ge_less_than || 0.00486311129348
__constr_Coq_Numbers_BinNums_positive_0_2 || sqr || 0.00483670396947
Coq_Sets_Integers_nat_po || code_integer || 0.00479559332957
Coq_Numbers_Cyclic_Int31_Cyclic31_nshiftr || pow || 0.00478006982369
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || pred_nat || 0.00477164401858
Coq_Numbers_Integer_Binary_ZBinary_Z_abs || int_ge_less_than2 || 0.00474921790707
Coq_Structures_OrdersEx_Z_as_OT_abs || int_ge_less_than2 || 0.00474921790707
Coq_Structures_OrdersEx_Z_as_DT_abs || int_ge_less_than2 || 0.00474921790707
Coq_Numbers_Integer_Binary_ZBinary_Z_abs || int_ge_less_than || 0.00474921790707
Coq_Structures_OrdersEx_Z_as_OT_abs || int_ge_less_than || 0.00474921790707
Coq_Structures_OrdersEx_Z_as_DT_abs || int_ge_less_than || 0.00474921790707
Coq_Arith_PeanoNat_Nat_pred || bitM || 0.00471941114217
Coq_PArith_POrderedType_Positive_as_DT_succ || int_ge_less_than2 || 0.00471636743545
Coq_PArith_POrderedType_Positive_as_OT_succ || int_ge_less_than2 || 0.00471636743545
Coq_Structures_OrdersEx_Positive_as_DT_succ || int_ge_less_than2 || 0.00471636743545
Coq_Structures_OrdersEx_Positive_as_OT_succ || int_ge_less_than2 || 0.00471636743545
Coq_PArith_POrderedType_Positive_as_DT_succ || int_ge_less_than || 0.00471636743545
Coq_PArith_POrderedType_Positive_as_OT_succ || int_ge_less_than || 0.00471636743545
Coq_Structures_OrdersEx_Positive_as_DT_succ || int_ge_less_than || 0.00471636743545
Coq_Structures_OrdersEx_Positive_as_OT_succ || int_ge_less_than || 0.00471636743545
Coq_Structures_OrdersEx_Nat_as_DT_pred || bitM || 0.00465556063802
Coq_Structures_OrdersEx_Nat_as_OT_pred || bitM || 0.00465556063802
Coq_Numbers_Natural_Binary_NBinary_N_le || linorder_sorted || 0.00461015828178
Coq_Structures_OrdersEx_N_as_OT_le || linorder_sorted || 0.00461015828178
Coq_Structures_OrdersEx_N_as_DT_le || linorder_sorted || 0.00461015828178
Coq_NArith_BinNat_N_le || linorder_sorted || 0.00460251459214
Coq_Numbers_Rational_BigQ_BigQ_BigQ_eq || bNF_Ca1495478003natLeq || 0.00451414727967
Coq_Structures_OrdersEx_Nat_as_DT_add || pow || 0.00447226525458
Coq_Structures_OrdersEx_Nat_as_OT_add || pow || 0.00447226525458
Coq_Arith_PeanoNat_Nat_add || pow || 0.0044552282456
Coq_PArith_BinPos_Pos_succ || int_ge_less_than2 || 0.0044548835314
Coq_PArith_BinPos_Pos_succ || int_ge_less_than || 0.0044548835314
__constr_Coq_Numbers_BinNums_N_0_2 || re || 0.00438405256488
Coq_Arith_Wf_nat_gtof || transitive_trancl || 0.00435851027418
Coq_Arith_Wf_nat_ltof || transitive_trancl || 0.00435851027418
Coq_Arith_PeanoNat_Nat_even || numeral_numeral || 0.00433118095973
Coq_Structures_OrdersEx_Nat_as_DT_even || numeral_numeral || 0.00433118095973
Coq_Structures_OrdersEx_Nat_as_OT_even || numeral_numeral || 0.00433118095973
Coq_Classes_RelationClasses_Transitive || abel_s1917375468axioms || 0.0043195556568
Coq_Numbers_Cyclic_Int31_Int31_shiftr || sqr || 0.0043153523472
Coq_Arith_PeanoNat_Nat_odd || numeral_numeral || 0.00426729209012
Coq_Structures_OrdersEx_Nat_as_DT_odd || numeral_numeral || 0.00426729209012
Coq_Structures_OrdersEx_Nat_as_OT_odd || numeral_numeral || 0.00426729209012
Coq_ZArith_Int_Z_as_Int__1 || code_integer || 0.00425674054021
Coq_Setoids_Setoid_Setoid_Theory || wf || 0.00418001998629
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || code_pcr_natural code_cr_natural || 0.00408051677798
Coq_Arith_Wf_nat_gtof || transitive_rtrancl || 0.00403203249397
Coq_Arith_Wf_nat_ltof || transitive_rtrancl || 0.00403203249397
Coq_Classes_RelationClasses_Equivalence_0 || reflp || 0.00397622992297
__constr_Coq_Init_Datatypes_nat_0_2 || pos || 0.00394093193392
Coq_Numbers_Natural_Binary_NBinary_N_even || numeral_numeral || 0.00390613091934
Coq_NArith_BinNat_N_even || numeral_numeral || 0.00390613091934
Coq_Structures_OrdersEx_N_as_OT_even || numeral_numeral || 0.00390613091934
Coq_Structures_OrdersEx_N_as_DT_even || numeral_numeral || 0.00390613091934
Coq_Numbers_Natural_Binary_NBinary_N_odd || numeral_numeral || 0.00386723533493
Coq_Structures_OrdersEx_N_as_OT_odd || numeral_numeral || 0.00386723533493
Coq_Structures_OrdersEx_N_as_DT_odd || numeral_numeral || 0.00386723533493
Coq_Numbers_Natural_Binary_NBinary_N_succ || suc_Rep || 0.00386520329695
Coq_Structures_OrdersEx_N_as_OT_succ || suc_Rep || 0.00386520329695
Coq_Structures_OrdersEx_N_as_DT_succ || suc_Rep || 0.00386520329695
Coq_Classes_RelationClasses_PER_0 || transitive_acyclic || 0.00384210680507
Coq_NArith_BinNat_N_succ || suc_Rep || 0.00383428667171
Coq_ZArith_BinInt_Z_sqrt_up || finite_psubset || 0.00380845656369
Coq_Numbers_Cyclic_DoubleCyclic_DoubleType_base || int_ge_less_than2 || 0.00378404281075
Coq_Numbers_Cyclic_DoubleCyclic_DoubleType_base || int_ge_less_than || 0.00378404281075
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || code_integer || 0.00378062417541
Coq_PArith_BinPos_Pos_to_nat || re || 0.00373050000317
Coq_NArith_BinNat_N_odd || numeral_numeral || 0.00367570551007
Coq_ZArith_BinInt_Z_log2_up || finite_psubset || 0.00363227517293
Coq_Classes_RelationClasses_Irreflexive || antisym || 0.00350751527809
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || real_V1127708846m_norm || 0.00348925320399
Coq_Structures_OrdersEx_Z_as_OT_lt || real_V1127708846m_norm || 0.00348925320399
Coq_Structures_OrdersEx_Z_as_DT_lt || real_V1127708846m_norm || 0.00348925320399
Coq_PArith_BinPos_Pos_succ || dup || 0.00348158617493
Coq_Arith_Wf_nat_inv_lt_rel || transitive_trancl || 0.00345130249569
__constr_Coq_Init_Datatypes_nat_0_2 || int_ge_less_than2 || 0.00345064062598
__constr_Coq_Init_Datatypes_nat_0_2 || int_ge_less_than || 0.00345064062598
Coq_NArith_Ndist_ni_min || root || 0.00338473285618
Coq_Numbers_Rational_BigQ_BigQ_BigQ_eq || pred_nat || 0.00335871618278
Coq_Numbers_Natural_Binary_NBinary_N_div2 || sqr || 0.0033265012724
Coq_Structures_OrdersEx_N_as_OT_div2 || sqr || 0.0033265012724
Coq_Structures_OrdersEx_N_as_DT_div2 || sqr || 0.0033265012724
Coq_Reals_Raxioms_IZR || code_natural_of_nat || 0.00330443017792
Coq_PArith_BinPos_Pos_succ || code_dup || 0.00330156868652
__constr_Coq_Numbers_BinNums_Z_0_3 || pos || 0.00328714794
Coq_ZArith_BinInt_Z_lt || real_V1127708846m_norm || 0.00327779287609
Coq_ZArith_BinInt_Z_of_nat || numeral_numeral || 0.00327591070854
Coq_Setoids_Setoid_Setoid_Theory || abel_semigroup || 0.00326813372383
Coq_Arith_PeanoNat_Nat_gcd || upto || 0.00325443068412
Coq_Structures_OrdersEx_Nat_as_DT_gcd || upto || 0.00325443068412
Coq_Structures_OrdersEx_Nat_as_OT_gcd || upto || 0.00325443068412
Coq_Arith_Wf_nat_inv_lt_rel || transitive_rtrancl || 0.00323992554446
Coq_Numbers_Natural_Binary_NBinary_N_double || sqr || 0.00323721447197
Coq_Structures_OrdersEx_N_as_OT_double || sqr || 0.00323721447197
Coq_Structures_OrdersEx_N_as_DT_double || sqr || 0.00323721447197
Coq_QArith_QArith_base_Q_0 || code_natural || 0.00323195718037
__constr_Coq_Numbers_BinNums_N_0_1 || pos || 0.00320837409611
__constr_Coq_Init_Datatypes_nat_0_1 || pos || 0.00319218860286
__constr_Coq_Init_Datatypes_bool_0_2 || code_integer_of_num || 0.00317442658786
Coq_ZArith_Int_Z_as_Int__1 || int || 0.00315227132879
__constr_Coq_Init_Datatypes_nat_0_2 || code_Pos || 0.00314917638658
Coq_Relations_Relation_Operators_symprod_0 || product || 0.00307524097854
__constr_Coq_Init_Datatypes_bool_0_1 || code_integer_of_num || 0.00307135410545
Coq_Classes_RelationClasses_Symmetric || semigroup || 0.00303681207357
Coq_ZArith_BinInt_Z_of_N || numeral_numeral || 0.00302013106657
Coq_Relations_Relation_Operators_le_AsB_0 || bNF_Cardinal_cprod || 0.00301953213775
Coq_NArith_BinNat_N_to_nat || inc || 0.00299349781114
Coq_NArith_BinNat_N_of_nat || bitM || 0.00299065552941
Coq_Init_Peano_lt || real_V1127708846m_norm || 0.00298654512395
Coq_NArith_BinNat_N_succ || dup || 0.00298248726537
Coq_PArith_BinPos_Pos_of_succ_nat || bit1 || 0.00296913132558
__constr_Coq_Numbers_BinNums_N_0_2 || inc || 0.00296636415193
Coq_PArith_BinPos_Pos_to_nat || im || 0.00296295447313
Coq_Classes_RelationClasses_Symmetric || abel_s1917375468axioms || 0.00295719422964
Coq_Sets_Ensembles_Included || finite_psubset || 0.00289785800612
Coq_Classes_RelationClasses_Equivalence_0 || equiv_equivp || 0.00287484149198
Coq_NArith_BinNat_N_succ || code_dup || 0.00284916678886
Coq_Reals_Rdefinitions_Ropp || code_Suc || 0.00283132662528
Coq_PArith_BinPos_Pos_to_nat || inc || 0.00282849197107
Coq_PArith_POrderedType_Positive_as_DT_of_nat || inc || 0.00281042036581
Coq_PArith_POrderedType_Positive_as_OT_of_nat || inc || 0.00281042036581
Coq_Structures_OrdersEx_Positive_as_DT_of_nat || inc || 0.00281042036581
Coq_Structures_OrdersEx_Positive_as_OT_of_nat || inc || 0.00281042036581
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || int || 0.00279603023583
Coq_Arith_Factorial_fact || int_ge_less_than2 || 0.00272048447153
Coq_Arith_Factorial_fact || int_ge_less_than || 0.00272048447153
Coq_Init_Datatypes_nat_0 || int || 0.00268842890802
Coq_Init_Datatypes_length || distinct || 0.00268663581948
Coq_Init_Datatypes_xorb || pow || 0.00267057152076
__constr_Coq_Init_Datatypes_bool_0_2 || code_Pos || 0.00265297865896
Coq_ZArith_BinInt_Z_max || remdups || 0.002642133483
Coq_Init_Datatypes_orb || pow || 0.00264125094668
Coq_Classes_RelationClasses_Reflexive || abel_s1917375468axioms || 0.00261653083566
Coq_NArith_BinNat_N_of_nat || inc || 0.0025939452583
__constr_Coq_Init_Datatypes_bool_0_1 || code_Pos || 0.00258219984723
Coq_Numbers_Natural_BigN_BigN_BigN_level || inc || 0.00257037323564
Coq_Arith_PeanoNat_Nat_sqrt_up || int_ge_less_than2 || 0.00251554563022
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || int_ge_less_than2 || 0.00251554563022
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || int_ge_less_than2 || 0.00251554563022
Coq_Arith_PeanoNat_Nat_sqrt_up || int_ge_less_than || 0.00251554563022
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || int_ge_less_than || 0.00251554563022
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || int_ge_less_than || 0.00251554563022
Coq_Numbers_Natural_BigN_BigN_BigN_one || code_integer || 0.00248857733913
Coq_Init_Datatypes_andb || pow || 0.00247721273019
__constr_Coq_Numbers_BinNums_Z_0_3 || code_Pos || 0.00245692190704
Coq_ZArith_BinInt_Z_succ || bitM || 0.00245471425433
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || code_integer || 0.00244643400271
Coq_Numbers_Integer_Binary_ZBinary_Z_le || real_V1127708846m_norm || 0.00242468700753
Coq_Structures_OrdersEx_Z_as_OT_le || real_V1127708846m_norm || 0.00242468700753
Coq_Structures_OrdersEx_Z_as_DT_le || real_V1127708846m_norm || 0.00242468700753
Coq_Init_Datatypes_length || set2 || 0.00242103393477
Coq_Arith_PeanoNat_Nat_log2_up || int_ge_less_than2 || 0.00240551366653
Coq_Structures_OrdersEx_Nat_as_DT_log2_up || int_ge_less_than2 || 0.00240551366653
Coq_Structures_OrdersEx_Nat_as_OT_log2_up || int_ge_less_than2 || 0.00240551366653
Coq_Arith_PeanoNat_Nat_log2_up || int_ge_less_than || 0.00240551366653
Coq_Structures_OrdersEx_Nat_as_DT_log2_up || int_ge_less_than || 0.00240551366653
Coq_Structures_OrdersEx_Nat_as_OT_log2_up || int_ge_less_than || 0.00240551366653
Coq_Numbers_Integer_Binary_ZBinary_Z_div2 || cnj || 0.00240395354112
Coq_Structures_OrdersEx_Z_as_OT_div2 || cnj || 0.00240395354112
Coq_Structures_OrdersEx_Z_as_DT_div2 || cnj || 0.00240395354112
Coq_ZArith_BinInt_Z_max || measure || 0.00236955375848
Coq_Classes_RelationClasses_Transitive || semigroup || 0.00234134250503
Coq_Classes_RelationClasses_Reflexive || semigroup || 0.0023339850349
Coq_ZArith_BinInt_Z_le || real_V1127708846m_norm || 0.00229273416679
Coq_Structures_OrdersEx_Nat_as_DT_Odd || inc || 0.00229230387427
Coq_Structures_OrdersEx_Nat_as_OT_Odd || inc || 0.00229230387427
__constr_Coq_Init_Datatypes_bool_0_2 || code_integer_of_nat || 0.0022690663353
Coq_NArith_BinNat_N_to_nat || bitM || 0.00225758409871
__constr_Coq_NArith_Ndist_natinf_0_2 || zero_zero || 0.00223093628999
Coq_Arith_PeanoNat_Nat_Odd || inc || 0.00222728593446
__constr_Coq_Init_Datatypes_bool_0_1 || code_integer_of_nat || 0.00218828739911
Coq_Arith_PeanoNat_Nat_max || remdups || 0.00216502884577
__constr_Coq_Numbers_BinNums_N_0_1 || int || 0.00215674916398
Coq_PArith_BinPos_Pos_of_succ_nat || bitM || 0.00215170600871
Coq_Arith_PeanoNat_Nat_log2 || int_ge_less_than2 || 0.00214289435484
Coq_Structures_OrdersEx_Nat_as_DT_log2 || int_ge_less_than2 || 0.00214289435484
Coq_Structures_OrdersEx_Nat_as_OT_log2 || int_ge_less_than2 || 0.00214289435484
Coq_Arith_PeanoNat_Nat_log2 || int_ge_less_than || 0.00214289435484
Coq_Structures_OrdersEx_Nat_as_DT_log2 || int_ge_less_than || 0.00214289435484
Coq_Structures_OrdersEx_Nat_as_OT_log2 || int_ge_less_than || 0.00214289435484
__constr_Coq_Numbers_BinNums_N_0_1 || ratreal || 0.00214060606035
__constr_Coq_Init_Datatypes_nat_0_1 || ratreal || 0.00212815074811
Coq_ZArith_BinInt_Z_max || measures || 0.002101728019
Coq_ZArith_BinInt_Z_succ || bit1 || 0.00209439623194
Coq_Structures_OrdersEx_Nat_as_DT_Even || inc || 0.00208874894967
Coq_Structures_OrdersEx_Nat_as_OT_Even || inc || 0.00208874894967
Coq_Numbers_Integer_BigZ_BigZ_BigZ_opp || inc || 0.00208371698143
__constr_Coq_Numbers_BinNums_Z_0_2 || finite_psubset || 0.00206677549452
Coq_Arith_PeanoNat_Nat_Even || inc || 0.00205257635513
Coq_Sets_Ensembles_Ensemble || set || 0.00203600874325
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || numeral_numeral || 0.00201950984872
Coq_Numbers_Natural_BigN_BigN_BigN_even || numeral_numeral || 0.00201734245151
Coq_Numbers_Natural_BigN_BigN_BigN_odd || numeral_numeral || 0.00201688158598
Coq_ZArith_BinInt_Z_div2 || cnj || 0.00201150742272
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || numeral_numeral || 0.00200979028757
Coq_PArith_BinPos_Pos_of_nat || inc || 0.00200742232091
Coq_ZArith_BinInt_Z_succ || bit0 || 0.00197799011514
Coq_ZArith_Zcomplements_floor || set || 0.0019627018218
Coq_Numbers_Natural_BigN_BigN_BigN_one || int || 0.00195034911299
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || int || 0.00193298143714
Coq_Init_Datatypes_snd || product_snd || 0.00193067974987
__constr_Coq_Init_Datatypes_nat_0_2 || dup || 0.00191290452297
Coq_Numbers_Integer_Binary_ZBinary_Z_sgn || cnj || 0.001911366822
Coq_Structures_OrdersEx_Z_as_OT_sgn || cnj || 0.001911366822
Coq_Structures_OrdersEx_Z_as_DT_sgn || cnj || 0.001911366822
Coq_PArith_BinPos_Pos_to_nat || int_ge_less_than2 || 0.00190525181978
Coq_PArith_BinPos_Pos_to_nat || int_ge_less_than || 0.00190525181978
Coq_Init_Wf_well_founded || distinct || 0.00188083421776
Coq_Init_Datatypes_fst || product_fst || 0.0018710315363
Coq_Arith_PeanoNat_Nat_even || inc || 0.00186207300656
Coq_Structures_OrdersEx_Nat_as_DT_even || inc || 0.00186207300656
Coq_Structures_OrdersEx_Nat_as_OT_even || inc || 0.00186207300656
Coq_Classes_RelationClasses_Symmetric || distinct || 0.0018548759296
__constr_Coq_Init_Datatypes_bool_0_2 || code_integer_of_int || 0.00183940829509
__constr_Coq_Init_Datatypes_nat_0_2 || code_dup || 0.00183680387445
Coq_PArith_BinPos_Pos_of_succ_nat || pos || 0.00183063174201
Coq_Arith_PeanoNat_Nat_odd || inc || 0.00180378969509
Coq_Structures_OrdersEx_Nat_as_DT_odd || inc || 0.00180378969509
Coq_Structures_OrdersEx_Nat_as_OT_odd || inc || 0.00180378969509
Coq_PArith_BinPos_Pos_of_succ_nat || neg || 0.00179934267003
Coq_PArith_POrderedType_Positive_as_DT_of_succ_nat || bit1 || 0.0017922080923
Coq_PArith_POrderedType_Positive_as_OT_of_succ_nat || bit1 || 0.0017922080923
Coq_Structures_OrdersEx_Positive_as_DT_of_succ_nat || bit1 || 0.0017922080923
Coq_Structures_OrdersEx_Positive_as_OT_of_succ_nat || bit1 || 0.0017922080923
__constr_Coq_Init_Datatypes_bool_0_1 || code_integer_of_int || 0.00178618455731
Coq_PArith_BinPos_Pos_of_succ_nat || code_Neg || 0.00178512922564
Coq_QArith_QArith_base_Qopp || code_Suc || 0.00177844462133
Coq_PArith_BinPos_Pos_of_succ_nat || inc || 0.00176771347711
Coq_ZArith_Zlogarithm_log_inf || set || 0.00175262272234
Coq_PArith_BinPos_Pos_of_succ_nat || code_Pos || 0.00172773384092
Coq_Classes_RelationClasses_Reflexive || distinct || 0.00172001080299
Coq_Classes_RelationClasses_Transitive || distinct || 0.00169260259968
Coq_NArith_BinNat_N_of_nat || pos || 0.00168834030348
Coq_ZArith_BinInt_Z_sgn || cnj || 0.00168465792681
Coq_NArith_BinNat_N_of_nat || neg || 0.00168109771561
Coq_NArith_BinNat_N_of_nat || code_Neg || 0.0016684994028
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || code_nat_of_natural || 0.00166381748151
Coq_Numbers_Natural_BigN_BigN_BigN_level || bitM || 0.00166271043212
Coq_Sets_Ensembles_Strict_Included || finite_psubset || 0.00166156365858
Coq_QArith_QArith_base_inject_Z || code_natural_of_nat || 0.00165876534368
Coq_Lists_SetoidList_eqlistA_0 || semilattice_order || 0.00165701773989
Coq_Classes_RelationClasses_RewriteRelation_0 || trans || 0.00164499151153
Coq_Numbers_Integer_Binary_ZBinary_Z_even || field_char_0_of_rat || 0.0016238816559
Coq_Structures_OrdersEx_Z_as_OT_even || field_char_0_of_rat || 0.0016238816559
Coq_Structures_OrdersEx_Z_as_DT_even || field_char_0_of_rat || 0.0016238816559
Coq_NArith_BinNat_N_of_nat || code_Pos || 0.00161821248462
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || field_char_0_of_rat || 0.00159783015739
Coq_Structures_OrdersEx_Z_as_OT_odd || field_char_0_of_rat || 0.00159783015739
Coq_Structures_OrdersEx_Z_as_DT_odd || field_char_0_of_rat || 0.00159783015739
__constr_Coq_Numbers_BinNums_N_0_1 || complex || 0.00158061996793
Coq_Numbers_Natural_BigN_BigN_BigN_double_size || bit1 || 0.00157559372924
Coq_ZArith_BinInt_Z_sqrt || set || 0.00157432902556
Coq_PArith_BinPos_Pos_succ || bitM || 0.00156951577488
Coq_NArith_BinNat_N_Odd || inc || 0.00156157546972
Coq_ZArith_BinInt_Z_even || field_char_0_of_rat || 0.00155856158234
Coq_Structures_OrdersEx_Nat_as_DT_Odd || bit1 || 0.00155554339791
Coq_Structures_OrdersEx_Nat_as_OT_Odd || bit1 || 0.00155554339791
Coq_Arith_PeanoNat_Nat_Odd || bit1 || 0.00152466663088
Coq_NArith_BinNat_N_of_nat || bit1 || 0.00152097948053
Coq_PArith_BinPos_Pos_pred_N || pos || 0.00151651104651
Coq_Classes_SetoidTactics_DefaultRelation_0 || abel_s1917375468axioms || 0.00151430902036
Coq_ZArith_BinInt_Z_to_nat || field_char_0_of_rat || 0.0015119143084
Coq_Sets_Relations_2_Rstar_0 || id_on || 0.0015058318972
Coq_ZArith_BinInt_Z_odd || field_char_0_of_rat || 0.00150472282415
Coq_Arith_Between_in_int || semilattice_neutr || 0.00150455620182
Coq_PArith_BinPos_Pos_sqrt || bit0 || 0.00150252556061
Coq_ZArith_BinInt_Z_log2 || set || 0.00149795545375
Coq_Structures_OrdersEx_Nat_as_DT_Even || bit1 || 0.00146017276279
Coq_Structures_OrdersEx_Nat_as_OT_Even || bit1 || 0.00146017276279
Coq_ZArith_BinInt_Z_abs_N || field_char_0_of_rat || 0.00145868034122
Coq_Arith_PeanoNat_Nat_Even || bit1 || 0.00144174233356
Coq_Arith_PeanoNat_Nat_even || field_char_0_of_rat || 0.00144126253329
Coq_Structures_OrdersEx_Nat_as_DT_even || field_char_0_of_rat || 0.00144126253329
Coq_Structures_OrdersEx_Nat_as_OT_even || field_char_0_of_rat || 0.00144126253329
Coq_Classes_RelationClasses_Equivalence_0 || distinct || 0.00143867844098
Coq_ZArith_BinInt_Z_abs_nat || field_char_0_of_rat || 0.0014372214047
Coq_Structures_OrdersEx_Nat_as_DT_max || remdups || 0.00143615203501
Coq_Structures_OrdersEx_Nat_as_OT_max || remdups || 0.00143615203501
Coq_ZArith_BinInt_Z_of_nat || bitM || 0.00142600963368
Coq_NArith_BinNat_N_Even || inc || 0.001422821176
Coq_Arith_PeanoNat_Nat_odd || field_char_0_of_rat || 0.0014086432676
Coq_Structures_OrdersEx_Nat_as_DT_odd || field_char_0_of_rat || 0.0014086432676
Coq_Structures_OrdersEx_Nat_as_OT_odd || field_char_0_of_rat || 0.0014086432676
Coq_ZArith_BinInt_Z_to_N || field_char_0_of_rat || 0.00140732930996
Coq_Numbers_Integer_BigZ_BigZ_BigZ_opp || code_Suc || 0.00138020774757
Coq_ZArith_BinInt_Z_of_nat || neg || 0.00136467852142
Coq_ZArith_BinInt_Z_of_nat || pos || 0.00136406168041
Coq_Arith_PeanoNat_Nat_even || bit1 || 0.00136292177726
Coq_Structures_OrdersEx_Nat_as_DT_even || bit1 || 0.00136292177726
Coq_Structures_OrdersEx_Nat_as_OT_even || bit1 || 0.00136292177726
Coq_ZArith_BinInt_Z_of_nat || code_Neg || 0.00135472843518
Coq_NArith_BinNat_N_succ || bitM || 0.00134828153509
Coq_Classes_RelationClasses_Symmetric || sym || 0.00134160050787
Coq_Numbers_Natural_Binary_NBinary_N_Odd || inc || 0.00134137306342
Coq_Structures_OrdersEx_N_as_OT_Odd || inc || 0.00134137306342
Coq_Structures_OrdersEx_N_as_DT_Odd || inc || 0.00134137306342
Coq_Arith_PeanoNat_Nat_odd || bit1 || 0.00133193694979
Coq_Structures_OrdersEx_Nat_as_DT_odd || bit1 || 0.00133193694979
Coq_Structures_OrdersEx_Nat_as_OT_odd || bit1 || 0.00133193694979
Coq_ZArith_BinInt_Z_of_nat || code_Pos || 0.00132193206369
__constr_Coq_Numbers_BinNums_N_0_2 || im || 0.00130607264516
Coq_NArith_BinNat_N_even || inc || 0.00126746973567
__constr_Coq_Init_Datatypes_nat_0_2 || suc_Rep || 0.00123925250537
Coq_Lists_SetoidList_eqlistA_0 || lattic1693879045er_set || 0.00123171703064
Coq_Numbers_Natural_Binary_NBinary_N_Even || inc || 0.00122216051717
Coq_Structures_OrdersEx_N_as_DT_Even || inc || 0.00122216051717
Coq_Structures_OrdersEx_N_as_OT_Even || inc || 0.00122216051717
Coq_PArith_BinPos_Pos_to_nat || bitM || 0.00118662474961
Coq_ZArith_BinInt_Z_of_nat || bit1 || 0.00117836171094
Coq_ZArith_BinInt_Z_of_N || inc || 0.00117581881717
Coq_ZArith_BinInt_Z_sqrt || suc || 0.0011657519739
Coq_Numbers_Integer_BigZ_BigZ_BigZ_div2 || inc || 0.0011452002888
Coq_Sets_Relations_2_Rstar_0 || measure || 0.00114190560669
Coq_Classes_SetoidTactics_DefaultRelation_0 || antisym || 0.00114115227965
Coq_NArith_BinNat_N_odd || inc || 0.00113782982099
Coq_Classes_RelationClasses_RewriteRelation_0 || abel_s1917375468axioms || 0.00112978181793
Coq_Numbers_Integer_Binary_ZBinary_Z_max || remdups || 0.0010961778908
Coq_Structures_OrdersEx_Z_as_OT_max || remdups || 0.0010961778908
Coq_Structures_OrdersEx_Z_as_DT_max || remdups || 0.0010961778908
Coq_Lists_List_seq || upto || 0.00109218446383
Coq_Numbers_Natural_Binary_NBinary_N_even || inc || 0.00108954897415
Coq_Structures_OrdersEx_N_as_OT_even || inc || 0.00108954897415
Coq_Structures_OrdersEx_N_as_DT_even || inc || 0.00108954897415
Coq_Numbers_Integer_BigZ_BigZ_BigZ_norm_pos || cnj || 0.00108828231329
Coq_NArith_BinNat_N_to_nat || pos || 0.00108326187384
Coq_NArith_BinNat_N_to_nat || neg || 0.00107959771376
Coq_ZArith_BinInt_Z_of_N || bitM || 0.0010782179457
Coq_NArith_BinNat_N_to_nat || code_Neg || 0.00107241596959
Coq_ZArith_BinInt_Z_of_nat || field_char_0_of_rat || 0.00106463935084
Coq_Numbers_Natural_Binary_NBinary_N_odd || inc || 0.00106319852904
Coq_Structures_OrdersEx_N_as_OT_odd || inc || 0.00106319852904
Coq_Structures_OrdersEx_N_as_DT_odd || inc || 0.00106319852904
Coq_NArith_BinNat_N_Odd || bit1 || 0.00105942991433
Coq_NArith_BinNat_N_to_nat || code_Pos || 0.00104184826052
Coq_ZArith_BinInt_Z_of_N || neg || 0.00104168189878
Coq_Classes_SetoidTactics_DefaultRelation_0 || semigroup || 0.00103641699528
Coq_ZArith_BinInt_Z_of_nat || inc || 0.00103432491152
Coq_ZArith_BinInt_Z_of_N || code_Neg || 0.00103234272483
Coq_ZArith_BinInt_Z_of_N || pos || 0.00102664827083
Coq_ZArith_BinInt_Z_div2 || suc || 0.00102083695959
Coq_Classes_RelationClasses_Symmetric || symp || 0.00100572073006
Coq_ZArith_BinInt_Z_of_N || code_Pos || 0.00100534793491
Coq_NArith_BinNat_N_succ_pos || bit0 || 0.00100340931459
Coq_Numbers_Rational_BigQ_BigQ_BigN_BigZ_Z_of_N || pos || 0.000999219366942
Coq_Numbers_Natural_BigN_BigN_BigN_double_size || bit0 || 0.000994816492408
Coq_NArith_BinNat_N_Even || bit1 || 0.000994442282197
Coq_Classes_SetoidTactics_DefaultRelation_0 || trans || 0.000977108258093
Coq_Classes_RelationClasses_Transitive || transp || 0.000971940306082
Coq_Classes_RelationClasses_complement || transitive_trancl || 0.000965311504313
Coq_Sets_Relations_2_Rstar_0 || measures || 0.000964095721132
Coq_ZArith_BinInt_Z_pred || bit0 || 0.000956468082432
Coq_NArith_BinNat_N_to_nat || bit1 || 0.000950590962616
Coq_Numbers_Natural_Binary_NBinary_N_succ_pos || bit0 || 0.000948641942002
Coq_Structures_OrdersEx_N_as_OT_succ_pos || bit0 || 0.000948641942002
Coq_Structures_OrdersEx_N_as_DT_succ_pos || bit0 || 0.000948641942002
__constr_Coq_Numbers_BinNums_Z_0_1 || ratreal || 0.000940511408186
Coq_NArith_BinNat_N_even || bit1 || 0.000928248320472
Coq_Classes_RelationClasses_RewriteRelation_0 || antisym || 0.000921202420688
Coq_Numbers_Natural_Binary_NBinary_N_Odd || bit1 || 0.000909971671552
Coq_Structures_OrdersEx_N_as_DT_Odd || bit1 || 0.000909971671552
Coq_Structures_OrdersEx_N_as_OT_Odd || bit1 || 0.000909971671552
Coq_Init_Peano_le_0 || semilattice_axioms || 0.000909176443897
Coq_Numbers_Integer_BigZ_BigZ_BigZ_abs || inc || 0.000905871217583
Coq_Numbers_Natural_BigN_BigN_BigN_sqrt || bit0 || 0.000904184616314
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt || bit0 || 0.0009025693302
Coq_Classes_RelationClasses_Equivalence_0 || sym || 0.000900391615473
Coq_ZArith_BinInt_Z_of_N || bit1 || 0.000880177026448
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sgn || inc || 0.000875354447423
Coq_Classes_RelationPairs_Measure_0 || left_unique || 0.000871718693729
Coq_Arith_PeanoNat_Nat_max || remdups_adj || 0.000871674579961
Coq_Classes_RelationPairs_Measure_0 || left_total || 0.000861564232752
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt || inc || 0.000861291968257
__constr_Coq_Init_Datatypes_nat_0_2 || bitM || 0.000859808578887
Coq_NArith_BinNat_N_odd || bit1 || 0.000857915758559
Coq_ZArith_BinInt_Z_log2 || suc || 0.000857571863351
Coq_Classes_RelationPairs_Measure_0 || right_unique || 0.000856804043066
Coq_Numbers_Natural_Binary_NBinary_N_Even || bit1 || 0.00085414459975
Coq_Structures_OrdersEx_N_as_OT_Even || bit1 || 0.00085414459975
Coq_Structures_OrdersEx_N_as_DT_Even || bit1 || 0.00085414459975
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nat || 0.000848226915935
Coq_Sets_Partial_Order_Strict_Rel_of || id_on || 0.000841254031906
Coq_ZArith_BinInt_Z_max || remdups_adj || 0.000836808330749
Coq_PArith_BinPos_Pos_to_nat || pos || 0.000833442046971
Coq_Classes_RelationClasses_PER_0 || abel_s1917375468axioms || 0.000826833093831
Coq_Classes_RelationClasses_RewriteRelation_0 || semigroup || 0.000826833093831
Coq_Arith_PeanoNat_Nat_max || measure || 0.000825168753325
Coq_Sets_Relations_2_Rstar_0 || transitive_trancl || 0.000824359631726
Coq_PArith_BinPos_Pos_of_succ_nat || bit0 || 0.000819787834058
Coq_Classes_RelationPairs_Measure_0 || right_total || 0.00080853907519
Coq_Numbers_Natural_BigN_BigN_BigN_div2 || inc || 0.000807224424517
Coq_Numbers_Natural_BigN_BigN_BigN_zero || nat || 0.000806425577007
Coq_Numbers_Natural_Binary_NBinary_N_even || bit1 || 0.000798965401506
Coq_Structures_OrdersEx_N_as_OT_even || bit1 || 0.000798965401506
Coq_Structures_OrdersEx_N_as_DT_even || bit1 || 0.000798965401506
Coq_Numbers_Integer_BigZ_BigZ_BigZ_zero || nat || 0.000790172753907
Coq_Classes_RelationPairs_Measure_0 || bi_total || 0.000789549595693
Coq_Sets_Partial_Order_Rel_of || id_on || 0.000789016928002
Coq_Numbers_Natural_Binary_NBinary_N_odd || bit1 || 0.000784960189561
Coq_Structures_OrdersEx_N_as_OT_odd || bit1 || 0.000784960189561
Coq_Structures_OrdersEx_N_as_DT_odd || bit1 || 0.000784960189561
Coq_Init_Peano_le_0 || abel_semigroup || 0.000779522172606
Coq_Numbers_Integer_BigZ_BigZ_BigZ_log2 || inc || 0.000777516519658
Coq_Classes_RelationPairs_Measure_0 || bi_unique || 0.000765595409028
Coq_Numbers_Natural_BigN_BigN_BigN_one || nat || 0.000756830498571
Coq_Classes_RelationClasses_Reflexive || sym || 0.000755706719929
Coq_Sets_Relations_2_Rstar_0 || transitive_rtrancl || 0.00075507102736
Coq_Classes_RelationClasses_PER_0 || antisym || 0.000744344554951
Coq_Classes_RelationClasses_Transitive || sym || 0.000741920539095
Coq_Arith_PeanoNat_Nat_max || measures || 0.000729718054861
Coq_Sets_Partial_Order_Strict_Rel_of || measure || 0.000717634282584
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || finite_psubset || 0.000716298050404
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || finite_psubset || 0.000716298050404
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || finite_psubset || 0.000716298050404
Coq_Init_Nat_max || remdups_adj || 0.000709662237525
Coq_Init_Nat_max || remdups || 0.000703603711625
Coq_ZArith_BinInt_Z_abs_N || nat2 || 0.000702908015267
Coq_Classes_RelationClasses_RewriteRelation_0 || wf || 0.000700072575121
Coq_Classes_RelationClasses_PER_0 || trans || 0.000692787514698
Coq_Structures_OrdersEx_Z_as_DT_log2_up || finite_psubset || 0.000686965927985
Coq_Numbers_Integer_Binary_ZBinary_Z_log2_up || finite_psubset || 0.000686965927985
Coq_Structures_OrdersEx_Z_as_OT_log2_up || finite_psubset || 0.000686965927985
Coq_Numbers_Natural_BigN_BigN_BigN_even || field_char_0_of_rat || 0.000684264858395
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || field_char_0_of_rat || 0.000683678544367
Coq_Numbers_Natural_BigN_BigN_BigN_odd || field_char_0_of_rat || 0.000680587725952
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || field_char_0_of_rat || 0.000675948920416
Coq_Numbers_Natural_BigN_BigN_BigN_two || nat || 0.000664770477073
Coq_Numbers_Integer_BigZ_BigZ_BigZ_two || nat || 0.000661133402784
Coq_Arith_PeanoNat_Nat_sqrt_up || finite_psubset || 0.000650877154922
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || finite_psubset || 0.000650877154922
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || finite_psubset || 0.000650877154922
Coq_PArith_BinPos_Pos_sqrt || inc || 0.000650694094613
Coq_Classes_RelationClasses_PER_0 || semigroup || 0.000647628257952
__constr_Coq_Numbers_BinNums_Z_0_1 || pos || 0.000646600569214
Coq_Lists_List_map || image2 || 0.000641057891452
__constr_Coq_Init_Datatypes_nat_0_2 || nil || 0.000628951514632
Coq_PArith_BinPos_Pos_square || inc || 0.000625446634063
Coq_Arith_PeanoNat_Nat_log2_up || finite_psubset || 0.000624057110048
Coq_Structures_OrdersEx_Nat_as_DT_log2_up || finite_psubset || 0.000624057110048
Coq_Structures_OrdersEx_Nat_as_OT_log2_up || finite_psubset || 0.000624057110048
Coq_Numbers_Natural_BigN_BigN_BigN_of_pos || pos || 0.000620592496498
Coq_Sets_Partial_Order_Rel_of || measure || 0.000609915377732
Coq_Init_Wf_well_founded || sym || 0.000587312262867
Coq_Sets_Partial_Order_Strict_Rel_of || measures || 0.000587268509054
Coq_Classes_RelationClasses_Asymmetric || semilattice_axioms || 0.000583918996615
Coq_Numbers_Natural_BigN_BigN_BigN_sqrt || inc || 0.000569737546758
Coq_Lists_List_map || inj_on || 0.000556802210679
__constr_Coq_Numbers_BinNums_N_0_2 || pos || 0.000552910582141
__constr_Coq_Numbers_BinNums_positive_0_1 || bit1 || 0.000539704129456
Coq_ZArith_BinInt_Z_of_N || nat2 || 0.000522287895185
Coq_Classes_RelationClasses_PER_0 || wf || 0.00051978580264
Coq_Sets_Partial_Order_Rel_of || measures || 0.000517186500159
Coq_ZArith_BinInt_Z_sgn || suc || 0.000514212240056
Coq_Relations_Relation_Operators_le_AsB_0 || product || 0.000510769027094
Coq_Numbers_Natural_BigN_BigN_BigN_double_size || cnj || 0.000508886616486
Coq_Numbers_Natural_BigN_BigN_BigN_log2 || inc || 0.000501108443887
Coq_Lists_List_Add_0 || lexordp2 || 0.000491441195763
__constr_Coq_Init_Datatypes_list_0_2 || insert3 || 0.000486151510214
Coq_PArith_BinPos_Pos_succ || inc || 0.000481517933497
Coq_Classes_RelationClasses_Irreflexive || semilattice_axioms || 0.000474037530617
Coq_ZArith_BinInt_Z_pred || sqr || 0.000473546186392
Coq_Structures_OrdersEx_Z_as_DT_max || measure || 0.000472980624427
Coq_Numbers_Integer_Binary_ZBinary_Z_max || measure || 0.000472980624427
Coq_Structures_OrdersEx_Z_as_OT_max || measure || 0.000472980624427
__constr_Coq_Numbers_BinNums_N_0_2 || bit1 || 0.000472884928829
Coq_Classes_RelationClasses_PreOrder_0 || abel_semigroup || 0.000469665731105
Coq_Numbers_Natural_Binary_NBinary_N_lt || real_V1127708846m_norm || 0.000465421235365
Coq_Structures_OrdersEx_N_as_OT_lt || real_V1127708846m_norm || 0.000465421235365
Coq_Structures_OrdersEx_N_as_DT_lt || real_V1127708846m_norm || 0.000465421235365
Coq_NArith_BinNat_N_lt || real_V1127708846m_norm || 0.000463833751058
Coq_PArith_POrderedType_Positive_as_DT_pred_N || nat2 || 0.000463783566527
Coq_PArith_POrderedType_Positive_as_OT_pred_N || nat2 || 0.000463783566527
Coq_Structures_OrdersEx_Positive_as_DT_pred_N || nat2 || 0.000463783566527
Coq_Structures_OrdersEx_Positive_as_OT_pred_N || nat2 || 0.000463783566527
Coq_Classes_RelationClasses_PER_0 || equiv_equivp || 0.000462424831067
Coq_Classes_RelationClasses_PreOrder_0 || equiv_equivp || 0.000455177761426
Coq_Structures_OrdersEx_Nat_as_DT_max || remdups_adj || 0.000453243362623
Coq_Structures_OrdersEx_Nat_as_OT_max || remdups_adj || 0.000453243362623
Coq_ZArith_BinInt_Z_succ || nil || 0.000448600730324
Coq_Structures_OrdersEx_Nat_as_DT_max || measure || 0.000440010722205
Coq_Structures_OrdersEx_Nat_as_OT_max || measure || 0.000440010722205
Coq_Sets_Partial_Order_Strict_Rel_of || transitive_trancl || 0.000438424902751
Coq_PArith_BinPos_Pos_pred || sqr || 0.00043257766577
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || nat2 || 0.000423479052632
Coq_Numbers_Integer_Binary_ZBinary_Z_max || measures || 0.000416621842974
Coq_Structures_OrdersEx_Z_as_OT_max || measures || 0.000416621842974
Coq_Structures_OrdersEx_Z_as_DT_max || measures || 0.000416621842974
Coq_Sets_Partial_Order_Rel_of || transitive_trancl || 0.000416223992145
Coq_PArith_BinPos_Pos_sub || pow || 0.00041501966317
Coq_Sets_Partial_Order_Strict_Rel_of || transitive_rtrancl || 0.000414389247502
Coq_Numbers_Integer_BigZ_BigZ_BigZ_zero || code_integer || 0.000402162061367
Coq_Sets_Partial_Order_Rel_of || transitive_rtrancl || 0.000396289054583
Coq_Classes_RelationClasses_Asymmetric || abel_semigroup || 0.00039609703204
Coq_ZArith_BinInt_Z_succ || sqr || 0.000395247866749
__constr_Coq_Numbers_BinNums_Z_0_1 || code_integer_of_num || 0.000388057346328
Coq_Structures_OrdersEx_Nat_as_DT_max || measures || 0.000386299196314
Coq_Structures_OrdersEx_Nat_as_OT_max || measures || 0.000386299196314
Coq_Reals_Rbasic_fun_Rabs || code_Suc || 0.000381443206688
Coq_Classes_RelationClasses_Asymmetric || lattic35693393ce_set || 0.000372494176927
__constr_Coq_Numbers_BinNums_Z_0_2 || neg || 0.000371467057856
Coq_PArith_POrderedType_Positive_as_DT_pred || sqr || 0.000367579468789
Coq_PArith_POrderedType_Positive_as_OT_pred || sqr || 0.000367579468789
Coq_Structures_OrdersEx_Positive_as_DT_pred || sqr || 0.000367579468789
Coq_Structures_OrdersEx_Positive_as_OT_pred || sqr || 0.000367579468789
Coq_Init_Nat_add || measure || 0.000366260400214
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || bit1 || 0.000361879673242
Coq_ZArith_BinInt_Z_to_N || nat2 || 0.000361275980182
Coq_Structures_OrdersEx_Nat_as_DT_add || measure || 0.000357085443747
Coq_Structures_OrdersEx_Nat_as_OT_add || measure || 0.000357085443747
Coq_Numbers_Natural_Binary_NBinary_N_max || remdups || 0.000356104690142
Coq_Structures_OrdersEx_N_as_OT_max || remdups || 0.000356104690142
Coq_Structures_OrdersEx_N_as_DT_max || remdups || 0.000356104690142
Coq_Arith_PeanoNat_Nat_add || measure || 0.000355665667193
Coq_ZArith_BinInt_Z_abs_nat || nat2 || 0.000353648723268
__constr_Coq_Numbers_BinNums_Z_0_2 || code_Neg || 0.000353397124795
Coq_NArith_BinNat_N_max || remdups || 0.000350574630262
__constr_Coq_Init_Datatypes_nat_0_1 || code_integer_of_num || 0.000346655794048
__constr_Coq_Numbers_BinNums_N_0_1 || code_integer_of_num || 0.000346621951828
Coq_Numbers_Integer_Binary_ZBinary_Z_max || remdups_adj || 0.000346155600486
Coq_Structures_OrdersEx_Z_as_OT_max || remdups_adj || 0.000346155600486
Coq_Structures_OrdersEx_Z_as_DT_max || remdups_adj || 0.000346155600486
Coq_PArith_POrderedType_Positive_as_DT_sub || pow || 0.000342252272057
Coq_PArith_POrderedType_Positive_as_OT_sub || pow || 0.000342252272057
Coq_Structures_OrdersEx_Positive_as_DT_sub || pow || 0.000342252272057
Coq_Structures_OrdersEx_Positive_as_OT_sub || pow || 0.000342252272057
__constr_Coq_Numbers_BinNums_Z_0_1 || code_Pos || 0.000341699374321
Coq_Setoids_Setoid_Setoid_Theory || antisym || 0.00034090583492
Coq_Setoids_Setoid_Setoid_Theory || sym || 0.00033882256576
__constr_Coq_Numbers_BinNums_positive_0_3 || zero_Rep || 0.000335884573886
Coq_PArith_POrderedType_Positive_as_DT_succ || pos || 0.00033117961793
Coq_PArith_POrderedType_Positive_as_OT_succ || pos || 0.00033117961793
Coq_Structures_OrdersEx_Positive_as_DT_succ || pos || 0.00033117961793
Coq_Structures_OrdersEx_Positive_as_OT_succ || pos || 0.00033117961793
Coq_Lists_List_rev || rotate1 || 0.00032927047083
Coq_Init_Nat_add || measures || 0.000328065400063
__constr_Coq_Numbers_BinNums_Z_0_1 || code_integer_of_nat || 0.000323152800534
Coq_ZArith_BinInt_Z_le || trans || 0.00032306985914
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || pos || 0.000322050769409
Coq_Classes_RelationClasses_Irreflexive || lattic35693393ce_set || 0.000321364118304
Coq_Structures_OrdersEx_Nat_as_DT_add || measures || 0.000320668969125
Coq_Structures_OrdersEx_Nat_as_OT_add || measures || 0.000320668969125
Coq_Arith_PeanoNat_Nat_add || measures || 0.000319521230049
Coq_PArith_POrderedType_Positive_as_DT_pred_N || inc || 0.000319426784587
Coq_PArith_POrderedType_Positive_as_OT_pred_N || inc || 0.000319426784587
Coq_Structures_OrdersEx_Positive_as_DT_pred_N || inc || 0.000319426784587
Coq_Structures_OrdersEx_Positive_as_OT_pred_N || inc || 0.000319426784587
Coq_PArith_BinPos_Pos_succ || pos || 0.000316935345718
Coq_Setoids_Setoid_Setoid_Theory || trans || 0.000312909976361
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || neg || 0.000312454873363
Coq_ZArith_BinInt_Z_square || suc || 0.000307571040803
Coq_Init_Datatypes_negb || inc || 0.000307018588353
Coq_Arith_Even_even_0 || nat3 || 0.000306767939408
Coq_ZArith_BinInt_Z_opp || nat2 || 0.000306408252563
__constr_Coq_Init_Datatypes_nat_0_1 || code_Pos || 0.000303594279564
__constr_Coq_Numbers_BinNums_N_0_1 || code_Pos || 0.00030332166325
Coq_Numbers_Natural_BigN_BigN_BigN_two || code_integer || 0.000302604594922
Coq_NArith_BinNat_N_div2 || bit0 || 0.000302340575081
Coq_Numbers_Integer_BigZ_BigZ_BigZ_two || code_integer || 0.000300276017503
Coq_Structures_OrdersEx_Z_as_DT_sqrt || set || 0.000299432885705
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || set || 0.000299432885705
Coq_Structures_OrdersEx_Z_as_OT_sqrt || set || 0.000299432885705
Coq_ZArith_BinInt_Z_square || dup || 0.000298620284933
Coq_NArith_BinNat_N_of_nat || nat2 || 0.000295962773933
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || code_Neg || 0.00028977715212
Coq_Numbers_Natural_BigN_BigN_BigN_zero || code_integer || 0.000289660716517
Coq_Arith_PeanoNat_Nat_even || ring_1_of_int || 0.000289624077716
Coq_Structures_OrdersEx_Nat_as_DT_even || ring_1_of_int || 0.000289624077716
Coq_Structures_OrdersEx_Nat_as_OT_even || ring_1_of_int || 0.000289624077716
Coq_PArith_BinPos_Pos_pred_N || nat2 || 0.000288786117684
Coq_Arith_PeanoNat_Nat_odd || ring_1_of_int || 0.000283792576311
Coq_Structures_OrdersEx_Nat_as_DT_odd || ring_1_of_int || 0.000283792576311
Coq_Structures_OrdersEx_Nat_as_OT_odd || ring_1_of_int || 0.000283792576311
Coq_Structures_OrdersEx_Z_as_DT_log2 || set || 0.000282795373533
Coq_Numbers_Integer_Binary_ZBinary_Z_log2 || set || 0.000282795373533
Coq_Structures_OrdersEx_Z_as_OT_log2 || set || 0.000282795373533
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || code_Pos || 0.000281535131058
Coq_Numbers_Natural_Binary_NBinary_N_gcd || upto || 0.000280609359147
Coq_Structures_OrdersEx_N_as_OT_gcd || upto || 0.000280609359147
Coq_Structures_OrdersEx_N_as_DT_gcd || upto || 0.000280609359147
Coq_NArith_BinNat_N_gcd || upto || 0.000280274145608
Coq_Arith_Factorial_fact || suc_Rep || 0.000278908159144
__constr_Coq_Numbers_BinNums_Z_0_1 || code_integer_of_int || 0.00027821070674
Coq_Classes_RelationClasses_StrictOrder_0 || abel_semigroup || 0.000276930173154
Coq_Arith_PeanoNat_Nat_sqrt || set || 0.000274521346562
Coq_Structures_OrdersEx_Nat_as_DT_sqrt || set || 0.000274521346562
Coq_Structures_OrdersEx_Nat_as_OT_sqrt || set || 0.000274521346562
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || pos || 0.000274322986959
Coq_Classes_RelationClasses_Equivalence_0 || transitive_acyclic || 0.000273285062433
Coq_ZArith_BinInt_Z_of_nat || nat2 || 0.000272341498417
Coq_Init_Peano_le_0 || transitive_acyclic || 0.000271022903517
Coq_Arith_PeanoNat_Nat_pred || bit0 || 0.000266967225462
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || neg || 0.000266625099521
Coq_Arith_PeanoNat_Nat_even || semiring_1_of_nat || 0.000264730631872
Coq_Structures_OrdersEx_Nat_as_DT_even || semiring_1_of_nat || 0.000264730631872
Coq_Structures_OrdersEx_Nat_as_OT_even || semiring_1_of_nat || 0.000264730631872
Coq_Arith_PeanoNat_Nat_odd || semiring_1_of_nat || 0.000260259610731
Coq_Structures_OrdersEx_Nat_as_DT_odd || semiring_1_of_nat || 0.000260259610731
Coq_Structures_OrdersEx_Nat_as_OT_odd || semiring_1_of_nat || 0.000260259610731
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || sqr || 0.000260132545692
Coq_Structures_OrdersEx_Z_as_OT_pred || sqr || 0.000260132545692
Coq_Structures_OrdersEx_Z_as_DT_pred || sqr || 0.000260132545692
Coq_Init_Nat_add || remdups || 0.00025983171976
Coq_Numbers_Natural_Binary_NBinary_N_Odd || nat_of_num || 0.00025758976611
Coq_Structures_OrdersEx_N_as_OT_Odd || nat_of_num || 0.00025758976611
Coq_Structures_OrdersEx_N_as_DT_Odd || nat_of_num || 0.00025758976611
Coq_Arith_PeanoNat_Nat_log2 || set || 0.000256524898826
Coq_Structures_OrdersEx_Nat_as_DT_log2 || set || 0.000256524898826
Coq_Structures_OrdersEx_Nat_as_OT_log2 || set || 0.000256524898826
Coq_NArith_BinNat_N_Odd || nat_of_num || 0.000255936877354
Coq_Structures_OrdersEx_Nat_as_DT_add || remdups || 0.000255006682135
Coq_Structures_OrdersEx_Nat_as_OT_add || remdups || 0.000255006682135
Coq_Arith_PeanoNat_Nat_add || remdups || 0.000254254547915
Coq_Classes_RelationClasses_Equivalence_0 || abel_s1917375468axioms || 0.000254110567391
__constr_Coq_Numbers_BinNums_Z_0_2 || bit1 || 0.000253968055743
__constr_Coq_Numbers_BinNums_Z_0_2 || abs_Nat || 0.00025351598645
Coq_PArith_BinPos_Pos_pred_double || inc || 0.000249118582421
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || code_Neg || 0.000247255733531
Coq_Numbers_Natural_Binary_NBinary_N_succ || nat2 || 0.000247076469342
Coq_Structures_OrdersEx_N_as_OT_succ || nat2 || 0.000247076469342
Coq_Structures_OrdersEx_N_as_DT_succ || nat2 || 0.000247076469342
Coq_NArith_BinNat_N_succ || nat2 || 0.000245785140966
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || bit0 || 0.000245542295929
Coq_Structures_OrdersEx_Z_as_OT_pred || bit0 || 0.000245542295929
Coq_Structures_OrdersEx_Z_as_DT_pred || bit0 || 0.000245542295929
Coq_Numbers_Integer_BigZ_BigZ_BigZ_zero || int || 0.000242762334576
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || code_Pos || 0.000241138138539
Coq_Numbers_Natural_BigN_BigN_BigN_zero || int || 0.000238812130915
__constr_Coq_Numbers_BinNums_N_0_1 || code_integer_of_nat || 0.000237792988387
__constr_Coq_Init_Datatypes_nat_0_1 || code_integer_of_nat || 0.000236341798792
Coq_Numbers_Natural_Binary_NBinary_N_Even || nat_of_num || 0.000236290409032
Coq_Structures_OrdersEx_N_as_OT_Even || nat_of_num || 0.000236290409032
Coq_Structures_OrdersEx_N_as_DT_Even || nat_of_num || 0.000236290409032
Coq_PArith_BinPos_Pos_square || bit0 || 0.000235491780167
Coq_NArith_BinNat_N_Even || nat_of_num || 0.000234774157222
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || bit0 || 0.000232880536902
Coq_Structures_OrdersEx_Z_as_OT_succ || bit0 || 0.000232880536902
Coq_Structures_OrdersEx_Z_as_DT_succ || bit0 || 0.000232880536902
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || sqr || 0.00023212219007
Coq_Structures_OrdersEx_Z_as_OT_succ || sqr || 0.00023212219007
Coq_Structures_OrdersEx_Z_as_DT_succ || sqr || 0.00023212219007
Coq_ZArith_BinInt_Z_square || code_dup || 0.00022963133791
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || nat2 || 0.000229550875088
Coq_Classes_RelationClasses_Irreflexive || semigroup || 0.000227912837065
Coq_Numbers_Natural_BigN_BigN_BigN_two || int || 0.000225853266473
Coq_ZArith_BinInt_Z_of_nat || ring_1_of_int || 0.000225772036431
Coq_Numbers_Integer_Binary_ZBinary_Z_Odd || nat_of_num || 0.000224912505541
Coq_Structures_OrdersEx_Z_as_OT_Odd || nat_of_num || 0.000224912505541
Coq_Structures_OrdersEx_Z_as_DT_Odd || nat_of_num || 0.000224912505541
Coq_Numbers_Integer_BigZ_BigZ_BigZ_two || int || 0.000224486778795
Coq_ZArith_BinInt_Z_succ || suc || 0.000220292559847
Coq_Numbers_Natural_Binary_NBinary_N_odd || field_char_0_of_rat || 0.000219485476665
Coq_Structures_OrdersEx_N_as_OT_odd || field_char_0_of_rat || 0.000219485476665
Coq_Structures_OrdersEx_N_as_DT_odd || field_char_0_of_rat || 0.000219485476665
Coq_Numbers_Natural_Binary_NBinary_N_even || field_char_0_of_rat || 0.000218914176992
Coq_NArith_BinNat_N_even || field_char_0_of_rat || 0.000218914176992
Coq_Structures_OrdersEx_N_as_OT_even || field_char_0_of_rat || 0.000218914176992
Coq_Structures_OrdersEx_N_as_DT_even || field_char_0_of_rat || 0.000218914176992
Coq_PArith_BinPos_Pos_pred_N || inc || 0.000218777192521
Coq_Numbers_Natural_Binary_NBinary_N_even || nat_of_num || 0.00021689866665
Coq_Structures_OrdersEx_N_as_OT_even || nat_of_num || 0.00021689866665
Coq_Structures_OrdersEx_N_as_DT_even || nat_of_num || 0.00021689866665
Coq_PArith_POrderedType_Positive_as_DT_add || measure || 0.000216689580887
Coq_PArith_POrderedType_Positive_as_OT_add || measure || 0.000216689580887
Coq_Structures_OrdersEx_Positive_as_DT_add || measure || 0.000216689580887
Coq_Structures_OrdersEx_Positive_as_OT_add || measure || 0.000216689580887
Coq_Classes_RelationClasses_Equivalence_0 || semigroup || 0.000216064716628
Coq_NArith_BinNat_N_even || nat_of_num || 0.000215343330384
Coq_Numbers_Natural_Binary_NBinary_N_odd || nat_of_num || 0.00021190651156
Coq_Structures_OrdersEx_N_as_OT_odd || nat_of_num || 0.00021190651156
Coq_Structures_OrdersEx_N_as_DT_odd || nat_of_num || 0.00021190651156
Coq_Numbers_Integer_Binary_ZBinary_Z_Even || nat_of_num || 0.000211620524589
Coq_Structures_OrdersEx_Z_as_OT_Even || nat_of_num || 0.000211620524589
Coq_Structures_OrdersEx_Z_as_DT_Even || nat_of_num || 0.000211620524589
Coq_ZArith_BinInt_Z_Odd || nat_of_num || 0.0002105478339
Coq_ZArith_BinInt_Z_to_nat || nat2 || 0.000209251811207
Coq_Numbers_Integer_Binary_ZBinary_Z_even || nat_of_num || 0.00020789280471
Coq_Structures_OrdersEx_Z_as_OT_even || nat_of_num || 0.00020789280471
Coq_Structures_OrdersEx_Z_as_DT_even || nat_of_num || 0.00020789280471
Coq_ZArith_BinInt_Z_of_nat || semiring_1_of_nat || 0.000206921649894
Coq_NArith_BinNat_N_odd || field_char_0_of_rat || 0.000204683807973
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || nat_of_num || 0.000203322205693
Coq_Structures_OrdersEx_Z_as_OT_odd || nat_of_num || 0.000203322205693
Coq_Structures_OrdersEx_Z_as_DT_odd || nat_of_num || 0.000203322205693
__constr_Coq_Numbers_BinNums_N_0_1 || code_integer_of_int || 0.000203299885928
__constr_Coq_Init_Datatypes_nat_0_1 || code_integer_of_int || 0.00020225709233
Coq_PArith_BinPos_Pos_add || measure || 0.000199912405811
Coq_ZArith_BinInt_Z_Even || nat_of_num || 0.000199208982724
Coq_Classes_RelationClasses_StrictOrder_0 || equiv_equivp || 0.000198972204026
Coq_Classes_RelationClasses_Asymmetric || semilattice || 0.000195569495396
Coq_NArith_BinNat_N_odd || nat_of_num || 0.000194305437748
Coq_ZArith_BinInt_Z_even || nat_of_num || 0.000193287794054
Coq_PArith_POrderedType_Positive_as_DT_pred_double || inc || 0.000191015115302
Coq_PArith_POrderedType_Positive_as_OT_pred_double || inc || 0.000191015115302
Coq_Structures_OrdersEx_Positive_as_DT_pred_double || inc || 0.000191015115302
Coq_Structures_OrdersEx_Positive_as_OT_pred_double || inc || 0.000191015115302
Coq_PArith_POrderedType_Positive_as_DT_add || measures || 0.000190305783002
Coq_PArith_POrderedType_Positive_as_OT_add || measures || 0.000190305783002
Coq_Structures_OrdersEx_Positive_as_DT_add || measures || 0.000190305783002
Coq_Structures_OrdersEx_Positive_as_OT_add || measures || 0.000190305783002
Coq_PArith_BinPos_Pos_to_nat || bit1 || 0.000189252564457
Coq_Numbers_Natural_Binary_NBinary_N_Odd || nat2 || 0.000188513047685
Coq_Structures_OrdersEx_N_as_OT_Odd || nat2 || 0.000188513047685
Coq_Structures_OrdersEx_N_as_DT_Odd || nat2 || 0.000188513047685
Coq_NArith_BinNat_N_Odd || nat2 || 0.000187300788082
Coq_ZArith_BinInt_Z_odd || nat_of_num || 0.000184891683528
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || nil || 0.000184276280448
Coq_Structures_OrdersEx_Z_as_OT_succ || nil || 0.000184276280448
Coq_Structures_OrdersEx_Z_as_DT_succ || nil || 0.000184276280448
Coq_PArith_BinPos_Pos_to_nat || neg || 0.000183370268994
Coq_ZArith_BinInt_Z_to_N || bit1 || 0.000182853058055
Coq_Numbers_Natural_BigN_BigN_BigN_one || real || 0.000182290889545
Coq_PArith_BinPos_Pos_to_nat || code_Neg || 0.000181396791906
Coq_PArith_BinPos_Pos_to_nat || bit0 || 0.000181018237415
Coq_Structures_OrdersEx_N_as_OT_le || wf || 0.000180904904335
Coq_Structures_OrdersEx_N_as_DT_le || wf || 0.000180904904335
Coq_Numbers_Natural_Binary_NBinary_N_le || wf || 0.000180904904335
Coq_NArith_BinNat_N_le || wf || 0.000180577552437
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || real || 0.000176999006397
Coq_Numbers_Natural_Binary_NBinary_N_Even || nat2 || 0.000176981542181
Coq_Structures_OrdersEx_N_as_OT_Even || nat2 || 0.000176981542181
Coq_Structures_OrdersEx_N_as_DT_Even || nat2 || 0.000176981542181
Coq_PArith_BinPos_Pos_add || measures || 0.000176730269749
Coq_PArith_BinPos_Pos_to_nat || code_Pos || 0.000176593859153
Coq_NArith_BinNat_N_Even || nat2 || 0.000175843423085
Coq_Numbers_Integer_BigZ_BigZ_BigZ_abs || code_Suc || 0.000172941517563
Coq_Numbers_Natural_BigN_BigN_BigN_zero || real || 0.000171116509211
Coq_Classes_RelationClasses_Irreflexive || semilattice || 0.000167888624544
Coq_Numbers_Integer_Binary_ZBinary_Z_Odd || nat2 || 0.000167518681638
Coq_Structures_OrdersEx_Z_as_OT_Odd || nat2 || 0.000167518681638
Coq_Structures_OrdersEx_Z_as_DT_Odd || nat2 || 0.000167518681638
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sub || code_pcr_natural code_cr_natural || 0.000166731904808
Coq_Numbers_Natural_Binary_NBinary_N_even || nat2 || 0.000165896187464
Coq_Structures_OrdersEx_N_as_OT_even || nat2 || 0.000165896187464
Coq_Structures_OrdersEx_N_as_DT_even || nat2 || 0.000165896187464
Coq_NArith_BinNat_N_even || nat2 || 0.000164620305979
Coq_Numbers_Integer_BigZ_BigZ_BigZ_zero || real || 0.000164349556694
Coq_Classes_RelationClasses_Asymmetric || antisym || 0.000164348409824
Coq_ZArith_BinInt_Z_even || nat2 || 0.000163051511886
Coq_Numbers_Natural_Binary_NBinary_N_odd || nat2 || 0.000163001197893
Coq_Structures_OrdersEx_N_as_OT_odd || nat2 || 0.000163001197893
Coq_Structures_OrdersEx_N_as_DT_odd || nat2 || 0.000163001197893
Coq_Numbers_Integer_Binary_ZBinary_Z_even || nat2 || 0.000161503016931
Coq_Structures_OrdersEx_Z_as_OT_even || nat2 || 0.000161503016931
Coq_Structures_OrdersEx_Z_as_DT_even || nat2 || 0.000161503016931
Coq_Numbers_Integer_Binary_ZBinary_Z_even || ring_1_of_int || 0.000161019702703
Coq_Structures_OrdersEx_Z_as_OT_even || ring_1_of_int || 0.000161019702703
Coq_Structures_OrdersEx_Z_as_DT_even || ring_1_of_int || 0.000161019702703
Coq_Numbers_Integer_Binary_ZBinary_Z_Even || nat2 || 0.000160123490566
Coq_Structures_OrdersEx_Z_as_OT_Even || nat2 || 0.000160123490566
Coq_Structures_OrdersEx_Z_as_DT_Even || nat2 || 0.000160123490566
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || ring_1_of_int || 0.000159034465768
Coq_Structures_OrdersEx_Z_as_OT_odd || ring_1_of_int || 0.000159034465768
Coq_Structures_OrdersEx_Z_as_DT_odd || ring_1_of_int || 0.000159034465768
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || nat2 || 0.000158814943122
Coq_Structures_OrdersEx_Z_as_DT_odd || nat2 || 0.000158814943122
Coq_Structures_OrdersEx_Z_as_OT_odd || nat2 || 0.000158814943122
Coq_Arith_PeanoNat_Nat_div2 || bit0 || 0.000158342010384
Coq_ZArith_BinInt_Z_Odd || nat2 || 0.000157505229322
Coq_ZArith_BinInt_Z_odd || nat2 || 0.000157448572177
Coq_NArith_BinNat_N_pred || bit0 || 0.000157129261903
Coq_ZArith_BinInt_Z_even || ring_1_of_int || 0.000155432505264
__constr_Coq_Numbers_BinNums_Z_0_2 || bitM || 0.000154824454061
Coq_NArith_BinNat_N_odd || nat2 || 0.000152199550962
Coq_ZArith_BinInt_Z_Even || nat2 || 0.000151151729943
Coq_ZArith_BinInt_Z_odd || ring_1_of_int || 0.000151000654306
Coq_Numbers_Integer_BigZ_BigZ_BigZ_t__0 || int || 0.000150347085298
Coq_ZArith_Int_Z_as_Int__1 || nat || 0.000149918824738
Coq_Numbers_Integer_Binary_ZBinary_Z_even || semiring_1_of_nat || 0.000149103190119
Coq_Structures_OrdersEx_Z_as_OT_even || semiring_1_of_nat || 0.000149103190119
Coq_Structures_OrdersEx_Z_as_DT_even || semiring_1_of_nat || 0.000149103190119
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || semiring_1_of_nat || 0.000147774538142
Coq_Structures_OrdersEx_Z_as_OT_odd || semiring_1_of_nat || 0.000147774538142
Coq_Structures_OrdersEx_Z_as_DT_odd || semiring_1_of_nat || 0.000147774538142
Coq_Numbers_Natural_Binary_NBinary_N_even || ring_1_of_int || 0.000145338408407
Coq_NArith_BinNat_N_even || ring_1_of_int || 0.000145338408407
Coq_Structures_OrdersEx_N_as_OT_even || ring_1_of_int || 0.000145338408407
Coq_Structures_OrdersEx_N_as_DT_even || ring_1_of_int || 0.000145338408407
Coq_ZArith_BinInt_Z_even || semiring_1_of_nat || 0.000144428787537
Coq_ZArith_Zlogarithm_log_sup || nat_of_num || 0.000144073899503
Coq_Numbers_Natural_Binary_NBinary_N_odd || ring_1_of_int || 0.000143489611763
Coq_Structures_OrdersEx_N_as_OT_odd || ring_1_of_int || 0.000143489611763
Coq_Structures_OrdersEx_N_as_DT_odd || ring_1_of_int || 0.000143489611763
Coq_Numbers_Integer_BigZ_BigZ_BigZ_mul || code_pcr_integer code_cr_integer || 0.000142469369941
Coq_Classes_RelationClasses_Asymmetric || trans || 0.000142447504163
Coq_ZArith_BinInt_Z_to_nat || ring_1_of_int || 0.000141166536259
Coq_ZArith_BinInt_Z_odd || semiring_1_of_nat || 0.000141009068098
Coq_setoid_ring_Ring_theory_ring_theory_0 || bNF_rel_fun || 0.000138977026157
__constr_Coq_Numbers_BinNums_Z_0_2 || inc || 0.000137476625573
Coq_ZArith_BinInt_Z_abs_N || ring_1_of_int || 0.000136880208651
Coq_Lists_List_rev || remdups_adj || 0.000136071252724
Coq_Numbers_Integer_BigZ_BigZ_BigZ_opp || nat2 || 0.000135865562705
Coq_ZArith_BinInt_Z_abs_nat || ring_1_of_int || 0.000135143414006
Coq_NArith_BinNat_N_odd || ring_1_of_int || 0.000135107862195
Coq_Numbers_Natural_Binary_NBinary_N_even || semiring_1_of_nat || 0.000134933722745
Coq_NArith_BinNat_N_even || semiring_1_of_nat || 0.000134933722745
Coq_Structures_OrdersEx_N_as_OT_even || semiring_1_of_nat || 0.000134933722745
Coq_Structures_OrdersEx_N_as_DT_even || semiring_1_of_nat || 0.000134933722745
Coq_Numbers_Natural_Binary_NBinary_N_odd || semiring_1_of_nat || 0.000133715883172
Coq_Structures_OrdersEx_N_as_OT_odd || semiring_1_of_nat || 0.000133715883172
Coq_Structures_OrdersEx_N_as_DT_odd || semiring_1_of_nat || 0.000133715883172
Coq_ZArith_BinInt_Z_to_N || ring_1_of_int || 0.000132707526349
Coq_ZArith_Zlogarithm_log_inf || nat_of_num || 0.000132691107923
Coq_Init_Peano_le_0 || trans || 0.000132057459479
Coq_Numbers_Integer_BigZ_BigZ_BigZ_add || code_natural || 0.000130422350553
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || code_pcr_integer code_cr_integer || 0.000128104667408
Coq_Lists_List_rev || remdups || 0.000127685705854
Coq_ZArith_BinInt_Z_to_nat || semiring_1_of_nat || 0.000127406714768
Coq_Classes_SetoidClass_equiv || remdups || 0.000127403348085
Coq_NArith_BinNat_N_odd || semiring_1_of_nat || 0.000126634919119
Coq_PArith_BinPos_Pos_div2_up || bit0 || 0.000126607997521
Coq_ZArith_BinInt_Z_pred || bit1 || 0.000125583357929
Coq_Classes_RelationClasses_Irreflexive || trans || 0.000124475804789
Coq_ZArith_BinInt_Z_abs_N || semiring_1_of_nat || 0.000123918561616
Coq_ZArith_BinInt_Z_abs_nat || semiring_1_of_nat || 0.000122491421797
Coq_ZArith_BinInt_Z_to_N || semiring_1_of_nat || 0.00012049710876
Coq_NArith_BinNat_N_div2 || dup || 0.00012005420476
Coq_NArith_BinNat_N_div2 || bit1 || 0.000117053102948
Coq_NArith_BinNat_N_to_nat || nat2 || 0.000114263775905
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || semiring_1_of_nat || 0.000112749063622
Coq_Numbers_Natural_Binary_NBinary_N_max || remdups_adj || 0.000112303201519
Coq_Structures_OrdersEx_N_as_OT_max || remdups_adj || 0.000112303201519
Coq_Structures_OrdersEx_N_as_DT_max || remdups_adj || 0.000112303201519
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || semiring_1_of_nat || 0.000112000714902
Coq_Numbers_Natural_BigN_BigN_BigN_even || semiring_1_of_nat || 0.000111964715071
Coq_Numbers_Natural_BigN_BigN_BigN_odd || semiring_1_of_nat || 0.000111753937738
Coq_ZArith_BinInt_Z_to_nat || bit1 || 0.000111168703331
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || ring_1_of_int || 0.000110917916858
Coq_NArith_BinNat_N_max || remdups_adj || 0.000110621652226
Coq_Numbers_Natural_BigN_BigN_BigN_even || ring_1_of_int || 0.000110042405756
Coq_ZArith_BinInt_Z_of_N || ring_1_of_int || 0.000109998626487
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || ring_1_of_int || 0.000109783847874
Coq_Numbers_Natural_BigN_BigN_BigN_odd || ring_1_of_int || 0.000109496725778
__constr_Coq_Numbers_BinNums_Z_0_3 || nat_of_num || 0.000102607646596
Coq_NArith_BinNat_N_pred || dup || 0.000102495359825
Coq_QArith_QArith_base_Q_0 || code_integer || 0.000102314048947
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || bit1 || 0.000101806968056
__constr_Coq_Init_Datatypes_nat_0_2 || suc || 0.000101401388678
Coq_ZArith_BinInt_Z_of_N || semiring_1_of_nat || 0.000100656301993
Coq_ZArith_BinInt_Z_opp || neg || 0.000100361563759
Coq_ZArith_BinInt_Z_opp || pos || 9.91394131603e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_two || bNF_Ca1495478003natLeq || 9.76450537181e-05
Coq_PArith_POrderedType_Positive_as_DT_of_succ_nat || nat_of_num || 9.73986695494e-05
Coq_PArith_POrderedType_Positive_as_OT_of_succ_nat || nat_of_num || 9.73986695494e-05
Coq_Structures_OrdersEx_Positive_as_DT_of_succ_nat || nat_of_num || 9.73986695494e-05
Coq_Structures_OrdersEx_Positive_as_OT_of_succ_nat || nat_of_num || 9.73986695494e-05
Coq_ZArith_BinInt_Z_opp || code_Neg || 9.66054911571e-05
Coq_Numbers_Natural_BigN_BigN_BigN_two || bNF_Ca1495478003natLeq || 9.63844669897e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sgn || bit0 || 9.62435299995e-05
Coq_NArith_BinNat_N_pred || code_dup || 9.5534991104e-05
Coq_ZArith_BinInt_Z_opp || code_Pos || 9.44684851193e-05
Coq_Numbers_Cyclic_Int31_Int31_incr || dup || 8.97617241898e-05
Coq_ZArith_BinInt_Z_le || transitive_acyclic || 8.97325865815e-05
Coq_Classes_SetoidTactics_DefaultRelation_0 || equiv_part_equivp || 8.832402252e-05
Coq_ZArith_BinInt_Z_log2_up || nat2 || 8.8258535763e-05
Coq_ZArith_BinInt_Z_div2 || dup || 8.71516526822e-05
$equals3 || nil || 8.70321422759e-05
Coq_NArith_BinNat_N_pred || bit1 || 8.67620289738e-05
Coq_Numbers_Rational_BigQ_BigQ_BigQ_t || int || 8.59724264009e-05
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || bit1 || 8.57583001887e-05
Coq_Structures_OrdersEx_Z_as_OT_pred || bit1 || 8.57583001887e-05
Coq_Structures_OrdersEx_Z_as_DT_pred || bit1 || 8.57583001887e-05
__constr_Coq_Init_Datatypes_bool_0_2 || product_Unity || 8.38143909388e-05
Coq_Numbers_Cyclic_Int31_Int31_incr || code_dup || 8.37575076354e-05
Coq_Sets_Relations_1_Symmetric || sym || 8.32318470229e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || code_Nat || 8.30689878634e-05
Coq_ZArith_BinInt_Z_log2 || nat2 || 8.28159085895e-05
Coq_Structures_OrdersEx_Nat_as_DT_Odd || nat_of_num || 8.06769017727e-05
Coq_Structures_OrdersEx_Nat_as_OT_Odd || nat_of_num || 8.06769017727e-05
Coq_NArith_BinNat_N_div2 || code_dup || 8.0604274476e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_abs || bit0 || 8.02464831804e-05
__constr_Coq_Numbers_BinNums_Z_0_3 || abs_Nat || 7.94998812714e-05
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || bit1 || 7.91783128864e-05
Coq_Structures_OrdersEx_Z_as_OT_succ || bit1 || 7.91783128864e-05
Coq_Structures_OrdersEx_Z_as_DT_succ || bit1 || 7.91783128864e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || numeral_numeral || 7.89772598193e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || code_n1042895779nteger || 7.89165149911e-05
Coq_Arith_PeanoNat_Nat_Odd || nat_of_num || 7.85514822791e-05
Coq_ZArith_BinInt_Z_div2 || code_dup || 7.83108924924e-05
Coq_Arith_PeanoNat_Nat_pred || dup || 7.72177523393e-05
__constr_Coq_Init_Datatypes_bool_0_1 || product_Unity || 7.68200471337e-05
Coq_Classes_SetoidTactics_DefaultRelation_0 || reflp || 7.57828101069e-05
Coq_ZArith_BinInt_Z_of_N || field_char_0_of_rat || 7.57462165406e-05
Coq_Structures_OrdersEx_Positive_as_DT_le || transitive_acyclic || 7.5038537847e-05
Coq_Structures_OrdersEx_Positive_as_OT_le || transitive_acyclic || 7.5038537847e-05
Coq_PArith_POrderedType_Positive_as_DT_le || transitive_acyclic || 7.5038537847e-05
Coq_PArith_POrderedType_Positive_as_OT_le || transitive_acyclic || 7.5038537847e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_opp || bit0 || 7.46630954096e-05
Coq_Structures_OrdersEx_Nat_as_DT_Even || nat_of_num || 7.40047693491e-05
Coq_Structures_OrdersEx_Nat_as_OT_Even || nat_of_num || 7.40047693491e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_two || less_than || 7.36383835742e-05
Coq_Init_Datatypes_negb || code_nat_of_integer || 7.34203816092e-05
Coq_PArith_BinPos_Pos_le || transitive_acyclic || 7.30914940629e-05
Coq_PArith_BinPos_Pos_of_succ_nat || nat_of_num || 7.30386121027e-05
Coq_Numbers_Rational_BigQ_BigQ_BigN_BigZ_Zabs_N || code_integer_of_int || 7.2865901327e-05
Coq_Numbers_Natural_BigN_BigN_BigN_two || less_than || 7.28442000386e-05
Coq_Arith_PeanoNat_Nat_Even || nat_of_num || 7.28093218708e-05
Coq_ZArith_BinInt_Z_opp || inc || 7.26801145515e-05
Coq_Arith_PeanoNat_Nat_pred || code_dup || 7.21775986588e-05
Coq_ZArith_Int_Z_as_Int_i2z || numeral_numeral || 7.20204569193e-05
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || numeral_numeral || 7.18503926935e-05
Coq_Relations_Relation_Operators_clos_trans_0 || butlast || 7.11804265566e-05
Coq_Arith_PeanoNat_Nat_pred || bit1 || 7.10182408926e-05
Coq_Classes_RelationClasses_RewriteRelation_0 || equiv_part_equivp || 7.0445243363e-05
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || int_ge_less_than2 || 7.0111392118e-05
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || int_ge_less_than2 || 7.0111392118e-05
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || int_ge_less_than2 || 7.0111392118e-05
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || int_ge_less_than || 7.0111392118e-05
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || int_ge_less_than || 7.0111392118e-05
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || int_ge_less_than || 7.0111392118e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || wf || 7.01090166174e-05
Coq_NArith_BinNat_N_sqrt_up || int_ge_less_than2 || 7.01015574901e-05
Coq_NArith_BinNat_N_sqrt_up || int_ge_less_than || 7.01015574901e-05
Coq_Arith_PeanoNat_Nat_even || nat_of_num || 6.86189977884e-05
Coq_Structures_OrdersEx_Nat_as_DT_even || nat_of_num || 6.86189977884e-05
Coq_Structures_OrdersEx_Nat_as_OT_even || nat_of_num || 6.86189977884e-05
Coq_PArith_BinPos_Pos_sqrt || code_Suc || 6.80286192527e-05
Coq_PArith_POrderedType_Positive_as_DT_of_nat || nat2 || 6.78805427593e-05
Coq_PArith_POrderedType_Positive_as_OT_of_nat || nat2 || 6.78805427593e-05
Coq_Structures_OrdersEx_Positive_as_DT_of_nat || nat2 || 6.78805427593e-05
Coq_Structures_OrdersEx_Positive_as_OT_of_nat || nat2 || 6.78805427593e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nat || 6.75509261142e-05
Coq_Numbers_Natural_Binary_NBinary_N_log2_up || int_ge_less_than2 || 6.70368122773e-05
Coq_Structures_OrdersEx_N_as_OT_log2_up || int_ge_less_than2 || 6.70368122773e-05
Coq_Structures_OrdersEx_N_as_DT_log2_up || int_ge_less_than2 || 6.70368122773e-05
Coq_Numbers_Natural_Binary_NBinary_N_log2_up || int_ge_less_than || 6.70368122773e-05
Coq_Structures_OrdersEx_N_as_OT_log2_up || int_ge_less_than || 6.70368122773e-05
Coq_Structures_OrdersEx_N_as_DT_log2_up || int_ge_less_than || 6.70368122773e-05
Coq_NArith_BinNat_N_log2_up || int_ge_less_than2 || 6.70274089232e-05
Coq_NArith_BinNat_N_log2_up || int_ge_less_than || 6.70274089232e-05
Coq_Arith_PeanoNat_Nat_odd || nat_of_num || 6.65728246587e-05
Coq_Structures_OrdersEx_Nat_as_DT_odd || nat_of_num || 6.65728246587e-05
Coq_Structures_OrdersEx_Nat_as_OT_odd || nat_of_num || 6.65728246587e-05
Coq_Arith_PeanoNat_Nat_div2 || bit1 || 6.61874548087e-05
Coq_Relations_Relation_Operators_clos_trans_0 || tl || 6.60156550802e-05
Coq_ZArith_BinInt_Z_quot2 || dup || 6.51651848872e-05
Coq_ZArith_BinInt_Z_pred || dup || 6.50560328227e-05
Coq_Classes_RelationClasses_complement || butlast || 6.49301932935e-05
Coq_ZArith_Int_Z_as_Int__0 || nat || 6.44570484221e-05
Coq_Numbers_Natural_BigN_BigN_BigN_one || bNF_Ca1495478003natLeq || 6.38911949683e-05
Coq_Numbers_Natural_Binary_NBinary_N_add || remdups || 6.30821196669e-05
Coq_Structures_OrdersEx_N_as_OT_add || remdups || 6.30821196669e-05
Coq_Structures_OrdersEx_N_as_DT_add || remdups || 6.30821196669e-05
Coq_Arith_Wf_nat_gtof || remdups || 6.21365021716e-05
Coq_Arith_Wf_nat_ltof || remdups || 6.21365021716e-05
Coq_Classes_RelationClasses_RewriteRelation_0 || reflp || 6.20430538182e-05
Coq_NArith_BinNat_N_add || remdups || 6.20217992566e-05
Coq_ZArith_BinInt_Z_pred || code_dup || 6.17757790912e-05
Coq_Numbers_Natural_BigN_BigN_BigN_level || neg || 6.16035893464e-05
Coq_ZArith_BinInt_Z_sqrt || bit1 || 6.09751958078e-05
Coq_Classes_RelationClasses_complement || tl || 6.05431199013e-05
Coq_Numbers_Natural_BigN_BigN_BigN_level || pos || 6.02484120379e-05
Coq_ZArith_BinInt_Z_quot2 || code_dup || 5.97770070225e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || bNF_Ca1495478003natLeq || 5.96514493886e-05
Coq_Numbers_Natural_BigN_BigN_BigN_level || code_Neg || 5.95316101009e-05
Coq_Numbers_Natural_Binary_NBinary_N_log2 || int_ge_less_than2 || 5.94908845749e-05
Coq_Structures_OrdersEx_N_as_OT_log2 || int_ge_less_than2 || 5.94908845749e-05
Coq_Structures_OrdersEx_N_as_DT_log2 || int_ge_less_than2 || 5.94908845749e-05
Coq_Numbers_Natural_Binary_NBinary_N_log2 || int_ge_less_than || 5.94908845749e-05
Coq_Structures_OrdersEx_N_as_OT_log2 || int_ge_less_than || 5.94908845749e-05
Coq_Structures_OrdersEx_N_as_DT_log2 || int_ge_less_than || 5.94908845749e-05
Coq_NArith_BinNat_N_log2 || int_ge_less_than2 || 5.94825396953e-05
Coq_NArith_BinNat_N_log2 || int_ge_less_than || 5.94825396953e-05
Coq_Structures_OrdersEx_Nat_as_DT_Odd || nat2 || 5.91112347189e-05
Coq_Structures_OrdersEx_Nat_as_OT_Odd || nat2 || 5.91112347189e-05
Coq_Arith_PeanoNat_Nat_Odd || nat2 || 5.79470420081e-05
Coq_Numbers_Natural_BigN_BigN_BigN_le || wf || 5.78054174512e-05
Coq_Structures_OrdersEx_N_as_OT_succ || nil || 5.7745476342e-05
Coq_Structures_OrdersEx_N_as_DT_succ || nil || 5.7745476342e-05
Coq_Numbers_Natural_Binary_NBinary_N_succ || nil || 5.7745476342e-05
Coq_Init_Datatypes_negb || nat2 || 5.7659565434e-05
Coq_ZArith_BinInt_Z_abs_N || bit0 || 5.75107563748e-05
Coq_NArith_BinNat_N_succ || nil || 5.73595544141e-05
Coq_ZArith_BinInt_Z_opp || bit1 || 5.73017293145e-05
Coq_Numbers_Natural_BigN_BigN_BigN_level || code_Pos || 5.71767652421e-05
Coq_Numbers_Natural_BigN_BigN_BigN_lt || wf || 5.60243153879e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_div2 || code_Suc || 5.56154304703e-05
Coq_Structures_OrdersEx_Nat_as_DT_Even || nat2 || 5.54949412967e-05
Coq_Structures_OrdersEx_Nat_as_OT_Even || nat2 || 5.54949412967e-05
Coq_Classes_RelationClasses_PER_0 || equiv_part_equivp || 5.51653097063e-05
Coq_Arith_PeanoNat_Nat_Even || nat2 || 5.48025361414e-05
Coq_Numbers_Natural_BigN_BigN_BigN_lt || trans || 5.42307344066e-05
Coq_Numbers_Natural_Binary_NBinary_N_lt || wf || 5.40944871642e-05
Coq_Structures_OrdersEx_N_as_OT_lt || wf || 5.40944871642e-05
Coq_Structures_OrdersEx_N_as_DT_lt || wf || 5.40944871642e-05
__constr_Coq_Init_Datatypes_bool_0_2 || of_int || 5.40717935264e-05
Coq_NArith_BinNat_N_lt || wf || 5.38797229646e-05
Coq_ZArith_BinInt_Z_even || inc || 5.38702614741e-05
Coq_Classes_SetoidClass_pequiv || id_on || 5.36049435225e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || trans || 5.34750374568e-05
Coq_PArith_BinPos_Pos_of_nat || nat2 || 5.29301313979e-05
Coq_Arith_PeanoNat_Nat_even || nat2 || 5.26792095233e-05
Coq_Structures_OrdersEx_Nat_as_DT_even || nat2 || 5.26792095233e-05
Coq_Structures_OrdersEx_Nat_as_OT_even || nat2 || 5.26792095233e-05
__constr_Coq_Init_Datatypes_bool_0_1 || of_int || 5.23670274817e-05
Coq_Arith_PeanoNat_Nat_odd || nat2 || 5.14862581275e-05
Coq_Structures_OrdersEx_Nat_as_DT_odd || nat2 || 5.14862581275e-05
Coq_Structures_OrdersEx_Nat_as_OT_odd || nat2 || 5.14862581275e-05
Coq_ZArith_BinInt_Z_odd || inc || 5.13676366255e-05
Coq_ZArith_BinInt_Z_abs || bit1 || 5.12049835846e-05
Coq_Arith_PeanoNat_Nat_div2 || dup || 5.09008860812e-05
Coq_ZArith_BinInt_Z_abs_nat || bit0 || 4.98312532245e-05
Coq_Classes_RelationClasses_PER_0 || reflp || 4.98166428611e-05
Coq_Numbers_Cyclic_Int31_Int31_phi_inv || inc || 4.97819087449e-05
Coq_Numbers_Natural_BigN_BigN_BigN_one || less_than || 4.88744766394e-05
__constr_Coq_Numbers_BinNums_N_0_2 || bit0 || 4.87634695315e-05
Coq_Numbers_Natural_Binary_NBinary_N_succ || int_ge_less_than2 || 4.81025083616e-05
Coq_Structures_OrdersEx_N_as_OT_succ || int_ge_less_than2 || 4.81025083616e-05
Coq_Structures_OrdersEx_N_as_DT_succ || int_ge_less_than2 || 4.81025083616e-05
Coq_Numbers_Natural_Binary_NBinary_N_succ || int_ge_less_than || 4.81025083616e-05
Coq_Structures_OrdersEx_N_as_OT_succ || int_ge_less_than || 4.81025083616e-05
Coq_Structures_OrdersEx_N_as_DT_succ || int_ge_less_than || 4.81025083616e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || wf || 4.78710262773e-05
Coq_NArith_BinNat_N_succ || int_ge_less_than2 || 4.76581359299e-05
Coq_NArith_BinNat_N_succ || int_ge_less_than || 4.76581359299e-05
Coq_Arith_PeanoNat_Nat_div2 || code_dup || 4.71889712737e-05
Coq_QArith_Qreals_Q2R || code_natural_of_nat || 4.70767130182e-05
Coq_Arith_Wf_nat_inv_lt_rel || remdups || 4.68798073592e-05
Coq_ZArith_BinInt_Z_even || bit1 || 4.6700912622e-05
Coq_Numbers_Cyclic_Int31_Int31_phi_inv || bitM || 4.64600006138e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || less_than || 4.54740069784e-05
Coq_ZArith_BinInt_Z_odd || bit1 || 4.51510218753e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt || code_Suc || 4.43873652371e-05
Coq_Reals_Rtrigo_def_exp || code_nat_of_natural || 4.41251248813e-05
Coq_Sets_Relations_1_Transitive || sym || 4.38641364546e-05
__constr_Coq_Numbers_BinNums_Z_0_1 || product_unit || 4.31791022145e-05
Coq_Numbers_Natural_Binary_NBinary_N_div2 || dup || 4.22493630607e-05
Coq_Structures_OrdersEx_N_as_OT_div2 || dup || 4.22493630607e-05
Coq_Structures_OrdersEx_N_as_DT_div2 || dup || 4.22493630607e-05
Coq_Numbers_Cyclic_Int31_Int31_phi_inv || neg || 4.2176307674e-05
Coq_ZArith_BinInt_Z_of_N || nat_of_num || 4.2057363404e-05
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || code_nat_of_natural || 4.17993452248e-05
Coq_Numbers_Cyclic_Int31_Int31_phi_inv || code_Neg || 4.17355320719e-05
Coq_Numbers_Cyclic_Int31_Int31_phi_inv || pos || 4.12820093154e-05
Coq_Numbers_Natural_BigN_BigN_BigN_le || trans || 4.05998022755e-05
Coq_Numbers_Cyclic_Int31_Int31_phi_inv || code_Pos || 4.01434671455e-05
Coq_ZArith_BinInt_Z_Odd || inc || 4.00922593649e-05
Coq_PArith_BinPos_Pos_pred_N || nat_of_num || 3.9420716999e-05
__constr_Coq_Numbers_BinNums_N_0_1 || product_unit || 3.92612587257e-05
Coq_Numbers_Cyclic_Int31_Int31_incr || bitM || 3.91836825955e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_two || pred_nat || 3.89220473841e-05
Coq_NArith_BinNat_N_div2 || bitM || 3.88441685948e-05
Coq_Numbers_Natural_BigN_BigN_BigN_two || pred_nat || 3.85135793843e-05
Coq_NArith_BinNat_N_div2 || code_Suc || 3.78444984555e-05
Coq_ZArith_BinInt_Z_Even || inc || 3.77746575632e-05
Coq_ZArith_BinInt_Z_abs_nat || bit1 || 3.77681068862e-05
Coq_Classes_SetoidClass_pequiv || measure || 3.68570371599e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || trans || 3.61942869442e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_log2 || code_Suc || 3.6009718621e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sgn || code_Suc || 3.51224759262e-05
Coq_ZArith_BinInt_Z_abs_N || bit1 || 3.33269410192e-05
__constr_Coq_Init_Datatypes_bool_0_2 || code_natural_of_nat || 3.3167115037e-05
Coq_ZArith_BinInt_Z_of_nat || nat_of_num || 3.29359916413e-05
Coq_PArith_BinPos_Pos_of_nat || nat_of_num || 3.27629026318e-05
__constr_Coq_Init_Datatypes_bool_0_1 || code_natural_of_nat || 3.254528199e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lcm || upt || 3.25419180746e-05
Coq_QArith_QArith_base_Qopp || suc || 3.14870203927e-05
Coq_Sets_Relations_1_Symmetric || wf || 3.12219625781e-05
Coq_Numbers_Cyclic_Int31_Int31_phi_inv || bit1 || 3.11764377104e-05
Coq_ZArith_BinInt_Z_to_N || bit0 || 3.10872481561e-05
Coq_Numbers_Integer_Binary_ZBinary_Z_le || trans || 3.10770021161e-05
Coq_Structures_OrdersEx_Z_as_OT_le || trans || 3.10770021161e-05
Coq_Structures_OrdersEx_Z_as_DT_le || trans || 3.10770021161e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || linorder_sorted || 3.10494863916e-05
Coq_ZArith_BinInt_Z_div2 || bitM || 3.09842505557e-05
Coq_Numbers_Natural_BigN_BigN_BigN_gcd || upt || 3.08995964448e-05
Coq_Sets_Relations_1_Reflexive || sym || 3.06399355552e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || distinct || 3.05615402864e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_gcd || upt || 3.04900911464e-05
Coq_ZArith_Int_Z_as_Int__0 || code_integer || 2.99343032077e-05
Coq_Numbers_Natural_BigN_BigN_BigN_level || bit1 || 2.95335638952e-05
Coq_ZArith_BinInt_Z_to_nat || bit0 || 2.92902807469e-05
Coq_Init_Peano_lt || null || 2.87716607606e-05
Coq_Numbers_Natural_BigN_BigN_BigN_lt || antisym || 2.87048052054e-05
Coq_ZArith_BinInt_Z_pred || bitM || 2.85439259874e-05
Coq_PArith_BinPos_Pos_of_succ_nat || code_integer_of_int || 2.85068964416e-05
Coq_QArith_Qreals_Q2R || code_nat_of_natural || 2.83126321641e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || antisym || 2.82510000579e-05
Coq_Init_Peano_le_0 || null || 2.80979023301e-05
Coq_Classes_SetoidClass_pequiv || measures || 2.80766729781e-05
Coq_ZArith_BinInt_Z_Odd || bit1 || 2.79651531196e-05
Coq_Logic_ClassicalFacts_FalseP || right || 2.78816337826e-05
Coq_Numbers_Cyclic_Int31_Int31_incr || bit1 || 2.77464085484e-05
Coq_ZArith_BinInt_Z_Even || bit1 || 2.68326525423e-05
Coq_ZArith_BinInt_Z_to_pos || inc || 2.67819257548e-05
Coq_Reals_Rdefinitions_Rinv || suc || 2.67158865331e-05
Coq_ZArith_BinInt_Z_quot2 || bit0 || 2.65407351703e-05
Coq_Numbers_Natural_BigN_BigN_BigN_lt || bNF_Ca829732799finite || 2.63713633828e-05
Coq_Numbers_Natural_BigN_BigN_BigN_one || pred_nat || 2.62530673925e-05
Coq_Reals_R_Ifp_Int_part || inc || 2.62274712274e-05
__constr_Coq_Init_Datatypes_nat_0_1 || product_unit || 2.61211582465e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || bNF_Ca829732799finite || 2.60333997221e-05
__constr_Coq_Numbers_BinNums_positive_0_2 || bit0 || 2.54809700048e-05
Coq_NArith_BinNat_N_of_nat || bit0 || 2.52423442033e-05
__constr_Coq_Numbers_BinNums_positive_0_1 || nat_of_num || 2.5169806735e-05
Coq_ZArith_BinInt_Z_to_N || inc || 2.49810311779e-05
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || code_natural_of_nat || 2.48457248234e-05
Coq_ZArith_BinInt_Z_div2 || bit0 || 2.48446485538e-05
Coq_ZArith_BinInt_Z_quot2 || bit1 || 2.47419070765e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_div2 || bit0 || 2.46446561772e-05
Coq_ZArith_BinInt_Z_quot2 || bitM || 2.44690472343e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || pred_nat || 2.44130222769e-05
Coq_PArith_BinPos_Pos_pred || nat2 || 2.42964780785e-05
Coq_Init_Nat_pred || bit1 || 2.38584389605e-05
Coq_ZArith_BinInt_Z_div2 || bit1 || 2.37471571839e-05
Coq_Numbers_Cyclic_Int31_Int31_incr || bit0 || 2.37093725526e-05
Coq_Numbers_Natural_BigN_BigN_BigN_div2 || code_Suc || 2.36758988227e-05
Coq_Arith_PeanoNat_Nat_double || rep_Nat || 2.2993223821e-05
Coq_ZArith_BinInt_Z_abs || code_natural_of_nat || 2.25827658908e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || bitM || 2.25639481937e-05
Coq_PArith_BinPos_Pos_to_nat || nat2 || 2.23033596126e-05
Coq_ZArith_BinInt_Z_to_N || pos || 2.18298646915e-05
Coq_ZArith_BinInt_Z_to_N || bitM || 2.16971851419e-05
Coq_PArith_BinPos_Pos_pred || bit0 || 2.16575620371e-05
Coq_Init_Peano_lt || distinct || 2.14724947504e-05
Coq_ZArith_BinInt_Z_abs || nat_of_num || 2.12958812237e-05
Coq_NArith_BinNat_N_of_nat || code_nat_of_integer || 2.10121237362e-05
Coq_ZArith_BinInt_Z_to_nat || pos || 2.08844436208e-05
Coq_ZArith_BinInt_Z_log2 || dup || 2.06027108081e-05
Coq_Arith_PeanoNat_Nat_div2 || bitM || 2.02838804303e-05
Coq_PArith_BinPos_Pos_pred_N || bit0 || 2.01421310867e-05
Coq_ZArith_BinInt_Z_to_N || neg || 2.00913409716e-05
Coq_Numbers_Natural_BigN_BigN_BigN_div2 || bit0 || 1.99555057098e-05
Coq_Reals_Raxioms_INR || nat_of_num || 1.99187522158e-05
Coq_Numbers_Natural_BigN_BigN_BigN_le || antisym || 1.98646866262e-05
Coq_PArith_BinPos_Pos_div2_up || bit1 || 1.98144870823e-05
Coq_NArith_BinNat_N_to_nat || bit0 || 1.97223804512e-05
Coq_Numbers_Rational_BigQ_BigQ_BigQ_opp || suc || 1.95780375076e-05
Coq_ZArith_Zpower_two_power_pos || nat_of_num || 1.91975537565e-05
Coq_Numbers_Natural_BigN_BigN_BigN_sqrt || code_Suc || 1.91430620071e-05
Coq_NArith_BinNat_N_div2 || inc || 1.91310575688e-05
Coq_ZArith_BinInt_Z_to_N || code_Neg || 1.87104882553e-05
Coq_ZArith_BinInt_Z_abs_N || pos || 1.86451550042e-05
__constr_Coq_Numbers_BinNums_Z_0_2 || code_nat_of_natural || 1.83857034798e-05
__constr_Coq_Init_Datatypes_nat_0_2 || nat_of_num || 1.83535708036e-05
Coq_ZArith_BinInt_Z_to_pos || code_natural_of_nat || 1.82899925994e-05
Coq_Arith_PeanoNat_Nat_div2 || abs_Nat || 1.8207218851e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || antisym || 1.81894141446e-05
Coq_ZArith_BinInt_Z_to_N || code_Pos || 1.81765040857e-05
__constr_Coq_Init_Datatypes_nat_0_1 || rat || 1.81471045175e-05
Coq_Relations_Relation_Operators_clos_trans_0 || transitive_rtrancl || 1.81355755434e-05
Coq_Classes_SetoidClass_pequiv || transitive_trancl || 1.80784824223e-05
Coq_Reals_Rdefinitions_Ropp || suc || 1.79387761139e-05
Coq_ZArith_BinInt_Z_log2 || code_dup || 1.77022614305e-05
Coq_ZArith_BinInt_Z_to_nat || bitM || 1.7700733021e-05
__constr_Coq_Numbers_BinNums_Z_0_1 || rat || 1.76869202002e-05
Coq_ZArith_BinInt_Z_of_N || code_nat_of_natural || 1.75080706537e-05
Coq_Arith_PeanoNat_Nat_even || bit0 || 1.74249327876e-05
Coq_Structures_OrdersEx_Nat_as_DT_even || bit0 || 1.74249327876e-05
Coq_Structures_OrdersEx_Nat_as_OT_even || bit0 || 1.74249327876e-05
Coq_Arith_PeanoNat_Nat_odd || bit0 || 1.74145000493e-05
Coq_Structures_OrdersEx_Nat_as_DT_odd || bit0 || 1.74145000493e-05
Coq_Structures_OrdersEx_Nat_as_OT_odd || bit0 || 1.74145000493e-05
Coq_Sets_Relations_1_Order_0 || sym || 1.73852244725e-05
Coq_Numbers_Natural_BigN_BigN_BigN_le || bNF_Ca829732799finite || 1.73305443199e-05
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || inc || 1.72227983582e-05
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || code_Nat || 1.67767996724e-05
Coq_Classes_SetoidClass_pequiv || transitive_rtrancl || 1.67185598081e-05
Coq_Logic_ClassicalFacts_BoolP_elim || rec_sumbool || 1.66959615609e-05
Coq_ZArith_BinInt_Z_abs_N || inc || 1.6668245449e-05
__constr_Coq_Init_Datatypes_nat_0_1 || code_natural || 1.66543814475e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_log2 || bit0 || 1.64066924008e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || bNF_Ca829732799finite || 1.61863630292e-05
Coq_ZArith_BinInt_Z_to_nat || neg || 1.61379834464e-05
Coq_PArith_BinPos_Pos_pred || inc || 1.61097499601e-05
__constr_Coq_Numbers_BinNums_Z_0_1 || code_natural || 1.60148478317e-05
Coq_Reals_Rdefinitions_R0 || one2 || 1.59820405052e-05
Coq_Numbers_Natural_BigN_BigN_BigN_le || linorder_sorted || 1.59744060641e-05
Coq_ZArith_BinInt_Z_to_nat || code_Neg || 1.59667036916e-05
Coq_Numbers_Natural_BigN_BigN_BigN_le || distinct || 1.58985556812e-05
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || code_num_of_integer || 1.58098785107e-05
Coq_ZArith_BinInt_Z_to_N || code_natural_of_nat || 1.57530600592e-05
Coq_Reals_Raxioms_IZR || nat2 || 1.57221969874e-05
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || code_n1042895779nteger || 1.56550435301e-05
Coq_ZArith_BinInt_Z_to_nat || code_Pos || 1.54894998534e-05
Coq_ZArith_Int_Z_as_Int_i2z || field_char_0_of_rat || 1.4571573425e-05
Coq_ZArith_BinInt_Z_succ || code_natural_of_nat || 1.45423646878e-05
Coq_Lists_List_lel || member3 || 1.42247219733e-05
Coq_ZArith_BinInt_Z_square || bitM || 1.41660009236e-05
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || bitM || 1.41594611988e-05
Coq_Numbers_Natural_BigN_BigN_BigN_even || default_default || 1.40545304279e-05
Coq_Numbers_Natural_BigN_BigN_BigN_odd || default_default || 1.40130246879e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || field_char_0_of_rat || 1.40129146644e-05
Coq_Logic_ClassicalFacts_BoolP_elim || case_sumbool || 1.40054276899e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || default_default || 1.39936763891e-05
__constr_Coq_Numbers_BinNums_N_0_1 || rat || 1.37792684465e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || default_default || 1.37699317852e-05
Coq_ZArith_BinInt_Z_abs_nat || pos || 1.3586802764e-05
Coq_Lists_List_Exists_0 || member3 || 1.34879824298e-05
Coq_Lists_List_incl || member3 || 1.33195363081e-05
Coq_ZArith_BinInt_Z_sgn || dup || 1.32108180629e-05
Coq_ZArith_Int_Z_as_Int__0 || real || 1.28807840608e-05
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || field_char_0_of_rat || 1.28675572016e-05
Coq_ZArith_BinInt_Z_to_N || code_nat_of_integer || 1.27346194448e-05
Coq_Numbers_Natural_BigN_BigN_BigN_log2 || code_Suc || 1.26931823332e-05
Coq_NArith_BinNat_N_even || bit0 || 1.23370941328e-05
__constr_Coq_Numbers_BinNums_N_0_1 || code_natural || 1.23220848702e-05
__constr_Coq_Numbers_BinNums_N_0_2 || code_integer_of_int || 1.23171382489e-05
Coq_NArith_BinNat_N_odd || bit0 || 1.22400612398e-05
Coq_ZArith_BinInt_Z_abs || num_of_nat || 1.22337694473e-05
Coq_ZArith_BinInt_Z_abs || code_integer_of_int || 1.21801852866e-05
Coq_PArith_BinPos_Pos_succ || nat_of_num || 1.20808783987e-05
Coq_Numbers_Natural_BigN_BigN_BigN_log2 || bit0 || 1.19500389076e-05
Coq_ZArith_Zpower_two_power_nat || nat2 || 1.18947281906e-05
__constr_Coq_Numbers_BinNums_N_0_2 || code_nat_of_integer || 1.18777860812e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lcm || upto || 1.18335248831e-05
Coq_PArith_BinPos_Pos_pred_N || neg || 1.16520407524e-05
Coq_Reals_Raxioms_INR || bit0 || 1.16424469262e-05
__constr_Coq_Numbers_BinNums_Z_0_2 || bit0 || 1.16239184927e-05
Coq_ZArith_BinInt_Z_sgn || code_dup || 1.15971428962e-05
Coq_NArith_BinNat_N_succ || inc || 1.15763186243e-05
Coq_Numbers_Natural_Binary_NBinary_N_even || bit0 || 1.15638275698e-05
Coq_Structures_OrdersEx_N_as_OT_even || bit0 || 1.15638275698e-05
Coq_Structures_OrdersEx_N_as_DT_even || bit0 || 1.15638275698e-05
Coq_Numbers_Natural_Binary_NBinary_N_odd || bit0 || 1.15393099753e-05
Coq_Structures_OrdersEx_N_as_OT_odd || bit0 || 1.15393099753e-05
Coq_Structures_OrdersEx_N_as_DT_odd || bit0 || 1.15393099753e-05
Coq_ZArith_BinInt_Z_to_nat || inc || 1.15043619437e-05
Coq_PArith_BinPos_Pos_of_succ_nat || nat2 || 1.14684511201e-05
Coq_PArith_BinPos_Pos_of_nat || bit1 || 1.12009415996e-05
Coq_ZArith_BinInt_Z_abs || dup || 1.118753823e-05
Coq_Numbers_Natural_BigN_BigN_BigN_of_N || bit0 || 1.1150285532e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_gcd || upto || 1.10279424537e-05
Coq_NArith_BinNat_N_to_nat || code_nat_of_integer || 1.09773785133e-05
Coq_ZArith_BinInt_Z_abs_N || nat_of_num || 1.09074401342e-05
Coq_Classes_RelationClasses_Asymmetric || abel_s1917375468axioms || 1.08525186253e-05
Coq_PArith_BinPos_Pos_pred_N || bitM || 1.07290426303e-05
Coq_Numbers_Integer_Binary_ZBinary_Z_even || bit1 || 1.05184496588e-05
Coq_Structures_OrdersEx_Z_as_DT_even || bit1 || 1.05184496588e-05
Coq_Structures_OrdersEx_Z_as_OT_even || bit1 || 1.05184496588e-05
Coq_ZArith_BinInt_Z_abs_nat || code_integer_of_int || 1.05172424907e-05
Coq_ZArith_BinInt_Z_max || transitive_trancl || 1.05097219905e-05
Coq_ZArith_BinInt_Z_opp || dup || 1.04111975778e-05
Coq_Numbers_Natural_BigN_BigN_BigN_gcd || upto || 1.04007996084e-05
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || bit1 || 1.03424413135e-05
Coq_Structures_OrdersEx_Z_as_OT_odd || bit1 || 1.03424413135e-05
Coq_Structures_OrdersEx_Z_as_DT_odd || bit1 || 1.03424413135e-05
Coq_Numbers_Natural_BigN_BigN_BigN_one || product_unit || 1.0151444406e-05
Coq_ZArith_Int_Z_as_Int__0 || int || 1.00678094761e-05
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || pos || 9.9950326499e-06
Coq_Structures_OrdersEx_Z_as_OT_pred || pos || 9.9950326499e-06
Coq_Structures_OrdersEx_Z_as_DT_pred || pos || 9.9950326499e-06
Coq_PArith_BinPos_Pos_pred_N || bit1 || 9.89167474699e-06
Coq_ZArith_BinInt_Z_abs || code_dup || 9.84558802874e-06
Coq_Init_Wf_Acc_0 || accp || 9.82795751685e-06
Coq_Numbers_Natural_BigN_BigN_BigN_two || product_unit || 9.81609932638e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_two || product_unit || 9.72354777504e-06
Coq_Numbers_Natural_BigN_BigN_BigN_zero || product_unit || 9.71022094236e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || product_unit || 9.69701038395e-06
__constr_Coq_Numbers_BinNums_Z_0_3 || bit0 || 9.66900971928e-06
Coq_Numbers_Natural_BigN_BigN_BigN_of_N || code_integer_of_int || 9.65797668101e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || nat_of_num || 9.40577715498e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt_up || int_ge_less_than2 || 9.39468229304e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt_up || int_ge_less_than || 9.39468229304e-06
Coq_PArith_BinPos_Pos_pred_N || code_Neg || 9.30797214706e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt || int_ge_less_than2 || 9.17468930716e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt || int_ge_less_than || 9.17468930716e-06
Coq_ZArith_BinInt_Z_opp || code_dup || 9.17356071435e-06
Coq_PArith_POrderedType_Positive_as_DT_succ || inc || 9.15807719126e-06
Coq_PArith_POrderedType_Positive_as_OT_succ || inc || 9.15807719126e-06
Coq_Structures_OrdersEx_Positive_as_DT_succ || inc || 9.15807719126e-06
Coq_Structures_OrdersEx_Positive_as_OT_succ || inc || 9.15807719126e-06
Coq_ZArith_BinInt_Z_pred || pos || 9.14387661209e-06
Coq_PArith_BinPos_Pos_square || code_Suc || 9.10955782152e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || nat_of_num || 9.10837720901e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_zero || product_unit || 9.1005622428e-06
Coq_PArith_BinPos_Pos_pred_N || code_Pos || 9.03218518686e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_log2_up || int_ge_less_than2 || 8.98265960504e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_log2_up || int_ge_less_than || 8.98265960504e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_even || inc || 8.97704072308e-06
Coq_Structures_OrdersEx_Z_as_OT_even || inc || 8.97704072308e-06
Coq_Structures_OrdersEx_Z_as_DT_even || inc || 8.97704072308e-06
Coq_Arith_PeanoNat_Nat_max || transitive_trancl || 8.92893289557e-06
Coq_Numbers_Natural_BigN_BigN_BigN_sqrt_up || int_ge_less_than2 || 8.90432786095e-06
Coq_Numbers_Natural_BigN_BigN_BigN_sqrt_up || int_ge_less_than || 8.90432786095e-06
Coq_Classes_RelationClasses_Irreflexive || abel_s1917375468axioms || 8.80867375673e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || inc || 8.77149775163e-06
Coq_Structures_OrdersEx_Z_as_OT_odd || inc || 8.77149775163e-06
Coq_Structures_OrdersEx_Z_as_DT_odd || inc || 8.77149775163e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || inc || 8.65758611426e-06
Coq_Structures_OrdersEx_Z_as_OT_opp || inc || 8.65758611426e-06
Coq_Structures_OrdersEx_Z_as_DT_opp || inc || 8.65758611426e-06
Coq_ZArith_BinInt_Z_of_nat || code_nat_of_integer || 8.65203920901e-06
Coq_Numbers_Natural_BigN_BigN_BigN_log2_up || int_ge_less_than2 || 8.51381419477e-06
Coq_Numbers_Natural_BigN_BigN_BigN_log2_up || int_ge_less_than || 8.51381419477e-06
Coq_Numbers_Natural_BigN_BigN_BigN_even || nat_of_num || 8.4095278005e-06
Coq_Numbers_Natural_Binary_NBinary_N_succ || code_integer_of_int || 8.33245709596e-06
Coq_Structures_OrdersEx_N_as_DT_succ || code_integer_of_int || 8.33245709596e-06
Coq_Structures_OrdersEx_N_as_OT_succ || code_integer_of_int || 8.33245709596e-06
Coq_PArith_POrderedType_Positive_as_DT_succ || suc_Rep || 8.26890252589e-06
Coq_PArith_POrderedType_Positive_as_OT_succ || suc_Rep || 8.26890252589e-06
Coq_Structures_OrdersEx_Positive_as_DT_succ || suc_Rep || 8.26890252589e-06
Coq_Structures_OrdersEx_Positive_as_OT_succ || suc_Rep || 8.26890252589e-06
Coq_Numbers_Natural_BigN_BigN_BigN_odd || nat_of_num || 8.19367532418e-06
Coq_NArith_BinNat_N_succ || code_integer_of_int || 8.10713194769e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_log2 || int_ge_less_than2 || 7.99967653963e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_log2 || int_ge_less_than || 7.99967653963e-06
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || code_nat_of_integer || 7.99709892224e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || code_integer_of_int || 7.9809259237e-06
Coq_Structures_OrdersEx_Z_as_OT_succ || code_integer_of_int || 7.9809259237e-06
Coq_Structures_OrdersEx_Z_as_DT_succ || code_integer_of_int || 7.9809259237e-06
Coq_PArith_BinPos_Pos_succ || suc_Rep || 7.9023874122e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || dup || 7.86403135244e-06
Coq_Structures_OrdersEx_Z_as_OT_pred || dup || 7.86403135244e-06
Coq_Structures_OrdersEx_Z_as_DT_pred || dup || 7.86403135244e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_abs || int_ge_less_than2 || 7.81493754975e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_abs || int_ge_less_than || 7.81493754975e-06
Coq_ZArith_BinInt_Z_succ || num_of_nat || 7.69940709697e-06
Coq_Classes_RelationClasses_Asymmetric || semigroup || 7.65819975203e-06
Coq_ZArith_BinInt_Z_to_nat || code_nat_of_integer || 7.6124832963e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || ring_1_of_int || 7.59672279323e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || code_dup || 7.46153957508e-06
Coq_Structures_OrdersEx_Z_as_OT_pred || code_dup || 7.46153957508e-06
Coq_Structures_OrdersEx_Z_as_DT_pred || code_dup || 7.46153957508e-06
Coq_Numbers_Natural_BigN_BigN_BigN_log2 || int_ge_less_than2 || 7.45432606734e-06
Coq_Numbers_Natural_BigN_BigN_BigN_log2 || int_ge_less_than || 7.45432606734e-06
Coq_ZArith_BinInt_Z_succ || code_integer_of_int || 7.40409886683e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || dup || 7.3755271276e-06
Coq_Structures_OrdersEx_Z_as_OT_succ || dup || 7.3755271276e-06
Coq_Structures_OrdersEx_Z_as_DT_succ || dup || 7.3755271276e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || semiring_1_of_nat || 7.33600014723e-06
Coq_ZArith_BinInt_Z_even || pos || 7.33022374429e-06
__constr_Coq_Numbers_BinNums_Z_0_2 || code_Nat || 7.31111254104e-06
Coq_ZArith_BinInt_Z_even || bit0 || 7.2950260197e-06
Coq_ZArith_BinInt_Z_odd || pos || 7.27448362716e-06
__constr_Coq_Init_Datatypes_nat_0_2 || code_integer_of_int || 7.27317087816e-06
Coq_ZArith_BinInt_Z_log2 || bitM || 7.20994526838e-06
Coq_NArith_BinNat_N_to_nat || code_integer_of_int || 7.12558062295e-06
Coq_ZArith_BinInt_Z_odd || bit0 || 7.11990213518e-06
Coq_ZArith_BinInt_Z_abs || pos || 7.05056293556e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || code_dup || 7.03666919061e-06
Coq_Structures_OrdersEx_Z_as_OT_succ || code_dup || 7.03666919061e-06
Coq_Structures_OrdersEx_Z_as_DT_succ || code_dup || 7.03666919061e-06
Coq_ZArith_BinInt_Z_square || bit1 || 6.99612593888e-06
__constr_Coq_Numbers_BinNums_Z_0_2 || code_n1042895779nteger || 6.96919875065e-06
Coq_PArith_BinPos_Pos_succ || code_Suc || 6.902924775e-06
Coq_ZArith_BinInt_Z_lt || null || 6.86334747592e-06
__constr_Coq_Numbers_BinNums_Z_0_2 || code_num_of_integer || 6.82723443697e-06
Coq_ZArith_BinInt_Z_abs_nat || inc || 6.77293581446e-06
Coq_Numbers_Natural_Binary_NBinary_N_pred || nat2 || 6.76988617849e-06
Coq_Structures_OrdersEx_N_as_OT_pred || nat2 || 6.76988617849e-06
Coq_Structures_OrdersEx_N_as_DT_pred || nat2 || 6.76988617849e-06
Coq_Sets_Relations_1_facts_Complement || transitive_trancl || 6.76310502873e-06
Coq_Reals_R_Ifp_Int_part || code_nat_of_integer || 6.6943369436e-06
Coq_ZArith_BinInt_Z_le || null || 6.67174936876e-06
Coq_NArith_BinNat_N_pred || nat2 || 6.66924223706e-06
Coq_Numbers_Natural_Binary_NBinary_N_succ || inc || 6.5595395793e-06
Coq_Structures_OrdersEx_N_as_OT_succ || inc || 6.5595395793e-06
Coq_Structures_OrdersEx_N_as_DT_succ || inc || 6.5595395793e-06
Coq_ZArith_BinInt_Z_pred || code_Suc || 6.54046958027e-06
Coq_Logic_ClassicalFacts_TrueP || left || 6.53228847866e-06
Coq_ZArith_BinInt_Z_even || code_integer_of_int || 6.4729258215e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_even || code_nat_of_integer || 6.44671690986e-06
Coq_Structures_OrdersEx_Z_as_OT_even || code_nat_of_integer || 6.44671690986e-06
Coq_Structures_OrdersEx_Z_as_DT_even || code_nat_of_integer || 6.44671690986e-06
Coq_Numbers_Natural_BigN_BigN_BigN_succ || int_ge_less_than2 || 6.44557931872e-06
Coq_Numbers_Natural_BigN_BigN_BigN_succ || int_ge_less_than || 6.44557931872e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || code_nat_of_integer || 6.38477286828e-06
Coq_Structures_OrdersEx_Z_as_OT_odd || code_nat_of_integer || 6.38477286828e-06
Coq_Structures_OrdersEx_Z_as_DT_odd || code_nat_of_integer || 6.38477286828e-06
Coq_ZArith_BinInt_Z_odd || code_integer_of_int || 6.37808502307e-06
Coq_ZArith_BinInt_Z_even || code_nat_of_integer || 6.32489480275e-06
Coq_NArith_BinNat_N_succ || code_Suc || 6.30708215306e-06
Coq_ZArith_BinInt_Z_odd || code_nat_of_integer || 6.20561327975e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || neg || 6.09060067926e-06
Coq_Structures_OrdersEx_Z_as_OT_opp || neg || 6.09060067926e-06
Coq_Structures_OrdersEx_Z_as_DT_opp || neg || 6.09060067926e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || code_Neg || 6.05356585089e-06
Coq_Structures_OrdersEx_Z_as_OT_opp || code_Neg || 6.05356585089e-06
Coq_Structures_OrdersEx_Z_as_DT_opp || code_Neg || 6.05356585089e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || pos || 6.0103801341e-06
Coq_Structures_OrdersEx_Z_as_OT_opp || pos || 6.0103801341e-06
Coq_Structures_OrdersEx_Z_as_DT_opp || pos || 6.0103801341e-06
Coq_Numbers_Natural_Binary_NBinary_N_div2 || code_dup || 5.99469875517e-06
Coq_Structures_OrdersEx_N_as_OT_div2 || code_dup || 5.99469875517e-06
Coq_Structures_OrdersEx_N_as_DT_div2 || code_dup || 5.99469875517e-06
Coq_Numbers_Rational_BigQ_BigQ_BigN_BigZ_Z_of_N || code_integer_of_int || 5.99214160596e-06
Coq_Init_Datatypes_length || hd || 5.93078199116e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || code_Pos || 5.90889331858e-06
Coq_Structures_OrdersEx_Z_as_OT_opp || code_Pos || 5.90889331858e-06
Coq_Structures_OrdersEx_Z_as_DT_opp || code_Pos || 5.90889331858e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || default_default || 5.88951721136e-06
Coq_Structures_OrdersEx_Z_as_OT_odd || default_default || 5.88951721136e-06
Coq_Structures_OrdersEx_Z_as_DT_odd || default_default || 5.88951721136e-06
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || ring_1_of_int || 5.85972022151e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_even || default_default || 5.79391798369e-06
Coq_Structures_OrdersEx_Z_as_OT_even || default_default || 5.79391798369e-06
Coq_Structures_OrdersEx_Z_as_DT_even || default_default || 5.79391798369e-06
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || finite_psubset || 5.78620977625e-06
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || finite_psubset || 5.78620977625e-06
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || finite_psubset || 5.78620977625e-06
Coq_Numbers_Natural_Binary_NBinary_N_odd || default_default || 5.78061117525e-06
Coq_Structures_OrdersEx_N_as_OT_odd || default_default || 5.78061117525e-06
Coq_Structures_OrdersEx_N_as_DT_odd || default_default || 5.78061117525e-06
Coq_NArith_BinNat_N_sqrt_up || finite_psubset || 5.77571819735e-06
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || semiring_1_of_nat || 5.76493650741e-06
__constr_Coq_Init_Datatypes_nat_0_2 || id2 || 5.73003308457e-06
Coq_Numbers_Natural_Binary_NBinary_N_even || default_default || 5.68930103142e-06
Coq_NArith_BinNat_N_even || default_default || 5.68930103142e-06
Coq_Structures_OrdersEx_N_as_OT_even || default_default || 5.68930103142e-06
Coq_Structures_OrdersEx_N_as_DT_even || default_default || 5.68930103142e-06
Coq_Numbers_Natural_Binary_NBinary_N_succ_pos || code_integer_of_int || 5.65803940973e-06
Coq_Structures_OrdersEx_N_as_OT_succ_pos || code_integer_of_int || 5.65803940973e-06
Coq_Structures_OrdersEx_N_as_DT_succ_pos || code_integer_of_int || 5.65803940973e-06
Coq_NArith_BinNat_N_succ_pos || code_integer_of_int || 5.62982492063e-06
Coq_PArith_BinPos_Pos_pred_double || bit0 || 5.62823199076e-06
Coq_Numbers_Natural_Binary_NBinary_N_log2_up || finite_psubset || 5.54635393154e-06
Coq_Structures_OrdersEx_N_as_OT_log2_up || finite_psubset || 5.54635393154e-06
Coq_Structures_OrdersEx_N_as_DT_log2_up || finite_psubset || 5.54635393154e-06
Coq_NArith_BinNat_N_log2_up || finite_psubset || 5.53629728166e-06
Coq_ZArith_BinInt_Z_abs_nat || nat_of_num || 5.5271951129e-06
Coq_ZArith_BinInt_Z_to_nat || code_integer_of_int || 5.51158391338e-06
Coq_Classes_RelationClasses_Asymmetric || equiv_part_equivp || 5.49116719312e-06
Coq_Numbers_Natural_BigN_BigN_BigN_of_N || pos || 5.45275476604e-06
Coq_ZArith_BinInt_Z_abs_N || code_integer_of_int || 5.44624680627e-06
Coq_ZArith_BinInt_Z_of_N || code_nat_of_integer || 5.39643947809e-06
Coq_ZArith_BinInt_Z_even || default_default || 5.32122485643e-06
Coq_PArith_POrderedType_Positive_as_DT_pred_double || nat2 || 5.25981699815e-06
Coq_PArith_POrderedType_Positive_as_OT_pred_double || nat2 || 5.25981699815e-06
Coq_Structures_OrdersEx_Positive_as_DT_pred_double || nat2 || 5.25981699815e-06
Coq_Structures_OrdersEx_Positive_as_OT_pred_double || nat2 || 5.25981699815e-06
Coq_Numbers_Rational_BigQ_BigQ_BigN_BigZ_Zabs_N || code_Nat || 5.23036457728e-06
Coq_ZArith_BinInt_Z_odd || default_default || 5.21095120083e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || bit1 || 5.16286268759e-06
Coq_Structures_OrdersEx_Z_as_OT_opp || bit1 || 5.16286268759e-06
Coq_Structures_OrdersEx_Z_as_DT_opp || bit1 || 5.16286268759e-06
Coq_ZArith_BinInt_Z_to_N || nat_of_num || 5.12329395349e-06
Coq_ZArith_BinInt_Z_lt || distinct || 5.1185019631e-06
Coq_Arith_PeanoNat_Nat_odd || default_default || 5.09837553509e-06
Coq_Structures_OrdersEx_Nat_as_DT_odd || default_default || 5.09837553509e-06
Coq_Structures_OrdersEx_Nat_as_OT_odd || default_default || 5.09837553509e-06
Coq_Numbers_Natural_Binary_NBinary_N_pred || code_nat_of_integer || 5.07732161343e-06
Coq_Structures_OrdersEx_N_as_OT_pred || code_nat_of_integer || 5.07732161343e-06
Coq_Structures_OrdersEx_N_as_DT_pred || code_nat_of_integer || 5.07732161343e-06
Coq_Arith_PeanoNat_Nat_even || default_default || 5.04532850195e-06
Coq_Structures_OrdersEx_Nat_as_DT_even || default_default || 5.04532850195e-06
Coq_Structures_OrdersEx_Nat_as_OT_even || default_default || 5.04532850195e-06
Coq_NArith_BinNat_N_odd || default_default || 5.01409622837e-06
Coq_NArith_BinNat_N_pred || code_nat_of_integer || 4.96722327108e-06
Coq_PArith_BinPos_Pos_pred_double || nat2 || 4.86905399018e-06
Coq_ZArith_BinInt_Z_succ || id2 || 4.85271903101e-06
Coq_ZArith_BinInt_Z_max || id_on || 4.84891124536e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || bit1 || 4.81704818577e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_Odd || inc || 4.80122868417e-06
Coq_Structures_OrdersEx_Z_as_OT_Odd || inc || 4.80122868417e-06
Coq_Structures_OrdersEx_Z_as_DT_Odd || inc || 4.80122868417e-06
Coq_Classes_RelationClasses_Asymmetric || reflp || 4.77056895636e-06
Coq_Relations_Relation_Operators_clos_trans_0 || transitive_rtranclp || 4.75488830765e-06
Coq_Numbers_Natural_BigN_BigN_BigN_even || bit1 || 4.74887137681e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || bit1 || 4.70488568639e-06
Coq_Classes_RelationClasses_Irreflexive || equiv_part_equivp || 4.67540781887e-06
Coq_Numbers_Natural_BigN_BigN_BigN_odd || bit1 || 4.66361497834e-06
__constr_Coq_Numbers_BinNums_Z_0_1 || of_int || 4.59188127593e-06
Coq_Structures_OrdersEx_Nat_as_DT_max || transitive_trancl || 4.55933748003e-06
Coq_Structures_OrdersEx_Nat_as_OT_max || transitive_trancl || 4.55933748003e-06
__constr_Coq_Numbers_BinNums_positive_0_2 || bit1 || 4.52629450049e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_Even || inc || 4.4964711766e-06
Coq_Structures_OrdersEx_Z_as_OT_Even || inc || 4.4964711766e-06
Coq_Structures_OrdersEx_Z_as_DT_Even || inc || 4.4964711766e-06
Coq_Numbers_Natural_Binary_NBinary_N_Odd || code_nat_of_integer || 4.49176635032e-06
Coq_Structures_OrdersEx_N_as_OT_Odd || code_nat_of_integer || 4.49176635032e-06
Coq_Structures_OrdersEx_N_as_DT_Odd || code_nat_of_integer || 4.49176635032e-06
Coq_NArith_BinNat_N_Odd || code_nat_of_integer || 4.45871835293e-06
Coq_Numbers_Rational_BigQ_BigQ_BigN_BigZ_Zabs_N || code_n1042895779nteger || 4.4379481929e-06
Coq_Classes_RelationClasses_StrictOrder_0 || bNF_Cardinal_cfinite || 4.36121384086e-06
Coq_Numbers_Cyclic_Int31_Int31_phi_inv || code_natural_of_nat || 4.3488995207e-06
Coq_Numbers_Natural_Binary_NBinary_N_Even || code_nat_of_integer || 4.30566334632e-06
Coq_Structures_OrdersEx_N_as_OT_Even || code_nat_of_integer || 4.30566334632e-06
Coq_Structures_OrdersEx_N_as_DT_Even || code_nat_of_integer || 4.30566334632e-06
Coq_Sets_Relations_1_facts_Complement || transitive_rtrancl || 4.28514261268e-06
Coq_NArith_BinNat_N_Even || code_nat_of_integer || 4.27421868575e-06
Coq_Numbers_Natural_BigN_BigN_BigN_odd || top_top || 4.26358879423e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || code_integer_of_int || 4.25178299566e-06
Coq_Structures_OrdersEx_Z_as_OT_pred || code_integer_of_int || 4.25178299566e-06
Coq_Structures_OrdersEx_Z_as_DT_pred || code_integer_of_int || 4.25178299566e-06
Coq_PArith_BinPos_Pos_div2_up || inc || 4.24568193337e-06
Coq_Numbers_Natural_BigN_BigN_BigN_of_pos || bit0 || 4.2280539412e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || top_top || 4.22701504274e-06
Coq_Numbers_Natural_Binary_NBinary_N_even || pos || 4.22631366059e-06
Coq_Structures_OrdersEx_N_as_OT_even || pos || 4.22631366059e-06
Coq_Structures_OrdersEx_N_as_DT_even || pos || 4.22631366059e-06
Coq_Numbers_Natural_Binary_NBinary_N_odd || pos || 4.2114576324e-06
Coq_Structures_OrdersEx_N_as_OT_odd || pos || 4.2114576324e-06
Coq_Structures_OrdersEx_N_as_DT_odd || pos || 4.2114576324e-06
Coq_Init_Peano_lt || bNF_Wellorder_wo_rel || 4.209746518e-06
Coq_Arith_PeanoNat_Nat_max || id_on || 4.20957666984e-06
Coq_Numbers_Natural_BigN_BigN_BigN_even || top_top || 4.19432212456e-06
Coq_Numbers_Cyclic_Int31_Int31_incr || code_Suc || 4.18478809302e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || top_top || 4.17616114523e-06
Coq_Classes_RelationClasses_Irreflexive || reflp || 4.13578456428e-06
Coq_ZArith_Int_Z_as_Int_i2z || semiring_1_of_nat || 4.12459534174e-06
Coq_Numbers_Natural_BigN_BigN_BigN_odd || bot_bot || 4.0988675481e-06
Coq_ZArith_BinInt_Z_pred || code_integer_of_int || 4.08244631129e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || bot_bot || 4.06439347212e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_even || pos || 4.06039646886e-06
Coq_Structures_OrdersEx_Z_as_OT_even || pos || 4.06039646886e-06
Coq_Structures_OrdersEx_Z_as_DT_even || pos || 4.06039646886e-06
Coq_ZArith_Int_Z_as_Int_i2z || ring_1_of_int || 4.04879733252e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || pos || 4.04665829588e-06
Coq_Structures_OrdersEx_Z_as_OT_odd || pos || 4.04665829588e-06
Coq_Structures_OrdersEx_Z_as_DT_odd || pos || 4.04665829588e-06
Coq_Numbers_Natural_BigN_BigN_BigN_even || bot_bot || 4.03080483871e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || bot_bot || 4.01335186977e-06
__constr_Coq_Numbers_BinNums_N_0_1 || left || 4.01243848107e-06
Coq_Init_Nat_max || transitive_trancl || 3.97795502853e-06
Coq_Numbers_Natural_BigN_BigN_BigN_Ndigits || code_Nat || 3.96620639204e-06
Coq_NArith_BinNat_N_even || pos || 3.95038490131e-06
Coq_ZArith_BinInt_Z_max || transitive_rtrancl || 3.9498879743e-06
Coq_Numbers_Natural_Binary_NBinary_N_max || measure || 3.92869134179e-06
Coq_Structures_OrdersEx_N_as_OT_max || measure || 3.92869134179e-06
Coq_Structures_OrdersEx_N_as_DT_max || measure || 3.92869134179e-06
Coq_NArith_BinNat_N_of_nat || code_integer_of_int || 3.92747475138e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || code_nat_of_integer || 3.89861482424e-06
Coq_NArith_BinNat_N_odd || pos || 3.88540530742e-06
__constr_Coq_Init_Datatypes_nat_0_1 || of_int || 3.85758829516e-06
Coq_NArith_BinNat_N_max || measure || 3.84953970347e-06
Coq_ZArith_Zpower_two_power_nat || inc || 3.83647612765e-06
__constr_Coq_Numbers_BinNums_N_0_1 || of_int || 3.80343972859e-06
__constr_Coq_Numbers_BinNums_Z_0_1 || product_Unity || 3.7974370569e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_Odd || code_nat_of_integer || 3.75458364795e-06
Coq_Structures_OrdersEx_Z_as_OT_Odd || code_nat_of_integer || 3.75458364795e-06
Coq_Structures_OrdersEx_Z_as_DT_Odd || code_nat_of_integer || 3.75458364795e-06
__constr_Coq_Numbers_BinNums_N_0_1 || product_Unity || 3.68199470158e-06
__constr_Coq_Init_Datatypes_nat_0_1 || product_Unity || 3.66506196155e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_Even || code_nat_of_integer || 3.64742104274e-06
Coq_Structures_OrdersEx_Z_as_OT_Even || code_nat_of_integer || 3.64742104274e-06
Coq_Structures_OrdersEx_Z_as_DT_Even || code_nat_of_integer || 3.64742104274e-06
Coq_Reals_Raxioms_IZR || inc || 3.60158006894e-06
Coq_Reals_Raxioms_INR || code_integer_of_int || 3.56228821784e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || bitM || 3.49026294255e-06
Coq_Structures_OrdersEx_Z_as_OT_pred || bitM || 3.49026294255e-06
Coq_Structures_OrdersEx_Z_as_DT_pred || bitM || 3.49026294255e-06
Coq_ZArith_BinInt_Z_Odd || code_nat_of_integer || 3.4681368748e-06
Coq_Numbers_Natural_Binary_NBinary_N_max || measures || 3.44890165907e-06
Coq_Structures_OrdersEx_N_as_DT_max || measures || 3.44890165907e-06
Coq_Structures_OrdersEx_N_as_OT_max || measures || 3.44890165907e-06
Coq_Numbers_Natural_Binary_NBinary_N_even || code_integer_of_int || 3.42965888745e-06
Coq_Structures_OrdersEx_N_as_OT_even || code_integer_of_int || 3.42965888745e-06
Coq_Structures_OrdersEx_N_as_DT_even || code_integer_of_int || 3.42965888745e-06
Coq_Numbers_Natural_BigN_BigN_BigN_Ndigits || code_n1042895779nteger || 3.42338193937e-06
Coq_Numbers_Natural_Binary_NBinary_N_odd || code_integer_of_int || 3.40196946272e-06
Coq_Structures_OrdersEx_N_as_OT_odd || code_integer_of_int || 3.40196946272e-06
Coq_Structures_OrdersEx_N_as_DT_odd || code_integer_of_int || 3.40196946272e-06
Coq_NArith_BinNat_N_max || measures || 3.38667556818e-06
__constr_Coq_Init_Datatypes_nat_0_2 || inc || 3.38552185258e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt_up || finite_psubset || 3.38474108232e-06
Coq_ZArith_BinInt_Z_Even || code_nat_of_integer || 3.37901926396e-06
Coq_ZArith_BinInt_Z_pred || inc || 3.35964311938e-06
Coq_ZArith_BinInt_Z_lt || bNF_Wellorder_wo_rel || 3.35695152863e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_even || bit0 || 3.35318015679e-06
Coq_Structures_OrdersEx_Z_as_OT_even || bit0 || 3.35318015679e-06
Coq_Structures_OrdersEx_Z_as_DT_even || bit0 || 3.35318015679e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_even || code_integer_of_int || 3.34502133453e-06
Coq_Structures_OrdersEx_Z_as_OT_even || code_integer_of_int || 3.34502133453e-06
Coq_Structures_OrdersEx_Z_as_DT_even || code_integer_of_int || 3.34502133453e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_Odd || bit1 || 3.33012035349e-06
Coq_Structures_OrdersEx_Z_as_OT_Odd || bit1 || 3.33012035349e-06
Coq_Structures_OrdersEx_Z_as_DT_Odd || bit1 || 3.33012035349e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || code_integer_of_int || 3.3192349352e-06
Coq_Structures_OrdersEx_Z_as_OT_odd || code_integer_of_int || 3.3192349352e-06
Coq_Structures_OrdersEx_Z_as_DT_odd || code_integer_of_int || 3.3192349352e-06
Coq_Numbers_Natural_Binary_NBinary_N_even || code_nat_of_integer || 3.31536397913e-06
Coq_Structures_OrdersEx_N_as_OT_even || code_nat_of_integer || 3.31536397913e-06
Coq_Structures_OrdersEx_N_as_DT_even || code_nat_of_integer || 3.31536397913e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || bitM || 3.31308177763e-06
Coq_Structures_OrdersEx_Z_as_OT_succ || bitM || 3.31308177763e-06
Coq_Structures_OrdersEx_Z_as_DT_succ || bitM || 3.31308177763e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || bit0 || 3.3079908607e-06
Coq_Structures_OrdersEx_Z_as_OT_odd || bit0 || 3.3079908607e-06
Coq_Structures_OrdersEx_Z_as_DT_odd || bit0 || 3.3079908607e-06
Coq_Arith_PeanoNat_Nat_max || transitive_rtrancl || 3.28520134916e-06
Coq_Numbers_Natural_Binary_NBinary_N_odd || code_nat_of_integer || 3.28244420168e-06
Coq_Structures_OrdersEx_N_as_OT_odd || code_nat_of_integer || 3.28244420168e-06
Coq_Structures_OrdersEx_N_as_DT_odd || code_nat_of_integer || 3.28244420168e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || bit0 || 3.2776487784e-06
Coq_Numbers_Natural_BigN_BigN_BigN_even || bit0 || 3.27721363466e-06
Coq_NArith_BinNat_N_even || code_integer_of_int || 3.27299008125e-06
Coq_Numbers_Natural_BigN_BigN_BigN_odd || bit0 || 3.248157536e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_log2_up || finite_psubset || 3.24618414459e-06
Coq_Numbers_Natural_BigN_BigN_BigN_one || rat || 3.24094004536e-06
Coq_ZArith_BinInt_Z_double || bit0 || 3.23595907065e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || bit0 || 3.23500143213e-06
Coq_ZArith_BinInt_Z_succ_double || bit0 || 3.21408215827e-06
Coq_Numbers_Natural_BigN_BigN_BigN_two || rat || 3.20644885992e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_two || rat || 3.1964896334e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_Even || bit1 || 3.18252998544e-06
Coq_Structures_OrdersEx_Z_as_OT_Even || bit1 || 3.18252998544e-06
Coq_Structures_OrdersEx_Z_as_DT_Even || bit1 || 3.18252998544e-06
Coq_Numbers_Natural_Binary_NBinary_N_add || measure || 3.18157810422e-06
Coq_Structures_OrdersEx_N_as_DT_add || measure || 3.18157810422e-06
Coq_Structures_OrdersEx_N_as_OT_add || measure || 3.18157810422e-06
Coq_NArith_BinNat_N_odd || code_integer_of_int || 3.15615075736e-06
__constr_Coq_Numbers_BinNums_Z_0_1 || code_natural_of_nat || 3.14387247754e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || rat || 3.14246573237e-06
Coq_Numbers_Natural_BigN_BigN_BigN_sqrt_up || finite_psubset || 3.13075307054e-06
Coq_NArith_BinNat_N_add || measure || 3.11179733306e-06
Coq_NArith_BinNat_N_even || code_nat_of_integer || 3.10198906977e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || null || 3.07416309896e-06
Coq_Structures_OrdersEx_Z_as_OT_lt || null || 3.07416309896e-06
Coq_Structures_OrdersEx_Z_as_DT_lt || null || 3.07416309896e-06
Coq_Numbers_Natural_BigN_BigN_BigN_one || code_natural || 3.06213272324e-06
Coq_Numbers_Natural_BigN_BigN_BigN_two || code_natural || 3.027477761e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_two || code_natural || 3.01676669493e-06
Coq_Numbers_Natural_BigN_BigN_BigN_log2_up || finite_psubset || 3.00165074253e-06
Coq_ZArith_Zpower_two_power_pos || bit1 || 2.98957751823e-06
Coq_NArith_BinNat_N_odd || code_nat_of_integer || 2.97174981539e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || code_natural || 2.9626270328e-06
Coq_ZArith_BinInt_Z_to_N || code_integer_of_int || 2.9565416572e-06
Coq_Classes_RelationClasses_Equivalence_0 || null || 2.95560505531e-06
Coq_Numbers_Natural_BigN_BigN_BigN_zero || rat || 2.95297781529e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_le || null || 2.95282796301e-06
Coq_Structures_OrdersEx_Z_as_OT_le || null || 2.95282796301e-06
Coq_Structures_OrdersEx_Z_as_DT_le || null || 2.95282796301e-06
Coq_Numbers_Natural_Binary_NBinary_N_add || measures || 2.85756422567e-06
Coq_Structures_OrdersEx_N_as_DT_add || measures || 2.85756422567e-06
Coq_Structures_OrdersEx_N_as_OT_add || measures || 2.85756422567e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_zero || rat || 2.84333271134e-06
Coq_Numbers_Natural_BigN_BigN_BigN_digits || code_int_of_integer || 2.81024005801e-06
Coq_NArith_BinNat_N_add || measures || 2.80054288248e-06
Coq_Numbers_Natural_BigN_BigN_BigN_zero || code_natural || 2.76579911373e-06
Coq_Numbers_Natural_Binary_NBinary_N_div2 || bitM || 2.76170401199e-06
Coq_Structures_OrdersEx_N_as_OT_div2 || bitM || 2.76170401199e-06
Coq_Structures_OrdersEx_N_as_DT_div2 || bitM || 2.76170401199e-06
Coq_ZArith_BinInt_Z_of_nat || code_nat_of_natural || 2.72575177539e-06
Coq_Numbers_Natural_Binary_NBinary_N_div2 || bit0 || 2.72512228171e-06
Coq_Structures_OrdersEx_N_as_OT_div2 || bit0 || 2.72512228171e-06
Coq_Structures_OrdersEx_N_as_DT_div2 || bit0 || 2.72512228171e-06
Coq_Reals_Raxioms_IZR || nat_of_num || 2.72227988011e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_zero || code_natural || 2.65657803034e-06
Coq_ZArith_BinInt_Z_opp || nat_of_num || 2.63159048915e-06
Coq_PArith_BinPos_Pos_sqrt || bit1 || 2.57618492416e-06
__constr_Coq_Init_Datatypes_nat_0_1 || code_natural_of_nat || 2.56516814982e-06
Coq_ZArith_BinInt_Z_opp || code_nat_of_natural || 2.55056012935e-06
Coq_ZArith_BinInt_Z_abs || nat2 || 2.54939034925e-06
Coq_PArith_BinPos_Pos_size || code_integer_of_int || 2.54271019994e-06
Coq_ZArith_BinInt_Z_opp || code_natural_of_nat || 2.53852845667e-06
Coq_Sets_Relations_3_coherent || id_on || 2.53013931612e-06
__constr_Coq_Numbers_BinNums_N_0_1 || code_natural_of_nat || 2.52949745048e-06
Coq_PArith_BinPos_Pos_square || bit1 || 2.50100427307e-06
__constr_Coq_Init_Datatypes_nat_0_2 || code_Suc || 2.46417928844e-06
Coq_Numbers_Natural_Binary_NBinary_N_sqrt || set || 2.45562934636e-06
Coq_Structures_OrdersEx_N_as_DT_sqrt || set || 2.45562934636e-06
Coq_Structures_OrdersEx_N_as_OT_sqrt || set || 2.45562934636e-06
Coq_NArith_BinNat_N_sqrt || set || 2.45117677452e-06
Coq_Numbers_Natural_BigN_BigN_BigN_Ndigits || code_integer_of_int || 2.41855802899e-06
Coq_ZArith_BinInt_Z_to_nat || nat_of_num || 2.34307644954e-06
Coq_Numbers_Natural_BigN_BigN_BigN_level || nat_of_num || 2.32173517456e-06
Coq_Numbers_Natural_BigN_BigN_BigN_double_size || inc || 2.32173517456e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || code_int_of_integer || 2.31610881936e-06
Coq_Numbers_Natural_Binary_NBinary_N_log2 || set || 2.27588188599e-06
Coq_Structures_OrdersEx_N_as_DT_log2 || set || 2.27588188599e-06
Coq_Structures_OrdersEx_N_as_OT_log2 || set || 2.27588188599e-06
Coq_NArith_BinNat_N_log2 || set || 2.27175524311e-06
Coq_ZArith_BinInt_Z_to_nat || default_default || 2.26170511325e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || distinct || 2.24125500577e-06
Coq_Structures_OrdersEx_Z_as_OT_lt || distinct || 2.24125500577e-06
Coq_Structures_OrdersEx_Z_as_DT_lt || distinct || 2.24125500577e-06
Coq_NArith_BinNat_N_of_nat || code_natural_of_nat || 2.23557557711e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || inc || 2.23050144643e-06
Coq_Numbers_Natural_BigN_BigN_BigN_double_size || code_Suc || 2.21752071666e-06
Coq_Numbers_Natural_BigN_BigN_BigN_succ || id2 || 2.20595721667e-06
Coq_Structures_OrdersEx_Nat_as_DT_max || id_on || 2.14010605149e-06
Coq_Structures_OrdersEx_Nat_as_OT_max || id_on || 2.14010605149e-06
Coq_Numbers_Cyclic_Int31_Int31_twice || dup || 2.12625904097e-06
Coq_NArith_BinNat_N_to_nat || code_nat_of_natural || 2.12471986432e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_succ || id2 || 2.11576988923e-06
Coq_ZArith_BinInt_Z_abs_N || default_default || 2.09979369272e-06
Coq_NArith_BinNat_N_to_nat || nat_of_num || 2.07524168505e-06
Coq_ZArith_BinInt_Z_quot2 || suc || 2.04039524894e-06
Coq_ZArith_BinInt_Z_abs_nat || default_default || 2.03682202279e-06
__constr_Coq_Numbers_BinNums_Z_0_2 || nat2 || 1.99627995915e-06
Coq_Numbers_Natural_BigN_BigN_BigN_level || code_nat_of_natural || 1.9875464314e-06
Coq_Reals_Rtrigo_def_sin_n || bit1 || 1.96499118856e-06
Coq_Reals_Rtrigo_def_cos_n || bit1 || 1.96499118856e-06
Coq_Reals_Rsqrt_def_pow_2_n || bit1 || 1.96499118856e-06
Coq_Numbers_Cyclic_Int31_Int31_twice_plus_one || dup || 1.96375421198e-06
Coq_ZArith_BinInt_Z_to_N || default_default || 1.95222253476e-06
Coq_Arith_PeanoNat_Nat_even || pos || 1.95100818737e-06
Coq_Structures_OrdersEx_Nat_as_DT_even || pos || 1.95100818737e-06
Coq_Structures_OrdersEx_Nat_as_OT_even || pos || 1.95100818737e-06
Coq_Numbers_Cyclic_Int31_Int31_twice || code_dup || 1.94721758024e-06
Coq_ZArith_BinInt_Z_square || bit0 || 1.94036207908e-06
Coq_Classes_RelationClasses_Symmetric || null || 1.93927420581e-06
Coq_Numbers_Natural_Binary_NBinary_N_div2 || bit1 || 1.93143974284e-06
Coq_Structures_OrdersEx_N_as_OT_div2 || bit1 || 1.93143974284e-06
Coq_Structures_OrdersEx_N_as_DT_div2 || bit1 || 1.93143974284e-06
Coq_Arith_PeanoNat_Nat_odd || pos || 1.92757732305e-06
Coq_Structures_OrdersEx_Nat_as_DT_odd || pos || 1.92757732305e-06
Coq_Structures_OrdersEx_Nat_as_OT_odd || pos || 1.92757732305e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || top_top || 1.91554756882e-06
Coq_Structures_OrdersEx_Z_as_OT_odd || top_top || 1.91554756882e-06
Coq_Structures_OrdersEx_Z_as_DT_odd || top_top || 1.91554756882e-06
Coq_Classes_RelationClasses_Reflexive || null || 1.89375852325e-06
Coq_Numbers_Natural_Binary_NBinary_N_odd || top_top || 1.86473287302e-06
Coq_Structures_OrdersEx_N_as_OT_odd || top_top || 1.86473287302e-06
Coq_Structures_OrdersEx_N_as_DT_odd || top_top || 1.86473287302e-06
Coq_Setoids_Setoid_Setoid_Theory || null || 1.86437230371e-06
Coq_Reals_RIneq_nonzero || bit1 || 1.86407837896e-06
Coq_Init_Nat_add || id_on || 1.86180963278e-06
Coq_Classes_RelationClasses_Transitive || null || 1.85091732192e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || bot_bot || 1.84369029501e-06
Coq_Structures_OrdersEx_Z_as_OT_odd || bot_bot || 1.84369029501e-06
Coq_Structures_OrdersEx_Z_as_DT_odd || bot_bot || 1.84369029501e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_even || top_top || 1.83584820232e-06
Coq_Structures_OrdersEx_Z_as_OT_even || top_top || 1.83584820232e-06
Coq_Structures_OrdersEx_Z_as_DT_even || top_top || 1.83584820232e-06
Coq_ZArith_BinInt_Z_odd || top_top || 1.83268983479e-06
Coq_Structures_OrdersEx_Nat_as_DT_add || id_on || 1.82553713535e-06
Coq_Structures_OrdersEx_Nat_as_OT_add || id_on || 1.82553713535e-06
Coq_Arith_PeanoNat_Nat_add || id_on || 1.81988895588e-06
Coq_Structures_OrdersEx_Nat_as_OT_even || code_integer_of_int || 1.81441996248e-06
Coq_Arith_PeanoNat_Nat_even || code_integer_of_int || 1.81441996248e-06
Coq_Structures_OrdersEx_Nat_as_DT_even || code_integer_of_int || 1.81441996248e-06
Coq_PArith_POrderedType_Positive_as_DT_pred || code_nat_of_integer || 1.80694940807e-06
Coq_PArith_POrderedType_Positive_as_OT_pred || code_nat_of_integer || 1.80694940807e-06
Coq_Structures_OrdersEx_Positive_as_DT_pred || code_nat_of_integer || 1.80694940807e-06
Coq_Structures_OrdersEx_Positive_as_OT_pred || code_nat_of_integer || 1.80694940807e-06
Coq_Numbers_Cyclic_Int31_Int31_twice_plus_one || code_dup || 1.80283546046e-06
Coq_Numbers_Natural_Binary_NBinary_N_odd || bot_bot || 1.79448153078e-06
Coq_Structures_OrdersEx_N_as_OT_odd || bot_bot || 1.79448153078e-06
Coq_Structures_OrdersEx_N_as_DT_odd || bot_bot || 1.79448153078e-06
Coq_Numbers_Natural_Binary_NBinary_N_even || top_top || 1.78513390405e-06
Coq_NArith_BinNat_N_even || top_top || 1.78513390405e-06
Coq_Structures_OrdersEx_N_as_OT_even || top_top || 1.78513390405e-06
Coq_Structures_OrdersEx_N_as_DT_even || top_top || 1.78513390405e-06
Coq_Arith_PeanoNat_Nat_odd || code_integer_of_int || 1.78410140807e-06
Coq_Structures_OrdersEx_Nat_as_DT_odd || code_integer_of_int || 1.78410140807e-06
Coq_Structures_OrdersEx_Nat_as_OT_odd || code_integer_of_int || 1.78410140807e-06
Coq_ZArith_BinInt_Z_even || top_top || 1.78156105308e-06
Coq_NArith_BinNat_N_odd || top_top || 1.77142202544e-06
Coq_PArith_BinPos_Pos_pred || code_nat_of_integer || 1.77087092722e-06
Coq_ZArith_BinInt_Z_odd || bot_bot || 1.76680539613e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_even || bot_bot || 1.76604446847e-06
Coq_Structures_OrdersEx_Z_as_OT_even || bot_bot || 1.76604446847e-06
Coq_Structures_OrdersEx_Z_as_DT_even || bot_bot || 1.76604446847e-06
Coq_PArith_BinPos_Pos_of_succ_nat || code_natural_of_nat || 1.76083238589e-06
Coq_QArith_QArith_base_inject_Z || nat_of_num || 1.75622710595e-06
Coq_ZArith_BinInt_Z_sqrt || bit0 || 1.73965815964e-06
Coq_Numbers_Natural_Binary_NBinary_N_even || bot_bot || 1.71691971778e-06
Coq_NArith_BinNat_N_even || bot_bot || 1.71691971778e-06
Coq_Structures_OrdersEx_N_as_OT_even || bot_bot || 1.71691971778e-06
Coq_Structures_OrdersEx_N_as_DT_even || bot_bot || 1.71691971778e-06
Coq_ZArith_BinInt_Z_even || bot_bot || 1.71574874513e-06
Coq_NArith_BinNat_N_odd || bot_bot || 1.70790322542e-06
Coq_Structures_OrdersEx_Nat_as_DT_max || transitive_rtrancl || 1.70759948346e-06
Coq_Structures_OrdersEx_Nat_as_OT_max || transitive_rtrancl || 1.70759948346e-06
Coq_ZArith_Zlogarithm_log_inf || nat2 || 1.70518553751e-06
Coq_Sets_Relations_3_coherent || measure || 1.68602198909e-06
Coq_Arith_PeanoNat_Nat_odd || top_top || 1.65823094602e-06
Coq_Structures_OrdersEx_Nat_as_DT_odd || top_top || 1.65823094602e-06
Coq_Structures_OrdersEx_Nat_as_OT_odd || top_top || 1.65823094602e-06
Coq_Numbers_Rational_BigQ_BigQ_BigN_BigZ_Z_of_N || bit0 || 1.61933196696e-06
Coq_Arith_PeanoNat_Nat_odd || bot_bot || 1.5960262989e-06
Coq_Structures_OrdersEx_Nat_as_DT_odd || bot_bot || 1.5960262989e-06
Coq_Structures_OrdersEx_Nat_as_OT_odd || bot_bot || 1.5960262989e-06
Coq_ZArith_BinInt_Z_succ || nat2 || 1.5876337149e-06
__constr_Coq_Numbers_BinNums_positive_0_2 || pos || 1.58384400281e-06
Coq_Arith_PeanoNat_Nat_even || top_top || 1.58307314786e-06
Coq_Structures_OrdersEx_Nat_as_DT_even || top_top || 1.58307314786e-06
Coq_Structures_OrdersEx_Nat_as_OT_even || top_top || 1.58307314786e-06
Coq_Init_Nat_add || transitive_trancl || 1.58188643645e-06
Coq_PArith_BinPos_Pos_size || code_Nat || 1.5563886882e-06
Coq_Structures_OrdersEx_Nat_as_DT_add || transitive_trancl || 1.5553865588e-06
Coq_Structures_OrdersEx_Nat_as_OT_add || transitive_trancl || 1.5553865588e-06
Coq_Arith_PeanoNat_Nat_add || transitive_trancl || 1.55124697942e-06
Coq_Numbers_Natural_BigN_BigN_BigN_digits || nat2 || 1.53347908571e-06
Coq_ZArith_BinInt_Z_of_N || default_default || 1.53148258275e-06
Coq_Structures_OrdersEx_Nat_as_DT_Odd || code_nat_of_integer || 1.52614258697e-06
Coq_Structures_OrdersEx_Nat_as_OT_Odd || code_nat_of_integer || 1.52614258697e-06
Coq_Init_Nat_add || transitive_rtrancl || 1.52407140508e-06
Coq_Arith_PeanoNat_Nat_even || bot_bot || 1.52258015997e-06
Coq_Structures_OrdersEx_Nat_as_DT_even || bot_bot || 1.52258015997e-06
Coq_Structures_OrdersEx_Nat_as_OT_even || bot_bot || 1.52258015997e-06
Coq_Reals_Rtrigo_def_sin_n || bit0 || 1.50821877482e-06
Coq_Reals_Rtrigo_def_cos_n || bit0 || 1.50821877482e-06
Coq_Reals_Rsqrt_def_pow_2_n || bit0 || 1.50821877482e-06
Coq_Numbers_Cyclic_Int31_Int31_twice_plus_one || bit0 || 1.50538535388e-06
Coq_Structures_OrdersEx_Nat_as_DT_add || transitive_rtrancl || 1.49945664678e-06
Coq_Structures_OrdersEx_Nat_as_OT_add || transitive_rtrancl || 1.49945664678e-06
Coq_Arith_PeanoNat_Nat_add || transitive_rtrancl || 1.49560884455e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_max || measure || 1.48754545279e-06
Coq_ZArith_BinInt_Z_succ || code_Suc || 1.48242512758e-06
Coq_Arith_PeanoNat_Nat_Odd || code_nat_of_integer || 1.46276182697e-06
Coq_Structures_OrdersEx_Nat_as_DT_Even || code_nat_of_integer || 1.45653796247e-06
Coq_Structures_OrdersEx_Nat_as_OT_Even || code_nat_of_integer || 1.45653796247e-06
Coq_PArith_BinPos_Pos_to_nat || code_nat_of_natural || 1.45083992487e-06
Coq_Reals_RIneq_nonzero || bit0 || 1.44783814079e-06
__constr_Coq_Logic_ClassicalFacts_boolP_0_2 || right || 1.44723456225e-06
Coq_Reals_Rgeom_yt || pow || 1.41608154168e-06
Coq_Reals_Rgeom_xt || pow || 1.41608154168e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt || set || 1.41040850582e-06
Coq_Arith_PeanoNat_Nat_Even || code_nat_of_integer || 1.40444936441e-06
Coq_PArith_POrderedType_Positive_as_DT_of_succ_nat || code_integer_of_int || 1.40200839424e-06
Coq_PArith_POrderedType_Positive_as_OT_of_succ_nat || code_integer_of_int || 1.40200839424e-06
Coq_Structures_OrdersEx_Positive_as_DT_of_succ_nat || code_integer_of_int || 1.40200839424e-06
Coq_Structures_OrdersEx_Positive_as_OT_of_succ_nat || code_integer_of_int || 1.40200839424e-06
Coq_PArith_BinPos_Pos_size || code_n1042895779nteger || 1.3591865857e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_log2 || set || 1.33388836559e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || nat2 || 1.31877792459e-06
Coq_Sets_Relations_3_coherent || measures || 1.3134586548e-06
Coq_Numbers_Natural_BigN_BigN_BigN_sqrt || set || 1.31196803368e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_max || measures || 1.30921199932e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || nat2 || 1.30309111152e-06
Coq_ZArith_BinInt_Z_sgn || bit1 || 1.29306329688e-06
Coq_Numbers_Natural_BigN_BigN_BigN_max || measure || 1.26261438e-06
Coq_Setoids_Setoid_Setoid_Theory || distinct || 1.26172501535e-06
Coq_ZArith_BinInt_Z_of_nat || code_natural_of_nat || 1.25352840869e-06
Coq_Numbers_Natural_BigN_BigN_BigN_log2 || set || 1.22514390997e-06
Coq_Numbers_Cyclic_Int31_Int31_twice || bit1 || 1.22415811092e-06
Coq_Numbers_Cyclic_Int31_Int31_twice || bitM || 1.22143050307e-06
Coq_ZArith_Zlogarithm_log_inf || code_int_of_integer || 1.2027875925e-06
Coq_Numbers_BinNums_positive_0 || product_unit || 1.1648255189e-06
Coq_Numbers_Natural_BigN_BigN_BigN_even || nat2 || 1.15016834065e-06
Coq_Reals_Rdefinitions_Ropp || bit0 || 1.14997816662e-06
Coq_Logic_ClassicalFacts_boolP_ind || rec_sumbool || 1.14617859675e-06
Coq_Structures_OrdersEx_Nat_as_OT_even || code_nat_of_integer || 1.14049172564e-06
Coq_Arith_PeanoNat_Nat_even || code_nat_of_integer || 1.14049172564e-06
Coq_Structures_OrdersEx_Nat_as_DT_even || code_nat_of_integer || 1.14049172564e-06
Coq_Numbers_Natural_BigN_BigN_BigN_odd || nat2 || 1.13869760509e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || bit0 || 1.12396660103e-06
Coq_Arith_PeanoNat_Nat_odd || code_nat_of_integer || 1.12390716998e-06
Coq_Structures_OrdersEx_Nat_as_DT_odd || code_nat_of_integer || 1.12390716998e-06
Coq_Structures_OrdersEx_Nat_as_OT_odd || code_nat_of_integer || 1.12390716998e-06
Coq_ZArith_BinInt_Z_abs || bit0 || 1.12194201181e-06
Coq_Reals_Rdefinitions_Rplus || pow || 1.11083669064e-06
Coq_Numbers_Natural_BigN_BigN_BigN_max || measures || 1.10738784208e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || code_integer_of_int || 1.0694334005e-06
Coq_Numbers_Natural_BigN_BigN_BigN_even || code_integer_of_int || 1.06708109785e-06
Coq_Reals_Rpower_arcsinh || sqr || 1.06152980352e-06
Coq_Numbers_Natural_BigN_BigN_BigN_odd || code_integer_of_int || 1.05398882533e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_max || transitive_trancl || 1.05204355059e-06
Coq_Structures_OrdersEx_Z_as_OT_max || transitive_trancl || 1.05204355059e-06
Coq_Structures_OrdersEx_Z_as_DT_max || transitive_trancl || 1.05204355059e-06
Coq_QArith_QArith_base_inject_Z || inc || 1.05138067584e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || code_integer_of_int || 1.05025054791e-06
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || bit0 || 1.04693054751e-06
Coq_Arith_PeanoNat_Nat_div2 || suc || 1.04430914472e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || pos || 1.03153468506e-06
Coq_Numbers_Natural_BigN_BigN_BigN_even || pos || 1.01740696809e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || pos || 1.01588311333e-06
Coq_Numbers_Natural_BigN_BigN_BigN_add || measure || 1.01233378717e-06
Coq_Numbers_Natural_BigN_BigN_BigN_odd || pos || 1.00708101855e-06
Coq_Numbers_Natural_Binary_NBinary_N_lt || null || 1.00396989439e-06
Coq_Structures_OrdersEx_N_as_OT_lt || null || 1.00396989439e-06
Coq_Structures_OrdersEx_N_as_DT_lt || null || 1.00396989439e-06
Coq_Reals_Rbasic_fun_Rabs || bit0 || 9.98006597242e-07
Coq_NArith_BinNat_N_lt || null || 9.92111678453e-07
Coq_PArith_BinPos_Pos_of_succ_nat || code_Nat || 9.92043769694e-07
Coq_Reals_Rtrigo_def_sinh || sqr || 9.86842944707e-07
Coq_Numbers_Natural_Binary_NBinary_N_le || null || 9.81076807555e-07
Coq_Structures_OrdersEx_N_as_OT_le || null || 9.81076807555e-07
Coq_Structures_OrdersEx_N_as_DT_le || null || 9.81076807555e-07
Coq_Classes_RelationClasses_PER_0 || sym || 9.73562836137e-07
Coq_NArith_BinNat_N_le || null || 9.72407494275e-07
Coq_ZArith_BinInt_Z_of_nat || default_default || 9.7078568789e-07
Coq_Numbers_Natural_BigN_BigN_BigN_max || id_on || 9.69180412567e-07
Coq_Reals_Ratan_ps_atan || sqr || 9.59036631623e-07
Coq_NArith_BinNat_N_pred || inc || 9.51912688098e-07
Coq_Logic_ClassicalFacts_boolP_ind || case_sumbool || 9.41005491936e-07
Coq_ZArith_BinInt_Z_of_nat || code_int_of_integer || 9.36313768465e-07
__constr_Coq_Numbers_BinNums_Z_0_3 || bit1 || 9.32845824619e-07
Coq_Numbers_Natural_Binary_NBinary_N_pred || inc || 9.21560161521e-07
Coq_Structures_OrdersEx_N_as_OT_pred || inc || 9.21560161521e-07
Coq_Structures_OrdersEx_N_as_DT_pred || inc || 9.21560161521e-07
Coq_Reals_Rpower_arcsinh || bitM || 9.10229185718e-07
Coq_Numbers_Natural_BigN_BigN_BigN_add || measures || 9.09421325989e-07
Coq_Logic_ClassicalFacts_boolP_0 || induct_true || 9.05039365076e-07
Coq_Logic_ClassicalFacts_BoolP || induct_true || 9.05039365076e-07
Coq_PArith_BinPos_Pos_of_succ_nat || code_n1042895779nteger || 8.99235542056e-07
Coq_PArith_BinPos_Pos_succ || suc || 8.81923792188e-07
Coq_Reals_R_Ifp_frac_part || sqr || 8.81057077247e-07
Coq_Classes_RelationClasses_PreOrder_0 || bNF_Cardinal_cfinite || 8.76511949588e-07
Coq_ZArith_BinInt_Z_opp || code_Suc || 8.66336083985e-07
Coq_Reals_Rtrigo_def_sinh || bitM || 8.53896821114e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_max || id_on || 8.52364646412e-07
Coq_Reals_Ratan_atan || sqr || 8.42167732934e-07
Coq_ZArith_BinInt_Z_abs_nat || code_nat_of_integer || 8.38061573367e-07
Coq_Reals_Ratan_ps_atan || bitM || 8.32722556186e-07
Coq_Numbers_Natural_BigN_BigN_BigN_add || id_on || 8.19330498958e-07
Coq_Reals_Rtrigo1_tan || sqr || 7.75064618505e-07
Coq_Reals_R_Ifp_frac_part || bitM || 7.72704524837e-07
Coq_ZArith_BinInt_Z_succ_double || bit1 || 7.67104772651e-07
Coq_ZArith_BinInt_Z_double || bit1 || 7.5332218621e-07
__constr_Coq_Numbers_BinNums_Z_0_2 || code_natural_of_nat || 7.43722351648e-07
Coq_Reals_Ratan_atan || bitM || 7.42396992246e-07
Coq_Numbers_Natural_Binary_NBinary_N_peano_rec || rec_sumbool || 7.28191625326e-07
Coq_Numbers_Natural_Binary_NBinary_N_peano_rect || rec_sumbool || 7.28191625326e-07
Coq_NArith_BinNat_N_peano_rec || rec_sumbool || 7.28191625326e-07
Coq_NArith_BinNat_N_peano_rect || rec_sumbool || 7.28191625326e-07
Coq_Structures_OrdersEx_N_as_OT_peano_rec || rec_sumbool || 7.28191625326e-07
Coq_Structures_OrdersEx_N_as_OT_peano_rect || rec_sumbool || 7.28191625326e-07
Coq_Structures_OrdersEx_N_as_DT_peano_rec || rec_sumbool || 7.28191625326e-07
Coq_Structures_OrdersEx_N_as_DT_peano_rect || rec_sumbool || 7.28191625326e-07
Coq_Numbers_Natural_Binary_NBinary_N_lt || distinct || 7.23268639433e-07
Coq_Structures_OrdersEx_N_as_OT_lt || distinct || 7.23268639433e-07
Coq_Structures_OrdersEx_N_as_DT_lt || distinct || 7.23268639433e-07
Coq_ZArith_BinInt_Z_log2 || bit1 || 7.22502010754e-07
Coq_Numbers_Natural_BigN_BigN_BigN_le || transitive_acyclic || 7.20051409306e-07
Coq_ZArith_BinInt_Z_to_nat || top_top || 7.16638028825e-07
Coq_NArith_BinNat_N_lt || distinct || 7.15755323777e-07
Coq_Numbers_Cyclic_Int31_Int31_twice_plus_one || bit1 || 6.99769863396e-07
Coq_ZArith_BinInt_Z_abs_N || top_top || 6.983084414e-07
Coq_Reals_R_sqrt_sqrt || sqr || 6.97039089894e-07
Coq_Numbers_Natural_BigN_BigN_BigN_lt || bNF_Wellorder_wo_rel || 6.91227369691e-07
Coq_ZArith_BinInt_Z_abs_nat || top_top || 6.90549311449e-07
Coq_Reals_Rtrigo1_tan || bitM || 6.8946345267e-07
Coq_ZArith_BinInt_Z_to_nat || bot_bot || 6.89389568913e-07
Coq_Structures_OrdersEx_N_as_OT_le || transitive_acyclic || 6.86225542293e-07
Coq_Structures_OrdersEx_N_as_DT_le || transitive_acyclic || 6.86225542293e-07
Coq_Numbers_Natural_Binary_NBinary_N_le || transitive_acyclic || 6.86225542293e-07
Coq_NArith_BinNat_N_le || transitive_acyclic || 6.82225024202e-07
Coq_ZArith_BinInt_Z_to_N || top_top || 6.80098311976e-07
Coq_Reals_RIneq_Rsqr || sqr || 6.75575818839e-07
Coq_ZArith_BinInt_Z_abs_N || bot_bot || 6.72419223008e-07
Coq_ZArith_BinInt_Z_abs_nat || bot_bot || 6.65212752601e-07
Coq_Init_Peano_le_0 || antisym || 6.6387023461e-07
Coq_Numbers_Natural_BigN_BigN_BigN_two || bNF_Cardinal_cone || 6.63694247719e-07
Coq_ZArith_BinInt_Z_to_N || bot_bot || 6.5551749144e-07
Coq_Reals_Rbasic_fun_Rabs || bitM || 6.49809956439e-07
__constr_Coq_Numbers_BinNums_Z_0_2 || code_integer_of_int || 6.49204940709e-07
Coq_QArith_QArith_base_Qopp || bit0 || 6.49113253432e-07
Coq_Numbers_Cyclic_Int31_Int31_twice_plus_one || bitM || 6.47375570411e-07
Coq_Numbers_Natural_Binary_NBinary_N_peano_rec || case_sumbool || 6.46256515823e-07
Coq_Numbers_Natural_Binary_NBinary_N_peano_rect || case_sumbool || 6.46256515823e-07
Coq_NArith_BinNat_N_peano_rec || case_sumbool || 6.46256515823e-07
Coq_NArith_BinNat_N_peano_rect || case_sumbool || 6.46256515823e-07
Coq_Structures_OrdersEx_N_as_OT_peano_rec || case_sumbool || 6.46256515823e-07
Coq_Structures_OrdersEx_N_as_OT_peano_rect || case_sumbool || 6.46256515823e-07
Coq_Structures_OrdersEx_N_as_DT_peano_rec || case_sumbool || 6.46256515823e-07
Coq_Structures_OrdersEx_N_as_DT_peano_rect || case_sumbool || 6.46256515823e-07
Coq_Numbers_Natural_BigN_BigN_BigN_div2 || bit1 || 6.45878561452e-07
Coq_Reals_Rbasic_fun_Rabs || sqr || 6.45341483013e-07
Coq_Reals_Rtrigo_def_sin || sqr || 6.38166840313e-07
Coq_Numbers_Natural_BigN_BigN_BigN_eq || bNF_Wellorder_wo_rel || 6.35730463583e-07
Coq_Reals_R_sqrt_sqrt || bitM || 6.27147211033e-07
Coq_NArith_BinNat_N_div2 || suc || 6.25382759059e-07
Coq_Reals_Rdefinitions_Rminus || pow || 6.18204002606e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_two || bNF_Cardinal_cone || 6.17953780646e-07
Coq_Numbers_Natural_Binary_NBinary_N_recursion || rec_sumbool || 6.16621967792e-07
Coq_NArith_BinNat_N_recursion || rec_sumbool || 6.16621967792e-07
Coq_Structures_OrdersEx_N_as_OT_recursion || rec_sumbool || 6.16621967792e-07
Coq_Structures_OrdersEx_N_as_DT_recursion || rec_sumbool || 6.16621967792e-07
Coq_Reals_RIneq_Rsqr || bitM || 6.09686323789e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || bNF_Wellorder_wo_rel || 6.01196639017e-07
Coq_PArith_BinPos_Pos_pred_N || code_natural_of_nat || 5.96096178376e-07
Coq_PArith_BinPos_Pos_pred_double || bit1 || 5.94598838713e-07
Coq_Numbers_Natural_BigN_BigN_BigN_lt || bNF_Cardinal_cfinite || 5.90636778283e-07
Coq_Numbers_BinNums_N_0 || product_unit || 5.90270149997e-07
Coq_Numbers_Rational_BigQ_BigQ_BigQ_opp || inc || 5.89054123056e-07
Coq_ZArith_BinInt_Z_of_N || top_top || 5.88314098703e-07
Coq_Numbers_Cyclic_Int31_Int31_twice || bit0 || 5.83707835928e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || transitive_acyclic || 5.83204688713e-07
Coq_Reals_Rtrigo_def_sin || bitM || 5.78705662183e-07
Coq_Reals_Rdefinitions_Ropp || bitM || 5.70569995261e-07
Coq_Reals_Rdefinitions_Ropp || sqr || 5.69752855242e-07
Coq_ZArith_BinInt_Z_of_N || bot_bot || 5.68252839383e-07
Coq_Numbers_Rational_BigQ_BigQ_BigQ_opp || code_Suc || 5.67447916684e-07
Coq_NArith_BinNat_N_peano_rec || code_rec_natural || 5.64838877685e-07
Coq_NArith_BinNat_N_peano_rect || code_rec_natural || 5.64838877685e-07
Coq_PArith_POrderedType_Positive_as_DT_pred || inc || 5.64768567047e-07
Coq_PArith_POrderedType_Positive_as_OT_pred || inc || 5.64768567047e-07
Coq_Structures_OrdersEx_Positive_as_DT_pred || inc || 5.64768567047e-07
Coq_Structures_OrdersEx_Positive_as_OT_pred || inc || 5.64768567047e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || bNF_Wellorder_wo_rel || 5.58583565382e-07
Coq_Numbers_Natural_Binary_NBinary_N_recursion || case_sumbool || 5.52514747716e-07
Coq_NArith_BinNat_N_recursion || case_sumbool || 5.52514747716e-07
Coq_Structures_OrdersEx_N_as_OT_recursion || case_sumbool || 5.52514747716e-07
Coq_Structures_OrdersEx_N_as_DT_recursion || case_sumbool || 5.52514747716e-07
Coq_Numbers_Natural_BigN_BigN_BigN_max || transitive_trancl || 5.45427376107e-07
Coq_QArith_QArith_base_Q_0 || product_unit || 5.42114152844e-07
Coq_PArith_BinPos_Pos_peano_rect || code_rec_natural || 5.38839274664e-07
Coq_PArith_BinPos_Pos_div2_up || suc || 5.35273935416e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || bNF_Cardinal_cfinite || 5.32578379866e-07
Coq_Reals_Raxioms_IZR || code_nat_of_natural || 5.30637064787e-07
Coq_Init_Nat_pred || inc || 5.29609537591e-07
Coq_Numbers_Natural_BigN_BigN_BigN_max || transitive_rtrancl || 5.2299603525e-07
Coq_Numbers_Natural_Binary_NBinary_N_div2 || suc || 5.12007646521e-07
Coq_Structures_OrdersEx_N_as_OT_div2 || suc || 5.12007646521e-07
Coq_Structures_OrdersEx_N_as_DT_div2 || suc || 5.12007646521e-07
Coq_Init_Datatypes_nat_0 || product_unit || 5.09011838235e-07
Coq_Numbers_BinNums_Z_0 || product_unit || 5.03442658969e-07
Coq_PArith_BinPos_Pos_pred_double || nat_of_num || 4.99325738359e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || default_default || 4.94397433621e-07
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || id2 || 4.89958159664e-07
Coq_Structures_OrdersEx_Z_as_OT_succ || id2 || 4.89958159664e-07
Coq_Structures_OrdersEx_Z_as_DT_succ || id2 || 4.89958159664e-07
Coq_Numbers_Integer_Binary_ZBinary_Z_max || id_on || 4.88456256083e-07
Coq_Structures_OrdersEx_Z_as_OT_max || id_on || 4.88456256083e-07
Coq_Structures_OrdersEx_Z_as_DT_max || id_on || 4.88456256083e-07
Coq_Reals_R_Ifp_Int_part || nat2 || 4.84812979425e-07
Coq_Init_Peano_le_0 || sym || 4.83683488388e-07
Coq_QArith_QArith_base_inject_Z || code_nat_of_natural || 4.82839719822e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_max || transitive_trancl || 4.77225628867e-07
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || nat_of_num || 4.75885007346e-07
Coq_PArith_BinPos_Pos_to_nat || code_nat_of_integer || 4.7443705141e-07
Coq_Numbers_Natural_BigN_BigN_BigN_add || transitive_trancl || 4.72833740235e-07
Coq_ZArith_Int_Z_as_Int__0 || product_unit || 4.70809442008e-07
Coq_Reals_Rtrigo_def_exp || nat_of_num || 4.60124499399e-07
Coq_Reals_Raxioms_INR || pos || 4.58633680082e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_max || transitive_rtrancl || 4.57949321151e-07
Coq_Numbers_Natural_BigN_BigN_BigN_add || transitive_rtrancl || 4.55877036668e-07
Coq_QArith_Qreduction_Qred || code_Suc || 4.54909327958e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_max || remdups || 4.53931782198e-07
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || default_default || 4.35378744497e-07
Coq_Numbers_Natural_BigN_BigN_BigN_one || bNF_Cardinal_cone || 4.32642673503e-07
Coq_PArith_BinPos_Pos_to_nat || code_integer_of_int || 4.321914384e-07
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || code_nat_of_natural || 4.27463988046e-07
Coq_Classes_RelationClasses_Reflexive || bNF_Cardinal_cfinite || 4.06591220529e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_div2 || bit1 || 3.95039761134e-07
Coq_Numbers_Integer_Binary_ZBinary_Z_max || transitive_rtrancl || 3.9448465729e-07
Coq_Structures_OrdersEx_Z_as_OT_max || transitive_rtrancl || 3.9448465729e-07
Coq_Structures_OrdersEx_Z_as_DT_max || transitive_rtrancl || 3.9448465729e-07
Coq_ZArith_BinInt_Z_of_nat || top_top || 3.93866382301e-07
Coq_Classes_RelationClasses_Transitive || bNF_Cardinal_cfinite || 3.91588158521e-07
Coq_QArith_QArith_base_Qlt || bNF_Cardinal_cone || 3.89388843973e-07
Coq_PArith_POrderedType_Positive_as_DT_pred_double || bit1 || 3.85759625671e-07
Coq_PArith_POrderedType_Positive_as_OT_pred_double || bit1 || 3.85759625671e-07
Coq_Structures_OrdersEx_Positive_as_DT_pred_double || bit1 || 3.85759625671e-07
Coq_Structures_OrdersEx_Positive_as_OT_pred_double || bit1 || 3.85759625671e-07
__constr_Coq_Logic_ClassicalFacts_boolP_0_1 || left || 3.83882838784e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || bNF_Cardinal_cone || 3.8371620676e-07
Coq_ZArith_BinInt_Z_of_nat || bot_bot || 3.80909532671e-07
Coq_PArith_BinPos_Pos_of_nat || code_nat_of_integer || 3.79982947123e-07
Coq_Numbers_Natural_BigN_BigN_BigN_le || bNF_Cardinal_cfinite || 3.71621160701e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_succ || nil || 3.65978536425e-07
__constr_Coq_Numbers_BinNums_Z_0_2 || num_of_nat || 3.65419406959e-07
Coq_PArith_BinPos_Pos_pred || suc || 3.63898480294e-07
__constr_Coq_Numbers_BinNums_N_0_2 || nat2 || 3.60547523185e-07
Coq_Init_Peano_lt || bNF_Cardinal_cone || 3.54402771321e-07
Coq_Relations_Relation_Operators_clos_trans_n1_0 || transitive_tranclp || 3.52131279584e-07
Coq_QArith_Qcanon_Qcopp || code_Suc || 3.51251184747e-07
Coq_Reals_Rdefinitions_Ropp || inc || 3.508241641e-07
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || bNF_Wellorder_wo_rel || 3.45605031885e-07
Coq_Structures_OrdersEx_Z_as_OT_lt || bNF_Wellorder_wo_rel || 3.45605031885e-07
Coq_Structures_OrdersEx_Z_as_DT_lt || bNF_Wellorder_wo_rel || 3.45605031885e-07
__constr_Coq_Numbers_BinNums_positive_0_2 || code_integer_of_int || 3.45458382152e-07
Coq_Init_Datatypes_app || insert3 || 3.37042510619e-07
Coq_Relations_Relation_Operators_clos_trans_1n_0 || transitive_tranclp || 3.35279566948e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || bNF_Cardinal_cfinite || 3.27662084692e-07
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Qc || code_natural_of_nat || 3.26771981169e-07
Coq_QArith_Qreals_Q2R || nat_of_num || 3.26512704015e-07
Coq_FSets_FMapPositive_PositiveMap_E_bits_lt || bNF_Cardinal_cone || 3.25968544676e-07
Coq_NArith_BinNat_N_pred || code_Suc || 3.14698177752e-07
Coq_Numbers_Rational_BigQ_BigQ_BigQ_red || suc || 3.14009376186e-07
__constr_Coq_Numbers_BinNums_Z_0_3 || code_integer_of_int || 3.13202509866e-07
Coq_PArith_POrderedType_Positive_as_DT_succ || nat2 || 3.11453792578e-07
Coq_PArith_POrderedType_Positive_as_OT_succ || nat2 || 3.11453792578e-07
Coq_Structures_OrdersEx_Positive_as_DT_succ || nat2 || 3.11453792578e-07
Coq_Structures_OrdersEx_Positive_as_OT_succ || nat2 || 3.11453792578e-07
Coq_PArith_BinPos_Pos_succ || nat2 || 3.10901264711e-07
Coq_Reals_Rdefinitions_R || product_unit || 3.07347555146e-07
Coq_QArith_QArith_base_Qopp || inc || 3.04370016903e-07
Coq_Reals_Rdefinitions_Rlt || bNF_Cardinal_cone || 2.96977632521e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_pred || pos || 2.8812697283e-07
Coq_Reals_Rtrigo_def_exp || code_natural_of_nat || 2.85400230024e-07
Coq_Structures_OrdersEx_PositiveOrderedTypeBits_lt || bNF_Cardinal_cone || 2.81475947904e-07
Coq_Numbers_Natural_Binary_NBinary_N_le || trans || 2.75726450475e-07
Coq_Structures_OrdersEx_N_as_OT_le || trans || 2.75726450475e-07
Coq_Structures_OrdersEx_N_as_DT_le || trans || 2.75726450475e-07
Coq_ZArith_BinInt_Z_pred || suc || 2.7512075244e-07
Coq_NArith_BinNat_N_le || trans || 2.74687857091e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_succ || pos || 2.67881421651e-07
Coq_Numbers_Natural_BigN_BigN_BigN_of_pos || code_integer_of_int || 2.56627401981e-07
Coq_Classes_RelationClasses_Equivalence_0 || bNF_Cardinal_cfinite || 2.51760140291e-07
Coq_Reals_Rdefinitions_Rinv || code_Suc || 2.50575687254e-07
Coq_QArith_QArith_base_Qeq || bNF_Cardinal_cone || 2.45151035188e-07
Coq_MMaps_MMapPositive_PositiveMap_E_lt || bNF_Cardinal_cone || 2.43767241156e-07
Coq_Numbers_Natural_BigN_BigN_BigN_max || remdups || 2.411663797e-07
Coq_ZArith_Int_Z_as_Int_i2z || default_default || 2.40454864463e-07
__constr_Coq_Init_Datatypes_nat_0_2 || nat2 || 2.39478082153e-07
Coq_Reals_Rdefinitions_R0 || code_integer || 2.38213764719e-07
Coq_Numbers_Natural_BigN_BigN_BigN_succ || pos || 2.37039449043e-07
Coq_Numbers_Natural_BigN_BigN_BigN_sqrt || bit1 || 2.2698937457e-07
Coq_Init_Peano_lt || antisym || 2.24807720765e-07
Coq_PArith_POrderedType_Positive_as_DT_of_nat || code_nat_of_integer || 2.24431290389e-07
Coq_PArith_POrderedType_Positive_as_OT_of_nat || code_nat_of_integer || 2.24431290389e-07
Coq_Structures_OrdersEx_Positive_as_DT_of_nat || code_nat_of_integer || 2.24431290389e-07
Coq_Structures_OrdersEx_Positive_as_OT_of_nat || code_nat_of_integer || 2.24431290389e-07
Coq_Init_Peano_lt || sym || 2.23766677948e-07
Coq_MSets_MSetPositive_PositiveSet_E_lt || bNF_Cardinal_cone || 2.23605596383e-07
Coq_Reals_Rdefinitions_R1 || code_pcr_integer code_cr_integer || 2.23571783203e-07
Coq_Init_Wf_well_founded || bNF_Cardinal_cfinite || 2.22406084278e-07
Coq_Init_Peano_lt || trans || 2.1055759297e-07
Coq_MSets_MSetPositive_PositiveSet_lt || bNF_Cardinal_cone || 2.10421435022e-07
Coq_Numbers_Natural_BigN_BigN_BigN_add || remdups || 2.05589055291e-07
Coq_Arith_PeanoNat_Nat_pred || suc || 2.03939242931e-07
Coq_PArith_BinPos_Pos_pred || bitM || 2.03384593787e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || code_integer_of_int || 1.97334738761e-07
Coq_ZArith_BinInt_Z_log2_up || inc || 1.90668962837e-07
Coq_Numbers_Natural_BigN_BigN_BigN_log2 || bit1 || 1.9060162026e-07
Coq_Numbers_Natural_BigN_BigN_BigN_succ || nil || 1.88904197517e-07
Coq_ZArith_BinInt_Z_log2 || bit0 || 1.84724266161e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || top_top || 1.81435284298e-07
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || top_top || 1.77333805214e-07
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || code_integer_of_int || 1.75981341004e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || bot_bot || 1.7507220092e-07
Coq_ZArith_BinInt_Z_log2 || inc || 1.7502184957e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || inc || 1.72085152867e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || inc || 1.72013886041e-07
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || bot_bot || 1.71515747974e-07
Coq_ZArith_Zlogarithm_log_sup || bit1 || 1.68750815703e-07
Coq_PArith_POrderedType_Positive_as_DT_pred_double || bit0 || 1.63423508196e-07
Coq_PArith_POrderedType_Positive_as_OT_pred_double || bit0 || 1.63423508196e-07
Coq_Structures_OrdersEx_Positive_as_DT_pred_double || bit0 || 1.63423508196e-07
Coq_Structures_OrdersEx_Positive_as_OT_pred_double || bit0 || 1.63423508196e-07
Coq_Numbers_Natural_BigN_BigN_BigN_t || product_unit || 1.61593247122e-07
Coq_Reals_Rdefinitions_R1 || code_pcr_natural code_cr_natural || 1.60978735404e-07
Coq_ZArith_Zlogarithm_log_inf || bit1 || 1.58448284156e-07
Coq_ZArith_Int_Z_as_Int__0 || rat || 1.55814247912e-07
Coq_ZArith_BinInt_Z_le || antisym || 1.55345900877e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_t || product_unit || 1.54498879236e-07
Coq_NArith_BinNat_N_pred || suc || 1.53510773304e-07
Coq_Sets_Ensembles_Empty_set_0 || empty || 1.51406426062e-07
Coq_ZArith_Int_Z_as_Int__0 || code_natural || 1.46974916414e-07
Coq_Numbers_Rational_BigQ_BigQ_BigQ_lt || bNF_Cardinal_cone || 1.44352760044e-07
Coq_Reals_Rdefinitions_R0 || code_natural || 1.40063127921e-07
Coq_PArith_POrderedType_Positive_as_DT_lt || bNF_Cardinal_cone || 1.38921736665e-07
Coq_PArith_POrderedType_Positive_as_OT_lt || bNF_Cardinal_cone || 1.38921736665e-07
Coq_Structures_OrdersEx_Positive_as_DT_lt || bNF_Cardinal_cone || 1.38921736665e-07
Coq_Structures_OrdersEx_Positive_as_OT_lt || bNF_Cardinal_cone || 1.38921736665e-07
Coq_PArith_BinPos_Pos_lt || bNF_Cardinal_cone || 1.35148450207e-07
Coq_PArith_BinPos_Pos_sqrt || dup || 1.28122790127e-07
Coq_MSets_MSetPositive_PositiveSet_t || product_unit || 1.27414520431e-07
Coq_Init_Peano_le_0 || bNF_Cardinal_cone || 1.24283339469e-07
Coq_PArith_POrderedType_Positive_as_DT_of_succ_nat || nat2 || 1.2402034483e-07
Coq_PArith_POrderedType_Positive_as_OT_of_succ_nat || nat2 || 1.2402034483e-07
Coq_Structures_OrdersEx_Positive_as_DT_of_succ_nat || nat2 || 1.2402034483e-07
Coq_Structures_OrdersEx_Positive_as_OT_of_succ_nat || nat2 || 1.2402034483e-07
Coq_Numbers_Natural_Binary_NBinary_N_lt || bNF_Cardinal_cone || 1.23825020323e-07
Coq_Structures_OrdersEx_N_as_OT_lt || bNF_Cardinal_cone || 1.23825020323e-07
Coq_Structures_OrdersEx_N_as_DT_lt || bNF_Cardinal_cone || 1.23825020323e-07
Coq_NArith_BinNat_N_lt || bNF_Cardinal_cone || 1.23209371175e-07
Coq_ZArith_BinInt_Z_quot2 || inc || 1.20823768972e-07
Coq_Init_Nat_pred || bit0 || 1.18675107474e-07
Coq_Reals_Rtrigo_def_cos || size_nibble || 1.1654012834e-07
Coq_ZArith_BinInt_Z_le || sym || 1.1582909794e-07
Coq_PArith_BinPos_Pos_sqrt || code_dup || 1.1572957686e-07
Coq_ZArith_BinInt_Z_to_N || code_nat_of_natural || 1.10646539948e-07
Coq_Reals_Rtrigo_def_exp || int || 1.07560939191e-07
Coq_Numbers_Natural_BigN_BigN_BigN_lt || bNF_Cardinal_cone || 1.05727525576e-07
Coq_NArith_BinNat_N_succ || suc || 1.03095489276e-07
Coq_ZArith_BinInt_Z_div2 || inc || 1.03029637519e-07
Coq_Reals_Rdefinitions_R1 || one2 || 1.01541907705e-07
Coq_Numbers_Rational_BigQ_BigQ_BigQ_t || product_unit || 9.89705706353e-08
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || bNF_Cardinal_cone || 9.81758894968e-08
Coq_Structures_OrdersEx_Z_as_OT_lt || bNF_Cardinal_cone || 9.81758894968e-08
Coq_Structures_OrdersEx_Z_as_DT_lt || bNF_Cardinal_cone || 9.81758894968e-08
Coq_ZArith_BinInt_Z_to_nat || code_nat_of_natural || 9.7637342923e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_pred || bit0 || 9.52144088903e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || bNF_Cardinal_cone || 9.13565435648e-08
Coq_Reals_Rtrigo_def_sin || int || 9.09946153432e-08
Coq_ZArith_BinInt_Z_lt || bNF_Cardinal_cone || 9.04548048119e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_succ || bit0 || 9.04060832896e-08
Coq_Numbers_Natural_BigN_BigN_BigN_succ || bit0 || 8.71460304841e-08
Coq_Numbers_Natural_BigN_BigN_BigN_odd || inc || 8.38761473322e-08
Coq_Numbers_Natural_BigN_BigN_BigN_even || inc || 8.36622894901e-08
Coq_Numbers_Cyclic_Int31_Int31_twice || code_Suc || 8.23871262977e-08
Coq_Numbers_Cyclic_Int31_Int31_twice_plus_one || code_Suc || 8.23863323268e-08
Coq_Reals_Ranalysis1_derivable_pt_lim || left_unique || 8.11530016331e-08
Coq_Reals_Ranalysis1_derivable_pt_lim || left_total || 8.03213140685e-08
Coq_Reals_Ranalysis1_derivable_pt_lim || right_unique || 7.99307184581e-08
Coq_Numbers_Cyclic_Abstract_CyclicAxioms_ZnZ_Specs_0 || wf || 7.59595853913e-08
Coq_Reals_Ranalysis1_derivable_pt_lim || right_total || 7.59437975153e-08
Coq_Reals_Rdefinitions_Ropp || zero_zero || 7.59134274416e-08
Coq_Reals_Raxioms_IZR || bit1 || 7.48648347759e-08
Coq_Reals_Rbasic_fun_Rabs || dup || 7.45754267438e-08
Coq_Reals_Ranalysis1_derivable_pt_lim || bi_total || 7.43615548937e-08
Coq_Reals_Rdefinitions_R1 || nat || 7.37981702973e-08
Coq_ZArith_BinInt_Z_to_pos || bitM || 7.32698569561e-08
Coq_ZArith_BinInt_Z_abs || inc || 7.27533849996e-08
Coq_Reals_Ranalysis1_derivable_pt_lim || bi_unique || 7.23543039804e-08
Coq_Structures_OrdersEx_PositiveOrderedTypeBits_eq || bNF_Cardinal_cone || 7.21668217765e-08
Coq_Reals_Rbasic_fun_Rabs || code_dup || 7.08807912833e-08
Coq_NArith_BinNat_N_of_nat || nat_of_num || 7.04129884986e-08
Coq_ZArith_Int_Z_as_Int_i2z || top_top || 6.87959399979e-08
Coq_Reals_Rtrigo_def_exp || nat || 6.77400116952e-08
Coq_Sets_Ensembles_Empty_set_0 || nil || 6.64593172562e-08
Coq_ZArith_Int_Z_as_Int_i2z || bot_bot || 6.60459363946e-08
Coq_ZArith_BinInt_Z_lt || antisym || 6.31642695603e-08
Coq_PArith_BinPos_Pos_peano_rect || rec_nat || 6.30080124159e-08
Coq_ZArith_BinInt_Z_lt || sym || 6.28712847779e-08
Coq_Sets_Finite_sets_Finite_0 || distinct || 6.2756913411e-08
Coq_Reals_Rbasic_fun_Rabs || suc || 6.26093122906e-08
Coq_Reals_Rtrigo_def_sin || nat || 6.24957564676e-08
Coq_Numbers_Cyclic_Int31_Int31_incr || neg || 6.23718528088e-08
Coq_Numbers_Cyclic_Int31_Int31_incr || pos || 6.12442337453e-08
Coq_MMaps_MMapPositive_PositiveMap_E_eq || bNF_Cardinal_cone || 5.95960265836e-08
Coq_ZArith_BinInt_Z_lt || trans || 5.9154159187e-08
Coq_Numbers_Cyclic_Int31_Int31_incr || code_Neg || 5.89228612978e-08
Coq_PArith_BinPos_Pos_div2_up || code_Suc || 5.81314852245e-08
Coq_Classes_RelationClasses_Symmetric || bNF_Cardinal_cfinite || 5.7944908067e-08
Coq_Numbers_Cyclic_Int31_Int31_incr || code_Pos || 5.70002565669e-08
Coq_Numbers_Natural_Binary_NBinary_N_divide || bNF_Cardinal_cone || 5.54474264562e-08
Coq_NArith_BinNat_N_divide || bNF_Cardinal_cone || 5.54474264562e-08
Coq_Structures_OrdersEx_N_as_OT_divide || bNF_Cardinal_cone || 5.54474264562e-08
Coq_Structures_OrdersEx_N_as_DT_divide || bNF_Cardinal_cone || 5.54474264562e-08
Coq_PArith_BinPos_Pos_of_succ_nat || code_nat_of_natural || 5.4797405146e-08
Coq_Reals_Rpower_Rpower || pow || 5.43715974243e-08
Coq_Numbers_Natural_BigN_BigN_BigN_le || sym || 5.43183091478e-08
Coq_ZArith_BinInt_Z_double || suc || 5.38269423025e-08
Coq_ZArith_BinInt_Z_succ_double || suc || 5.38269326453e-08
Coq_Sets_Relations_1_Symmetric || antisym || 5.31129059387e-08
Coq_ZArith_BinInt_Z_opp || bit0 || 5.25442832263e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || code_nat_of_integer || 5.18118963511e-08
Coq_NArith_BinNat_N_of_nat || code_nat_of_natural || 5.16937274781e-08
Coq_Numbers_Cyclic_Int31_Int31_incr || inc || 5.11787187567e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || code_nat_of_integer || 5.11501578764e-08
Coq_PArith_BinPos_Pos_sqrt || bitM || 5.10747455799e-08
Coq_Arith_PeanoNat_Nat_divide || bNF_Cardinal_cone || 5.05320865596e-08
Coq_Structures_OrdersEx_Nat_as_DT_divide || bNF_Cardinal_cone || 5.05320865596e-08
Coq_Structures_OrdersEx_Nat_as_OT_divide || bNF_Cardinal_cone || 5.05320865596e-08
Coq_PArith_POrderedType_Positive_as_DT_le || bNF_Cardinal_cone || 5.04665356389e-08
Coq_PArith_POrderedType_Positive_as_OT_le || bNF_Cardinal_cone || 5.04665356389e-08
Coq_Structures_OrdersEx_Positive_as_DT_le || bNF_Cardinal_cone || 5.04665356389e-08
Coq_Structures_OrdersEx_Positive_as_OT_le || bNF_Cardinal_cone || 5.04665356389e-08
Coq_Numbers_Natural_BigN_BigN_BigN_level || code_natural_of_nat || 5.03514028768e-08
Coq_PArith_BinPos_Pos_le || bNF_Cardinal_cone || 5.02881809229e-08
Coq_MSets_MSetPositive_PositiveSet_E_eq || bNF_Cardinal_cone || 4.96567453227e-08
Coq_Sets_Relations_1_Symmetric || trans || 4.90216624138e-08
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || bNF_Cardinal_cone || 4.89466228068e-08
Coq_Structures_OrdersEx_Z_as_OT_divide || bNF_Cardinal_cone || 4.89466228068e-08
Coq_Structures_OrdersEx_Z_as_DT_divide || bNF_Cardinal_cone || 4.89466228068e-08
Coq_NArith_BinNat_N_to_nat || code_natural_of_nat || 4.85064484937e-08
Coq_Sets_Ensembles_Included || contained || 4.74172660712e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt || bit1 || 4.71900666283e-08
Coq_ZArith_BinInt_Z_divide || bNF_Cardinal_cone || 4.52134362561e-08
Coq_PArith_BinPos_Pos_to_nat || code_natural_of_nat || 4.45720232867e-08
Coq_Reals_Raxioms_INR || bit1 || 4.15925146447e-08
Coq_Reals_ROrderedType_R_as_OT_eq || bNF_Cardinal_cone || 4.11759888865e-08
Coq_Reals_ROrderedType_R_as_DT_eq || bNF_Cardinal_cone || 4.11759888865e-08
Coq_ZArith_BinInt_Z_opp || code_nat_of_integer || 3.94715229631e-08
Coq_Reals_Raxioms_IZR || bitM || 3.93272669744e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || sym || 3.87525499831e-08
Coq_Reals_Rdefinitions_Rinv || sqr || 3.85589558634e-08
Coq_ZArith_BinInt_Z_of_N || code_natural_of_nat || 3.80752144433e-08
Coq_Reals_Raxioms_IZR || neg || 3.7905483211e-08
Coq_ZArith_BinInt_Z_succ || inc || 3.76147454616e-08
Coq_Reals_Raxioms_IZR || code_Neg || 3.755298134e-08
Coq_ZArith_BinInt_Z_log2 || code_nat_of_integer || 3.74639711369e-08
Coq_Reals_Raxioms_IZR || pos || 3.73229369404e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_abs || bit1 || 3.67786122639e-08
Coq_Reals_Rdefinitions_Rinv || dup || 3.6684154993e-08
Coq_Reals_Raxioms_IZR || code_Pos || 3.65084196407e-08
Coq_Numbers_Natural_BigN_BigN_BigN_eq || bNF_Cardinal_cone || 3.54363189404e-08
Coq_Reals_Rdefinitions_Rinv || code_dup || 3.4896779905e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_pred || code_integer_of_int || 3.47192780388e-08
Coq_Sets_Ensembles_Add || join || 3.45555029861e-08
Coq_PArith_BinPos_Pos_pred_N || code_nat_of_natural || 3.43640942818e-08
Coq_ZArith_BinInt_Z_of_nat || bit0 || 3.39744237063e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || bNF_Cardinal_cone || 3.38230783481e-08
Coq_Sets_Ensembles_Add || insert2 || 3.36269670045e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_succ || code_integer_of_int || 3.2520941062e-08
Coq_PArith_POrderedType_Positive_as_DT_pred_double || nat_of_num || 3.24707022947e-08
Coq_PArith_POrderedType_Positive_as_OT_pred_double || nat_of_num || 3.24707022947e-08
Coq_Structures_OrdersEx_Positive_as_DT_pred_double || nat_of_num || 3.24707022947e-08
Coq_Structures_OrdersEx_Positive_as_OT_pred_double || nat_of_num || 3.24707022947e-08
Coq_Sets_Ensembles_In || member2 || 3.21195180104e-08
Coq_Numbers_Natural_BigN_BigN_BigN_lt || sym || 3.16824516869e-08
Coq_ZArith_BinInt_Z_abs_N || code_nat_of_integer || 3.1516090619e-08
Coq_Numbers_Natural_BigN_BigN_BigN_divide || bNF_Cardinal_cone || 3.13174191206e-08
Coq_Sets_Relations_1_Antisymmetric || bNF_Cardinal_cfinite || 3.08552967965e-08
Coq_Numbers_Natural_BigN_BigN_BigN_double_size || suc || 3.05456622072e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || bNF_Cardinal_cone || 3.02118700527e-08
Coq_Numbers_Natural_Binary_NBinary_N_le || bNF_Cardinal_cone || 3.02024302603e-08
Coq_Structures_OrdersEx_N_as_OT_le || bNF_Cardinal_cone || 3.02024302603e-08
Coq_Structures_OrdersEx_N_as_DT_le || bNF_Cardinal_cone || 3.02024302603e-08
Coq_NArith_BinNat_N_le || bNF_Cardinal_cone || 3.01406310625e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || sym || 2.93255596755e-08
Coq_ZArith_BinInt_Z_quot2 || code_Suc || 2.88528176008e-08
Coq_ZArith_BinInt_Z_to_pos || neg || 2.87796809312e-08
Coq_ZArith_BinInt_Z_to_pos || code_Neg || 2.84259124899e-08
Coq_ZArith_BinInt_Z_to_pos || pos || 2.83104062722e-08
Coq_Numbers_Cyclic_DoubleCyclic_DoubleType_zn2z_0 || list || 2.80120820161e-08
Coq_Numbers_Cyclic_Int31_Int31_phi_inv || code_nat_of_natural || 2.77391310345e-08
Coq_Sets_Relations_1_Order_0 || bNF_Cardinal_cfinite || 2.75963586104e-08
Coq_Numbers_Natural_BigN_BigN_BigN_succ || code_integer_of_int || 2.75902442627e-08
Coq_ZArith_BinInt_Z_to_pos || code_Pos || 2.75878140573e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sgn || bit1 || 2.73014232347e-08
Coq_Numbers_Integer_Binary_ZBinary_Z_le || bNF_Cardinal_cone || 2.68284842956e-08
Coq_Structures_OrdersEx_Z_as_OT_le || bNF_Cardinal_cone || 2.68284842956e-08
Coq_Structures_OrdersEx_Z_as_DT_le || bNF_Cardinal_cone || 2.68284842956e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_log2 || bit1 || 2.66930945312e-08
Coq_Reals_Rdefinitions_Ropp || dup || 2.66263477956e-08
Coq_ZArith_BinInt_Z_div2 || code_Suc || 2.58354467865e-08
Coq_Reals_Rbasic_fun_Rabs || bit1 || 2.55302508207e-08
Coq_Reals_Rdefinitions_Ropp || code_dup || 2.53341534196e-08
Coq_Sets_Image_Im_0 || bind || 2.51241629663e-08
Coq_ZArith_BinInt_Z_le || bNF_Cardinal_cone || 2.49968947828e-08
Coq_Sets_Relations_1_Reflexive || bNF_Cardinal_cfinite || 2.49152956375e-08
Coq_Numbers_Cyclic_Abstract_CyclicAxioms_ZnZ_Specs_0 || trans || 2.39295060077e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_opp || bit1 || 2.34985275337e-08
Coq_PArith_POrderedType_Positive_as_DT_pred || nat2 || 2.33195070603e-08
Coq_PArith_POrderedType_Positive_as_OT_pred || nat2 || 2.33195070603e-08
Coq_Structures_OrdersEx_Positive_as_DT_pred || nat2 || 2.33195070603e-08
Coq_Structures_OrdersEx_Positive_as_OT_pred || nat2 || 2.33195070603e-08
Coq_QArith_Qreals_Q2R || inc || 2.26179593171e-08
Coq_Numbers_Natural_Binary_NBinary_N_div2 || code_Suc || 2.22650697671e-08
Coq_Structures_OrdersEx_N_as_OT_div2 || code_Suc || 2.22650697671e-08
Coq_Structures_OrdersEx_N_as_DT_div2 || code_Suc || 2.22650697671e-08
Coq_ZArith_BinInt_Z_to_pos || bit1 || 2.22028647395e-08
Coq_Numbers_Natural_BigN_BigN_BigN_even || code_nat_of_integer || 2.21741638656e-08
Coq_Numbers_Natural_BigN_BigN_BigN_odd || code_nat_of_integer || 2.20271791712e-08
Coq_Sets_Relations_1_Transitive || bNF_Cardinal_cfinite || 2.18577906227e-08
Coq_Arith_PeanoNat_Nat_div2 || code_Suc || 2.18093617407e-08
Coq_Numbers_Natural_BigN_BigN_BigN_le || bNF_Cardinal_cone || 2.14685034673e-08
Coq_QArith_Qreals_Q2R || bit1 || 2.11823759326e-08
Coq_Reals_Rtrigo_def_exp || bitM || 2.10784374315e-08
Coq_ZArith_BinInt_Z_square || code_Suc || 2.10677218208e-08
Coq_PArith_BinPos_Pos_pred_N || code_integer_of_int || 2.09531895474e-08
Coq_ZArith_BinInt_Z_sgn || bit0 || 2.08536317937e-08
__constr_Coq_Numbers_BinNums_positive_0_1 || nat2 || 2.0759204189e-08
Coq_Reals_Rdefinitions_Rinv || bitM || 2.04445466803e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || bNF_Cardinal_cone || 2.0123077936e-08
Coq_Reals_Rdefinitions_R1 || code_integer_of_num || 1.97099173044e-08
Coq_Reals_Rtrigo_def_exp || neg || 1.94122628672e-08
Coq_Reals_Rtrigo_def_exp || code_Neg || 1.92662599149e-08
Coq_Reals_Rdefinitions_R1 || code_integer_of_nat || 1.92583273383e-08
Coq_Reals_Rtrigo_def_exp || pos || 1.90773441244e-08
Coq_Reals_Rtrigo_def_exp || code_Pos || 1.8665827885e-08
Coq_Numbers_Cyclic_Int31_Int31_incr || suc || 1.75372538168e-08
Coq_Sets_Ensembles_Add || sublist || 1.74320497712e-08
Coq_Sets_Ensembles_In || member || 1.72593252779e-08
Coq_Sets_Ensembles_Union_0 || append || 1.6841649494e-08
Coq_Numbers_Integer_Binary_ZBinary_Z_le || antisym || 1.68113809721e-08
Coq_Structures_OrdersEx_Z_as_OT_le || antisym || 1.68113809721e-08
Coq_Structures_OrdersEx_Z_as_DT_le || antisym || 1.68113809721e-08
Coq_Numbers_Cyclic_DoubleCyclic_DoubleCyclic_mk_zn2z_ops_karatsuba || lenlex || 1.66993476977e-08
Coq_Numbers_Cyclic_DoubleCyclic_DoubleCyclic_mk_zn2z_ops || lenlex || 1.66993476977e-08
Coq_Reals_Rdefinitions_R1 || code_Pos || 1.6678073482e-08
Coq_Sets_Ensembles_Strict_Included || list_ex1 || 1.64442012916e-08
__constr_Coq_Numbers_BinNums_positive_0_2 || nat_of_num || 1.62539041551e-08
Coq_MSets_MSetPositive_PositiveSet_eq || bNF_Cardinal_cone || 1.5954865249e-08
Coq_PArith_POrderedType_Positive_as_DT_pred_N || code_nat_of_integer || 1.57607041746e-08
Coq_PArith_POrderedType_Positive_as_OT_pred_N || code_nat_of_integer || 1.57607041746e-08
Coq_Structures_OrdersEx_Positive_as_DT_pred_N || code_nat_of_integer || 1.57607041746e-08
Coq_Structures_OrdersEx_Positive_as_OT_pred_N || code_nat_of_integer || 1.57607041746e-08
Coq_PArith_BinPos_Pos_of_succ_nat || code_nat_of_integer || 1.57180855998e-08
Coq_Reals_Rdefinitions_R1 || code_integer_of_int || 1.56431710726e-08
Coq_QArith_QArith_base_Qopp || bit1 || 1.5493592245e-08
Coq_ZArith_BinInt_Z_abs || code_Suc || 1.54364597817e-08
Coq_Reals_Rtrigo_def_exp || bit1 || 1.52582576433e-08
Coq_Sets_Ensembles_Intersection_0 || removeAll || 1.41164948964e-08
Coq_Numbers_Cyclic_Int31_Cyclic31_int31_ops || less_than || 1.36693221523e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || code_natural_of_nat || 1.32829457503e-08
Coq_Numbers_Cyclic_DoubleCyclic_DoubleCyclic_mk_zn2z_ops_karatsuba || lexord || 1.30740680387e-08
Coq_Numbers_Cyclic_DoubleCyclic_DoubleCyclic_mk_zn2z_ops || lexord || 1.30740680387e-08
Coq_Sets_Ensembles_Union_0 || splice || 1.30455213314e-08
Coq_Reals_Rtrigo_def_cosh || numeral_numeral || 1.30435635393e-08
Coq_Sets_Ensembles_Strict_Included || list_ex || 1.30100771995e-08
Coq_QArith_Qcanon_Qcopp || suc || 1.28557173213e-08
Coq_QArith_Qcanon_Qcinv || code_Suc || 1.2761350737e-08
Coq_QArith_Qreals_Q2R || bitM || 1.27381492522e-08
Coq_Reals_Rdefinitions_Rinv || bit1 || 1.26028903138e-08
Coq_ZArith_BinInt_Z_sqrt || code_Suc || 1.25988031568e-08
Coq_Numbers_Integer_Binary_ZBinary_Z_le || sym || 1.24590289507e-08
Coq_Structures_OrdersEx_Z_as_OT_le || sym || 1.24590289507e-08
Coq_Structures_OrdersEx_Z_as_DT_le || sym || 1.24590289507e-08
Coq_Numbers_Cyclic_DoubleCyclic_DoubleType_zn2z_0 || set || 1.20804691134e-08
Coq_Numbers_Cyclic_DoubleCyclic_DoubleCyclic_mk_zn2z_ops_karatsuba || min_ext || 1.17948320062e-08
Coq_Numbers_Cyclic_DoubleCyclic_DoubleCyclic_mk_zn2z_ops || min_ext || 1.17948320062e-08
Coq_QArith_Qreals_Q2R || neg || 1.17551448753e-08
Coq_QArith_Qreals_Q2R || code_Neg || 1.16571264224e-08
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibble0 || 1.16559407667e-08
Coq_QArith_Qreals_Q2R || pos || 1.15425521296e-08
Coq_ZArith_BinInt_Z_log2_up || code_nat_of_integer || 1.1509003632e-08
Coq_Arith_PeanoNat_Nat_div2 || inc || 1.14142130489e-08
Coq_Reals_Rtrigo_def_exp || numeral_numeral || 1.13297902565e-08
Coq_Numbers_Rational_BigQ_BigQ_BigQ_red || inc || 1.13234852186e-08
Coq_QArith_Qreals_Q2R || code_Pos || 1.12766394199e-08
Coq_Numbers_Cyclic_DoubleCyclic_DoubleCyclic_mk_zn2z_ops_karatsuba || lex || 1.1259378603e-08
Coq_Numbers_Cyclic_DoubleCyclic_DoubleCyclic_mk_zn2z_ops || lex || 1.1259378603e-08
Coq_PArith_BinPos_Pos_sqrt || suc || 1.11280224865e-08
Coq_Numbers_Cyclic_Int31_Int31_int31_0 || nat || 1.09777752081e-08
Coq_Reals_Rtrigo_def_cosh || semiring_1_of_nat || 1.07978259916e-08
Coq_Numbers_Natural_BigN_BigN_BigN_w5_op || less_than || 1.07912034367e-08
Coq_Numbers_Natural_BigN_BigN_BigN_w4_op || less_than || 1.07912034367e-08
Coq_Numbers_Natural_BigN_BigN_BigN_w3_op || less_than || 1.07912034367e-08
Coq_Numbers_Natural_BigN_BigN_BigN_w2_op || less_than || 1.07912034367e-08
Coq_Numbers_Natural_BigN_BigN_BigN_w1_op || less_than || 1.07912034367e-08
Coq_PArith_BinPos_Pos_square || suc || 1.07473811983e-08
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Qc || nat_of_num || 1.07438237798e-08
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || inc || 1.07303218978e-08
Coq_Reals_Rtrigo_def_cos || numeral_numeral || 1.05148708955e-08
Coq_Numbers_Natural_BigN_BigN_BigN_w6_op || less_than || 1.04338459024e-08
Coq_Arith_PeanoNat_Nat_pred || code_Suc || 1.04036168536e-08
Coq_Numbers_Cyclic_Int31_Cyclic31_int31_ops || pred_nat || 1.0297913236e-08
Coq_QArith_Qreduction_Qred || suc || 1.02560769251e-08
Coq_ZArith_Zpower_two_power_nat || code_nat_of_integer || 1.00635584686e-08
Coq_Sets_Ensembles_Add || cons || 1.00258105318e-08
Coq_Reals_Rdefinitions_R1 || code_natural_of_nat || 1.00096896116e-08
Coq_Sets_Ensembles_Intersection_0 || filter2 || 9.93846770878e-09
Coq_Numbers_Rational_BigQ_BigQ_BigQ_red || code_Suc || 9.75396808066e-09
Coq_PArith_POrderedType_Positive_as_DT_of_nat || bit1 || 9.71131843677e-09
Coq_PArith_POrderedType_Positive_as_OT_of_nat || bit1 || 9.71131843677e-09
Coq_Structures_OrdersEx_Positive_as_DT_of_nat || bit1 || 9.71131843677e-09
Coq_Structures_OrdersEx_Positive_as_OT_of_nat || bit1 || 9.71131843677e-09
Coq_Structures_OrdersEx_N_as_OT_max || transitive_trancl || 9.5254910412e-09
Coq_Numbers_Natural_Binary_NBinary_N_max || transitive_trancl || 9.5254910412e-09
Coq_Structures_OrdersEx_N_as_DT_max || transitive_trancl || 9.5254910412e-09
Coq_NArith_BinNat_N_max || transitive_trancl || 9.3774947591e-09
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibble1 || 9.34664603221e-09
Coq_Reals_Rtrigo_def_exp || semiring_1_of_nat || 9.30767814894e-09
Coq_ZArith_Zlogarithm_log_sup || nat2 || 9.26413537048e-09
Coq_Reals_Rdefinitions_Ropp || bit1 || 9.17035189817e-09
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Qc || code_nat_of_natural || 9.12799178076e-09
Coq_Numbers_Natural_BigN_BigN_BigN_w5_op || pred_nat || 9.03098949859e-09
Coq_Numbers_Natural_BigN_BigN_BigN_w4_op || pred_nat || 9.03098949859e-09
Coq_Numbers_Natural_BigN_BigN_BigN_w3_op || pred_nat || 9.03098949859e-09
Coq_Numbers_Natural_BigN_BigN_BigN_w2_op || pred_nat || 9.03098949859e-09
Coq_Numbers_Natural_BigN_BigN_BigN_w1_op || pred_nat || 9.03098949859e-09
Coq_Numbers_Natural_Binary_NBinary_N_succ_pos || pos || 8.97889437137e-09
Coq_Structures_OrdersEx_N_as_OT_succ_pos || pos || 8.97889437137e-09
Coq_Structures_OrdersEx_N_as_DT_succ_pos || pos || 8.97889437137e-09
Coq_NArith_BinNat_N_succ_pos || pos || 8.9781542128e-09
Coq_Numbers_Cyclic_DoubleCyclic_DoubleCyclic_mk_zn2z_ops_karatsuba || max_ext || 8.87220463063e-09
Coq_Numbers_Cyclic_DoubleCyclic_DoubleCyclic_mk_zn2z_ops || max_ext || 8.87220463063e-09
Coq_Numbers_Natural_BigN_BigN_BigN_w6_op || pred_nat || 8.82576253609e-09
Coq_Numbers_Rational_BigQ_BigQ_BigQ_opp || bit1 || 8.72052643242e-09
Coq_Numbers_Rational_BigQ_BigQ_BigQ_eq || bNF_Cardinal_cone || 8.56660440665e-09
Coq_NArith_BinNat_N_peano_rec || rec_nat || 8.37213157276e-09
Coq_NArith_BinNat_N_peano_rect || rec_nat || 8.37213157276e-09
Coq_Reals_Rtrigo_def_cos || semiring_1_of_nat || 8.19941465262e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_opp || suc || 7.7714138987e-09
Coq_Reals_Rtrigo_def_cosh || ring_1_of_int || 7.68465194108e-09
Coq_Numbers_Natural_BigN_BigN_BigN_dom_op || finite_psubset || 7.67983444326e-09
Coq_PArith_POrderedType_Positive_as_DT_of_succ_nat || bit0 || 7.64853646806e-09
Coq_PArith_POrderedType_Positive_as_OT_of_succ_nat || bit0 || 7.64853646806e-09
Coq_Structures_OrdersEx_Positive_as_DT_of_succ_nat || bit0 || 7.64853646806e-09
Coq_Structures_OrdersEx_Positive_as_OT_of_succ_nat || bit0 || 7.64853646806e-09
Coq_Sets_Finite_sets_Finite_0 || null2 || 7.644244745e-09
Coq_Sets_Ensembles_Intersection_0 || dropWhile || 7.61284483194e-09
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibbleA || 7.57721402499e-09
Coq_Sets_Ensembles_Intersection_0 || remove1 || 7.55828760025e-09
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibbleB || 7.4469080003e-09
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibble8 || 7.33406329833e-09
__constr_Coq_Numbers_BinNums_Z_0_3 || nat2 || 7.2885136281e-09
Coq_Sets_Ensembles_Intersection_0 || takeWhile || 7.28067846586e-09
Coq_Reals_Rdefinitions_Rmult || pow || 7.21160770383e-09
Coq_Numbers_Natural_BigN_BigN_BigN_eq || wf || 7.13400985149e-09
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || one2 || 7.09000553997e-09
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibbleC || 6.99542715416e-09
Coq_ZArith_Zpower_two_power_pos || nat2 || 6.96996973029e-09
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibbleD || 6.92980133624e-09
Coq_Numbers_Natural_BigN_BigN_BigN_w5 || nat || 6.91718361051e-09
Coq_Numbers_Natural_BigN_BigN_BigN_w4 || nat || 6.91718361051e-09
Coq_Numbers_Natural_BigN_BigN_BigN_w3 || nat || 6.91718361051e-09
Coq_Numbers_Natural_BigN_BigN_BigN_w2 || nat || 6.91718361051e-09
Coq_Numbers_Natural_BigN_BigN_BigN_w1 || nat || 6.91718361051e-09
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || antisym || 6.86477572864e-09
Coq_Structures_OrdersEx_Z_as_OT_lt || antisym || 6.86477572864e-09
Coq_Structures_OrdersEx_Z_as_DT_lt || antisym || 6.86477572864e-09
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || sym || 6.83055055957e-09
Coq_Structures_OrdersEx_Z_as_OT_lt || sym || 6.83055055957e-09
Coq_Structures_OrdersEx_Z_as_DT_lt || sym || 6.83055055957e-09
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibbleF || 6.76213939774e-09
Coq_Sets_Ensembles_Intersection_0 || drop || 6.74270005292e-09
Coq_Reals_Rtrigo_def_cos || nat_of_nibble || 6.62987345073e-09
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibble3 || 6.62656574783e-09
Coq_PArith_BinPos_Pos_pred_N || code_nat_of_integer || 6.57400805352e-09
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibble9 || 6.51343333611e-09
Coq_Sets_Ensembles_Intersection_0 || take || 6.50899015377e-09
Coq_Reals_Rtrigo_def_exp || ring_1_of_int || 6.50027141277e-09
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibble5 || 6.47961249204e-09
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || trans || 6.39838363559e-09
Coq_Structures_OrdersEx_Z_as_OT_lt || trans || 6.39838363559e-09
Coq_Structures_OrdersEx_Z_as_DT_lt || trans || 6.39838363559e-09
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibble2 || 6.38753064826e-09
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibble4 || 6.35954535931e-09
Coq_PArith_POrderedType_Positive_as_DT_succ || code_nat_of_integer || 6.35073658008e-09
Coq_PArith_POrderedType_Positive_as_OT_succ || code_nat_of_integer || 6.35073658008e-09
Coq_Structures_OrdersEx_Positive_as_DT_succ || code_nat_of_integer || 6.35073658008e-09
Coq_Structures_OrdersEx_Positive_as_OT_succ || code_nat_of_integer || 6.35073658008e-09
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibble7 || 6.33274030963e-09
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibbleE || 6.33274030963e-09
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibble6 || 6.30702791547e-09
Coq_PArith_POrderedType_Positive_as_DT_pred_double || pos || 6.17102352028e-09
Coq_PArith_POrderedType_Positive_as_OT_pred_double || pos || 6.17102352028e-09
Coq_Structures_OrdersEx_Positive_as_DT_pred_double || pos || 6.17102352028e-09
Coq_Structures_OrdersEx_Positive_as_OT_pred_double || pos || 6.17102352028e-09
Coq_Numbers_Cyclic_Int31_Cyclic31_int31_ops || bNF_Ca1495478003natLeq || 6.15627800299e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || null || 6.12781008159e-09
Coq_PArith_BinPos_Pos_succ || code_nat_of_integer || 6.07894617394e-09
Coq_Reals_Rtrigo_def_cos || product_size_unit || 6.02742693279e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || null || 5.89408596332e-09
Coq_PArith_BinPos_Pos_pred_double || pos || 5.88191851276e-09
Coq_Init_Nat_pred || code_Suc || 5.73527150273e-09
Coq_Reals_Rtrigo_def_cos || size_num || 5.69994652197e-09
Coq_Reals_Rtrigo_def_cos || ring_1_of_int || 5.65640883766e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || wf || 5.65405695561e-09
Coq_PArith_BinPos_Pos_of_nat || code_nat_of_natural || 5.6131972121e-09
Coq_Numbers_Cyclic_Abstract_CyclicAxioms_ZnZ_Specs_0 || asym || 5.50436245863e-09
Coq_Numbers_Natural_Binary_NBinary_N_succ || code_nat_of_integer || 5.39922120875e-09
Coq_Structures_OrdersEx_N_as_OT_succ || code_nat_of_integer || 5.39922120875e-09
Coq_Structures_OrdersEx_N_as_DT_succ || code_nat_of_integer || 5.39922120875e-09
Coq_NArith_BinNat_N_succ || code_nat_of_integer || 5.36027854321e-09
Coq_romega_ReflOmegaCore_ZOmega_prop_stable || nat3 || 5.31819930417e-09
Coq_PArith_POrderedType_Positive_as_DT_succ || code_integer_of_int || 5.30240302437e-09
Coq_PArith_POrderedType_Positive_as_OT_succ || code_integer_of_int || 5.30240302437e-09
Coq_Structures_OrdersEx_Positive_as_DT_succ || code_integer_of_int || 5.30240302437e-09
Coq_Structures_OrdersEx_Positive_as_OT_succ || code_integer_of_int || 5.30240302437e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_Odd || nat_of_num || 5.11096288261e-09
Coq_Numbers_Natural_BigN_BigN_BigN_w6 || nat || 5.03441474312e-09
Coq_Numbers_Cyclic_Abstract_CyclicAxioms_ZnZ_Specs_0 || irrefl || 5.01070565079e-09
Coq_PArith_BinPos_Pos_succ || code_integer_of_int || 5.00637800427e-09
Coq_PArith_BinPos_Pos_pred || dup || 5.0044805229e-09
Coq_Numbers_Natural_BigN_BigN_BigN_Odd || nat_of_num || 4.84988572859e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_Even || nat_of_num || 4.80919841231e-09
Coq_Numbers_Cyclic_Int31_Cyclic31_Int31Cyclic_ops || less_than || 4.74143771681e-09
Coq_PArith_BinPos_Pos_pred || code_dup || 4.69131145172e-09
Coq_Numbers_Natural_Binary_NBinary_N_succ || nat_of_num || 4.66533609582e-09
Coq_Structures_OrdersEx_N_as_OT_succ || nat_of_num || 4.66533609582e-09
Coq_Structures_OrdersEx_N_as_DT_succ || nat_of_num || 4.66533609582e-09
Coq_NArith_BinNat_N_succ || nat_of_num || 4.63525718097e-09
Coq_Numbers_Cyclic_Int31_Cyclic31_Int31Cyclic_t || nat || 4.55865708729e-09
Coq_Reals_Ranalysis1_derivable_pt_lim || ord_less || 4.52087023746e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || distinct || 4.46436002043e-09
Coq_Numbers_Natural_BigN_BigN_BigN_Even || nat_of_num || 4.44921890164e-09
Coq_Structures_OrdersEx_N_as_OT_max || id_on || 4.43817488857e-09
Coq_Numbers_Natural_Binary_NBinary_N_max || id_on || 4.43817488857e-09
Coq_Structures_OrdersEx_N_as_DT_max || id_on || 4.43817488857e-09
Coq_NArith_BinNat_N_max || id_on || 4.36060191045e-09
Coq_Numbers_Rational_BigQ_BigQ_BigQ_inv_norm || suc || 4.3373099932e-09
Coq_ZArith_BinInt_Z_to_nat || code_natural_of_nat || 4.29579861709e-09
Coq_Structures_OrdersEx_N_as_OT_succ || id2 || 4.27978387616e-09
Coq_Structures_OrdersEx_N_as_DT_succ || id2 || 4.27978387616e-09
Coq_Numbers_Natural_Binary_NBinary_N_succ || id2 || 4.27978387616e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_Odd || nat2 || 4.26070456501e-09
Coq_NArith_BinNat_N_succ || id2 || 4.23665505682e-09
Coq_Reals_Rtrigo_def_cos || suc || 4.23210537428e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_Even || nat2 || 4.07276774615e-09
Coq_Reals_Rtrigo_def_cos || pred_numeral || 4.04506287067e-09
Coq_Numbers_Natural_BigN_BigN_BigN_Odd || nat2 || 3.95499704704e-09
Coq_Reals_Rdefinitions_Rle || wf || 3.92413019136e-09
Coq_Numbers_Cyclic_Int31_Cyclic31_Int31Cyclic_ops || pred_nat || 3.83597377251e-09
Coq_Numbers_Rational_BigQ_BigQ_BigQ_inv || suc || 3.82921488523e-09
Coq_Structures_OrdersEx_N_as_OT_add || id_on || 3.77992077944e-09
Coq_Numbers_Natural_Binary_NBinary_N_add || id_on || 3.77992077944e-09
Coq_Structures_OrdersEx_N_as_DT_add || id_on || 3.77992077944e-09
Coq_Sets_Finite_sets_Finite_0 || null || 3.7603269337e-09
Coq_Numbers_Natural_BigN_BigN_BigN_Even || nat2 || 3.71328018698e-09
Coq_Numbers_Natural_BigN_BigN_BigN_w5_op || bNF_Ca1495478003natLeq || 3.71112953427e-09
Coq_Numbers_Natural_BigN_BigN_BigN_w4_op || bNF_Ca1495478003natLeq || 3.71112953427e-09
Coq_Numbers_Natural_BigN_BigN_BigN_w3_op || bNF_Ca1495478003natLeq || 3.71112953427e-09
Coq_Numbers_Natural_BigN_BigN_BigN_w2_op || bNF_Ca1495478003natLeq || 3.71112953427e-09
Coq_Numbers_Natural_BigN_BigN_BigN_w1_op || bNF_Ca1495478003natLeq || 3.71112953427e-09
Coq_NArith_BinNat_N_add || id_on || 3.70633174134e-09
Coq_Numbers_Natural_Binary_NBinary_N_max || transitive_rtrancl || 3.56754974978e-09
Coq_Structures_OrdersEx_N_as_OT_max || transitive_rtrancl || 3.56754974978e-09
Coq_Structures_OrdersEx_N_as_DT_max || transitive_rtrancl || 3.56754974978e-09
Coq_NArith_BinNat_N_max || transitive_rtrancl || 3.51462783109e-09
Coq_Reals_Rdefinitions_R0 || int || 3.4808046619e-09
Coq_Numbers_Cyclic_Abstract_CyclicAxioms_ZnZ_Specs_0 || antisym || 3.47990536258e-09
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || product_Unity || 3.45192101814e-09
Coq_Arith_PeanoNat_Nat_pred || inc || 3.39444814864e-09
Coq_Numbers_Natural_BigN_BigN_BigN_lt || null || 3.30498004466e-09
Coq_Numbers_Natural_BigN_BigN_BigN_w6_op || bNF_Ca1495478003natLeq || 3.30270651118e-09
Coq_Structures_OrdersEx_N_as_OT_add || transitive_trancl || 3.24518649094e-09
Coq_Numbers_Natural_Binary_NBinary_N_add || transitive_trancl || 3.24518649094e-09
Coq_Structures_OrdersEx_N_as_DT_add || transitive_trancl || 3.24518649094e-09
Coq_Numbers_Natural_BigN_BigN_BigN_le || null || 3.23364400121e-09
Coq_NArith_BinNat_N_add || transitive_trancl || 3.18909116202e-09
Coq_Structures_OrdersEx_N_as_OT_lt || bNF_Wellorder_wo_rel || 3.17648290547e-09
Coq_Structures_OrdersEx_N_as_DT_lt || bNF_Wellorder_wo_rel || 3.17648290547e-09
Coq_Numbers_Natural_Binary_NBinary_N_lt || bNF_Wellorder_wo_rel || 3.17648290547e-09
Coq_Numbers_Natural_BigN_BigN_BigN_dom_t || set || 3.1651261818e-09
Coq_NArith_BinNat_N_lt || bNF_Wellorder_wo_rel || 3.15204968602e-09
Coq_Numbers_Cyclic_Abstract_CyclicAxioms_ZnZ_Specs_0 || bNF_Ca829732799finite || 3.1447721066e-09
Coq_Numbers_Natural_Binary_NBinary_N_add || transitive_rtrancl || 3.1286436644e-09
Coq_Structures_OrdersEx_N_as_OT_add || transitive_rtrancl || 3.1286436644e-09
Coq_Structures_OrdersEx_N_as_DT_add || transitive_rtrancl || 3.1286436644e-09
Coq_Reals_Rdefinitions_Ropp || one_one || 3.08366286801e-09
Coq_NArith_BinNat_N_add || transitive_rtrancl || 3.07605952867e-09
Coq_Numbers_Cyclic_Int31_Int31_phi || code_i1730018169atural || 3.03122396768e-09
__constr_Coq_MMaps_MMapPositive_PositiveMap_tree_0_1 || nil || 2.92702674095e-09
Coq_Reals_Rtrigo_def_cos || one_one || 2.78550799529e-09
Coq_QArith_QArith_base_Qopp || dup || 2.75729267042e-09
Coq_QArith_QArith_base_Qopp || code_dup || 2.58773053758e-09
Coq_Sets_Ensembles_Singleton_0 || remdups || 2.57650938288e-09
Coq_Reals_Rdefinitions_R0 || nat || 2.56037950987e-09
Coq_Numbers_Natural_BigN_BigN_BigN_lt || distinct || 2.37875910342e-09
Coq_romega_ReflOmegaCore_ZOmega_p_invert || suc_Rep || 2.36130236982e-09
Coq_romega_ReflOmegaCore_ZOmega_p_apply_right || suc_Rep || 2.36130236982e-09
Coq_romega_ReflOmegaCore_ZOmega_p_apply_left || suc_Rep || 2.36130236982e-09
Coq_ZArith_BinInt_Z_of_nat || code_integer_of_int || 2.34694620291e-09
Coq_Reals_Rtrigo_def_cos || nat_of_num || 2.23044724112e-09
Coq_PArith_BinPos_Pos_of_nat || bitM || 2.18775536118e-09
Coq_Init_Datatypes_IDProp || induct_true || 2.10959226262e-09
Coq_Classes_Morphisms_normalization_done_0 || induct_true || 2.10959226262e-09
Coq_Classes_Morphisms_PartialApplication_0 || induct_true || 2.10959226262e-09
Coq_Classes_Morphisms_apply_subrelation_0 || induct_true || 2.10959226262e-09
Coq_Classes_CMorphisms_normalization_done_0 || induct_true || 2.10959226262e-09
Coq_Classes_CMorphisms_PartialApplication_0 || induct_true || 2.10959226262e-09
Coq_Classes_CMorphisms_apply_subrelation_0 || induct_true || 2.10959226262e-09
Coq_Numbers_Cyclic_Int31_Int31_tail031 || code_natural_of_nat || 2.07981629215e-09
Coq_Numbers_Cyclic_Int31_Int31_head031 || code_natural_of_nat || 2.07981629215e-09
Coq_Reals_Rdefinitions_R0 || nat_of_num || 2.05090001384e-09
Coq_PArith_BinPos_Pos_of_nat || neg || 2.03043030482e-09
Coq_PArith_BinPos_Pos_of_nat || code_Neg || 2.01308198073e-09
Coq_PArith_BinPos_Pos_of_nat || pos || 1.99539705773e-09
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || ii || 1.98603974305e-09
Coq_PArith_BinPos_Pos_of_nat || code_Pos || 1.95034027727e-09
Coq_Numbers_Natural_BigN_BigN_BigN_Odd || inc || 1.94974170305e-09
Coq_Reals_Rtrigo_def_cos || re || 1.93360297683e-09
Coq_Reals_Rdefinitions_Ropp || pos || 1.90630967614e-09
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || code_integer || 1.90421920771e-09
Coq_Reals_Rdefinitions_Ropp || code_Pos || 1.88701125897e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_Odd || inc || 1.87582708788e-09
Coq_MMaps_MMapPositive_PositiveMap_find || find || 1.81104033936e-09
Coq_Reals_Rpower_ln || numeral_numeral || 1.80523721594e-09
Coq_Numbers_Natural_BigN_BigN_BigN_Even || inc || 1.77622878556e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_Even || inc || 1.75674941627e-09
Coq_Numbers_Cyclic_Int31_Int31_size || int || 1.72688141791e-09
Coq_Numbers_Cyclic_Int31_Cyclic31_Int31Cyclic_ops || bNF_Ca1495478003natLeq || 1.64852421786e-09
Coq_Numbers_Cyclic_Int31_Cyclic31_tail031_alt || semiring_1_of_nat || 1.59918419429e-09
Coq_Numbers_Cyclic_Int31_Cyclic31_head031_alt || semiring_1_of_nat || 1.59918419429e-09
Coq_Sets_Partial_Order_Strict_Rel_of || transitive_tranclp || 1.59617526194e-09
Coq_PArith_BinPos_Pos_pred || bit1 || 1.56555176941e-09
Coq_QArith_QArith_base_inject_Z || bitM || 1.48201505402e-09
Coq_romega_ReflOmegaCore_ZOmega_move_right || rep_Nat || 1.43878389815e-09
Coq_romega_ReflOmegaCore_ZOmega_p_rewrite || rep_Nat || 1.43293676696e-09
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || int || 1.40002045361e-09
Coq_Numbers_Cyclic_Int31_Int31_incr || code_natural_of_nat || 1.37877515611e-09
Coq_Relations_Relation_Definitions_reflexive || reflp || 1.3590118594e-09
__constr_Coq_Init_Datatypes_option_0_2 || none || 1.33684799381e-09
Coq_Reals_RIneq_nonneg || int_ge_less_than2 || 1.32342458081e-09
Coq_Reals_Rsqrt_def_Rsqrt || int_ge_less_than2 || 1.32342458081e-09
Coq_Reals_RIneq_nonneg || int_ge_less_than || 1.32342458081e-09
Coq_Reals_Rsqrt_def_Rsqrt || int_ge_less_than || 1.32342458081e-09
Coq_Numbers_Natural_BigN_BigN_BigN_Odd || bit1 || 1.32209541962e-09
Coq_Numbers_Cyclic_Int31_Int31_incr || code_nat_of_natural || 1.32167637252e-09
Coq_Reals_Rdefinitions_R1 || real || 1.31124011999e-09
Coq_Numbers_Cyclic_Int31_Int31_twice || suc || 1.30115043492e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_Odd || bit1 || 1.30106030632e-09
Coq_Sets_Partial_Order_Rel_of || transitive_rtranclp || 1.28682638951e-09
Coq_Numbers_Cyclic_Int31_Int31_twice_plus_one || suc || 1.28647068213e-09
Coq_Reals_Rtrigo1_PI2 || code_integer || 1.25895192426e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_Even || bit1 || 1.24340386341e-09
Coq_Numbers_Natural_BigN_BigN_BigN_Even || bit1 || 1.24092937903e-09
Coq_Numbers_Cyclic_Int31_Int31_phi_inv || nat_of_num || 1.23813757795e-09
Coq_Reals_Rdefinitions_R1 || bNF_Ca1495478003natLeq || 1.23134450641e-09
Coq_Numbers_BinNums_positive_0 || num || 1.19444880113e-09
Coq_Relations_Relation_Definitions_order_0 || equiv_equivp || 1.17145882336e-09
Coq_QArith_QArith_base_Qopp || bitM || 1.15909549733e-09
Coq_Reals_Rdefinitions_R1 || less_than || 1.15313632378e-09
Coq_QArith_QArith_base_inject_Z || neg || 1.14218296286e-09
Coq_QArith_QArith_base_inject_Z || code_Neg || 1.13162490403e-09
Coq_QArith_QArith_base_inject_Z || pos || 1.12255960311e-09
Coq_Sets_Relations_3_coherent || transitive_trancl || 1.09700340147e-09
Coq_QArith_QArith_base_inject_Z || code_Pos || 1.09650367153e-09
Coq_Reals_Rdefinitions_R1 || pos || 1.06077698574e-09
Coq_Reals_Rdefinitions_Rlt || wf || 1.03374479451e-09
Coq_Reals_Rdefinitions_R1 || nat_of_num || 1.02830213842e-09
Coq_Sets_Relations_3_coherent || transitive_rtrancl || 1.02459264485e-09
Coq_Relations_Relation_Definitions_transitive || symp || 1.01066081828e-09
Coq_Relations_Relation_Definitions_equivalence_0 || equiv_equivp || 8.93652309876e-10
Coq_QArith_QArith_base_inject_Z || bit1 || 8.81421648462e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_Odd || code_nat_of_integer || 8.18212264557e-10
Coq_Reals_AltSeries_PI_tg || int_ge_less_than2 || 7.67579661118e-10
Coq_Reals_AltSeries_PI_tg || int_ge_less_than || 7.67579661118e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_Even || code_nat_of_integer || 7.65271195922e-10
Coq_Numbers_Natural_BigN_BigN_BigN_Odd || code_nat_of_integer || 7.59621333745e-10
Coq_Relations_Relation_Definitions_antisymmetric || transp || 7.19823674693e-10
Coq_Reals_Rdefinitions_R1 || of_int || 6.94305308438e-10
Coq_Numbers_Natural_BigN_BigN_BigN_Even || code_nat_of_integer || 6.90779647341e-10
Coq_Reals_Rdefinitions_Rle || trans || 6.86727978974e-10
Coq_Reals_Rdefinitions_R1 || pred_nat || 6.61122350854e-10
Coq_PArith_POrderedType_Positive_as_DT_pred_double || code_nat_of_integer || 6.34016524387e-10
Coq_PArith_POrderedType_Positive_as_OT_pred_double || code_nat_of_integer || 6.34016524387e-10
Coq_Structures_OrdersEx_Positive_as_DT_pred_double || code_nat_of_integer || 6.34016524387e-10
Coq_Structures_OrdersEx_Positive_as_OT_pred_double || code_nat_of_integer || 6.34016524387e-10
Coq_ZArith_BinInt_Z_double || code_Suc || 6.23882955398e-10
Coq_ZArith_BinInt_Z_succ_double || code_Suc || 6.23567261357e-10
Coq_PArith_BinPos_Pos_pred_double || code_nat_of_integer || 5.91339960402e-10
Coq_MMaps_MMapPositive_PositiveMap_empty || nil || 5.85565800276e-10
Coq_PArith_POrderedType_Positive_as_DT_of_nat || nat_of_num || 5.80672708806e-10
Coq_PArith_POrderedType_Positive_as_OT_of_nat || nat_of_num || 5.80672708806e-10
Coq_Structures_OrdersEx_Positive_as_DT_of_nat || nat_of_num || 5.80672708806e-10
Coq_Structures_OrdersEx_Positive_as_OT_of_nat || nat_of_num || 5.80672708806e-10
Coq_MMaps_MMapPositive_PositiveMap_remove || removeAll || 5.77629479493e-10
Coq_Sorting_Sorted_Sorted_0 || ord_less || 5.72564698701e-10
Coq_Lists_SetoidList_NoDupA_0 || ord_less || 5.6690995707e-10
Coq_Relations_Relation_Definitions_symmetric || transp || 5.51209736346e-10
Coq_PArith_POrderedType_Positive_as_DT_of_succ_nat || pos || 5.36060614604e-10
Coq_PArith_POrderedType_Positive_as_OT_of_succ_nat || pos || 5.36060614604e-10
Coq_Structures_OrdersEx_Positive_as_DT_of_succ_nat || pos || 5.36060614604e-10
Coq_Structures_OrdersEx_Positive_as_OT_of_succ_nat || pos || 5.36060614604e-10
Coq_Relations_Relation_Definitions_transitive || semilattice_axioms || 5.25863052192e-10
Coq_MSets_MSetPositive_PositiveSet_elements || bit1 || 5.04513006067e-10
Coq_MMaps_MMapPositive_PositiveMap_remove || dropWhile || 4.95646261015e-10
Coq_Reals_Rdefinitions_Rlt || trans || 4.94596915693e-10
Coq_MMaps_MMapPositive_PositiveMap_remove || remove1 || 4.90824543691e-10
Coq_FSets_FSetPositive_PositiveSet_elements || bit1 || 4.86899448501e-10
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || code_natural_of_nat || 4.8654225464e-10
Coq_QArith_Qcanon_Qcinv || suc || 4.74541797331e-10
Coq_MMaps_MMapPositive_PositiveMap_remove || takeWhile || 4.66622144127e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_div2 || suc || 4.66594355185e-10
Coq_Reals_Raxioms_INR || int_ge_less_than2 || 4.59492035375e-10
Coq_Reals_Raxioms_INR || int_ge_less_than || 4.59492035375e-10
Coq_Reals_R_sqrt_sqrt || int_ge_less_than2 || 4.50037655928e-10
Coq_Reals_R_sqrt_sqrt || int_ge_less_than || 4.50037655928e-10
Coq_Reals_Rdefinitions_R0 || code_integer_of_num || 4.3947767971e-10
Coq_Reals_RIneq_Rsqr || int_ge_less_than2 || 4.32917094274e-10
Coq_Reals_RIneq_Rsqr || int_ge_less_than || 4.32917094274e-10
Coq_Reals_Rtrigo_def_cosh || suc || 4.2133235895e-10
Coq_MMaps_MMapPositive_PositiveMap_remove || drop || 4.2129151118e-10
Coq_Reals_Rbasic_fun_Rabs || int_ge_less_than2 || 4.09176014374e-10
Coq_Reals_Rbasic_fun_Rabs || int_ge_less_than || 4.09176014374e-10
Coq_Numbers_Rational_BigQ_BigQ_BigQ_opp || bit0 || 4.062411165e-10
Coq_MMaps_MMapPositive_PositiveMap_remove || take || 4.02237465155e-10
Coq_Reals_R_sqrt_sqrt || inc || 3.98324566168e-10
Coq_Reals_Rtrigo_def_sinh || suc || 3.97153736824e-10
Coq_Reals_Rbasic_fun_Rmax || measure || 3.96689379302e-10
Coq_MMaps_MMapPositive_PositiveMap_remove || filter2 || 3.87738212695e-10
Coq_Reals_RIneq_pos || int_ge_less_than2 || 3.87020772379e-10
Coq_Reals_RIneq_pos || int_ge_less_than || 3.87020772379e-10
Coq_MSets_MSetPositive_PositiveSet_elements || bit0 || 3.85816302345e-10
Coq_FSets_FSetPositive_PositiveSet_E_lt || one2 || 3.84661784474e-10
Coq_Reals_Rdefinitions_R0 || rat || 3.81557277394e-10
Coq_MSets_MSetPositive_PositiveSet_E_lt || one2 || 3.78858826108e-10
Coq_FSets_FSetPositive_PositiveSet_elements || bit0 || 3.75299792385e-10
Coq_Reals_Rdefinitions_R0 || code_Pos || 3.7390648231e-10
Coq_Reals_Rtrigo_def_exp || int_ge_less_than2 || 3.72137086709e-10
Coq_Reals_Rtrigo_def_exp || int_ge_less_than || 3.72137086709e-10
Coq_FSets_FMapPositive_PositiveMap_find || find || 3.6040713595e-10
Coq_MSets_MSetPositive_PositiveSet_E_eq || one2 || 3.48048208882e-10
Coq_Reals_Rbasic_fun_Rmax || measures || 3.47578539246e-10
Coq_Reals_Rtrigo_def_cosh || nat || 3.4728221861e-10
Coq_ZArith_BinInt_Z_to_pos || code_nat_of_natural || 3.38477493985e-10
Coq_FSets_FSetPositive_PositiveSet_E_eq || one2 || 3.36904585115e-10
Coq_Reals_Rdefinitions_R0 || pos || 3.33348189683e-10
Coq_Reals_Rtrigo_def_sinh || nat || 3.31639761823e-10
Coq_Relations_Relation_Definitions_PER_0 || semilattice || 3.2910156066e-10
Coq_Numbers_Natural_BigN_BigN_BigN_div2 || suc || 3.27724878602e-10
Coq_Reals_Rdefinitions_R0 || code_integer_of_nat || 3.23733202006e-10
Coq_Reals_Rtrigo_def_cos || code_integer_of_num || 3.15209799749e-10
Coq_FSets_FMapPositive_PositiveMap_empty || nil || 3.12930829041e-10
Coq_Reals_Rdefinitions_R1 || code_integer || 3.0089589659e-10
Coq_Relations_Relation_Definitions_preorder_0 || semilattice || 2.88298654212e-10
Coq_Reals_Rtrigo1_PI2 || code_natural || 2.77699062668e-10
Coq_Numbers_Rational_BigQ_BigQ_BigQ_inv_norm || inc || 2.75572100197e-10
Coq_Reals_Rdefinitions_Ropp || cnj || 2.73714608289e-10
__constr_Coq_Numbers_BinNums_positive_0_2 || nat2 || 2.73538466502e-10
Coq_Reals_Rtrigo1_PI2 || nat || 2.72713773598e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_abs || suc || 2.68403615096e-10
Coq_Reals_Rtrigo1_PI2 || int || 2.62526106155e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt || suc || 2.59844423876e-10
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || bitM || 2.56401287665e-10
Coq_Reals_Rdefinitions_Rlt || antisym || 2.50417493248e-10
Coq_Reals_RIneq_Rsqr || bit0 || 2.49416995997e-10
Coq_romega_ReflOmegaCore_ZOmega_valid1 || nat3 || 2.36419717665e-10
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || bNF_Ca1495478003natLeq || 2.35470346773e-10
Coq_Reals_Rdefinitions_Rlt || bNF_Ca829732799finite || 2.33634179269e-10
__constr_Coq_Init_Specif_sigT_0_1 || sum_Suml || 2.28960690068e-10
__constr_Coq_Init_Specif_sigT_0_1 || sum_Sumr || 2.28960690068e-10
Coq_Numbers_Rational_BigQ_BigQ_BigQ_inv_norm || code_Suc || 2.2519450553e-10
Coq_Numbers_Rational_BigQ_BigQ_BigQ_inv || inc || 2.20518171196e-10
Coq_Reals_Rdefinitions_Rle || antisym || 2.17179765274e-10
Coq_Reals_Rdefinitions_R0 || code_integer_of_int || 2.14834332089e-10
Coq_Reals_Rbasic_fun_Rmax || transitive_trancl || 2.110651682e-10
Coq_Structures_OrdersEx_N_as_OT_le || antisym || 2.1024387312e-10
Coq_Structures_OrdersEx_N_as_DT_le || antisym || 2.1024387312e-10
Coq_Numbers_Natural_Binary_NBinary_N_le || antisym || 2.1024387312e-10
Coq_NArith_BinNat_N_le || antisym || 2.06952020074e-10
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || less_than || 2.0164796774e-10
Coq_ZArith_BinInt_Z_log2 || code_Suc || 2.00078444051e-10
Coq_Reals_Rdefinitions_R0 || of_int || 1.88648981632e-10
Coq_ZArith_BinInt_Z_sgn || code_Suc || 1.88251971684e-10
Coq_Reals_Rdefinitions_R0 || code_natural_of_nat || 1.85989105463e-10
Coq_NArith_Ndigits_Nodd || nat_list || 1.85380662358e-10
Coq_Relations_Relation_Definitions_symmetric || abel_semigroup || 1.83074354211e-10
Coq_NArith_Ndigits_Neven || nat_list || 1.82449966611e-10
Coq_Reals_Rtrigo_def_exp || inc || 1.82413143141e-10
Coq_Numbers_Rational_BigQ_BigQ_BigQ_inv || code_Suc || 1.81715148303e-10
Coq_ZArith_BinInt_Z_to_pos || nat_of_num || 1.80854854681e-10
Coq_ZArith_BinInt_Z_sqrt || inc || 1.79623666959e-10
Coq_Relations_Relation_Definitions_reflexive || abel_semigroup || 1.78449229099e-10
Coq_Relations_Relation_Definitions_transitive || abel_s1917375468axioms || 1.75548973332e-10
Coq_Reals_Rtrigo1_PI2 || rat || 1.75503533765e-10
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Qc || inc || 1.73646767148e-10
Coq_Numbers_Rational_BigQ_BigQ_BigQ_red || bit1 || 1.69924138304e-10
Coq_Structures_OrdersEx_N_as_OT_le || sym || 1.6644424715e-10
Coq_Structures_OrdersEx_N_as_DT_le || sym || 1.6644424715e-10
Coq_Numbers_Natural_Binary_NBinary_N_le || sym || 1.6644424715e-10
Coq_Reals_Rdefinitions_Rle || bNF_Ca829732799finite || 1.63736262419e-10
Coq_NArith_BinNat_N_le || sym || 1.63599381511e-10
Coq_Reals_Rtrigo1_tan || numeral_numeral || 1.55102036461e-10
Coq_Relations_Relation_Definitions_transitive || equiv_part_equivp || 1.54629487932e-10
Coq_Relations_Relation_Definitions_reflexive || equiv_part_equivp || 1.52866154804e-10
Coq_QArith_Qcanon_this || bit1 || 1.50078153294e-10
Coq_NArith_BinNat_N_div2 || return_list || 1.40212055209e-10
Coq_Relations_Relation_Definitions_preorder_0 || equiv_equivp || 1.39777836152e-10
Coq_Relations_Relation_Definitions_order_0 || semilattice || 1.39190004904e-10
Coq_Reals_Rtrigo_def_sin || numeral_numeral || 1.38953234471e-10
Coq_Reals_Rtrigo_def_cos || im || 1.38534340596e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sgn || suc || 1.37676360672e-10
Coq_Relations_Relation_Definitions_equivalence_0 || semilattice || 1.34203416622e-10
Coq_Relations_Relation_Definitions_transitive || reflp || 1.34006115189e-10
Coq_Reals_R_sqrt_sqrt || nat || 1.33747036739e-10
Coq_Numbers_Natural_BigN_BigN_BigN_sqrt || suc || 1.32247950625e-10
Coq_Numbers_Rational_BigQ_BigQ_BigQ_of_Qc || bit0 || 1.28579978296e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_log2 || suc || 1.27350629811e-10
Coq_QArith_Qreduction_Qred || bit0 || 1.20660988231e-10
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || pred_nat || 1.15953169777e-10
Coq_PArith_POrderedType_Positive_as_DT_pred_double || code_integer_of_int || 1.13929780501e-10
Coq_PArith_POrderedType_Positive_as_OT_pred_double || code_integer_of_int || 1.13929780501e-10
Coq_Structures_OrdersEx_Positive_as_DT_pred_double || code_integer_of_int || 1.13929780501e-10
Coq_Structures_OrdersEx_Positive_as_OT_pred_double || code_integer_of_int || 1.13929780501e-10
Coq_PArith_BinPos_Pos_pred_double || code_integer_of_int || 1.04713041416e-10
Coq_Reals_Raxioms_IZR || code_nat_of_integer || 9.9125439757e-11
Coq_QArith_Qcanon_Qcopp || bit0 || 9.69972579278e-11
Coq_Relations_Relation_Definitions_antisymmetric || equiv_part_equivp || 9.41403305994e-11
Coq_Relations_Relation_Definitions_PER_0 || abel_semigroup || 9.27098847307e-11
Coq_Reals_Rdefinitions_Rinv || bit0 || 9.16689556603e-11
Coq_Init_Datatypes_length || uminus_uminus || 8.81242165517e-11
Coq_Reals_Ranalysis1_continuity_pt || trans || 8.32035782367e-11
Coq_Relations_Relation_Definitions_preorder_0 || abel_semigroup || 8.25137720306e-11
Coq_Relations_Relation_Definitions_antisymmetric || reflp || 8.02244970369e-11
Coq_NArith_BinNat_N_succ_double || embed_list || 7.87195048415e-11
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nat || 7.81837851463e-11
Coq_Numbers_Cyclic_Int31_Int31_positive_to_int31 || bitM || 7.79707039695e-11
Coq_Reals_Rbasic_fun_Rabs || id2 || 7.79041352919e-11
Coq_Reals_Rbasic_fun_Rmax || id_on || 7.63401618234e-11
Coq_NArith_BinNat_N_double || embed_list || 7.52580798684e-11
Coq_Reals_Raxioms_INR || nat2 || 6.7236124663e-11
Coq_Relations_Relation_Definitions_symmetric || equiv_part_equivp || 6.66176558886e-11
Coq_romega_ReflOmegaCore_ZOmega_extract_hyp_pos || rep_Nat || 6.37011888838e-11
Coq_Relations_Relation_Definitions_transitive || abel_semigroup || 6.35422789118e-11
Coq_Relations_Relation_Definitions_symmetric || semigroup || 6.26675454855e-11
Coq_Structures_OrdersEx_N_as_OT_lt || antisym || 6.2420565489e-11
Coq_Structures_OrdersEx_N_as_DT_lt || antisym || 6.2420565489e-11
Coq_Numbers_Natural_Binary_NBinary_N_lt || antisym || 6.2420565489e-11
Coq_Structures_OrdersEx_N_as_OT_lt || sym || 6.20979428963e-11
Coq_Structures_OrdersEx_N_as_DT_lt || sym || 6.20979428963e-11
Coq_Numbers_Natural_Binary_NBinary_N_lt || sym || 6.20979428963e-11
Coq_NArith_BinNat_N_lt || antisym || 6.1526578645e-11
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || neg || 6.12277560782e-11
Coq_NArith_BinNat_N_lt || sym || 6.12099266723e-11
Coq_Relations_Relation_Definitions_reflexive || semigroup || 6.08463813121e-11
Coq_Relations_Relation_Definitions_reflexive || semilattice_axioms || 6.05636301829e-11
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || pos || 6.02866344408e-11
Coq_Relations_Relation_Definitions_transitive || lattic35693393ce_set || 5.96325874171e-11
Coq_Structures_OrdersEx_N_as_OT_lt || trans || 5.80342245759e-11
Coq_Structures_OrdersEx_N_as_DT_lt || trans || 5.80342245759e-11
Coq_Numbers_Natural_Binary_NBinary_N_lt || trans || 5.80342245759e-11
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || code_Neg || 5.75854053945e-11
Coq_Relations_Relation_Definitions_symmetric || reflp || 5.75180878296e-11
Coq_NArith_BinNat_N_lt || trans || 5.72202291265e-11
Coq_ZArith_BinInt_Z_double || inc || 5.69184815228e-11
Coq_Reals_Ranalysis1_continuity_pt || wf || 5.68353845546e-11
Coq_ZArith_BinInt_Z_succ_double || inc || 5.65890156674e-11
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || code_Pos || 5.59833924592e-11
Coq_Relations_Relation_Operators_clos_trans_0 || transitive_tranclp || 5.27036865374e-11
Coq_Relations_Relation_Definitions_symmetric || semilattice_axioms || 5.17777916639e-11
Coq_Numbers_Cyclic_Int31_Int31_int31_0 || one2 || 4.94607090469e-11
Coq_Relations_Relation_Operators_clos_refl_trans_0 || transitive_rtranclp || 4.82808576058e-11
Coq_Reals_Rtrigo1_tan || ring_1_of_int || 4.67521434787e-11
Coq_Reals_Rdefinitions_R0 || product_Unity || 4.60446804484e-11
Coq_Reals_Ranalysis1_continuity_pt || antisym || 4.58977996132e-11
Coq_Init_Datatypes_snd || plus_plus || 4.45633236655e-11
Coq_Reals_Rtrigo1_tan || semiring_1_of_nat || 4.43667501497e-11
Coq_Numbers_BinNums_N_0 || num || 4.43156951536e-11
Coq_Reals_Rpower_ln || field_char_0_of_rat || 4.32758478732e-11
Coq_Reals_Rtrigo_def_sin || ring_1_of_int || 4.11718612765e-11
Coq_Reals_Rbasic_fun_Rmax || transitive_rtrancl || 4.07992257984e-11
Coq_Reals_Rgeom_yr || product_case_unit || 4.07277527533e-11
Coq_Reals_Rgeom_yr || product_rec_unit || 4.07277527533e-11
Coq_Reals_Ranalysis1_continuity_pt || bNF_Ca829732799finite || 4.00424294211e-11
Coq_Reals_Rtrigo_def_sin || semiring_1_of_nat || 3.95404849656e-11
Coq_Relations_Relation_Definitions_reflexive || lattic35693393ce_set || 3.7621782644e-11
Coq_Numbers_Cyclic_Int31_Int31_phi_inv_positive || bit1 || 3.72852728562e-11
Coq_FSets_FSetPositive_PositiveSet_cardinal || code_Neg || 3.67595138495e-11
Coq_Numbers_Cyclic_Int31_Int31_phi_inv_positive || bit0 || 3.58284566518e-11
Coq_FSets_FSetPositive_PositiveSet_cardinal || neg || 3.53272566669e-11
Coq_Relations_Relation_Definitions_PER_0 || equiv_equivp || 3.48928632319e-11
Coq_FSets_FSetPositive_PositiveSet_cardinal || code_Pos || 3.45986289074e-11
Coq_Reals_Rdefinitions_R0 || ratreal || 3.45961350425e-11
Coq_MSets_MSetPositive_PositiveSet_cardinal || code_Neg || 3.42190606986e-11
Coq_FSets_FSetPositive_PositiveSet_cardinal || pos || 3.41594816014e-11
Coq_MSets_MSetPositive_PositiveSet_cardinal || neg || 3.37574077964e-11
Coq_Reals_Rdefinitions_R1 || int || 3.3593795375e-11
Coq_Relations_Relation_Definitions_equivalence_0 || abel_semigroup || 3.26945530481e-11
Coq_MSets_MSetPositive_PositiveSet_cardinal || pos || 3.26501280417e-11
Coq_MSets_MSetPositive_PositiveSet_cardinal || code_Pos || 3.2222444563e-11
Coq_Relations_Relation_Definitions_symmetric || lattic35693393ce_set || 3.19144340956e-11
Coq_Relations_Relation_Definitions_order_0 || abel_semigroup || 3.15723245416e-11
Coq_FSets_FMapPositive_PositiveMap_Empty || null || 3.1313250074e-11
Coq_Numbers_Cyclic_Int31_Int31_positive_to_int31 || bit0 || 3.10315630696e-11
Coq_FSets_FSetPositive_PositiveSet_elt || code_integer || 3.00373889113e-11
Coq_Reals_Rdefinitions_Rle || transitive_acyclic || 2.92237674745e-11
Coq_Numbers_Cyclic_Int31_Int31_twice_plus_one || inc || 2.52844005397e-11
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || bit1 || 2.43775721305e-11
Coq_FSets_FSetPositive_PositiveSet_elements || code_Neg || 2.41412982724e-11
Coq_Numbers_Cyclic_Int31_Int31_incr || nat_of_num || 2.38122746661e-11
Coq_Reals_Rdefinitions_Rlt || bNF_Wellorder_wo_rel || 2.37094296594e-11
Coq_FSets_FSetPositive_PositiveSet_elements || code_Pos || 2.346645423e-11
Coq_FSets_FSetPositive_PositiveSet_elt || int || 2.34180013512e-11
Coq_MSets_MSetPositive_PositiveSet_elements || code_Neg || 2.32997921424e-11
Coq_FSets_FSetPositive_PositiveSet_elements || neg || 2.32138906938e-11
Coq_MSets_MSetPositive_PositiveSet_elements || neg || 2.29994226994e-11
Coq_FSets_FSetPositive_PositiveSet_elements || pos || 2.28587953886e-11
Coq_MSets_MSetPositive_PositiveSet_elements || pos || 2.26261707526e-11
Coq_MSets_MSetPositive_PositiveSet_elements || code_Pos || 2.26101805794e-11
Coq_QArith_Qcanon_Qcopp || dup || 2.17782784006e-11
Coq_Numbers_BinNums_positive_0 || code_integer || 2.1105733296e-11
Coq_QArith_Qcanon_Qcopp || code_dup || 2.0379962068e-11
Coq_Reals_Rpower_ln || semiring_1_of_nat || 1.91107717988e-11
Coq_Relations_Relation_Definitions_transitive || semigroup || 1.89997087804e-11
Coq_Reals_Rpower_ln || ring_1_of_int || 1.86748134404e-11
Coq_Relations_Relation_Definitions_antisymmetric || semilattice_axioms || 1.78442720954e-11
Coq_Numbers_BinNums_positive_0 || int || 1.76782041464e-11
Coq_Relations_Relation_Definitions_reflexive || abel_s1917375468axioms || 1.69110200099e-11
Coq_FSets_FMapPositive_PositiveMap_Empty || distinct || 1.65416741455e-11
Coq_Reals_RIneq_Rsqr || re || 1.57209524563e-11
Coq_Relations_Relation_Definitions_symmetric || abel_s1917375468axioms || 1.48991123129e-11
Coq_Reals_Rbasic_fun_Rabs || re || 1.43593168686e-11
__constr_Coq_FSets_FMapPositive_PositiveMap_tree_0_1 || nil || 1.38750471427e-11
Coq_Numbers_Natural_BigN_BigN_BigN_plus_t_prime || produc2004651681e_prod || 1.36582903762e-11
Coq_Sets_Ensembles_Singleton_0 || single || 1.25203221178e-11
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || product_unit || 1.22080275104e-11
Coq_Relations_Relation_Definitions_antisymmetric || abel_semigroup || 1.13745822379e-11
Coq_Relations_Relation_Definitions_antisymmetric || lattic35693393ce_set || 1.06033650222e-11
Coq_Reals_Rdefinitions_Rle || sym || 1.02253589914e-11
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Qc || bitM || 9.97518235398e-12
Coq_Reals_Rtrigo1_PI2 || product_unit || 9.74070735286e-12
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Qc || neg || 9.32955752727e-12
Coq_QArith_Qcanon_Qcopp || bitM || 9.31394390632e-12
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Qc || code_Neg || 9.23222728758e-12
Coq_Relations_Relation_Operators_clos_trans_n1_0 || transitive_rtranclp || 9.20710011849e-12
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Qc || pos || 9.15872114282e-12
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || code_natural || 9.11934152658e-12
Coq_Relations_Relation_Operators_clos_refl_trans_n1_0 || transitive_tranclp || 9.07231222512e-12
Coq_Reals_Ranalysis1_derivable_pt || bNF_Wellorder_wo_rel || 9.05988567056e-12
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Qc || code_Pos || 8.92723216105e-12
Coq_Numbers_Rational_BigQ_BigQ_BigQ_red || bit0 || 8.81029925226e-12
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || rat || 8.71628063132e-12
Coq_Sets_Ensembles_In || eval || 8.59327160516e-12
Coq_Relations_Relation_Operators_clos_trans_1n_0 || transitive_rtranclp || 8.23120262401e-12
Coq_Relations_Relation_Operators_clos_refl_trans_1n_0 || transitive_tranclp || 7.69479173334e-12
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Qc || bit1 || 7.06822653371e-12
Coq_Numbers_Cyclic_Int31_Int31_sneakr || complex2 || 6.89297637017e-12
Coq_QArith_Qcanon_Qcopp || bit1 || 6.72367340233e-12
Coq_Numbers_Natural_BigN_BigN_BigN_log2 || suc || 6.44660435385e-12
Coq_Lists_Streams_map || map || 6.39942989301e-12
Coq_Reals_Rpower_ln || default_default || 6.15854871091e-12
Coq_Classes_CMorphisms_ProperProxy || contained || 5.96883295089e-12
Coq_Classes_CMorphisms_Proper || contained || 5.96883295089e-12
__constr_Coq_Init_Datatypes_list_0_1 || none || 5.85477614893e-12
Coq_Numbers_Cyclic_Int31_Int31_shiftl || im || 5.60416224792e-12
Coq_Reals_Rtrigo1_tan || default_default || 5.59067485423e-12
Coq_Reals_Rdefinitions_R0 || bNF_Ca1495478003natLeq || 5.47703432693e-12
Coq_Init_Wf_well_founded || wfP || 5.46749122567e-12
Coq_Logic_ClassicalFacts_IndependenceOfGeneralPremises Coq_Logic_ClassicalFacts_DrinkerParadox || semiri1062155398ct_rel semiri882458588ct_rel || 5.3256286016e-12
Coq_Sets_Image_Im_0 || inv_image || 5.06180018215e-12
$equals3 || empty || 4.99244612098e-12
Coq_Reals_Rdefinitions_R1 || product_unit || 4.7626530379e-12
Coq_Numbers_Cyclic_Int31_Int31_firstl || re || 4.52845718786e-12
Coq_Lists_Streams_Str_nth_tl || rotate || 4.29736076506e-12
Coq_Relations_Relation_Definitions_antisymmetric || abel_s1917375468axioms || 4.28147685951e-12
Coq_Reals_Rtrigo_def_cos || default_default || 4.27850680761e-12
Coq_Lists_Streams_Str_nth_tl || drop || 4.26453733937e-12
Coq_QArith_Qreduction_Qred || dup || 4.2290290574e-12
Coq_Reals_Rtrigo_def_sin || default_default || 4.14962990973e-12
Coq_QArith_Qcanon_Qcinv || bit0 || 4.10513294435e-12
Coq_Reals_Rdefinitions_Rle || distinct || 4.08966373185e-12
Coq_Reals_Rdefinitions_R0 || less_than || 3.98215307698e-12
Coq_Reals_Rdefinitions_Rgt || trans || 3.96583416804e-12
Coq_Numbers_Natural_BigN_BigN_BigN_plus_t || product_case_prod || 3.87616771678e-12
Coq_Reals_Rdefinitions_R1 || code_natural || 3.79173003463e-12
Coq_QArith_Qreduction_Qred || code_dup || 3.72035997914e-12
Coq_QArith_Qreduction_Qred || bit1 || 3.69179223024e-12
Coq_Reals_Rdefinitions_Rgt || wf || 3.63744979131e-12
Coq_Reals_Rdefinitions_R1 || rat || 3.61945647556e-12
Coq_Reals_Rbasic_fun_Rmax || remdups || 3.58833891019e-12
Coq_Lists_List_Forall2_0 || rel_option || 3.24460608364e-12
Coq_FSets_FMapPositive_PositiveMap_remove || removeAll || 3.03228417155e-12
Coq_Numbers_Rational_BigQ_BigQ_BigQ_inv_norm || bit1 || 2.91771463212e-12
Coq_Relations_Relation_Definitions_antisymmetric || semigroup || 2.85038671777e-12
Coq_FSets_FMapPositive_PositiveMap_remove || dropWhile || 2.64657775124e-12
Coq_FSets_FMapPositive_PositiveMap_remove || remove1 || 2.62357844157e-12
Coq_FSets_FMapPositive_PositiveMap_remove || takeWhile || 2.50755183901e-12
Coq_Numbers_Rational_BigQ_BigQ_BigQ_inv || bit1 || 2.50498175857e-12
Coq_Classes_Morphisms_ProperProxy || contained || 2.36565187041e-12
Coq_FSets_FMapPositive_PositiveMap_remove || drop || 2.28744849489e-12
Coq_FSets_FMapPositive_PositiveMap_remove || take || 2.19376378727e-12
Coq_Reals_Rdefinitions_Ropp || abs_Nat || 2.17182492205e-12
Coq_Reals_Rdefinitions_Rgt || antisym || 2.13002291086e-12
Coq_FSets_FMapPositive_PositiveMap_remove || filter2 || 2.12198126998e-12
Coq_Reals_Rdefinitions_R1 || zero_Rep || 2.11993352904e-12
Coq_Lists_Streams_Str_nth_tl || take || 2.05470831122e-12
Coq_Reals_Rdefinitions_R0 || pred_nat || 2.04540427024e-12
Coq_Reals_Rdefinitions_Rgt || bNF_Ca829732799finite || 1.96627983999e-12
Coq_Reals_Rtrigo1_tan || top_top || 1.76199139255e-12
Coq_Sets_Relations_1_Reflexive || reflp || 1.72922140827e-12
Coq_Reals_Rtrigo1_tan || bot_bot || 1.69494450915e-12
Coq_Sets_Finite_sets_Finite_0 || trans || 1.6776070436e-12
Coq_Reals_Rpower_ln || top_top || 1.65865434475e-12
Coq_Sets_Finite_sets_Finite_0 || sym || 1.62294430498e-12
Coq_Sets_Relations_1_Transitive || symp || 1.60544905391e-12
Coq_Logic_ClassicalFacts_GodelDummett Coq_Logic_ClassicalFacts_RightDistributivityImplicationOverDisjunction || semiri1062155398ct_rel semiri882458588ct_rel || 1.59967725143e-12
Coq_Reals_Rbasic_fun_Rmax || remdups_adj || 1.59301621118e-12
Coq_Reals_Rpower_ln || bot_bot || 1.59074616582e-12
Coq_Reals_Rtrigo_def_sin || top_top || 1.58028926067e-12
Coq_Reals_Rtrigo_def_cos || top_top || 1.57599209775e-12
Coq_Sets_Finite_sets_Finite_0 || wf || 1.56816993321e-12
Coq_Reals_Rtrigo_def_sin || bot_bot || 1.52614160699e-12
Coq_Reals_Rtrigo_def_cos || bot_bot || 1.52095894904e-12
Coq_QArith_Qcanon_Qcinv || dup || 1.34373642005e-12
Coq_Reals_Rtrigo_def_cos || zero_zero || 1.29869880651e-12
Coq_QArith_Qcanon_Qcinv || code_dup || 1.22507422861e-12
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || real || 1.20440475886e-12
Coq_Sorting_Sorted_StronglySorted_0 || pred_option || 1.15700560585e-12
Coq_Lists_Streams_tl || rotate1 || 1.10514662544e-12
Coq_Numbers_Rational_BigQ_BigQ_BigQ_inv_norm || bit0 || 1.0992493802e-12
Coq_Sets_Relations_1_Antisymmetric || transp || 1.06037888615e-12
Coq_Sorting_Sorted_LocallySorted_0 || pred_option || 1.04372502667e-12
Coq_Reals_Rtrigo1_tan || field_char_0_of_rat || 1.03536388811e-12
Coq_Sets_Relations_1_Equivalence_0 || equiv_equivp || 1.01832200885e-12
Coq_Relations_Relation_Operators_Desc_0 || pred_option || 1.01690719196e-12
Coq_Sets_Relations_1_Order_0 || equiv_equivp || 1.00963129751e-12
Coq_Sorting_Sorted_StronglySorted_0 || monoid || 1.00227538546e-12
Coq_Numbers_Rational_BigQ_BigQ_BigQ_inv || bit0 || 9.60625792636e-13
Coq_Lists_List_ForallOrdPairs_0 || pred_option || 9.54553435883e-13
Coq_Lists_List_Forall_0 || pred_option || 9.54553435883e-13
Coq_Lists_List_NoDup_0 || is_none || 9.53860563572e-13
Coq_Lists_Streams_tl || butlast || 9.15086600276e-13
Coq_Reals_Rtrigo_def_cos || field_char_0_of_rat || 9.00126180508e-13
Coq_Sets_Relations_1_Symmetric || transp || 8.98607559652e-13
Coq_Reals_Rbasic_fun_Rabs || cnj || 8.94724763069e-13
Coq_Reals_Rtrigo_def_sin || field_char_0_of_rat || 8.94366584017e-13
Coq_Reals_Rtrigo1_PI2 || real || 8.59696419568e-13
Coq_QArith_Qreduction_Qred || bitM || 8.45232465058e-13
Coq_Lists_Streams_tl || tl || 8.23836802613e-13
Coq_Sorting_Sorted_StronglySorted_0 || semilattice_neutr || 8.11491624573e-13
Coq_Numbers_Cyclic_Int31_Int31_sneakl || complex2 || 8.07357557792e-13
Coq_Sorting_Sorted_Sorted_0 || monoid_axioms || 7.84281295765e-13
Coq_NArith_Ndigits_N2Bv || im || 7.83431972095e-13
Coq_NArith_Ndigits_Bv2N || complex2 || 7.8221122777e-13
Coq_Lists_SetoidList_NoDupA_0 || pred_option || 7.77272993132e-13
Coq_Sorting_Sorted_Sorted_0 || pred_option || 7.63671770037e-13
Coq_NArith_BinNat_N_size_nat || re || 7.0940321175e-13
Coq_Classes_Morphisms_Proper || contained || 6.79840525773e-13
Coq_Reals_Rdefinitions_R0 || product_unit || 6.25365145316e-13
Coq_Sorting_Sorted_Sorted_0 || comm_monoid || 6.05468478994e-13
Coq_Numbers_Cyclic_Int31_Int31_shiftr || im || 5.816205228e-13
Coq_Numbers_Cyclic_Int31_Int31_firstr || re || 5.68705570104e-13
Coq_Sets_Relations_1_Transitive || semigroup || 5.65492272913e-13
Coq_Reals_AltSeries_PI_tg || nat || 5.6412131446e-13
Coq_Classes_RelationClasses_Equivalence_0 || null2 || 5.63326536221e-13
Coq_Reals_Rdefinitions_Rgt || bNF_Cardinal_cfinite || 5.6311542367e-13
Coq_Reals_Rdefinitions_R1 || product_Unity || 5.45280994504e-13
Coq_Sets_Ensembles_Intersection_0 || mlex_prod || 4.82051629882e-13
Coq_Sorting_Sorted_StronglySorted_0 || comm_monoid || 4.58404791886e-13
Coq_Reals_Rdefinitions_R0 || bNF_Cardinal_cone || 4.41905661563e-13
__constr_Coq_Numbers_BinNums_positive_0_3 || left || 4.34705218476e-13
Coq_QArith_Qcanon_Qcinv || bitM || 4.31588241317e-13
Coq_Sets_Relations_1_Transitive || semilattice || 4.30278911351e-13
Coq_QArith_Qcanon_Qcinv || bit1 || 4.07516973e-13
Coq_Sorting_Sorted_Sorted_0 || comm_monoid_axioms || 3.83163056351e-13
Coq_Reals_Rbasic_fun_Rabs || nil || 3.73687872607e-13
Coq_Classes_RelationClasses_Symmetric || null2 || 3.54931116365e-13
Coq_Classes_RelationClasses_Reflexive || null2 || 3.46674031134e-13
Coq_Setoids_Setoid_Setoid_Theory || null2 || 3.41342217044e-13
Coq_Classes_RelationClasses_Transitive || null2 || 3.38900719924e-13
Coq_Vectors_VectorDef_last || product_fst || 3.22804077517e-13
Coq_Reals_Rseries_Un_cv || trans || 3.01586085374e-13
Coq_Vectors_VectorDef_shiftin || product_Pair || 2.69792147264e-13
Coq_Sets_Relations_1_Transitive || abel_semigroup || 2.68675960502e-13
Coq_Sets_Ensembles_Singleton_0 || id_on || 2.62500746594e-13
Coq_Numbers_Rational_BigQ_BigQ_BigQ_Reduced || nat_is_nat || 2.34226907307e-13
Coq_Sets_Ensembles_Empty_set_0 || id2 || 2.29008154222e-13
Coq_Relations_Relation_Definitions_inclusion || partia17684980itions || 2.20810066947e-13
Coq_Reals_Rtrigo_def_cosh || default_default || 2.03182345174e-13
Coq_Reals_Rseries_Un_cv || wf || 1.85184647443e-13
Coq_PArith_BinPos_Pos_peano_rect || rec_sumbool || 1.719885582e-13
Coq_PArith_POrderedType_Positive_as_DT_peano_rect || rec_sumbool || 1.719885582e-13
Coq_PArith_POrderedType_Positive_as_OT_peano_rect || rec_sumbool || 1.719885582e-13
Coq_Structures_OrdersEx_Positive_as_DT_peano_rect || rec_sumbool || 1.719885582e-13
Coq_Structures_OrdersEx_Positive_as_OT_peano_rect || rec_sumbool || 1.719885582e-13
Coq_Sets_Ensembles_Singleton_0 || measure || 1.71297957411e-13
Coq_Reals_Rseries_Un_cv || antisym || 1.5895258475e-13
Coq_PArith_BinPos_Pos_peano_rect || case_sumbool || 1.50819097616e-13
Coq_PArith_POrderedType_Positive_as_DT_peano_rect || case_sumbool || 1.50819097616e-13
Coq_PArith_POrderedType_Positive_as_OT_peano_rect || case_sumbool || 1.50819097616e-13
Coq_Structures_OrdersEx_Positive_as_DT_peano_rect || case_sumbool || 1.50819097616e-13
Coq_Structures_OrdersEx_Positive_as_OT_peano_rect || case_sumbool || 1.50819097616e-13
Coq_Reals_Rseries_Un_cv || bNF_Ca829732799finite || 1.46380627616e-13
Coq_Sets_Ensembles_Singleton_0 || measures || 1.41895575318e-13
Coq_ZArith_Zquot_Remainder || produc2004651681e_prod || 1.34501203998e-13
Coq_Reals_Rtrigo_def_exp || default_default || 1.29410403745e-13
Coq_Reals_Rdefinitions_Rge || transitive_acyclic || 1.19061731908e-13
Coq_Sorting_Sorted_StronglySorted_0 || groups387199878d_list || 1.17393651597e-13
Coq_Sets_Relations_2_Rstar_0 || partial_flat_ord || 1.15858690603e-13
Coq_Reals_Rdefinitions_R1 || bNF_Cardinal_cone || 1.15712943771e-13
Coq_Sorting_Sorted_Sorted_0 || groups_monoid_list || 1.15141934753e-13
Coq_Relations_Relation_Operators_clos_refl_0 || partial_flat_ord || 1.0543600031e-13
Coq_Numbers_Rational_BigQ_BigQ_BigQ_div_norm || nat_tsub || 9.71005922911e-14
Coq_Numbers_Rational_BigQ_BigQ_BigQ_mul_norm || nat_tsub || 9.71005922911e-14
Coq_Numbers_Rational_BigQ_BigQ_BigQ_sub_norm || nat_tsub || 9.71005922911e-14
Coq_Numbers_Rational_BigQ_BigQ_BigQ_add_norm || nat_tsub || 9.71005922911e-14
Coq_Sets_Ensembles_Singleton_0 || transitive_trancl || 9.4591422997e-14
Coq_Relations_Relation_Operators_clos_refl_trans_0 || partial_flat_lub || 9.45289111714e-14
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || partial_flat_lub || 9.28758433531e-14
Coq_Sets_Ensembles_Singleton_0 || transitive_rtrancl || 8.96794779463e-14
Coq_Relations_Relation_Operators_clos_refl_trans_0 || partial_flat_ord || 8.20595478018e-14
Coq_Reals_Rdefinitions_Rlt || bNF_Cardinal_cfinite || 8.17573267864e-14
Coq_Sets_Relations_2_Rstar1_0 || partial_flat_lub || 7.88142493194e-14
Coq_romega_ReflOmegaCore_ZOmega_valid_hyps || nat3 || 7.58091947295e-14
Coq_Sets_Relations_1_same_relation || partia17684980itions || 7.43095966044e-14
Coq_Sets_Relations_2_Rplus_0 || partial_flat_lub || 7.39553125218e-14
Coq_Sorting_Sorted_Sorted_0 || lattic1543629303tr_set || 7.2902953508e-14
Coq_Sets_Relations_1_contains || partia17684980itions || 7.24548753947e-14
Coq_Numbers_Natural_BigN_BigN_BigN_mk_t || char2 || 7.16535820952e-14
Coq_Numbers_Natural_BigN_BigN_BigN_iter_t || rec_char || 7.07889020601e-14
Coq_NArith_BinNat_N_div2 || im || 6.88465949852e-14
Coq_NArith_BinNat_N_odd || re || 6.54317100909e-14
Coq_Sets_Ensembles_Full_set_0 || fun_is_measure || 6.16880578375e-14
Coq_ZArith_Zquot_Remainder_alt || product_case_prod || 5.94277908721e-14
Coq_Sorting_Sorted_StronglySorted_0 || groups828474808id_set || 5.90832944285e-14
Coq_Reals_Rdefinitions_Rle || bNF_Cardinal_cfinite || 5.32309264838e-14
Coq_Sets_Relations_3_Locally_confluent || abel_s1917375468axioms || 4.41313257977e-14
Coq_Reals_Rdefinitions_Rle || null || 4.38113909034e-14
Coq_romega_ReflOmegaCore_Z_as_Int_zero || ii || 4.33535278844e-14
Coq_Reals_Rtrigo_def_cosh || top_top || 4.28279862994e-14
Coq_romega_ReflOmegaCore_ZOmega_constant_nul || rep_Nat || 4.18019392988e-14
Coq_romega_ReflOmegaCore_ZOmega_constant_neg || rep_Nat || 4.18019392988e-14
Coq_romega_ReflOmegaCore_ZOmega_constant_not_nul || rep_Nat || 4.18019392988e-14
Coq_Reals_Rtrigo_def_exp || finite_psubset || 4.09853864815e-14
Coq_Reals_Rtrigo_def_cosh || bot_bot || 4.08879552159e-14
Coq_Numbers_Natural_BigN_BigN_BigN_iter_t || case_char || 4.05611418714e-14
Coq_romega_ReflOmegaCore_Z_as_Int_one || complex || 3.89415685056e-14
Coq_NArith_BinNat_N_div2 || abs_Nat || 3.8564436339e-14
Coq_Sorting_Sorted_Sorted_0 || groups828474808id_set || 3.8502142836e-14
Coq_Reals_Rtrigo_def_exp || top_top || 3.73092986047e-14
Coq_Reals_Rtrigo_def_exp || bot_bot || 3.58279150464e-14
Coq_Sets_Relations_3_Confluent || abel_semigroup || 3.37448789955e-14
Coq_Sets_Finite_sets_Finite_0 || antisym || 3.34131929718e-14
Coq_NArith_Ndigits_Nodd || nat3 || 3.08349111275e-14
Coq_NArith_Ndigits_Neven || nat3 || 3.04703908703e-14
Coq_romega_ReflOmegaCore_ZOmega_normalize_hyps || rep_Nat || 3.03257449994e-14
Coq_Reals_Rtrigo_def_sin || finite_psubset || 2.9087744916e-14
Coq_Reals_Rtrigo_def_cos || finite_psubset || 2.86310152295e-14
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || bNF_Cardinal_cone || 2.84508293704e-14
Coq_Sets_Relations_2_Strongly_confluent || semilattice || 2.80874671072e-14
Coq_Reals_Rdefinitions_R1 || ratreal || 2.50495888263e-14
Coq_Sets_Relations_3_Noetherian || semigroup || 2.39640409988e-14
__constr_Coq_Init_Datatypes_comparison_0_1 || nat || 2.14631067914e-14
Coq_Reals_Rseries_Un_cv || bNF_Cardinal_cfinite || 2.13952003526e-14
Coq_Reals_AltSeries_PI_tg || product_unit || 2.10532723053e-14
Coq_NArith_BinNat_N_succ_double || rep_Nat || 2.01261348206e-14
Coq_Reals_Exp_prop_E1 || set || 1.97905713394e-14
Coq_NArith_BinNat_N_double || rep_Nat || 1.94323106118e-14
Coq_Reals_Cos_rel_B1 || set || 1.89613776041e-14
Coq_Reals_Cos_rel_A1 || set || 1.89295496263e-14
Coq_romega_ReflOmegaCore_Z_as_Int_opp || zero_zero || 1.81661625186e-14
Coq_Logic_ExtensionalityFacts_pi2 || map_tailrec || 1.80820329282e-14
Coq_Reals_Rdefinitions_R0 || real || 1.72017123631e-14
Coq_romega_ReflOmegaCore_Z_as_Int_opp || one_one || 1.46778365834e-14
Coq_Logic_ClassicalFacts_f1 || product_curry || 1.31814582955e-14
Coq_Logic_ClassicalFacts_f2 || product_curry || 1.31814582955e-14
Coq_Logic_Berardi_j || product_curry || 1.31814582955e-14
Coq_Logic_Berardi_i || product_curry || 1.31814582955e-14
Coq_Sets_Relations_3_Confluent || semilattice_axioms || 1.23193923445e-14
Coq_Sets_Relations_3_Locally_confluent || semilattice_axioms || 1.05191248522e-14
Coq_FSets_FSetPositive_PositiveSet_ct_0 || dvd_dvd || 1.01070523886e-14
Coq_MSets_MSetPositive_PositiveSet_ct_0 || dvd_dvd || 1.01070523886e-14
Coq_Logic_ChoiceFacts_FunctionalChoice_on || semilattice || 8.34219099295e-15
Coq_Lists_List_map || map_option || 8.2595932345e-15
__constr_Coq_romega_ReflOmegaCore_ZOmega_h_step_0_1 || char2 || 7.83140880865e-15
Coq_Numbers_Rational_BigQ_BigQ_BigQ_Reduced || nat3 || 7.41809394148e-15
Coq_FSets_FSetPositive_PositiveSet_ct_0 || ord_less_eq || 7.41002158052e-15
Coq_MSets_MSetPositive_PositiveSet_ct_0 || ord_less_eq || 7.41002158052e-15
Coq_Relations_Relation_Operators_clos_refl_trans_n1_0 || transitive_rtranclp || 7.31301052558e-15
Coq_Sorting_Sorted_StronglySorted_0 || groups1716206716st_set || 7.07075706538e-15
Coq_Logic_ChoiceFacts_RelationalChoice_on || semilattice_axioms || 7.03085710126e-15
Coq_Sets_Relations_3_Confluent || lattic35693393ce_set || 6.89584157179e-15
Coq_Sets_Relations_3_Confluent || semilattice || 6.71037912526e-15
Coq_Init_Datatypes_length || is_none || 6.6993376728e-15
Coq_Logic_ExtensionalityFacts_pi1 || map || 6.46608554242e-15
Coq_Reals_Ranalysis1_continuity_pt || bNF_Cardinal_cfinite || 6.2226359405e-15
Coq_Logic_ClassicalFacts_f1 || product_case_prod || 5.82407386472e-15
Coq_Logic_ClassicalFacts_f2 || product_case_prod || 5.82407386472e-15
Coq_Logic_Berardi_j || product_case_prod || 5.82407386472e-15
Coq_Logic_Berardi_i || product_case_prod || 5.82407386472e-15
Coq_Sets_Relations_1_contains || eval || 5.71647352968e-15
Coq_Sets_Relations_3_Noetherian || abel_semigroup || 5.47647970516e-15
Coq_romega_ReflOmegaCore_Z_as_Int_zero || pi || 4.91181538807e-15
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || abel_semigroup || 4.52874818292e-15
Coq_Numbers_Rational_BigQ_BigQ_BigQ_inv_norm || suc_Rep || 4.44988980821e-15
Coq_romega_ReflOmegaCore_Z_as_Int_one || real || 4.44597523834e-15
__constr_Coq_Init_Datatypes_bool_0_2 || right || 4.39167896506e-15
__constr_Coq_Init_Datatypes_bool_0_2 || left || 4.39167896506e-15
__constr_Coq_Init_Datatypes_bool_0_1 || right || 4.2528251806e-15
__constr_Coq_Init_Datatypes_bool_0_1 || left || 4.2528251806e-15
Coq_Reals_R_sqrt_sqrt || product_unit || 4.22238484384e-15
__constr_Coq_Init_Datatypes_comparison_0_3 || num || 3.5741801629e-15
Coq_Sets_Relations_2_Rplus_0 || single || 3.57118748592e-15
__constr_Coq_Init_Datatypes_comparison_0_2 || num || 3.55259357064e-15
Coq_Arith_PeanoNat_Nat_double || embed_list || 3.45947330955e-15
Coq_Classes_CRelationClasses_relation_equivalence || finite_psubset || 3.435582117e-15
Coq_Reals_Ranalysis1_derivable_pt_lim || real_V1632203528linear || 3.32838811606e-15
__constr_Coq_Init_Datatypes_comparison_0_3 || one2 || 3.0550891278e-15
__constr_Coq_Init_Datatypes_comparison_0_2 || one2 || 3.04319624886e-15
Coq_Relations_Relation_Operators_clos_refl_trans_0 || transitive_tranclp || 2.93414706252e-15
Coq_Sets_Uniset_incl || predicate_contains || 2.85777005648e-15
Coq_Sets_Relations_2_Rstar_0 || single || 2.77745744197e-15
Coq_Arith_Even_even_0 || nat_list || 2.72386707894e-15
Coq_Numbers_Rational_BigQ_BigQ_BigQ_opp || suc_Rep || 2.72069779118e-15
Coq_Relations_Relation_Operators_clos_refl_trans_1n_0 || transitive_rtranclp || 2.51258219412e-15
Coq_Logic_EqdepFacts_UIP_refl_on_ || wfP || 2.48879471577e-15
Coq_Arith_PeanoNat_Nat_div2 || return_list || 2.42485824702e-15
Coq_Logic_EqdepFacts_Streicher_K_on_ || accp || 2.18671126512e-15
Coq_Numbers_Integer_Binary_ZBinary_Z_abs || re || 2.0719414182e-15
Coq_Structures_OrdersEx_Z_as_OT_abs || re || 2.0719414182e-15
Coq_Structures_OrdersEx_Z_as_DT_abs || re || 2.0719414182e-15
Coq_Numbers_Rational_BigQ_BigQ_BigQ_of_Qc || rep_Nat || 2.06588013238e-15
Coq_Numbers_Integer_Binary_ZBinary_Z_sgn || im || 1.97113243242e-15
Coq_Structures_OrdersEx_Z_as_OT_sgn || im || 1.97113243242e-15
Coq_Structures_OrdersEx_Z_as_DT_sgn || im || 1.97113243242e-15
Coq_Init_Logic_inhabited_0 || assumption || 1.86188473485e-15
Coq_Classes_RelationPairs_RelProd || sum_Plus || 1.82609829208e-15
Coq_Sets_Relations_2_Strongly_confluent || lattic35693393ce_set || 1.79031878823e-15
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || complex2 || 1.61561585063e-15
Coq_Structures_OrdersEx_Z_as_OT_mul || complex2 || 1.61561585063e-15
Coq_Structures_OrdersEx_Z_as_DT_mul || complex2 || 1.61561585063e-15
Coq_Reals_Rtrigo_def_exp || complex || 1.59265623419e-15
Coq_Reals_Rtrigo_def_cosh || field_char_0_of_rat || 1.5836755843e-15
Coq_Logic_ChoiceFacts_RelationalChoice_on || abel_s1917375468axioms || 1.34082112321e-15
Coq_Reals_Rtrigo_def_sin || complex || 1.33580968165e-15
Coq_Reals_Rtrigo_def_exp || field_char_0_of_rat || 1.30022002057e-15
Coq_Init_Datatypes_prod_0 || sum_sum || 1.28940413179e-15
Coq_Logic_ChoiceFacts_FunctionalChoice_on || abel_semigroup || 1.28083752092e-15
Coq_Reals_Rdefinitions_R1 || im || 1.27485602458e-15
Coq_Reals_Rdefinitions_R1 || re || 1.26534365704e-15
Coq_Logic_ChoiceFacts_GuardedRelationalChoice_on || semilattice || 1.18229192773e-15
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || semilattice_axioms || 1.11139963918e-15
Coq_Logic_ChoiceFacts_RelationalChoice_on || abel_semigroup || 9.7027349133e-16
Coq_Logic_ChoiceFacts_RelationalChoice_on || lattic35693393ce_set || 9.17847215526e-16
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || semigroup || 8.79361256724e-16
Coq_QArith_QArith_base_inject_Z || bot_bot || 8.51719053562e-16
Coq_Sets_Uniset_seq || member3 || 8.23771761019e-16
Coq_QArith_Qround_Qceiling || pred || 8.09943589288e-16
Coq_Classes_CRelationClasses_crelation || set || 7.7103025963e-16
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || lattic35693393ce_set || 7.5926247124e-16
Coq_Sorting_Sorted_Sorted_0 || groups387199878d_list || 7.07165895667e-16
Coq_ZArith_BinInt_Z_opp || cnj || 6.9820675749e-16
Coq_QArith_QArith_base_Qle || is_empty || 6.96766985144e-16
Coq_Sets_Relations_1_Symmetric || distinct || 6.76606323266e-16
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || cnj || 6.68363432369e-16
Coq_Structures_OrdersEx_Z_as_OT_opp || cnj || 6.68363432369e-16
Coq_Structures_OrdersEx_Z_as_DT_opp || cnj || 6.68363432369e-16
Coq_Reals_Ranalysis1_continuity || nat3 || 6.67427728682e-16
Coq_Classes_CRelationClasses_RewriteRelation_0 || trans || 6.54225805974e-16
Coq_Reals_Ranalysis1_continuity || nat_is_nat || 6.37339005185e-16
Coq_ZArith_BinInt_Z_abs || re || 5.9830477424e-16
__constr_Coq_Init_Datatypes_nat_0_2 || none || 5.58867305826e-16
Coq_Logic_ClassicalFacts_IndependenceOfGeneralPremises Coq_Logic_ClassicalFacts_DrinkerParadox || pcr_literal cr_literal || 5.09476986486e-16
Coq_ZArith_BinInt_Z_sgn || im || 4.98279071719e-16
Coq_Classes_CRelationClasses_RewriteRelation_0 || wf || 4.96981203988e-16
Coq_Reals_Rtopology_union_domain || nat_tsub || 4.51317547388e-16
Coq_NArith_BinNat_N_mul || induct_implies || 4.48688117897e-16
Coq_ZArith_BinInt_Z_mul || complex2 || 4.1842580606e-16
Coq_Reals_Ranalysis1_opp_fct || suc_Rep || 4.06167082083e-16
Coq_Reals_Ranalysis1_minus_fct || nat_tsub || 3.95733758472e-16
Coq_Reals_Ranalysis1_plus_fct || nat_tsub || 3.95733758472e-16
Coq_Init_Peano_lt || is_none || 3.68369359468e-16
__constr_Coq_Init_Datatypes_nat_0_1 || left || 3.66460925946e-16
Coq_Reals_Ranalysis1_mult_fct || nat_tsub || 3.5868146528e-16
Coq_Init_Peano_le_0 || is_none || 3.55854907948e-16
Coq_Sets_Relations_1_facts_Complement || butlast || 3.39978129389e-16
Coq_QArith_Qround_Qceiling || set || 3.20563438703e-16
Coq_Classes_RelationClasses_Reflexive || wfP || 3.06150917578e-16
Coq_QArith_QArith_base_Qle || finite_finite2 || 2.94433529399e-16
Coq_Classes_RelationClasses_Symmetric || finite_finite2 || 2.90951861388e-16
Coq_Classes_RelationClasses_Reflexive || finite_finite2 || 2.86810313849e-16
Coq_Reals_Rtopology_open_set || nat_is_nat || 2.84007442385e-16
Coq_Sets_Relations_1_facts_Complement || tl || 2.83632749683e-16
Coq_Classes_RelationClasses_Transitive || finite_finite2 || 2.82843113687e-16
Coq_Relations_Relation_Operators_symprod_0 || sum_Plus || 2.43379632544e-16
Coq_Classes_RelationClasses_Equivalence_0 || finite_finite2 || 2.42395094123e-16
Coq_Arith_PeanoNat_Nat_recursion || rec_sumbool || 2.35075237842e-16
Coq_Structures_OrdersEx_Nat_as_DT_recursion || rec_sumbool || 2.35075237842e-16
Coq_Structures_OrdersEx_Nat_as_OT_recursion || rec_sumbool || 2.35075237842e-16
Coq_Classes_Morphisms_ProperProxy || accp || 2.31458104715e-16
Coq_Numbers_Cyclic_Abstract_CyclicAxioms_ZnZ_Specs_0 || bNF_Cardinal_cfinite || 2.23296575321e-16
Coq_Logic_ClassicalFacts_GodelDummett Coq_Logic_ClassicalFacts_RightDistributivityImplicationOverDisjunction || pcr_literal cr_literal || 2.12717276826e-16
Coq_Reals_Rtopology_ValAdh_un || map_tailrec || 2.1062944763e-16
Coq_Classes_SetoidTactics_DefaultRelation_0 || fun_is_measure || 2.08468756186e-16
__constr_Coq_Sorting_Heap_Tree_0_1 || nil || 2.02403175072e-16
Coq_Arith_PeanoNat_Nat_recursion || case_sumbool || 2.017662552e-16
Coq_Structures_OrdersEx_Nat_as_DT_recursion || case_sumbool || 2.017662552e-16
Coq_Structures_OrdersEx_Nat_as_OT_recursion || case_sumbool || 2.017662552e-16
Coq_Logic_ChoiceFacts_GuardedRelationalChoice_on || abel_semigroup || 2.00378950941e-16
Coq_Arith_PeanoNat_Nat_mul || induct_implies || 1.9600114817e-16
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || abel_s1917375468axioms || 1.86817065389e-16
Coq_Init_Wf_well_founded || finite_finite2 || 1.84337756653e-16
Coq_Reals_Rtopology_intersection_domain || nat_tsub || 1.82901925028e-16
Coq_Sets_Image_Im_0 || fun_rp_inv_image || 1.81646498497e-16
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || transitive_rtranclp || 1.78545174191e-16
Coq_Sorting_Heap_is_heap_0 || pred_list || 1.76937326905e-16
Coq_Sorting_Heap_is_heap_0 || listsp || 1.72703652194e-16
Coq_Logic_ChoiceFacts_RelationalChoice_on || semigroup || 1.72370550181e-16
Coq_Arith_PeanoNat_Nat_min || induct_conj || 1.58020744588e-16
Coq_Arith_PeanoNat_Nat_add || induct_implies || 1.56254034347e-16
Coq_Sets_Relations_2_Rstar_0 || butlast || 1.53526148373e-16
Coq_Lists_List_Forall_0 || frequently || 1.52935082541e-16
Coq_ZArith_Zgcd_alt_Zgcd_bound || re || 1.52767172047e-16
Coq_Arith_PeanoNat_Nat_max || induct_conj || 1.52224253927e-16
__constr_Coq_Sets_Uniset_uniset_0_1 || basic_BNF_xtor || 1.46062165004e-16
__constr_Coq_Sets_Multiset_multiset_0_1 || basic_BNF_xtor || 1.46062165004e-16
Coq_Sets_Ensembles_Complement || basic_BNF_xtor || 1.46062165004e-16
Coq_Sets_Relations_2_Rstar_0 || tl || 1.40171830066e-16
Coq_Sets_Finite_sets_Finite_0 || fun_reduction_pair || 1.30614977642e-16
Coq_NArith_BinNat_N_add || induct_conj || 1.29589465744e-16
Coq_Reals_Rtrigo_def_sin || zero_Rep || 1.24980845346e-16
Coq_ZArith_Zdiv_Remainder_alt || map_tailrec || 1.24755853817e-16
Coq_Reals_Rtrigo_def_cos || zero_Rep || 1.23033856867e-16
Coq_Reals_Rbasic_fun_Rabs || zero_Rep || 1.19956574318e-16
Coq_NArith_BinNat_N_max || induct_conj || 1.19266766765e-16
Coq_Sets_Relations_1_Transitive || abel_s1917375468axioms || 1.17879257855e-16
Coq_NArith_BinNat_N_min || induct_conj || 1.15365818472e-16
Coq_ZArith_BinInt_Z_abs_N || re || 1.10728537304e-16
Coq_romega_ReflOmegaCore_ZOmega_valid_list_hyps || nat3 || 1.10323138957e-16
Coq_ZArith_BinInt_Z_even || re || 1.10150484825e-16
Coq_Classes_CRelationClasses_Equivalence_0 || bNF_Wellorder_wo_rel || 1.09310881867e-16
Coq_ZArith_BinInt_Z_odd || re || 1.05912704742e-16
Coq_Numbers_Integer_Binary_ZBinary_Z_even || re || 1.03147038641e-16
Coq_Structures_OrdersEx_Z_as_OT_even || re || 1.03147038641e-16
Coq_Structures_OrdersEx_Z_as_DT_even || re || 1.03147038641e-16
Coq_Sets_Relations_3_coherent || remdups || 1.02393168203e-16
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || re || 1.01142860705e-16
Coq_Structures_OrdersEx_Z_as_OT_odd || re || 1.01142860705e-16
Coq_Structures_OrdersEx_Z_as_DT_odd || re || 1.01142860705e-16
Coq_romega_ReflOmegaCore_ZOmega_destructure_hyps || rep_Nat || 1.00640230935e-16
Coq_Numbers_Natural_BigN_BigN_BigN_iter_t || case_typerep || 9.38110662643e-17
Coq_NArith_BinNat_N_lcm || induct_conj || 9.30732572955e-17
Coq_Sets_Relations_1_Transitive || semilattice_axioms || 8.94245919243e-17
Coq_Logic_ClassicalFacts_IndependenceOfGeneralPremises Coq_Logic_ClassicalFacts_DrinkerParadox || pcr_real cr_real || 8.42036453102e-17
Coq_Classes_SetoidClass_equiv || set2 || 8.40924486294e-17
Coq_Classes_RelationClasses_Antisymmetric || inj_on || 8.33906436315e-17
Coq_Numbers_Cyclic_Int31_Cyclic31_int31_ops || bNF_Cardinal_cone || 8.11290013054e-17
Coq_Classes_Morphisms_Proper || accp || 8.07823757578e-17
Coq_NArith_BinNat_N_gcd || induct_conj || 7.5948563438e-17
Coq_Sets_Relations_1_PER_0 || abel_semigroup || 7.29489287887e-17
Coq_NArith_BinNat_N_sub || induct_conj || 7.07754683137e-17
Coq_Classes_RelationClasses_PartialOrder || bij_betw || 6.93119741057e-17
Coq_Logic_ClassicalFacts_IndependenceOfGeneralPremises Coq_Logic_ClassicalFacts_DrinkerParadox || pcr_rat cr_rat || 6.89000368705e-17
Coq_romega_ReflOmegaCore_ZOmega_execute_omega || rep_Nat || 6.8628718758e-17
Coq_Numbers_Natural_BigN_BigN_BigN_w5_op || bNF_Cardinal_cone || 6.75630167155e-17
Coq_Numbers_Natural_BigN_BigN_BigN_w4_op || bNF_Cardinal_cone || 6.75630167155e-17
Coq_Numbers_Natural_BigN_BigN_BigN_w3_op || bNF_Cardinal_cone || 6.75630167155e-17
Coq_Numbers_Natural_BigN_BigN_BigN_w2_op || bNF_Cardinal_cone || 6.75630167155e-17
Coq_Numbers_Natural_BigN_BigN_BigN_w1_op || bNF_Cardinal_cone || 6.75630167155e-17
Coq_Numbers_Natural_BigN_BigN_BigN_w6_op || bNF_Cardinal_cone || 6.34360492505e-17
Coq_Numbers_Natural_BigN_BigN_BigN_mk_t || typerep3 || 6.11386544507e-17
Coq_Arith_Compare_dec_nat_compare_alt || map_tailrec || 5.93910241306e-17
Coq_Lists_StreamMemo_memo_list || collect || 5.72785018115e-17
Coq_Logic_ClassicalFacts_IndependenceOfGeneralPremises Coq_Logic_ClassicalFacts_DrinkerParadox || pcr_int cr_int || 5.69495892281e-17
Coq_Sets_Relations_1_Preorder_0 || abel_semigroup || 5.6005791559e-17
Coq_Sets_Relations_1_Symmetric || semigroup || 5.53369102226e-17
Coq_Sets_Relations_1_PER_0 || semilattice || 5.39157500934e-17
Coq_Lists_List_repeat || cons || 5.03532776708e-17
Coq_Sets_Relations_1_Reflexive || semigroup || 4.89353552199e-17
Coq_Reals_Rtopology_ValAdh || map || 4.83796394371e-17
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || transitive_tranclp || 4.61282585733e-17
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || transitive_tranclp || 4.61282585733e-17
Coq_Numbers_Cyclic_Int31_Int31_int31_0 || product_unit || 4.42620098632e-17
Coq_Init_Datatypes_length || tl || 4.42310002078e-17
Coq_Arith_Mult_tail_mult || map_tailrec || 4.36173850248e-17
Coq_Arith_PeanoNat_Nat_lcm || induct_conj || 4.20530357146e-17
Coq_Sets_Relations_1_Preorder_0 || semilattice || 4.17006521228e-17
Coq_Lists_StreamMemo_memo_get || member3 || 4.15440061152e-17
Coq_Sets_Relations_1_Symmetric || abel_semigroup || 4.05739880149e-17
Coq_Arith_Plus_tail_plus || map_tailrec || 3.88114961022e-17
Coq_Numbers_Natural_BigN_BigN_BigN_w5 || product_unit || 3.84782642665e-17
Coq_Numbers_Natural_BigN_BigN_BigN_w4 || product_unit || 3.84782642665e-17
Coq_Numbers_Natural_BigN_BigN_BigN_w3 || product_unit || 3.84782642665e-17
Coq_Numbers_Natural_BigN_BigN_BigN_w2 || product_unit || 3.84782642665e-17
Coq_Numbers_Natural_BigN_BigN_BigN_w1 || product_unit || 3.84782642665e-17
Coq_Logic_ClassicalFacts_GodelDummett Coq_Logic_ClassicalFacts_RightDistributivityImplicationOverDisjunction || pcr_real cr_real || 3.73743693895e-17
Coq_NArith_BinNat_N_add || induct_implies || 3.69185904407e-17
Coq_Relations_Relation_Operators_le_AsB_0 || sum_Plus || 3.62462746675e-17
Coq_Sets_Relations_1_Reflexive || abel_semigroup || 3.60577933436e-17
Coq_Arith_PeanoNat_Nat_gcd || induct_conj || 3.40973206385e-17
Coq_Arith_PeanoNat_Nat_sub || induct_conj || 3.28326842821e-17
Coq_Numbers_Natural_Binary_NBinary_N_mul || induct_implies || 3.21439708165e-17
Coq_Structures_OrdersEx_N_as_OT_mul || induct_implies || 3.21439708165e-17
Coq_Structures_OrdersEx_N_as_DT_mul || induct_implies || 3.21439708165e-17
Coq_Structures_OrdersEx_Nat_as_OT_mul || induct_implies || 3.1360393927e-17
Coq_Structures_OrdersEx_Nat_as_DT_mul || induct_implies || 3.1360393927e-17
Coq_Logic_ClassicalFacts_GodelDummett Coq_Logic_ClassicalFacts_RightDistributivityImplicationOverDisjunction || pcr_rat cr_rat || 3.07860841855e-17
Coq_Init_Datatypes_sum_0 || sum_sum || 2.94804765173e-17
Coq_Logic_ClassicalFacts_IndependenceOfGeneralPremises Coq_Logic_ClassicalFacts_DrinkerParadox || code_pcr_natural code_cr_natural || 2.89227516672e-17
Coq_Numbers_Cyclic_Int31_Cyclic31_Int31Cyclic_ops || bNF_Cardinal_cone || 2.73542127923e-17
Coq_Arith_PeanoNat_Nat_max || induct_implies || 2.65069677285e-17
Coq_Arith_PeanoNat_Nat_min || induct_implies || 2.60842216818e-17
Coq_Arith_PeanoNat_Nat_add || induct_conj || 2.6050088108e-17
Coq_Lists_Streams_tl || remdups || 2.58307234392e-17
Coq_Logic_ClassicalFacts_GodelDummett Coq_Logic_ClassicalFacts_RightDistributivityImplicationOverDisjunction || pcr_int cr_int || 2.56069918046e-17
Coq_ZArith_Zdiv_Remainder || map || 2.48886019077e-17
Coq_Sets_Integers_Integers_0 || one2 || 2.46324398499e-17
Coq_Numbers_Natural_BigN_BigN_BigN_w6 || product_unit || 2.24882108521e-17
Coq_Reals_Rsqrt_def_pow_2_n || zero_Rep || 2.19235029573e-17
__constr_Coq_Init_Datatypes_unit_0_1 || product_Unity || 2.14536736253e-17
Coq_Reals_Ranalysis1_derivable_pt_lim || sum_isl || 2.13930620596e-17
Coq_NArith_BinNat_N_min || induct_implies || 2.04891983524e-17
Coq_NArith_BinNat_N_max || induct_implies || 2.03115842302e-17
Coq_Numbers_Cyclic_Int31_Cyclic31_Int31Cyclic_t || product_unit || 1.94012523074e-17
Coq_Init_Datatypes_nat_0 || num || 1.85129621238e-17
Coq_Sets_Image_Im_0 || bind2 || 1.77556672204e-17
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || transitive_tranclp || 1.77411211962e-17
Coq_Reals_Ranalysis1_derive_pt || sum_Inl || 1.7513651944e-17
Coq_Arith_Wf_nat_gtof || set2 || 1.7329152911e-17
Coq_Arith_Wf_nat_ltof || set2 || 1.7329152911e-17
Coq_Sets_Ensembles_In || ord_less_eq || 1.69783012869e-17
Coq_QArith_Qminmax_Qmax || set2 || 1.68381561849e-17
Coq_Sets_Ensembles_Empty_set_0 || none || 1.65504923959e-17
Coq_Lists_Streams_Str_nth_tl || filter2 || 1.65397139035e-17
Coq_Lists_List_Add_0 || basic_sndsp || 1.56883717737e-17
Coq_Lists_Streams_Str_nth_tl || insert || 1.56804734546e-17
Coq_Lists_List_Add_0 || basic_fstsp || 1.50603577208e-17
Coq_Sets_Relations_1_contains || finite_psubset || 1.45284615607e-17
Coq_Arith_Wf_nat_inv_lt_rel || set2 || 1.4395550005e-17
Coq_Sets_Relations_1_same_relation || finite_psubset || 1.43052367607e-17
$equals3 || none || 1.40711857692e-17
Coq_Numbers_Natural_BigN_BigN_BigN_pred_t || rep_filter || 1.35544688813e-17
Coq_Logic_ClassicalFacts_GodelDummett Coq_Logic_ClassicalFacts_RightDistributivityImplicationOverDisjunction || code_pcr_natural code_cr_natural || 1.32959127207e-17
Coq_Classes_CRelationClasses_RewriteRelation_0 || antisym || 1.27355466419e-17
Coq_Logic_ClassicalFacts_IndependenceOfGeneralPremises Coq_Logic_ClassicalFacts_DrinkerParadox || implode str || 1.26528837161e-17
Coq_Numbers_Natural_Binary_NBinary_N_min || induct_conj || 1.19894797585e-17
Coq_Structures_OrdersEx_N_as_OT_min || induct_conj || 1.19894797585e-17
Coq_Structures_OrdersEx_N_as_DT_min || induct_conj || 1.19894797585e-17
Coq_Numbers_Natural_Binary_NBinary_N_max || induct_conj || 1.18987889806e-17
Coq_Structures_OrdersEx_N_as_OT_max || induct_conj || 1.18987889806e-17
Coq_Structures_OrdersEx_N_as_DT_max || induct_conj || 1.18987889806e-17
Coq_Structures_OrdersEx_Nat_as_OT_min || induct_conj || 1.17366355468e-17
Coq_Structures_OrdersEx_Nat_as_DT_min || induct_conj || 1.17366355468e-17
Coq_Structures_OrdersEx_Nat_as_OT_max || induct_conj || 1.16477563217e-17
Coq_Structures_OrdersEx_Nat_as_DT_max || induct_conj || 1.16477563217e-17
Coq_Sets_Relations_1_Relation || set || 1.13027272684e-17
Coq_Relations_Relation_Definitions_order_0 || bNF_Wellorder_wo_rel || 9.92368513261e-18
Coq_Numbers_Natural_BigN_BigN_BigN_succ_t || abs_filter || 9.85903908719e-18
Coq_Sets_Relations_2_Rstar_0 || transitive_tranclp || 9.72385034259e-18
Coq_Arith_PeanoNat_Nat_compare || map || 9.38611339669e-18
Coq_Sets_Relations_2_Strongly_confluent || abel_semigroup || 9.29180411607e-18
Coq_Sets_Relations_1_Symmetric || wfP || 9.15025299414e-18
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || transitive_rtranclp || 9.08387747383e-18
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || transitive_rtranclp || 9.08387747383e-18
Coq_Reals_SeqProp_cv_infty || nat3 || 8.78717134275e-18
Coq_Logic_ClassicalFacts_IndependenceOfGeneralPremises Coq_Logic_ClassicalFacts_DrinkerParadox || code_pcr_integer code_cr_integer || 7.98081741358e-18
Coq_romega_ReflOmegaCore_ZOmega_extract_hyp_neg || rep_Nat || 7.80180470017e-18
Coq_Numbers_Natural_Binary_NBinary_N_lcm || induct_conj || 7.74405193568e-18
Coq_Structures_OrdersEx_N_as_OT_lcm || induct_conj || 7.74405193568e-18
Coq_Structures_OrdersEx_N_as_DT_lcm || induct_conj || 7.74405193568e-18
Coq_Classes_RelationClasses_Equivalence_0 || is_none || 7.67632179284e-18
Coq_Sets_Ensembles_Intersection_0 || append || 7.65173021499e-18
Coq_Structures_OrdersEx_Nat_as_OT_lcm || induct_conj || 7.56579101911e-18
Coq_Structures_OrdersEx_Nat_as_DT_lcm || induct_conj || 7.56579101911e-18
Coq_Sets_Relations_3_Confluent || abel_s1917375468axioms || 7.46601452157e-18
Coq_Relations_Relation_Definitions_equivalence_0 || bNF_Wellorder_wo_rel || 7.41592259992e-18
Coq_romega_ReflOmegaCore_ZOmega_co_valid1 || nat3 || 6.70735739333e-18
Coq_Lists_List_tl || remdups || 6.63248793334e-18
__constr_Coq_Init_Datatypes_list_0_2 || product_snd || 6.53099967087e-18
Coq_Numbers_Natural_Binary_NBinary_N_gcd || induct_conj || 6.28713329761e-18
Coq_Structures_OrdersEx_N_as_OT_gcd || induct_conj || 6.28713329761e-18
Coq_Structures_OrdersEx_N_as_DT_gcd || induct_conj || 6.28713329761e-18
Coq_Relations_Relation_Definitions_transitive || antisym || 6.28299004163e-18
__constr_Coq_Init_Datatypes_list_0_2 || product_fst || 6.22800275903e-18
Coq_Init_Nat_mul || map || 6.16063500035e-18
Coq_Structures_OrdersEx_Nat_as_OT_gcd || induct_conj || 6.10907158079e-18
Coq_Structures_OrdersEx_Nat_as_DT_gcd || induct_conj || 6.10907158079e-18
Coq_Reals_Rseries_Un_growing || nat3 || 6.0406477054e-18
Coq_Numbers_Natural_Binary_NBinary_N_sub || induct_conj || 5.99164950908e-18
Coq_Structures_OrdersEx_N_as_OT_sub || induct_conj || 5.99164950908e-18
Coq_Structures_OrdersEx_N_as_DT_sub || induct_conj || 5.99164950908e-18
Coq_Logic_ClassicalFacts_GodelDummett Coq_Logic_ClassicalFacts_RightDistributivityImplicationOverDisjunction || implode str || 5.97245716479e-18
Coq_Lists_Streams_tl || rev || 5.95139181464e-18
Coq_Structures_OrdersEx_Nat_as_OT_sub || induct_conj || 5.87862268484e-18
Coq_Structures_OrdersEx_Nat_as_DT_sub || induct_conj || 5.87862268484e-18
Coq_Sets_Finite_sets_Finite_0 || is_none || 5.74354173563e-18
Coq_Sets_Ensembles_Union_0 || removeAll || 5.53492333229e-18
Coq_Sets_Relations_1_facts_Complement || transitive_tranclp || 5.49239378234e-18
Coq_Init_Nat_add || map || 5.23790235099e-18
Coq_Relations_Relation_Definitions_transitive || trans || 5.04998180766e-18
Coq_Sets_Relations_1_Preorder_0 || trans || 4.86673450924e-18
Coq_romega_ReflOmegaCore_Z_as_Int_one || right || 4.78647621158e-18
Coq_Numbers_Natural_Binary_NBinary_N_add || induct_conj || 4.76845556005e-18
Coq_Structures_OrdersEx_N_as_OT_add || induct_conj || 4.76845556005e-18
Coq_Structures_OrdersEx_N_as_DT_add || induct_conj || 4.76845556005e-18
Coq_Relations_Relation_Definitions_reflexive || antisym || 4.69013921285e-18
Coq_Structures_OrdersEx_Nat_as_OT_add || induct_conj || 4.66877105044e-18
Coq_Structures_OrdersEx_Nat_as_DT_add || induct_conj || 4.66877105044e-18
Coq_Sets_Relations_1_Equivalence_0 || trans || 4.59016991388e-18
Coq_Numbers_Natural_Binary_NBinary_N_add || induct_implies || 4.5611021275e-18
Coq_Structures_OrdersEx_N_as_OT_add || induct_implies || 4.5611021275e-18
Coq_Structures_OrdersEx_N_as_DT_add || induct_implies || 4.5611021275e-18
Coq_Relations_Relation_Definitions_preorder_0 || bNF_Wellorder_wo_rel || 4.55011378009e-18
Coq_Structures_OrdersEx_Nat_as_OT_add || induct_implies || 4.48485628121e-18
Coq_Structures_OrdersEx_Nat_as_DT_add || induct_implies || 4.48485628121e-18
Coq_Sets_Relations_3_Confluent || semigroup || 4.33109521202e-18
Coq_setoid_ring_BinList_jump || filter2 || 4.25385766302e-18
Coq_romega_ReflOmegaCore_ZOmega_apply_both || nat_tsub || 4.24744527827e-18
Coq_Sets_Relations_1_Preorder_0 || wf || 4.16056612831e-18
Coq_Classes_RelationClasses_Symmetric || is_none || 4.15663350748e-18
Coq_Classes_RelationClasses_Reflexive || is_none || 4.04645278652e-18
Coq_Setoids_Setoid_Setoid_Theory || is_none || 3.9757046705e-18
Coq_Sets_Relations_1_Equivalence_0 || wf || 3.95108656779e-18
Coq_Classes_RelationClasses_Transitive || is_none || 3.94341175489e-18
Coq_Relations_Relation_Definitions_PER_0 || bNF_Wellorder_wo_rel || 3.94165827593e-18
Coq_Relations_Relation_Definitions_reflexive || trans || 3.86181222152e-18
Coq_setoid_ring_BinList_jump || insert || 3.84681314567e-18
Coq_Logic_ClassicalFacts_GodelDummett Coq_Logic_ClassicalFacts_RightDistributivityImplicationOverDisjunction || code_pcr_integer code_cr_integer || 3.82201991932e-18
Coq_romega_ReflOmegaCore_Z_as_Int_zero || left || 3.75949285674e-18
Coq_Sets_Ensembles_Union_0 || filter2 || 3.73953185247e-18
Coq_Sets_Uniset_seq || predicate_contains || 3.67609603568e-18
__constr_Coq_Sets_Uniset_uniset_0_1 || pred3 || 3.41798216942e-18
__constr_Coq_Sets_Multiset_multiset_0_1 || pred3 || 3.41798216942e-18
Coq_Sorting_Sorted_Sorted_0 || produc2004651681e_prod || 3.35832831985e-18
Coq_Reals_SeqProp_opp_seq || suc_Rep || 3.23177489805e-18
Coq_Lists_List_map || filtermap || 2.77167230282e-18
Coq_Sets_Relations_3_coherent || transitive_rtranclp || 2.72048467981e-18
Coq_Numbers_Natural_Binary_NBinary_N_max || induct_implies || 2.49973355804e-18
Coq_Structures_OrdersEx_N_as_OT_max || induct_implies || 2.49973355804e-18
Coq_Structures_OrdersEx_N_as_DT_max || induct_implies || 2.49973355804e-18
Coq_Numbers_Natural_Binary_NBinary_N_min || induct_implies || 2.49342318211e-18
Coq_Structures_OrdersEx_N_as_OT_min || induct_implies || 2.49342318211e-18
Coq_Structures_OrdersEx_N_as_DT_min || induct_implies || 2.49342318211e-18
Coq_Structures_OrdersEx_Nat_as_OT_max || induct_implies || 2.4503345817e-18
Coq_Structures_OrdersEx_Nat_as_DT_max || induct_implies || 2.4503345817e-18
Coq_Structures_OrdersEx_Nat_as_OT_min || induct_implies || 2.44413061095e-18
Coq_Structures_OrdersEx_Nat_as_DT_min || induct_implies || 2.44413061095e-18
Coq_Reals_Rseries_Cauchy_crit || nat3 || 2.38940445628e-18
Coq_Relations_Relation_Definitions_symmetric || antisym || 2.25235101679e-18
Coq_Sets_Uniset_incl || member3 || 2.24368291455e-18
Coq_Sets_Uniset_incl || comm_monoid || 2.05749909891e-18
Coq_Numbers_Natural_Binary_NBinary_N_succ || suc || 2.05071962651e-18
Coq_Structures_OrdersEx_N_as_OT_succ || suc || 2.05071962651e-18
Coq_Structures_OrdersEx_N_as_DT_succ || suc || 2.05071962651e-18
Coq_Relations_Relation_Definitions_antisymmetric || antisym || 1.98696168046e-18
Coq_Relations_Relation_Definitions_symmetric || trans || 1.88103150746e-18
Coq_Numbers_Natural_Binary_NBinary_N_peano_rec || rec_nat || 1.84730632026e-18
Coq_Numbers_Natural_Binary_NBinary_N_peano_rect || rec_nat || 1.84730632026e-18
Coq_Structures_OrdersEx_N_as_OT_peano_rec || rec_nat || 1.84730632026e-18
Coq_Structures_OrdersEx_N_as_OT_peano_rect || rec_nat || 1.84730632026e-18
Coq_Structures_OrdersEx_N_as_DT_peano_rec || rec_nat || 1.84730632026e-18
Coq_Structures_OrdersEx_N_as_DT_peano_rect || rec_nat || 1.84730632026e-18
Coq_Sorting_Sorted_LocallySorted_0 || product_case_prod || 1.8363474293e-18
Coq_Numbers_Natural_Binary_NBinary_N_divide || distinct || 1.69412824124e-18
Coq_Structures_OrdersEx_N_as_OT_divide || distinct || 1.69412824124e-18
Coq_Structures_OrdersEx_N_as_DT_divide || distinct || 1.69412824124e-18
Coq_Numbers_Natural_Binary_NBinary_N_lcm || remdups || 1.69336074309e-18
Coq_Structures_OrdersEx_N_as_OT_lcm || remdups || 1.69336074309e-18
Coq_Structures_OrdersEx_N_as_DT_lcm || remdups || 1.69336074309e-18
Coq_NArith_BinNat_N_divide || distinct || 1.69217593946e-18
Coq_NArith_BinNat_N_lcm || remdups || 1.69158084738e-18
Coq_Relations_Relation_Definitions_antisymmetric || trans || 1.66113483742e-18
Coq_Sets_Ensembles_Union_0 || cons || 1.65392212032e-18
Coq_Arith_PeanoNat_Nat_lcm || remdups || 1.5994859354e-18
Coq_Structures_OrdersEx_Nat_as_DT_lcm || remdups || 1.5994859354e-18
Coq_Structures_OrdersEx_Nat_as_OT_lcm || remdups || 1.5994859354e-18
Coq_Arith_PeanoNat_Nat_divide || distinct || 1.59141300853e-18
Coq_Structures_OrdersEx_Nat_as_DT_divide || distinct || 1.59141300853e-18
Coq_Structures_OrdersEx_Nat_as_OT_divide || distinct || 1.59141300853e-18
Coq_Lists_List_tl || rev || 1.56283308418e-18
Coq_romega_ReflOmegaCore_ZOmega_term_stable || nat_is_nat || 1.33098030304e-18
Coq_romega_ReflOmegaCore_ZOmega_decompose_solve || rep_Nat || 1.27072877738e-18
Coq_Numbers_Natural_BigN_BigN_BigN_iter_t || case_complex || 1.23023326562e-18
Coq_Sets_Ensembles_Included || listMem || 1.06259426361e-18
Coq_ZArith_BinInt_Z_mul || induct_implies || 1.04434671807e-18
Coq_Sets_Ensembles_Add || append || 1.02552272081e-18
Coq_Sets_Relations_2_Strongly_confluent || equiv_equivp || 9.39374547421e-19
Coq_Numbers_Natural_BigN_BigN_BigN_mk_t || complex2 || 9.37770528358e-19
Coq_Lists_List_ForallPairs || groups387199878d_list || 9.00358336176e-19
Coq_romega_ReflOmegaCore_ZOmega_valid_list_goal || nat3 || 8.9543946711e-19
Coq_Sets_Uniset_seq || groups387199878d_list || 8.4592477585e-19
Coq_Reals_Rdefinitions_R0 || left || 8.16251413997e-19
Coq_PArith_POrderedType_Positive_as_OT_mul || induct_implies || 8.14596264419e-19
Coq_Structures_OrdersEx_Positive_as_DT_mul || induct_implies || 8.14596264419e-19
Coq_PArith_POrderedType_Positive_as_DT_mul || induct_implies || 8.14596264419e-19
Coq_Structures_OrdersEx_Positive_as_OT_mul || induct_implies || 8.14596264419e-19
Coq_Sets_Uniset_incl || groups_monoid_list || 8.07255969901e-19
Coq_Classes_CRelationClasses_RewriteRelation_0 || fun_is_measure || 7.69335577792e-19
Coq_Classes_RelationClasses_RewriteRelation_0 || fun_is_measure || 7.69335577792e-19
Coq_Sets_Relations_2_Rstar1_0 || transitive_rtranclp || 7.56513112682e-19
Coq_Sets_Uniset_seq || semilattice_neutr || 6.12101393362e-19
Coq_PArith_POrderedType_Positive_as_OT_max || induct_conj || 6.06579244876e-19
Coq_PArith_POrderedType_Positive_as_OT_min || induct_conj || 6.06579244876e-19
Coq_Structures_OrdersEx_Positive_as_DT_max || induct_conj || 6.06579244876e-19
Coq_Structures_OrdersEx_Positive_as_DT_min || induct_conj || 6.06579244876e-19
Coq_PArith_POrderedType_Positive_as_DT_max || induct_conj || 6.06579244876e-19
Coq_PArith_POrderedType_Positive_as_DT_min || induct_conj || 6.06579244876e-19
Coq_Structures_OrdersEx_Positive_as_OT_max || induct_conj || 6.06579244876e-19
Coq_Structures_OrdersEx_Positive_as_OT_min || induct_conj || 6.06579244876e-19
Coq_Lists_List_ForallOrdPairs_0 || comm_monoid || 5.88853314112e-19
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || semiri1062155398ct_rel semiri882458588ct_rel || 5.73133791163e-19
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || semilattice_order || 5.69828523502e-19
Coq_Sets_Relations_3_Confluent || equiv_part_equivp || 5.16146093054e-19
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || right || 5.07525361664e-19
Coq_Lists_List_ForallPairs || semilattice_neutr || 4.9917270538e-19
Coq_Relations_Relation_Operators_clos_trans_0 || semilattice_order || 4.59585081592e-19
Coq_PArith_BinPos_Pos_mul || induct_implies || 4.37233514601e-19
Coq_Sets_Relations_3_Confluent || reflp || 4.20399480925e-19
Coq_Reals_Rdefinitions_R1 || right || 4.17461933353e-19
Coq_ZArith_BinInt_Z_sub || induct_conj || 4.05821874655e-19
Coq_Lists_List_ForallPairs || finite_folding_idem || 4.03096048951e-19
Coq_Numbers_Natural_Binary_NBinary_N_peano_rec || code_rec_natural || 3.98463658397e-19
Coq_Numbers_Natural_Binary_NBinary_N_peano_rect || code_rec_natural || 3.98463658397e-19
Coq_Structures_OrdersEx_N_as_OT_peano_rec || code_rec_natural || 3.98463658397e-19
Coq_Structures_OrdersEx_N_as_OT_peano_rect || code_rec_natural || 3.98463658397e-19
Coq_Structures_OrdersEx_N_as_DT_peano_rec || code_rec_natural || 3.98463658397e-19
Coq_Structures_OrdersEx_N_as_DT_peano_rect || code_rec_natural || 3.98463658397e-19
Coq_Lists_List_ForallOrdPairs_0 || groups_monoid_list || 3.95685957745e-19
Coq_PArith_POrderedType_Positive_as_OT_add || induct_implies || 3.94781332225e-19
Coq_Structures_OrdersEx_Positive_as_DT_add || induct_implies || 3.94781332225e-19
Coq_PArith_POrderedType_Positive_as_DT_add || induct_implies || 3.94781332225e-19
Coq_Structures_OrdersEx_Positive_as_OT_add || induct_implies || 3.94781332225e-19
Coq_ZArith_BinInt_Z_add || induct_conj || 3.53356216621e-19
Coq_Lists_List_ForallPairs || monoid || 3.41245741315e-19
Coq_Sets_Uniset_seq || groups828474808id_set || 3.3670344367e-19
Coq_Numbers_Natural_Binary_NBinary_N_lcm || remdups_adj || 3.35826075929e-19
Coq_Structures_OrdersEx_N_as_OT_lcm || remdups_adj || 3.35826075929e-19
Coq_Structures_OrdersEx_N_as_DT_lcm || remdups_adj || 3.35826075929e-19
Coq_NArith_BinNat_N_lcm || remdups_adj || 3.35459455559e-19
Coq_PArith_BinPos_Pos_max || induct_conj || 3.33440701813e-19
Coq_PArith_BinPos_Pos_min || induct_conj || 3.33440701813e-19
Coq_Relations_Relation_Operators_clos_refl_trans_0 || semilattice_order || 3.32313557209e-19
Coq_Arith_PeanoNat_Nat_lcm || remdups_adj || 3.16507675325e-19
Coq_Structures_OrdersEx_Nat_as_DT_lcm || remdups_adj || 3.16507675325e-19
Coq_Structures_OrdersEx_Nat_as_OT_lcm || remdups_adj || 3.16507675325e-19
Coq_Numbers_Natural_Binary_NBinary_N_succ || code_Suc || 3.10728097508e-19
Coq_Structures_OrdersEx_N_as_OT_succ || code_Suc || 3.10728097508e-19
Coq_Structures_OrdersEx_N_as_DT_succ || code_Suc || 3.10728097508e-19
Coq_romega_ReflOmegaCore_ZOmega_merge_eq || rep_Nat || 3.09054762737e-19
Coq_Sets_Uniset_seq || monoid || 2.5699058045e-19
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || semila1450535954axioms || 2.47095934078e-19
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || semila1450535954axioms || 2.47095934078e-19
Coq_Sets_Uniset_incl || lattic1543629303tr_set || 2.3055224686e-19
Coq_Relations_Relation_Operators_clos_trans_n1_0 || semila1450535954axioms || 2.25373561217e-19
Coq_Relations_Relation_Operators_clos_trans_1n_0 || semila1450535954axioms || 2.25373561217e-19
Coq_ZArith_BinInt_Z_rem || induct_conj || 2.09882201135e-19
Coq_PArith_BinPos_Pos_add || induct_implies || 2.06200700866e-19
Coq_romega_ReflOmegaCore_ZOmega_valid2 || nat3 || 1.83302033786e-19
Coq_PArith_POrderedType_Positive_as_OT_add || induct_conj || 1.81096574625e-19
Coq_Structures_OrdersEx_Positive_as_DT_add || induct_conj || 1.81096574625e-19
Coq_PArith_POrderedType_Positive_as_DT_add || induct_conj || 1.81096574625e-19
Coq_Structures_OrdersEx_Positive_as_OT_add || induct_conj || 1.81096574625e-19
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || lattic1693879045er_set || 1.7536809561e-19
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || lattic1693879045er_set || 1.7536809561e-19
Coq_ZArith_BinInt_Z_modulo || induct_conj || 1.69219221552e-19
Coq_romega_ReflOmegaCore_ZOmega_reduce_lhyps || zero_Rep || 1.67166922593e-19
Coq_PArith_POrderedType_Positive_as_DT_add || id_on || 1.64999627169e-19
Coq_PArith_POrderedType_Positive_as_OT_add || id_on || 1.64999627169e-19
Coq_Structures_OrdersEx_Positive_as_DT_add || id_on || 1.64999627169e-19
Coq_Structures_OrdersEx_Positive_as_OT_add || id_on || 1.64999627169e-19
Coq_Sets_Uniset_incl || monoid_axioms || 1.64827385088e-19
Coq_Lists_List_ForallPairs || groups828474808id_set || 1.5969338909e-19
Coq_PArith_POrderedType_Positive_as_OT_max || induct_implies || 1.58326547535e-19
Coq_PArith_POrderedType_Positive_as_OT_min || induct_implies || 1.58326547535e-19
Coq_Structures_OrdersEx_Positive_as_DT_max || induct_implies || 1.58326547535e-19
Coq_Structures_OrdersEx_Positive_as_DT_min || induct_implies || 1.58326547535e-19
Coq_PArith_POrderedType_Positive_as_DT_max || induct_implies || 1.58326547535e-19
Coq_PArith_POrderedType_Positive_as_DT_min || induct_implies || 1.58326547535e-19
Coq_Structures_OrdersEx_Positive_as_OT_max || induct_implies || 1.58326547535e-19
Coq_Structures_OrdersEx_Positive_as_OT_min || induct_implies || 1.58326547535e-19
Coq_Relations_Relation_Operators_clos_refl_trans_n1_0 || semila1450535954axioms || 1.56909991764e-19
Coq_PArith_POrderedType_Positive_as_DT_lt || trans || 1.55502530991e-19
Coq_PArith_POrderedType_Positive_as_OT_lt || trans || 1.55502530991e-19
Coq_Structures_OrdersEx_Positive_as_DT_lt || trans || 1.55502530991e-19
Coq_Structures_OrdersEx_Positive_as_OT_lt || trans || 1.55502530991e-19
Coq_Relations_Relation_Operators_clos_trans_n1_0 || lattic1693879045er_set || 1.5498766132e-19
Coq_Relations_Relation_Operators_clos_trans_1n_0 || lattic1693879045er_set || 1.5498766132e-19
Coq_setoid_ring_BinList_jump || drop || 1.53027718782e-19
Coq_romega_ReflOmegaCore_ZOmega_valid_lhyps || nat3 || 1.52631955088e-19
Coq_Relations_Relation_Operators_clos_refl_trans_1n_0 || semila1450535954axioms || 1.49199824441e-19
Coq_Numbers_Natural_Binary_NBinary_N_mul || remdups || 1.462664022e-19
Coq_Structures_OrdersEx_N_as_OT_mul || remdups || 1.462664022e-19
Coq_Structures_OrdersEx_N_as_DT_mul || remdups || 1.462664022e-19
Coq_NArith_BinNat_N_mul || remdups || 1.44245113369e-19
Coq_Arith_PeanoNat_Nat_mul || remdups || 1.3764074237e-19
Coq_Structures_OrdersEx_Nat_as_DT_mul || remdups || 1.3764074237e-19
Coq_Structures_OrdersEx_Nat_as_OT_mul || remdups || 1.3764074237e-19
Coq_Init_Peano_lt || abel_semigroup || 1.33689773589e-19
Coq_Lists_List_ForallOrdPairs_0 || finite1921348288axioms || 1.28038937272e-19
Coq_MSets_MSetPositive_PositiveSet_empty || zero_Rep || 1.27096450012e-19
Coq_Lists_List_ForallOrdPairs_0 || lattic1543629303tr_set || 1.12733886614e-19
Coq_Relations_Relation_Operators_clos_refl_trans_n1_0 || lattic1693879045er_set || 1.0950198026e-19
Coq_Lists_List_ForallPairs || groups1716206716st_set || 1.0727541922e-19
Coq_Relations_Relation_Operators_clos_refl_trans_1n_0 || lattic1693879045er_set || 1.05561696817e-19
Coq_Lists_List_ForallOrdPairs_0 || monoid_axioms || 1.04218278839e-19
Coq_Lists_List_ForallOrdPairs_0 || finite_folding || 9.76149265121e-20
Coq_PArith_BinPos_Pos_add || induct_conj || 9.40493905949e-20
Coq_Lists_List_tl || butlast || 9.11490967329e-20
Coq_Sets_Ensembles_Full_set_0 || empty || 9.06751435498e-20
Coq_Arith_Between_in_int || comm_monoid || 9.06485987526e-20
Coq_PArith_BinPos_Pos_min || induct_implies || 8.81724594771e-20
Coq_PArith_BinPos_Pos_max || induct_implies || 8.81724594771e-20
Coq_PArith_BinPos_Pos_add || id_on || 8.35504506513e-20
Coq_PArith_BinPos_Pos_lt || trans || 8.19045902117e-20
Coq_Lists_List_tl || tl || 8.00930517879e-20
Coq_FSets_FSetPositive_PositiveSet_empty || zero_Rep || 7.92283030188e-20
Coq_PArith_POrderedType_Positive_as_DT_max || remdups || 6.98751381618e-20
Coq_PArith_POrderedType_Positive_as_OT_max || remdups || 6.98751381618e-20
Coq_Structures_OrdersEx_Positive_as_DT_max || remdups || 6.98751381618e-20
Coq_Structures_OrdersEx_Positive_as_OT_max || remdups || 6.98751381618e-20
Coq_PArith_POrderedType_Positive_as_DT_le || distinct || 6.70122842476e-20
Coq_PArith_POrderedType_Positive_as_OT_le || distinct || 6.70122842476e-20
Coq_Structures_OrdersEx_Positive_as_DT_le || distinct || 6.70122842476e-20
Coq_Structures_OrdersEx_Positive_as_OT_le || distinct || 6.70122842476e-20
Coq_Relations_Relation_Definitions_transitive || transitive_acyclic || 6.5026837731e-20
Coq_Sets_Ensembles_In || contained || 6.46340375007e-20
Coq_MSets_MSetPositive_PositiveSet_Empty || nat3 || 5.99742400468e-20
Coq_PArith_BinPos_Pos_max || remdups || 5.98117469528e-20
Coq_PArith_POrderedType_Positive_as_DT_lt || antisym || 5.90995856055e-20
Coq_PArith_POrderedType_Positive_as_OT_lt || antisym || 5.90995856055e-20
Coq_Structures_OrdersEx_Positive_as_DT_lt || antisym || 5.90995856055e-20
Coq_Structures_OrdersEx_Positive_as_OT_lt || antisym || 5.90995856055e-20
Coq_PArith_POrderedType_Positive_as_DT_lt || sym || 5.85820847577e-20
Coq_PArith_POrderedType_Positive_as_OT_lt || sym || 5.85820847577e-20
Coq_Structures_OrdersEx_Positive_as_DT_lt || sym || 5.85820847577e-20
Coq_Structures_OrdersEx_Positive_as_OT_lt || sym || 5.85820847577e-20
Coq_PArith_BinPos_Pos_le || distinct || 5.79232853464e-20
Coq_Numbers_Natural_BigN_BigN_BigN_pred_t || pred3 || 5.34577146219e-20
Coq_Classes_Morphisms_Normalizes || groups387199878d_list || 5.31569167443e-20
Coq_Relations_Relation_Definitions_equivalence_0 || wf || 5.17429062133e-20
Coq_Sets_Cpo_PO_of_cpo || id_on || 4.92714548359e-20
Coq_PArith_POrderedType_Positive_as_DT_succ || id2 || 4.9134858515e-20
Coq_PArith_POrderedType_Positive_as_OT_succ || id2 || 4.9134858515e-20
Coq_Structures_OrdersEx_Positive_as_DT_succ || id2 || 4.9134858515e-20
Coq_Structures_OrdersEx_Positive_as_OT_succ || id2 || 4.9134858515e-20
Coq_Init_Peano_le_0 || abel_s1917375468axioms || 4.87923306122e-20
Coq_Relations_Relation_Definitions_reflexive || transitive_acyclic || 4.30359303329e-20
Coq_Classes_RelationClasses_relation_equivalence || comm_monoid || 4.29605224938e-20
Coq_Numbers_Natural_Binary_NBinary_N_divide || trans || 4.27629119516e-20
Coq_Structures_OrdersEx_N_as_OT_divide || trans || 4.27629119516e-20
Coq_Structures_OrdersEx_N_as_DT_divide || trans || 4.27629119516e-20
Coq_NArith_BinNat_N_divide || trans || 4.23553105782e-20
Coq_Sets_Relations_2_Strongly_confluent || bNF_Wellorder_wo_rel || 4.21876316266e-20
Coq_Init_Peano_le_0 || semigroup || 4.08919249158e-20
Coq_Arith_PeanoNat_Nat_divide || trans || 3.89452305821e-20
Coq_Structures_OrdersEx_Nat_as_DT_divide || trans || 3.89452305821e-20
Coq_Structures_OrdersEx_Nat_as_OT_divide || trans || 3.89452305821e-20
__constr_Coq_Init_Datatypes_list_0_1 || empty || 3.86631382535e-20
Coq_Relations_Relation_Definitions_preorder_0 || wf || 3.79929280148e-20
Coq_Sets_Relations_2_Rplus_0 || transitive_tranclp || 3.72911369117e-20
Coq_PArith_POrderedType_Positive_as_DT_add || transitive_trancl || 3.57475625088e-20
Coq_PArith_POrderedType_Positive_as_OT_add || transitive_trancl || 3.57475625088e-20
Coq_Structures_OrdersEx_Positive_as_DT_add || transitive_trancl || 3.57475625088e-20
Coq_Structures_OrdersEx_Positive_as_OT_add || transitive_trancl || 3.57475625088e-20
Coq_Lists_List_ForallOrdPairs_0 || groups828474808id_set || 3.55680980426e-20
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || semila1450535954axioms || 3.54302572485e-20
Coq_FSets_FSetPositive_PositiveSet_Empty || nat3 || 3.47854141606e-20
Coq_Lists_List_ForallPairs || comm_monoid || 3.45083664903e-20
Coq_PArith_POrderedType_Positive_as_DT_add || transitive_rtrancl || 3.40133148948e-20
Coq_PArith_POrderedType_Positive_as_OT_add || transitive_rtrancl || 3.40133148948e-20
Coq_Structures_OrdersEx_Positive_as_DT_add || transitive_rtrancl || 3.40133148948e-20
Coq_Structures_OrdersEx_Positive_as_OT_add || transitive_rtrancl || 3.40133148948e-20
Coq_Numbers_Natural_BigN_BigN_BigN_succ_t || eval || 3.39191589879e-20
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || suc || 3.26707531469e-20
Coq_Structures_OrdersEx_Z_as_OT_succ || suc || 3.26707531469e-20
Coq_Structures_OrdersEx_Z_as_DT_succ || suc || 3.26707531469e-20
Coq_Classes_Morphisms_Normalizes || semilattice_neutr || 3.20490605969e-20
Coq_Sets_Cpo_Totally_ordered_0 || real_V1632203528linear || 3.19603102451e-20
Coq_ZArith_Znumtheory_Bezout_0 || comm_monoid || 3.15954173311e-20
Coq_romega_ReflOmegaCore_Z_as_Int_plus || pow || 3.13233659504e-20
Coq_Lists_List_ForallOrdPairs_0 || groups387199878d_list || 3.0742576408e-20
Coq_PArith_BinPos_Pos_lt || antisym || 3.03452464881e-20
Coq_Relations_Relation_Operators_clos_trans_0 || semila1450535954axioms || 3.02610798031e-20
Coq_PArith_BinPos_Pos_lt || sym || 3.00846822055e-20
Coq_Relations_Relation_Definitions_order_0 || wf || 2.69127639454e-20
Coq_Sets_Relations_3_Confluent || antisym || 2.62966247063e-20
Coq_Classes_RelationClasses_relation_equivalence || groups_monoid_list || 2.6129127119e-20
Coq_PArith_BinPos_Pos_succ || id2 || 2.54838717823e-20
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || semilattice_order || 2.37521239507e-20
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || semilattice_order || 2.37521239507e-20
Coq_Relations_Relation_Definitions_transitive || semilattice || 2.31742840115e-20
Coq_Relations_Relation_Operators_clos_trans_n1_0 || semilattice_order || 2.29500276628e-20
Coq_Relations_Relation_Operators_clos_trans_1n_0 || semilattice_order || 2.29500276628e-20
Coq_Classes_CRelationClasses_Equivalence_0 || semilattice || 2.17928356576e-20
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || lattic1693879045er_set || 2.17472780981e-20
Coq_Relations_Relation_Definitions_symmetric || transitive_acyclic || 2.15054017715e-20
Coq_Sets_Relations_3_Confluent || trans || 2.11499265623e-20
Coq_Relations_Relation_Operators_clos_refl_trans_0 || semila1450535954axioms || 2.05579810685e-20
Coq_Sets_Integers_nat_po || real || 2.05424276501e-20
Coq_Sets_Cpo_Complete_0 || trans || 1.99826450711e-20
Coq_Classes_Morphisms_Normalizes || monoid || 1.99613695401e-20
Coq_Relations_Relation_Operators_clos_trans_0 || lattic1693879045er_set || 1.94500983253e-20
Coq_PArith_BinPos_Pos_add || transitive_trancl || 1.87108394031e-20
Coq_ZArith_Zdigits_binary_value || rep_filter || 1.83587418629e-20
Coq_PArith_BinPos_Pos_add || transitive_rtrancl || 1.78340709456e-20
Coq_Numbers_Natural_BigN_BigN_BigN_succ_t || pred3 || 1.77961122794e-20
Coq_Relations_Relation_Definitions_PER_0 || wf || 1.74663790413e-20
Coq_Numbers_Natural_Binary_NBinary_N_lcm || transitive_trancl || 1.73363886015e-20
Coq_Structures_OrdersEx_N_as_OT_lcm || transitive_trancl || 1.73363886015e-20
Coq_Structures_OrdersEx_N_as_DT_lcm || transitive_trancl || 1.73363886015e-20
Coq_NArith_BinNat_N_lcm || transitive_trancl || 1.71815472621e-20
Coq_ZArith_Zdigits_Z_to_binary || abs_filter || 1.6776809406e-20
Coq_Relations_Relation_Definitions_order_0 || lattic35693393ce_set || 1.65504126375e-20
Coq_romega_ReflOmegaCore_Z_as_Int_zero || one2 || 1.61765332186e-20
Coq_Arith_PeanoNat_Nat_lcm || transitive_trancl || 1.58834188529e-20
Coq_Structures_OrdersEx_Nat_as_DT_lcm || transitive_trancl || 1.58834188529e-20
Coq_Structures_OrdersEx_Nat_as_OT_lcm || transitive_trancl || 1.58834188529e-20
Coq_Numbers_Natural_BigN_BigN_BigN_pred_t || eval || 1.57984801942e-20
__constr_Coq_Init_Datatypes_list_0_2 || join || 1.53346729908e-20
Coq_Relations_Relation_Operators_clos_refl_trans_n1_0 || semilattice_order || 1.52572259387e-20
__constr_Coq_Init_Datatypes_list_0_2 || insert2 || 1.49595080291e-20
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || code_Suc || 1.49330534807e-20
Coq_Structures_OrdersEx_Z_as_OT_pred || code_Suc || 1.49330534807e-20
Coq_Structures_OrdersEx_Z_as_DT_pred || code_Suc || 1.49330534807e-20
Coq_Init_Datatypes_nat_0 || complex || 1.46783111595e-20
Coq_Relations_Relation_Operators_clos_refl_trans_1n_0 || semilattice_order || 1.45881588633e-20
Coq_Relations_Relation_Definitions_reflexive || semilattice || 1.44676256901e-20
Coq_ZArith_Znumtheory_Zis_gcd_0 || groups387199878d_list || 1.41282370007e-20
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || measure || 1.3997038221e-20
Coq_Relations_Relation_Definitions_equivalence_0 || lattic35693393ce_set || 1.38691623295e-20
Coq_PArith_POrderedType_Positive_as_DT_max || remdups_adj || 1.36099376743e-20
Coq_PArith_POrderedType_Positive_as_OT_max || remdups_adj || 1.36099376743e-20
Coq_Structures_OrdersEx_Positive_as_DT_max || remdups_adj || 1.36099376743e-20
Coq_Structures_OrdersEx_Positive_as_OT_max || remdups_adj || 1.36099376743e-20
Coq_Sets_Integers_Integers_0 || im || 1.34026449426e-20
Coq_Numbers_Natural_BigN_BigN_BigN_recursion || rec_sumbool || 1.33384265314e-20
Coq_Sets_Integers_Integers_0 || re || 1.32226070869e-20
Coq_Relations_Relation_Operators_clos_refl_trans_0 || lattic1693879045er_set || 1.30943216417e-20
Coq_Lists_List_ForallOrdPairs_0 || comm_monoid_axioms || 1.20453871855e-20
Coq_ZArith_Znumtheory_Bezout_0 || groups_monoid_list || 1.20118322411e-20
Coq_Sets_Cpo_Complete_0 || antisym || 1.18542570251e-20
Coq_Sets_Cpo_Complete_0 || sym || 1.17056747519e-20
Coq_PArith_BinPos_Pos_max || remdups_adj || 1.16955968729e-20
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || suc || 1.15228238223e-20
Coq_Structures_OrdersEx_Z_as_OT_pred || suc || 1.15228238223e-20
Coq_Structures_OrdersEx_Z_as_DT_pred || suc || 1.15228238223e-20
Coq_Classes_Morphisms_Normalizes || groups828474808id_set || 1.14886076061e-20
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || measures || 1.14261559408e-20
Coq_Numbers_Natural_Binary_NBinary_N_lcm || id_on || 1.09482767719e-20
Coq_Structures_OrdersEx_N_as_OT_lcm || id_on || 1.09482767719e-20
Coq_Structures_OrdersEx_N_as_DT_lcm || id_on || 1.09482767719e-20
Coq_NArith_BinNat_N_lcm || id_on || 1.08447020303e-20
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || code_nat_of_natural || 1.05933152694e-20
Coq_Structures_OrdersEx_Z_as_OT_opp || code_nat_of_natural || 1.05933152694e-20
Coq_Structures_OrdersEx_Z_as_DT_opp || code_nat_of_natural || 1.05933152694e-20
Coq_Relations_Relation_Definitions_preorder_0 || lattic35693393ce_set || 1.05878481274e-20
Coq_Numbers_Natural_BigN_BigN_BigN_recursion || case_sumbool || 1.05091805696e-20
Coq_ZArith_Znumtheory_Zis_gcd_0 || semilattice_neutr || 1.04694790376e-20
Coq_romega_ReflOmegaCore_Z_as_Int_mult || induct_implies || 1.02876043449e-20
Coq_Arith_PeanoNat_Nat_lcm || id_on || 1.0047742488e-20
Coq_Structures_OrdersEx_Nat_as_DT_lcm || id_on || 1.0047742488e-20
Coq_Structures_OrdersEx_Nat_as_OT_lcm || id_on || 1.0047742488e-20
Coq_Init_Peano_lt || map_tailrec || 9.76634937995e-21
Coq_Relations_Relation_Operators_clos_refl_trans_0 || measure || 9.50802310921e-21
Coq_Relations_Relation_Definitions_PER_0 || lattic35693393ce_set || 9.34237220324e-21
Coq_Numbers_Natural_BigN_BigN_BigN_omake_op || monoid || 9.22160080422e-21
Coq_Sets_Relations_2_Rplus_0 || transitive_rtranclp || 9.17367202232e-21
Coq_romega_ReflOmegaCore_Z_as_Int_plus || induct_conj || 8.86281045808e-21
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || lexordp_eq || 8.7025294326e-21
Coq_Sets_Ensembles_Complement || rev || 8.471365696e-21
Coq_Classes_Morphisms_Normalizes || finite_folding_idem || 8.38359959132e-21
Coq_Lists_List_NoDup_0 || null2 || 8.36416540274e-21
Coq_Numbers_Natural_BigN_BigN_BigN_zero || left || 7.95430809179e-21
Coq_Relations_Relation_Definitions_antisymmetric || transitive_acyclic || 7.93415993455e-21
Coq_Classes_RelationClasses_relation_equivalence || lattic1543629303tr_set || 7.90001611402e-21
Coq_Logic_EqdepFacts_Inj_dep_pair_on || semila1450535954axioms || 7.89592115184e-21
Coq_Relations_Relation_Operators_clos_refl_trans_0 || measures || 7.859866571e-21
Coq_Numbers_Natural_BigN_BigN_BigN_omake_op || semilattice_neutr || 7.66227190447e-21
Coq_Init_Datatypes_app || sum_Inr || 7.53451940754e-21
Coq_Classes_CRelationClasses_RewriteRelation_0 || semilattice_axioms || 7.47859208291e-21
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || code_natural_of_nat || 7.34523629819e-21
Coq_Structures_OrdersEx_Z_as_OT_opp || code_natural_of_nat || 7.34523629819e-21
Coq_Structures_OrdersEx_Z_as_DT_opp || code_natural_of_nat || 7.34523629819e-21
Coq_Sets_Relations_2_Rstar1_0 || map_le || 7.1634593491e-21
Coq_NArith_Ndigits_N2Bv_gen || abs_filter || 7.0192214196e-21
Coq_Relations_Relation_Definitions_symmetric || semilattice || 6.90770244249e-21
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || comm_monoid || 6.74849664278e-21
Coq_Numbers_Natural_Binary_NBinary_N_mul || id_on || 6.67039146301e-21
Coq_Structures_OrdersEx_N_as_OT_mul || id_on || 6.67039146301e-21
Coq_Structures_OrdersEx_N_as_DT_mul || id_on || 6.67039146301e-21
Coq_Classes_RelationClasses_relation_equivalence || monoid_axioms || 6.5840593085e-21
Coq_NArith_BinNat_N_mul || id_on || 6.49519387424e-21
Coq_Numbers_Integer_BigZ_BigZ_BigZ_zero || complex || 6.4707953459e-21
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || code_Suc || 6.33472855279e-21
Coq_Structures_OrdersEx_Z_as_OT_succ || code_Suc || 6.33472855279e-21
Coq_Structures_OrdersEx_Z_as_DT_succ || code_Suc || 6.33472855279e-21
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || groups387199878d_list || 6.29042060687e-21
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || nat_of_num || 6.18790676363e-21
Coq_Structures_OrdersEx_Z_as_OT_opp || nat_of_num || 6.18790676363e-21
Coq_Structures_OrdersEx_Z_as_DT_opp || nat_of_num || 6.18790676363e-21
Coq_Arith_PeanoNat_Nat_mul || id_on || 6.10478524205e-21
Coq_Structures_OrdersEx_Nat_as_DT_mul || id_on || 6.10478524205e-21
Coq_Structures_OrdersEx_Nat_as_OT_mul || id_on || 6.10478524205e-21
Coq_NArith_Ndigits_Bv2N || rep_filter || 6.10233713989e-21
Coq_Numbers_Natural_BigN_BigN_BigN_make_op || groups_monoid_list || 5.86545249268e-21
Coq_ZArith_Znumtheory_Zis_gcd_0 || groups828474808id_set || 5.72874508394e-21
Coq_Lists_Streams_ForAll_0 || listMem || 5.34826827261e-21
Coq_Reals_Ranalysis1_derivable_pt || semilattice || 5.28850658856e-21
Coq_Numbers_Natural_Binary_NBinary_N_lcm || transitive_rtrancl || 5.2731276493e-21
Coq_Structures_OrdersEx_N_as_OT_lcm || transitive_rtrancl || 5.2731276493e-21
Coq_Structures_OrdersEx_N_as_DT_lcm || transitive_rtrancl || 5.2731276493e-21
Coq_NArith_BinNat_N_lcm || transitive_rtrancl || 5.22539483635e-21
Coq_ZArith_Znumtheory_prime_prime || groups_monoid_list || 5.01125245376e-21
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || inc || 5.00201545114e-21
Coq_Structures_OrdersEx_Z_as_OT_pred || inc || 5.00201545114e-21
Coq_Structures_OrdersEx_Z_as_DT_pred || inc || 5.00201545114e-21
Coq_Classes_CRelationClasses_RewriteRelation_0 || abel_semigroup || 4.85097178716e-21
Coq_Sets_Cpo_PO_of_cpo || transitive_trancl || 4.85024224921e-21
Coq_Arith_PeanoNat_Nat_lcm || transitive_rtrancl || 4.82537251927e-21
Coq_Structures_OrdersEx_Nat_as_DT_lcm || transitive_rtrancl || 4.82537251927e-21
Coq_Structures_OrdersEx_Nat_as_OT_lcm || transitive_rtrancl || 4.82537251927e-21
Coq_Relations_Relation_Definitions_antisymmetric || semilattice || 4.64795625734e-21
Coq_Classes_CRelationClasses_RewriteRelation_0 || lattic35693393ce_set || 4.54144424884e-21
Coq_Numbers_Natural_BigN_BigN_BigN_make_op || lattic1543629303tr_set || 4.48552333703e-21
Coq_Init_Peano_le_0 || map_tailrec || 4.41531561343e-21
Coq_Sets_Cpo_PO_of_cpo || transitive_rtrancl || 4.41526514545e-21
Coq_Relations_Relation_Operators_clos_refl_trans_0 || lexordp_eq || 4.21141016082e-21
Coq_ZArith_Znumtheory_Zis_gcd_0 || monoid || 4.19635394941e-21
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || semilattice_neutr || 4.12183294047e-21
Coq_Arith_PeanoNat_Nat_lt_alt || map || 4.0641400042e-21
Coq_Structures_OrdersEx_Nat_as_DT_lt_alt || map || 4.0641400042e-21
Coq_Structures_OrdersEx_Nat_as_OT_lt_alt || map || 4.0641400042e-21
Coq_Numbers_Natural_Binary_NBinary_N_mul || transitive_trancl || 4.06408457093e-21
Coq_Structures_OrdersEx_N_as_OT_mul || transitive_trancl || 4.06408457093e-21
Coq_Structures_OrdersEx_N_as_DT_mul || transitive_trancl || 4.06408457093e-21
Coq_NArith_BinNat_N_mul || transitive_trancl || 3.98039241106e-21
Coq_Numbers_Natural_Binary_NBinary_N_mul || transitive_rtrancl || 3.91015374381e-21
Coq_Structures_OrdersEx_N_as_OT_mul || transitive_rtrancl || 3.91015374381e-21
Coq_Structures_OrdersEx_N_as_DT_mul || transitive_rtrancl || 3.91015374381e-21
Coq_NArith_BinNat_N_mul || transitive_rtrancl || 3.83131214804e-21
Coq_ZArith_Znumtheory_Bezout_0 || lattic1543629303tr_set || 3.77352826216e-21
Coq_Arith_PeanoNat_Nat_mul || transitive_trancl || 3.71437838501e-21
Coq_Structures_OrdersEx_Nat_as_DT_mul || transitive_trancl || 3.71437838501e-21
Coq_Structures_OrdersEx_Nat_as_OT_mul || transitive_trancl || 3.71437838501e-21
Coq_Classes_Morphisms_Normalizes || groups1716206716st_set || 3.6048461455e-21
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || groups_monoid_list || 3.59634206924e-21
Coq_Arith_PeanoNat_Nat_mul || transitive_rtrancl || 3.57378966651e-21
Coq_Structures_OrdersEx_Nat_as_DT_mul || transitive_rtrancl || 3.57378966651e-21
Coq_Structures_OrdersEx_Nat_as_OT_mul || transitive_rtrancl || 3.57378966651e-21
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || real_V1127708846m_norm || 3.43289858229e-21
Coq_Numbers_Integer_BigZ_BigZ_BigZ_div2 || cnj || 3.39757935398e-21
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || real_V1127708846m_norm || 3.383608302e-21
Coq_Classes_Morphisms_ProperProxy || comm_monoid || 3.29247573865e-21
Coq_Logic_EqdepFacts_Eq_dep_eq_on || semilattice_order || 3.28810526767e-21
__constr_Coq_Init_Datatypes_nat_0_2 || quotient_of || 3.17673613597e-21
Coq_Classes_RelationClasses_relation_equivalence || finite1921348288axioms || 3.08190665184e-21
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || pcr_literal cr_literal || 3.06265362604e-21
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || lexordp2 || 2.77736258678e-21
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || lexordp2 || 2.77736258678e-21
Coq_Numbers_Natural_Binary_NBinary_N_divide || antisym || 2.72629990604e-21
Coq_Structures_OrdersEx_N_as_OT_divide || antisym || 2.72629990604e-21
Coq_Structures_OrdersEx_N_as_DT_divide || antisym || 2.72629990604e-21
Coq_Numbers_Natural_Binary_NBinary_N_divide || sym || 2.70374286098e-21
Coq_Structures_OrdersEx_N_as_OT_divide || sym || 2.70374286098e-21
Coq_Structures_OrdersEx_N_as_DT_divide || sym || 2.70374286098e-21
Coq_NArith_BinNat_N_divide || antisym || 2.68467737292e-21
Coq_NArith_BinNat_N_divide || sym || 2.66246176873e-21
Coq_Sets_Uniset_incl || finite1921348288axioms || 2.65828521913e-21
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sgn || cnj || 2.61021447586e-21
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt_up || cnj || 2.56570204062e-21
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt || cnj || 2.52350695933e-21
Coq_Sets_Uniset_seq || finite_folding_idem || 2.49742992032e-21
Coq_Arith_PeanoNat_Nat_divide || antisym || 2.49426448945e-21
Coq_Structures_OrdersEx_Nat_as_DT_divide || antisym || 2.49426448945e-21
Coq_Structures_OrdersEx_Nat_as_OT_divide || antisym || 2.49426448945e-21
Coq_Arith_PeanoNat_Nat_divide || sym || 2.47375476614e-21
Coq_Structures_OrdersEx_Nat_as_DT_divide || sym || 2.47375476614e-21
Coq_Structures_OrdersEx_Nat_as_OT_divide || sym || 2.47375476614e-21
Coq_ZArith_Znumtheory_prime_0 || monoid || 2.38327647996e-21
Coq_Classes_RelationClasses_relation_equivalence || finite_folding || 2.36375878817e-21
Coq_ZArith_Znumtheory_Bezout_0 || monoid_axioms || 2.32172505568e-21
Coq_ZArith_Zgcd_alt_Zgcd_alt || divmod_nat || 2.31784376434e-21
__constr_Coq_Init_Datatypes_nat_0_2 || empty || 2.28390900391e-21
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || monoid || 2.2682753803e-21
Coq_Lists_Streams_Str_nth_tl || cons || 2.22128621354e-21
Coq_Classes_RelationPairs_Measure_0 || real_V1632203528linear || 2.08008828425e-21
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || inc || 2.04499737874e-21
Coq_Structures_OrdersEx_Z_as_OT_succ || inc || 2.04499737874e-21
Coq_Structures_OrdersEx_Z_as_DT_succ || inc || 2.04499737874e-21
Coq_Sets_Uniset_incl || groups828474808id_set || 2.01767347097e-21
Coq_ZArith_Zgcd_alt_Zgcd_alt || bNF_Ca646678531ard_of || 1.94753228421e-21
Coq_ZArith_Znumtheory_Zis_gcd_0 || divmod_nat_rel || 1.94523571484e-21
Coq_Sets_Finite_sets_cardinal_0 || divmod_nat_rel || 1.90917178561e-21
Coq_Sets_Uniset_seq || groups1716206716st_set || 1.82200835812e-21
Coq_Arith_PeanoNat_Nat_le_alt || map || 1.76639944991e-21
Coq_Structures_OrdersEx_Nat_as_DT_le_alt || map || 1.76639944991e-21
Coq_Structures_OrdersEx_Nat_as_OT_le_alt || map || 1.76639944991e-21
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || groups828474808id_set || 1.69677561211e-21
Coq_Setoids_Setoid_Setoid_Theory || reflp || 1.56507751053e-21
Coq_Sets_Uniset_incl || comm_monoid_axioms || 1.5463600065e-21
Coq_Sets_Uniset_incl || finite_folding || 1.50933013033e-21
Coq_Classes_RelationClasses_relation_equivalence || groups828474808id_set || 1.50192458824e-21
Coq_Classes_Morphisms_Normalizes || comm_monoid || 1.46131232532e-21
Coq_Relations_Relation_Operators_clos_refl_trans_n1_0 || lexordp2 || 1.44934863384e-21
Coq_Lists_List_tl || rotate1 || 1.43163545543e-21
Coq_ZArith_Znumtheory_prime_prime || lattic1543629303tr_set || 1.41361618898e-21
Coq_Sets_Uniset_seq || comm_monoid || 1.40833694667e-21
Coq_Relations_Relation_Operators_clos_refl_trans_1n_0 || lexordp2 || 1.40395710177e-21
Coq_ZArith_Znumtheory_Zis_gcd_0 || bNF_Ca1811156065der_on || 1.39994243223e-21
Coq_Numbers_Natural_BigN_BigN_BigN_succ_t || the2 || 1.38912077276e-21
Coq_Numbers_Rational_BigQ_BigQ_BigQ_t || complex || 1.38805451406e-21
Coq_Init_Peano_le_0 || bind4 || 1.32366657809e-21
Coq_Sets_Uniset_incl || groups387199878d_list || 1.32253793744e-21
Coq_Init_Peano_lt || null2 || 1.3178089573e-21
Coq_setoid_ring_BinList_jump || rotate || 1.28709292632e-21
Coq_Init_Peano_le_0 || null2 || 1.27351622914e-21
Coq_Numbers_Natural_BigN_BigN_BigN_pred_t || some || 1.21196529004e-21
Coq_Classes_RelationClasses_relation_equivalence || groups387199878d_list || 1.167950042e-21
Coq_QArith_QArith_base_Q_0 || real || 1.1607624342e-21
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || lattic1543629303tr_set || 1.13942720105e-21
Coq_Reals_Ranalysis1_continuity_pt || semilattice_axioms || 1.12950063506e-21
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || lexordp_eq || 1.07038720328e-21
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || lexordp_eq || 1.07038720328e-21
Coq_Relations_Relation_Operators_clos_refl_trans_n1_0 || lexordp_eq || 1.05571608049e-21
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || pcr_real cr_real || 1.03690892209e-21
Coq_Init_Peano_lt || comple1176932000PREMUM || 1.02198576555e-21
Coq_Reals_Rdefinitions_Rle || is_none || 1.02090097256e-21
Coq_ZArith_Znumtheory_Zis_gcd_0 || order_well_order_on || 9.97329429589e-22
Coq_Setoids_Setoid_Setoid_Theory || equiv_part_equivp || 9.96861311498e-22
__constr_Coq_Init_Datatypes_nat_0_2 || code_nat_of_natural || 9.87484697049e-22
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || lexordp2 || 9.84563436615e-22
Coq_Relations_Relation_Operators_clos_refl_trans_1n_0 || lexordp_eq || 9.52711443934e-22
Coq_Lists_List_ForallPairs || finite_comp_fun_idem || 9.18498343883e-22
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || pcr_rat cr_rat || 9.17504932689e-22
Coq_Reals_Rbasic_fun_Rabs || none || 9.08466541315e-22
Coq_Relations_Relation_Operators_clos_refl_trans_0 || lexordp2 || 8.63323860115e-22
Coq_Reals_Ranalysis1_continuity_pt || abel_semigroup || 8.51439241468e-22
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || monoid_axioms || 8.46746370078e-22
__constr_Coq_Init_Datatypes_nat_0_2 || set || 8.36423959405e-22
Coq_Numbers_Integer_Binary_ZBinary_Z_pow_pos || bind4 || 8.3417519788e-22
Coq_Structures_OrdersEx_Z_as_OT_pow_pos || bind4 || 8.3417519788e-22
Coq_Structures_OrdersEx_Z_as_DT_pow_pos || bind4 || 8.3417519788e-22
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || pcr_int cr_int || 8.16603985307e-22
Coq_Reals_Ranalysis1_continuity_pt || lattic35693393ce_set || 8.1339534933e-22
Coq_Classes_Morphisms_ProperProxy || groups_monoid_list || 7.97891642619e-22
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || im || 7.85278474383e-22
Coq_Reals_Rdefinitions_R0 || zero_Rep || 7.80268090334e-22
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || re || 7.77304252823e-22
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || map_le || 7.68788597067e-22
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || map_le || 7.68788597067e-22
Coq_Classes_Morphisms_Proper || groups387199878d_list || 7.67717446933e-22
Coq_ZArith_Znumtheory_prime_0 || semilattice_neutr || 7.45510946128e-22
Coq_ZArith_BinInt_Z_gcd || bNF_Ca646678531ard_of || 7.42621068974e-22
Coq_ZArith_BinInt_Z_gcd || divmod_nat || 6.89139620675e-22
Coq_Init_Peano_le_0 || is_filter || 6.47732207019e-22
Coq_Classes_Morphisms_Proper || semilattice_neutr || 6.36201038959e-22
Coq_ZArith_BinInt_Z_pow_pos || bind4 || 5.92653769856e-22
Coq_Classes_RelationClasses_relation_equivalence || comm_monoid_axioms || 5.73304850936e-22
__constr_Coq_Numbers_BinNums_Z_0_2 || set || 5.56069184774e-22
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || code_pcr_natural code_cr_natural || 5.38204720902e-22
Coq_Numbers_Natural_BigN_BigN_BigN_omake_op || semilattice || 5.30795227037e-22
Coq_Sets_Relations_2_Rstar1_0 || transitive_tranclp || 4.94384127164e-22
Coq_Reals_Rtrigo_def_sin_n || suc_Rep || 4.79497270235e-22
Coq_Reals_Rtrigo_def_cos_n || suc_Rep || 4.79497270235e-22
Coq_Reals_Rsqrt_def_pow_2_n || suc_Rep || 4.79497270235e-22
__constr_Coq_Init_Datatypes_nat_0_2 || code_int_of_integer || 4.70368144777e-22
Coq_Classes_Morphisms_Proper || groups828474808id_set || 4.32241241627e-22
Coq_Lists_List_ForallOrdPairs_0 || finite852775215axioms || 4.27563087726e-22
Coq_Reals_RIneq_nonzero || suc_Rep || 4.2323402066e-22
Coq_FSets_FMapPositive_PositiveMap_empty || id2 || 4.202666265e-22
Coq_FSets_FMapPositive_PositiveMap_Empty || is_none || 3.90149018498e-22
Coq_PArith_POrderedType_Positive_as_DT_peano_rect || code_rec_natural || 3.78419977674e-22
Coq_PArith_POrderedType_Positive_as_OT_peano_rect || code_rec_natural || 3.78419977674e-22
Coq_Structures_OrdersEx_Positive_as_DT_peano_rect || code_rec_natural || 3.78419977674e-22
Coq_Structures_OrdersEx_Positive_as_OT_peano_rect || code_rec_natural || 3.78419977674e-22
Coq_ZArith_Znumtheory_Bezout_0 || order_well_order_on || 3.75654272748e-22
Coq_Sorting_Sorted_StronglySorted_0 || finite_folding_idem || 3.62736245241e-22
Coq_Init_Specif_proj1_sig || sum_Inl || 3.46052281175e-22
Coq_Init_Specif_proj1_sig || sum_Inr || 3.46052281175e-22
Coq_Numbers_Natural_BigN_BigN_BigN_make_op || lattic35693393ce_set || 3.2347393771e-22
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || implode str || 3.21843830543e-22
Coq_Lists_Streams_EqSt_0 || c_Predicate_Oeq || 3.13144847341e-22
Coq_Lists_List_lel || c_Predicate_Oeq || 3.13144847341e-22
Coq_Numbers_Natural_BigN_BigN_BigN_omake_op || comm_monoid || 3.02468793397e-22
Coq_Setoids_Setoid_Setoid_Theory || transp || 2.79171253893e-22
Coq_FSets_FMapPositive_PositiveMap_empty || none || 2.75724816392e-22
Coq_Arith_PeanoNat_Nat_max || rep_filter || 2.69474611263e-22
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || finite_folding_idem || 2.69143121331e-22
Coq_Classes_Morphisms_ProperProxy || lattic1543629303tr_set || 2.66122920852e-22
Coq_Lists_List_ForallOrdPairs_0 || finite100568337ommute || 2.62634434375e-22
Coq_Setoids_Setoid_Setoid_Theory || symp || 2.50189176449e-22
Coq_Numbers_Natural_BigN_BigN_BigN_divide || trans || 2.43527524574e-22
Coq_NArith_BinNat_N_of_nat || set || 2.4351658435e-22
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || code_pcr_integer code_cr_integer || 2.41004089627e-22
Coq_Vectors_Fin_t_0 || rep_Nat || 2.32932778808e-22
Coq_Reals_Rtopology_adherence || rep_Nat || 2.32932778808e-22
Coq_Numbers_Integer_Binary_ZBinary_Z_pow || comple1176932000PREMUM || 2.18526747823e-22
Coq_Structures_OrdersEx_Z_as_OT_pow || comple1176932000PREMUM || 2.18526747823e-22
Coq_Structures_OrdersEx_Z_as_DT_pow || comple1176932000PREMUM || 2.18526747823e-22
Coq_PArith_POrderedType_Positive_as_DT_peano_rect || rec_nat || 2.15382189401e-22
Coq_PArith_POrderedType_Positive_as_OT_peano_rect || rec_nat || 2.15382189401e-22
Coq_Structures_OrdersEx_Positive_as_DT_peano_rect || rec_nat || 2.15382189401e-22
Coq_Structures_OrdersEx_Positive_as_OT_peano_rect || rec_nat || 2.15382189401e-22
Coq_ZArith_BinInt_Z_pow || comple1176932000PREMUM || 2.09430406082e-22
Coq_Reals_Rtopology_interior || rep_Nat || 2.08042617967e-22
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || groups1716206716st_set || 1.97364477402e-22
Coq_Logic_FinFun_Finite || nat3 || 1.94327621434e-22
Coq_Reals_Rtopology_closed_set || nat3 || 1.94327621434e-22
Coq_NArith_BinNat_N_shiftr_nat || bind4 || 1.92772161212e-22
Coq_PArith_POrderedType_Positive_as_DT_succ || code_Suc || 1.73084792562e-22
Coq_PArith_POrderedType_Positive_as_OT_succ || code_Suc || 1.73084792562e-22
Coq_Structures_OrdersEx_Positive_as_DT_succ || code_Suc || 1.73084792562e-22
Coq_Structures_OrdersEx_Positive_as_OT_succ || code_Suc || 1.73084792562e-22
Coq_ZArith_Zdigits_Z_to_binary || pred3 || 1.68646421859e-22
Coq_ZArith_Zdigits_binary_value || pred3 || 1.68646421859e-22
Coq_NArith_BinNat_N_shiftl_nat || bind4 || 1.631461131e-22
Coq_Classes_Morphisms_Proper || monoid || 1.61300511184e-22
Coq_Numbers_Natural_BigN_BigN_BigN_make_op || groups828474808id_set || 1.57887612888e-22
Coq_Reals_Ranalysis1_derivable_pt_lim || divmod_nat_rel || 1.57488706547e-22
Coq_Sets_Relations_2_Rstar_0 || transitive_rtranclp || 1.5382538547e-22
Coq_Sets_Uniset_incl || finite852775215axioms || 1.51400389867e-22
Coq_Reals_Rtopology_open_set || nat3 || 1.50063113392e-22
Coq_PArith_BinPos_Pos_testbit_nat || bind4 || 1.48507017961e-22
Coq_ZArith_Zpower_Zpower_nat || comple1176932000PREMUM || 1.44684789628e-22
Coq_NArith_Ndigits_N2Bv_gen || pred3 || 1.43095646047e-22
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || trans || 1.3935807617e-22
Coq_FSets_FMapPositive_PositiveMap_Empty || antisym || 1.37993946436e-22
Coq_FSets_FMapPositive_PositiveMap_Empty || sym || 1.36317867278e-22
Coq_Sorting_Sorted_Sorted_0 || finite1921348288axioms || 1.35078850946e-22
Coq_Structures_OrdersEx_Nat_as_DT_add || rep_filter || 1.3380937854e-22
Coq_Structures_OrdersEx_Nat_as_OT_add || rep_filter || 1.3380937854e-22
Coq_ZArith_Zdigits_Z_to_binary || eval || 1.33486195686e-22
Coq_ZArith_Zdigits_binary_value || eval || 1.33486195686e-22
Coq_Arith_PeanoNat_Nat_add || rep_filter || 1.33135541006e-22
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || trans || 1.29104437774e-22
Coq_Structures_OrdersEx_Z_as_OT_divide || trans || 1.29104437774e-22
Coq_Structures_OrdersEx_Z_as_DT_divide || trans || 1.29104437774e-22
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || finite1921348288axioms || 1.23138585687e-22
Coq_Init_Datatypes_identity_0 || c_Predicate_Oeq || 1.2223898989e-22
Coq_Structures_OrdersEx_Nat_as_DT_max || rep_filter || 1.20652502895e-22
Coq_Structures_OrdersEx_Nat_as_OT_max || rep_filter || 1.20652502895e-22
Coq_FSets_FMapPositive_PositiveMap_Empty || trans || 1.16980313177e-22
Coq_PArith_POrderedType_Positive_as_DT_succ || suc || 1.16885303938e-22
Coq_PArith_POrderedType_Positive_as_OT_succ || suc || 1.16885303938e-22
Coq_Structures_OrdersEx_Positive_as_DT_succ || suc || 1.16885303938e-22
Coq_Structures_OrdersEx_Positive_as_OT_succ || suc || 1.16885303938e-22
Coq_Relations_Relation_Operators_clos_refl_0 || transitive_rtranclp || 1.1569914318e-22
Coq_Numbers_Natural_BigN_BigN_BigN_lcm || id_on || 1.12655109183e-22
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || groups828474808id_set || 1.09624221687e-22
Coq_Sorting_Sorted_Sorted_0 || finite_folding || 1.06502850976e-22
Coq_Classes_Morphisms_ProperProxy || monoid_axioms || 1.06408854467e-22
Coq_Sets_Finite_sets_cardinal_0 || monoid || 1.05882827715e-22
Coq_Sets_Finite_sets_Finite_0 || semigroup || 1.04405998459e-22
Coq_Sets_Uniset_seq || finite_comp_fun_idem || 1.03950446466e-22
Coq_NArith_BinNat_N_testbit_nat || bind4 || 1.0242053827e-22
Coq_Init_Nat_add || rep_filter || 1.01612242828e-22
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || comm_monoid || 1.01342333789e-22
Coq_ZArith_Znumtheory_prime_prime || lattic35693393ce_set || 1.00622078578e-22
Coq_PArith_BinPos_Pos_to_nat || set || 9.61027249997e-23
Coq_ZArith_Zpower_Zpower_nat || bind4 || 9.57563092815e-23
Coq_Sets_Cpo_PO_of_cpo || measure || 9.48816268215e-23
Coq_NArith_Ndigits_Bv2N || eval || 9.45577126539e-23
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || finite_folding || 9.30197620734e-23
Coq_Logic_ChoiceFacts_FunctionalChoice_on || equiv_equivp || 8.93569466805e-23
Coq_NArith_BinNat_N_shiftr || comple1176932000PREMUM || 8.78901936003e-23
Coq_PArith_POrderedType_Positive_as_DT_le || trans || 8.22169178853e-23
Coq_PArith_POrderedType_Positive_as_OT_le || trans || 8.22169178853e-23
Coq_Structures_OrdersEx_Positive_as_DT_le || trans || 8.22169178853e-23
Coq_Structures_OrdersEx_Positive_as_OT_le || trans || 8.22169178853e-23
Coq_NArith_BinNat_N_shiftl || comple1176932000PREMUM || 8.14154770865e-23
Coq_PArith_BinPos_Pos_testbit || comple1176932000PREMUM || 8.12552096688e-23
Coq_Sets_Finite_sets_cardinal_0 || semilattice_neutr || 7.90678824113e-23
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || groups387199878d_list || 7.61155382379e-23
Coq_Sets_Finite_sets_Finite_0 || semilattice || 7.39094517255e-23
Coq_PArith_BinPos_Pos_le || trans || 7.31570440603e-23
Coq_Logic_FinFun_Fin2Restrict_extend || id_on || 7.24993604878e-23
Coq_NArith_BinNat_N_leb || map_tailrec || 7.24350128724e-23
Coq_Classes_SetoidClass_equiv || rep_filter || 6.92214785663e-23
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || map_le || 6.88580780221e-23
Coq_Classes_CRelationClasses_Equivalence_0 || abel_semigroup || 6.33691322753e-23
Coq_Numbers_Natural_BigN_BigN_BigN_mul || id_on || 6.28296331203e-23
Coq_Sets_Ensembles_Inhabited_0 || semigroup || 6.26750895795e-23
Coq_NArith_BinNat_N_to_nat || set || 6.26242188899e-23
Coq_Sets_Ensembles_Included || sum_isl || 6.24695098198e-23
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lcm || id_on || 5.88385222425e-23
Coq_Sets_Ensembles_Union_0 || sum_Inl || 5.7835134406e-23
Coq_NArith_BinNat_N_testbit || comple1176932000PREMUM || 5.77034589479e-23
Coq_ZArith_Znumtheory_prime_0 || semilattice || 5.65457970112e-23
Coq_Sets_Uniset_incl || finite100568337ommute || 5.63825005218e-23
Coq_ZArith_Zgcd_alt_Zgcd_alt || id_on || 5.50108024952e-23
Coq_Numbers_Integer_Binary_ZBinary_Z_lcm || id_on || 5.49560874415e-23
Coq_Structures_OrdersEx_Z_as_OT_lcm || id_on || 5.49560874415e-23
Coq_Structures_OrdersEx_Z_as_DT_lcm || id_on || 5.49560874415e-23
Coq_Logic_FinFun_bFun || trans || 5.06996621967e-23
Coq_Sets_Ensembles_In || monoid || 5.05177594616e-23
Coq_ZArith_Znumtheory_Bezout_0 || groups828474808id_set || 5.02667945255e-23
Coq_Sets_Cpo_PO_of_cpo || measures || 5.00871559315e-23
Coq_NArith_Ndigits_Bv2N || pred3 || 4.96433422935e-23
Coq_ZArith_Znumtheory_Zis_gcd_0 || refl_on || 4.78341750794e-23
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || comm_monoid_axioms || 4.7749278765e-23
Coq_NArith_Ndigits_N2Bv_gen || eval || 4.77241197828e-23
Coq_Sets_Finite_sets_Finite_0 || abel_semigroup || 4.7076080209e-23
Coq_Classes_Morphisms_Normalizes || finite_comp_fun_idem || 4.68351487669e-23
Coq_Sets_Finite_sets_cardinal_0 || comm_monoid || 4.67683058956e-23
Coq_ZArith_Znumtheory_Zis_gcd_0 || groups1716206716st_set || 4.66489006234e-23
Coq_Sets_Cpo_Complete_0 || wf || 4.60033258631e-23
Coq_Init_Peano_lt || equiv_equivp || 4.36613757756e-23
Coq_PArith_POrderedType_Positive_as_DT_max || transitive_trancl || 4.29123565618e-23
Coq_PArith_POrderedType_Positive_as_OT_max || transitive_trancl || 4.29123565618e-23
Coq_Structures_OrdersEx_Positive_as_DT_max || transitive_trancl || 4.29123565618e-23
Coq_Structures_OrdersEx_Positive_as_OT_max || transitive_trancl || 4.29123565618e-23
Coq_Numbers_Natural_BigN_BigN_BigN_lcm || transitive_trancl || 4.16791234175e-23
Coq_Logic_ChoiceFacts_RelationalChoice_on || equiv_part_equivp || 4.10955206975e-23
Coq_ZArith_BinInt_Z_divide || trans || 4.00030405381e-23
Coq_Numbers_Natural_BigN_BigN_BigN_lcm || transitive_rtrancl || 3.94793088424e-23
Coq_Sets_Ensembles_Inhabited_0 || semilattice || 3.93716779461e-23
Coq_PArith_BinPos_Pos_max || transitive_trancl || 3.78969563631e-23
Coq_Numbers_Natural_BigN_BigN_BigN_divide || antisym || 3.75062925228e-23
Coq_ZArith_BinInt_Z_of_nat || set || 3.73471809965e-23
Coq_Numbers_Natural_BigN_BigN_BigN_divide || sym || 3.71692350184e-23
Coq_ZArith_Znumtheory_Zis_gcd_0 || comm_monoid || 3.51543521908e-23
Coq_PArith_BinPos_Pos_testbit || bind4 || 3.47833963534e-23
Coq_Numbers_Integer_BigZ_BigZ_BigZ_mul || id_on || 3.46710841683e-23
Coq_Logic_ChoiceFacts_RelationalChoice_on || reflp || 3.45649903742e-23
Coq_NArith_BinNat_N_shiftr || bind4 || 3.42270734518e-23
Coq_ZArith_Znumtheory_Zis_gcd_0 || finite_folding_idem || 3.40486965383e-23
Coq_Sets_Ensembles_In || semilattice_neutr || 3.35343276292e-23
Coq_NArith_BinNat_N_shiftl || bind4 || 3.30032591744e-23
Coq_QArith_QArith_base_Qle || trans || 3.28579658372e-23
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || id_on || 3.23578046551e-23
Coq_Structures_OrdersEx_Z_as_OT_mul || id_on || 3.23578046551e-23
Coq_Structures_OrdersEx_Z_as_DT_mul || id_on || 3.23578046551e-23
Coq_Classes_CRelationClasses_RewriteRelation_0 || abel_s1917375468axioms || 3.15343808478e-23
Coq_QArith_Qabs_Qabs || id2 || 3.14833460865e-23
Coq_ZArith_Znumtheory_Bezout_0 || comm_monoid_axioms || 3.08568660871e-23
Coq_ZArith_Znumtheory_Bezout_0 || finite1921348288axioms || 3.07239494466e-23
Coq_Logic_ChoiceFacts_GuardedRelationalChoice_on || equiv_equivp || 3.01274889361e-23
Coq_Numbers_Natural_BigN_BigN_BigN_mul || transitive_trancl || 3.01192606599e-23
Coq_Sets_Ensembles_Inhabited_0 || abel_semigroup || 2.98728093876e-23
Coq_ZArith_Znumtheory_Bezout_0 || groups387199878d_list || 2.97954482841e-23
Coq_Numbers_Natural_BigN_BigN_BigN_mul || transitive_rtrancl || 2.8952070751e-23
Coq_PArith_POrderedType_Positive_as_DT_max || id_on || 2.88169833516e-23
Coq_PArith_POrderedType_Positive_as_OT_max || id_on || 2.88169833516e-23
Coq_Structures_OrdersEx_Positive_as_DT_max || id_on || 2.88169833516e-23
Coq_Structures_OrdersEx_Positive_as_OT_max || id_on || 2.88169833516e-23
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || c_Predicate_Oeq || 2.80796168971e-23
Coq_ZArith_Zdiv_eqm || c_Predicate_Oeq || 2.80796168971e-23
Coq_Sets_Relations_3_coherent || semila1450535954axioms || 2.79567619654e-23
Coq_NArith_BinNat_N_shiftr_nat || comple1176932000PREMUM || 2.7788063258e-23
Coq_Numbers_Integer_Binary_ZBinary_Z_min || induct_conj || 2.66792799004e-23
Coq_Structures_OrdersEx_Z_as_OT_min || induct_conj || 2.66792799004e-23
Coq_Structures_OrdersEx_Z_as_DT_min || induct_conj || 2.66792799004e-23
Coq_Numbers_Integer_Binary_ZBinary_Z_add || induct_implies || 2.60502630279e-23
Coq_Structures_OrdersEx_Z_as_OT_add || induct_implies || 2.60502630279e-23
Coq_Structures_OrdersEx_Z_as_DT_add || induct_implies || 2.60502630279e-23
Coq_Numbers_Integer_Binary_ZBinary_Z_max || induct_conj || 2.57130865428e-23
Coq_Structures_OrdersEx_Z_as_OT_max || induct_conj || 2.57130865428e-23
Coq_Structures_OrdersEx_Z_as_DT_max || induct_conj || 2.57130865428e-23
Coq_NArith_BinNat_N_shiftl_nat || comple1176932000PREMUM || 2.55050754594e-23
Coq_PArith_BinPos_Pos_max || id_on || 2.52790682736e-23
Coq_Relations_Relation_Operators_clos_refl_trans_0 || map_le || 2.51402059015e-23
Coq_NArith_Ndec_Nleb || map || 2.5133503187e-23
Coq_Reals_Rtopology_included || is_none || 2.50148644894e-23
Coq_PArith_BinPos_Pos_testbit_nat || comple1176932000PREMUM || 2.4743141352e-23
Coq_Classes_RelationClasses_relation_equivalence || finite852775215axioms || 2.41077380083e-23
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || equiv_part_equivp || 2.38835108454e-23
Coq_Sets_Ensembles_In || comm_monoid || 2.37862047819e-23
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lcm || transitive_trancl || 2.30540945728e-23
Coq_NArith_BinNat_N_testbit || bind4 || 2.2440496517e-23
Coq_Init_Peano_le_0 || equiv_part_equivp || 2.22894309026e-23
Coq_Logic_FinFun_bFun || antisym || 2.1959541432e-23
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lcm || transitive_rtrancl || 2.19040815575e-23
Coq_Logic_FinFun_bFun || sym || 2.1697870775e-23
Coq_Numbers_Integer_Binary_ZBinary_Z_lcm || transitive_trancl || 2.14439725104e-23
Coq_Structures_OrdersEx_Z_as_OT_lcm || transitive_trancl || 2.14439725104e-23
Coq_Structures_OrdersEx_Z_as_DT_lcm || transitive_trancl || 2.14439725104e-23
Coq_QArith_Qminmax_Qmax || id_on || 2.10614860089e-23
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || reflp || 2.08296628469e-23
Coq_Classes_CRelationClasses_RewriteRelation_0 || semigroup || 2.05880866125e-23
Coq_ZArith_Zdigits_Z_to_binary || the2 || 2.04160756328e-23
Coq_Init_Peano_le_0 || reflp || 2.04123747507e-23
Coq_Numbers_Integer_Binary_ZBinary_Z_lcm || transitive_rtrancl || 2.03736957523e-23
Coq_Structures_OrdersEx_Z_as_OT_lcm || transitive_rtrancl || 2.03736957523e-23
Coq_Structures_OrdersEx_Z_as_DT_lcm || transitive_rtrancl || 2.03736957523e-23
__constr_Coq_Init_Specif_sig_0_1 || product_Pair || 2.03095972533e-23
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || antisym || 2.01884029015e-23
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || sym || 2.00097677236e-23
Coq_ZArith_Znumtheory_Bezout_0 || finite_folding || 1.96177079413e-23
Coq_ZArith_BinInt_Z_lcm || id_on || 1.9147151457e-23
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || antisym || 1.88114988933e-23
Coq_Structures_OrdersEx_Z_as_OT_divide || antisym || 1.88114988933e-23
Coq_Structures_OrdersEx_Z_as_DT_divide || antisym || 1.88114988933e-23
Coq_ZArith_BinInt_Z_gcd || id_on || 1.86618985089e-23
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || sym || 1.86459493995e-23
Coq_Structures_OrdersEx_Z_as_OT_divide || sym || 1.86459493995e-23
Coq_Structures_OrdersEx_Z_as_DT_divide || sym || 1.86459493995e-23
Coq_Sets_Relations_3_Confluent || transitive_acyclic || 1.82855249519e-23
Coq_NArith_BinNat_N_testbit_nat || comple1176932000PREMUM || 1.82824171131e-23
Coq_QArith_QArith_base_Qle || antisym || 1.76049940876e-23
Coq_NArith_Ndigits_N2Bv_gen || the2 || 1.75601484623e-23
Coq_Numbers_Integer_BigZ_BigZ_BigZ_mul || transitive_trancl || 1.70496606008e-23
Coq_Reals_Rtopology_adherence || none || 1.69517213434e-23
Coq_Lists_List_rev || basic_BNF_xtor || 1.65328358042e-23
Coq_Numbers_Integer_BigZ_BigZ_BigZ_mul || transitive_rtrancl || 1.64119130649e-23
Coq_PArith_POrderedType_Positive_as_DT_lt || bNF_Wellorder_wo_rel || 1.62131593562e-23
Coq_PArith_POrderedType_Positive_as_OT_lt || bNF_Wellorder_wo_rel || 1.62131593562e-23
Coq_Structures_OrdersEx_Positive_as_DT_lt || bNF_Wellorder_wo_rel || 1.62131593562e-23
Coq_Structures_OrdersEx_Positive_as_OT_lt || bNF_Wellorder_wo_rel || 1.62131593562e-23
Coq_ZArith_Zdigits_binary_value || some || 1.61006451153e-23
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || transitive_trancl || 1.5862671895e-23
Coq_Structures_OrdersEx_Z_as_OT_mul || transitive_trancl || 1.5862671895e-23
Coq_Structures_OrdersEx_Z_as_DT_mul || transitive_trancl || 1.5862671895e-23
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || transitive_rtrancl || 1.52688610903e-23
Coq_Structures_OrdersEx_Z_as_OT_mul || transitive_rtrancl || 1.52688610903e-23
Coq_Structures_OrdersEx_Z_as_DT_mul || transitive_rtrancl || 1.52688610903e-23
Coq_Classes_RelationClasses_relation_equivalence || finite100568337ommute || 1.49846468852e-23
Coq_PArith_BinPos_Pos_lt || bNF_Wellorder_wo_rel || 1.41078697409e-23
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || pred_maxchain || 1.33097311926e-23
Coq_Classes_RelationClasses_Symmetric || is_filter || 1.3123487354e-23
Coq_Reals_Rtopology_adherence || id2 || 1.30238927338e-23
Coq_Classes_RelationClasses_Reflexive || is_filter || 1.28294386641e-23
Coq_Sets_Relations_2_Strongly_confluent || wf || 1.28115772487e-23
Coq_Classes_RelationClasses_Transitive || is_filter || 1.25522434e-23
Coq_PArith_POrderedType_Positive_as_DT_max || transitive_rtrancl || 1.24075124543e-23
Coq_PArith_POrderedType_Positive_as_OT_max || transitive_rtrancl || 1.24075124543e-23
Coq_Structures_OrdersEx_Positive_as_DT_max || transitive_rtrancl || 1.24075124543e-23
Coq_Structures_OrdersEx_Positive_as_OT_max || transitive_rtrancl || 1.24075124543e-23
Coq_Numbers_Integer_Binary_ZBinary_Z_max || induct_implies || 1.20835199992e-23
Coq_Structures_OrdersEx_Z_as_OT_max || induct_implies || 1.20835199992e-23
Coq_Structures_OrdersEx_Z_as_DT_max || induct_implies || 1.20835199992e-23
Coq_Numbers_Integer_Binary_ZBinary_Z_min || induct_implies || 1.18956663075e-23
Coq_Structures_OrdersEx_Z_as_OT_min || induct_implies || 1.18956663075e-23
Coq_Structures_OrdersEx_Z_as_DT_min || induct_implies || 1.18956663075e-23
Coq_Logic_FinFun_Fin2Restrict_extend || transitive_trancl || 1.18897329776e-23
Coq_QArith_QArith_base_Qle || sym || 1.18838232629e-23
Coq_NArith_Ndigits_Bv2N || some || 1.17422902409e-23
Coq_Sorting_Heap_is_heap_0 || pred_option || 1.16024707876e-23
Coq_Arith_Between_in_int || monoid || 1.12794752608e-23
Coq_Logic_FinFun_Fin2Restrict_extend || transitive_rtrancl || 1.10859858581e-23
Coq_Sets_Relations_2_Rstar_0 || semilattice_order || 1.10846849684e-23
Coq_PArith_BinPos_Pos_max || transitive_rtrancl || 1.09827823219e-23
Coq_Classes_CRelationClasses_Equivalence_0 || equiv_equivp || 1.08724633618e-23
Coq_Numbers_Natural_BigN_BigN_BigN_pred_t || bNF_Ca646678531ard_of || 1.016752761e-23
Coq_Classes_RelationClasses_Equivalence_0 || is_filter || 9.9552075541e-24
Coq_Relations_Relation_Operators_clos_trans_0 || pred_maxchain || 9.74580748167e-24
Coq_ZArith_BinInt_Z_mul || id_on || 9.44031794861e-24
Coq_QArith_QArith_base_Qlt || bNF_Wellorder_wo_rel || 9.42428337756e-24
Coq_PArith_POrderedType_Positive_as_DT_le || antisym || 9.13365189573e-24
Coq_PArith_POrderedType_Positive_as_OT_le || antisym || 9.13365189573e-24
Coq_Structures_OrdersEx_Positive_as_DT_le || antisym || 9.13365189573e-24
Coq_Structures_OrdersEx_Positive_as_OT_le || antisym || 9.13365189573e-24
Coq_ZArith_Znumtheory_prime_prime || groups828474808id_set || 8.87078278371e-24
__constr_Coq_Init_Specif_sigT_0_1 || product_Pair || 8.60732124534e-24
Coq_PArith_BinPos_Pos_le || antisym || 8.01629149888e-24
Coq_Numbers_Natural_BigN_BigN_BigN_succ_t || field2 || 7.74492550053e-24
Coq_Relations_Relation_Definitions_preorder_0 || trans || 7.66240683941e-24
Coq_Logic_ChoiceFacts_FunctionalChoice_on || bNF_Wellorder_wo_rel || 7.57059825673e-24
Coq_Logic_EqdepFacts_Inj_dep_pair_on || semilattice_order || 7.45918300903e-24
Coq_Reals_Ranalysis1_derivable_pt || abel_semigroup || 7.39058555848e-24
Coq_Relations_Relation_Operators_clos_refl_trans_0 || pred_maxchain || 7.35848803531e-24
Coq_Reals_Rbasic_fun_Rmax || induct_conj || 7.07406536741e-24
Coq_ZArith_BinInt_Z_lcm || transitive_trancl || 7.0708030497e-24
Coq_Logic_EqdepFacts_Eq_dep_eq_on || lattic1693879045er_set || 6.99570518518e-24
Coq_Reals_Rbasic_fun_Rmin || induct_conj || 6.82860445394e-24
Coq_ZArith_BinInt_Z_lcm || transitive_rtrancl || 6.71483328884e-24
Coq_Reals_Rdefinitions_Rplus || induct_implies || 6.5385669234e-24
Coq_Relations_Relation_Operators_clos_refl_trans_0 || id_on || 6.367447074e-24
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || pred_chain || 6.33181322472e-24
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || pred_chain || 6.33181322472e-24
Coq_ZArith_Znumtheory_prime_0 || comm_monoid || 6.09243107105e-24
Coq_ZArith_BinInt_Z_divide || antisym || 6.05325824295e-24
__constr_Coq_Sorting_Heap_Tree_0_1 || none || 6.01904256913e-24
Coq_ZArith_BinInt_Z_divide || sym || 6.00355113e-24
Coq_Init_Peano_lt || semigroup || 5.96743505508e-24
Coq_QArith_Qminmax_Qmax || transitive_trancl || 5.56836468351e-24
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || pred_chain || 5.47365805601e-24
Coq_Logic_EqdepFacts_Inj_dep_pair_on || pred_chain || 5.35250820434e-24
Coq_Relations_Relation_Operators_clos_trans_0 || pred_chain || 5.34394884851e-24
Coq_QArith_Qminmax_Qmax || transitive_rtrancl || 5.29851528167e-24
Coq_Relations_Relation_Operators_clos_trans_n1_0 || pred_chain || 5.10543071275e-24
Coq_Relations_Relation_Operators_clos_trans_1n_0 || pred_chain || 5.10543071275e-24
Coq_Logic_EqdepFacts_Eq_dep_eq_on || pred_maxchain || 5.01255839774e-24
Coq_ZArith_BinInt_Z_min || induct_conj || 4.91023960386e-24
Coq_PArith_POrderedType_Positive_as_DT_le || sym || 4.83419531239e-24
Coq_PArith_POrderedType_Positive_as_OT_le || sym || 4.83419531239e-24
Coq_Structures_OrdersEx_Positive_as_DT_le || sym || 4.83419531239e-24
Coq_Structures_OrdersEx_Positive_as_OT_le || sym || 4.83419531239e-24
Coq_ZArith_BinInt_Z_mul || transitive_trancl || 4.73136508748e-24
Coq_Reals_Rtopology_included || antisym || 4.66223890147e-24
Coq_Reals_Rtopology_included || sym || 4.60913568738e-24
Coq_ZArith_BinInt_Z_mul || transitive_rtrancl || 4.56914747763e-24
Coq_PArith_POrderedType_Positive_as_DT_SubMaskSpec_0 || divmod_nat_rel || 4.48014243454e-24
Coq_PArith_POrderedType_Positive_as_OT_SubMaskSpec_0 || divmod_nat_rel || 4.48014243454e-24
Coq_Structures_OrdersEx_Positive_as_DT_SubMaskSpec_0 || divmod_nat_rel || 4.48014243454e-24
Coq_Structures_OrdersEx_Positive_as_OT_SubMaskSpec_0 || divmod_nat_rel || 4.48014243454e-24
Coq_ZArith_BinInt_Z_max || induct_conj || 4.46645260894e-24
Coq_Logic_EqdepFacts_Inj_dep_pair_on || lexordp_eq || 4.42664611026e-24
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || set || 4.25302227177e-24
Coq_Structures_OrdersEx_Z_as_OT_opp || set || 4.25302227177e-24
Coq_Structures_OrdersEx_Z_as_DT_opp || set || 4.25302227177e-24
Coq_PArith_BinPos_Pos_le || sym || 4.25277686235e-24
Coq_ZArith_BinInt_Z_add || induct_implies || 4.0749565691e-24
Coq_PArith_BinPos_Pos_SubMaskSpec_0 || divmod_nat_rel || 3.99223006129e-24
Coq_Reals_Rtopology_included || trans || 3.99145880881e-24
Coq_Classes_CRelationClasses_RewriteRelation_0 || equiv_part_equivp || 3.9488811828e-24
Coq_Logic_ChoiceFacts_RelationalChoice_on || antisym || 3.91966990191e-24
Coq_Relations_Relation_Operators_clos_trans_0 || lexordp_eq || 3.88113563789e-24
Coq_Relations_Relation_Operators_clos_trans_n1_0 || pred_maxchain || 3.79049398464e-24
Coq_Relations_Relation_Operators_clos_trans_1n_0 || pred_maxchain || 3.79049398464e-24
Coq_Relations_Relation_Operators_clos_refl_trans_n1_0 || pred_chain || 3.77112979441e-24
Coq_Arith_Between_between_0 || c_Predicate_Oeq || 3.72650851212e-24
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || finite_comp_fun_idem || 3.69650068091e-24
Coq_Relations_Relation_Operators_clos_refl_trans_1n_0 || pred_chain || 3.63996523541e-24
Coq_PArith_POrderedType_Positive_as_DT_sub_mask || divmod_nat || 3.61277300622e-24
Coq_PArith_POrderedType_Positive_as_OT_sub_mask || divmod_nat || 3.61277300622e-24
Coq_Structures_OrdersEx_Positive_as_DT_sub_mask || divmod_nat || 3.61277300622e-24
Coq_Structures_OrdersEx_Positive_as_OT_sub_mask || divmod_nat || 3.61277300622e-24
Coq_Relations_Relation_Operators_clos_refl_trans_0 || pred_chain || 3.60511886579e-24
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || pred_maxchain || 3.51628948946e-24
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || pred_maxchain || 3.51628948946e-24
Coq_Sorting_Sorted_StronglySorted_0 || finite_comp_fun_idem || 3.50023761465e-24
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || id_on || 3.451539205e-24
Coq_Classes_CRelationClasses_RewriteRelation_0 || reflp || 3.34594755668e-24
Coq_Logic_ChoiceFacts_RelationalChoice_on || trans || 3.25622017944e-24
Coq_Reals_Rbasic_fun_Rmin || induct_implies || 3.25389581374e-24
Coq_Reals_Rbasic_fun_Rmax || induct_implies || 3.20355077469e-24
Coq_PArith_BinPos_Pos_sub_mask || divmod_nat || 3.17969089196e-24
Coq_Relations_Relation_Definitions_equivalence_0 || trans || 3.15292706495e-24
Coq_ZArith_Zsqrt_compat_Zsqrt_plain || groups_monoid_list || 3.14749940378e-24
Coq_Logic_EqdepFacts_Eq_dep_eq_on || lexordp2 || 3.08644739146e-24
Coq_Relations_Relation_Operators_clos_trans_0 || lexordp2 || 2.96215885708e-24
Coq_Reals_AltSeries_PI_tg || zero_Rep || 2.72915416339e-24
Coq_Logic_ChoiceFacts_GuardedRelationalChoice_on || bNF_Wellorder_wo_rel || 2.62181906414e-24
Coq_Numbers_Integer_Binary_ZBinary_Z_shiftr || bind4 || 2.60048264742e-24
Coq_Numbers_Integer_Binary_ZBinary_Z_shiftl || bind4 || 2.60048264742e-24
Coq_Structures_OrdersEx_Z_as_OT_shiftr || bind4 || 2.60048264742e-24
Coq_Structures_OrdersEx_Z_as_OT_shiftl || bind4 || 2.60048264742e-24
Coq_Structures_OrdersEx_Z_as_DT_shiftr || bind4 || 2.60048264742e-24
Coq_Structures_OrdersEx_Z_as_DT_shiftl || bind4 || 2.60048264742e-24
Coq_Relations_Relation_Operators_clos_refl_trans_n1_0 || pred_maxchain || 2.49841045769e-24
Coq_Relations_Relation_Operators_clos_refl_trans_1n_0 || pred_maxchain || 2.38637535862e-24
Coq_Relations_Relation_Definitions_preorder_0 || antisym || 2.34915258955e-24
Coq_Relations_Relation_Definitions_preorder_0 || sym || 2.31848128205e-24
Coq_Reals_Ranalysis1_continuity_pt || abel_s1917375468axioms || 2.29640159913e-24
Coq_Reals_Ranalysis1_derivable_pt || equiv_equivp || 2.29381977642e-24
Coq_ZArith_BinInt_Z_max || induct_implies || 2.28025786839e-24
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || finite852775215axioms || 2.27279723953e-24
Coq_Lists_List_In || sum_isl || 2.21877775212e-24
Coq_Relations_Relation_Operators_clos_trans_n1_0 || lexordp2 || 2.2001241428e-24
Coq_Relations_Relation_Operators_clos_trans_1n_0 || lexordp2 || 2.2001241428e-24
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || antisym || 2.19350603118e-24
Coq_ZArith_BinInt_Z_min || induct_implies || 2.18288467391e-24
Coq_ZArith_BinInt_Z_sqrt || monoid || 2.06347960726e-24
Coq_ZArith_Znumtheory_Bezout_0 || finite852775215axioms || 2.04505706154e-24
Coq_Init_Wf_well_founded || is_filter || 1.96159060801e-24
Coq_Arith_Wf_nat_gtof || rep_filter || 1.93211316413e-24
Coq_Arith_Wf_nat_ltof || rep_filter || 1.93211316413e-24
Coq_Reals_SeqProp_Un_decreasing || nat3 || 1.92267091256e-24
Coq_Relations_Relation_Operators_clos_trans_n1_0 || lexordp_eq || 1.91654722044e-24
Coq_Relations_Relation_Operators_clos_trans_1n_0 || lexordp_eq || 1.91654722044e-24
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || trans || 1.90187621427e-24
Coq_PArith_POrderedType_Positive_as_DT_sub_mask || bNF_Ca646678531ard_of || 1.79112272106e-24
Coq_PArith_POrderedType_Positive_as_OT_sub_mask || bNF_Ca646678531ard_of || 1.79112272106e-24
Coq_Structures_OrdersEx_Positive_as_DT_sub_mask || bNF_Ca646678531ard_of || 1.79112272106e-24
Coq_Structures_OrdersEx_Positive_as_OT_sub_mask || bNF_Ca646678531ard_of || 1.79112272106e-24
Coq_PArith_POrderedType_Positive_as_DT_sub_mask_carry || bind4 || 1.7790101706e-24
Coq_PArith_POrderedType_Positive_as_OT_sub_mask_carry || bind4 || 1.7790101706e-24
Coq_Structures_OrdersEx_Positive_as_DT_sub_mask_carry || bind4 || 1.7790101706e-24
Coq_Structures_OrdersEx_Positive_as_OT_sub_mask_carry || bind4 || 1.7790101706e-24
Coq_Lists_List_incl || c_Predicate_Oeq || 1.76757181162e-24
Coq_Sorting_Sorted_Sorted_0 || finite852775215axioms || 1.7601129038e-24
Coq_Reals_Ranalysis1_continuity_pt || semigroup || 1.75132714683e-24
Coq_Numbers_Integer_Binary_ZBinary_Z_sub || bind4 || 1.75069797568e-24
Coq_Structures_OrdersEx_Z_as_OT_sub || bind4 || 1.75069797568e-24
Coq_Structures_OrdersEx_Z_as_DT_sub || bind4 || 1.75069797568e-24
Coq_ZArith_Znumtheory_Zis_gcd_0 || finite_comp_fun_idem || 1.73324693944e-24
Coq_Numbers_Integer_Binary_ZBinary_Z_shiftr || comple1176932000PREMUM || 1.70528487359e-24
Coq_Numbers_Integer_Binary_ZBinary_Z_shiftl || comple1176932000PREMUM || 1.70528487359e-24
Coq_Structures_OrdersEx_Z_as_OT_shiftr || comple1176932000PREMUM || 1.70528487359e-24
Coq_Structures_OrdersEx_Z_as_OT_shiftl || comple1176932000PREMUM || 1.70528487359e-24
Coq_Structures_OrdersEx_Z_as_DT_shiftr || comple1176932000PREMUM || 1.70528487359e-24
Coq_Structures_OrdersEx_Z_as_DT_shiftl || comple1176932000PREMUM || 1.70528487359e-24
__constr_Coq_Init_Datatypes_list_0_2 || sum_Inl || 1.70116360018e-24
Coq_PArith_BinPos_Pos_sub_mask || bNF_Ca646678531ard_of || 1.5932442655e-24
Coq_Relations_Relation_Operators_clos_refl_trans_0 || transitive_trancl || 1.59160560071e-24
Coq_Numbers_Integer_Binary_ZBinary_Z_add || bind4 || 1.56912475245e-24
Coq_Structures_OrdersEx_Z_as_OT_add || bind4 || 1.56912475245e-24
Coq_Structures_OrdersEx_Z_as_DT_add || bind4 || 1.56912475245e-24
Coq_Relations_Relation_Operators_clos_refl_trans_0 || transitive_rtrancl || 1.50391360366e-24
Coq_Bool_Bool_Is_true || nat_is_nat || 1.47221854282e-24
Coq_ZArith_BinInt_Z_opp || set || 1.45977193464e-24
Coq_ZArith_Zsqrt_compat_Zsqrt_plain || lattic1543629303tr_set || 1.43339244196e-24
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || finite100568337ommute || 1.37823034929e-24
Coq_Init_Datatypes_andb || nat_tsub || 1.25486918659e-24
Coq_Relations_Relation_Definitions_inclusion || divmod_nat_rel || 1.24847430407e-24
Coq_Numbers_Integer_Binary_ZBinary_Z_sub || comple1176932000PREMUM || 1.20845742105e-24
Coq_Structures_OrdersEx_Z_as_OT_sub || comple1176932000PREMUM || 1.20845742105e-24
Coq_Structures_OrdersEx_Z_as_DT_sub || comple1176932000PREMUM || 1.20845742105e-24
Coq_Numbers_Natural_BigN_BigN_BigN_succ || none || 1.18566959235e-24
Coq_Numbers_Integer_Binary_ZBinary_Z_add || comple1176932000PREMUM || 1.15201026254e-24
Coq_Structures_OrdersEx_Z_as_OT_add || comple1176932000PREMUM || 1.15201026254e-24
Coq_Structures_OrdersEx_Z_as_DT_add || comple1176932000PREMUM || 1.15201026254e-24
Coq_Sorting_Sorted_Sorted_0 || finite100568337ommute || 1.14987817549e-24
Coq_Relations_Relation_Definitions_equivalence_0 || antisym || 1.14141766394e-24
Coq_Relations_Relation_Definitions_equivalence_0 || sym || 1.12836625607e-24
Coq_PArith_POrderedType_Positive_as_DT_SubMaskSpec_0 || order_well_order_on || 1.12187651902e-24
Coq_PArith_POrderedType_Positive_as_OT_SubMaskSpec_0 || order_well_order_on || 1.12187651902e-24
Coq_Structures_OrdersEx_Positive_as_DT_SubMaskSpec_0 || order_well_order_on || 1.12187651902e-24
Coq_Structures_OrdersEx_Positive_as_OT_SubMaskSpec_0 || order_well_order_on || 1.12187651902e-24
Coq_Numbers_Natural_Binary_NBinary_N_succ || none || 1.11701406394e-24
Coq_Structures_OrdersEx_N_as_OT_succ || none || 1.11701406394e-24
Coq_Structures_OrdersEx_N_as_DT_succ || none || 1.11701406394e-24
Coq_Arith_Wf_nat_inv_lt_rel || rep_filter || 1.0937809475e-24
Coq_Sets_Partial_Order_Carrier_of || id_on || 1.0729188077e-24
Coq_Relations_Relation_Operators_clos_trans_0 || divmod_nat || 1.04960457369e-24
Coq_PArith_POrderedType_Positive_as_DT_SubMaskSpec_0 || bNF_Ca1811156065der_on || 1.03863926216e-24
Coq_PArith_POrderedType_Positive_as_OT_SubMaskSpec_0 || bNF_Ca1811156065der_on || 1.03863926216e-24
Coq_Structures_OrdersEx_Positive_as_DT_SubMaskSpec_0 || bNF_Ca1811156065der_on || 1.03863926216e-24
Coq_Structures_OrdersEx_Positive_as_OT_SubMaskSpec_0 || bNF_Ca1811156065der_on || 1.03863926216e-24
Coq_ZArith_BinInt_Z_sqrt || semilattice_neutr || 1.0144576991e-24
Coq_NArith_BinNat_N_succ || none || 1.0119161152e-24
Coq_PArith_BinPos_Pos_SubMaskSpec_0 || order_well_order_on || 1.00643518152e-24
Coq_ZArith_BinInt_Z_lt || bind4 || 9.83649965532e-25
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || none || 9.55182773302e-25
Coq_Structures_OrdersEx_Z_as_OT_succ || none || 9.55182773302e-25
Coq_Structures_OrdersEx_Z_as_DT_succ || none || 9.55182773302e-25
Coq_ZArith_BinInt_Z_shiftr || bind4 || 9.49494212371e-25
Coq_ZArith_BinInt_Z_shiftl || bind4 || 9.49494212371e-25
Coq_ZArith_Znumtheory_Bezout_0 || finite100568337ommute || 9.35915369006e-25
Coq_PArith_BinPos_Pos_SubMaskSpec_0 || bNF_Ca1811156065der_on || 9.31536318688e-25
Coq_Numbers_Integer_BigZ_BigZ_BigZ_succ || none || 9.1836995301e-25
Coq_Relations_Relation_Operators_clos_trans_0 || bNF_Ca646678531ard_of || 8.61316662375e-25
Coq_Lists_List_rev || transitive_trancl || 8.34215786444e-25
Coq_PArith_POrderedType_Positive_as_DT_add || rep_filter || 8.03750068105e-25
Coq_PArith_POrderedType_Positive_as_OT_add || rep_filter || 8.03750068105e-25
Coq_Structures_OrdersEx_Positive_as_DT_add || rep_filter || 8.03750068105e-25
Coq_Structures_OrdersEx_Positive_as_OT_add || rep_filter || 8.03750068105e-25
Coq_ZArith_BinInt_Z_Odd || monoid || 7.88604375659e-25
Coq_Classes_Morphisms_ProperProxy || groups828474808id_set || 7.81572176054e-25
Coq_Sets_Ensembles_Inhabited_0 || trans || 7.77537996967e-25
Coq_ZArith_Zeven_Zodd || groups_monoid_list || 7.4218710059e-25
Coq_Numbers_Natural_BigN_BigN_BigN_lt || is_none || 7.40261124279e-25
Coq_ZArith_BinInt_Z_le || comple1176932000PREMUM || 7.24734285385e-25
Coq_ZArith_BinInt_Z_pred || set || 7.22642932669e-25
Coq_Numbers_Natural_BigN_BigN_BigN_le || is_none || 7.17209522628e-25
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || transitive_trancl || 7.1356086008e-25
Coq_PArith_POrderedType_Positive_as_DT_sub_mask || comple1176932000PREMUM || 7.07064286241e-25
Coq_PArith_POrderedType_Positive_as_OT_sub_mask || comple1176932000PREMUM || 7.07064286241e-25
Coq_Structures_OrdersEx_Positive_as_DT_sub_mask || comple1176932000PREMUM || 7.07064286241e-25
Coq_Structures_OrdersEx_Positive_as_OT_sub_mask || comple1176932000PREMUM || 7.07064286241e-25
Coq_Logic_EqdepFacts_Inj_dep_pair_on || transitive_rtranclp || 7.05598731777e-25
Coq_Sets_Uniset_seq || c_Predicate_Oeq || 7.04591214448e-25
Coq_Arith_PeanoNat_Nat_Odd || monoid || 7.02542110826e-25
Coq_Init_Datatypes_length || transitive_rtrancl || 6.9877330225e-25
Coq_Numbers_Natural_Binary_NBinary_N_lt || is_none || 6.97236658917e-25
Coq_Structures_OrdersEx_N_as_OT_lt || is_none || 6.97236658917e-25
Coq_Structures_OrdersEx_N_as_DT_lt || is_none || 6.97236658917e-25
Coq_Numbers_Integer_BigZ_BigZ_BigZ_opp || cnj || 6.91117225336e-25
Coq_PArith_POrderedType_Positive_as_DT_succ || set || 6.90617664044e-25
Coq_PArith_POrderedType_Positive_as_OT_succ || set || 6.90617664044e-25
Coq_Structures_OrdersEx_Positive_as_DT_succ || set || 6.90617664044e-25
Coq_Structures_OrdersEx_Positive_as_OT_succ || set || 6.90617664044e-25
Coq_Init_Nat_mul || nat_tsub || 6.83872745107e-25
Coq_Numbers_Natural_Binary_NBinary_N_le || is_none || 6.74305683543e-25
Coq_Structures_OrdersEx_N_as_OT_le || is_none || 6.74305683543e-25
Coq_Structures_OrdersEx_N_as_DT_le || is_none || 6.74305683543e-25
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || transitive_rtrancl || 6.72304628933e-25
Coq_Arith_Even_even_1 || nat_is_nat || 6.63592083001e-25
Coq_NArith_BinNat_N_lt || is_none || 6.31464966784e-25
Coq_ZArith_BinInt_Z_shiftr || comple1176932000PREMUM || 6.26762754799e-25
Coq_ZArith_BinInt_Z_shiftl || comple1176932000PREMUM || 6.26762754799e-25
Coq_NArith_BinNat_N_le || is_none || 6.13345019832e-25
Coq_Logic_EqdepFacts_Eq_dep_eq_on || transitive_tranclp || 5.93227392417e-25
Coq_Reals_Ranalysis1_continuity_pt || equiv_part_equivp || 5.81761377712e-25
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || is_none || 5.67190703663e-25
Coq_Structures_OrdersEx_Z_as_OT_lt || is_none || 5.67190703663e-25
Coq_Structures_OrdersEx_Z_as_DT_lt || is_none || 5.67190703663e-25
Coq_Arith_Even_even_1 || groups_monoid_list || 5.66675494284e-25
Coq_ZArith_BinInt_Z_Odd || semilattice_neutr || 5.55511746912e-25
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || is_none || 5.4885161865e-25
Coq_Arith_PeanoNat_Nat_Odd || semilattice_neutr || 5.46813257838e-25
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || c_Predicate_Oeq || 5.39809654934e-25
Coq_Init_Specif_proj1_sig || sum_Rep_sum || 5.37552025824e-25
Coq_Init_Specif_proj1_sig || product_Rep_prod || 5.37552025824e-25
Coq_Numbers_Integer_Binary_ZBinary_Z_le || is_none || 5.35587365531e-25
Coq_Structures_OrdersEx_Z_as_OT_le || is_none || 5.35587365531e-25
Coq_Structures_OrdersEx_Z_as_DT_le || is_none || 5.35587365531e-25
Coq_ZArith_BinInt_Z_sub || bind4 || 5.35074744826e-25
Coq_Relations_Relation_Definitions_inclusion || order_well_order_on || 5.23466285128e-25
Coq_Reals_Ranalysis1_continuity_pt || reflp || 5.20079674749e-25
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || is_none || 5.19222550665e-25
Coq_Classes_Morphisms_ProperProxy || comm_monoid_axioms || 4.95870305294e-25
Coq_ZArith_Zeven_Zodd || lattic1543629303tr_set || 4.90121887292e-25
Coq_Relations_Relation_Definitions_inclusion || bNF_Ca1811156065der_on || 4.86834756408e-25
Coq_ZArith_BinInt_Z_add || bind4 || 4.84887317259e-25
Coq_PArith_POrderedType_Positive_as_DT_lt || is_filter || 4.6717608981e-25
Coq_PArith_POrderedType_Positive_as_OT_lt || is_filter || 4.6717608981e-25
Coq_Structures_OrdersEx_Positive_as_DT_lt || is_filter || 4.6717608981e-25
Coq_Structures_OrdersEx_Positive_as_OT_lt || is_filter || 4.6717608981e-25
Coq_PArith_BinPos_Pos_sub_mask_carry || bind4 || 4.62174693498e-25
Coq_Sets_Multiset_meq || c_Predicate_Oeq || 4.20352416248e-25
Coq_Arith_Even_even_1 || lattic1543629303tr_set || 4.14886810868e-25
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || re || 3.92035801889e-25
Coq_ZArith_BinInt_Z_sub || comple1176932000PREMUM || 3.84232122056e-25
Coq_Classes_Morphisms_Proper || groups1716206716st_set || 3.84052182302e-25
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || re || 3.82249092041e-25
Coq_Classes_Morphisms_Proper || comm_monoid || 3.72203313233e-25
Coq_ZArith_BinInt_Z_add || comple1176932000PREMUM || 3.6586938478e-25
Coq_ZArith_BinInt_Z_Even || monoid || 3.63725175716e-25
Coq_ZArith_Zeven_Zeven || groups_monoid_list || 3.59485021839e-25
Coq_Classes_Morphisms_ProperProxy || groups387199878d_list || 3.49582776695e-25
Coq_PArith_BinPos_Pos_add || rep_filter || 3.40314486947e-25
Coq_Init_Peano_le_0 || finite_finite2 || 3.30057308486e-25
Coq_PArith_POrderedType_Positive_as_DT_le || bind4 || 3.2818082522e-25
Coq_PArith_POrderedType_Positive_as_OT_le || bind4 || 3.2818082522e-25
Coq_Structures_OrdersEx_Positive_as_DT_le || bind4 || 3.2818082522e-25
Coq_Structures_OrdersEx_Positive_as_OT_le || bind4 || 3.2818082522e-25
Coq_Sets_Ensembles_Inhabited_0 || antisym || 3.18626525162e-25
Coq_Sets_Ensembles_Inhabited_0 || sym || 3.15511546391e-25
Coq_ZArith_BinInt_Z_succ || none || 3.14316479708e-25
Coq_Arith_Even_even_0 || nat_is_nat || 2.72161259133e-25
Coq_Classes_RelationClasses_subrelation || c_Predicate_Oeq || 2.65853899591e-25
Coq_Init_Nat_add || nat_tsub || 2.65095143466e-25
Coq_QArith_Qcanon_Qclt || semilattice || 2.56802574312e-25
Coq_romega_ReflOmegaCore_Z_as_Int_minus || bind4 || 2.56372591777e-25
Coq_ZArith_BinInt_Z_Even || semilattice_neutr || 2.51012745323e-25
Coq_ZArith_Zeven_Zeven || lattic1543629303tr_set || 2.32844302412e-25
Coq_PArith_POrderedType_Positive_as_DT_lt || comple1176932000PREMUM || 2.31749906743e-25
Coq_PArith_POrderedType_Positive_as_OT_lt || comple1176932000PREMUM || 2.31749906743e-25
Coq_Structures_OrdersEx_Positive_as_DT_lt || comple1176932000PREMUM || 2.31749906743e-25
Coq_Structures_OrdersEx_Positive_as_OT_lt || comple1176932000PREMUM || 2.31749906743e-25
Coq_Arith_PeanoNat_Nat_Even || monoid || 2.26216396422e-25
Coq_PArith_BinPos_Pos_sub_mask || comple1176932000PREMUM || 2.03484816067e-25
Coq_PArith_BinPos_Pos_succ || set || 2.02674139146e-25
Coq_PArith_BinPos_Pos_lt || is_filter || 2.02576459498e-25
Coq_ZArith_Zsqrt_compat_Zsqrt_plain || lattic35693393ce_set || 2.01652062884e-25
Coq_romega_ReflOmegaCore_Z_as_Int_lt || semilattice || 2.00846166043e-25
Coq_Arith_Even_even_0 || groups_monoid_list || 1.94744516928e-25
Coq_Sets_Partial_Order_Carrier_of || transitive_trancl || 1.88913209582e-25
Coq_ZArith_Zdigits_binary_value || bNF_Ca646678531ard_of || 1.87720032441e-25
Coq_Init_Peano_lt || nO_MATCH || 1.84982917311e-25
Coq_ZArith_Zdiv_Zmod_prime || map || 1.78848282269e-25
Coq_ZArith_BinInt_Z_lt || is_none || 1.78844285556e-25
Coq_Sets_Partial_Order_Carrier_of || transitive_rtrancl || 1.77851147741e-25
Coq_Lists_SetoidPermutation_PermutationA_0 || transitive_rtranclp || 1.73933103407e-25
Coq_ZArith_BinInt_Z_le || is_none || 1.71812998371e-25
Coq_Arith_PeanoNat_Nat_Even || semilattice_neutr || 1.7135084164e-25
Coq_ZArith_Zdigits_Z_to_binary || field2 || 1.65024906534e-25
Coq_Classes_Morphisms_ProperProxy || finite1921348288axioms || 1.5405689658e-25
Coq_ZArith_BinInt_Z_modulo || map_tailrec || 1.5254527187e-25
Coq_ZArith_BinInt_Z_sqrt || semilattice || 1.47463647273e-25
Coq_ZArith_Zeven_Zeven || nat_is_nat || 1.43756633055e-25
Coq_Arith_Even_even_0 || lattic1543629303tr_set || 1.38991254452e-25
Coq_Init_Datatypes_eq_true_0 || nat3 || 1.32037633522e-25
Coq_Lists_List_ForallPairs || groups_monoid_list || 1.26819628312e-25
Coq_Arith_PeanoNat_Nat_max || set2 || 1.24893074121e-25
Coq_QArith_Qcanon_Qcle || semilattice_axioms || 1.16467248872e-25
Coq_Init_Peano_le_0 || nO_MATCH || 1.15487153724e-25
Coq_ZArith_Zeven_Zodd || nat_is_nat || 1.14326468046e-25
Coq_Reals_Ranalysis1_div_fct || bind4 || 1.11673985894e-25
Coq_ZArith_BinInt_Z_add || nat_tsub || 1.07032759906e-25
Coq_PArith_BinPos_Pos_le || bind4 || 1.06294128188e-25
Coq_Classes_Morphisms_Proper || finite_folding_idem || 9.7583262419e-26
Coq_Lists_List_rev || bNF_Ca646678531ard_of || 9.65125693614e-26
Coq_Lists_SetoidList_eqlistA_0 || transitive_tranclp || 9.20218582384e-26
Coq_romega_ReflOmegaCore_Z_as_Int_plus || comple1176932000PREMUM || 9.00742224649e-26
Coq_ZArith_BinInt_Z_Odd || semilattice || 8.97977929605e-26
Coq_Arith_PeanoNat_Nat_Odd || semilattice || 8.75023213306e-26
Coq_Classes_Morphisms_ProperProxy || finite_folding || 8.71649635837e-26
Coq_romega_ReflOmegaCore_Z_as_Int_le || semilattice_axioms || 8.59795513702e-26
Coq_NArith_Ndigits_N2Bv_gen || field2 || 8.54793754099e-26
Coq_NArith_Ndigits_Bv2N || bNF_Ca646678531ard_of || 8.42184168978e-26
Coq_Sets_Finite_sets_Finite_0 || finite_finite2 || 8.17354073291e-26
Coq_ZArith_BinInt_Z_mul || nat_tsub || 8.11946590071e-26
Coq_QArith_Qcanon_Qcle || abel_semigroup || 8.08609464375e-26
Coq_ZArith_Zeven_Zodd || lattic35693393ce_set || 7.95339620415e-26
Coq_Lists_List_ForallOrdPairs_0 || monoid || 7.71369246698e-26
Coq_Init_Datatypes_negb || cnj || 7.64865042113e-26
Coq_QArith_Qcanon_Qcle || lattic35693393ce_set || 7.64087039786e-26
Coq_Structures_OrdersEx_N_as_OT_divide || wf || 7.64068842086e-26
Coq_Structures_OrdersEx_N_as_DT_divide || wf || 7.64068842086e-26
Coq_Numbers_Natural_Binary_NBinary_N_divide || wf || 7.64068842086e-26
Coq_romega_ReflOmegaCore_Z_as_Int_opp || set || 7.4838553247e-26
Coq_Sets_Ensembles_Intersection_0 || insert3 || 7.45809468257e-26
Coq_NArith_BinNat_N_divide || wf || 7.4191895505e-26
Coq_PArith_BinPos_Pos_lt || comple1176932000PREMUM || 7.39845546234e-26
Coq_Numbers_Natural_BigN_BigN_BigN_divide || wf || 7.30649142986e-26
Coq_PArith_POrderedType_Positive_as_DT_SubMaskSpec_0 || refl_on || 7.24235668565e-26
Coq_PArith_POrderedType_Positive_as_OT_SubMaskSpec_0 || refl_on || 7.24235668565e-26
Coq_Structures_OrdersEx_Positive_as_DT_SubMaskSpec_0 || refl_on || 7.24235668565e-26
Coq_Structures_OrdersEx_Positive_as_OT_SubMaskSpec_0 || refl_on || 7.24235668565e-26
Coq_Arith_PeanoNat_Nat_divide || wf || 7.05272973869e-26
Coq_Structures_OrdersEx_Nat_as_DT_divide || wf || 7.05272973869e-26
Coq_Structures_OrdersEx_Nat_as_OT_divide || wf || 7.05272973869e-26
Coq_Arith_Even_even_1 || lattic35693393ce_set || 6.74104007637e-26
Coq_PArith_POrderedType_Positive_as_DT_sub_mask || id_on || 6.52621423404e-26
Coq_PArith_POrderedType_Positive_as_OT_sub_mask || id_on || 6.52621423404e-26
Coq_Structures_OrdersEx_Positive_as_DT_sub_mask || id_on || 6.52621423404e-26
Coq_Structures_OrdersEx_Positive_as_OT_sub_mask || id_on || 6.52621423404e-26
Coq_PArith_BinPos_Pos_SubMaskSpec_0 || refl_on || 6.49617194517e-26
Coq_Reals_Ranalysis1_mult_fct || comple1176932000PREMUM || 6.49143357175e-26
__constr_Coq_Init_Datatypes_bool_0_1 || zero_Rep || 6.27376848872e-26
Coq_romega_ReflOmegaCore_Z_as_Int_le || abel_semigroup || 6.08983228759e-26
Coq_PArith_BinPos_Pos_sub_mask || id_on || 5.78982142868e-26
Coq_romega_ReflOmegaCore_Z_as_Int_le || lattic35693393ce_set || 5.76953916719e-26
Coq_Structures_OrdersEx_Nat_as_DT_max || set2 || 5.52474719224e-26
Coq_Structures_OrdersEx_Nat_as_OT_max || set2 || 5.52474719224e-26
Coq_Lists_List_Forall_0 || eventually || 5.50544066986e-26
Coq_Sets_Uniset_incl || monoid || 5.16759056438e-26
Coq_Init_Nat_add || set2 || 4.9355468827e-26
Coq_Reals_Ranalysis1_inv_fct || set || 4.91905016202e-26
Coq_Structures_OrdersEx_Nat_as_DT_add || set2 || 4.85644745653e-26
Coq_Structures_OrdersEx_Nat_as_OT_add || set2 || 4.85644745653e-26
Coq_Arith_PeanoNat_Nat_add || set2 || 4.8440808718e-26
Coq_Lists_List_ForallPairs || lattic1543629303tr_set || 4.73824540664e-26
Coq_Arith_PeanoNat_Nat_Odd || comm_monoid || 4.59190755341e-26
Coq_Sorting_Permutation_Permutation_0 || order_well_order_on || 4.44465967157e-26
Coq_Sets_Uniset_incl || semilattice_neutr || 4.43103417146e-26
Coq_Structures_OrdersEx_N_as_OT_lcm || measure || 4.33599334085e-26
Coq_Structures_OrdersEx_N_as_DT_lcm || measure || 4.33599334085e-26
Coq_Numbers_Natural_Binary_NBinary_N_lcm || measure || 4.33599334085e-26
Coq_ZArith_BinInt_Z_Even || semilattice || 4.30955218779e-26
Coq_Numbers_Natural_BigN_BigN_BigN_lt_alt || map || 4.24861905401e-26
Coq_Sorting_Permutation_Permutation_0 || bNF_Ca1811156065der_on || 4.22693854432e-26
Coq_NArith_BinNat_N_lcm || measure || 4.21943173978e-26
Coq_ZArith_Zsqrt_compat_Zsqrt_plain || groups828474808id_set || 4.16071882269e-26
Coq_Numbers_Natural_BigN_BigN_BigN_lcm || measure || 4.15947970394e-26
Coq_Numbers_Natural_BigN_BigN_BigN_lt || map_tailrec || 4.09526398934e-26
Coq_Numbers_Natural_Binary_NBinary_N_lt_alt || map || 4.09412563056e-26
Coq_Structures_OrdersEx_N_as_OT_lt_alt || map || 4.09412563056e-26
Coq_Structures_OrdersEx_N_as_DT_lt_alt || map || 4.09412563056e-26
Coq_Arith_PeanoNat_Nat_lcm || measure || 4.02497896561e-26
Coq_Structures_OrdersEx_Nat_as_DT_lcm || measure || 4.02497896561e-26
Coq_Structures_OrdersEx_Nat_as_OT_lcm || measure || 4.02497896561e-26
Coq_ZArith_Zeven_Zeven || lattic35693393ce_set || 3.99790045642e-26
Coq_ZArith_BinInt_Z_Odd || comm_monoid || 3.97629363699e-26
Coq_Numbers_Natural_Binary_NBinary_N_lt || map_tailrec || 3.93212789421e-26
Coq_Structures_OrdersEx_N_as_OT_lt || map_tailrec || 3.93212789421e-26
Coq_Structures_OrdersEx_N_as_DT_lt || map_tailrec || 3.93212789421e-26
Coq_NArith_BinNat_N_lt_alt || map || 3.85760648168e-26
Coq_NArith_BinNat_N_lt || map_tailrec || 3.68349403273e-26
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || wf || 3.65457133604e-26
Coq_Logic_FinFun_Fin2Restrict_extend || measure || 3.63765708518e-26
Coq_Sets_Relations_2_Rstar_0 || rep_filter || 3.59986310177e-26
Coq_ZArith_BinInt_Z_sqrt || comm_monoid || 3.53188724891e-26
Coq_Structures_OrdersEx_N_as_OT_lcm || measures || 3.44925308329e-26
Coq_Structures_OrdersEx_N_as_DT_lcm || measures || 3.44925308329e-26
Coq_Numbers_Natural_Binary_NBinary_N_lcm || measures || 3.44925308329e-26
Coq_Sets_Relations_2_Rstar1_0 || neg2 || 3.42624503275e-26
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || wf || 3.42334859655e-26
Coq_Structures_OrdersEx_Z_as_OT_divide || wf || 3.42334859655e-26
Coq_Structures_OrdersEx_Z_as_DT_divide || wf || 3.42334859655e-26
Coq_Sets_Relations_3_coherent || semilattice_order || 3.40805379968e-26
Coq_NArith_BinNat_N_lcm || measures || 3.35598994694e-26
Coq_Sets_Uniset_seq || groups_monoid_list || 3.32612509457e-26
Coq_Numbers_Natural_BigN_BigN_BigN_lcm || measures || 3.30806157346e-26
Coq_Classes_Morphisms_ProperProxy || finite852775215axioms || 3.25826910855e-26
Coq_Sets_Relations_1_Transitive || is_filter || 3.22994092273e-26
Coq_Arith_PeanoNat_Nat_lcm || measures || 3.20050257406e-26
Coq_Structures_OrdersEx_Nat_as_DT_lcm || measures || 3.20050257406e-26
Coq_Structures_OrdersEx_Nat_as_OT_lcm || measures || 3.20050257406e-26
Coq_Sets_Relations_3_coherent || lexordp_eq || 3.20007002166e-26
Coq_Lists_List_ForallOrdPairs_0 || semilattice_neutr || 3.15959112143e-26
Coq_Arith_Even_even_1 || groups828474808id_set || 3.14120260862e-26
Coq_ZArith_Zeven_Zodd || groups828474808id_set || 3.10590094185e-26
Coq_Logic_FinFun_bFun || wf || 3.08422783326e-26
Coq_Arith_PeanoNat_Nat_Even || semilattice || 3.01006987226e-26
Coq_Numbers_Rational_BigQ_BigQ_BigQ_max || id_on || 2.95891299452e-26
Coq_Sets_Relations_2_Rstar_0 || lattic1693879045er_set || 2.68668064589e-26
Coq_Sets_Uniset_seq || lattic1543629303tr_set || 2.65804908899e-26
Coq_Sets_Relations_3_coherent || pred_chain || 2.60758396118e-26
Coq_Relations_Relation_Definitions_inclusion || refl_on || 2.54894309979e-26
Coq_Arith_Even_even_0 || lattic35693393ce_set || 2.46590401568e-26
Coq_Logic_FinFun_Fin2Restrict_extend || measures || 2.44702110096e-26
Coq_Relations_Relation_Operators_clos_trans_0 || id_on || 2.36929083928e-26
Coq_Sets_Cpo_PO_of_cpo || rep_filter || 2.34741831317e-26
Coq_Structures_OrdersEx_N_as_OT_mul || measure || 2.31539405591e-26
Coq_Structures_OrdersEx_N_as_DT_mul || measure || 2.31539405591e-26
Coq_Numbers_Natural_Binary_NBinary_N_mul || measure || 2.31539405591e-26
Coq_Numbers_Natural_BigN_BigN_BigN_mul || measure || 2.2113060734e-26
Coq_NArith_BinNat_N_mul || measure || 2.20682273989e-26
Coq_Numbers_Rational_BigQ_BigQ_BigQ_le || trans || 2.17668927763e-26
Coq_Arith_PeanoNat_Nat_mul || measure || 2.14305383517e-26
Coq_Structures_OrdersEx_Nat_as_DT_mul || measure || 2.14305383517e-26
Coq_Structures_OrdersEx_Nat_as_OT_mul || measure || 2.14305383517e-26
Coq_Sets_Relations_2_Rstar_0 || pred_maxchain || 2.05736544331e-26
Coq_Structures_OrdersEx_N_as_OT_mul || measures || 2.03060394574e-26
Coq_Structures_OrdersEx_N_as_DT_mul || measures || 2.03060394574e-26
Coq_Numbers_Natural_Binary_NBinary_N_mul || measures || 2.03060394574e-26
Coq_Sets_Relations_2_Rstar_0 || lexordp2 || 1.99750230534e-26
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || induct_implies || 1.97903547907e-26
Coq_Structures_OrdersEx_Z_as_OT_mul || induct_implies || 1.97903547907e-26
Coq_Structures_OrdersEx_Z_as_DT_mul || induct_implies || 1.97903547907e-26
Coq_Numbers_Natural_BigN_BigN_BigN_mul || measures || 1.94009160689e-26
Coq_NArith_BinNat_N_mul || measures || 1.94005654537e-26
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lcm || measure || 1.89956708737e-26
Coq_Arith_PeanoNat_Nat_mul || measures || 1.87965732559e-26
Coq_Structures_OrdersEx_Nat_as_DT_mul || measures || 1.87965732559e-26
Coq_Structures_OrdersEx_Nat_as_OT_mul || measures || 1.87965732559e-26
Coq_Sets_Partial_Order_Strict_Rel_of || rep_filter || 1.85156924665e-26
Coq_ZArith_BinInt_Z_Even || comm_monoid || 1.84542774028e-26
Coq_Numbers_Integer_Binary_ZBinary_Z_lcm || measure || 1.78733385346e-26
Coq_Structures_OrdersEx_Z_as_OT_lcm || measure || 1.78733385346e-26
Coq_Structures_OrdersEx_Z_as_DT_lcm || measure || 1.78733385346e-26
Coq_Sets_Ensembles_Singleton_0 || set2 || 1.77289417919e-26
Coq_Sets_Ensembles_Union_0 || insert3 || 1.67859502465e-26
Coq_Classes_Morphisms_Proper || finite_comp_fun_idem || 1.67283243045e-26
Coq_QArith_Qcanon_Qcmult || induct_implies || 1.67055094379e-26
Coq_QArith_Qcanon_Qcplus || induct_conj || 1.62099743632e-26
Coq_Sets_Relations_2_Rstar1_0 || pos2 || 1.60801407585e-26
Coq_QArith_QArith_base_Qle || is_none || 1.60384661739e-26
Coq_Numbers_Natural_BigN_BigN_BigN_le || map_tailrec || 1.56502989199e-26
Coq_Numbers_Natural_BigN_BigN_BigN_le_alt || map || 1.55953275599e-26
Coq_Sets_Relations_1_Reflexive || is_filter || 1.55364997795e-26
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lcm || measures || 1.54525006487e-26
Coq_Arith_PeanoNat_Nat_Even || comm_monoid || 1.51332655561e-26
Coq_ZArith_Zeven_Zeven || groups828474808id_set || 1.51238773662e-26
Coq_QArith_Qabs_Qabs || none || 1.50862463565e-26
Coq_Sets_Cpo_Complete_0 || is_filter || 1.49577218506e-26
Coq_Numbers_Natural_Binary_NBinary_N_le_alt || map || 1.48001356753e-26
Coq_Structures_OrdersEx_N_as_OT_le_alt || map || 1.48001356753e-26
Coq_Structures_OrdersEx_N_as_DT_le_alt || map || 1.48001356753e-26
Coq_Numbers_Natural_Binary_NBinary_N_le || map_tailrec || 1.47782437143e-26
Coq_Structures_OrdersEx_N_as_OT_le || map_tailrec || 1.47782437143e-26
Coq_Structures_OrdersEx_N_as_DT_le || map_tailrec || 1.47782437143e-26
Coq_Numbers_Integer_Binary_ZBinary_Z_lcm || measures || 1.45353679608e-26
Coq_Structures_OrdersEx_Z_as_OT_lcm || measures || 1.45353679608e-26
Coq_Structures_OrdersEx_Z_as_DT_lcm || measures || 1.45353679608e-26
Coq_NArith_BinNat_N_le_alt || map || 1.44288292558e-26
Coq_NArith_BinNat_N_le || map_tailrec || 1.43724987049e-26
Coq_Lists_List_rev || divmod_nat || 1.41249835996e-26
Coq_FSets_FMapPositive_PositiveMap_Empty || null2 || 1.37816888447e-26
Coq_FSets_FMapPositive_PositiveMap_empty || empty || 1.33143247526e-26
Coq_Sets_Ensembles_Included || member3 || 1.31542674451e-26
Coq_Classes_Morphisms_ProperProxy || finite100568337ommute || 1.25196393105e-26
Coq_Reals_Rdefinitions_Rmult || induct_implies || 1.24260428362e-26
Coq_Sorting_Permutation_Permutation_0 || divmod_nat_rel || 1.15651473813e-26
Coq_Numbers_Integer_Binary_ZBinary_Z_sub || induct_conj || 1.13838702153e-26
Coq_Structures_OrdersEx_Z_as_OT_sub || induct_conj || 1.13838702153e-26
Coq_Structures_OrdersEx_Z_as_DT_sub || induct_conj || 1.13838702153e-26
Coq_ZArith_BinInt_Z_divide || wf || 1.13283229896e-26
Coq_Arith_Even_even_0 || groups828474808id_set || 1.10360926332e-26
Coq_Numbers_Integer_BigZ_BigZ_BigZ_mul || measure || 1.07830439504e-26
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || measure || 1.01458073211e-26
Coq_Structures_OrdersEx_Z_as_OT_mul || measure || 1.01458073211e-26
Coq_Structures_OrdersEx_Z_as_DT_mul || measure || 1.01458073211e-26
Coq_Arith_PeanoNat_Nat_lor || induct_implies || 9.85341515268e-27
Coq_Numbers_Natural_Binary_NBinary_N_lor || induct_implies || 9.85341515268e-27
Coq_Structures_OrdersEx_N_as_OT_lor || induct_implies || 9.85341515268e-27
Coq_Structures_OrdersEx_N_as_DT_lor || induct_implies || 9.85341515268e-27
Coq_Structures_OrdersEx_Nat_as_DT_lor || induct_implies || 9.85341515268e-27
Coq_Structures_OrdersEx_Nat_as_OT_lor || induct_implies || 9.85341515268e-27
Coq_Arith_PeanoNat_Nat_land || induct_implies || 9.63186427014e-27
Coq_Numbers_Natural_Binary_NBinary_N_land || induct_implies || 9.63186427014e-27
Coq_Structures_OrdersEx_N_as_OT_land || induct_implies || 9.63186427014e-27
Coq_Structures_OrdersEx_N_as_DT_land || induct_implies || 9.63186427014e-27
Coq_Structures_OrdersEx_Nat_as_DT_land || induct_implies || 9.63186427014e-27
Coq_Structures_OrdersEx_Nat_as_OT_land || induct_implies || 9.63186427014e-27
Coq_Numbers_Integer_Binary_ZBinary_Z_add || induct_conj || 9.58620054633e-27
Coq_Structures_OrdersEx_Z_as_OT_add || induct_conj || 9.58620054633e-27
Coq_Structures_OrdersEx_Z_as_DT_add || induct_conj || 9.58620054633e-27
Coq_Numbers_Integer_BigZ_BigZ_BigZ_mul || measures || 9.52539905258e-27
Coq_PArith_POrderedType_Positive_as_DT_lt || is_none || 9.42641118181e-27
Coq_PArith_POrderedType_Positive_as_OT_lt || is_none || 9.42641118181e-27
Coq_Structures_OrdersEx_Positive_as_DT_lt || is_none || 9.42641118181e-27
Coq_Structures_OrdersEx_Positive_as_OT_lt || is_none || 9.42641118181e-27
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || measures || 8.96090695267e-27
Coq_Structures_OrdersEx_Z_as_OT_mul || measures || 8.96090695267e-27
Coq_Structures_OrdersEx_Z_as_DT_mul || measures || 8.96090695267e-27
Coq_Arith_PeanoNat_Nat_land || induct_conj || 8.91344884974e-27
Coq_Numbers_Natural_Binary_NBinary_N_land || induct_conj || 8.91344884974e-27
Coq_Structures_OrdersEx_N_as_OT_land || induct_conj || 8.91344884974e-27
Coq_Structures_OrdersEx_N_as_DT_land || induct_conj || 8.91344884974e-27
Coq_Structures_OrdersEx_Nat_as_DT_land || induct_conj || 8.91344884974e-27
Coq_Structures_OrdersEx_Nat_as_OT_land || induct_conj || 8.91344884974e-27
Coq_Arith_PeanoNat_Nat_lor || induct_conj || 8.85341184144e-27
Coq_Numbers_Natural_Binary_NBinary_N_lor || induct_conj || 8.85341184144e-27
Coq_Structures_OrdersEx_N_as_OT_lor || induct_conj || 8.85341184144e-27
Coq_Structures_OrdersEx_N_as_DT_lor || induct_conj || 8.85341184144e-27
Coq_Structures_OrdersEx_Nat_as_DT_lor || induct_conj || 8.85341184144e-27
Coq_Structures_OrdersEx_Nat_as_OT_lor || induct_conj || 8.85341184144e-27
Coq_Numbers_Rational_BigQ_BigQ_BigQ_le || antisym || 8.61524748183e-27
Coq_Numbers_Rational_BigQ_BigQ_BigQ_le || sym || 8.54474685706e-27
Coq_ZArith_BinInt_Z_pow || map_tailrec || 8.52351439547e-27
Coq_Classes_RelationClasses_Symmetric || wfP || 8.26441927225e-27
Coq_Classes_RelationClasses_complement || transitive_tranclp || 8.18215141395e-27
Coq_ZArith_Zpow_alt_Zpower_alt || map || 7.75745602984e-27
Coq_NArith_BinNat_N_lor || induct_implies || 7.72736149065e-27
Coq_NArith_BinNat_N_land || induct_implies || 7.40524453609e-27
Coq_PArith_POrderedType_Positive_as_DT_succ || none || 7.29838224387e-27
Coq_PArith_POrderedType_Positive_as_OT_succ || none || 7.29838224387e-27
Coq_Structures_OrdersEx_Positive_as_DT_succ || none || 7.29838224387e-27
Coq_Structures_OrdersEx_Positive_as_OT_succ || none || 7.29838224387e-27
Coq_PArith_POrderedType_Positive_as_DT_lt || distinct || 7.02552786613e-27
Coq_PArith_POrderedType_Positive_as_OT_lt || distinct || 7.02552786613e-27
Coq_Structures_OrdersEx_Positive_as_DT_lt || distinct || 7.02552786613e-27
Coq_Structures_OrdersEx_Positive_as_OT_lt || distinct || 7.02552786613e-27
Coq_NArith_BinNat_N_land || induct_conj || 6.94759240372e-27
Coq_NArith_BinNat_N_lor || induct_conj || 6.86122547974e-27
Coq_Reals_Rdefinitions_Rminus || induct_conj || 6.79579151012e-27
Coq_Classes_Morphisms_Normalizes || groups_monoid_list || 6.6009684692e-27
Coq_ZArith_BinInt_Z_lcm || measure || 6.38962228106e-27
Coq_Logic_ChoiceFacts_RelationalChoice_on || semilattice || 6.1605759407e-27
Coq_PArith_POrderedType_Positive_as_DT_add || remdups || 5.82203373075e-27
Coq_PArith_POrderedType_Positive_as_OT_add || remdups || 5.82203373075e-27
Coq_Structures_OrdersEx_Positive_as_DT_add || remdups || 5.82203373075e-27
Coq_Structures_OrdersEx_Positive_as_OT_add || remdups || 5.82203373075e-27
Coq_Lists_Streams_Str_nth_tl || insert3 || 5.51420456401e-27
Coq_Reals_Rdefinitions_Rplus || induct_conj || 5.49595230525e-27
Coq_Numbers_Rational_BigQ_BigQ_BigQ_max || transitive_trancl || 5.44638822875e-27
Coq_Logic_ChoiceFacts_FunctionalChoice_on || lattic35693393ce_set || 5.36417409118e-27
Coq_PArith_BinPos_Pos_of_succ_nat || suc_Rep || 5.19677294265e-27
Coq_ZArith_BinInt_Z_lcm || measures || 5.16971385785e-27
Coq_PArith_BinPos_Pos_lt || is_none || 5.16742554111e-27
Coq_Numbers_Rational_BigQ_BigQ_BigQ_max || transitive_rtrancl || 5.16516668262e-27
Coq_Numbers_Integer_Binary_ZBinary_Z_lor || induct_implies || 5.13471444214e-27
Coq_Structures_OrdersEx_Z_as_OT_lor || induct_implies || 5.13471444214e-27
Coq_Structures_OrdersEx_Z_as_DT_lor || induct_implies || 5.13471444214e-27
Coq_Numbers_Integer_Binary_ZBinary_Z_land || induct_implies || 5.03712964659e-27
Coq_Structures_OrdersEx_Z_as_OT_land || induct_implies || 5.03712964659e-27
Coq_Structures_OrdersEx_Z_as_DT_land || induct_implies || 5.03712964659e-27
Coq_Lists_Streams_ForAll_0 || member3 || 4.7559493905e-27
Coq_Reals_Rbasic_fun_Rabs || empty || 4.73187250537e-27
Coq_Numbers_Integer_Binary_ZBinary_Z_land || induct_conj || 4.66134754943e-27
Coq_Structures_OrdersEx_Z_as_OT_land || induct_conj || 4.66134754943e-27
Coq_Structures_OrdersEx_Z_as_DT_land || induct_conj || 4.66134754943e-27
Coq_Numbers_Integer_Binary_ZBinary_Z_lor || induct_conj || 4.63562881408e-27
Coq_Structures_OrdersEx_Z_as_OT_lor || induct_conj || 4.63562881408e-27
Coq_Structures_OrdersEx_Z_as_DT_lor || induct_conj || 4.63562881408e-27
Coq_Classes_RelationClasses_relation_equivalence || monoid || 4.56280972802e-27
Coq_Reals_Rdefinitions_Rle || null2 || 4.43212991637e-27
Coq_PArith_BinPos_Pos_succ || none || 3.98732742884e-27
Coq_PArith_BinPos_Pos_lt || distinct || 3.91544957231e-27
__constr_Coq_Init_Datatypes_list_0_1 || id2 || 3.42485325374e-27
Coq_Sorting_Permutation_Permutation_0 || c_Predicate_Oeq || 3.19310374353e-27
Coq_PArith_BinPos_Pos_add || remdups || 3.1712114746e-27
Coq_Init_Peano_lt || domainp || 3.0769280164e-27
Coq_ZArith_BinInt_Z_mul || measure || 3.05435136629e-27
Coq_Logic_ChoiceFacts_GuardedRelationalChoice_on || lattic35693393ce_set || 3.01095009318e-27
Coq_Classes_Morphisms_Normalizes || lattic1543629303tr_set || 2.97901405178e-27
Coq_ZArith_BinInt_Z_mul || measures || 2.74048536675e-27
Coq_PArith_POrderedType_Positive_as_DT_succ || nil || 2.69706184903e-27
Coq_PArith_POrderedType_Positive_as_OT_succ || nil || 2.69706184903e-27
Coq_Structures_OrdersEx_Positive_as_DT_succ || nil || 2.69706184903e-27
Coq_Structures_OrdersEx_Positive_as_OT_succ || nil || 2.69706184903e-27
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || neg2 || 2.61447335688e-27
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || neg2 || 2.61447335688e-27
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || semilattice || 2.38336571002e-27
Coq_Numbers_Natural_BigN_BigN_BigN_lt || semilattice || 2.35839992907e-27
Coq_Logic_ChoiceFacts_RelationalChoice_on || transitive_acyclic || 2.34813215462e-27
Coq_Classes_RelationClasses_relation_equivalence || semilattice_neutr || 2.23235010064e-27
Coq_ZArith_BinInt_Z_lor || induct_implies || 2.15619634805e-27
Coq_ZArith_BinInt_Z_land || induct_implies || 2.09177636421e-27
Coq_Init_Peano_le_0 || domainp || 2.07935490837e-27
Coq_ZArith_BinInt_Z_land || induct_conj || 1.9554284992e-27
Coq_ZArith_BinInt_Z_lor || induct_conj || 1.93913879711e-27
Coq_Init_Datatypes_app || sum_Inl || 1.92167900003e-27
Coq_Numbers_Natural_BigN_BigN_BigN_le || semilattice_axioms || 1.92079043632e-27
Coq_Numbers_Natural_BigN_BigN_BigN_eq || semilattice || 1.90866310929e-27
Coq_Lists_List_map || vimage || 1.90149807139e-27
Coq_Classes_SetoidClass_pequiv || rep_filter || 1.77689019033e-27
Coq_Relations_Relation_Operators_clos_refl_0 || map_le || 1.58779738765e-27
Coq_Lists_List_NoDup_0 || antisym || 1.51880334132e-27
Coq_Reals_Rdefinitions_Rgt || semilattice || 1.50814503913e-27
Coq_PArith_BinPos_Pos_succ || nil || 1.50515997695e-27
Coq_Lists_List_NoDup_0 || sym || 1.50391460938e-27
Coq_Logic_ChoiceFacts_FunctionalChoice_on || wf || 1.47664768664e-27
Coq_Classes_RelationClasses_Reflexive || equiv_equivp || 1.41365905088e-27
Coq_Numbers_Natural_BigN_BigN_BigN_le || abel_semigroup || 1.41329454799e-27
Coq_Reals_Rtopology_included || null || 1.4080630256e-27
Coq_Numbers_Natural_BigN_BigN_BigN_le || lattic35693393ce_set || 1.34596313778e-27
Coq_Lists_List_NoDup_0 || trans || 1.3274847186e-27
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || pos2 || 1.31511558271e-27
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || pos2 || 1.31511558271e-27
Coq_PArith_POrderedType_Positive_as_DT_lt || null || 1.27165681042e-27
Coq_PArith_POrderedType_Positive_as_OT_lt || null || 1.27165681042e-27
Coq_Structures_OrdersEx_Positive_as_DT_lt || null || 1.27165681042e-27
Coq_Structures_OrdersEx_Positive_as_OT_lt || null || 1.27165681042e-27
Coq_Reals_Rtopology_adherence || nil || 1.14831559934e-27
Coq_QArith_Qcanon_Qclt || abel_semigroup || 1.00766556456e-27
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || semilattice || 9.55107163417e-28
Coq_Logic_ChoiceFacts_GuardedRelationalChoice_on || wf || 9.06565046735e-28
Coq_PArith_POrderedType_Positive_as_DT_lt || semilattice || 8.44545953299e-28
Coq_PArith_POrderedType_Positive_as_OT_lt || semilattice || 8.44545953299e-28
Coq_Structures_OrdersEx_Positive_as_DT_lt || semilattice || 8.44545953299e-28
Coq_Structures_OrdersEx_Positive_as_OT_lt || semilattice || 8.44545953299e-28
Coq_ZArith_Znumtheory_Bezout_0 || monoid || 8.26662139052e-28
Coq_Classes_RelationClasses_PER_0 || is_filter || 7.95384639812e-28
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || semilattice || 7.91303246051e-28
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || transitive_acyclic || 7.7240103466e-28
Coq_Relations_Relation_Operators_clos_refl_trans_n1_0 || map_le || 7.64817195845e-28
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || semilattice_axioms || 7.58498938493e-28
Coq_Lists_List_rev || id_on || 7.17571897401e-28
Coq_PArith_BinPos_Pos_lt || null || 7.07738009106e-28
Coq_romega_ReflOmegaCore_Z_as_Int_lt || abel_semigroup || 7.0437490209e-28
Coq_Reals_Rdefinitions_Rge || semilattice_axioms || 6.96597563829e-28
Coq_ZArith_Znumtheory_Bezout_0 || semilattice_neutr || 6.89283177318e-28
Coq_QArith_Qcanon_Qcle || abel_s1917375468axioms || 6.6981264714e-28
Coq_QArith_QArith_base_Qlt || semilattice || 6.63162079984e-28
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || groups_monoid_list || 6.17829418282e-28
Coq_Numbers_Natural_BigN_BigN_BigN_sqrt_up || cnj || 5.93998931353e-28
Coq_ZArith_Znumtheory_Zis_gcd_0 || groups_monoid_list || 5.86083915578e-28
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || abel_semigroup || 5.69206562973e-28
Coq_PArith_BinPos_Pos_lt || semilattice || 5.66320830478e-28
Coq_Sorting_Permutation_Permutation_0 || refl_on || 5.65989293275e-28
Coq_Reals_RList_cons_Rlist || pow || 5.62859133426e-28
Coq_Sets_Relations_2_Rstar_0 || remdups || 5.53536343847e-28
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || lattic35693393ce_set || 5.43528310462e-28
Coq_Reals_Rtopology_included || distinct || 5.39663118941e-28
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || monoid || 5.13137940775e-28
Coq_Reals_Rdefinitions_Rge || abel_semigroup || 5.13024679388e-28
Coq_Reals_Rdefinitions_Rge || lattic35693393ce_set || 4.88600383396e-28
Coq_QArith_Qcanon_Qcle || semigroup || 4.63587790415e-28
Coq_ZArith_Znumtheory_Zis_gcd_0 || lattic1543629303tr_set || 4.5963247454e-28
Coq_Sorting_Sorted_StronglySorted_0 || groups_monoid_list || 4.50943506836e-28
Coq_Sets_Relations_1_Transitive || distinct || 4.45794048295e-28
Coq_romega_ReflOmegaCore_Z_as_Int_le || abel_s1917375468axioms || 4.42223941446e-28
Coq_Numbers_Integer_Binary_ZBinary_Z_ldiff || bind4 || 4.31595649641e-28
Coq_Structures_OrdersEx_Z_as_OT_ldiff || bind4 || 4.31595649641e-28
Coq_Structures_OrdersEx_Z_as_DT_ldiff || bind4 || 4.31595649641e-28
Coq_Relations_Relation_Operators_clos_refl_trans_1n_0 || map_le || 4.1328884682e-28
Coq_Numbers_Natural_BigN_BigN_BigN_lt || real_V1127708846m_norm || 4.03817466516e-28
Coq_Reals_Rtopology_included || null2 || 4.0225055781e-28
Coq_Numbers_Natural_BigN_BigN_BigN_zero || complex || 3.84619941241e-28
Coq_PArith_POrderedType_Positive_as_DT_le || semilattice_axioms || 3.64084209325e-28
Coq_PArith_POrderedType_Positive_as_OT_le || semilattice_axioms || 3.64084209325e-28
Coq_Structures_OrdersEx_Positive_as_DT_le || semilattice_axioms || 3.64084209325e-28
Coq_Structures_OrdersEx_Positive_as_OT_le || semilattice_axioms || 3.64084209325e-28
Coq_NArith_BinNat_N_of_nat || suc_Rep || 3.58690629162e-28
Coq_Reals_Rtopology_adherence || empty || 3.53151365832e-28
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || lattic1543629303tr_set || 3.39555242634e-28
Coq_Sorting_Sorted_Sorted_0 || monoid || 3.17696838896e-28
Coq_romega_ReflOmegaCore_Z_as_Int_le || semigroup || 3.12710068578e-28
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || semilattice_neutr || 3.02667447004e-28
Coq_Sets_Relations_2_Rstar1_0 || lexordp_eq || 3.02534168722e-28
Coq_Relations_Relation_Operators_clos_refl_0 || transitive_tranclp || 2.98660401072e-28
Coq_Reals_Rbasic_fun_Rmax || rep_filter || 2.94369477529e-28
Coq_ZArith_BinInt_Z_ldiff || bind4 || 2.79964721851e-28
Coq_PArith_POrderedType_Positive_as_DT_le || abel_semigroup || 2.74677304698e-28
Coq_PArith_POrderedType_Positive_as_OT_le || abel_semigroup || 2.74677304698e-28
Coq_Structures_OrdersEx_Positive_as_DT_le || abel_semigroup || 2.74677304698e-28
Coq_Structures_OrdersEx_Positive_as_OT_le || abel_semigroup || 2.74677304698e-28
Coq_Sets_Partial_Order_Carrier_of || measure || 2.74133966568e-28
Coq_QArith_QArith_base_Qle || semilattice_axioms || 2.70678114851e-28
Coq_Sets_Ensembles_Inhabited_0 || wf || 2.69528786559e-28
Coq_Numbers_Integer_Binary_ZBinary_Z_land || comple1176932000PREMUM || 2.68183210135e-28
Coq_Structures_OrdersEx_Z_as_OT_land || comple1176932000PREMUM || 2.68183210135e-28
Coq_Structures_OrdersEx_Z_as_DT_land || comple1176932000PREMUM || 2.68183210135e-28
Coq_PArith_POrderedType_Positive_as_DT_le || lattic35693393ce_set || 2.62461456295e-28
Coq_PArith_POrderedType_Positive_as_OT_le || lattic35693393ce_set || 2.62461456295e-28
Coq_Structures_OrdersEx_Positive_as_DT_le || lattic35693393ce_set || 2.62461456295e-28
Coq_Structures_OrdersEx_Positive_as_OT_le || lattic35693393ce_set || 2.62461456295e-28
Coq_Sets_Partial_Order_Strict_Rel_of || remdups || 2.59888725303e-28
__constr_Coq_Reals_RList_Rlist_0_1 || one2 || 2.53481862694e-28
Coq_PArith_BinPos_Pos_le || semilattice_axioms || 2.49199356986e-28
Coq_Classes_RelationClasses_Symmetric || equiv_equivp || 2.26967952035e-28
Coq_Sorting_Sorted_StronglySorted_0 || lattic1543629303tr_set || 2.22467430616e-28
Coq_Sets_Relations_1_Reflexive || distinct || 2.19941788626e-28
Coq_Reals_Rdefinitions_Rle || is_filter || 2.19798685281e-28
Coq_Numbers_Integer_Binary_ZBinary_Z_lnot || set || 2.18524515258e-28
Coq_Structures_OrdersEx_Z_as_OT_lnot || set || 2.18524515258e-28
Coq_Structures_OrdersEx_Z_as_DT_lnot || set || 2.18524515258e-28
Coq_QArith_Qcanon_Qclt || equiv_equivp || 2.17449443422e-28
Coq_Sets_Relations_3_coherent || rep_filter || 2.14730964624e-28
Coq_NArith_Ndist_ni_min || pow || 2.0837659461e-28
Coq_QArith_QArith_base_Qle || abel_semigroup || 2.07439781986e-28
Coq_Sets_Partial_Order_Carrier_of || measures || 2.01982857806e-28
Coq_QArith_QArith_base_Qle || lattic35693393ce_set || 1.98646997086e-28
Coq_PArith_BinPos_Pos_le || abel_semigroup || 1.87885926372e-28
Coq_PArith_BinPos_Pos_le || lattic35693393ce_set || 1.79514807288e-28
Coq_ZArith_BinInt_Z_land || comple1176932000PREMUM || 1.74189798539e-28
Coq_Sorting_Sorted_Sorted_0 || semilattice_neutr || 1.68480770972e-28
Coq_romega_ReflOmegaCore_Z_as_Int_lt || equiv_equivp || 1.6641263551e-28
Coq_Classes_CRelationClasses_Equivalence_0 || lattic35693393ce_set || 1.66041187832e-28
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || neg2 || 1.65189123787e-28
Coq_ZArith_BinInt_Z_lnot || set || 1.43239150282e-28
Coq_Sets_Relations_1_Symmetric || is_filter || 1.36934276001e-28
Coq_Relations_Relation_Operators_clos_refl_0 || lexordp_eq || 1.35223376487e-28
Coq_Init_Specif_proj1_sig || converse || 1.30612970032e-28
Coq_Lists_SetoidList_eqlistA_0 || pred_maxchain || 1.24789402729e-28
Coq_Init_Specif_proj1_sig || conversep || 1.18835547456e-28
Coq_Classes_CRelationClasses_RewriteRelation_0 || semilattice || 1.17258308216e-28
Coq_QArith_Qcanon_Qcle || equiv_part_equivp || 1.11419864693e-28
Coq_Lists_SetoidPermutation_PermutationA_0 || pred_chain || 1.09027804687e-28
Coq_Classes_RelationClasses_Transitive || equiv_equivp || 1.01854850988e-28
__constr_Coq_NArith_Ndist_natinf_0_1 || one2 || 1.00151509044e-28
Coq_QArith_Qcanon_Qcle || reflp || 9.62347652244e-29
Coq_Reals_Raxioms_IZR || suc_Rep || 9.07303412272e-29
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || pos2 || 8.92532631165e-29
Coq_romega_ReflOmegaCore_Z_as_Int_le || equiv_part_equivp || 8.16478535088e-29
Coq_NArith_BinNat_N_to_nat || suc_Rep || 7.96208291331e-29
Coq_romega_ReflOmegaCore_Z_as_Int_le || reflp || 7.10391526393e-29
Coq_Reals_Raxioms_INR || suc_Rep || 6.73203298793e-29
Coq_Lists_SetoidPermutation_PermutationA_0 || lexordp_eq || 6.04481590369e-29
Coq_Lists_SetoidList_eqlistA_0 || lexordp2 || 5.69803391804e-29
Coq_Sets_Cpo_PO_of_cpo || remdups || 5.30187828869e-29
Coq_Relations_Relation_Operators_clos_refl_trans_0 || neg2 || 5.25227111009e-29
Coq_Relations_Relation_Operators_clos_trans_0 || neg2 || 5.25227111009e-29
Coq_PArith_BinPos_Pos_of_succ_nat || quotient_of || 4.50977497277e-29
Coq_Numbers_Natural_BigN_BigN_BigN_le || abel_s1917375468axioms || 4.00852733863e-29
Coq_Lists_SetoidPermutation_PermutationA_0 || neg2 || 3.30070875771e-29
Coq_Numbers_Natural_BigN_BigN_BigN_lt || abel_semigroup || 3.28485805134e-29
Coq_Sets_Cpo_Complete_0 || distinct || 3.23343458884e-29
Coq_Relations_Relation_Operators_clos_refl_trans_0 || pos2 || 2.91964107055e-29
Coq_Relations_Relation_Operators_clos_trans_0 || pos2 || 2.91964107055e-29
Coq_Numbers_Natural_BigN_BigN_BigN_le || semigroup || 2.88880646387e-29
Coq_Sets_Relations_2_Rstar_0 || map_le || 2.77464197541e-29
Coq_Numbers_Natural_BigN_BigN_BigN_eq || abel_semigroup || 2.77156754665e-29
Coq_Numbers_Natural_Binary_NBinary_N_lt || semilattice || 2.67812243754e-29
Coq_Structures_OrdersEx_N_as_OT_lt || semilattice || 2.67812243754e-29
Coq_Structures_OrdersEx_N_as_DT_lt || semilattice || 2.67812243754e-29
Coq_Classes_Morphisms_ProperProxy || semilattice_neutr || 2.66826418968e-29
Coq_Classes_Morphisms_ProperProxy || monoid || 2.52297559171e-29
Coq_NArith_BinNat_N_lt || semilattice || 2.47190357352e-29
Coq_Logic_FinFun_Fin2Restrict_extend || rep_filter || 2.30053990093e-29
Coq_PArith_BinPos_Pos_to_nat || suc_Rep || 2.24988228525e-29
Coq_Numbers_Cyclic_Int31_Int31_incr || code_nat_of_integer || 2.15227044413e-29
Coq_Logic_FinFun_bFun || is_filter || 2.05697382897e-29
Coq_QArith_Qcanon_Qclt || bNF_Wellorder_wo_rel || 1.98453209664e-29
Coq_Lists_SetoidPermutation_PermutationA_0 || pos2 || 1.85560922743e-29
Coq_Init_Datatypes_orb || induct_implies || 1.76252991956e-29
Coq_PArith_BinPos_Pos_of_succ_nat || suc || 1.73646267245e-29
Coq_Init_Datatypes_andb || induct_implies || 1.61314442025e-29
Coq_Init_Datatypes_andb || induct_conj || 1.58473566034e-29
Coq_Numbers_Cyclic_Int31_Int31_twice || code_integer_of_int || 1.56120916575e-29
Coq_Init_Datatypes_orb || induct_conj || 1.5577533292e-29
Coq_Numbers_Natural_Binary_NBinary_N_divide || is_filter || 1.51166641306e-29
Coq_Structures_OrdersEx_N_as_OT_divide || is_filter || 1.51166641306e-29
Coq_Structures_OrdersEx_N_as_DT_divide || is_filter || 1.51166641306e-29
Coq_romega_ReflOmegaCore_Z_as_Int_lt || bNF_Wellorder_wo_rel || 1.51017444956e-29
Coq_NArith_BinNat_N_divide || is_filter || 1.46389538744e-29
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || abel_s1917375468axioms || 1.45971422408e-29
Coq_QArith_Qabs_Qabs || nil || 1.45827066126e-29
Coq_Numbers_Natural_BigN_BigN_BigN_divide || is_filter || 1.43775904996e-29
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || suc_Rep || 1.38841913907e-29
Coq_Structures_OrdersEx_Z_as_OT_pred || suc_Rep || 1.38841913907e-29
Coq_Structures_OrdersEx_Z_as_DT_pred || suc_Rep || 1.38841913907e-29
Coq_Reals_Rdefinitions_Rlt || semilattice || 1.38745620987e-29
Coq_Arith_PeanoNat_Nat_divide || is_filter || 1.38161344459e-29
Coq_Structures_OrdersEx_Nat_as_DT_divide || is_filter || 1.38161344459e-29
Coq_Structures_OrdersEx_Nat_as_OT_divide || is_filter || 1.38161344459e-29
Coq_Numbers_Natural_Binary_NBinary_N_add || rep_filter || 1.3788666305e-29
Coq_Structures_OrdersEx_N_as_OT_add || rep_filter || 1.3788666305e-29
Coq_Structures_OrdersEx_N_as_DT_add || rep_filter || 1.3788666305e-29
Coq_Numbers_Cyclic_Int31_Int31_twice_plus_one || nat2 || 1.33882106803e-29
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || abel_semigroup || 1.22760232432e-29
Coq_Reals_Ranalysis1_derivable_pt || lattic35693393ce_set || 1.20521052137e-29
Coq_Reals_Rtrigo_calc_toRad || suc_Rep || 1.16720083643e-29
Coq_Classes_Morphisms_Proper || lattic1543629303tr_set || 1.1406750944e-29
Coq_Classes_Morphisms_Proper || groups_monoid_list || 1.12792925158e-29
Coq_QArith_Qcanon_Qcle || antisym || 1.12202281176e-29
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || semilattice || 1.10934260238e-29
Coq_Structures_OrdersEx_Z_as_OT_lt || semilattice || 1.10934260238e-29
Coq_Structures_OrdersEx_Z_as_DT_lt || semilattice || 1.10934260238e-29
Coq_Numbers_Natural_Binary_NBinary_N_le || semilattice_axioms || 1.10020020943e-29
Coq_Structures_OrdersEx_N_as_OT_le || semilattice_axioms || 1.10020020943e-29
Coq_Structures_OrdersEx_N_as_DT_le || semilattice_axioms || 1.10020020943e-29
Coq_QArith_QArith_base_Qle || distinct || 1.09350891035e-29
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || semigroup || 1.07493562644e-29
Coq_NArith_BinNat_N_add || rep_filter || 1.06680112958e-29
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || abel_semigroup || 1.05579992973e-29
Coq_Numbers_Natural_Binary_NBinary_N_lcm || rep_filter || 1.03444310008e-29
Coq_Structures_OrdersEx_N_as_OT_lcm || rep_filter || 1.03444310008e-29
Coq_Structures_OrdersEx_N_as_DT_lcm || rep_filter || 1.03444310008e-29
Coq_NArith_BinNat_N_le || semilattice_axioms || 1.01762563108e-29
Coq_NArith_BinNat_N_lcm || rep_filter || 1.0042962958e-29
Coq_QArith_Qcanon_Qcopp || cnj || 9.91499983226e-30
Coq_Numbers_Natural_Binary_NBinary_N_le || is_filter || 9.90175199103e-30
Coq_Structures_OrdersEx_N_as_OT_le || is_filter || 9.90175199103e-30
Coq_Structures_OrdersEx_N_as_DT_le || is_filter || 9.90175199103e-30
Coq_Numbers_Natural_BigN_BigN_BigN_lcm || rep_filter || 9.87593322036e-30
Coq_QArith_Qcanon_Qcle || trans || 9.60258907084e-30
Coq_QArith_QArith_base_Qle || null || 9.58640830198e-30
Coq_Arith_PeanoNat_Nat_lcm || rep_filter || 9.51854083545e-30
Coq_Structures_OrdersEx_Nat_as_DT_lcm || rep_filter || 9.51854083545e-30
Coq_Structures_OrdersEx_Nat_as_OT_lcm || rep_filter || 9.51854083545e-30
Coq_Numbers_Natural_BigN_BigN_BigN_succ || empty || 9.29396041102e-30
Coq_Numbers_Natural_Binary_NBinary_N_le || abel_semigroup || 8.69426039676e-30
Coq_Structures_OrdersEx_N_as_OT_le || abel_semigroup || 8.69426039676e-30
Coq_Structures_OrdersEx_N_as_DT_le || abel_semigroup || 8.69426039676e-30
Coq_Numbers_Natural_Binary_NBinary_N_succ || empty || 8.68144339561e-30
Coq_Structures_OrdersEx_N_as_OT_succ || empty || 8.68144339561e-30
Coq_Structures_OrdersEx_N_as_DT_succ || empty || 8.68144339561e-30
Coq_Numbers_Natural_Binary_NBinary_N_le || lattic35693393ce_set || 8.36216680236e-30
Coq_Structures_OrdersEx_N_as_OT_le || lattic35693393ce_set || 8.36216680236e-30
Coq_Structures_OrdersEx_N_as_DT_le || lattic35693393ce_set || 8.36216680236e-30
Coq_ZArith_BinInt_Z_of_N || suc_Rep || 8.1979456954e-30
Coq_romega_ReflOmegaCore_Z_as_Int_le || antisym || 8.18837987096e-30
Coq_Numbers_Natural_BigN_BigN_BigN_le || equiv_part_equivp || 8.13357362794e-30
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || empty || 8.11704659941e-30
Coq_Structures_OrdersEx_Z_as_OT_succ || empty || 8.11704659941e-30
Coq_Structures_OrdersEx_Z_as_DT_succ || empty || 8.11704659941e-30
Coq_Numbers_Natural_BigN_BigN_BigN_lt || equiv_equivp || 8.10847933656e-30
Coq_Classes_CRelationClasses_RewriteRelation_0 || transitive_acyclic || 8.08470795446e-30
Coq_NArith_BinNat_N_le || abel_semigroup || 8.04426441271e-30
Coq_Classes_CRelationClasses_Equivalence_0 || wf || 7.91745446176e-30
Coq_NArith_BinNat_N_le || is_filter || 7.85469137304e-30
Coq_NArith_BinNat_N_le || lattic35693393ce_set || 7.73735278192e-30
Coq_NArith_BinNat_N_succ || empty || 7.7006176509e-30
Coq_Numbers_Integer_BigZ_BigZ_BigZ_succ || empty || 7.64024775563e-30
Coq_Numbers_Cyclic_Int31_Int31_twice_plus_one || nat_of_num || 7.61330839816e-30
Coq_Numbers_Cyclic_Int31_Int31_twice || pos || 7.16133569683e-30
Coq_Classes_SetoidClass_pequiv || remdups || 7.16104858401e-30
Coq_Sets_Uniset_incl || order_well_order_on || 7.11105514755e-30
Coq_Numbers_Natural_BigN_BigN_BigN_le || reflp || 7.09201271885e-30
Coq_romega_ReflOmegaCore_Z_as_Int_le || trans || 7.06142345662e-30
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || is_filter || 6.84459325136e-30
Coq_Numbers_Natural_BigN_BigN_BigN_eq || equiv_equivp || 6.79256524887e-30
Coq_Lists_List_ForallPairs || bNF_Ca1811156065der_on || 6.57243628796e-30
Coq_Init_Specif_proj1_sig || append || 6.57026008632e-30
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || is_filter || 6.3620717444e-30
Coq_Structures_OrdersEx_Z_as_OT_divide || is_filter || 6.3620717444e-30
Coq_Structures_OrdersEx_Z_as_DT_divide || is_filter || 6.3620717444e-30
__constr_Coq_Numbers_BinNums_Z_0_2 || suc_Rep || 6.28189659553e-30
Coq_Reals_Ranalysis1_continuity_pt || semilattice || 6.09381560211e-30
Coq_romega_ReflOmegaCore_Z_as_Int_mult || pow || 6.02627345887e-30
Coq_Numbers_Natural_Binary_NBinary_N_mul || rep_filter || 6.00375590588e-30
Coq_Structures_OrdersEx_N_as_OT_mul || rep_filter || 6.00375590588e-30
Coq_Structures_OrdersEx_N_as_DT_mul || rep_filter || 6.00375590588e-30
Coq_Reals_Rdefinitions_Rgt || abel_semigroup || 5.72684452861e-30
Coq_NArith_BinNat_N_mul || rep_filter || 5.72077401814e-30
Coq_Numbers_Cyclic_Int31_Int31_incr || nat2 || 5.71957045895e-30
Coq_Numbers_Natural_BigN_BigN_BigN_mul || rep_filter || 5.70818999478e-30
Coq_Reals_Rdefinitions_Rle || semilattice_axioms || 5.64139466042e-30
Coq_Arith_PeanoNat_Nat_mul || rep_filter || 5.50836289047e-30
Coq_Structures_OrdersEx_Nat_as_DT_mul || rep_filter || 5.50836289047e-30
Coq_Structures_OrdersEx_Nat_as_OT_mul || rep_filter || 5.50836289047e-30
Coq_Numbers_Rational_BigQ_BigQ_BigQ_of_Qc || pos || 5.36785047614e-30
Coq_QArith_Qcanon_this || nat_of_num || 5.35736756358e-30
Coq_Numbers_Natural_Binary_NBinary_N_max || rep_filter || 5.27710660414e-30
Coq_Structures_OrdersEx_N_as_OT_max || rep_filter || 5.27710660414e-30
Coq_Structures_OrdersEx_N_as_DT_max || rep_filter || 5.27710660414e-30
Coq_Numbers_Rational_BigQ_BigQ_BigQ_le || wf || 5.18258676956e-30
__constr_Coq_Init_Datatypes_nat_0_2 || product_Rep_unit || 5.1684385602e-30
Coq_Lists_List_ForallOrdPairs_0 || order_well_order_on || 5.09159303213e-30
Coq_QArith_Qminmax_Qmax || remdups || 5.08527052754e-30
Coq_NArith_BinNat_N_of_nat || quotient_of || 4.99943376199e-30
Coq_Numbers_Natural_BigN_BigN_BigN_lt || null2 || 4.89569386045e-30
Coq_Sets_Uniset_seq || bNF_Ca1811156065der_on || 4.83702489478e-30
Coq_Numbers_Rational_BigQ_BigQ_BigQ_max || measure || 4.76130224782e-30
Coq_Numbers_Natural_BigN_BigN_BigN_le || null2 || 4.74557504548e-30
Coq_Numbers_Natural_Binary_NBinary_N_lt || null2 || 4.57373738615e-30
Coq_Structures_OrdersEx_N_as_OT_lt || null2 || 4.57373738615e-30
Coq_Structures_OrdersEx_N_as_DT_lt || null2 || 4.57373738615e-30
Coq_ZArith_BinInt_Z_pred || suc_Rep || 4.57013737002e-30
Coq_Reals_Rdefinitions_Rle || abel_semigroup || 4.49519988317e-30
Coq_Numbers_Integer_Binary_ZBinary_Z_le || semilattice_axioms || 4.4347808192e-30
Coq_Structures_OrdersEx_Z_as_OT_le || semilattice_axioms || 4.4347808192e-30
Coq_Structures_OrdersEx_Z_as_DT_le || semilattice_axioms || 4.4347808192e-30
Coq_Numbers_Natural_Binary_NBinary_N_le || null2 || 4.42560985666e-30
Coq_Structures_OrdersEx_N_as_OT_le || null2 || 4.42560985666e-30
Coq_Structures_OrdersEx_N_as_DT_le || null2 || 4.42560985666e-30
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lcm || rep_filter || 4.41845581198e-30
Coq_Reals_Rdefinitions_Rle || lattic35693393ce_set || 4.32870058009e-30
Coq_Numbers_Integer_Binary_ZBinary_Z_lnot || cnj || 4.20874240401e-30
Coq_Structures_OrdersEx_Z_as_OT_lnot || cnj || 4.20874240401e-30
Coq_Structures_OrdersEx_Z_as_DT_lnot || cnj || 4.20874240401e-30
Coq_NArith_BinNat_N_max || rep_filter || 4.16500890867e-30
Coq_Numbers_Integer_Binary_ZBinary_Z_lcm || rep_filter || 4.12901212421e-30
Coq_Structures_OrdersEx_Z_as_OT_lcm || rep_filter || 4.12901212421e-30
Coq_Structures_OrdersEx_Z_as_DT_lcm || rep_filter || 4.12901212421e-30
Coq_NArith_BinNat_N_lt || null2 || 4.06044314659e-30
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || null2 || 4.04411037752e-30
Coq_Structures_OrdersEx_Z_as_OT_lt || null2 || 4.04411037752e-30
Coq_Structures_OrdersEx_Z_as_DT_lt || null2 || 4.04411037752e-30
Coq_NArith_BinNat_N_of_nat || suc || 4.0214678189e-30
Coq_NArith_BinNat_N_le || null2 || 3.94569299885e-30
Coq_Reals_Rdefinitions_Rge || abel_s1917375468axioms || 3.89443407365e-30
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || null2 || 3.83578196762e-30
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || code_nat_of_integer || 3.82758391112e-30
Coq_Numbers_Integer_Binary_ZBinary_Z_le || null2 || 3.822499362e-30
Coq_Structures_OrdersEx_Z_as_OT_le || null2 || 3.822499362e-30
Coq_Structures_OrdersEx_Z_as_DT_le || null2 || 3.822499362e-30
__constr_Coq_Init_Datatypes_nat_0_2 || rep_rat || 3.74468403462e-30
__constr_Coq_Init_Datatypes_nat_0_2 || rep_int || 3.74468403462e-30
__constr_Coq_Init_Datatypes_nat_0_2 || rep_real || 3.74468403462e-30
Coq_Numbers_Rational_BigQ_BigQ_BigQ_max || measures || 3.73466192548e-30
Coq_Numbers_Rational_BigQ_BigQ_BigQ_of_Qc || code_integer_of_int || 3.70394782779e-30
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || null2 || 3.63209153701e-30
Coq_Numbers_Integer_Binary_ZBinary_Z_le || abel_semigroup || 3.55312021335e-30
Coq_Structures_OrdersEx_Z_as_OT_le || abel_semigroup || 3.55312021335e-30
Coq_Structures_OrdersEx_Z_as_DT_le || abel_semigroup || 3.55312021335e-30
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || nat2 || 3.45702484082e-30
Coq_Sets_Relations_2_Rstar_0 || lexordp_eq || 3.43267812035e-30
Coq_Numbers_Integer_Binary_ZBinary_Z_le || lattic35693393ce_set || 3.4242489027e-30
Coq_Structures_OrdersEx_Z_as_OT_le || lattic35693393ce_set || 3.4242489027e-30
Coq_Structures_OrdersEx_Z_as_DT_le || lattic35693393ce_set || 3.4242489027e-30
Coq_Classes_RelationClasses_PER_0 || distinct || 3.31812735607e-30
Coq_romega_ReflOmegaCore_Z_as_Int_one || one2 || 3.31434580192e-30
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || equiv_equivp || 3.3068918954e-30
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || equiv_part_equivp || 3.27260256235e-30
Coq_QArith_Qcanon_this || nat2 || 2.99675454082e-30
Coq_Relations_Relation_Operators_clos_trans_0 || map_le || 2.8905691555e-30
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || reflp || 2.87622170279e-30
Coq_Reals_Rdefinitions_Rge || semigroup || 2.85742371522e-30
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || equiv_equivp || 2.82701935951e-30
Coq_romega_ReflOmegaCore_Z_as_Int_opp || cnj || 2.79592295453e-30
Coq_ZArith_BinInt_Z_lnot || cnj || 2.79592295453e-30
Coq_PArith_POrderedType_Positive_as_DT_lt || abel_semigroup || 2.79305318355e-30
Coq_PArith_POrderedType_Positive_as_OT_lt || abel_semigroup || 2.79305318355e-30
Coq_Structures_OrdersEx_Positive_as_DT_lt || abel_semigroup || 2.79305318355e-30
Coq_Structures_OrdersEx_Positive_as_OT_lt || abel_semigroup || 2.79305318355e-30
__constr_Coq_Numbers_BinNums_Z_0_3 || suc_Rep || 2.70359452994e-30
Coq_Numbers_Integer_BigZ_BigZ_BigZ_mul || rep_filter || 2.68371582328e-30
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || rep_filter || 2.50730659616e-30
Coq_Structures_OrdersEx_Z_as_OT_mul || rep_filter || 2.50730659616e-30
Coq_Structures_OrdersEx_Z_as_DT_mul || rep_filter || 2.50730659616e-30
Coq_ZArith_BinInt_Z_lt || semilattice || 2.36755815951e-30
Coq_ZArith_BinInt_Z_succ || empty || 2.33308871269e-30
Coq_Relations_Relation_Definitions_preorder_0 || is_filter || 2.31067507233e-30
__constr_Coq_Init_Datatypes_nat_0_2 || nat_of_char || 2.2081391897e-30
__constr_Coq_Init_Datatypes_nat_0_2 || explode || 2.2081391897e-30
__constr_Coq_Init_Datatypes_nat_0_2 || rep_Nat || 2.2081391897e-30
Coq_ZArith_BinInt_Z_of_nat || suc_Rep || 2.11031493621e-30
Coq_QArith_QArith_base_Qlt || abel_semigroup || 1.97505246787e-30
Coq_Reals_Raxioms_IZR || quotient_of || 1.94330002956e-30
Coq_PArith_BinPos_Pos_lt || abel_semigroup || 1.93795520163e-30
Coq_Lists_SetoidPermutation_PermutationA_0 || map_le || 1.91695975518e-30
Coq_Relations_Relation_Operators_clos_refl_trans_0 || rep_filter || 1.87706685585e-30
Coq_ZArith_BinInt_Z_divide || is_filter || 1.86696241354e-30
Coq_PArith_POrderedType_Positive_as_DT_le || abel_s1917375468axioms || 1.77428169023e-30
Coq_PArith_POrderedType_Positive_as_OT_le || abel_s1917375468axioms || 1.77428169023e-30
Coq_Structures_OrdersEx_Positive_as_DT_le || abel_s1917375468axioms || 1.77428169023e-30
Coq_Structures_OrdersEx_Positive_as_OT_le || abel_s1917375468axioms || 1.77428169023e-30
Coq_NArith_BinNat_N_to_nat || suc || 1.71166860038e-30
Coq_PArith_BinPos_Pos_of_succ_nat || code_int_of_integer || 1.68000774744e-30
Coq_PArith_POrderedType_Positive_as_DT_le || wf || 1.58098879229e-30
Coq_PArith_POrderedType_Positive_as_OT_le || wf || 1.58098879229e-30
Coq_Structures_OrdersEx_Positive_as_DT_le || wf || 1.58098879229e-30
Coq_Structures_OrdersEx_Positive_as_OT_le || wf || 1.58098879229e-30
Coq_Reals_Rdefinitions_Rgt || equiv_equivp || 1.57499328945e-30
Coq_Reals_Raxioms_INR || quotient_of || 1.51082045365e-30
Coq_PArith_POrderedType_Positive_as_DT_max || measure || 1.50932139463e-30
Coq_PArith_POrderedType_Positive_as_OT_max || measure || 1.50932139463e-30
Coq_Structures_OrdersEx_Positive_as_DT_max || measure || 1.50932139463e-30
Coq_Structures_OrdersEx_Positive_as_OT_max || measure || 1.50932139463e-30
Coq_QArith_Qminmax_Qmax || measure || 1.46463893479e-30
Coq_NArith_BinNat_N_to_nat || quotient_of || 1.42663849992e-30
Coq_QArith_QArith_base_Qle || wf || 1.42613584333e-30
Coq_PArith_POrderedType_Positive_as_DT_le || semigroup || 1.33577970469e-30
Coq_PArith_POrderedType_Positive_as_OT_le || semigroup || 1.33577970469e-30
Coq_Structures_OrdersEx_Positive_as_DT_le || semigroup || 1.33577970469e-30
Coq_Structures_OrdersEx_Positive_as_OT_le || semigroup || 1.33577970469e-30
Coq_ZArith_BinInt_Z_lcm || rep_filter || 1.32911938584e-30
Coq_PArith_BinPos_Pos_le || wf || 1.3169969354e-30
Coq_PArith_BinPos_Pos_le || abel_s1917375468axioms || 1.25683928763e-30
Coq_PArith_BinPos_Pos_max || measure || 1.23809915845e-30
Coq_QArith_QArith_base_Qle || abel_s1917375468axioms || 1.18843388037e-30
Coq_PArith_POrderedType_Positive_as_DT_max || measures || 1.18719014491e-30
Coq_PArith_POrderedType_Positive_as_OT_max || measures || 1.18719014491e-30
Coq_Structures_OrdersEx_Positive_as_DT_max || measures || 1.18719014491e-30
Coq_Structures_OrdersEx_Positive_as_OT_max || measures || 1.18719014491e-30
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || suc_Rep || 1.18061961227e-30
Coq_Structures_OrdersEx_Z_as_OT_succ || suc_Rep || 1.18061961227e-30
Coq_Structures_OrdersEx_Z_as_DT_succ || suc_Rep || 1.18061961227e-30
Coq_QArith_Qminmax_Qmax || measures || 1.13501880207e-30
Coq_ZArith_BinInt_Z_lt || null2 || 1.12083584006e-30
Coq_Sets_Relations_1_Order_0 || is_filter || 1.10028571406e-30
Coq_ZArith_BinInt_Z_le || null2 || 1.07749297963e-30
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || suc_Rep || 1.05934083542e-30
Coq_Structures_OrdersEx_Z_as_OT_opp || suc_Rep || 1.05934083542e-30
Coq_Structures_OrdersEx_Z_as_DT_opp || suc_Rep || 1.05934083542e-30
Coq_Classes_Morphisms_Normalizes || bNF_Ca1811156065der_on || 1.03750283028e-30
Coq_Sets_Partial_Order_Rel_of || rep_filter || 1.01052709035e-30
Coq_PArith_BinPos_Pos_max || measures || 9.786366612e-31
Coq_Numbers_Natural_BigN_BigN_BigN_le || bind4 || 9.72761555856e-31
Coq_PArith_BinPos_Pos_le || semigroup || 9.45180343324e-31
Coq_ZArith_BinInt_Z_le || semilattice_axioms || 9.42408824889e-31
Coq_Numbers_Natural_Binary_NBinary_N_le || bind4 || 9.1453853978e-31
Coq_Structures_OrdersEx_N_as_OT_le || bind4 || 9.1453853978e-31
Coq_Structures_OrdersEx_N_as_DT_le || bind4 || 9.1453853978e-31
Coq_QArith_QArith_base_Qle || semigroup || 9.09933123468e-31
Coq_Relations_Relation_Definitions_equivalence_0 || is_filter || 8.66813828193e-31
Coq_Classes_RelationClasses_relation_equivalence || order_well_order_on || 8.66014884654e-31
Coq_Reals_Rdefinitions_Rge || equiv_part_equivp || 8.62422486218e-31
Coq_NArith_BinNat_N_le || bind4 || 8.59084586984e-31
Coq_PArith_POrderedType_Positive_as_DT_lt || equiv_equivp || 8.55404311174e-31
Coq_PArith_POrderedType_Positive_as_OT_lt || equiv_equivp || 8.55404311174e-31
Coq_Structures_OrdersEx_Positive_as_DT_lt || equiv_equivp || 8.55404311174e-31
Coq_Structures_OrdersEx_Positive_as_OT_lt || equiv_equivp || 8.55404311174e-31
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || bind4 || 8.41551944444e-31
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || rep_filter || 8.32856802558e-31
Coq_PArith_BinPos_Pos_to_nat || suc || 8.20932814297e-31
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || bind4 || 8.1689327673e-31
Coq_Structures_OrdersEx_Z_as_OT_lt || bind4 || 8.1689327673e-31
Coq_Structures_OrdersEx_Z_as_DT_lt || bind4 || 8.1689327673e-31
Coq_ZArith_BinInt_Z_le || abel_semigroup || 7.65977234371e-31
Coq_Reals_Rdefinitions_Rge || reflp || 7.59640159922e-31
Coq_PArith_BinPos_Pos_pred || code_Suc || 7.42195883609e-31
Coq_ZArith_BinInt_Z_le || lattic35693393ce_set || 7.39762788681e-31
Coq_Numbers_Natural_BigN_BigN_BigN_lt || comple1176932000PREMUM || 7.22147720519e-31
Coq_ZArith_BinInt_Z_mul || rep_filter || 6.86709382502e-31
Coq_Numbers_Natural_Binary_NBinary_N_lt || comple1176932000PREMUM || 6.80193951204e-31
Coq_Structures_OrdersEx_N_as_OT_lt || comple1176932000PREMUM || 6.80193951204e-31
Coq_Structures_OrdersEx_N_as_DT_lt || comple1176932000PREMUM || 6.80193951204e-31
Coq_PArith_BinPos_Pos_of_nat || code_natural_of_nat || 6.68090073584e-31
Coq_QArith_QArith_base_Qlt || equiv_equivp || 6.4874995806e-31
Coq_NArith_BinNat_N_lt || comple1176932000PREMUM || 6.38052507362e-31
Coq_Numbers_Natural_BigN_BigN_BigN_succ || set || 6.20785916244e-31
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || comple1176932000PREMUM || 6.03754597649e-31
Coq_PArith_BinPos_Pos_lt || equiv_equivp || 5.90701875256e-31
Coq_Numbers_Integer_Binary_ZBinary_Z_le || comple1176932000PREMUM || 5.85873127839e-31
Coq_Structures_OrdersEx_Z_as_OT_le || comple1176932000PREMUM || 5.85873127839e-31
Coq_Structures_OrdersEx_Z_as_DT_le || comple1176932000PREMUM || 5.85873127839e-31
Coq_Numbers_Integer_BigZ_BigZ_BigZ_pred || set || 5.85614089969e-31
Coq_Numbers_Natural_Binary_NBinary_N_succ || set || 5.84893167199e-31
Coq_Structures_OrdersEx_N_as_OT_succ || set || 5.84893167199e-31
Coq_Structures_OrdersEx_N_as_DT_succ || set || 5.84893167199e-31
Coq_Init_Datatypes_CompOpp || cnj || 5.82517849797e-31
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || set || 5.70605666365e-31
Coq_Structures_OrdersEx_Z_as_OT_pred || set || 5.70605666365e-31
Coq_Structures_OrdersEx_Z_as_DT_pred || set || 5.70605666365e-31
Coq_NArith_BinNat_N_succ || set || 5.48309831224e-31
__constr_Coq_Numbers_BinNums_Z_0_2 || quotient_of || 4.99042367236e-31
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || bind4 || 4.95876198494e-31
Coq_PArith_BinPos_Pos_to_nat || quotient_of || 4.93321232813e-31
Coq_Numbers_Integer_Binary_ZBinary_Z_le || bind4 || 4.83315650785e-31
Coq_Structures_OrdersEx_Z_as_OT_le || bind4 || 4.83315650785e-31
Coq_Structures_OrdersEx_Z_as_DT_le || bind4 || 4.83315650785e-31
Coq_ZArith_BinInt_Z_of_N || suc || 4.51137056876e-31
Coq_PArith_POrderedType_Positive_as_DT_le || equiv_part_equivp || 4.44851776381e-31
Coq_PArith_POrderedType_Positive_as_OT_le || equiv_part_equivp || 4.44851776381e-31
Coq_Structures_OrdersEx_Positive_as_DT_le || equiv_part_equivp || 4.44851776381e-31
Coq_Structures_OrdersEx_Positive_as_OT_le || equiv_part_equivp || 4.44851776381e-31
Coq_Init_Nat_pred || suc || 4.24752672243e-31
Coq_Sets_Relations_2_Rstar_0 || set2 || 4.07666228622e-31
Coq_PArith_POrderedType_Positive_as_DT_le || reflp || 3.95437330036e-31
Coq_PArith_POrderedType_Positive_as_OT_le || reflp || 3.95437330036e-31
Coq_Structures_OrdersEx_Positive_as_DT_le || reflp || 3.95437330036e-31
Coq_Structures_OrdersEx_Positive_as_OT_le || reflp || 3.95437330036e-31
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || comple1176932000PREMUM || 3.77658855999e-31
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || comple1176932000PREMUM || 3.68771224445e-31
Coq_Structures_OrdersEx_Z_as_OT_lt || comple1176932000PREMUM || 3.68771224445e-31
Coq_Structures_OrdersEx_Z_as_DT_lt || comple1176932000PREMUM || 3.68771224445e-31
Coq_Sets_Relations_1_Transitive || finite_finite2 || 3.6779230688e-31
Coq_ZArith_BinInt_Z_succ || suc_Rep || 3.5826185075e-31
Coq_Numbers_Integer_BigZ_BigZ_BigZ_succ || set || 3.36088793022e-31
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || set || 3.29825903049e-31
Coq_Structures_OrdersEx_Z_as_OT_succ || set || 3.29825903049e-31
Coq_Structures_OrdersEx_Z_as_DT_succ || set || 3.29825903049e-31
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || quotient_of || 3.28117927271e-31
Coq_Structures_OrdersEx_Z_as_OT_pred || quotient_of || 3.28117927271e-31
Coq_Structures_OrdersEx_Z_as_DT_pred || quotient_of || 3.28117927271e-31
Coq_QArith_QArith_base_Qle || equiv_part_equivp || 3.23042163335e-31
Coq_Numbers_Natural_BigN_BigN_BigN_divide || distinct || 3.17289835213e-31
Coq_PArith_BinPos_Pos_le || equiv_part_equivp || 3.13569294641e-31
__constr_Coq_Init_Datatypes_nat_0_2 || nat_of_nibble || 3.11664881417e-31
Coq_PArith_POrderedType_Positive_as_DT_add || set2 || 2.94871608685e-31
Coq_PArith_POrderedType_Positive_as_OT_add || set2 || 2.94871608685e-31
Coq_Structures_OrdersEx_Positive_as_DT_add || set2 || 2.94871608685e-31
Coq_Structures_OrdersEx_Positive_as_OT_add || set2 || 2.94871608685e-31
Coq_QArith_QArith_base_Qle || reflp || 2.88916408247e-31
Coq_Reals_Raxioms_INR || code_nat_of_natural || 2.84900552257e-31
Coq_PArith_BinPos_Pos_le || reflp || 2.78613939162e-31
Coq_PArith_POrderedType_Positive_as_DT_lt || finite_finite2 || 2.67886350132e-31
Coq_PArith_POrderedType_Positive_as_OT_lt || finite_finite2 || 2.67886350132e-31
Coq_Structures_OrdersEx_Positive_as_DT_lt || finite_finite2 || 2.67886350132e-31
Coq_Structures_OrdersEx_Positive_as_OT_lt || finite_finite2 || 2.67886350132e-31
Coq_Reals_Ranalysis1_derivable_pt || wf || 2.60574694722e-31
Coq_Numbers_Natural_BigN_BigN_BigN_le || is_filter || 2.53018745781e-31
Coq_NArith_BinNat_N_of_nat || code_int_of_integer || 2.48287175697e-31
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || bNF_Ca1811156065der_on || 2.40545551022e-31
Coq_Reals_Rdefinitions_Rgt || bNF_Wellorder_wo_rel || 2.3614772352e-31
__constr_Coq_Numbers_BinNums_Z_0_3 || suc || 2.30878217134e-31
Coq_Numbers_Natural_BigN_BigN_BigN_lcm || remdups || 2.27757886128e-31
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || order_well_order_on || 2.26555336756e-31
Coq_ZArith_BinInt_Z_of_N || quotient_of || 2.09956405487e-31
Coq_ZArith_BinInt_Z_of_nat || suc || 1.98452588782e-31
Coq_QArith_Qabs_Qabs || empty || 1.8901885272e-31
Coq_Sets_Partial_Order_Carrier_of || rep_filter || 1.87922801687e-31
Coq_Sets_Partial_Order_Strict_Rel_of || set2 || 1.8712450284e-31
Coq_Reals_Ranalysis1_continuity_pt || transitive_acyclic || 1.86921651729e-31
Coq_Numbers_Natural_BigN_BigN_BigN_max || rep_filter || 1.8266697105e-31
Coq_PArith_BinPos_Pos_add || set2 || 1.76920754397e-31
Coq_Sets_Relations_1_Reflexive || finite_finite2 || 1.70241201281e-31
Coq_Sets_Ensembles_Inhabited_0 || is_filter || 1.69285871634e-31
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || distinct || 1.66205990155e-31
Coq_PArith_BinPos_Pos_lt || finite_finite2 || 1.62902904865e-31
Coq_Sorting_Sorted_StronglySorted_0 || bNF_Ca1811156065der_on || 1.61549424166e-31
Coq_QArith_QArith_base_Qle || null2 || 1.58519156391e-31
Coq_Sets_Ensembles_Singleton_0 || rep_filter || 1.58074163388e-31
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || distinct || 1.56679667978e-31
Coq_Structures_OrdersEx_Z_as_OT_divide || distinct || 1.56679667978e-31
Coq_Structures_OrdersEx_Z_as_DT_divide || distinct || 1.56679667978e-31
Coq_Logic_FinFun_Fin2Restrict_extend || remdups || 1.54075605736e-31
__constr_Coq_Init_Datatypes_nat_0_2 || implode str || 1.49741084887e-31
Coq_ZArith_BinInt_Z_le || bind4 || 1.48897694483e-31
Coq_ZArith_BinInt_Z_opp || suc_Rep || 1.43846021248e-31
Coq_Reals_Rdefinitions_Rge || antisym || 1.39530234573e-31
Coq_Numbers_Natural_BigN_BigN_BigN_mul || remdups || 1.38604253626e-31
Coq_Numbers_Natural_BigN_BigN_BigN_add || rep_filter || 1.37020332453e-31
Coq_Sorting_Sorted_Sorted_0 || order_well_order_on || 1.34889421671e-31
Coq_ZArith_BinInt_Z_pred || quotient_of || 1.27744923601e-31
Coq_Logic_FinFun_bFun || distinct || 1.25990231897e-31
Coq_Reals_Raxioms_IZR || code_int_of_integer || 1.25767863821e-31
Coq_Sets_Finite_sets_Finite_0 || is_filter || 1.25255464829e-31
Coq_Reals_Rdefinitions_Rge || trans || 1.21929993665e-31
Coq_ZArith_BinInt_Z_lt || comple1176932000PREMUM || 1.14668704281e-31
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lcm || remdups || 1.12910711152e-31
Coq_Lists_SetoidPermutation_PermutationA_0 || transitive_tranclp || 1.07513937906e-31
Coq_Numbers_Integer_Binary_ZBinary_Z_lcm || remdups || 1.06908416405e-31
Coq_Structures_OrdersEx_Z_as_OT_lcm || remdups || 1.06908416405e-31
Coq_Structures_OrdersEx_Z_as_DT_lcm || remdups || 1.06908416405e-31
Coq_ZArith_BinInt_Z_succ || set || 1.05411672685e-31
__constr_Coq_Init_Datatypes_nat_0_2 || arctan || 1.01979759296e-31
Coq_Reals_Raxioms_INR || code_int_of_integer || 1.00663916619e-31
Coq_Reals_R_sqrt_sqrt || code_nat_of_integer || 8.85758209783e-32
Coq_NArith_BinNat_N_to_nat || code_int_of_integer || 8.26665373075e-32
__constr_Coq_Numbers_BinNums_Z_0_3 || quotient_of || 8.1626283374e-32
Coq_Numbers_Natural_Binary_NBinary_N_lt || abel_semigroup || 7.79480033041e-32
Coq_Structures_OrdersEx_N_as_OT_lt || abel_semigroup || 7.79480033041e-32
Coq_Structures_OrdersEx_N_as_DT_lt || abel_semigroup || 7.79480033041e-32
__constr_Coq_Numbers_BinNums_Z_0_2 || code_int_of_integer || 7.53733230333e-32
Coq_NArith_BinNat_N_lt || abel_semigroup || 7.2169714079e-32
Coq_Numbers_Integer_BigZ_BigZ_BigZ_mul || remdups || 7.16608340008e-32
Coq_Reals_RIneq_Rsqr || code_integer_of_int || 6.79437436888e-32
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || remdups || 6.78440703846e-32
Coq_Structures_OrdersEx_Z_as_OT_mul || remdups || 6.78440703846e-32
Coq_Structures_OrdersEx_Z_as_DT_mul || remdups || 6.78440703846e-32
Coq_ZArith_BinInt_Z_of_nat || quotient_of || 6.60417072042e-32
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || code_nat_of_natural || 6.31440344099e-32
Coq_Structures_OrdersEx_Z_as_OT_pred || code_nat_of_natural || 6.31440344099e-32
Coq_Structures_OrdersEx_Z_as_DT_pred || code_nat_of_natural || 6.31440344099e-32
Coq_Reals_Rbasic_fun_Rabs || nat2 || 5.82514812678e-32
Coq_Reals_Rbasic_fun_Rmax || set2 || 5.80096469245e-32
Coq_ZArith_BinInt_Z_divide || distinct || 5.52931749507e-32
__constr_Coq_Init_Datatypes_nat_0_2 || cnj || 5.26987495234e-32
Coq_PArith_POrderedType_Positive_as_DT_lt || null2 || 5.02879741139e-32
Coq_PArith_POrderedType_Positive_as_OT_lt || null2 || 5.02879741139e-32
Coq_Structures_OrdersEx_Positive_as_DT_lt || null2 || 5.02879741139e-32
Coq_Structures_OrdersEx_Positive_as_OT_lt || null2 || 5.02879741139e-32
Coq_Numbers_Natural_Binary_NBinary_N_le || abel_s1917375468axioms || 4.73143474151e-32
Coq_Structures_OrdersEx_N_as_OT_le || abel_s1917375468axioms || 4.73143474151e-32
Coq_Structures_OrdersEx_N_as_DT_le || abel_s1917375468axioms || 4.73143474151e-32
Coq_PArith_POrderedType_Positive_as_DT_succ || empty || 4.72500111326e-32
Coq_PArith_POrderedType_Positive_as_OT_succ || empty || 4.72500111326e-32
Coq_Structures_OrdersEx_Positive_as_DT_succ || empty || 4.72500111326e-32
Coq_Structures_OrdersEx_Positive_as_OT_succ || empty || 4.72500111326e-32
Coq_Numbers_Natural_Binary_NBinary_N_succ_double || suc_Rep || 4.67010853724e-32
Coq_Structures_OrdersEx_N_as_OT_succ_double || suc_Rep || 4.67010853724e-32
Coq_Structures_OrdersEx_N_as_DT_succ_double || suc_Rep || 4.67010853724e-32
Coq_Reals_Rdefinitions_Rle || finite_finite2 || 4.66249831027e-32
Coq_NArith_BinNat_N_le || abel_s1917375468axioms || 4.39013007069e-32
Coq_ZArith_BinInt_Z_lcm || remdups || 4.0873118985e-32
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || quotient_of || 4.01396856207e-32
Coq_Structures_OrdersEx_Z_as_OT_succ || quotient_of || 4.01396856207e-32
Coq_Structures_OrdersEx_Z_as_DT_succ || quotient_of || 4.01396856207e-32
Coq_Reals_Rdefinitions_Rlt || abel_semigroup || 3.93585822687e-32
Coq_Numbers_Natural_Binary_NBinary_N_le || semigroup || 3.7346924429e-32
Coq_Structures_OrdersEx_N_as_OT_le || semigroup || 3.7346924429e-32
Coq_Structures_OrdersEx_N_as_DT_le || semigroup || 3.7346924429e-32
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || quotient_of || 3.65707398932e-32
Coq_Structures_OrdersEx_Z_as_OT_opp || quotient_of || 3.65707398932e-32
Coq_Structures_OrdersEx_Z_as_DT_opp || quotient_of || 3.65707398932e-32
Coq_NArith_BinNat_N_le || semigroup || 3.46624356391e-32
Coq_Reals_Rbasic_fun_Rabs || nat_of_num || 3.38427269579e-32
Coq_Reals_RIneq_Rsqr || pos || 3.34692651592e-32
Coq_PArith_BinPos_Pos_to_nat || code_int_of_integer || 3.23968206077e-32
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || abel_semigroup || 3.0432684226e-32
Coq_Structures_OrdersEx_Z_as_OT_lt || abel_semigroup || 3.0432684226e-32
Coq_Structures_OrdersEx_Z_as_DT_lt || abel_semigroup || 3.0432684226e-32
Coq_Numbers_Natural_Binary_NBinary_N_lt || equiv_equivp || 2.90364296929e-32
Coq_Structures_OrdersEx_N_as_OT_lt || equiv_equivp || 2.90364296929e-32
Coq_Structures_OrdersEx_N_as_DT_lt || equiv_equivp || 2.90364296929e-32
Coq_Reals_R_sqrt_sqrt || nat2 || 2.82382505839e-32
Coq_Numbers_Natural_Binary_NBinary_N_succ || quotient_of || 2.70812902368e-32
Coq_Structures_OrdersEx_N_as_OT_succ || quotient_of || 2.70812902368e-32
Coq_Structures_OrdersEx_N_as_DT_succ || quotient_of || 2.70812902368e-32
Coq_NArith_BinNat_N_lt || equiv_equivp || 2.69144956393e-32
Coq_ZArith_BinInt_Z_pred || code_nat_of_natural || 2.62683621833e-32
Coq_PArith_BinPos_Pos_lt || null2 || 2.48768290154e-32
Coq_Classes_Morphisms_ProperProxy || order_well_order_on || 2.41054504071e-32
Coq_Reals_Rdefinitions_Rle || abel_s1917375468axioms || 2.36569656068e-32
Coq_NArith_BinNat_N_succ || quotient_of || 2.36079951788e-32
Coq_PArith_BinPos_Pos_succ || empty || 2.31405262792e-32
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || code_int_of_integer || 2.25791159495e-32
Coq_Structures_OrdersEx_Z_as_OT_pred || code_int_of_integer || 2.25791159495e-32
Coq_Structures_OrdersEx_Z_as_DT_pred || code_int_of_integer || 2.25791159495e-32
Coq_ZArith_BinInt_Z_mul || remdups || 2.23466094763e-32
Coq_Reals_Rtrigo_calc_toRad || quotient_of || 2.11204890617e-32
Coq_Reals_Rdefinitions_Rle || semigroup || 1.88321705458e-32
__constr_Coq_Init_Datatypes_nat_0_2 || sqrt || 1.81914357815e-32
Coq_Numbers_Integer_Binary_ZBinary_Z_le || abel_s1917375468axioms || 1.79883046575e-32
Coq_Structures_OrdersEx_Z_as_OT_le || abel_s1917375468axioms || 1.79883046575e-32
Coq_Structures_OrdersEx_Z_as_DT_le || abel_s1917375468axioms || 1.79883046575e-32
Coq_Numbers_Natural_BigN_BigN_BigN_le || semilattice || 1.79498912022e-32
__constr_Coq_Numbers_BinNums_Z_0_3 || code_nat_of_natural || 1.73065447569e-32
Coq_Relations_Relation_Definitions_preorder_0 || distinct || 1.57136341552e-32
Coq_Numbers_Natural_Binary_NBinary_N_double || suc_Rep || 1.54009535724e-32
Coq_Structures_OrdersEx_N_as_OT_double || suc_Rep || 1.54009535724e-32
Coq_Structures_OrdersEx_N_as_DT_double || suc_Rep || 1.54009535724e-32
Coq_ZArith_BinInt_Z_of_N || code_int_of_integer || 1.5194220786e-32
Coq_Reals_Rdefinitions_Rlt || equiv_equivp || 1.51839901054e-32
Coq_Numbers_Natural_Binary_NBinary_N_le || equiv_part_equivp || 1.49169374313e-32
Coq_Structures_OrdersEx_N_as_OT_le || equiv_part_equivp || 1.49169374313e-32
Coq_Structures_OrdersEx_N_as_DT_le || equiv_part_equivp || 1.49169374313e-32
Coq_Relations_Relation_Operators_clos_refl_trans_0 || remdups || 1.46835337203e-32
Coq_Numbers_Integer_Binary_ZBinary_Z_le || semigroup || 1.4402405391e-32
Coq_Structures_OrdersEx_Z_as_OT_le || semigroup || 1.4402405391e-32
Coq_Structures_OrdersEx_Z_as_DT_le || semigroup || 1.4402405391e-32
Coq_ZArith_BinInt_Z_succ || quotient_of || 1.4362290835e-32
Coq_romega_ReflOmegaCore_Z_as_Int_plus || root || 1.42480747758e-32
Coq_QArith_Qcanon_Qclt || lattic35693393ce_set || 1.41701817924e-32
Coq_QArith_Qcanon_Qcle || semilattice || 1.39717794971e-32
Coq_NArith_BinNat_N_le || equiv_part_equivp || 1.38601357377e-32
Coq_Numbers_Natural_Binary_NBinary_N_le || reflp || 1.34886738583e-32
Coq_Structures_OrdersEx_N_as_OT_le || reflp || 1.34886738583e-32
Coq_Structures_OrdersEx_N_as_DT_le || reflp || 1.34886738583e-32
Coq_NArith_BinNat_N_le || reflp || 1.2534270469e-32
Coq_Classes_Morphisms_Proper || bNF_Ca1811156065der_on || 1.23437699879e-32
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || equiv_equivp || 1.20234125841e-32
Coq_Structures_OrdersEx_Z_as_OT_lt || equiv_equivp || 1.20234125841e-32
Coq_Structures_OrdersEx_Z_as_DT_lt || equiv_equivp || 1.20234125841e-32
Coq_Sets_Partial_Order_Rel_of || remdups || 1.00756989371e-32
Coq_Sets_Relations_1_Order_0 || distinct || 9.77852274064e-33
Coq_ZArith_BinInt_Z_pred || code_int_of_integer || 9.76781586165e-33
Coq_romega_ReflOmegaCore_Z_as_Int_lt || lattic35693393ce_set || 9.38825973582e-33
Coq_Numbers_Natural_BigN_BigN_BigN_lt || lattic35693393ce_set || 9.1520305445e-33
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || remdups || 8.96719353498e-33
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || code_nat_of_natural || 8.92337102717e-33
Coq_Structures_OrdersEx_Z_as_OT_succ || code_nat_of_natural || 8.92337102717e-33
Coq_Structures_OrdersEx_Z_as_DT_succ || code_nat_of_natural || 8.92337102717e-33
Coq_romega_ReflOmegaCore_Z_as_Int_le || semilattice || 8.89424923668e-33
Coq_Relations_Relation_Definitions_equivalence_0 || distinct || 8.39323579422e-33
Coq_Numbers_Natural_BigN_BigN_BigN_eq || lattic35693393ce_set || 8.03539280705e-33
Coq_Reals_Rdefinitions_Rle || equiv_part_equivp || 7.77013420716e-33
Coq_Reals_Rdefinitions_Rle || reflp || 7.04832343729e-33
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || semilattice || 6.80134776363e-33
__constr_Coq_Numbers_BinNums_Z_0_3 || code_int_of_integer || 6.5530231578e-33
Coq_ZArith_BinInt_Z_opp || quotient_of || 6.50995602955e-33
Coq_ZArith_BinInt_Z_lt || abel_semigroup || 6.35012070358e-33
Coq_Numbers_Natural_Binary_NBinary_N_succ || code_nat_of_natural || 6.17698998565e-33
Coq_Structures_OrdersEx_N_as_OT_succ || code_nat_of_natural || 6.17698998565e-33
Coq_Structures_OrdersEx_N_as_DT_succ || code_nat_of_natural || 6.17698998565e-33
Coq_Numbers_Integer_Binary_ZBinary_Z_le || equiv_part_equivp || 6.07371327379e-33
Coq_Structures_OrdersEx_Z_as_OT_le || equiv_part_equivp || 6.07371327379e-33
Coq_Structures_OrdersEx_Z_as_DT_le || equiv_part_equivp || 6.07371327379e-33
Coq_Numbers_Integer_Binary_ZBinary_Z_le || reflp || 5.52150463382e-33
Coq_Structures_OrdersEx_Z_as_OT_le || reflp || 5.52150463382e-33
Coq_Structures_OrdersEx_Z_as_DT_le || reflp || 5.52150463382e-33
Coq_NArith_BinNat_N_succ || code_nat_of_natural || 5.43268299965e-33
Coq_ZArith_Int_Z_as_Int_i2z || suc_Rep || 4.44053935242e-33
Coq_QArith_Qcanon_Qcle || transitive_acyclic || 4.18984189044e-33
Coq_ZArith_BinInt_Z_le || abel_s1917375468axioms || 3.74097423403e-33
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || lattic35693393ce_set || 3.51225591799e-33
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || code_int_of_integer || 3.4751012665e-33
Coq_Structures_OrdersEx_Z_as_OT_succ || code_int_of_integer || 3.4751012665e-33
Coq_Structures_OrdersEx_Z_as_DT_succ || code_int_of_integer || 3.4751012665e-33
Coq_ZArith_BinInt_Z_succ || code_nat_of_natural || 3.41137785258e-33
Coq_QArith_Qcanon_Qclt || wf || 3.33743334133e-33
Coq_Numbers_Rational_BigQ_BigQ_BigQ_max || rep_filter || 3.30676295569e-33
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || code_int_of_integer || 3.19713160495e-33
Coq_Structures_OrdersEx_Z_as_OT_opp || code_int_of_integer || 3.19713160495e-33
Coq_Structures_OrdersEx_Z_as_DT_opp || code_int_of_integer || 3.19713160495e-33
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || lattic35693393ce_set || 3.13105011216e-33
Coq_ZArith_BinInt_Z_le || semigroup || 3.03868128328e-33
Coq_Numbers_Rational_BigQ_BigQ_BigQ_le || is_filter || 2.97486825009e-33
Coq_Sets_Partial_Order_Carrier_of || remdups || 2.92585613891e-33
Coq_ZArith_BinInt_Z_lt || equiv_equivp || 2.66273744015e-33
Coq_romega_ReflOmegaCore_Z_as_Int_le || transitive_acyclic || 2.47037118156e-33
Coq_Sets_Ensembles_Inhabited_0 || distinct || 2.4439732114e-33
Coq_Numbers_Natural_Binary_NBinary_N_succ || code_int_of_integer || 2.4425728338e-33
Coq_Structures_OrdersEx_N_as_OT_succ || code_int_of_integer || 2.4425728338e-33
Coq_Structures_OrdersEx_N_as_DT_succ || code_int_of_integer || 2.4425728338e-33
Coq_Bool_Bool_Is_true || suc_Rep || 2.31266284332e-33
Coq_NArith_BinNat_N_succ || code_int_of_integer || 2.15961149392e-33
Coq_romega_ReflOmegaCore_Z_as_Int_lt || wf || 2.05233410371e-33
Coq_Reals_Rtrigo_def_exp || suc_Rep || 1.73306219287e-33
Coq_Reals_Rtrigo_calc_toRad || code_nat_of_natural || 1.5121762089e-33
Coq_Sets_Cpo_PO_of_cpo || set2 || 1.42744532606e-33
Coq_ZArith_BinInt_Z_succ || code_int_of_integer || 1.38193625747e-33
Coq_ZArith_BinInt_Z_le || equiv_part_equivp || 1.35463955934e-33
Coq_Arith_PeanoNat_Nat_b2n || suc_Rep || 1.32580976429e-33
Coq_Numbers_Natural_Binary_NBinary_N_b2n || suc_Rep || 1.32580976429e-33
Coq_NArith_BinNat_N_b2n || suc_Rep || 1.32580976429e-33
Coq_Structures_OrdersEx_N_as_OT_b2n || suc_Rep || 1.32580976429e-33
Coq_Structures_OrdersEx_N_as_DT_b2n || suc_Rep || 1.32580976429e-33
Coq_Structures_OrdersEx_Nat_as_DT_b2n || suc_Rep || 1.32580976429e-33
Coq_Structures_OrdersEx_Nat_as_OT_b2n || suc_Rep || 1.32580976429e-33
Coq_ZArith_BinInt_Z_le || reflp || 1.23817847506e-33
Coq_Sets_Cpo_Complete_0 || finite_finite2 || 1.09303486366e-33
Coq_Numbers_Integer_Binary_ZBinary_Z_b2z || suc_Rep || 1.03273678989e-33
Coq_Structures_OrdersEx_Z_as_OT_b2z || suc_Rep || 1.03273678989e-33
Coq_Structures_OrdersEx_Z_as_DT_b2z || suc_Rep || 1.03273678989e-33
Coq_ZArith_BinInt_Z_b2z || suc_Rep || 1.03273678989e-33
Coq_PArith_POrderedType_Positive_as_DT_max || rep_filter || 1.01748592363e-33
Coq_PArith_POrderedType_Positive_as_OT_max || rep_filter || 1.01748592363e-33
Coq_Structures_OrdersEx_Positive_as_DT_max || rep_filter || 1.01748592363e-33
Coq_Structures_OrdersEx_Positive_as_OT_max || rep_filter || 1.01748592363e-33
Coq_QArith_Qminmax_Qmax || rep_filter || 9.60002138426e-34
Coq_Numbers_Natural_Binary_NBinary_N_divide || finite_finite2 || 9.5839887161e-34
Coq_Structures_OrdersEx_N_as_OT_divide || finite_finite2 || 9.5839887161e-34
Coq_Structures_OrdersEx_N_as_DT_divide || finite_finite2 || 9.5839887161e-34
Coq_NArith_BinNat_N_divide || finite_finite2 || 9.34208206303e-34
Coq_Numbers_Natural_BigN_BigN_BigN_divide || finite_finite2 || 9.26601764929e-34
Coq_Arith_PeanoNat_Nat_divide || finite_finite2 || 9.03036068339e-34
Coq_Structures_OrdersEx_Nat_as_DT_divide || finite_finite2 || 9.03036068339e-34
Coq_Structures_OrdersEx_Nat_as_OT_divide || finite_finite2 || 9.03036068339e-34
Coq_PArith_POrderedType_Positive_as_DT_le || is_filter || 8.61621304312e-34
Coq_PArith_POrderedType_Positive_as_OT_le || is_filter || 8.61621304312e-34
Coq_Structures_OrdersEx_Positive_as_DT_le || is_filter || 8.61621304312e-34
Coq_Structures_OrdersEx_Positive_as_OT_le || is_filter || 8.61621304312e-34
Coq_PArith_BinPos_Pos_max || rep_filter || 8.38956706564e-34
Coq_QArith_QArith_base_Qle || is_filter || 7.5921139498e-34
Coq_PArith_BinPos_Pos_le || is_filter || 7.17697818001e-34
Coq_ZArith_BinInt_Z_opp || code_int_of_integer || 6.77485793421e-34
Coq_Reals_Raxioms_IZR || suc || 6.49397203331e-34
Coq_PArith_BinPos_Pos_of_succ_nat || product_Rep_unit || 6.41229973328e-34
Coq_Numbers_Natural_Binary_NBinary_N_lcm || set2 || 5.98988749616e-34
Coq_Structures_OrdersEx_N_as_OT_lcm || set2 || 5.98988749616e-34
Coq_Structures_OrdersEx_N_as_DT_lcm || set2 || 5.98988749616e-34
Coq_NArith_BinNat_N_lcm || set2 || 5.85015058282e-34
Coq_Numbers_Natural_BigN_BigN_BigN_lcm || set2 || 5.80541930945e-34
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || finite_finite2 || 5.78999581869e-34
Coq_Arith_PeanoNat_Nat_lcm || set2 || 5.66826159279e-34
Coq_Structures_OrdersEx_Nat_as_DT_lcm || set2 || 5.66826159279e-34
Coq_Structures_OrdersEx_Nat_as_OT_lcm || set2 || 5.66826159279e-34
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || finite_finite2 || 5.51909041404e-34
Coq_Structures_OrdersEx_Z_as_OT_divide || finite_finite2 || 5.51909041404e-34
Coq_Structures_OrdersEx_Z_as_DT_divide || finite_finite2 || 5.51909041404e-34
Coq_Reals_Raxioms_INR || suc || 5.44844990862e-34
Coq_Structures_OrdersEx_Nat_as_DT_add || root || 5.00689297942e-34
Coq_Structures_OrdersEx_Nat_as_OT_add || root || 5.00689297942e-34
Coq_Numbers_Natural_Binary_NBinary_N_add || root || 4.86267615757e-34
Coq_Structures_OrdersEx_N_as_OT_add || root || 4.86267615757e-34
Coq_Structures_OrdersEx_N_as_DT_add || root || 4.86267615757e-34
__constr_Coq_Numbers_BinNums_Z_0_2 || product_Rep_unit || 4.82671180043e-34
Coq_Arith_PeanoNat_Nat_add || root || 4.72446622776e-34
Coq_NArith_BinNat_N_succ_double || suc_Rep || 4.38482272822e-34
Coq_Numbers_Natural_Binary_NBinary_N_mul || set2 || 4.19929878505e-34
Coq_Structures_OrdersEx_N_as_OT_mul || set2 || 4.19929878505e-34
Coq_Structures_OrdersEx_N_as_DT_mul || set2 || 4.19929878505e-34
Coq_Numbers_Natural_BigN_BigN_BigN_mul || set2 || 4.05874069791e-34
Coq_NArith_BinNat_N_mul || set2 || 4.04738047657e-34
Coq_Arith_PeanoNat_Nat_mul || set2 || 3.96689191848e-34
Coq_Structures_OrdersEx_Nat_as_DT_mul || set2 || 3.96689191848e-34
Coq_Structures_OrdersEx_Nat_as_OT_mul || set2 || 3.96689191848e-34
Coq_NArith_BinNat_N_add || root || 3.61093619446e-34
__constr_Coq_Numbers_BinNums_Z_0_2 || rep_rat || 3.5151533499e-34
__constr_Coq_Numbers_BinNums_Z_0_2 || rep_int || 3.5151533499e-34
__constr_Coq_Numbers_BinNums_Z_0_2 || rep_real || 3.5151533499e-34
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lcm || set2 || 3.49613737988e-34
Coq_PArith_BinPos_Pos_of_succ_nat || rep_rat || 3.43167944099e-34
Coq_PArith_BinPos_Pos_of_succ_nat || rep_int || 3.43167944099e-34
Coq_PArith_BinPos_Pos_of_succ_nat || rep_real || 3.43167944099e-34
Coq_Numbers_Integer_Binary_ZBinary_Z_lcm || set2 || 3.34396269259e-34
Coq_Structures_OrdersEx_Z_as_OT_lcm || set2 || 3.34396269259e-34
Coq_Structures_OrdersEx_Z_as_DT_lcm || set2 || 3.34396269259e-34
Coq_Numbers_Integer_Binary_ZBinary_Z_add || root || 3.11936430897e-34
Coq_Structures_OrdersEx_Z_as_OT_add || root || 3.11936430897e-34
Coq_Structures_OrdersEx_Z_as_DT_add || root || 3.11936430897e-34
Coq_Reals_Rtrigo_calc_toRad || code_int_of_integer || 3.05330044075e-34
Coq_Numbers_Natural_Binary_NBinary_N_mul || root || 2.87693798051e-34
Coq_Structures_OrdersEx_N_as_OT_mul || root || 2.87693798051e-34
Coq_Structures_OrdersEx_N_as_DT_mul || root || 2.87693798051e-34
Coq_Arith_PeanoNat_Nat_mul || root || 2.81277490793e-34
Coq_Structures_OrdersEx_Nat_as_DT_mul || root || 2.81277490793e-34
Coq_Structures_OrdersEx_Nat_as_OT_mul || root || 2.81277490793e-34
Coq_Numbers_Natural_Binary_NBinary_N_succ_double || quotient_of || 2.58142454162e-34
Coq_Structures_OrdersEx_N_as_OT_succ_double || quotient_of || 2.58142454162e-34
Coq_Structures_OrdersEx_N_as_DT_succ_double || quotient_of || 2.58142454162e-34
Coq_NArith_BinNat_N_double || suc_Rep || 2.58142454162e-34
Coq_Numbers_Integer_BigZ_BigZ_BigZ_mul || set2 || 2.5056723955e-34
Coq_Classes_SetoidClass_pequiv || set2 || 2.48748324375e-34
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || set2 || 2.39674440763e-34
Coq_Structures_OrdersEx_Z_as_OT_mul || set2 || 2.39674440763e-34
Coq_Structures_OrdersEx_Z_as_DT_mul || set2 || 2.39674440763e-34
Coq_ZArith_BinInt_Z_divide || finite_finite2 || 2.34274214994e-34
Coq_NArith_BinNat_N_mul || root || 2.27288146114e-34
__constr_Coq_Numbers_BinNums_Z_0_2 || nat_of_char || 2.09004127957e-34
__constr_Coq_Numbers_BinNums_Z_0_2 || explode || 2.09004127957e-34
__constr_Coq_Numbers_BinNums_Z_0_2 || rep_Nat || 2.09004127957e-34
Coq_PArith_POrderedType_Positive_as_DT_mul || rep_filter || 1.95045962937e-34
Coq_PArith_POrderedType_Positive_as_OT_mul || rep_filter || 1.95045962937e-34
Coq_Structures_OrdersEx_Positive_as_DT_mul || rep_filter || 1.95045962937e-34
Coq_Structures_OrdersEx_Positive_as_OT_mul || rep_filter || 1.95045962937e-34
Coq_Numbers_Natural_BigN_BigN_BigN_lt || nO_MATCH || 1.84364609047e-34
Coq_Numbers_Natural_Binary_NBinary_N_lt || nO_MATCH || 1.72734861806e-34
Coq_Structures_OrdersEx_N_as_OT_lt || nO_MATCH || 1.72734861806e-34
Coq_Structures_OrdersEx_N_as_DT_lt || nO_MATCH || 1.72734861806e-34
Coq_NArith_BinNat_N_lt || nO_MATCH || 1.55516617308e-34
Coq_Classes_RelationClasses_PER_0 || finite_finite2 || 1.55377336649e-34
Coq_Reals_Rdefinitions_Rge || semilattice || 1.51837260114e-34
Coq_ZArith_BinInt_Z_lcm || set2 || 1.51142442552e-34
Coq_Reals_Rdefinitions_Rgt || lattic35693393ce_set || 1.43685230167e-34
Coq_PArith_POrderedType_Positive_as_DT_mul || basic_BNF_xtor || 1.43190078373e-34
Coq_PArith_POrderedType_Positive_as_OT_mul || basic_BNF_xtor || 1.43190078373e-34
Coq_Structures_OrdersEx_Positive_as_DT_mul || basic_BNF_xtor || 1.43190078373e-34
Coq_Structures_OrdersEx_Positive_as_OT_mul || basic_BNF_xtor || 1.43190078373e-34
__constr_Coq_Init_Datatypes_option_0_1 || rep_filter || 1.40153408004e-34
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || root || 1.26388275422e-34
Coq_Structures_OrdersEx_Z_as_OT_mul || root || 1.26388275422e-34
Coq_Structures_OrdersEx_Z_as_DT_mul || root || 1.26388275422e-34
Coq_PArith_BinPos_Pos_of_succ_nat || nat_of_char || 1.25006205935e-34
Coq_PArith_BinPos_Pos_of_succ_nat || explode || 1.25006205935e-34
Coq_PArith_BinPos_Pos_of_succ_nat || rep_Nat || 1.25006205935e-34
Coq_Numbers_Natural_BigN_BigN_BigN_le || nO_MATCH || 1.18402410255e-34
Coq_Sets_Relations_3_coherent || set2 || 1.14571583897e-34
Coq_PArith_BinPos_Pos_mul || rep_filter || 1.11766850141e-34
Coq_Numbers_Natural_Binary_NBinary_N_le || nO_MATCH || 1.0814641431e-34
Coq_Structures_OrdersEx_N_as_OT_le || nO_MATCH || 1.0814641431e-34
Coq_Structures_OrdersEx_N_as_DT_le || nO_MATCH || 1.0814641431e-34
Coq_Numbers_Natural_Binary_NBinary_N_double || quotient_of || 1.05290144101e-34
Coq_Structures_OrdersEx_N_as_OT_double || quotient_of || 1.05290144101e-34
Coq_Structures_OrdersEx_N_as_DT_double || quotient_of || 1.05290144101e-34
Coq_NArith_BinNat_N_le || nO_MATCH || 1.03481392015e-34
__constr_Coq_Init_Datatypes_option_0_1 || basic_BNF_xtor || 1.03351716708e-34
Coq_Numbers_Integer_BigZ_BigZ_BigZ_max || rep_filter || 9.74372829353e-35
Coq_ZArith_BinInt_Z_mul || set2 || 9.66528550933e-35
Coq_Numbers_Rational_BigQ_BigQ_BigQ_max || remdups || 9.66354945244e-35
Coq_Numbers_Integer_Binary_ZBinary_Z_max || rep_filter || 8.81671293704e-35
Coq_Structures_OrdersEx_Z_as_OT_max || rep_filter || 8.81671293704e-35
Coq_Structures_OrdersEx_Z_as_DT_max || rep_filter || 8.81671293704e-35
Coq_Sets_Relations_1_Symmetric || finite_finite2 || 8.69330583392e-35
Coq_PArith_BinPos_Pos_mul || basic_BNF_xtor || 8.26685493788e-35
Coq_Numbers_Rational_BigQ_BigQ_BigQ_le || distinct || 8.15201070895e-35
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || nO_MATCH || 7.51910681303e-35
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || nO_MATCH || 7.12970505236e-35
Coq_Structures_OrdersEx_Z_as_OT_lt || nO_MATCH || 7.12970505236e-35
Coq_Structures_OrdersEx_Z_as_DT_lt || nO_MATCH || 7.12970505236e-35
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || is_filter || 6.92550287403e-35
Coq_PArith_POrderedType_Positive_as_DT_le || semilattice || 6.6421331058e-35
Coq_PArith_POrderedType_Positive_as_OT_le || semilattice || 6.6421331058e-35
Coq_Structures_OrdersEx_Positive_as_DT_le || semilattice || 6.6421331058e-35
Coq_Structures_OrdersEx_Positive_as_OT_le || semilattice || 6.6421331058e-35
Coq_PArith_POrderedType_Positive_as_DT_lt || lattic35693393ce_set || 6.59172606663e-35
Coq_PArith_POrderedType_Positive_as_OT_lt || lattic35693393ce_set || 6.59172606663e-35
Coq_Structures_OrdersEx_Positive_as_DT_lt || lattic35693393ce_set || 6.59172606663e-35
Coq_Structures_OrdersEx_Positive_as_OT_lt || lattic35693393ce_set || 6.59172606663e-35
__constr_Coq_Numbers_BinNums_Z_0_2 || code_Suc || 6.36376954239e-35
Coq_Numbers_Natural_BigN_BigN_BigN_le || finite_finite2 || 6.3576747531e-35
Coq_Numbers_Integer_Binary_ZBinary_Z_le || is_filter || 6.27878222187e-35
Coq_Structures_OrdersEx_Z_as_OT_le || is_filter || 6.27878222187e-35
Coq_Structures_OrdersEx_Z_as_DT_le || is_filter || 6.27878222187e-35
Coq_Numbers_Natural_Binary_NBinary_N_le || finite_finite2 || 6.04063356611e-35
Coq_Structures_OrdersEx_N_as_OT_le || finite_finite2 || 6.04063356611e-35
Coq_Structures_OrdersEx_N_as_DT_le || finite_finite2 || 6.04063356611e-35
Coq_NArith_BinNat_N_le || finite_finite2 || 5.4712603479e-35
Coq_PArith_BinPos_Pos_le || semilattice || 5.06114140614e-35
Coq_PArith_BinPos_Pos_lt || lattic35693393ce_set || 4.92419701437e-35
Coq_PArith_POrderedType_Positive_as_DT_add || basic_BNF_xtor || 4.34920700999e-35
Coq_PArith_POrderedType_Positive_as_OT_add || basic_BNF_xtor || 4.34920700999e-35
Coq_Structures_OrdersEx_Positive_as_DT_add || basic_BNF_xtor || 4.34920700999e-35
Coq_Structures_OrdersEx_Positive_as_OT_add || basic_BNF_xtor || 4.34920700999e-35
Coq_QArith_QArith_base_Qlt || lattic35693393ce_set || 4.31929929429e-35
Coq_QArith_QArith_base_Qle || semilattice || 4.17928792254e-35
Coq_Numbers_Natural_BigN_BigN_BigN_max || set2 || 4.1432471748e-35
Coq_NArith_BinNat_N_of_nat || product_Rep_unit || 4.12012817464e-35
Coq_Numbers_Natural_Binary_NBinary_N_max || set2 || 3.92515709206e-35
Coq_Structures_OrdersEx_N_as_OT_max || set2 || 3.92515709206e-35
Coq_Structures_OrdersEx_N_as_DT_max || set2 || 3.92515709206e-35
Coq_Logic_FinFun_Fin2Restrict_extend || set2 || 3.85292220728e-35
Coq_ZArith_Int_Z_as_Int_i2z || quotient_of || 3.82883054086e-35
Coq_Init_Datatypes_CompOpp || suc_Rep || 3.69851144502e-35
Coq_ZArith_BinInt_Z_add || root || 3.59425232653e-35
Coq_NArith_BinNat_N_max || set2 || 3.52697049082e-35
Coq_Logic_FinFun_bFun || finite_finite2 || 3.52169013061e-35
Coq_Numbers_Natural_BigN_BigN_BigN_add || set2 || 3.43441642138e-35
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || nO_MATCH || 3.40499723247e-35
Coq_Numbers_Natural_Binary_NBinary_N_add || set2 || 3.28041989352e-35
Coq_Structures_OrdersEx_N_as_OT_add || set2 || 3.28041989352e-35
Coq_Structures_OrdersEx_N_as_DT_add || set2 || 3.28041989352e-35
Coq_Numbers_Integer_Binary_ZBinary_Z_le || nO_MATCH || 3.13838736422e-35
Coq_Structures_OrdersEx_Z_as_OT_le || nO_MATCH || 3.13838736422e-35
Coq_Structures_OrdersEx_Z_as_DT_le || nO_MATCH || 3.13838736422e-35
Coq_NArith_BinNat_N_add || set2 || 2.94048320666e-35
Coq_Numbers_Natural_Binary_NBinary_N_succ_double || code_nat_of_natural || 2.83922483655e-35
Coq_Structures_OrdersEx_N_as_OT_succ_double || code_nat_of_natural || 2.83922483655e-35
Coq_Structures_OrdersEx_N_as_DT_succ_double || code_nat_of_natural || 2.83922483655e-35
Coq_ZArith_BinInt_Z_max || rep_filter || 2.69890744076e-35
Coq_NArith_BinNat_N_of_nat || rep_rat || 2.35853852757e-35
Coq_NArith_BinNat_N_of_nat || rep_int || 2.35853852757e-35
Coq_NArith_BinNat_N_of_nat || rep_real || 2.35853852757e-35
Coq_Bool_Bool_Is_true || quotient_of || 2.24595485768e-35
Coq_PArith_POrderedType_Positive_as_DT_mul || pred3 || 2.15820059253e-35
Coq_PArith_POrderedType_Positive_as_OT_mul || pred3 || 2.15820059253e-35
Coq_Structures_OrdersEx_Positive_as_DT_mul || pred3 || 2.15820059253e-35
Coq_Structures_OrdersEx_Positive_as_OT_mul || pred3 || 2.15820059253e-35
Coq_Numbers_Natural_BigN_BigN_BigN_eq || nO_MATCH || 2.00834745665e-35
Coq_ZArith_BinInt_Z_of_N || bit0 || 1.99216311981e-35
Coq_ZArith_BinInt_Z_le || is_filter || 1.89189811666e-35
Coq_ZArith_BinInt_Z_mul || root || 1.85404744886e-35
Coq_Reals_Rtrigo_def_exp || quotient_of || 1.77285100244e-35
Coq_PArith_BinPos_Pos_add || basic_BNF_xtor || 1.6488408964e-35
__constr_Coq_Init_Datatypes_option_0_1 || pred3 || 1.5990900527e-35
Coq_QArith_QArith_base_Qle || transitive_acyclic || 1.50537407139e-35
__constr_Coq_Numbers_BinNums_Z_0_2 || implode str || 1.47421571922e-35
Coq_Arith_PeanoNat_Nat_b2n || quotient_of || 1.42278579998e-35
Coq_Numbers_Natural_Binary_NBinary_N_b2n || quotient_of || 1.42278579998e-35
Coq_NArith_BinNat_N_b2n || quotient_of || 1.42278579998e-35
Coq_Structures_OrdersEx_N_as_OT_b2n || quotient_of || 1.42278579998e-35
Coq_Structures_OrdersEx_N_as_DT_b2n || quotient_of || 1.42278579998e-35
Coq_Structures_OrdersEx_Nat_as_DT_b2n || quotient_of || 1.42278579998e-35
Coq_Structures_OrdersEx_Nat_as_OT_b2n || quotient_of || 1.42278579998e-35
Coq_PArith_BinPos_Pos_of_succ_nat || code_Suc || 1.32909432123e-35
Coq_PArith_BinPos_Pos_mul || pred3 || 1.30199482273e-35
Coq_QArith_QArith_base_Qlt || wf || 1.28699326756e-35
Coq_Numbers_Natural_Binary_NBinary_N_double || code_nat_of_natural || 1.25572957466e-35
Coq_Structures_OrdersEx_N_as_OT_double || code_nat_of_natural || 1.25572957466e-35
Coq_Structures_OrdersEx_N_as_DT_double || code_nat_of_natural || 1.25572957466e-35
Coq_ZArith_BinInt_Z_lt || nO_MATCH || 1.21984520629e-35
Coq_Numbers_Integer_Binary_ZBinary_Z_b2z || quotient_of || 1.15853949213e-35
Coq_Structures_OrdersEx_Z_as_OT_b2z || quotient_of || 1.15853949213e-35
Coq_Structures_OrdersEx_Z_as_DT_b2z || quotient_of || 1.15853949213e-35
Coq_ZArith_BinInt_Z_b2z || quotient_of || 1.15853949213e-35
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || nO_MATCH || 1.08427964886e-35
__constr_Coq_Numbers_BinNums_Z_0_2 || arctan || 1.00928044126e-35
Coq_Numbers_Integer_Binary_ZBinary_Z_sub || rep_filter || 9.88783076794e-36
Coq_Structures_OrdersEx_Z_as_OT_sub || rep_filter || 9.88783076794e-36
Coq_Structures_OrdersEx_Z_as_DT_sub || rep_filter || 9.88783076794e-36
Coq_NArith_BinNat_N_of_nat || nat_of_char || 9.55717514285e-36
Coq_NArith_BinNat_N_of_nat || explode || 9.55717514285e-36
Coq_NArith_BinNat_N_of_nat || rep_Nat || 9.55717514285e-36
Coq_Relations_Relation_Definitions_preorder_0 || finite_finite2 || 9.25805986564e-36
Coq_NArith_BinNat_N_to_nat || product_Rep_unit || 8.80724638898e-36
Coq_Relations_Relation_Operators_clos_refl_trans_0 || set2 || 8.41354009065e-36
Coq_Numbers_Integer_Binary_ZBinary_Z_sub || basic_BNF_xtor || 7.54214160299e-36
Coq_Structures_OrdersEx_Z_as_OT_sub || basic_BNF_xtor || 7.54214160299e-36
Coq_Structures_OrdersEx_Z_as_DT_sub || basic_BNF_xtor || 7.54214160299e-36
Coq_Numbers_Natural_Binary_NBinary_N_succ_double || code_int_of_integer || 7.33409351728e-36
Coq_Structures_OrdersEx_N_as_OT_succ_double || code_int_of_integer || 7.33409351728e-36
Coq_Structures_OrdersEx_N_as_DT_succ_double || code_int_of_integer || 7.33409351728e-36
Coq_PArith_POrderedType_Positive_as_DT_add || pred3 || 7.20300046038e-36
Coq_PArith_POrderedType_Positive_as_OT_add || pred3 || 7.20300046038e-36
Coq_Structures_OrdersEx_Positive_as_DT_add || pred3 || 7.20300046038e-36
Coq_Structures_OrdersEx_Positive_as_OT_add || pred3 || 7.20300046038e-36
Coq_ZArith_BinInt_Z_le || nO_MATCH || 6.82881792259e-36
Coq_Sets_Relations_1_Order_0 || finite_finite2 || 6.38200022987e-36
Coq_Sets_Partial_Order_Rel_of || set2 || 6.2244310952e-36
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || bit0 || 5.80208646318e-36
Coq_Structures_OrdersEx_Z_as_OT_opp || bit0 || 5.80208646318e-36
Coq_Structures_OrdersEx_Z_as_DT_opp || bit0 || 5.80208646318e-36
Coq_NArith_BinNat_N_succ_double || quotient_of || 5.7137556368e-36
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || set2 || 5.63062024354e-36
Coq_Relations_Relation_Definitions_equivalence_0 || finite_finite2 || 5.62322082411e-36
__constr_Coq_Numbers_BinNums_Z_0_2 || cnj || 5.26166393419e-36
Coq_NArith_BinNat_N_to_nat || rep_rat || 5.22409890163e-36
Coq_NArith_BinNat_N_to_nat || rep_int || 5.22409890163e-36
Coq_NArith_BinNat_N_to_nat || rep_real || 5.22409890163e-36
Coq_ZArith_Int_Z_as_Int_i2z || code_nat_of_natural || 4.98918490068e-36
Coq_Numbers_Cyclic_Int31_Int31_phi || suc_Rep || 4.64512476804e-36
Coq_NArith_BinNat_N_double || quotient_of || 3.68354241612e-36
Coq_PArith_BinPos_Pos_of_succ_nat || nat_of_nibble || 3.450686411e-36
Coq_Numbers_Natural_Binary_NBinary_N_double || code_int_of_integer || 3.39859741518e-36
Coq_Structures_OrdersEx_N_as_OT_double || code_int_of_integer || 3.39859741518e-36
Coq_Structures_OrdersEx_N_as_DT_double || code_int_of_integer || 3.39859741518e-36
Coq_Bool_Bool_Is_true || code_nat_of_natural || 3.06279730835e-36
Coq_PArith_BinPos_Pos_add || pred3 || 2.93948049998e-36
Coq_PArith_BinPos_Pos_to_nat || product_Rep_unit || 2.41482215661e-36
Coq_Sets_Partial_Order_Carrier_of || set2 || 2.33960724229e-36
Coq_Numbers_Natural_Binary_NBinary_N_le || semilattice || 2.27321397015e-36
Coq_Structures_OrdersEx_N_as_OT_le || semilattice || 2.27321397015e-36
Coq_Structures_OrdersEx_N_as_DT_le || semilattice || 2.27321397015e-36
Coq_Numbers_Natural_Binary_NBinary_N_lt || lattic35693393ce_set || 2.27276948378e-36
Coq_Structures_OrdersEx_N_as_OT_lt || lattic35693393ce_set || 2.27276948378e-36
Coq_Structures_OrdersEx_N_as_DT_lt || lattic35693393ce_set || 2.27276948378e-36
Coq_NArith_BinNat_N_to_nat || nat_of_char || 2.23941891009e-36
Coq_NArith_BinNat_N_to_nat || explode || 2.23941891009e-36
Coq_NArith_BinNat_N_to_nat || rep_Nat || 2.23941891009e-36
Coq_PArith_POrderedType_Positive_as_DT_mul || principal || 2.21189415982e-36
Coq_PArith_POrderedType_Positive_as_OT_mul || principal || 2.21189415982e-36
Coq_Structures_OrdersEx_Positive_as_DT_mul || principal || 2.21189415982e-36
Coq_Structures_OrdersEx_Positive_as_OT_mul || principal || 2.21189415982e-36
Coq_Sets_Ensembles_Inhabited_0 || finite_finite2 || 2.14479052139e-36
Coq_NArith_BinNat_N_le || semilattice || 2.13248440306e-36
Coq_NArith_BinNat_N_lt || lattic35693393ce_set || 2.12702397445e-36
Coq_Arith_PeanoNat_Nat_b2n || code_nat_of_natural || 2.01591888673e-36
Coq_Numbers_Natural_Binary_NBinary_N_b2n || code_nat_of_natural || 2.01591888673e-36
Coq_NArith_BinNat_N_b2n || code_nat_of_natural || 2.01591888673e-36
Coq_Structures_OrdersEx_N_as_OT_b2n || code_nat_of_natural || 2.01591888673e-36
Coq_Structures_OrdersEx_N_as_DT_b2n || code_nat_of_natural || 2.01591888673e-36
Coq_Structures_OrdersEx_Nat_as_DT_b2n || code_nat_of_natural || 2.01591888673e-36
Coq_Structures_OrdersEx_Nat_as_OT_b2n || code_nat_of_natural || 2.01591888673e-36
__constr_Coq_Numbers_BinNums_Z_0_2 || sqrt || 1.84128229111e-36
Coq_Structures_OrdersEx_Nat_as_DT_add || basic_BNF_xtor || 1.77914774552e-36
Coq_Structures_OrdersEx_Nat_as_OT_add || basic_BNF_xtor || 1.77914774552e-36
Coq_Numbers_Natural_Binary_NBinary_N_add || basic_BNF_xtor || 1.7170301058e-36
Coq_Structures_OrdersEx_N_as_OT_add || basic_BNF_xtor || 1.7170301058e-36
Coq_Structures_OrdersEx_N_as_DT_add || basic_BNF_xtor || 1.7170301058e-36
__constr_Coq_Init_Datatypes_option_0_1 || principal || 1.68709855269e-36
Coq_Numbers_Integer_Binary_ZBinary_Z_b2z || code_nat_of_natural || 1.66968851935e-36
Coq_Structures_OrdersEx_Z_as_OT_b2z || code_nat_of_natural || 1.66968851935e-36
Coq_Structures_OrdersEx_Z_as_DT_b2z || code_nat_of_natural || 1.66968851935e-36
Coq_ZArith_BinInt_Z_b2z || code_nat_of_natural || 1.66968851935e-36
Coq_Arith_PeanoNat_Nat_add || basic_BNF_xtor || 1.65788782512e-36
Coq_Numbers_Natural_BigN_BigN_BigN_lt || domainp || 1.64420711366e-36
Coq_Numbers_Natural_Binary_NBinary_N_lt || domainp || 1.55990372055e-36
Coq_Structures_OrdersEx_N_as_OT_lt || domainp || 1.55990372055e-36
Coq_Structures_OrdersEx_N_as_DT_lt || domainp || 1.55990372055e-36
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || product_Rep_unit || 1.47369921764e-36
Coq_Structures_OrdersEx_Z_as_OT_pred || product_Rep_unit || 1.47369921764e-36
Coq_Structures_OrdersEx_Z_as_DT_pred || product_Rep_unit || 1.47369921764e-36
Coq_PArith_BinPos_Pos_to_nat || rep_rat || 1.47369921764e-36
Coq_PArith_BinPos_Pos_to_nat || rep_int || 1.47369921764e-36
Coq_PArith_BinPos_Pos_to_nat || rep_real || 1.47369921764e-36
Coq_NArith_BinNat_N_lt || domainp || 1.43295683677e-36
Coq_Numbers_Integer_Binary_ZBinary_Z_sub || pred3 || 1.42405640121e-36
Coq_Structures_OrdersEx_Z_as_OT_sub || pred3 || 1.42405640121e-36
Coq_Structures_OrdersEx_Z_as_DT_sub || pred3 || 1.42405640121e-36
Coq_ZArith_Int_Z_as_Int_i2z || code_int_of_integer || 1.42114885028e-36
Coq_PArith_BinPos_Pos_mul || principal || 1.40096860873e-36
Coq_Numbers_Integer_Binary_ZBinary_Z_add || rep_filter || 1.28286887738e-36
Coq_Structures_OrdersEx_Z_as_OT_add || rep_filter || 1.28286887738e-36
Coq_Structures_OrdersEx_Z_as_DT_add || rep_filter || 1.28286887738e-36
Coq_NArith_BinNat_N_of_nat || code_Suc || 1.27365054758e-36
Coq_NArith_BinNat_N_add || basic_BNF_xtor || 1.19632895311e-36
Coq_Reals_Rdefinitions_Rlt || lattic35693393ce_set || 1.18439568681e-36
Coq_Reals_Rdefinitions_Rle || semilattice || 1.18110057568e-36
Coq_Numbers_Natural_BigN_BigN_BigN_le || domainp || 1.14909413332e-36
Coq_Numbers_Natural_Binary_NBinary_N_le || domainp || 1.06769708454e-36
Coq_Structures_OrdersEx_N_as_OT_le || domainp || 1.06769708454e-36
Coq_Structures_OrdersEx_N_as_DT_le || domainp || 1.06769708454e-36
Coq_NArith_BinNat_N_le || domainp || 1.03017437288e-36
Coq_Numbers_Integer_Binary_ZBinary_Z_add || basic_BNF_xtor || 1.00196199959e-36
Coq_Structures_OrdersEx_Z_as_OT_add || basic_BNF_xtor || 1.00196199959e-36
Coq_Structures_OrdersEx_Z_as_DT_add || basic_BNF_xtor || 1.00196199959e-36
Coq_PArith_BinPos_Pos_of_succ_nat || implode str || 9.53880226933e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || rep_rat || 9.08867409882e-37
Coq_Structures_OrdersEx_Z_as_OT_pred || rep_rat || 9.08867409882e-37
Coq_Structures_OrdersEx_Z_as_DT_pred || rep_rat || 9.08867409882e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || rep_int || 9.08867409882e-37
Coq_Structures_OrdersEx_Z_as_OT_pred || rep_int || 9.08867409882e-37
Coq_Structures_OrdersEx_Z_as_DT_pred || rep_int || 9.08867409882e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || rep_real || 9.08867409882e-37
Coq_Structures_OrdersEx_Z_as_OT_pred || rep_real || 9.08867409882e-37
Coq_Structures_OrdersEx_Z_as_DT_pred || rep_real || 9.08867409882e-37
Coq_PArith_POrderedType_Positive_as_DT_mul || rev || 9.08504723639e-37
Coq_PArith_POrderedType_Positive_as_OT_mul || rev || 9.08504723639e-37
Coq_Structures_OrdersEx_Positive_as_DT_mul || rev || 9.08504723639e-37
Coq_Structures_OrdersEx_Positive_as_OT_mul || rev || 9.08504723639e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || lattic35693393ce_set || 8.99686507566e-37
Coq_Structures_OrdersEx_Z_as_OT_lt || lattic35693393ce_set || 8.99686507566e-37
Coq_Structures_OrdersEx_Z_as_DT_lt || lattic35693393ce_set || 8.99686507566e-37
Coq_Bool_Bool_Is_true || code_int_of_integer || 8.95698452195e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_le || semilattice || 8.86443317074e-37
Coq_Structures_OrdersEx_Z_as_OT_le || semilattice || 8.86443317074e-37
Coq_Structures_OrdersEx_Z_as_DT_le || semilattice || 8.86443317074e-37
Coq_NArith_BinNat_N_succ_double || code_nat_of_natural || 8.72291682104e-37
Coq_ZArith_BinInt_Z_of_N || product_Rep_unit || 8.59837021024e-37
Coq_PArith_POrderedType_Positive_as_DT_add || principal || 8.19580491783e-37
Coq_PArith_POrderedType_Positive_as_OT_add || principal || 8.19580491783e-37
Coq_Structures_OrdersEx_Positive_as_DT_add || principal || 8.19580491783e-37
Coq_Structures_OrdersEx_Positive_as_OT_add || principal || 8.19580491783e-37
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || domainp || 7.94710728158e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || domainp || 7.6105111583e-37
Coq_Structures_OrdersEx_Z_as_OT_lt || domainp || 7.6105111583e-37
Coq_Structures_OrdersEx_Z_as_DT_lt || domainp || 7.6105111583e-37
Coq_Reals_Rtrigo_def_exp || code_int_of_integer || 7.29600172482e-37
Coq_Init_Datatypes_CompOpp || quotient_of || 7.27350913528e-37
Coq_PArith_POrderedType_Positive_as_DT_succ || quotient_of || 7.27350913528e-37
Coq_PArith_POrderedType_Positive_as_OT_succ || quotient_of || 7.27350913528e-37
Coq_Structures_OrdersEx_Positive_as_DT_succ || quotient_of || 7.27350913528e-37
Coq_Structures_OrdersEx_Positive_as_OT_succ || quotient_of || 7.27350913528e-37
__constr_Coq_Init_Datatypes_option_0_1 || rev || 7.00336058568e-37
Coq_PArith_BinPos_Pos_to_nat || nat_of_char || 6.60853664717e-37
Coq_PArith_BinPos_Pos_to_nat || explode || 6.60853664717e-37
Coq_PArith_BinPos_Pos_to_nat || rep_Nat || 6.60853664717e-37
Coq_ZArith_BinInt_Z_sub || rep_filter || 6.16577559299e-37
Coq_Arith_PeanoNat_Nat_b2n || code_int_of_integer || 6.02767302692e-37
Coq_Numbers_Natural_Binary_NBinary_N_b2n || code_int_of_integer || 6.02767302692e-37
Coq_NArith_BinNat_N_b2n || code_int_of_integer || 6.02767302692e-37
Coq_Structures_OrdersEx_N_as_OT_b2n || code_int_of_integer || 6.02767302692e-37
Coq_Structures_OrdersEx_N_as_DT_b2n || code_int_of_integer || 6.02767302692e-37
Coq_Structures_OrdersEx_Nat_as_DT_b2n || code_int_of_integer || 6.02767302692e-37
Coq_Structures_OrdersEx_Nat_as_OT_b2n || code_int_of_integer || 6.02767302692e-37
Coq_PArith_BinPos_Pos_mul || rev || 5.85764954654e-37
Coq_NArith_BinNat_N_double || code_nat_of_natural || 5.82397529235e-37
Coq_Init_Datatypes_negb || suc || 5.74314978661e-37
Coq_ZArith_BinInt_Z_of_N || rep_rat || 5.36288432147e-37
Coq_ZArith_BinInt_Z_of_N || rep_int || 5.36288432147e-37
Coq_ZArith_BinInt_Z_of_N || rep_real || 5.36288432147e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_b2z || code_int_of_integer || 5.041987502e-37
Coq_Structures_OrdersEx_Z_as_OT_b2z || code_int_of_integer || 5.041987502e-37
Coq_Structures_OrdersEx_Z_as_DT_b2z || code_int_of_integer || 5.041987502e-37
Coq_ZArith_BinInt_Z_b2z || code_int_of_integer || 5.041987502e-37
Coq_PArith_BinPos_Pos_of_succ_nat || arctan || 4.91985269669e-37
Coq_ZArith_BinInt_Z_sub || basic_BNF_xtor || 4.85436397993e-37
Coq_ZArith_BinInt_Z_pred || product_Rep_unit || 4.73176612499e-37
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || domainp || 4.16256218275e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || nat_of_char || 4.14420667883e-37
Coq_Structures_OrdersEx_Z_as_OT_pred || nat_of_char || 4.14420667883e-37
Coq_Structures_OrdersEx_Z_as_DT_pred || nat_of_char || 4.14420667883e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || explode || 4.14420667883e-37
Coq_Structures_OrdersEx_Z_as_OT_pred || explode || 4.14420667883e-37
Coq_Structures_OrdersEx_Z_as_DT_pred || explode || 4.14420667883e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || rep_Nat || 4.14420667883e-37
Coq_Structures_OrdersEx_Z_as_OT_pred || rep_Nat || 4.14420667883e-37
Coq_Structures_OrdersEx_Z_as_DT_pred || rep_Nat || 4.14420667883e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_le || domainp || 3.89361122685e-37
Coq_Structures_OrdersEx_Z_as_OT_le || domainp || 3.89361122685e-37
Coq_Structures_OrdersEx_Z_as_DT_le || domainp || 3.89361122685e-37
Coq_Structures_OrdersEx_Z_as_OT_le || transitive_acyclic || 3.76713872125e-37
Coq_Structures_OrdersEx_Z_as_DT_le || transitive_acyclic || 3.76713872125e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_le || transitive_acyclic || 3.76713872125e-37
Coq_NArith_BinNat_N_of_nat || nat_of_nibble || 3.76025108827e-37
Coq_Structures_OrdersEx_Nat_as_DT_add || pred3 || 3.71818213883e-37
Coq_Structures_OrdersEx_Nat_as_OT_add || pred3 || 3.71818213883e-37
Coq_PArith_BinPos_Pos_add || principal || 3.63110047955e-37
Coq_Numbers_Natural_Binary_NBinary_N_add || pred3 || 3.59707540679e-37
Coq_Structures_OrdersEx_N_as_OT_add || pred3 || 3.59707540679e-37
Coq_Structures_OrdersEx_N_as_DT_add || pred3 || 3.59707540679e-37
Coq_PArith_POrderedType_Positive_as_DT_add || rev || 3.49766826806e-37
Coq_PArith_POrderedType_Positive_as_OT_add || rev || 3.49766826806e-37
Coq_Structures_OrdersEx_Positive_as_DT_add || rev || 3.49766826806e-37
Coq_Structures_OrdersEx_Positive_as_OT_add || rev || 3.49766826806e-37
Coq_Arith_PeanoNat_Nat_add || pred3 || 3.48147969398e-37
Coq_NArith_BinNat_N_to_nat || code_Suc || 3.36355042739e-37
Coq_PArith_BinPos_Pos_succ || quotient_of || 3.2761418804e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || wf || 3.25882495391e-37
Coq_Structures_OrdersEx_Z_as_OT_lt || wf || 3.25882495391e-37
Coq_Structures_OrdersEx_Z_as_DT_lt || wf || 3.25882495391e-37
Coq_ZArith_BinInt_Z_pred || rep_rat || 2.9875375626e-37
Coq_ZArith_BinInt_Z_pred || rep_int || 2.9875375626e-37
Coq_ZArith_BinInt_Z_pred || rep_real || 2.9875375626e-37
__constr_Coq_Numbers_BinNums_Z_0_3 || product_Rep_unit || 2.7675839917e-37
Coq_NArith_BinNat_N_succ_double || code_int_of_integer || 2.7237658973e-37
Coq_Numbers_Natural_BigN_BigN_BigN_eq || domainp || 2.69897690537e-37
Coq_NArith_BinNat_N_add || pred3 || 2.56828507997e-37
Coq_ZArith_BinInt_Z_of_N || nat_of_char || 2.48943023047e-37
Coq_ZArith_BinInt_Z_of_N || explode || 2.48943023047e-37
Coq_ZArith_BinInt_Z_of_N || rep_Nat || 2.48943023047e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_add || pred3 || 2.17670061846e-37
Coq_Structures_OrdersEx_Z_as_OT_add || pred3 || 2.17670061846e-37
Coq_Structures_OrdersEx_Z_as_DT_add || pred3 || 2.17670061846e-37
Coq_ZArith_BinInt_Z_of_nat || product_Rep_unit || 2.14888983464e-37
Coq_ZArith_BinInt_Z_lt || lattic35693393ce_set || 2.08811531741e-37
Coq_ZArith_BinInt_Z_le || semilattice || 2.0745123879e-37
Coq_Numbers_Rational_BigQ_BigQ_BigQ_max || set2 || 1.88063953236e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_sub || principal || 1.87608278785e-37
Coq_Structures_OrdersEx_Z_as_OT_sub || principal || 1.87608278785e-37
Coq_Structures_OrdersEx_Z_as_DT_sub || principal || 1.87608278785e-37
Coq_NArith_BinNat_N_double || code_int_of_integer || 1.85605096851e-37
Coq_ZArith_BinInt_Z_lt || domainp || 1.78966063225e-37
__constr_Coq_Numbers_BinNums_Z_0_3 || rep_rat || 1.76626259481e-37
__constr_Coq_Numbers_BinNums_Z_0_3 || rep_int || 1.76626259481e-37
__constr_Coq_Numbers_BinNums_Z_0_3 || rep_real || 1.76626259481e-37
Coq_Numbers_Rational_BigQ_BigQ_BigQ_le || finite_finite2 || 1.71995817428e-37
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || domainp || 1.6237120546e-37
Coq_PArith_BinPos_Pos_of_succ_nat || cnj || 1.60534378537e-37
Coq_Reals_Rtrigo_calc_toRad || suc || 1.59761657413e-37
Coq_PArith_BinPos_Pos_add || rev || 1.59717086262e-37
Coq_ZArith_BinInt_Z_pred || nat_of_char || 1.41398062003e-37
Coq_ZArith_BinInt_Z_pred || explode || 1.41398062003e-37
Coq_ZArith_BinInt_Z_pred || rep_Nat || 1.41398062003e-37
Coq_ZArith_BinInt_Z_of_nat || rep_rat || 1.37827462215e-37
Coq_ZArith_BinInt_Z_of_nat || rep_int || 1.37827462215e-37
Coq_ZArith_BinInt_Z_of_nat || rep_real || 1.37827462215e-37
Coq_Init_Datatypes_CompOpp || code_nat_of_natural || 1.30253608427e-37
Coq_PArith_POrderedType_Positive_as_DT_succ || code_nat_of_natural || 1.30253608427e-37
Coq_PArith_POrderedType_Positive_as_OT_succ || code_nat_of_natural || 1.30253608427e-37
Coq_Structures_OrdersEx_Positive_as_DT_succ || code_nat_of_natural || 1.30253608427e-37
Coq_Structures_OrdersEx_Positive_as_OT_succ || code_nat_of_natural || 1.30253608427e-37
Coq_PArith_POrderedType_Positive_as_DT_mul || some || 1.289228896e-37
Coq_PArith_POrderedType_Positive_as_OT_mul || some || 1.289228896e-37
Coq_Structures_OrdersEx_Positive_as_DT_mul || some || 1.289228896e-37
Coq_Structures_OrdersEx_Positive_as_OT_mul || some || 1.289228896e-37
Coq_Numbers_Cyclic_Int31_Int31_phi || quotient_of || 1.25917356045e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || product_Rep_unit || 1.18766499912e-37
Coq_Structures_OrdersEx_Z_as_OT_succ || product_Rep_unit || 1.18766499912e-37
Coq_Structures_OrdersEx_Z_as_DT_succ || product_Rep_unit || 1.18766499912e-37
Coq_NArith_BinNat_N_of_nat || implode str || 1.16873203535e-37
Coq_ZArith_BinInt_Z_le || domainp || 1.1073263133e-37
Coq_ZArith_BinInt_Z_sub || pred3 || 1.10602830642e-37
Coq_PArith_BinPos_Pos_to_nat || code_Suc || 1.09266101314e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || product_Rep_unit || 1.06328045044e-37
Coq_Structures_OrdersEx_Z_as_OT_opp || product_Rep_unit || 1.06328045044e-37
Coq_Structures_OrdersEx_Z_as_DT_opp || product_Rep_unit || 1.06328045044e-37
Coq_NArith_BinNat_N_to_nat || nat_of_nibble || 1.06328045044e-37
__constr_Coq_Init_Datatypes_option_0_1 || some || 1.01581558963e-37
Coq_ZArith_BinInt_Z_add || rep_filter || 9.35405580679e-38
Coq_PArith_POrderedType_Positive_as_DT_max || set2 || 8.6556274981e-38
Coq_PArith_POrderedType_Positive_as_OT_max || set2 || 8.6556274981e-38
Coq_Structures_OrdersEx_Positive_as_DT_max || set2 || 8.6556274981e-38
Coq_Structures_OrdersEx_Positive_as_OT_max || set2 || 8.6556274981e-38
Coq_PArith_BinPos_Pos_mul || some || 8.62381903452e-38
__constr_Coq_Numbers_BinNums_Z_0_3 || nat_of_char || 8.50349786924e-38
__constr_Coq_Numbers_BinNums_Z_0_3 || explode || 8.50349786924e-38
__constr_Coq_Numbers_BinNums_Z_0_3 || rep_Nat || 8.50349786924e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_sub || rev || 8.45056540516e-38
Coq_Structures_OrdersEx_Z_as_OT_sub || rev || 8.45056540516e-38
Coq_Structures_OrdersEx_Z_as_DT_sub || rev || 8.45056540516e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || rep_rat || 7.70567648601e-38
Coq_Structures_OrdersEx_Z_as_OT_succ || rep_rat || 7.70567648601e-38
Coq_Structures_OrdersEx_Z_as_DT_succ || rep_rat || 7.70567648601e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || rep_int || 7.70567648601e-38
Coq_Structures_OrdersEx_Z_as_OT_succ || rep_int || 7.70567648601e-38
Coq_Structures_OrdersEx_Z_as_DT_succ || rep_int || 7.70567648601e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || rep_real || 7.70567648601e-38
Coq_Structures_OrdersEx_Z_as_OT_succ || rep_real || 7.70567648601e-38
Coq_Structures_OrdersEx_Z_as_DT_succ || rep_real || 7.70567648601e-38
Coq_PArith_BinPos_Pos_max || set2 || 7.64482696205e-38
Coq_PArith_POrderedType_Positive_as_DT_le || finite_finite2 || 7.60406652469e-38
Coq_PArith_POrderedType_Positive_as_OT_le || finite_finite2 || 7.60406652469e-38
Coq_Structures_OrdersEx_Positive_as_DT_le || finite_finite2 || 7.60406652469e-38
Coq_Structures_OrdersEx_Positive_as_OT_le || finite_finite2 || 7.60406652469e-38
Coq_ZArith_BinInt_Z_add || basic_BNF_xtor || 7.50931956055e-38
Coq_Numbers_Natural_Binary_NBinary_N_succ || product_Rep_unit || 7.44537256561e-38
Coq_Structures_OrdersEx_N_as_OT_succ || product_Rep_unit || 7.44537256561e-38
Coq_Structures_OrdersEx_N_as_DT_succ || product_Rep_unit || 7.44537256561e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || rep_rat || 6.91327278037e-38
Coq_Structures_OrdersEx_Z_as_OT_opp || rep_rat || 6.91327278037e-38
Coq_Structures_OrdersEx_Z_as_DT_opp || rep_rat || 6.91327278037e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || rep_int || 6.91327278037e-38
Coq_Structures_OrdersEx_Z_as_OT_opp || rep_int || 6.91327278037e-38
Coq_Structures_OrdersEx_Z_as_DT_opp || rep_int || 6.91327278037e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || rep_real || 6.91327278037e-38
Coq_Structures_OrdersEx_Z_as_OT_opp || rep_real || 6.91327278037e-38
Coq_Structures_OrdersEx_Z_as_DT_opp || rep_real || 6.91327278037e-38
Coq_PArith_BinPos_Pos_le || finite_finite2 || 6.75987320293e-38
Coq_ZArith_BinInt_Z_of_nat || nat_of_char || 6.68842433983e-38
Coq_ZArith_BinInt_Z_of_nat || explode || 6.68842433983e-38
Coq_ZArith_BinInt_Z_of_nat || rep_Nat || 6.68842433983e-38
Coq_NArith_BinNat_N_of_nat || arctan || 6.39001302732e-38
Coq_NArith_BinNat_N_succ || product_Rep_unit || 6.32843140118e-38
Coq_PArith_BinPos_Pos_succ || code_nat_of_natural || 6.21998913175e-38
Coq_Structures_OrdersEx_Nat_as_DT_add || principal || 5.49256151433e-38
Coq_Structures_OrdersEx_Nat_as_OT_add || principal || 5.49256151433e-38
Coq_PArith_POrderedType_Positive_as_DT_add || some || 5.37236316324e-38
Coq_PArith_POrderedType_Positive_as_OT_add || some || 5.37236316324e-38
Coq_Structures_OrdersEx_Positive_as_DT_add || some || 5.37236316324e-38
Coq_Structures_OrdersEx_Positive_as_OT_add || some || 5.37236316324e-38
Coq_Numbers_Natural_Binary_NBinary_N_add || principal || 5.32827056742e-38
Coq_Structures_OrdersEx_N_as_OT_add || principal || 5.32827056742e-38
Coq_Structures_OrdersEx_N_as_DT_add || principal || 5.32827056742e-38
Coq_Arith_PeanoNat_Nat_add || principal || 5.17100888182e-38
Coq_Numbers_Natural_Binary_NBinary_N_succ || rep_rat || 4.87365924573e-38
Coq_Structures_OrdersEx_N_as_OT_succ || rep_rat || 4.87365924573e-38
Coq_Structures_OrdersEx_N_as_DT_succ || rep_rat || 4.87365924573e-38
Coq_Numbers_Natural_Binary_NBinary_N_succ || rep_int || 4.87365924573e-38
Coq_Structures_OrdersEx_N_as_OT_succ || rep_int || 4.87365924573e-38
Coq_Structures_OrdersEx_N_as_DT_succ || rep_int || 4.87365924573e-38
Coq_Numbers_Natural_Binary_NBinary_N_succ || rep_real || 4.87365924573e-38
Coq_Structures_OrdersEx_N_as_OT_succ || rep_real || 4.87365924573e-38
Coq_Structures_OrdersEx_N_as_DT_succ || rep_real || 4.87365924573e-38
Coq_Init_Datatypes_CompOpp || code_int_of_integer || 4.46470748705e-38
Coq_PArith_POrderedType_Positive_as_DT_succ || code_int_of_integer || 4.46470748705e-38
Coq_PArith_POrderedType_Positive_as_OT_succ || code_int_of_integer || 4.46470748705e-38
Coq_Structures_OrdersEx_Positive_as_DT_succ || code_int_of_integer || 4.46470748705e-38
Coq_Structures_OrdersEx_Positive_as_OT_succ || code_int_of_integer || 4.46470748705e-38
Coq_ZArith_BinInt_Z_of_N || code_Suc || 4.4315150504e-38
Coq_NArith_BinNat_N_succ || rep_rat || 4.15516868799e-38
Coq_NArith_BinNat_N_succ || rep_int || 4.15516868799e-38
Coq_NArith_BinNat_N_succ || rep_real || 4.15516868799e-38
Coq_NArith_BinNat_N_add || principal || 3.91129879301e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || nat_of_char || 3.80842891313e-38
Coq_Structures_OrdersEx_Z_as_OT_succ || nat_of_char || 3.80842891313e-38
Coq_Structures_OrdersEx_Z_as_DT_succ || nat_of_char || 3.80842891313e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || explode || 3.80842891313e-38
Coq_Structures_OrdersEx_Z_as_OT_succ || explode || 3.80842891313e-38
Coq_Structures_OrdersEx_Z_as_DT_succ || explode || 3.80842891313e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || rep_Nat || 3.80842891313e-38
Coq_Structures_OrdersEx_Z_as_OT_succ || rep_Nat || 3.80842891313e-38
Coq_Structures_OrdersEx_Z_as_DT_succ || rep_Nat || 3.80842891313e-38
Coq_ZArith_BinInt_Z_succ || product_Rep_unit || 3.51830409396e-38
Coq_NArith_BinNat_N_to_nat || implode str || 3.51830409396e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || nat_of_char || 3.42832247493e-38
Coq_Structures_OrdersEx_Z_as_OT_opp || nat_of_char || 3.42832247493e-38
Coq_Structures_OrdersEx_Z_as_DT_opp || nat_of_char || 3.42832247493e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || explode || 3.42832247493e-38
Coq_Structures_OrdersEx_Z_as_OT_opp || explode || 3.42832247493e-38
Coq_Structures_OrdersEx_Z_as_DT_opp || explode || 3.42832247493e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || rep_Nat || 3.42832247493e-38
Coq_Structures_OrdersEx_Z_as_OT_opp || rep_Nat || 3.42832247493e-38
Coq_Structures_OrdersEx_Z_as_DT_opp || rep_Nat || 3.42832247493e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_add || principal || 3.35992278425e-38
Coq_Structures_OrdersEx_Z_as_OT_add || principal || 3.35992278425e-38
Coq_Structures_OrdersEx_Z_as_DT_add || principal || 3.35992278425e-38
Coq_PArith_BinPos_Pos_of_succ_nat || sqrt || 2.7636388379e-38
Coq_PArith_BinPos_Pos_add || some || 2.61214637528e-38
Coq_Structures_OrdersEx_Nat_as_DT_add || rev || 2.58137212168e-38
Coq_Structures_OrdersEx_Nat_as_OT_add || rev || 2.58137212168e-38
Coq_Numbers_Cyclic_Int31_Int31_phi || code_nat_of_natural || 2.55804123229e-38
Coq_Numbers_Natural_Binary_NBinary_N_add || rev || 2.50671915113e-38
Coq_Structures_OrdersEx_N_as_OT_add || rev || 2.50671915113e-38
Coq_Structures_OrdersEx_N_as_DT_add || rev || 2.50671915113e-38
Coq_Numbers_Natural_Binary_NBinary_N_succ || nat_of_char || 2.44299791611e-38
Coq_Structures_OrdersEx_N_as_OT_succ || nat_of_char || 2.44299791611e-38
Coq_Structures_OrdersEx_N_as_DT_succ || nat_of_char || 2.44299791611e-38
Coq_Numbers_Natural_Binary_NBinary_N_succ || explode || 2.44299791611e-38
Coq_Structures_OrdersEx_N_as_OT_succ || explode || 2.44299791611e-38
Coq_Structures_OrdersEx_N_as_DT_succ || explode || 2.44299791611e-38
Coq_Numbers_Natural_Binary_NBinary_N_succ || rep_Nat || 2.44299791611e-38
Coq_Structures_OrdersEx_N_as_OT_succ || rep_Nat || 2.44299791611e-38
Coq_Structures_OrdersEx_N_as_DT_succ || rep_Nat || 2.44299791611e-38
Coq_Arith_PeanoNat_Nat_add || rev || 2.43518449462e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || nat_of_nibble || 2.42091252126e-38
Coq_Structures_OrdersEx_Z_as_OT_pred || nat_of_nibble || 2.42091252126e-38
Coq_Structures_OrdersEx_Z_as_DT_pred || nat_of_nibble || 2.42091252126e-38
Coq_ZArith_BinInt_Z_succ || rep_rat || 2.33526131814e-38
Coq_ZArith_BinInt_Z_succ || rep_int || 2.33526131814e-38
Coq_ZArith_BinInt_Z_succ || rep_real || 2.33526131814e-38
Coq_NArith_BinNat_N_of_nat || cnj || 2.2939922329e-38
Coq_PArith_BinPos_Pos_succ || code_int_of_integer || 2.20651789473e-38
Coq_NArith_BinNat_N_succ || nat_of_char || 2.09298142499e-38
Coq_NArith_BinNat_N_succ || explode || 2.09298142499e-38
Coq_NArith_BinNat_N_succ || rep_Nat || 2.09298142499e-38
Coq_NArith_BinNat_N_to_nat || arctan || 1.98469512456e-38
Coq_ZArith_BinInt_Z_add || pred3 || 1.92198947424e-38
Coq_NArith_BinNat_N_add || rev || 1.8591942506e-38
Coq_ZArith_BinInt_Z_sub || principal || 1.8023669599e-38
Coq_Numbers_Integer_BigZ_BigZ_BigZ_max || set2 || 1.679097378e-38
__constr_Coq_Numbers_BinNums_Z_0_3 || code_Suc || 1.63684607756e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_add || rev || 1.60514886617e-38
Coq_Structures_OrdersEx_Z_as_OT_add || rev || 1.60514886617e-38
Coq_Structures_OrdersEx_Z_as_DT_add || rev || 1.60514886617e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_max || set2 || 1.57104402108e-38
Coq_Structures_OrdersEx_Z_as_OT_max || set2 || 1.57104402108e-38
Coq_Structures_OrdersEx_Z_as_DT_max || set2 || 1.57104402108e-38
Coq_ZArith_BinInt_Z_of_N || nat_of_nibble || 1.54454375944e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_sub || some || 1.45223269454e-38
Coq_Structures_OrdersEx_Z_as_OT_sub || some || 1.45223269454e-38
Coq_Structures_OrdersEx_Z_as_DT_sub || some || 1.45223269454e-38
Coq_ZArith_BinInt_Z_opp || product_Rep_unit || 1.38799029297e-38
Coq_ZArith_BinInt_Z_of_nat || code_Suc || 1.30959051158e-38
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || finite_finite2 || 1.30554054269e-38
Coq_PArith_BinPos_Pos_to_nat || implode str || 1.27041578861e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_le || finite_finite2 || 1.22282984231e-38
Coq_Structures_OrdersEx_Z_as_OT_le || finite_finite2 || 1.22282984231e-38
Coq_Structures_OrdersEx_Z_as_DT_le || finite_finite2 || 1.22282984231e-38
Coq_ZArith_BinInt_Z_succ || nat_of_char || 1.19679095921e-38
Coq_ZArith_BinInt_Z_succ || explode || 1.19679095921e-38
Coq_ZArith_BinInt_Z_succ || rep_Nat || 1.19679095921e-38
Coq_Numbers_Natural_Binary_NBinary_N_succ_double || suc || 1.04867893534e-38
Coq_Structures_OrdersEx_N_as_OT_succ_double || suc || 1.04867893534e-38
Coq_Structures_OrdersEx_N_as_DT_succ_double || suc || 1.04867893534e-38
Coq_Numbers_Cyclic_Int31_Int31_phi || code_int_of_integer || 9.44409832075e-39
Coq_ZArith_BinInt_Z_opp || rep_rat || 9.3674495879e-39
Coq_ZArith_BinInt_Z_pred || nat_of_nibble || 9.3674495879e-39
Coq_ZArith_BinInt_Z_opp || rep_int || 9.3674495879e-39
Coq_ZArith_BinInt_Z_opp || rep_real || 9.3674495879e-39
Coq_ZArith_BinInt_Z_sub || rev || 8.78669218815e-39
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || implode str || 8.58726102627e-39
Coq_Structures_OrdersEx_Z_as_OT_pred || implode str || 8.58726102627e-39
Coq_Structures_OrdersEx_Z_as_DT_pred || implode str || 8.58726102627e-39
Coq_NArith_BinNat_N_to_nat || cnj || 7.50043698492e-39
Coq_PArith_BinPos_Pos_to_nat || arctan || 7.35046449184e-39
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || code_Suc || 7.03290880723e-39
Coq_Structures_OrdersEx_Z_as_OT_opp || code_Suc || 7.03290880723e-39
Coq_Structures_OrdersEx_Z_as_DT_opp || code_Suc || 7.03290880723e-39
Coq_ZArith_BinInt_Z_max || set2 || 6.92570845585e-39
__constr_Coq_Numbers_BinNums_Z_0_3 || nat_of_nibble || 5.96866859904e-39
Coq_Numbers_Natural_Binary_NBinary_N_double || suc || 5.89846850128e-39
Coq_Structures_OrdersEx_N_as_OT_double || suc || 5.89846850128e-39
Coq_Structures_OrdersEx_N_as_DT_double || suc || 5.89846850128e-39
Coq_ZArith_BinInt_Z_of_N || implode str || 5.59107886242e-39
Coq_ZArith_BinInt_Z_le || finite_finite2 || 5.31463007399e-39
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || arctan || 5.01572922188e-39
Coq_Structures_OrdersEx_Z_as_OT_pred || arctan || 5.01572922188e-39
Coq_Structures_OrdersEx_Z_as_DT_pred || arctan || 5.01572922188e-39
Coq_ZArith_BinInt_Z_opp || nat_of_char || 4.92998377252e-39
Coq_ZArith_BinInt_Z_opp || explode || 4.92998377252e-39
Coq_ZArith_BinInt_Z_opp || rep_Nat || 4.92998377252e-39
Coq_Structures_OrdersEx_Nat_as_DT_add || some || 4.84828661139e-39
Coq_Structures_OrdersEx_Nat_as_OT_add || some || 4.84828661139e-39
Coq_ZArith_BinInt_Z_of_nat || nat_of_nibble || 4.8227214276e-39
Coq_Numbers_Natural_Binary_NBinary_N_add || some || 4.71817868934e-39
Coq_Structures_OrdersEx_N_as_OT_add || some || 4.71817868934e-39
Coq_Structures_OrdersEx_N_as_DT_add || some || 4.71817868934e-39
Coq_Arith_PeanoNat_Nat_add || some || 4.5932279341e-39
Coq_NArith_BinNat_N_of_nat || sqrt || 4.55217077208e-39
Coq_ZArith_BinInt_Z_add || principal || 3.57881586895e-39
Coq_NArith_BinNat_N_add || some || 3.57610043212e-39
Coq_ZArith_BinInt_Z_pred || implode str || 3.46691182786e-39
Coq_ZArith_BinInt_Z_of_N || arctan || 3.29914946782e-39
Coq_Numbers_Integer_Binary_ZBinary_Z_add || some || 3.12023378883e-39
Coq_Structures_OrdersEx_Z_as_OT_add || some || 3.12023378883e-39
Coq_Structures_OrdersEx_Z_as_DT_add || some || 3.12023378883e-39
Coq_ZArith_Int_Z_as_Int_i2z || suc || 3.05500162268e-39
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || nat_of_nibble || 2.92227352583e-39
Coq_Structures_OrdersEx_Z_as_OT_succ || nat_of_nibble || 2.92227352583e-39
Coq_Structures_OrdersEx_Z_as_DT_succ || nat_of_nibble || 2.92227352583e-39
Coq_PArith_BinPos_Pos_to_nat || cnj || 2.89627682847e-39
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || nat_of_nibble || 2.66094390233e-39
Coq_Structures_OrdersEx_Z_as_OT_opp || nat_of_nibble || 2.66094390233e-39
Coq_Structures_OrdersEx_Z_as_DT_opp || nat_of_nibble || 2.66094390233e-39
__constr_Coq_Numbers_BinNums_Z_0_3 || implode str || 2.25271930522e-39
Coq_Bool_Bool_Is_true || suc || 2.15122792488e-39
Coq_ZArith_BinInt_Z_pred || arctan || 2.06864637086e-39
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || cnj || 2.00743234586e-39
Coq_Structures_OrdersEx_Z_as_OT_pred || cnj || 2.00743234586e-39
Coq_Structures_OrdersEx_Z_as_DT_pred || cnj || 2.00743234586e-39
Coq_Numbers_Natural_Binary_NBinary_N_succ || nat_of_nibble || 1.96692614243e-39
Coq_Structures_OrdersEx_N_as_OT_succ || nat_of_nibble || 1.96692614243e-39
Coq_Structures_OrdersEx_N_as_DT_succ || nat_of_nibble || 1.96692614243e-39
Coq_Reals_Rtrigo_def_exp || suc || 1.83980894372e-39
Coq_ZArith_BinInt_Z_of_nat || implode str || 1.83692410661e-39
Coq_ZArith_BinInt_Z_add || rev || 1.83431117822e-39
Coq_ZArith_BinInt_Z_sub || some || 1.78244825458e-39
Coq_NArith_BinNat_N_succ || nat_of_nibble || 1.71326049809e-39
Coq_NArith_BinNat_N_to_nat || sqrt || 1.60729123982e-39
Coq_Arith_PeanoNat_Nat_b2n || suc || 1.59005978299e-39
Coq_Numbers_Natural_Binary_NBinary_N_b2n || suc || 1.59005978299e-39
Coq_NArith_BinNat_N_b2n || suc || 1.59005978299e-39
Coq_Structures_OrdersEx_N_as_OT_b2n || suc || 1.59005978299e-39
Coq_Structures_OrdersEx_N_as_DT_b2n || suc || 1.59005978299e-39
Coq_Structures_OrdersEx_Nat_as_DT_b2n || suc || 1.59005978299e-39
Coq_Structures_OrdersEx_Nat_as_OT_b2n || suc || 1.59005978299e-39
Coq_ZArith_BinInt_Z_b2z || suc || 1.3869422519e-39
Coq_Numbers_Integer_Binary_ZBinary_Z_b2z || suc || 1.3869422519e-39
Coq_Structures_OrdersEx_Z_as_OT_b2z || suc || 1.3869422519e-39
Coq_Structures_OrdersEx_Z_as_DT_b2z || suc || 1.3869422519e-39
__constr_Coq_Numbers_BinNums_Z_0_3 || arctan || 1.35747173577e-39
Coq_ZArith_BinInt_Z_of_N || cnj || 1.34282479691e-39
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || implode str || 1.13686935139e-39
Coq_Structures_OrdersEx_Z_as_OT_succ || implode str || 1.13686935139e-39
Coq_Structures_OrdersEx_Z_as_DT_succ || implode str || 1.13686935139e-39
Coq_ZArith_BinInt_Z_of_nat || arctan || 1.11202218099e-39
Coq_ZArith_BinInt_Z_succ || nat_of_nibble || 1.03925666082e-39
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || implode str || 1.03925666082e-39
Coq_Structures_OrdersEx_Z_as_OT_opp || implode str || 1.03925666082e-39
Coq_Structures_OrdersEx_Z_as_DT_opp || implode str || 1.03925666082e-39
Coq_NArith_BinNat_N_succ_double || suc || 8.64057714097e-40
Coq_ZArith_BinInt_Z_pred || cnj || 8.57629708728e-40
Coq_Numbers_Natural_Binary_NBinary_N_succ || implode str || 7.77867585828e-40
Coq_Structures_OrdersEx_N_as_OT_succ || implode str || 7.77867585828e-40
Coq_Structures_OrdersEx_N_as_DT_succ || implode str || 7.77867585828e-40
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || arctan || 6.95607240391e-40
Coq_Structures_OrdersEx_Z_as_OT_succ || arctan || 6.95607240391e-40
Coq_Structures_OrdersEx_Z_as_DT_succ || arctan || 6.95607240391e-40
Coq_NArith_BinNat_N_succ || implode str || 6.81395544325e-40
Coq_PArith_BinPos_Pos_to_nat || sqrt || 6.60845441148e-40
Coq_NArith_BinNat_N_double || suc || 6.42521303755e-40
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || arctan || 6.37136249295e-40
Coq_Structures_OrdersEx_Z_as_OT_opp || arctan || 6.37136249295e-40
Coq_Structures_OrdersEx_Z_as_DT_opp || arctan || 6.37136249295e-40
__constr_Coq_Numbers_BinNums_Z_0_3 || cnj || 5.72041511296e-40
Coq_Numbers_Natural_Binary_NBinary_N_succ || arctan || 4.79904672033e-40
Coq_Structures_OrdersEx_N_as_OT_succ || arctan || 4.79904672033e-40
Coq_Structures_OrdersEx_N_as_DT_succ || arctan || 4.79904672033e-40
Coq_ZArith_BinInt_Z_of_nat || cnj || 4.72193392419e-40
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || sqrt || 4.68943011226e-40
Coq_Structures_OrdersEx_Z_as_OT_pred || sqrt || 4.68943011226e-40
Coq_Structures_OrdersEx_Z_as_DT_pred || sqrt || 4.68943011226e-40
Coq_ZArith_BinInt_Z_opp || nat_of_nibble || 4.68943011226e-40
Coq_ZArith_BinInt_Z_succ || implode str || 4.21774283073e-40
Coq_NArith_BinNat_N_succ || arctan || 4.21589220738e-40
Coq_ZArith_BinInt_Z_add || some || 4.1369248952e-40
Coq_ZArith_BinInt_Z_of_N || sqrt || 3.21760000419e-40
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || cnj || 3.00639770397e-40
Coq_Structures_OrdersEx_Z_as_OT_succ || cnj || 3.00639770397e-40
Coq_Structures_OrdersEx_Z_as_DT_succ || cnj || 3.00639770397e-40
Coq_ZArith_BinInt_Z_succ || arctan || 2.63637065756e-40
Coq_Init_Datatypes_CompOpp || suc || 2.11691100891e-40
Coq_ZArith_BinInt_Z_pred || sqrt || 2.11301055897e-40
Coq_Numbers_Natural_Binary_NBinary_N_succ || cnj || 2.10282374247e-40
Coq_Structures_OrdersEx_N_as_OT_succ || cnj || 2.10282374247e-40
Coq_Structures_OrdersEx_N_as_DT_succ || cnj || 2.10282374247e-40
Coq_ZArith_BinInt_Z_opp || implode str || 1.96371467298e-40
Coq_NArith_BinNat_N_succ || cnj || 1.85608277128e-40
__constr_Coq_Numbers_BinNums_Z_0_3 || sqrt || 1.44463003904e-40
Coq_ZArith_BinInt_Z_opp || arctan || 1.24705734221e-40
Coq_ZArith_BinInt_Z_of_nat || sqrt || 1.20633371916e-40
Coq_ZArith_BinInt_Z_succ || cnj || 1.18054813418e-40
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || sqrt || 7.88946997829e-41
Coq_Structures_OrdersEx_Z_as_OT_succ || sqrt || 7.88946997829e-41
Coq_Structures_OrdersEx_Z_as_DT_succ || sqrt || 7.88946997829e-41
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || sqrt || 7.28606902709e-41
Coq_Structures_OrdersEx_Z_as_OT_opp || sqrt || 7.28606902709e-41
Coq_Structures_OrdersEx_Z_as_DT_opp || sqrt || 7.28606902709e-41
Coq_Numbers_Cyclic_Int31_Int31_phi || suc || 6.20142745304e-41
Coq_Numbers_Natural_Binary_NBinary_N_succ || sqrt || 5.63476837731e-41
Coq_Structures_OrdersEx_N_as_OT_succ || sqrt || 5.63476837731e-41
Coq_Structures_OrdersEx_N_as_DT_succ || sqrt || 5.63476837731e-41
Coq_NArith_BinNat_N_succ || sqrt || 5.00963517761e-41
Coq_ZArith_BinInt_Z_succ || sqrt || 3.26981067787e-41
Coq_ZArith_BinInt_Z_opp || sqrt || 1.65324300172e-41
