__constr_Coq_Numbers_BinNums_positive_0_3 || nat || 0.738779446393
$equals3 || gcd_lcm || 0.695339703523
$equals3 || gcd_gcd || 0.688545674498
__constr_Coq_Numbers_BinNums_Z_0_2 || zero_zero || 0.680879049219
Coq_Numbers_BinNums_positive_0 || nat || 0.672513785861
Coq_Numbers_BinNums_N_0 || nat || 0.644921320521
Coq_Numbers_BinNums_Z_0 || nat || 0.622249745008
Coq_Init_Datatypes_nat_0 || nat || 0.612274913615
Coq_Classes_RelationClasses_Equivalence_0 || semilattice || 0.565201888636
Coq_Classes_RelationClasses_Equivalence_0 || lattic35693393ce_set || 0.519098616878
Coq_Classes_RelationClasses_Symmetric || semilattice || 0.500255453402
Coq_Classes_RelationClasses_Symmetric || lattic35693393ce_set || 0.497308945703
Coq_Classes_RelationClasses_Reflexive || semilattice || 0.49471233258
Coq_Classes_RelationClasses_Transitive || semilattice || 0.493893210849
Coq_Classes_RelationClasses_Reflexive || lattic35693393ce_set || 0.491893932286
Coq_Classes_RelationClasses_Transitive || lattic35693393ce_set || 0.491215352644
__constr_Coq_Numbers_BinNums_N_0_2 || zero_zero || 0.442833512566
Coq_Init_Datatypes_bool_0 || rat || 0.43637183843
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || size_nibble || 0.418586775666
__constr_Coq_Numbers_BinNums_Z_0_2 || one_one || 0.410581208654
Coq_Classes_RelationClasses_StrictOrder_0 || trans || 0.408800175396
__constr_Coq_Numbers_BinNums_positive_0_3 || real || 0.398248490949
__constr_Coq_Numbers_BinNums_N_0_1 || one2 || 0.387169145039
Coq_Classes_RelationClasses_StrictOrder_0 || wf || 0.382237831147
Coq_Setoids_Setoid_Setoid_Theory || semilattice || 0.378500528138
__constr_Coq_Numbers_BinNums_N_0_2 || one_one || 0.366284129316
__constr_Coq_Numbers_BinNums_Z_0_1 || one2 || 0.350552757664
Coq_ZArith_Int_Z_as_Int_i2z || size_nibble || 0.333737692488
__constr_Coq_Numbers_BinNums_N_0_2 || size_nibble || 0.325102124309
__constr_Coq_Numbers_BinNums_Z_0_2 || size_nibble || 0.314881484444
__constr_Coq_Numbers_BinNums_positive_0_3 || complex || 0.311033461211
Coq_Classes_RelationClasses_PreOrder_0 || trans || 0.30573579664
__constr_Coq_Numbers_BinNums_Z_0_1 || nat || 0.30176347385
Coq_Classes_RelationClasses_PreOrder_0 || wf || 0.280580193217
__constr_Coq_Numbers_BinNums_N_0_1 || nat || 0.280107854478
Coq_Classes_RelationClasses_Transitive || trans || 0.277148715731
Coq_Classes_RelationClasses_Reflexive || trans || 0.27619018819
Coq_QArith_QArith_base_Q_0 || nat || 0.261131403642
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || size_nibble || 0.254193039491
Coq_Classes_RelationClasses_Equivalence_0 || equiv_part_equivp || 0.252311250168
__constr_Coq_Init_Datatypes_list_0_1 || nil || 0.250526647066
__constr_Coq_Init_Datatypes_nat_0_1 || nat || 0.240601371343
Coq_Classes_RelationClasses_StrictOrder_0 || antisym || 0.237131048218
Coq_Setoids_Setoid_Setoid_Theory || lattic35693393ce_set || 0.230995344443
Coq_Classes_RelationClasses_Equivalence_0 || transp || 0.23058776213
Coq_Classes_RelationClasses_Equivalence_0 || symp || 0.229744791635
Coq_Classes_RelationClasses_StrictOrder_0 || bNF_Ca829732799finite || 0.218558347249
__constr_Coq_Init_Datatypes_nat_0_2 || zero_zero || 0.216556617641
Coq_romega_ReflOmegaCore_ZOmega_term_stable || nat3 || 0.213605924527
Coq_Classes_RelationClasses_Reflexive || wf || 0.211977213421
Coq_Classes_RelationClasses_Transitive || wf || 0.208640782387
Coq_Classes_RelationClasses_Equivalence_0 || wf || 0.18035954758
Coq_Classes_RelationClasses_PreOrder_0 || antisym || 0.170342747605
Coq_Init_Wf_well_founded || trans || 0.167281445934
__constr_Coq_Numbers_BinNums_Z_0_3 || zero_zero || 0.166803331406
Coq_Classes_RelationClasses_Reflexive || antisym || 0.16653358733
Coq_Reals_Rdefinitions_R || nat || 0.166050506249
__constr_Coq_Init_Datatypes_bool_0_2 || nibble0 || 0.159371816078
__constr_Coq_Numbers_BinNums_positive_0_3 || int || 0.158386477944
Coq_Classes_RelationClasses_Equivalence_0 || trans || 0.15768361465
Coq_QArith_QArith_base_Qeq || bNF_Ca1495478003natLeq || 0.156421093598
Coq_Classes_RelationClasses_Transitive || antisym || 0.155505798442
Coq_Classes_RelationClasses_PreOrder_0 || bNF_Ca829732799finite || 0.155487362887
__constr_Coq_Init_Datatypes_bool_0_1 || nibble0 || 0.154915767262
Coq_Init_Wf_well_founded || wf || 0.154317703891
Coq_Init_Peano_lt || bNF_Ca1495478003natLeq || 0.152680177442
__constr_Coq_Numbers_BinNums_positive_0_3 || one2 || 0.149114540005
__constr_Coq_Numbers_BinNums_positive_0_3 || code_integer || 0.146981967791
Coq_Numbers_Natural_BigN_BigN_BigN_t || nat || 0.139268093537
__constr_Coq_Init_Datatypes_bool_0_2 || nibble1 || 0.137854401007
Coq_Init_Peano_le_0 || bNF_Ca1495478003natLeq || 0.136318113718
__constr_Coq_Init_Datatypes_bool_0_1 || nibble1 || 0.133961330858
__constr_Coq_Init_Datatypes_nat_0_2 || one_one || 0.128274791561
Coq_Numbers_Integer_BigZ_BigZ_BigZ_t || nat || 0.12801307427
Coq_QArith_QArith_base_Qeq || less_than || 0.127537206227
Coq_PArith_BinPos_Pos_to_nat || size_nibble || 0.12494472249
__constr_Coq_Numbers_BinNums_Z_0_1 || nibble0 || 0.123836168772
Coq_Setoids_Setoid_Setoid_Theory || bNF_Wellorder_wo_rel || 0.123566011603
__constr_Coq_Numbers_BinNums_Z_0_1 || int || 0.123369139577
Coq_Init_Peano_lt || less_than || 0.12199718343
Coq_Sets_Integers_Integers_0 || code_pcr_natural code_cr_natural || 0.121821489372
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || suc || 0.117804919721
Coq_Structures_OrdersEx_Z_as_OT_opp || suc || 0.117804919721
Coq_Structures_OrdersEx_Z_as_DT_opp || suc || 0.117804919721
Coq_Classes_RelationClasses_Reflexive || bNF_Ca829732799finite || 0.11593832763
Coq_Classes_RelationClasses_Transitive || bNF_Ca829732799finite || 0.113904040603
Coq_ZArith_BinInt_Z_opp || suc || 0.113809415911
__constr_Coq_Numbers_BinNums_N_0_1 || nibble0 || 0.113719262481
__constr_Coq_Init_Datatypes_bool_0_2 || one2 || 0.111411133699
Coq_Numbers_Integer_Binary_ZBinary_Z_eqf || realrel || 0.111061172577
Coq_Structures_OrdersEx_Z_as_OT_eqf || realrel || 0.111061172577
Coq_Structures_OrdersEx_Z_as_DT_eqf || realrel || 0.111061172577
Coq_ZArith_BinInt_Z_eqf || realrel || 0.111061172577
Coq_ZArith_Int_Z_as_Int__1 || nibble0 || 0.108354620099
Coq_Numbers_Natural_Binary_NBinary_N_eqf || realrel || 0.108201827474
Coq_NArith_BinNat_N_eqf || realrel || 0.108201827474
Coq_Structures_OrdersEx_N_as_OT_eqf || realrel || 0.108201827474
Coq_Structures_OrdersEx_N_as_DT_eqf || realrel || 0.108201827474
__constr_Coq_Init_Datatypes_bool_0_1 || one2 || 0.108047335978
Coq_Sets_Integers_nat_po || code_natural || 0.106115063481
Coq_Arith_PeanoNat_Nat_eqf || realrel || 0.105827481082
Coq_NArith_Ndigits_eqf || realrel || 0.105827481082
Coq_Structures_OrdersEx_Nat_as_DT_eqf || realrel || 0.105827481082
Coq_Structures_OrdersEx_Nat_as_OT_eqf || realrel || 0.105827481082
__constr_Coq_Numbers_BinNums_N_0_1 || nibble1 || 0.1051154546
Coq_Init_Peano_le_0 || less_than || 0.10465421906
__constr_Coq_Numbers_BinNums_Z_0_1 || nibble1 || 0.101478610463
Coq_ZArith_BinInt_Z_sub || gen_length || 0.100830426076
__constr_Coq_Numbers_BinNums_positive_0_3 || nibble0 || 0.0977921461855
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || zero_zero || 0.0977829309161
Coq_Structures_OrdersEx_Z_as_OT_succ || zero_zero || 0.0977829309161
Coq_Structures_OrdersEx_Z_as_DT_succ || zero_zero || 0.0977829309161
Coq_ZArith_BinInt_Z_succ || zero_zero || 0.0948153811174
Coq_Numbers_Natural_Binary_NBinary_N_succ || zero_zero || 0.0948100787957
Coq_Structures_OrdersEx_N_as_OT_succ || zero_zero || 0.0948100787957
Coq_Structures_OrdersEx_N_as_DT_succ || zero_zero || 0.0948100787957
Coq_NArith_BinNat_N_succ || zero_zero || 0.094419971733
Coq_Classes_RelationPairs_RelProd || lex_prod || 0.0938443548972
Coq_ZArith_Int_Z_as_Int__1 || nibble1 || 0.0936405363158
Coq_ZArith_BinInt_Z_le || wf || 0.0927768731107
Coq_Classes_RelationClasses_Transitive || semilattice_axioms || 0.092431671249
Coq_ZArith_Znumtheory_prime_0 || positive2 || 0.0909488234672
__constr_Coq_Numbers_BinNums_positive_0_3 || nibble1 || 0.0889299859978
Coq_ZArith_Int_Z_as_Int_i2z || nat_of_num || 0.0882940442285
Coq_Init_Datatypes_list_0 || list || 0.0870123515932
Coq_Lists_List_concat || concat || 0.0855640615805
Coq_Lists_SetoidList_inclA || lexordp_eq || 0.0811067583869
Coq_Init_Wf_well_founded || antisym || 0.0807323037981
Coq_ZArith_BinInt_Z_lnot || size_size || 0.0806995565208
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibble0 || 0.0797114375269
Coq_FSets_FMapPositive_PositiveMap_E_bits_lt || bNF_Ca1495478003natLeq || 0.0770260336056
Coq_Init_Wf_well_founded || bNF_Ca829732799finite || 0.0759041966773
Coq_Classes_RelationClasses_Symmetric || semilattice_axioms || 0.074941636358
Coq_Classes_RelationClasses_Reflexive || semilattice_axioms || 0.0728403011139
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eqf || realrel || 0.0720032173396
Coq_Classes_RelationClasses_Equivalence_0 || antisym || 0.0699402307185
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibble1 || 0.0699086989546
Coq_Numbers_Natural_BigN_BigN_BigN_eqf || realrel || 0.0698334657126
Coq_ZArith_Int_Z_as_Int__1 || nibbleA || 0.0688181044709
Coq_Numbers_Integer_Binary_ZBinary_Z_lnot || nat_of_num || 0.0668139721785
Coq_Structures_OrdersEx_Z_as_OT_lnot || nat_of_num || 0.0668139721785
Coq_Structures_OrdersEx_Z_as_DT_lnot || nat_of_num || 0.0668139721785
Coq_ZArith_Int_Z_as_Int__1 || one2 || 0.0665943546749
Coq_ZArith_Int_Z_as_Int__1 || nibbleB || 0.0661742354033
Coq_FSets_FMapPositive_PositiveMap_E_bits_lt || less_than || 0.0659591713925
Coq_ZArith_BinInt_Z_lnot || nat_of_num || 0.0653083608192
Coq_Classes_RelationClasses_Symmetric || abel_semigroup || 0.0651235542187
Coq_Init_Peano_lt || pred_nat || 0.0648424672075
Coq_QArith_QArith_base_Qeq || pred_nat || 0.0645653109574
Coq_Structures_OrdersEx_N_as_OT_divide || bNF_Ca1495478003natLeq || 0.0644777320099
Coq_Structures_OrdersEx_N_as_DT_divide || bNF_Ca1495478003natLeq || 0.0644777320099
Coq_Numbers_Natural_Binary_NBinary_N_divide || bNF_Ca1495478003natLeq || 0.0644777320099
Coq_NArith_BinNat_N_divide || bNF_Ca1495478003natLeq || 0.0644777320099
Coq_ZArith_Int_Z_as_Int__1 || nibble8 || 0.0639315462035
__constr_Coq_Init_Datatypes_nat_0_1 || real || 0.0635575177016
Coq_Classes_RelationClasses_Reflexive || abel_semigroup || 0.0632109610374
Coq_ZArith_Znumtheory_prime_0 || positive || 0.0627626175794
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || nat_of_num || 0.0624173686954
Coq_QArith_QArith_base_Qlt || bNF_Ca1495478003natLeq || 0.0620474143887
Coq_ZArith_BinInt_Z_opp || list || 0.0618732116123
Coq_Numbers_Integer_Binary_ZBinary_Z_land || binomial || 0.0618361901758
Coq_Structures_OrdersEx_Z_as_OT_land || binomial || 0.0618361901758
Coq_Structures_OrdersEx_Z_as_DT_land || binomial || 0.0618361901758
Coq_Arith_PeanoNat_Nat_divide || bNF_Ca1495478003natLeq || 0.0617468438923
Coq_Structures_OrdersEx_Nat_as_DT_divide || bNF_Ca1495478003natLeq || 0.0617468438923
Coq_Structures_OrdersEx_Nat_as_OT_divide || bNF_Ca1495478003natLeq || 0.0617468438923
Coq_Init_Datatypes_app || append || 0.061661431213
Coq_Numbers_Integer_Binary_ZBinary_Z_land || root || 0.0613100636782
Coq_Structures_OrdersEx_Z_as_OT_land || root || 0.0613100636782
Coq_Structures_OrdersEx_Z_as_DT_land || root || 0.0613100636782
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || bNF_Ca1495478003natLeq || 0.0611754559421
Coq_Structures_OrdersEx_Z_as_OT_divide || bNF_Ca1495478003natLeq || 0.0611754559421
Coq_Structures_OrdersEx_Z_as_DT_divide || bNF_Ca1495478003natLeq || 0.0611754559421
Coq_Structures_OrdersEx_PositiveOrderedTypeBits_lt || bNF_Ca1495478003natLeq || 0.060828805231
__constr_Coq_Numbers_BinNums_positive_0_3 || nibbleA || 0.0607764189294
Coq_ZArith_BinInt_Z_land || binomial || 0.0601953500898
__constr_Coq_Numbers_BinNums_positive_0_3 || nibbleB || 0.0600425050046
Coq_ZArith_BinInt_Z_land || root || 0.0596952255314
__constr_Coq_Numbers_BinNums_positive_0_3 || nibble8 || 0.059400773124
Coq_Classes_RelationClasses_Transitive || abel_semigroup || 0.0593060509729
Coq_Lists_List_Forall2_0 || listrelp || 0.0591916065466
__constr_Coq_Numbers_BinNums_Z_0_2 || suc || 0.0591859980255
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || nat_of_nibble || 0.0585407824003
Coq_ZArith_Int_Z_as_Int__1 || nibbleC || 0.0574879144996
__constr_Coq_Numbers_BinNums_positive_0_3 || nibbleC || 0.0574397482423
Coq_ZArith_BinInt_Z_divide || bNF_Ca1495478003natLeq || 0.057313294591
__constr_Coq_Numbers_BinNums_positive_0_3 || nibbleD || 0.0570534540079
Coq_Structures_OrdersEx_PositiveOrderedTypeBits_lt || less_than || 0.0567711603657
Coq_Init_Datatypes_prod_0 || product_prod || 0.0567185091901
Coq_ZArith_Int_Z_as_Int__1 || nibbleD || 0.056291981505
__constr_Coq_Numbers_BinNums_N_0_1 || zero_Rep || 0.056138421264
__constr_Coq_Numbers_BinNums_positive_0_3 || nibbleF || 0.0560570801322
Coq_QArith_QArith_base_Qlt || less_than || 0.0554519109357
__constr_Coq_Numbers_BinNums_positive_0_3 || nibble3 || 0.0552412895438
Coq_Init_Peano_le_0 || pred_nat || 0.0550996472328
__constr_Coq_Numbers_BinNums_positive_0_3 || nibble9 || 0.0545534879155
Coq_MMaps_MMapPositive_PositiveMap_E_lt || bNF_Ca1495478003natLeq || 0.0544759994964
__constr_Coq_Numbers_BinNums_positive_0_3 || nibble5 || 0.0543466097709
__constr_Coq_Init_Datatypes_nat_0_1 || int || 0.0539568096622
Coq_Classes_RelationClasses_Symmetric || trans || 0.0538331697194
__constr_Coq_Numbers_BinNums_positive_0_3 || nibble2 || 0.0537803847937
Coq_Classes_RelationClasses_Equivalence_0 || bNF_Ca829732799finite || 0.0536122081378
__constr_Coq_Numbers_BinNums_positive_0_3 || nibble4 || 0.0536074321137
__constr_Coq_Numbers_BinNums_positive_0_3 || nibble7 || 0.0534413920718
__constr_Coq_Numbers_BinNums_positive_0_3 || nibbleE || 0.0534413920718
__constr_Coq_Numbers_BinNums_Z_0_1 || zero_Rep || 0.0534392846879
Coq_Numbers_Integer_Binary_ZBinary_Z_even || nibble_of_nat || 0.0534298405005
Coq_Structures_OrdersEx_Z_as_OT_even || nibble_of_nat || 0.0534298405005
Coq_Structures_OrdersEx_Z_as_DT_even || nibble_of_nat || 0.0534298405005
Coq_ZArith_Int_Z_as_Int__1 || nibbleF || 0.0533181373286
__constr_Coq_Numbers_BinNums_positive_0_3 || nibble6 || 0.0532817684165
Coq_Numbers_Natural_Binary_NBinary_N_divide || less_than || 0.0529014669048
Coq_NArith_BinNat_N_divide || less_than || 0.0529014669048
Coq_Structures_OrdersEx_N_as_OT_divide || less_than || 0.0529014669048
Coq_Structures_OrdersEx_N_as_DT_divide || less_than || 0.0529014669048
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibbleA || 0.0528957807456
Coq_Structures_OrdersEx_N_as_DT_lt || bNF_Ca1495478003natLeq || 0.052578560575
Coq_Numbers_Natural_Binary_NBinary_N_lt || bNF_Ca1495478003natLeq || 0.052578560575
Coq_Structures_OrdersEx_N_as_OT_lt || bNF_Ca1495478003natLeq || 0.052578560575
Coq_NArith_BinNat_N_lt || bNF_Ca1495478003natLeq || 0.0523572244851
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || nibble_of_nat || 0.0521827017674
Coq_Structures_OrdersEx_Z_as_OT_odd || nibble_of_nat || 0.0521827017674
Coq_Structures_OrdersEx_Z_as_DT_odd || nibble_of_nat || 0.0521827017674
Coq_ZArith_BinInt_Z_even || nibble_of_nat || 0.0511082432855
Coq_ZArith_Int_Z_as_Int__1 || nibble3 || 0.0510007278195
Coq_MSets_MSetPositive_PositiveSet_E_lt || bNF_Ca1495478003natLeq || 0.0509422920843
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibbleB || 0.0508277713999
Coq_Arith_PeanoNat_Nat_divide || less_than || 0.0507220936112
Coq_Structures_OrdersEx_Nat_as_DT_divide || less_than || 0.0507220936112
Coq_Structures_OrdersEx_Nat_as_OT_divide || less_than || 0.0507220936112
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || less_than || 0.0500684444214
Coq_Structures_OrdersEx_Z_as_OT_divide || less_than || 0.0500684444214
Coq_Structures_OrdersEx_Z_as_DT_divide || less_than || 0.0500684444214
Coq_MMaps_MMapPositive_PositiveMap_E_lt || less_than || 0.0497090951719
Coq_Structures_OrdersEx_PositiveOrderedTypeBits_eq || bNF_Ca1495478003natLeq || 0.0491602060596
__constr_Coq_Init_Datatypes_nat_0_1 || complex || 0.0491445708676
Coq_ZArith_Int_Z_as_Int__1 || nibble9 || 0.0491273981662
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibble8 || 0.0490759084823
Coq_ZArith_BinInt_Z_odd || nibble_of_nat || 0.0489059578973
Coq_Numbers_Natural_Binary_NBinary_N_even || nibble_of_nat || 0.0488085076246
Coq_NArith_BinNat_N_even || nibble_of_nat || 0.0488085076246
Coq_Structures_OrdersEx_N_as_OT_even || nibble_of_nat || 0.0488085076246
Coq_Structures_OrdersEx_N_as_DT_even || nibble_of_nat || 0.0488085076246
Coq_ZArith_Int_Z_as_Int__1 || ii || 0.0487622656111
Coq_ZArith_Int_Z_as_Int__1 || nibble5 || 0.0485780917184
Coq_Numbers_Integer_Binary_ZBinary_Z_log2_up || nibble_of_nat || 0.0482615516532
Coq_Structures_OrdersEx_Z_as_OT_log2_up || nibble_of_nat || 0.0482615516532
Coq_Structures_OrdersEx_Z_as_DT_log2_up || nibble_of_nat || 0.0482615516532
Coq_ZArith_BinInt_Z_log2_up || nibble_of_nat || 0.0480631916932
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || product_size_unit || 0.0476805986597
Coq_Numbers_Natural_Binary_NBinary_N_odd || nibble_of_nat || 0.0475946066289
Coq_Structures_OrdersEx_N_as_OT_odd || nibble_of_nat || 0.0475946066289
Coq_Structures_OrdersEx_N_as_DT_odd || nibble_of_nat || 0.0475946066289
Coq_ZArith_Int_Z_as_Int__1 || nibble2 || 0.0471075480658
Coq_ZArith_Int_Z_as_Int__1 || nibble4 || 0.0466678658962
Coq_ZArith_BinInt_Z_divide || less_than || 0.0464867312021
Coq_ZArith_Int_Z_as_Int__1 || nibble7 || 0.0462498856351
Coq_ZArith_Int_Z_as_Int__1 || nibbleE || 0.0462498856351
Coq_MSets_MSetPositive_PositiveSet_E_lt || less_than || 0.0458750881793
Coq_ZArith_Int_Z_as_Int__1 || nibble6 || 0.0458518435864
Coq_Structures_OrdersEx_PositiveOrderedTypeBits_eq || less_than || 0.0453053375676
Coq_Numbers_Integer_Binary_ZBinary_Z_log2 || nibble_of_nat || 0.0449345166359
Coq_Structures_OrdersEx_Z_as_OT_log2 || nibble_of_nat || 0.0449345166359
Coq_Structures_OrdersEx_Z_as_DT_log2 || nibble_of_nat || 0.0449345166359
__constr_Coq_Init_Datatypes_list_0_2 || cons || 0.0446685296292
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || size_num || 0.0446634324893
Coq_ZArith_BinInt_Z_log2 || nibble_of_nat || 0.0445289482755
Coq_ZArith_Int_Z_as_Int_i2z || nat_of_nibble || 0.0443892818515
Coq_NArith_BinNat_N_odd || nibble_of_nat || 0.044123686697
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibbleC || 0.0440544028057
Coq_Numbers_Natural_Binary_NBinary_N_log2_up || nibble_of_nat || 0.0434973878255
Coq_NArith_BinNat_N_log2_up || nibble_of_nat || 0.0434973878255
Coq_Structures_OrdersEx_N_as_OT_log2_up || nibble_of_nat || 0.0434973878255
Coq_Structures_OrdersEx_N_as_DT_log2_up || nibble_of_nat || 0.0434973878255
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibbleD || 0.0431243444035
Coq_Setoids_Setoid_Setoid_Theory || equiv_equivp || 0.0430693531702
Coq_Reals_Rdefinitions_Rlt || bNF_Ca1495478003natLeq || 0.0429807735834
Coq_Numbers_Natural_Binary_NBinary_N_lt || less_than || 0.042795249489
Coq_Structures_OrdersEx_N_as_OT_lt || less_than || 0.042795249489
Coq_Structures_OrdersEx_N_as_DT_lt || less_than || 0.042795249489
Coq_Classes_RelationClasses_PER_0 || semilattice || 0.0426666842411
Coq_NArith_BinNat_N_lt || less_than || 0.0425943258012
Coq_MMaps_MMapPositive_PositiveMap_E_eq || bNF_Ca1495478003natLeq || 0.0423528292826
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || one2 || 0.0419677622407
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || nat_of_num || 0.041916347494
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibble0 || 0.0415101697944
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibble0 || 0.0411072038173
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibbleF || 0.0408142315248
Coq_Numbers_Natural_Binary_NBinary_N_log2 || nibble_of_nat || 0.0402964311293
Coq_NArith_BinNat_N_log2 || nibble_of_nat || 0.0402964311293
Coq_Structures_OrdersEx_N_as_OT_log2 || nibble_of_nat || 0.0402964311293
Coq_Structures_OrdersEx_N_as_DT_log2 || nibble_of_nat || 0.0402964311293
Coq_ZArith_Int_Z_as_Int_i2z || product_size_unit || 0.0401696387236
Coq_Classes_RelationClasses_Equivalence_0 || bNF_Wellorder_wo_rel || 0.0399201077942
__constr_Coq_Numbers_BinNums_positive_0_2 || zero_zero || 0.0396629284189
Coq_NArith_BinNat_N_succ || bit1 || 0.0394622385081
Coq_Numbers_Natural_BigN_BigN_BigN_one || one2 || 0.0390805707477
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibble3 || 0.0390166026401
Coq_Reals_Rdefinitions_Rlt || less_than || 0.0388057127942
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || one2 || 0.0383746666217
Coq_ZArith_BinInt_Z_div || binomial || 0.0383593981445
Coq_Numbers_Natural_Binary_NBinary_N_succ || bit1 || 0.0378904894696
Coq_Structures_OrdersEx_N_as_OT_succ || bit1 || 0.0378904894696
Coq_Structures_OrdersEx_N_as_DT_succ || bit1 || 0.0378904894696
Coq_MMaps_MMapPositive_PositiveMap_E_eq || less_than || 0.0378738732568
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibble9 || 0.0375650793055
Coq_NArith_BinNat_N_succ || bit0 || 0.0371526603268
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibble1 || 0.0371470601732
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibble5 || 0.0371397322672
Coq_ZArith_Int_Z_as_Int_i2z || size_num || 0.0368900407674
__constr_Coq_Init_Datatypes_nat_0_1 || one2 || 0.0366842749019
Coq_MSets_MSetPositive_PositiveSet_E_eq || bNF_Ca1495478003natLeq || 0.0366303029372
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibble1 || 0.0365393418166
Coq_FSets_FMapPositive_PositiveMap_E_bits_lt || pred_nat || 0.0364048239135
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibble2 || 0.0360016523021
Coq_Numbers_Natural_Binary_NBinary_N_succ || bit0 || 0.0358371182251
Coq_Structures_OrdersEx_N_as_OT_succ || bit0 || 0.0358371182251
Coq_Structures_OrdersEx_N_as_DT_succ || bit0 || 0.0358371182251
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibble4 || 0.0356615474615
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibble7 || 0.0353383033076
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibbleE || 0.0353383033076
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nibble6 || 0.0350305450757
Coq_PArith_POrderedType_Positive_as_DT_lt || bNF_Ca1495478003natLeq || 0.0346563466796
Coq_PArith_POrderedType_Positive_as_OT_lt || bNF_Ca1495478003natLeq || 0.0346563466796
Coq_Structures_OrdersEx_Positive_as_DT_lt || bNF_Ca1495478003natLeq || 0.0346563466796
Coq_Structures_OrdersEx_Positive_as_OT_lt || bNF_Ca1495478003natLeq || 0.0346563466796
Coq_Classes_RelationClasses_Equivalence_0 || abel_semigroup || 0.0339159886613
__constr_Coq_Numbers_BinNums_Z_0_2 || nat_of_nibble || 0.0338758678586
Coq_PArith_BinPos_Pos_lt || bNF_Ca1495478003natLeq || 0.0338631244935
__constr_Coq_Numbers_BinNums_N_0_2 || nat_of_nibble || 0.0338570252008
Coq_ZArith_BinInt_Z_le || distinct || 0.0337673813178
Coq_ZArith_Int_Z_as_Int__1 || product_Unity || 0.0334842216693
Coq_Structures_OrdersEx_PositiveOrderedTypeBits_lt || pred_nat || 0.0334456606072
Coq_Init_Datatypes_app || splice || 0.0332884600745
Coq_Numbers_Integer_Binary_ZBinary_Z_log2_up || num_of_nat || 0.0326713260772
Coq_Structures_OrdersEx_Z_as_OT_log2_up || num_of_nat || 0.0326713260772
Coq_Structures_OrdersEx_Z_as_DT_log2_up || num_of_nat || 0.0326713260772
Coq_Classes_RelationClasses_Symmetric || antisym || 0.0325974407166
Coq_Numbers_Natural_BigN_BigN_BigN_eq || bNF_Ca1495478003natLeq || 0.0325354609999
Coq_ZArith_BinInt_Z_log2_up || num_of_nat || 0.0325279058758
Coq_Lists_List_Forall2_0 || list_all2 || 0.0324753525106
Coq_ZArith_BinInt_Z_le || linorder_sorted || 0.0323023668492
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || csqrt || 0.0318928781369
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || csqrt || 0.0318928781369
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || csqrt || 0.0318928781369
Coq_ZArith_BinInt_Z_sqrt_up || csqrt || 0.0318928781369
Coq_MSets_MSetPositive_PositiveSet_E_eq || less_than || 0.031880292046
Coq_ZArith_Int_Z_as_Int__2 || one2 || 0.0317883672821
Coq_Numbers_Integer_Binary_ZBinary_Z_gcd || root || 0.0316592091191
Coq_Structures_OrdersEx_Z_as_OT_gcd || root || 0.0316592091191
Coq_Structures_OrdersEx_Z_as_DT_gcd || root || 0.0316592091191
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || csqrt || 0.0315540346084
Coq_Structures_OrdersEx_Z_as_OT_sqrt || csqrt || 0.0315540346084
Coq_Structures_OrdersEx_Z_as_DT_sqrt || csqrt || 0.0315540346084
Coq_PArith_POrderedType_Positive_as_DT_le || bNF_Ca1495478003natLeq || 0.0314887523556
Coq_PArith_POrderedType_Positive_as_OT_le || bNF_Ca1495478003natLeq || 0.0314887523556
Coq_Structures_OrdersEx_Positive_as_DT_le || bNF_Ca1495478003natLeq || 0.0314887523556
Coq_Structures_OrdersEx_Positive_as_OT_le || bNF_Ca1495478003natLeq || 0.0314887523556
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || nat_of_nibble || 0.0314844307268
Coq_PArith_BinPos_Pos_le || bNF_Ca1495478003natLeq || 0.0313948060174
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || pred_numeral || 0.0313116424282
Coq_Relations_Relation_Operators_Ltl_0 || lexordp2 || 0.0310619361572
Coq_ZArith_Int_Z_as_Int__3 || one2 || 0.0310196782523
__constr_Coq_Numbers_BinNums_positive_0_3 || product_Unity || 0.0310141168365
Coq_romega_ReflOmegaCore_ZOmega_apply_right || suc_Rep || 0.0309849104875
Coq_romega_ReflOmegaCore_ZOmega_apply_left || suc_Rep || 0.0309849104875
Coq_Numbers_Integer_Binary_ZBinary_Z_even || num_of_nat || 0.030860881142
Coq_Structures_OrdersEx_Z_as_OT_even || num_of_nat || 0.030860881142
Coq_Structures_OrdersEx_Z_as_DT_even || num_of_nat || 0.030860881142
Coq_ZArith_BinInt_Z_sqrt || csqrt || 0.0308195453767
Coq_ZArith_BinInt_Z_gcd || root || 0.0303978393073
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || bNF_Ca1495478003natLeq || 0.0303605328559
Coq_Numbers_Integer_Binary_ZBinary_Z_log2 || num_of_nat || 0.030275947916
Coq_Structures_OrdersEx_Z_as_OT_log2 || num_of_nat || 0.030275947916
Coq_Structures_OrdersEx_Z_as_DT_log2 || num_of_nat || 0.030275947916
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || num_of_nat || 0.0301094141229
Coq_Structures_OrdersEx_Z_as_OT_odd || num_of_nat || 0.0301094141229
Coq_Structures_OrdersEx_Z_as_DT_odd || num_of_nat || 0.0301094141229
Coq_ZArith_BinInt_Z_log2 || num_of_nat || 0.0299854343572
Coq_QArith_QArith_base_Qlt || pred_nat || 0.029558491476
Coq_Classes_RelationClasses_PreOrder_0 || semilattice || 0.0295349873075
__constr_Coq_Init_Datatypes_nat_0_2 || gcd_lcm || 0.0295246279422
Coq_ZArith_BinInt_Z_even || num_of_nat || 0.0294168543381
Coq_PArith_POrderedType_Positive_as_DT_lt || less_than || 0.0292718031393
Coq_PArith_POrderedType_Positive_as_OT_lt || less_than || 0.0292718031393
Coq_Structures_OrdersEx_Positive_as_DT_lt || less_than || 0.0292718031393
Coq_Structures_OrdersEx_Positive_as_OT_lt || less_than || 0.0292718031393
Coq_Classes_RelationClasses_Irreflexive || transitive_acyclic || 0.0291652486648
Coq_Numbers_Natural_Binary_NBinary_N_log2_up || num_of_nat || 0.0290637368126
Coq_NArith_BinNat_N_log2_up || num_of_nat || 0.0290637368126
Coq_Structures_OrdersEx_N_as_OT_log2_up || num_of_nat || 0.0290637368126
Coq_Structures_OrdersEx_N_as_DT_log2_up || num_of_nat || 0.0290637368126
Coq_Classes_RelationClasses_Symmetric || wf || 0.02897480116
Coq_MMaps_MMapPositive_PositiveMap_E_lt || pred_nat || 0.0287659879398
__constr_Coq_Init_Datatypes_nat_0_2 || gcd_gcd || 0.028649380746
Coq_PArith_BinPos_Pos_lt || less_than || 0.0285115793133
Coq_MSets_MSetPositive_PositiveSet_t || nat || 0.0283279140173
Coq_Numbers_Natural_Binary_NBinary_N_divide || pred_nat || 0.0281822348902
Coq_NArith_BinNat_N_divide || pred_nat || 0.0281822348902
Coq_Structures_OrdersEx_N_as_OT_divide || pred_nat || 0.0281822348902
Coq_Structures_OrdersEx_N_as_DT_divide || pred_nat || 0.0281822348902
Coq_ZArith_BinInt_Z_odd || num_of_nat || 0.0280793624018
Coq_Classes_RelationClasses_Equivalence_0 || semilattice_axioms || 0.0280092808353
Coq_Numbers_Natural_BigN_BigN_BigN_eq || less_than || 0.027907003628
Coq_Classes_RelationClasses_PER_0 || lattic35693393ce_set || 0.0278151615682
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || cnj || 0.0274638512653
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || cnj || 0.0274638512653
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || cnj || 0.0274638512653
Coq_ZArith_BinInt_Z_sqrt_up || cnj || 0.0274621466113
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || sqrt || 0.0272889649849
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || sqrt || 0.0272889649849
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || sqrt || 0.0272889649849
Coq_ZArith_BinInt_Z_sqrt_up || sqrt || 0.0272889649849
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || bNF_Ca1495478003natLeq || 0.0272750096678
Coq_Structures_OrdersEx_Z_as_OT_lt || bNF_Ca1495478003natLeq || 0.0272750096678
Coq_Structures_OrdersEx_Z_as_DT_lt || bNF_Ca1495478003natLeq || 0.0272750096678
Coq_Numbers_Natural_Binary_NBinary_N_sqrt || csqrt || 0.0272656030668
Coq_NArith_BinNat_N_sqrt || csqrt || 0.0272656030668
Coq_Structures_OrdersEx_N_as_OT_sqrt || csqrt || 0.0272656030668
Coq_Structures_OrdersEx_N_as_DT_sqrt || csqrt || 0.0272656030668
Coq_Structures_OrdersEx_PositiveOrderedTypeBits_eq || pred_nat || 0.0272242817438
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || cnj || 0.0272127588855
Coq_Structures_OrdersEx_Z_as_OT_sqrt || cnj || 0.0272127588855
Coq_Structures_OrdersEx_Z_as_DT_sqrt || cnj || 0.0272127588855
Coq_Lists_List_Forall_0 || listsp || 0.0271271981723
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || sqrt || 0.027062457555
Coq_Structures_OrdersEx_Z_as_OT_sqrt || sqrt || 0.027062457555
Coq_Structures_OrdersEx_Z_as_DT_sqrt || sqrt || 0.027062457555
Coq_Arith_PeanoNat_Nat_divide || pred_nat || 0.0269370543847
Coq_Structures_OrdersEx_Nat_as_DT_divide || pred_nat || 0.0269370543847
Coq_Structures_OrdersEx_Nat_as_OT_divide || pred_nat || 0.0269370543847
Coq_Numbers_Natural_Binary_NBinary_N_log2 || num_of_nat || 0.0267928199161
Coq_NArith_BinNat_N_log2 || num_of_nat || 0.0267928199161
Coq_Structures_OrdersEx_N_as_OT_log2 || num_of_nat || 0.0267928199161
Coq_Structures_OrdersEx_N_as_DT_log2 || num_of_nat || 0.0267928199161
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || csqrt || 0.0267836651376
Coq_NArith_BinNat_N_sqrt_up || csqrt || 0.0267836651376
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || csqrt || 0.0267836651376
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || csqrt || 0.0267836651376
Coq_Classes_SetoidClass_equiv || id_on || 0.0267490428812
Coq_ZArith_BinInt_Z_sqrt || cnj || 0.0266643814299
Coq_ZArith_BinInt_Z_sqrt || sqrt || 0.0265679690597
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || pred_nat || 0.0265446353294
Coq_Structures_OrdersEx_Z_as_OT_divide || pred_nat || 0.0265446353294
Coq_Structures_OrdersEx_Z_as_DT_divide || pred_nat || 0.0265446353294
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || ii || 0.0265117797113
Coq_Reals_ROrderedType_R_as_OT_eq || less_than || 0.026447936889
Coq_Reals_ROrderedType_R_as_DT_eq || less_than || 0.026447936889
Coq_Sorting_Mergesort_NatSort_sort || suc || 0.0264401025749
Coq_Numbers_Natural_Binary_NBinary_N_even || num_of_nat || 0.0264116626497
Coq_NArith_BinNat_N_even || num_of_nat || 0.0264116626497
Coq_Structures_OrdersEx_N_as_OT_even || num_of_nat || 0.0264116626497
Coq_Structures_OrdersEx_N_as_DT_even || num_of_nat || 0.0264116626497
Coq_Sets_Relations_1_Order_0 || trans || 0.0263215579978
Coq_Numbers_Rational_BigQ_BigQ_BigQ_t || nat || 0.0263113621236
Coq_MSets_MSetPositive_PositiveSet_E_lt || pred_nat || 0.0262627850387
Coq_Numbers_Natural_BigN_BigN_BigN_divide || bNF_Ca1495478003natLeq || 0.0261853604716
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || less_than || 0.0261587482968
Coq_PArith_POrderedType_Positive_as_DT_le || less_than || 0.0261093652131
Coq_PArith_POrderedType_Positive_as_OT_le || less_than || 0.0261093652131
Coq_Structures_OrdersEx_Positive_as_DT_le || less_than || 0.0261093652131
Coq_Structures_OrdersEx_Positive_as_OT_le || less_than || 0.0261093652131
Coq_Numbers_Natural_Binary_NBinary_N_le || bNF_Ca1495478003natLeq || 0.0261062015424
Coq_Structures_OrdersEx_N_as_OT_le || bNF_Ca1495478003natLeq || 0.0261062015424
Coq_Structures_OrdersEx_N_as_DT_le || bNF_Ca1495478003natLeq || 0.0261062015424
Coq_NArith_BinNat_N_le || bNF_Ca1495478003natLeq || 0.0260599112127
Coq_PArith_BinPos_Pos_le || less_than || 0.0260209067501
__constr_Coq_Numbers_BinNums_N_0_2 || size_num || 0.025978081609
Coq_ZArith_Znumtheory_prime_0 || nat_nat_set || 0.0259336681714
Coq_Sets_Relations_1_Antisymmetric || trans || 0.0259275677602
Coq_Numbers_Natural_Binary_NBinary_N_odd || num_of_nat || 0.0257234760085
Coq_Structures_OrdersEx_N_as_OT_odd || num_of_nat || 0.0257234760085
Coq_Structures_OrdersEx_N_as_DT_odd || num_of_nat || 0.0257234760085
__constr_Coq_Numbers_BinNums_positive_0_3 || rat || 0.0254476520489
Coq_ZArith_BinInt_Z_lt || bNF_Ca1495478003natLeq || 0.0253956390444
Coq_Sets_Cpo_Totally_ordered_0 || left_unique || 0.0251840090579
Coq_Numbers_Natural_Binary_NBinary_N_gcd || root || 0.0251280684334
Coq_NArith_BinNat_N_gcd || root || 0.0251280684334
Coq_Structures_OrdersEx_N_as_OT_gcd || root || 0.0251280684334
Coq_Structures_OrdersEx_N_as_DT_gcd || root || 0.0251280684334
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || product_size_unit || 0.0250508042354
__constr_Coq_Numbers_BinNums_Z_0_2 || size_num || 0.0250368076075
Coq_Numbers_Natural_Binary_NBinary_N_lcm || binomial || 0.0249235692864
Coq_NArith_BinNat_N_lcm || binomial || 0.0249235692864
Coq_Structures_OrdersEx_N_as_OT_lcm || binomial || 0.0249235692864
Coq_Structures_OrdersEx_N_as_DT_lcm || binomial || 0.0249235692864
Coq_Sets_Cpo_Totally_ordered_0 || left_total || 0.0248453835842
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || bNF_Ca1495478003natLeq || 0.0248044360717
Coq_Sets_Cpo_Totally_ordered_0 || right_unique || 0.0246869929819
Coq_Init_Datatypes_list_0 || set || 0.0246784562798
Coq_Classes_SetoidTactics_DefaultRelation_0 || semilattice_axioms || 0.0245784284608
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibbleA || 0.0245023396989
Coq_ZArith_BinInt_Z_divide || pred_nat || 0.0244671578337
Coq_Numbers_Integer_Binary_ZBinary_Z_le || bNF_Ca1495478003natLeq || 0.0241925564801
Coq_Structures_OrdersEx_Z_as_OT_le || bNF_Ca1495478003natLeq || 0.0241925564801
Coq_Structures_OrdersEx_Z_as_DT_le || bNF_Ca1495478003natLeq || 0.0241925564801
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibbleB || 0.0240980990292
Coq_Sets_Relations_1_Transitive || trans || 0.0239820482342
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibble8 || 0.0237475603357
Coq_NArith_BinNat_N_odd || num_of_nat || 0.0237111021943
Coq_Sets_Relations_1_Reflexive || trans || 0.0237007648861
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || size_num || 0.0236690436853
Coq_Numbers_Natural_Binary_NBinary_N_sqrt || sqrt || 0.0236309588087
Coq_NArith_BinNat_N_sqrt || sqrt || 0.0236309588087
Coq_Structures_OrdersEx_N_as_OT_sqrt || sqrt || 0.0236309588087
Coq_Structures_OrdersEx_N_as_DT_sqrt || sqrt || 0.0236309588087
Coq_ZArith_Int_Z_as_Int_i2z || pred_numeral || 0.0236185884455
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibbleA || 0.0235161319773
Coq_Numbers_Natural_BigN_BigN_BigN_divide || less_than || 0.0234597872967
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || sqrt || 0.0233057309396
Coq_NArith_BinNat_N_sqrt_up || sqrt || 0.0233057309396
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || sqrt || 0.0233057309396
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || sqrt || 0.0233057309396
Coq_Reals_ROrderedType_R_as_OT_eq || bNF_Ca1495478003natLeq || 0.0232117459312
Coq_Reals_ROrderedType_R_as_DT_eq || bNF_Ca1495478003natLeq || 0.0232117459312
Coq_Numbers_Integer_Binary_ZBinary_Z_quot || binomial || 0.0231138143786
Coq_Structures_OrdersEx_Z_as_OT_quot || binomial || 0.0231138143786
Coq_Structures_OrdersEx_Z_as_DT_quot || binomial || 0.0231138143786
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibbleB || 0.0231078785565
Coq_Sets_Cpo_Totally_ordered_0 || right_total || 0.0230938482666
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || cnj || 0.0229918318955
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || cnj || 0.0229918318955
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || cnj || 0.0229918318955
Coq_NArith_BinNat_N_sqrt_up || cnj || 0.0229917967385
Coq_Numbers_Natural_Binary_NBinary_N_lt || pred_nat || 0.0228956453094
Coq_Structures_OrdersEx_N_as_OT_lt || pred_nat || 0.0228956453094
Coq_Structures_OrdersEx_N_as_DT_lt || pred_nat || 0.0228956453094
Coq_NArith_BinNat_N_lt || pred_nat || 0.0227793379549
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibble8 || 0.0227544112739
Coq_ZArith_BinInt_Z_le || bNF_Ca1495478003natLeq || 0.0227375549105
Coq_Numbers_Natural_Binary_NBinary_N_sqrt || cnj || 0.0227266942764
Coq_NArith_BinNat_N_sqrt || cnj || 0.0227266942764
Coq_Structures_OrdersEx_N_as_OT_sqrt || cnj || 0.0227266942764
Coq_Structures_OrdersEx_N_as_DT_sqrt || cnj || 0.0227266942764
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibbleC || 0.0226930158122
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || less_than || 0.0226185264122
Coq_Structures_OrdersEx_Z_as_OT_lt || less_than || 0.0226185264122
Coq_Structures_OrdersEx_Z_as_DT_lt || less_than || 0.0226185264122
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibbleD || 0.0224881965241
Coq_Sets_Cpo_Totally_ordered_0 || bi_total || 0.0224735520424
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || less_than || 0.0222830001497
Coq_MMaps_MMapPositive_PositiveMap_E_eq || pred_nat || 0.0222430014678
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || product_Unity || 0.0221279672512
Coq_Init_Peano_lt || semilattice || 0.0221036671441
Coq_Numbers_Integer_Binary_ZBinary_Z_div || binomial || 0.0220872768357
Coq_Structures_OrdersEx_Z_as_OT_div || binomial || 0.0220872768357
Coq_Structures_OrdersEx_Z_as_DT_div || binomial || 0.0220872768357
Coq_Numbers_Natural_BigN_BigN_BigN_one || ii || 0.0219751880584
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibbleF || 0.0219642489242
Coq_Arith_PeanoNat_Nat_even || nibble_of_nat || 0.0218480492331
Coq_Structures_OrdersEx_Nat_as_DT_even || nibble_of_nat || 0.0218480492331
Coq_Structures_OrdersEx_Nat_as_OT_even || nibble_of_nat || 0.0218480492331
Coq_Numbers_Natural_BigN_BigN_BigN_lt || bNF_Ca1495478003natLeq || 0.0218277700966
Coq_Numbers_Natural_Binary_NBinary_N_div || binomial || 0.0218114329888
Coq_Structures_OrdersEx_N_as_OT_div || binomial || 0.0218114329888
Coq_Structures_OrdersEx_N_as_DT_div || binomial || 0.0218114329888
Coq_ZArith_BinInt_Z_quot || binomial || 0.0217619759332
Coq_Sets_Cpo_Totally_ordered_0 || bi_unique || 0.0216964327784
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibbleC || 0.0216941583023
Coq_MSets_MSetPositive_PositiveSet_lt || less_than || 0.0215878186459
Coq_NArith_BinNat_N_div || binomial || 0.0215795355324
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibble3 || 0.021539870515
Coq_romega_ReflOmegaCore_ZOmega_reduce || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_Tminus_def || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_Tred_factor6 || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_Tred_factor4 || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_Tred_factor3 || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_Tred_factor2 || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_Tred_factor1 || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_Tred_factor0 || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_Tmult_assoc_reduced || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_Tmult_opp_left || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_Tmult_plus_distr || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_Topp_one || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_Topp_mult_r || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_Topp_opp || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_Topp_plus || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_Tred_factor5 || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_T_OMEGA16 || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_T_OMEGA15 || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_T_OMEGA13 || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_T_OMEGA12 || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_T_OMEGA11 || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_T_OMEGA10 || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_Tmult_comm || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_Tplus_comm || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_Tplus_permute || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_Tmult_assoc_r || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_Tplus_assoc_r || zero_Rep || 0.0215037525656
Coq_romega_ReflOmegaCore_ZOmega_Tplus_assoc_l || zero_Rep || 0.0215037525656
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibbleD || 0.0214887723536
Coq_Classes_RelationClasses_Transitive || transitive_acyclic || 0.021472348976
Coq_Sets_Relations_1_Antisymmetric || wf || 0.0214370828618
Coq_Sorting_Sorted_StronglySorted_0 || pred_list || 0.0214295492597
__constr_Coq_Numbers_BinNums_N_0_2 || product_size_unit || 0.0214023768507
Coq_Sets_Relations_1_Order_0 || wf || 0.0213544886219
Coq_ZArith_Zgcd_alt_Zgcd_alt || upt || 0.0213095055993
Coq_Numbers_Natural_Binary_NBinary_N_le || less_than || 0.0212794363298
Coq_Structures_OrdersEx_N_as_OT_le || less_than || 0.0212794363298
Coq_Structures_OrdersEx_N_as_DT_le || less_than || 0.0212794363298
Coq_NArith_BinNat_N_le || less_than || 0.0212373802518
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || ii || 0.0212247159767
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibble9 || 0.0211852533948
Coq_Sorting_Sorted_StronglySorted_0 || listsp || 0.0211663500004
Coq_Numbers_Integer_Binary_ZBinary_Z_pow || binomial || 0.021157342786
Coq_Structures_OrdersEx_Z_as_OT_pow || binomial || 0.021157342786
Coq_Structures_OrdersEx_Z_as_DT_pow || binomial || 0.021157342786
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibble5 || 0.0210791550573
Coq_Arith_PeanoNat_Nat_odd || nibble_of_nat || 0.0210564314001
Coq_Structures_OrdersEx_Nat_as_DT_odd || nibble_of_nat || 0.0210564314001
Coq_Structures_OrdersEx_Nat_as_OT_odd || nibble_of_nat || 0.0210564314001
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibbleF || 0.020964180513
Coq_ZArith_BinInt_Z_lt || less_than || 0.0208976769085
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibble2 || 0.0207900874614
__constr_Coq_Numbers_BinNums_Z_0_2 || product_size_unit || 0.0207862419582
Coq_romega_ReflOmegaCore_ZOmega_t_rewrite || rep_Nat || 0.0207070186106
Coq_romega_ReflOmegaCore_ZOmega_add_norm || rep_Nat || 0.0207070186106
Coq_romega_ReflOmegaCore_ZOmega_scalar_norm || rep_Nat || 0.0207070186106
Coq_romega_ReflOmegaCore_ZOmega_scalar_norm_add || rep_Nat || 0.0207070186106
Coq_romega_ReflOmegaCore_ZOmega_fusion_cancel || rep_Nat || 0.0207070186106
Coq_romega_ReflOmegaCore_ZOmega_fusion || rep_Nat || 0.0207070186106
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibble4 || 0.0207021766014
Coq_Numbers_Natural_Binary_NBinary_N_pow || binomial || 0.0206701541153
Coq_Structures_OrdersEx_N_as_OT_pow || binomial || 0.0206701541153
Coq_Structures_OrdersEx_N_as_DT_pow || binomial || 0.0206701541153
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibble7 || 0.0206179478236
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibbleE || 0.0206179478236
Coq_NArith_BinNat_N_pow || binomial || 0.0205875114629
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibble3 || 0.0205401307096
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nibble6 || 0.020537129075
__constr_Coq_Numbers_BinNums_N_0_2 || nat_of_num || 0.0203499415584
Coq_Reals_Rdefinitions_Rlt || pred_nat || 0.020204079385
__constr_Coq_Numbers_BinNums_N_0_2 || pred_numeral || 0.020197692187
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibble9 || 0.0201863729689
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibble5 || 0.020080635334
Coq_Relations_Relation_Operators_symprod_0 || lex_prod || 0.0199155182968
Coq_ZArith_Zlogarithm_N_digits || int_ge_less_than2 || 0.01991348258
Coq_ZArith_Zlogarithm_N_digits || int_ge_less_than || 0.01991348258
Coq_Numbers_Natural_BigN_BigN_BigN_lt || less_than || 0.0198982851762
Coq_Sorting_Sorted_LocallySorted_0 || pred_list || 0.0198832030987
__constr_Coq_Numbers_BinNums_Z_0_2 || pred_numeral || 0.0198104938896
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibble2 || 0.0197927927199
Coq_Classes_RelationClasses_subrelation || finite_psubset || 0.0197775110373
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibble4 || 0.0197053247068
$equals3 || id2 || 0.0196907736294
Coq_Sorting_Sorted_LocallySorted_0 || listsp || 0.0196552744378
Coq_Numbers_Integer_Binary_ZBinary_Z_le || less_than || 0.0196533106789
Coq_Structures_OrdersEx_Z_as_OT_le || less_than || 0.0196533106789
Coq_Structures_OrdersEx_Z_as_DT_le || less_than || 0.0196533106789
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibble7 || 0.0196215509977
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibbleE || 0.0196215509977
Coq_MSets_MSetPositive_PositiveSet_lt || bNF_Ca1495478003natLeq || 0.019601928196
Coq_Numbers_Natural_BigN_BigN_BigN_one || nibble6 || 0.0195411972069
Coq_Relations_Relation_Operators_Desc_0 || pred_list || 0.0195059414613
Coq_Sets_Relations_1_Reflexive || wf || 0.019471567825
Coq_Init_Peano_lt || lattic35693393ce_set || 0.0194523611911
Coq_Init_Peano_le_0 || semilattice || 0.0193985816221
Coq_Sets_Relations_1_Transitive || wf || 0.0193935588892
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || abs_Nat || 0.0193651087491
Coq_Structures_OrdersEx_Z_as_OT_succ || abs_Nat || 0.0193651087491
Coq_Structures_OrdersEx_Z_as_DT_succ || abs_Nat || 0.0193651087491
Coq_Relations_Relation_Operators_Desc_0 || listsp || 0.0192862965642
Coq_Init_Peano_le_0 || lattic35693393ce_set || 0.0191458590758
__constr_Coq_Numbers_BinNums_Z_0_3 || one_one || 0.0190374372687
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || re || 0.0189610781813
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || arcsin || 0.0189199240787
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || arcsin || 0.0189199240787
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || arcsin || 0.0189199240787
Coq_ZArith_BinInt_Z_sqrt_up || arcsin || 0.0189199240787
Coq_ZArith_BinInt_Z_pow || binomial || 0.0188879466079
Coq_Classes_SetoidClass_equiv || measure || 0.0188474350535
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || binomial || 0.0187798213124
Coq_Structures_OrdersEx_Z_as_OT_mul || binomial || 0.0187798213124
Coq_Structures_OrdersEx_Z_as_DT_mul || binomial || 0.0187798213124
Coq_Numbers_Natural_Binary_NBinary_N_mul || binomial || 0.0187618758979
Coq_Structures_OrdersEx_N_as_OT_mul || binomial || 0.0187618758979
Coq_Structures_OrdersEx_N_as_DT_mul || binomial || 0.0187618758979
Coq_Init_Datatypes_app || gen_length || 0.0187335900534
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || arcsin || 0.0187300827474
Coq_Structures_OrdersEx_Z_as_OT_sqrt || arcsin || 0.0187300827474
Coq_Structures_OrdersEx_Z_as_DT_sqrt || arcsin || 0.0187300827474
__constr_Coq_Numbers_BinNums_Z_0_2 || nat_of_num || 0.0187095476387
Coq_Classes_RelationPairs_RelProd || bNF_Cardinal_cprod || 0.0186801104012
Coq_Lists_List_ForallOrdPairs_0 || pred_list || 0.0186108373232
Coq_Lists_List_Forall_0 || pred_list || 0.0186108373232
Coq_NArith_BinNat_N_mul || binomial || 0.0185607584377
Coq_Classes_RelationClasses_RewriteRelation_0 || semilattice_axioms || 0.0184536928409
Coq_Lists_List_ForallOrdPairs_0 || listsp || 0.0184103212121
Coq_Init_Peano_le_0 || distinct || 0.0183987312221
Coq_ZArith_BinInt_Z_succ || abs_Nat || 0.0183779774011
Coq_ZArith_BinInt_Z_le || less_than || 0.018351425778
Coq_Lists_List_In || list_ex1 || 0.0183316250543
Coq_MSets_MSetPositive_PositiveSet_E_eq || pred_nat || 0.0183249430783
Coq_ZArith_BinInt_Z_sqrt || arcsin || 0.0183178553727
Coq_Numbers_Integer_BigZ_BigZ_BigZ_two || one2 || 0.0179966003832
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || dup || 0.0177464212771
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || dup || 0.0177464212771
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || dup || 0.0177464212771
Coq_ZArith_BinInt_Z_sqrt_up || dup || 0.0177464212771
Coq_Numbers_Natural_BigN_BigN_BigN_two || one2 || 0.0177013331399
Coq_Numbers_Cyclic_DoubleCyclic_DoubleBase_double_wB || upt || 0.0176713722001
Coq_Numbers_Cyclic_Int31_Cyclic31_phibis_aux || upt || 0.0176713722001
Coq_Sorting_Permutation_Permutation_0 || ord_less || 0.0176426717023
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || dup || 0.0175332856651
Coq_Structures_OrdersEx_Z_as_OT_sqrt || dup || 0.0175332856651
Coq_Structures_OrdersEx_Z_as_DT_sqrt || dup || 0.0175332856651
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || arctan || 0.0174952192015
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || arctan || 0.0174952192015
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || arctan || 0.0174952192015
Coq_ZArith_BinInt_Z_sqrt_up || arctan || 0.0174952192015
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || arctan || 0.017332576624
Coq_Structures_OrdersEx_Z_as_OT_sqrt || arctan || 0.017332576624
Coq_Structures_OrdersEx_Z_as_DT_sqrt || arctan || 0.017332576624
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || pred_numeral || 0.0172253798996
Coq_ZArith_BinInt_Z_mul || binomial || 0.0172034109333
Coq_Classes_RelationClasses_Reflexive || transitive_acyclic || 0.0171972288732
Coq_Init_Peano_le_0 || wf || 0.0171796277274
Coq_ZArith_BinInt_Z_sqrt || dup || 0.0170731410783
Coq_ZArith_BinInt_Z_sqrt || arctan || 0.0169786149369
Coq_Numbers_Integer_Binary_ZBinary_Z_le || wf || 0.0165720718822
Coq_Structures_OrdersEx_Z_as_OT_le || wf || 0.0165720718822
Coq_Structures_OrdersEx_Z_as_DT_le || wf || 0.0165720718822
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || code_dup || 0.0165478849755
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || code_dup || 0.0165478849755
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || code_dup || 0.0165478849755
Coq_ZArith_BinInt_Z_sqrt_up || code_dup || 0.0165478849755
__constr_Coq_Numbers_BinNums_positive_0_1 || zero_zero || 0.0165314022275
Coq_Reals_ROrderedType_R_as_OT_eq || pred_nat || 0.0165262560915
Coq_Reals_ROrderedType_R_as_DT_eq || pred_nat || 0.0165262560915
Coq_Classes_RelationClasses_PreOrder_0 || lattic35693393ce_set || 0.0164605770381
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || code_dup || 0.016359461535
Coq_Structures_OrdersEx_Z_as_OT_sqrt || code_dup || 0.016359461535
Coq_Structures_OrdersEx_Z_as_DT_sqrt || code_dup || 0.016359461535
Coq_Classes_SetoidTactics_DefaultRelation_0 || abel_semigroup || 0.0162471923153
Coq_Classes_RelationClasses_Symmetric || bNF_Ca829732799finite || 0.0162271325677
__constr_Coq_Init_Datatypes_nat_0_1 || code_integer || 0.0161677969183
Coq_Relations_Relation_Operators_le_AsB_0 || lex_prod || 0.0161350796377
Coq_ZArith_Zlogarithm_log_inf || int_ge_less_than2 || 0.0160290813576
Coq_ZArith_Zlogarithm_log_inf || int_ge_less_than || 0.0160290813576
Coq_Numbers_Natural_Binary_NBinary_N_succ || abs_Nat || 0.0159971819062
Coq_Structures_OrdersEx_N_as_OT_succ || abs_Nat || 0.0159971819062
Coq_Structures_OrdersEx_N_as_DT_succ || abs_Nat || 0.0159971819062
Coq_ZArith_BinInt_Z_sqrt || code_dup || 0.0159519483909
Coq_Lists_SetoidList_NoDupA_0 || pred_list || 0.0159129071411
Coq_PArith_POrderedType_Positive_as_DT_lt || pred_nat || 0.0158966845734
Coq_PArith_POrderedType_Positive_as_OT_lt || pred_nat || 0.0158966845734
Coq_Structures_OrdersEx_Positive_as_DT_lt || pred_nat || 0.0158966845734
Coq_Structures_OrdersEx_Positive_as_OT_lt || pred_nat || 0.0158966845734
Coq_NArith_BinNat_N_succ || abs_Nat || 0.0158854203324
Coq_Classes_SetoidClass_equiv || measures || 0.0158565930067
Coq_Numbers_Natural_BigN_BigN_BigN_one || product_Unity || 0.0158125996638
Coq_Lists_SetoidList_NoDupA_0 || listsp || 0.0157653336926
Coq_Lists_List_In || list_ex || 0.015727091065
Coq_Sorting_Sorted_Sorted_0 || pred_list || 0.0156955497164
Coq_Sorting_Sorted_Sorted_0 || listsp || 0.0155519194901
Coq_Numbers_Natural_Binary_NBinary_N_shiftr || pow || 0.0155030609226
Coq_Structures_OrdersEx_N_as_OT_shiftr || pow || 0.0155030609226
Coq_Structures_OrdersEx_N_as_DT_shiftr || pow || 0.0155030609226
Coq_PArith_BinPos_Pos_lt || pred_nat || 0.0154444660384
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || product_Unity || 0.0154338050715
Coq_Numbers_Natural_Binary_NBinary_N_shiftl || pow || 0.0153249176141
Coq_Structures_OrdersEx_N_as_OT_shiftl || pow || 0.0153249176141
Coq_Structures_OrdersEx_N_as_DT_shiftl || pow || 0.0153249176141
Coq_NArith_BinNat_N_shiftr || pow || 0.0152220891392
Coq_Classes_SetoidTactics_DefaultRelation_0 || lattic35693393ce_set || 0.0152124775227
Coq_Numbers_Cyclic_ZModulo_ZModulo_Ptail || int_ge_less_than2 || 0.0151704883312
Coq_ZArith_Zlogarithm_log_near || int_ge_less_than2 || 0.0151704883312
Coq_Numbers_Cyclic_ZModulo_ZModulo_Ptail || int_ge_less_than || 0.0151704883312
Coq_ZArith_Zlogarithm_log_near || int_ge_less_than || 0.0151704883312
Coq_ZArith_Zwf_Zwf_up || int_ge_less_than2 || 0.015103642342
Coq_ZArith_Zwf_Zwf || int_ge_less_than2 || 0.015103642342
Coq_ZArith_Zwf_Zwf_up || int_ge_less_than || 0.015103642342
Coq_ZArith_Zwf_Zwf || int_ge_less_than || 0.015103642342
Coq_NArith_BinNat_N_shiftl || pow || 0.0150689277523
Coq_Numbers_Natural_Binary_NBinary_N_sqrt || arcsin || 0.0150602103521
Coq_NArith_BinNat_N_sqrt || arcsin || 0.0150602103521
Coq_Structures_OrdersEx_N_as_OT_sqrt || arcsin || 0.0150602103521
Coq_Structures_OrdersEx_N_as_DT_sqrt || arcsin || 0.0150602103521
Coq_Sets_Relations_1_Antisymmetric || antisym || 0.01505901259
Coq_Numbers_Rational_BigQ_BigQ_BigQ_lt || less_than || 0.0150454639185
Coq_Classes_RelationClasses_StrictOrder_0 || semilattice || 0.0149643724408
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || arcsin || 0.0148092550198
Coq_NArith_BinNat_N_sqrt_up || arcsin || 0.0148092550198
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || arcsin || 0.0148092550198
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || arcsin || 0.0148092550198
Coq_Classes_SetoidTactics_DefaultRelation_0 || semilattice || 0.0145827380299
Coq_ZArith_Int_Z_as_Int_i2z || re || 0.0144149396208
Coq_Numbers_Rational_BigQ_BigQ_BigQ_lt || bNF_Ca1495478003natLeq || 0.0143983384693
Coq_Classes_RelationClasses_relation_equivalence || finite_psubset || 0.0142579106885
Coq_Relations_Relation_Definitions_relation || set || 0.0141822657602
Coq_Classes_RelationClasses_complement || transitive_rtrancl || 0.0141668658711
Coq_Sets_Relations_1_Order_0 || antisym || 0.0141518373924
Coq_PArith_POrderedType_Positive_as_DT_le || pred_nat || 0.0141296982401
Coq_PArith_POrderedType_Positive_as_OT_le || pred_nat || 0.0141296982401
Coq_Structures_OrdersEx_Positive_as_DT_le || pred_nat || 0.0141296982401
Coq_Structures_OrdersEx_Positive_as_OT_le || pred_nat || 0.0141296982401
Coq_PArith_BinPos_Pos_le || pred_nat || 0.0140772975398
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || im || 0.014060938586
Coq_Numbers_Natural_Binary_NBinary_N_sqrt || arctan || 0.0139040788893
Coq_NArith_BinNat_N_sqrt || arctan || 0.0139040788893
Coq_Structures_OrdersEx_N_as_OT_sqrt || arctan || 0.0139040788893
Coq_Structures_OrdersEx_N_as_DT_sqrt || arctan || 0.0139040788893
Coq_PArith_BinPos_Pos_to_nat || nat_of_nibble || 0.0138265546437
Coq_Numbers_Natural_BigN_BigN_BigN_eq || pred_nat || 0.013819800724
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || arctan || 0.0136896277481
Coq_NArith_BinNat_N_sqrt_up || arctan || 0.0136896277481
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || arctan || 0.0136896277481
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || arctan || 0.0136896277481
Coq_Numbers_Natural_Binary_NBinary_N_lxor || pow || 0.0136786957759
Coq_Structures_OrdersEx_N_as_OT_lxor || pow || 0.0136786957759
Coq_Structures_OrdersEx_N_as_DT_lxor || pow || 0.0136786957759
Coq_Classes_RelationClasses_PreOrder_0 || bNF_Wellorder_wo_rel || 0.0135756983657
Coq_Classes_RelationClasses_PER_0 || semilattice_axioms || 0.0135720708311
Coq_Numbers_Natural_Binary_NBinary_N_ldiff || pow || 0.0135100349155
Coq_Structures_OrdersEx_N_as_OT_ldiff || pow || 0.0135100349155
Coq_Structures_OrdersEx_N_as_DT_ldiff || pow || 0.0135100349155
__constr_Coq_Numbers_BinNums_positive_0_3 || ii || 0.0134370880326
Coq_Lists_SetoidPermutation_PermutationA_0 || lexord || 0.0133798920203
Coq_Lists_SetoidList_eqlistA_0 || lexord || 0.0133798920203
Coq_NArith_BinNat_N_ldiff || pow || 0.013353616718
Coq_Sets_Relations_1_Antisymmetric || bNF_Ca829732799finite || 0.0133122968235
Coq_Numbers_Integer_Binary_ZBinary_Z_le || distinct || 0.013300548951
Coq_Structures_OrdersEx_Z_as_OT_le || distinct || 0.013300548951
Coq_Structures_OrdersEx_Z_as_DT_le || distinct || 0.013300548951
Coq_ZArith_BinInt_Z_lcm || upt || 0.0132141392443
Coq_Classes_RelationClasses_RewriteRelation_0 || abel_semigroup || 0.0131008781289
Coq_Sets_Relations_1_Reflexive || antisym || 0.0130710826385
Coq_Numbers_Natural_Binary_NBinary_N_sqrt || dup || 0.0130393332308
Coq_NArith_BinNat_N_sqrt || dup || 0.0130393332308
Coq_Structures_OrdersEx_N_as_OT_sqrt || dup || 0.0130393332308
Coq_Structures_OrdersEx_N_as_DT_sqrt || dup || 0.0130393332308
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || pred_nat || 0.0129019531049
Coq_Numbers_Natural_Binary_NBinary_N_sub || pow || 0.0128853257793
Coq_Structures_OrdersEx_N_as_OT_sub || pow || 0.0128853257793
Coq_Structures_OrdersEx_N_as_DT_sub || pow || 0.0128853257793
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || dup || 0.0127786308194
Coq_NArith_BinNat_N_sqrt_up || dup || 0.0127786308194
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || dup || 0.0127786308194
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || dup || 0.0127786308194
Coq_Lists_SetoidList_equivlistA || lexord || 0.0126984022979
Coq_Numbers_Integer_Binary_ZBinary_Z_le || linorder_sorted || 0.0126958870083
Coq_Structures_OrdersEx_Z_as_OT_le || linorder_sorted || 0.0126958870083
Coq_Structures_OrdersEx_Z_as_DT_le || linorder_sorted || 0.0126958870083
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || bNF_Ca1495478003natLeq || 0.0126888252362
Coq_NArith_BinNat_N_sub || pow || 0.012664378735
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || code_integer_of_num || 0.0125890417909
Coq_ZArith_BinInt_Z_succ || one_one || 0.0125404247586
Coq_Init_Peano_le_0 || linorder_sorted || 0.0124686417692
Coq_Numbers_Integer_Binary_ZBinary_Z_lcm || upt || 0.012432234549
Coq_Structures_OrdersEx_Z_as_OT_lcm || upt || 0.012432234549
Coq_Structures_OrdersEx_Z_as_DT_lcm || upt || 0.012432234549
Coq_Numbers_Natural_Binary_NBinary_N_lor || pow || 0.0124071874572
Coq_Structures_OrdersEx_N_as_OT_lor || pow || 0.0124071874572
Coq_Structures_OrdersEx_N_as_DT_lor || pow || 0.0124071874572
Coq_Classes_RelationClasses_RewriteRelation_0 || lattic35693393ce_set || 0.0124028942422
Coq_Classes_SetoidClass_equiv || transitive_trancl || 0.0123578096481
Coq_Sets_Relations_1_Order_0 || bNF_Ca829732799finite || 0.0123353050836
Coq_NArith_BinNat_N_lor || pow || 0.0123158215619
Coq_ZArith_Int_Z_as_Int_i2z || code_integer_of_num || 0.0122837851285
Coq_NArith_BinNat_N_lxor || pow || 0.0122287713205
Coq_Lists_List_concat || listset || 0.0122000201422
Coq_MSets_MSetPositive_PositiveSet_lt || pred_nat || 0.0121711907632
Coq_Classes_RelationClasses_PER_0 || abel_semigroup || 0.0121594193087
Coq_Numbers_Natural_Binary_NBinary_N_pred || sqr || 0.0120857746031
Coq_Structures_OrdersEx_N_as_OT_pred || sqr || 0.0120857746031
Coq_Structures_OrdersEx_N_as_DT_pred || sqr || 0.0120857746031
Coq_Numbers_Natural_Binary_NBinary_N_sqrt || code_dup || 0.0120759445501
Coq_NArith_BinNat_N_sqrt || code_dup || 0.0120759445501
Coq_Structures_OrdersEx_N_as_OT_sqrt || code_dup || 0.0120759445501
Coq_Structures_OrdersEx_N_as_DT_sqrt || code_dup || 0.0120759445501
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || pred_nat || 0.0120426142791
Coq_Structures_OrdersEx_Z_as_OT_lt || pred_nat || 0.0120426142791
Coq_Structures_OrdersEx_Z_as_DT_lt || pred_nat || 0.0120426142791
Coq_Sets_Relations_1_Transitive || antisym || 0.0120073675731
Coq_ZArith_BinInt_Z_gcd || upt || 0.0118675087534
Coq_Numbers_Integer_Binary_ZBinary_Z_ldiff || pow || 0.0118507268935
Coq_Structures_OrdersEx_Z_as_OT_ldiff || pow || 0.0118507268935
Coq_Structures_OrdersEx_Z_as_DT_ldiff || pow || 0.0118507268935
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || code_dup || 0.0118472031424
Coq_NArith_BinNat_N_sqrt_up || code_dup || 0.0118472031424
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || code_dup || 0.0118472031424
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || code_dup || 0.0118472031424
Coq_NArith_BinNat_N_pred || sqr || 0.0118449896181
Coq_Classes_RelationClasses_RewriteRelation_0 || semilattice || 0.0118041776833
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || less_than || 0.0117952905849
Coq_Arith_PeanoNat_Nat_even || num_of_nat || 0.0117947965341
Coq_Structures_OrdersEx_Nat_as_DT_even || num_of_nat || 0.0117947965341
Coq_Structures_OrdersEx_Nat_as_OT_even || num_of_nat || 0.0117947965341
__constr_Coq_Init_Datatypes_nat_0_2 || bit0 || 0.0117635456816
Coq_Classes_SetoidClass_equiv || transitive_rtrancl || 0.0117516833337
Coq_Numbers_Integer_Binary_ZBinary_Z_lxor || pow || 0.011734924898
Coq_Structures_OrdersEx_Z_as_OT_lxor || pow || 0.011734924898
Coq_Structures_OrdersEx_Z_as_DT_lxor || pow || 0.011734924898
Coq_Numbers_Natural_BigN_BigN_BigN_divide || pred_nat || 0.0116768491732
Coq_Numbers_Integer_Binary_ZBinary_Z_gcd || upt || 0.0116579175531
Coq_Structures_OrdersEx_Z_as_OT_gcd || upt || 0.0116579175531
Coq_Structures_OrdersEx_Z_as_DT_gcd || upt || 0.0116579175531
Coq_Sets_Multiset_meq || finite_psubset || 0.011614909767
Coq_ZArith_Zgcd_alt_Zgcd_alt || upto || 0.0115603649044
Coq_Numbers_Integer_Binary_ZBinary_Z_shiftr || pow || 0.0115234193115
Coq_Numbers_Integer_Binary_ZBinary_Z_shiftl || pow || 0.0115234193115
Coq_Structures_OrdersEx_Z_as_OT_shiftr || pow || 0.0115234193115
Coq_Structures_OrdersEx_Z_as_OT_shiftl || pow || 0.0115234193115
Coq_Structures_OrdersEx_Z_as_DT_shiftr || pow || 0.0115234193115
Coq_Structures_OrdersEx_Z_as_DT_shiftl || pow || 0.0115234193115
Coq_ZArith_BinInt_Z_ldiff || pow || 0.0115234193115
Coq_Lists_SetoidPermutation_PermutationA_0 || lenlex || 0.0114955422532
Coq_Lists_SetoidList_eqlistA_0 || lenlex || 0.0114955422532
Coq_Sets_Relations_1_Reflexive || bNF_Ca829732799finite || 0.0114892161479
Coq_PArith_BinPos_Pos_to_nat || size_num || 0.0113993981917
Coq_Arith_PeanoNat_Nat_odd || num_of_nat || 0.0113622128726
Coq_Structures_OrdersEx_Nat_as_DT_odd || num_of_nat || 0.0113622128726
Coq_Structures_OrdersEx_Nat_as_OT_odd || num_of_nat || 0.0113622128726
__constr_Coq_Numbers_BinNums_Z_0_2 || bot_bot || 0.0113397775698
Coq_Numbers_Natural_Binary_NBinary_N_le || pred_nat || 0.01133252197
Coq_Structures_OrdersEx_N_as_OT_le || pred_nat || 0.01133252197
Coq_Structures_OrdersEx_N_as_DT_le || pred_nat || 0.01133252197
Coq_Numbers_Natural_Binary_NBinary_N_gcd || pow || 0.0113219120736
Coq_NArith_BinNat_N_gcd || pow || 0.0113219120736
Coq_Structures_OrdersEx_N_as_OT_gcd || pow || 0.0113219120736
Coq_Structures_OrdersEx_N_as_DT_gcd || pow || 0.0113219120736
Coq_NArith_BinNat_N_le || pred_nat || 0.011308351112
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || re || 0.0112962018019
Coq_Classes_RelationPairs_RelProd || product || 0.0112709295034
Coq_ZArith_BinInt_Z_shiftr || pow || 0.0112473622854
Coq_ZArith_BinInt_Z_shiftl || pow || 0.0112473622854
Coq_Numbers_Natural_Binary_NBinary_N_sqrt || sqr || 0.0112203145101
Coq_NArith_BinNat_N_sqrt || sqr || 0.0112203145101
Coq_Structures_OrdersEx_N_as_OT_sqrt || sqr || 0.0112203145101
Coq_Structures_OrdersEx_N_as_DT_sqrt || sqr || 0.0112203145101
Coq_ZArith_Int_Z_as_Int_i2z || im || 0.011110764603
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || pos || 0.0111034711464
Coq_Structures_OrdersEx_Z_as_OT_succ || pos || 0.0111034711464
Coq_Structures_OrdersEx_Z_as_DT_succ || pos || 0.0111034711464
Coq_ZArith_BinInt_Z_lxor || pow || 0.0110854255326
Coq_ZArith_BinInt_Z_lt || pred_nat || 0.0110600036392
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || pred_nat || 0.0110342146245
Coq_Numbers_Natural_Binary_NBinary_N_max || pow || 0.0110062507249
Coq_Structures_OrdersEx_N_as_OT_max || pow || 0.0110062507249
Coq_Structures_OrdersEx_N_as_DT_max || pow || 0.0110062507249
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || sqr || 0.0109940130233
Coq_NArith_BinNat_N_sqrt_up || sqr || 0.0109940130233
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || sqr || 0.0109940130233
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || sqr || 0.0109940130233
Coq_Numbers_Integer_Binary_ZBinary_Z_lor || pow || 0.0109379480095
Coq_Structures_OrdersEx_Z_as_OT_lor || pow || 0.0109379480095
Coq_Structures_OrdersEx_Z_as_DT_lor || pow || 0.0109379480095
Coq_Numbers_Natural_BigN_BigN_BigN_le || bNF_Ca1495478003natLeq || 0.0108875595764
Coq_NArith_BinNat_N_max || pow || 0.0108150043873
Coq_Arith_Wf_nat_gtof || measure || 0.0108127801645
Coq_Arith_Wf_nat_ltof || measure || 0.0108127801645
Coq_Numbers_Natural_Binary_NBinary_N_succ || pos || 0.0108106426031
Coq_Structures_OrdersEx_N_as_OT_succ || pos || 0.0108106426031
Coq_Structures_OrdersEx_N_as_DT_succ || pos || 0.0108106426031
Coq_ZArith_Zgcd_alt_fibonacci || int_ge_less_than2 || 0.0107788312501
Coq_ZArith_Zgcd_alt_fibonacci || int_ge_less_than || 0.0107788312501
Coq_NArith_BinNat_N_succ || pos || 0.0107409925832
Coq_Lists_SetoidList_equivlistA || lenlex || 0.0107150760326
Coq_Numbers_Natural_Binary_NBinary_N_gcd || upt || 0.0106726805329
Coq_Structures_OrdersEx_N_as_OT_gcd || upt || 0.0106726805329
Coq_Structures_OrdersEx_N_as_DT_gcd || upt || 0.0106726805329
Coq_NArith_BinNat_N_gcd || upt || 0.010672393914
Coq_ZArith_BinInt_Z_succ || pos || 0.0105805927472
Coq_ZArith_BinInt_Z_lor || pow || 0.0105630906119
Coq_Classes_RelationClasses_Asymmetric || transitive_acyclic || 0.0105470428299
Coq_Sets_Relations_1_Transitive || bNF_Ca829732799finite || 0.0104676823854
Coq_Lists_List_skipn || dropWhile || 0.0104628730934
Coq_Numbers_Integer_Binary_ZBinary_Z_le || pred_nat || 0.010415863021
Coq_Structures_OrdersEx_Z_as_OT_le || pred_nat || 0.010415863021
Coq_Structures_OrdersEx_Z_as_DT_le || pred_nat || 0.010415863021
Coq_Numbers_Natural_BigN_BigN_BigN_lt || pred_nat || 0.010385709039
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || code_Pos || 0.0102512126142
Coq_Structures_OrdersEx_Z_as_OT_succ || code_Pos || 0.0102512126142
Coq_Structures_OrdersEx_Z_as_DT_succ || code_Pos || 0.0102512126142
Coq_Sorting_Permutation_Permutation_0 || finite_psubset || 0.010174407496
Coq_Numbers_Integer_Binary_ZBinary_Z_sgn || sqr || 0.0101702268603
Coq_Structures_OrdersEx_Z_as_OT_sgn || sqr || 0.0101702268603
Coq_Structures_OrdersEx_Z_as_DT_sgn || sqr || 0.0101702268603
Coq_ZArith_BinInt_Z_of_nat || int_ge_less_than2 || 0.0101267121273
Coq_ZArith_BinInt_Z_of_nat || int_ge_less_than || 0.0101267121273
Coq_Classes_RelationClasses_Symmetric || transitive_acyclic || 0.0100748515269
Coq_ZArith_BinInt_Z_abs || suc || 0.0100707970931
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || int_ge_less_than2 || 0.0100671415774
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || int_ge_less_than || 0.0100671415774
Coq_Numbers_Natural_Binary_NBinary_N_sqrt || bitM || 0.0100295278177
Coq_NArith_BinNat_N_sqrt || bitM || 0.0100295278177
Coq_Structures_OrdersEx_N_as_OT_sqrt || bitM || 0.0100295278177
Coq_Structures_OrdersEx_N_as_DT_sqrt || bitM || 0.0100295278177
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || bNF_Ca1495478003natLeq || 0.0100156799899
Coq_PArith_BinPos_Pos_to_nat || product_size_unit || 0.0100043538937
Coq_Numbers_Natural_Binary_NBinary_N_succ || code_Pos || 0.00999128878639
Coq_Structures_OrdersEx_N_as_OT_succ || code_Pos || 0.00999128878639
Coq_Structures_OrdersEx_N_as_DT_succ || code_Pos || 0.00999128878639
Coq_Numbers_Natural_BigN_BigN_BigN_le || less_than || 0.00996652943486
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || sqr || 0.00996487894449
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || sqr || 0.00996487894449
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || sqr || 0.00996487894449
Coq_ZArith_BinInt_Z_sqrt_up || sqr || 0.00996487894449
Coq_NArith_BinNat_N_succ || code_Pos || 0.00993123521009
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || bitM || 0.0098475593661
Coq_NArith_BinNat_N_sqrt_up || bitM || 0.0098475593661
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || bitM || 0.0098475593661
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || bitM || 0.0098475593661
__constr_Coq_Init_Datatypes_nat_0_2 || bit1 || 0.00984743879207
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || sqr || 0.00984340305966
Coq_Structures_OrdersEx_Z_as_OT_sqrt || sqr || 0.00984340305966
Coq_Structures_OrdersEx_Z_as_DT_sqrt || sqr || 0.00984340305966
Coq_ZArith_BinInt_Z_succ || code_Pos || 0.00979874732325
Coq_Numbers_BinNums_Z_0 || int || 0.00974461954423
Coq_ZArith_BinInt_Z_le || pred_nat || 0.00967797446018
Coq_Arith_PeanoNat_Nat_gcd || upt || 0.00958710819383
Coq_Structures_OrdersEx_Nat_as_DT_gcd || upt || 0.00958710819383
Coq_Structures_OrdersEx_Nat_as_OT_gcd || upt || 0.00958710819383
Coq_ZArith_BinInt_Z_sqrt || sqr || 0.00958129728792
Coq_Numbers_Integer_Binary_ZBinary_Z_sub || pow || 0.00943570679989
Coq_Structures_OrdersEx_Z_as_OT_sub || pow || 0.00943570679989
Coq_Structures_OrdersEx_Z_as_DT_sub || pow || 0.00943570679989
Coq_Numbers_Cyclic_DoubleCyclic_DoubleBase_double_wB || upto || 0.00935483511076
Coq_Numbers_Cyclic_Int31_Cyclic31_phibis_aux || upto || 0.00935483511076
Coq_Numbers_Natural_Binary_NBinary_N_pred || bitM || 0.00924204977702
Coq_Structures_OrdersEx_N_as_OT_pred || bitM || 0.00924204977702
Coq_Structures_OrdersEx_N_as_DT_pred || bitM || 0.00924204977702
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || less_than || 0.0091753233996
Coq_Arith_Wf_nat_gtof || id_on || 0.00917128503875
Coq_Arith_Wf_nat_ltof || id_on || 0.00917128503875
Coq_MSets_MSetPositive_PositiveSet_eq || less_than || 0.00915966070313
Coq_Numbers_Integer_Binary_ZBinary_Z_sgn || bitM || 0.00908980346973
Coq_Structures_OrdersEx_Z_as_OT_sgn || bitM || 0.00908980346973
Coq_Structures_OrdersEx_Z_as_DT_sgn || bitM || 0.00908980346973
Coq_ZArith_BinInt_Z_rem || pow || 0.00907670263694
Coq_ZArith_Znumtheory_Zis_gcd_0 || ord_less || 0.00907049325548
Coq_NArith_BinNat_N_pred || bitM || 0.00905720756854
Coq_Numbers_Natural_Binary_NBinary_N_add || pow || 0.00900937233613
Coq_Structures_OrdersEx_N_as_OT_add || pow || 0.00900937233613
Coq_Structures_OrdersEx_N_as_DT_add || pow || 0.00900937233613
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || bitM || 0.00892472317926
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || bitM || 0.00892472317926
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || bitM || 0.00892472317926
Coq_ZArith_BinInt_Z_sqrt_up || bitM || 0.00892472317926
Coq_ZArith_Zlogarithm_log_sup || int_ge_less_than2 || 0.00888309815859
Coq_ZArith_Zlogarithm_log_sup || int_ge_less_than || 0.00888309815859
Coq_Lists_SetoidPermutation_PermutationA_0 || lex || 0.00887721874376
Coq_Lists_SetoidList_eqlistA_0 || lex || 0.00887721874376
Coq_NArith_BinNat_N_add || pow || 0.00883608998414
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || bitM || 0.00882678022626
Coq_Structures_OrdersEx_Z_as_OT_sqrt || bitM || 0.00882678022626
Coq_Structures_OrdersEx_Z_as_DT_sqrt || bitM || 0.00882678022626
Coq_Init_Datatypes_sum_0 || product_prod || 0.00878085604283
__constr_Coq_Numbers_BinNums_Z_0_2 || int_ge_less_than2 || 0.00876563921854
__constr_Coq_Numbers_BinNums_Z_0_2 || int_ge_less_than || 0.00876563921854
Coq_Numbers_Integer_Binary_ZBinary_Z_abs || sqr || 0.00866727814067
Coq_Structures_OrdersEx_Z_as_OT_abs || sqr || 0.00866727814067
Coq_Structures_OrdersEx_Z_as_DT_abs || sqr || 0.00866727814067
Coq_ZArith_BinInt_Z_sgn || sqr || 0.00862501531899
Coq_ZArith_BinInt_Z_sqrt || bitM || 0.00861470889411
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || one_one || 0.00859660135234
Coq_Structures_OrdersEx_Z_as_OT_succ || one_one || 0.00859660135234
Coq_Structures_OrdersEx_Z_as_DT_succ || one_one || 0.00859660135234
Coq_Classes_RelationClasses_PER_0 || bNF_Wellorder_wo_rel || 0.00858291677706
Coq_Arith_PeanoNat_Nat_sqrt_up || cnj || 0.0085602926199
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || cnj || 0.0085602926199
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || cnj || 0.0085602926199
Coq_Arith_PeanoNat_Nat_sqrt || csqrt || 0.00850745624749
Coq_Structures_OrdersEx_Nat_as_DT_sqrt || csqrt || 0.00850745624749
Coq_Structures_OrdersEx_Nat_as_OT_sqrt || csqrt || 0.00850745624749
Coq_Arith_PeanoNat_Nat_gcd || root || 0.00849405876172
Coq_Structures_OrdersEx_Nat_as_DT_gcd || root || 0.00849405876172
Coq_Structures_OrdersEx_Nat_as_OT_gcd || root || 0.00849405876172
Coq_Lists_List_skipn || drop || 0.00847766210805
__constr_Coq_Init_Datatypes_nat_0_1 || zero_Rep || 0.00847520187856
Coq_Arith_PeanoNat_Nat_lcm || binomial || 0.00846611228601
Coq_Structures_OrdersEx_Nat_as_DT_lcm || binomial || 0.00846611228601
Coq_Structures_OrdersEx_Nat_as_OT_lcm || binomial || 0.00846611228601
Coq_Arith_PeanoNat_Nat_sqrt_up || csqrt || 0.00845814548098
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || csqrt || 0.00845814548098
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || csqrt || 0.00845814548098
Coq_Lists_SetoidList_equivlistA || lex || 0.00839546876566
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || im || 0.00839285291172
Coq_Arith_Wf_nat_gtof || measures || 0.00826075282078
Coq_Arith_Wf_nat_ltof || measures || 0.00826075282078
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || code_integer_of_num || 0.00823309579068
Coq_Numbers_Natural_Binary_NBinary_N_succ || one_one || 0.00817014401092
Coq_Structures_OrdersEx_N_as_OT_succ || one_one || 0.00817014401092
Coq_Structures_OrdersEx_N_as_DT_succ || one_one || 0.00817014401092
Coq_Numbers_Rational_BigQ_BigQ_BigQ_lt || pred_nat || 0.00813925473762
Coq_NArith_BinNat_N_succ || one_one || 0.00813505517349
Coq_ZArith_BinInt_Z_sub || pow || 0.0080832873541
Coq_PArith_BinPos_Pos_to_nat || pred_numeral || 0.00795941598317
Coq_Numbers_Integer_Binary_ZBinary_Z_add || pow || 0.00793138568234
Coq_Structures_OrdersEx_Z_as_OT_add || pow || 0.00793138568234
Coq_Structures_OrdersEx_Z_as_DT_add || pow || 0.00793138568234
Coq_Reals_Rfunctions_powerRZ || binomial || 0.00789960688525
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || sqr || 0.00788490552264
Coq_Structures_OrdersEx_Z_as_OT_opp || sqr || 0.00788490552264
Coq_Structures_OrdersEx_Z_as_DT_opp || sqr || 0.00788490552264
Coq_Numbers_Integer_Binary_ZBinary_Z_abs || bitM || 0.00786693301821
Coq_Structures_OrdersEx_Z_as_OT_abs || bitM || 0.00786693301821
Coq_Structures_OrdersEx_Z_as_DT_abs || bitM || 0.00786693301821
Coq_Lists_SetoidPermutation_PermutationA_0 || min_ext || 0.00785927635531
Coq_Lists_SetoidList_eqlistA_0 || min_ext || 0.00785927635531
Coq_ZArith_BinInt_Z_sgn || bitM || 0.00783203683584
Coq_PArith_BinPos_Pos_to_nat || nat_of_num || 0.0078203848126
Coq_ZArith_Zdiv_eqm || int_ge_less_than2 || 0.00777739857031
Coq_ZArith_Zdiv_eqm || int_ge_less_than || 0.00777739857031
Coq_ZArith_BinInt_Z_abs || sqr || 0.00761233494421
Coq_Lists_List_rev || rev || 0.00760342911803
Coq_Classes_RelationClasses_StrictOrder_0 || lattic35693393ce_set || 0.00757421008932
__constr_Coq_Init_Datatypes_nat_0_2 || abs_Nat || 0.00751372931133
Coq_PArith_POrderedType_Positive_as_DT_pow || pow || 0.0074899336364
Coq_PArith_POrderedType_Positive_as_OT_pow || pow || 0.0074899336364
Coq_Structures_OrdersEx_Positive_as_DT_pow || pow || 0.0074899336364
Coq_Structures_OrdersEx_Positive_as_OT_pow || pow || 0.0074899336364
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || bitM || 0.00745516177136
Coq_Structures_OrdersEx_Z_as_OT_opp || bitM || 0.00745516177136
Coq_Structures_OrdersEx_Z_as_DT_opp || bitM || 0.00745516177136
Coq_Structures_OrdersEx_Nat_as_DT_div || binomial || 0.00739272305557
Coq_Structures_OrdersEx_Nat_as_OT_div || binomial || 0.00739272305557
Coq_Arith_PeanoNat_Nat_div || binomial || 0.00737605758718
Coq_Lists_SetoidList_equivlistA || min_ext || 0.00737481131244
Coq_Lists_List_Exists_0 || list_ex || 0.00733470806932
Coq_ZArith_BinInt_Z_opp || sqr || 0.00719059844087
__constr_Coq_Numbers_BinNums_N_0_2 || code_integer_of_num || 0.00717027330043
Coq_Arith_Wf_nat_inv_lt_rel || measure || 0.0071216578031
Coq_Reals_Rpow_def_pow || binomial || 0.00710458989506
Coq_Arith_PeanoNat_Nat_sqrt || cnj || 0.00708158557956
Coq_Structures_OrdersEx_Nat_as_DT_sqrt || cnj || 0.00708158557956
Coq_Structures_OrdersEx_Nat_as_OT_sqrt || cnj || 0.00708158557956
Coq_Classes_RelationClasses_Equivalence_0 || asym || 0.0070256342549
Coq_MSets_MSetPositive_PositiveSet_eq || bNF_Ca1495478003natLeq || 0.00701077402652
Coq_Arith_PeanoNat_Nat_sqrt || sqrt || 0.00700254032545
Coq_Structures_OrdersEx_Nat_as_DT_sqrt || sqrt || 0.00700254032545
Coq_Structures_OrdersEx_Nat_as_OT_sqrt || sqrt || 0.00700254032545
Coq_Arith_PeanoNat_Nat_pow || binomial || 0.00700029028556
Coq_Structures_OrdersEx_Nat_as_DT_pow || binomial || 0.00700029028556
Coq_Structures_OrdersEx_Nat_as_OT_pow || binomial || 0.00700029028556
Coq_ZArith_BinInt_Z_abs || bitM || 0.00698697976035
Coq_Arith_PeanoNat_Nat_sqrt_up || sqrt || 0.00697102062441
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || sqrt || 0.00697102062441
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || sqrt || 0.00697102062441
Coq_ZArith_BinInt_Z_add || pow || 0.00691121947537
Coq_ZArith_BinInt_Z_opp || bitM || 0.00685104832604
Coq_Init_Peano_lt || wf || 0.00678863474368
Coq_ZArith_BinInt_Z_lcm || upto || 0.00678083493566
Coq_Arith_Wf_nat_inv_lt_rel || id_on || 0.00674179056227
__constr_Coq_Numbers_BinNums_Z_0_2 || code_integer_of_num || 0.00672372063776
Coq_Classes_RelationClasses_Equivalence_0 || irrefl || 0.00654691151593
Coq_Lists_SetoidPermutation_PermutationA_0 || max_ext || 0.00649486536337
Coq_Lists_SetoidList_eqlistA_0 || max_ext || 0.00649486536337
__constr_Coq_Numbers_BinNums_positive_0_1 || set || 0.00645987061699
Coq_ZArith_BinInt_Z_sqrt_up || int_ge_less_than2 || 0.00644489140455
Coq_ZArith_BinInt_Z_sqrt_up || int_ge_less_than || 0.00644489140455
Coq_Lists_List_firstn || takeWhile || 0.00642204307757
Coq_Classes_RelationClasses_StrictOrder_0 || bNF_Wellorder_wo_rel || 0.00635001964787
Coq_Arith_PeanoNat_Nat_mul || binomial || 0.00633891896507
Coq_Structures_OrdersEx_Nat_as_DT_mul || binomial || 0.00633891896507
Coq_Structures_OrdersEx_Nat_as_OT_mul || binomial || 0.00633891896507
Coq_FSets_FMapPositive_append || pow || 0.00632463253037
Coq_Lists_List_NoDup_0 || null || 0.00628790568946
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || pred_nat || 0.00617015297401
Coq_Lists_SetoidList_equivlistA || max_ext || 0.00615705531382
Coq_ZArith_BinInt_Z_log2_up || int_ge_less_than2 || 0.00612398910464
Coq_ZArith_BinInt_Z_sqrt || int_ge_less_than2 || 0.00612398910464
Coq_ZArith_BinInt_Z_log2_up || int_ge_less_than || 0.00612398910464
Coq_ZArith_BinInt_Z_sqrt || int_ge_less_than || 0.00612398910464
Coq_PArith_BinPos_Pos_succ || bit1 || 0.00605276075359
Coq_ZArith_BinInt_Z_gcd || upto || 0.00603252963535
Coq_PArith_BinPos_Pos_to_nat || zero_zero || 0.00600617994646
Coq_PArith_BinPos_Pos_pow || pow || 0.00599837872846
Coq_Sets_Multiset_multiset_0 || set || 0.00593296479557
Coq_Numbers_Integer_Binary_ZBinary_Z_lcm || upto || 0.00591997024278
Coq_Structures_OrdersEx_Z_as_OT_lcm || upto || 0.00591997024278
Coq_Structures_OrdersEx_Z_as_DT_lcm || upto || 0.00591997024278
Coq_ZArith_BinInt_Z_lt || wf || 0.00585368949268
Coq_Arith_PeanoNat_Nat_sqrt || dup || 0.00583113907601
Coq_Structures_OrdersEx_Nat_as_DT_sqrt || dup || 0.00583113907601
Coq_Structures_OrdersEx_Nat_as_OT_sqrt || dup || 0.00583113907601
Coq_Arith_PeanoNat_Nat_sqrt_up || dup || 0.00579338487715
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || dup || 0.00579338487715
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || dup || 0.00579338487715
Coq_ZArith_BinInt_Z_pow_pos || pow || 0.00574946553682
__constr_Coq_Numbers_BinNums_N_0_1 || code_integer || 0.00567183671327
Coq_Arith_Wf_nat_inv_lt_rel || measures || 0.00565705638931
Coq_Classes_SetoidTactics_DefaultRelation_0 || transitive_acyclic || 0.00556679892582
Coq_PArith_POrderedType_Positive_as_DT_succ || bit1 || 0.00555549572767
Coq_PArith_POrderedType_Positive_as_OT_succ || bit1 || 0.00555549572767
Coq_Structures_OrdersEx_Positive_as_DT_succ || bit1 || 0.00555549572767
Coq_Structures_OrdersEx_Positive_as_OT_succ || bit1 || 0.00555549572767
Coq_Lists_List_firstn || take || 0.00554002290846
Coq_MSets_MSetPositive_PositiveSet_eq || pred_nat || 0.00553834574899
Coq_Numbers_Integer_Binary_ZBinary_Z_gcd || upto || 0.00551922560441
Coq_Structures_OrdersEx_Z_as_OT_gcd || upto || 0.00551922560441
Coq_Structures_OrdersEx_Z_as_DT_gcd || upto || 0.00551922560441
__constr_Coq_Numbers_BinNums_Z_0_1 || code_integer || 0.00549810754123
Coq_ZArith_BinInt_Z_log2 || int_ge_less_than2 || 0.00543696236563
Coq_ZArith_BinInt_Z_log2 || int_ge_less_than || 0.00543696236563
Coq_Sets_Integers_Integers_0 || code_pcr_integer code_cr_integer || 0.00543385286693
Coq_PArith_BinPos_Pos_succ || bit0 || 0.00541688834418
Coq_ZArith_BinInt_Z_of_N || int_ge_less_than2 || 0.00538416443306
Coq_ZArith_BinInt_Z_of_N || int_ge_less_than || 0.00538416443306
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || one_one || 0.00537609042494
Coq_Numbers_Rational_BigQ_BigQ_BigQ_eq || less_than || 0.00533393624049
__constr_Coq_Numbers_BinNums_positive_0_2 || set || 0.00532973238598
Coq_Init_Datatypes_app || set_Cons || 0.00531652195468
Coq_Classes_RelationClasses_Irreflexive || abel_semigroup || 0.00528421661648
Coq_Numbers_Cyclic_Int31_Int31_phi || int_ge_less_than2 || 0.00525857416234
Coq_Numbers_Cyclic_Int31_Int31_phi || int_ge_less_than || 0.00525857416234
Coq_Numbers_Natural_BigN_BigN_BigN_le || pred_nat || 0.00519626564142
Coq_Relations_Relation_Operators_clos_trans_0 || transitive_trancl || 0.00516133583692
Coq_PArith_POrderedType_Positive_as_DT_succ || bit0 || 0.00509916326598
Coq_PArith_POrderedType_Positive_as_OT_succ || bit0 || 0.00509916326598
Coq_Structures_OrdersEx_Positive_as_DT_succ || bit0 || 0.00509916326598
Coq_Structures_OrdersEx_Positive_as_OT_succ || bit0 || 0.00509916326598
__constr_Coq_Numbers_BinNums_Z_0_2 || pos || 0.00506935590977
Coq_Arith_PeanoNat_Nat_sqrt || arcsin || 0.00501104421763
Coq_Structures_OrdersEx_Nat_as_DT_sqrt || arcsin || 0.00501104421763
Coq_Structures_OrdersEx_Nat_as_OT_sqrt || arcsin || 0.00501104421763
Coq_Arith_PeanoNat_Nat_sqrt_up || arcsin || 0.00498393057367
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || arcsin || 0.00498393057367
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || arcsin || 0.00498393057367
Coq_PArith_POrderedType_Positive_as_DT_lt || wf || 0.00477842465696
Coq_PArith_POrderedType_Positive_as_OT_lt || wf || 0.00477842465696
Coq_Structures_OrdersEx_Positive_as_DT_lt || wf || 0.00477842465696
Coq_Structures_OrdersEx_Positive_as_OT_lt || wf || 0.00477842465696
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || pred_nat || 0.00476007176862
Coq_Arith_PeanoNat_Nat_sqrt || code_dup || 0.00473963277261
Coq_Structures_OrdersEx_Nat_as_DT_sqrt || code_dup || 0.00473963277261
Coq_Structures_OrdersEx_Nat_as_OT_sqrt || code_dup || 0.00473963277261
Coq_Arith_PeanoNat_Nat_sqrt_up || code_dup || 0.0047105584841
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || code_dup || 0.0047105584841
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || code_dup || 0.0047105584841
Coq_Sets_Integers_nat_po || code_integer || 0.00469333910667
Coq_PArith_BinPos_Pos_lt || wf || 0.0046691992678
Coq_Arith_PeanoNat_Nat_sqrt || arctan || 0.00462668942894
Coq_Structures_OrdersEx_Nat_as_DT_sqrt || arctan || 0.00462668942894
Coq_Structures_OrdersEx_Nat_as_OT_sqrt || arctan || 0.00462668942894
Coq_Arith_PeanoNat_Nat_sqrt_up || arctan || 0.00460353783729
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || arctan || 0.00460353783729
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || arctan || 0.00460353783729
Coq_Relations_Relation_Operators_symprod_0 || bNF_Cardinal_cprod || 0.00457914073006
Coq_ZArith_BinInt_Z_abs || int_ge_less_than2 || 0.00457496751513
Coq_ZArith_BinInt_Z_abs || int_ge_less_than || 0.00457496751513
Coq_Numbers_Natural_Binary_NBinary_N_le || distinct || 0.00455579963723
Coq_Structures_OrdersEx_N_as_OT_le || distinct || 0.00455579963723
Coq_Structures_OrdersEx_N_as_DT_le || distinct || 0.00455579963723
Coq_PArith_BinPos_Pos_to_nat || code_integer_of_num || 0.00454933661
Coq_NArith_BinNat_N_le || distinct || 0.00454746153932
Coq_PArith_POrderedType_Positive_as_DT_succ || int_ge_less_than2 || 0.00446933238225
Coq_PArith_POrderedType_Positive_as_OT_succ || int_ge_less_than2 || 0.00446933238225
Coq_Structures_OrdersEx_Positive_as_DT_succ || int_ge_less_than2 || 0.00446933238225
Coq_Structures_OrdersEx_Positive_as_OT_succ || int_ge_less_than2 || 0.00446933238225
Coq_PArith_POrderedType_Positive_as_DT_succ || int_ge_less_than || 0.00446933238225
Coq_PArith_POrderedType_Positive_as_OT_succ || int_ge_less_than || 0.00446933238225
Coq_Structures_OrdersEx_Positive_as_DT_succ || int_ge_less_than || 0.00446933238225
Coq_Structures_OrdersEx_Positive_as_OT_succ || int_ge_less_than || 0.00446933238225
Coq_PArith_POrderedType_Positive_as_DT_mul || pow || 0.00445470151205
Coq_PArith_POrderedType_Positive_as_OT_mul || pow || 0.00445470151205
Coq_Structures_OrdersEx_Positive_as_DT_mul || pow || 0.00445470151205
Coq_Structures_OrdersEx_Positive_as_OT_mul || pow || 0.00445470151205
Coq_Classes_RelationClasses_RewriteRelation_0 || transitive_acyclic || 0.00443255713762
Coq_Numbers_Rational_BigQ_BigQ_BigQ_eq || bNF_Ca1495478003natLeq || 0.00435968738828
Coq_PArith_POrderedType_Positive_as_DT_max || pow || 0.0043553424099
Coq_PArith_POrderedType_Positive_as_OT_max || pow || 0.0043553424099
Coq_Structures_OrdersEx_Positive_as_DT_max || pow || 0.0043553424099
Coq_Structures_OrdersEx_Positive_as_OT_max || pow || 0.0043553424099
Coq_Arith_Wf_nat_gtof || transitive_trancl || 0.00434531462879
Coq_Arith_Wf_nat_ltof || transitive_trancl || 0.00434531462879
Coq_PArith_BinPos_Pos_mul || pow || 0.00431967618161
Coq_Numbers_Natural_Binary_NBinary_N_le || linorder_sorted || 0.00428799354093
Coq_Structures_OrdersEx_N_as_OT_le || linorder_sorted || 0.00428799354093
Coq_Structures_OrdersEx_N_as_DT_le || linorder_sorted || 0.00428799354093
Coq_PArith_BinPos_Pos_max || pow || 0.0042859962756
Coq_NArith_BinNat_N_le || linorder_sorted || 0.00428087932769
Coq_Classes_RelationClasses_Transitive || abel_s1917375468axioms || 0.00426963855492
Coq_PArith_BinPos_Pos_succ || int_ge_less_than2 || 0.0042214815642
Coq_PArith_BinPos_Pos_succ || int_ge_less_than || 0.0042214815642
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || int_ge_less_than2 || 0.0041821619914
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || int_ge_less_than2 || 0.0041821619914
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || int_ge_less_than2 || 0.0041821619914
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || int_ge_less_than || 0.0041821619914
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || int_ge_less_than || 0.0041821619914
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || int_ge_less_than || 0.0041821619914
__constr_Coq_Numbers_BinNums_Z_0_2 || code_Pos || 0.00411941215514
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || int_ge_less_than2 || 0.00411563527324
Coq_Structures_OrdersEx_Z_as_OT_sqrt || int_ge_less_than2 || 0.00411563527324
Coq_Structures_OrdersEx_Z_as_DT_sqrt || int_ge_less_than2 || 0.00411563527324
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || int_ge_less_than || 0.00411563527324
Coq_Structures_OrdersEx_Z_as_OT_sqrt || int_ge_less_than || 0.00411563527324
Coq_Structures_OrdersEx_Z_as_DT_sqrt || int_ge_less_than || 0.00411563527324
Coq_Classes_RelationClasses_Reflexive || reflp || 0.00405521483358
Coq_Lists_List_NoDup_0 || distinct || 0.00403560946236
Coq_Arith_Wf_nat_gtof || transitive_rtrancl || 0.00401982118038
Coq_Arith_Wf_nat_ltof || transitive_rtrancl || 0.00401982118038
Coq_Numbers_Integer_Binary_ZBinary_Z_log2_up || int_ge_less_than2 || 0.0039995252371
Coq_Structures_OrdersEx_Z_as_OT_log2_up || int_ge_less_than2 || 0.0039995252371
Coq_Structures_OrdersEx_Z_as_DT_log2_up || int_ge_less_than2 || 0.0039995252371
Coq_Numbers_Integer_Binary_ZBinary_Z_log2_up || int_ge_less_than || 0.0039995252371
Coq_Structures_OrdersEx_Z_as_OT_log2_up || int_ge_less_than || 0.0039995252371
Coq_Structures_OrdersEx_Z_as_DT_log2_up || int_ge_less_than || 0.0039995252371
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || code_pcr_natural code_cr_natural || 0.00399552792645
Coq_ZArith_Zlogarithm_log_sup || finite_psubset || 0.0039625452424
Coq_Classes_RelationClasses_Symmetric || equiv_part_equivp || 0.00395043287086
Coq_Classes_RelationClasses_Transitive || equiv_part_equivp || 0.00392250604057
Coq_Setoids_Setoid_Setoid_Theory || wf || 0.00391935188922
__constr_Coq_Numbers_BinNums_Z_0_1 || complex || 0.00387618401397
Coq_Classes_RelationClasses_Reflexive || equiv_part_equivp || 0.00386347991669
__constr_Coq_Numbers_BinNums_N_0_2 || re || 0.00379569957489
__constr_Coq_Numbers_BinNums_Z_0_2 || re || 0.00366052289254
__constr_Coq_Numbers_BinNums_N_0_1 || real || 0.00360877724344
Coq_Classes_RelationClasses_Symmetric || reflp || 0.00358786817201
Coq_Numbers_Integer_Binary_ZBinary_Z_log2 || int_ge_less_than2 || 0.00357633272618
Coq_Structures_OrdersEx_Z_as_OT_log2 || int_ge_less_than2 || 0.00357633272618
Coq_Structures_OrdersEx_Z_as_DT_log2 || int_ge_less_than2 || 0.00357633272618
Coq_Numbers_Integer_Binary_ZBinary_Z_log2 || int_ge_less_than || 0.00357633272618
Coq_Structures_OrdersEx_Z_as_OT_log2 || int_ge_less_than || 0.00357633272618
Coq_Structures_OrdersEx_Z_as_DT_log2 || int_ge_less_than || 0.00357633272618
Coq_Classes_RelationClasses_Transitive || reflp || 0.00356532771524
__constr_Coq_Numbers_BinNums_Z_0_1 || real || 0.00350931031162
Coq_Numbers_Integer_Binary_ZBinary_Z_abs || int_ge_less_than2 || 0.00349246466677
Coq_Structures_OrdersEx_Z_as_OT_abs || int_ge_less_than2 || 0.00349246466677
Coq_Structures_OrdersEx_Z_as_DT_abs || int_ge_less_than2 || 0.00349246466677
Coq_Numbers_Integer_Binary_ZBinary_Z_abs || int_ge_less_than || 0.00349246466677
Coq_Structures_OrdersEx_Z_as_OT_abs || int_ge_less_than || 0.00349246466677
Coq_Structures_OrdersEx_Z_as_DT_abs || int_ge_less_than || 0.00349246466677
Coq_Classes_RelationClasses_PER_0 || transitive_acyclic || 0.00346502786111
Coq_Arith_Wf_nat_inv_lt_rel || transitive_trancl || 0.00344084375812
Coq_Classes_RelationClasses_Irreflexive || antisym || 0.0033789028217
Coq_PArith_BinPos_Pos_to_nat || one_one || 0.00328684679658
Coq_Arith_Wf_nat_inv_lt_rel || transitive_rtrancl || 0.00323010524639
Coq_PArith_BinPos_Pos_to_nat || re || 0.00320596921498
Coq_QArith_QArith_base_Q_0 || code_natural || 0.00316458593723
Coq_Setoids_Setoid_Setoid_Theory || abel_semigroup || 0.00315342626941
Coq_Lists_List_In || listMem || 0.00309298530142
Coq_Numbers_Rational_BigQ_BigQ_BigQ_eq || pred_nat || 0.00305970215259
Coq_ZArith_Int_Z_as_Int_i2z || one_one || 0.00304378695571
Coq_Relations_Relation_Operators_le_AsB_0 || bNF_Cardinal_cprod || 0.00300557768579
Coq_Classes_RelationClasses_Symmetric || semigroup || 0.0030046218708
Coq_ZArith_BinInt_Z_sqrt_up || finite_psubset || 0.00295767237532
Coq_Classes_RelationClasses_Symmetric || abel_s1917375468axioms || 0.00292865156378
__constr_Coq_Init_Datatypes_nat_0_2 || int_ge_less_than2 || 0.00290742098567
__constr_Coq_Init_Datatypes_nat_0_2 || int_ge_less_than || 0.00290742098567
Coq_Sets_Ensembles_Included || finite_psubset || 0.0028857932595
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || code_integer || 0.00284627743665
Coq_ZArith_Int_Z_as_Int__1 || code_integer || 0.00284515183215
Coq_Arith_PeanoNat_Nat_gcd || upto || 0.00282977121976
Coq_Structures_OrdersEx_Nat_as_DT_gcd || upto || 0.00282977121976
Coq_Structures_OrdersEx_Nat_as_OT_gcd || upto || 0.00282977121976
Coq_ZArith_BinInt_Z_log2_up || finite_psubset || 0.00282072439396
Coq_Init_Datatypes_xorb || pow || 0.00281490858193
Coq_Init_Datatypes_orb || pow || 0.00278399846393
Coq_Numbers_Cyclic_DoubleCyclic_DoubleType_base || int_ge_less_than2 || 0.00278001641797
Coq_Numbers_Cyclic_DoubleCyclic_DoubleType_base || int_ge_less_than || 0.00278001641797
Coq_Numbers_Integer_BigZ_BigZ_BigZ_opp || inc || 0.00273667670086
Coq_Numbers_Natural_Binary_NBinary_N_succ || suc_Rep || 0.00271303080382
Coq_Structures_OrdersEx_N_as_OT_succ || suc_Rep || 0.00271303080382
Coq_Structures_OrdersEx_N_as_DT_succ || suc_Rep || 0.00271303080382
Coq_Init_Peano_lt || real_V1127708846m_norm || 0.00271290218365
Coq_NArith_BinNat_N_succ || suc_Rep || 0.00269162154798
Coq_Relations_Relation_Operators_symprod_0 || product || 0.00268965568835
Coq_Init_Datatypes_andb || pow || 0.00261081965816
Coq_Classes_RelationClasses_Equivalence_0 || reflp || 0.00259649057581
__constr_Coq_Numbers_BinNums_Z_0_3 || pos || 0.00259348431985
Coq_Classes_RelationClasses_Reflexive || abel_s1917375468axioms || 0.00259234810435
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || one_one || 0.00249304079189
Coq_ZArith_BinInt_Z_max || remdups || 0.00242090990757
Coq_NArith_Ndist_ni_min || root || 0.00236888149025
Coq_Classes_RelationClasses_Transitive || semigroup || 0.00231862663008
Coq_Classes_RelationClasses_Reflexive || semigroup || 0.00231117223682
Coq_NArith_BinNat_N_double || sqr || 0.00231108804029
Coq_Arith_Factorial_fact || int_ge_less_than2 || 0.00229197329418
Coq_Arith_Factorial_fact || int_ge_less_than || 0.00229197329418
Coq_NArith_BinNat_N_div2 || sqr || 0.00228542686416
Coq_PArith_BinPos_Pos_to_nat || im || 0.0022635550374
Coq_Init_Datatypes_nat_0 || int || 0.00223588002423
Coq_Numbers_Natural_Binary_NBinary_N_div2 || sqr || 0.00218646178649
Coq_Structures_OrdersEx_N_as_OT_div2 || sqr || 0.00218646178649
Coq_Structures_OrdersEx_N_as_DT_div2 || sqr || 0.00218646178649
Coq_PArith_BinPos_Pos_shiftl_nat || pow || 0.00218483289373
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || code_nat_of_natural || 0.00213643599531
Coq_Numbers_Natural_Binary_NBinary_N_double || sqr || 0.00212614304676
Coq_Structures_OrdersEx_N_as_OT_double || sqr || 0.00212614304676
Coq_Structures_OrdersEx_N_as_DT_double || sqr || 0.00212614304676
Coq_Arith_PeanoNat_Nat_sqrt_up || int_ge_less_than2 || 0.00212002125397
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || int_ge_less_than2 || 0.00212002125397
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || int_ge_less_than2 || 0.00212002125397
Coq_Arith_PeanoNat_Nat_sqrt_up || int_ge_less_than || 0.00212002125397
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || int_ge_less_than || 0.00212002125397
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || int_ge_less_than || 0.00212002125397
Coq_ZArith_Int_Z_as_Int__1 || int || 0.002108011941
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || int || 0.0021060904518
Coq_Arith_PeanoNat_Nat_max || remdups || 0.00209042851015
Coq_Arith_PeanoNat_Nat_max || pow || 0.00204813341847
__constr_Coq_Init_Datatypes_nat_0_2 || pos || 0.00203558331954
Coq_Sets_Ensembles_Ensemble || set || 0.00202752309341
Coq_Arith_PeanoNat_Nat_log2_up || int_ge_less_than2 || 0.00202725893364
Coq_Structures_OrdersEx_Nat_as_DT_log2_up || int_ge_less_than2 || 0.00202725893364
Coq_Structures_OrdersEx_Nat_as_OT_log2_up || int_ge_less_than2 || 0.00202725893364
Coq_Arith_PeanoNat_Nat_log2_up || int_ge_less_than || 0.00202725893364
Coq_Structures_OrdersEx_Nat_as_DT_log2_up || int_ge_less_than || 0.00202725893364
Coq_Structures_OrdersEx_Nat_as_OT_log2_up || int_ge_less_than || 0.00202725893364
__constr_Coq_Numbers_BinNums_Z_0_3 || code_Pos || 0.00184910888048
Coq_ZArith_BinInt_Z_max || measure || 0.00183955514508
Coq_Arith_PeanoNat_Nat_log2 || int_ge_less_than2 || 0.00180586977567
Coq_Structures_OrdersEx_Nat_as_DT_log2 || int_ge_less_than2 || 0.00180586977567
Coq_Structures_OrdersEx_Nat_as_OT_log2 || int_ge_less_than2 || 0.00180586977567
Coq_Arith_PeanoNat_Nat_log2 || int_ge_less_than || 0.00180586977567
Coq_Structures_OrdersEx_Nat_as_DT_log2 || int_ge_less_than || 0.00180586977567
Coq_Structures_OrdersEx_Nat_as_OT_log2 || int_ge_less_than || 0.00180586977567
__constr_Coq_Init_Datatypes_bool_0_2 || code_integer_of_num || 0.00179745794505
__constr_Coq_Numbers_BinNums_N_0_2 || inc || 0.00178458089619
Coq_Numbers_Integer_BigZ_BigZ_BigZ_opp || code_Suc || 0.00175579687929
__constr_Coq_Init_Datatypes_bool_0_1 || code_integer_of_num || 0.00172911743849
Coq_Classes_RelationClasses_Equivalence_0 || equiv_equivp || 0.00170051336117
Coq_Init_Wf_well_founded || distinct || 0.00167146010818
__constr_Coq_Init_Datatypes_nat_0_2 || code_Pos || 0.00166608381456
Coq_Sets_Ensembles_Strict_Included || finite_psubset || 0.00165463287195
Coq_Arith_Factorial_fact || bit1 || 0.00165439672891
Coq_ZArith_BinInt_Z_max || measures || 0.00163153327594
Coq_Classes_RelationClasses_Symmetric || distinct || 0.00162169385719
Coq_Numbers_Integer_BigZ_BigZ_BigZ_div2 || inc || 0.00161719322581
Coq_PArith_BinPos_Pos_to_nat || int_ge_less_than2 || 0.00160496928587
Coq_PArith_BinPos_Pos_to_nat || int_ge_less_than || 0.00160496928587
__constr_Coq_Numbers_BinNums_Z_0_2 || finite_psubset || 0.00160440163644
Coq_Classes_RelationClasses_RewriteRelation_0 || trans || 0.00159859398539
Coq_Numbers_Natural_BigN_BigN_BigN_one || code_integer || 0.00159590989679
Coq_Structures_OrdersEx_Nat_as_DT_sub || pow || 0.00158591396031
Coq_Structures_OrdersEx_Nat_as_OT_sub || pow || 0.00158591396031
Coq_Arith_PeanoNat_Nat_sub || pow || 0.0015844692118
Coq_ZArith_BinInt_Z_sqrt || suc || 0.00157907975453
__constr_Coq_Numbers_BinNums_positive_0_2 || sqr || 0.00157538107644
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || code_integer || 0.00156706025988
__constr_Coq_NArith_Ndist_natinf_0_2 || zero_zero || 0.00156082865901
Coq_ZArith_Zcomplements_floor || set || 0.00152357551914
Coq_Classes_SetoidTactics_DefaultRelation_0 || abel_s1917375468axioms || 0.00151135331682
Coq_Classes_RelationClasses_Reflexive || distinct || 0.00150376655847
Coq_Sets_Relations_2_Rstar_0 || id_on || 0.00149957945793
Coq_Structures_OrdersEx_Nat_as_DT_pred || sqr || 0.00148162490771
Coq_Structures_OrdersEx_Nat_as_OT_pred || sqr || 0.00148162490771
Coq_Classes_RelationClasses_Transitive || distinct || 0.00147979893689
Coq_ZArith_BinInt_Z_div2 || suc || 0.0014598570656
Coq_Arith_PeanoNat_Nat_pred || sqr || 0.00144136086195
Coq_Structures_OrdersEx_Nat_as_DT_max || remdups || 0.00140975709575
Coq_Structures_OrdersEx_Nat_as_OT_max || remdups || 0.00140975709575
__constr_Coq_Numbers_BinNums_N_0_1 || complex || 0.0014088226589
Coq_Arith_Between_in_int || semilattice_neutr || 0.0013987091952
Coq_ZArith_Zlogarithm_log_inf || set || 0.00136052304918
Coq_Arith_PeanoNat_Nat_lxor || pow || 0.00134703655381
Coq_Structures_OrdersEx_Nat_as_DT_lxor || pow || 0.00134703655381
Coq_Structures_OrdersEx_Nat_as_OT_lxor || pow || 0.00134703655381
Coq_Arith_Factorial_fact || bit0 || 0.00134642551526
Coq_Arith_PeanoNat_Nat_ldiff || pow || 0.00133019141062
Coq_Structures_OrdersEx_Nat_as_DT_ldiff || pow || 0.00133019141062
Coq_Structures_OrdersEx_Nat_as_OT_ldiff || pow || 0.00133019141062
Coq_Classes_RelationClasses_Symmetric || sym || 0.00132561745234
Coq_Arith_PeanoNat_Nat_shiftr || pow || 0.00131457450989
Coq_Arith_PeanoNat_Nat_shiftl || pow || 0.00131457450989
Coq_Structures_OrdersEx_Nat_as_DT_shiftr || pow || 0.00131457450989
Coq_Structures_OrdersEx_Nat_as_DT_shiftl || pow || 0.00131457450989
Coq_Structures_OrdersEx_Nat_as_OT_shiftr || pow || 0.00131457450989
Coq_Structures_OrdersEx_Nat_as_OT_shiftl || pow || 0.00131457450989
Coq_PArith_BinPos_Pos_pred_N || pos || 0.00130599227495
Coq_Numbers_Rational_BigQ_BigQ_BigN_BigZ_Z_of_N || pos || 0.00128101261125
Coq_Numbers_Natural_BigN_BigN_BigN_one || int || 0.0012765219061
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || int || 0.00126207591608
Coq_Classes_RelationClasses_Equivalence_0 || distinct || 0.00125775582431
Coq_ZArith_BinInt_Z_log2 || suc || 0.0012334190978
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sgn || inc || 0.00123283194781
Coq_Numbers_Integer_BigZ_BigZ_BigZ_abs || inc || 0.00122763648059
Coq_ZArith_BinInt_Z_sqrt || set || 0.00122202202905
Coq_Arith_PeanoNat_Nat_lor || pow || 0.00122019472173
Coq_Structures_OrdersEx_Nat_as_DT_lor || pow || 0.00122019472173
Coq_Structures_OrdersEx_Nat_as_OT_lor || pow || 0.00122019472173
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt || inc || 0.0012142561259
Coq_Numbers_Natural_BigN_BigN_BigN_div2 || inc || 0.00118534768764
Coq_ZArith_BinInt_Z_log2 || set || 0.00116271427654
Coq_Classes_SetoidTactics_DefaultRelation_0 || antisym || 0.0011372046492
Coq_Sets_Relations_2_Rstar_0 || measure || 0.00113707907586
Coq_Classes_RelationClasses_RewriteRelation_0 || abel_s1917375468axioms || 0.00112757890198
Coq_Arith_PeanoNat_Nat_gcd || pow || 0.00110731693702
Coq_Structures_OrdersEx_Nat_as_DT_gcd || pow || 0.00110731693702
Coq_Structures_OrdersEx_Nat_as_OT_gcd || pow || 0.00110731693702
Coq_Numbers_Integer_BigZ_BigZ_BigZ_log2 || inc || 0.00109633889127
Coq_Arith_PeanoNat_Nat_sqrt || sqr || 0.00108675248718
Coq_Structures_OrdersEx_Nat_as_DT_sqrt || sqr || 0.00108675248718
Coq_Structures_OrdersEx_Nat_as_OT_sqrt || sqr || 0.00108675248718
Coq_Structures_OrdersEx_Nat_as_DT_max || pow || 0.00108084171291
Coq_Structures_OrdersEx_Nat_as_OT_max || pow || 0.00108084171291
Coq_Arith_PeanoNat_Nat_sqrt_up || sqr || 0.00107962624537
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || sqr || 0.00107962624537
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || sqr || 0.00107962624537
Coq_NArith_BinNat_N_to_nat || inc || 0.00106174064182
Coq_NArith_BinNat_N_of_nat || bitM || 0.00105987445564
Coq_Arith_PeanoNat_Nat_double || sqr || 0.00105902324379
Coq_NArith_BinNat_N_of_nat || inc || 0.00105039098932
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || real_V1127708846m_norm || 0.00104758106453
Coq_Structures_OrdersEx_Z_as_OT_lt || real_V1127708846m_norm || 0.00104758106453
Coq_Structures_OrdersEx_Z_as_DT_lt || real_V1127708846m_norm || 0.00104758106453
Coq_Classes_SetoidTactics_DefaultRelation_0 || semigroup || 0.00103439662711
Coq_Numbers_Integer_Binary_ZBinary_Z_max || remdups || 0.000999344735678
Coq_Structures_OrdersEx_Z_as_OT_max || remdups || 0.000999344735678
Coq_Structures_OrdersEx_Z_as_DT_max || remdups || 0.000999344735678
Coq_ZArith_BinInt_Z_lt || real_V1127708846m_norm || 0.000978311590566
Coq_Numbers_Integer_BigZ_BigZ_BigZ_norm_pos || cnj || 0.000977904165573
Coq_Classes_SetoidTactics_DefaultRelation_0 || trans || 0.000973727946789
Coq_Arith_PeanoNat_Nat_sqrt || bitM || 0.000971621689017
Coq_Structures_OrdersEx_Nat_as_DT_sqrt || bitM || 0.000971621689017
Coq_Structures_OrdersEx_Nat_as_OT_sqrt || bitM || 0.000971621689017
Coq_Arith_PeanoNat_Nat_sqrt_up || bitM || 0.000965898289687
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || bitM || 0.000965898289687
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || bitM || 0.000965898289687
Coq_Sets_Relations_2_Rstar_0 || measures || 0.00096001998503
__constr_Coq_Init_Datatypes_bool_0_2 || product_Unity || 0.000959901328505
Coq_Classes_RelationClasses_complement || transitive_trancl || 0.000946023798124
Coq_NArith_BinNat_N_shiftr_nat || pow || 0.000932999528641
Coq_Classes_RelationClasses_RewriteRelation_0 || antisym || 0.000918015463725
Coq_NArith_BinNat_N_to_nat || bitM || 0.000910213525047
Coq_Structures_OrdersEx_Nat_as_DT_pred || bitM || 0.000909316684406
Coq_Structures_OrdersEx_Nat_as_OT_pred || bitM || 0.000909316684406
Coq_Init_Nat_add || pow || 0.000906485805543
Coq_Arith_PeanoNat_Nat_pred || bitM || 0.000887655415355
Coq_Classes_RelationClasses_Equivalence_0 || sym || 0.00088706165216
Coq_Structures_OrdersEx_Nat_as_DT_add || pow || 0.000884630279671
Coq_Structures_OrdersEx_Nat_as_OT_add || pow || 0.000884630279671
Coq_Arith_PeanoNat_Nat_add || pow || 0.000881244802455
__constr_Coq_Init_Datatypes_bool_0_1 || product_Unity || 0.000880123426249
Coq_ZArith_BinInt_Z_succ || bit0 || 0.000872454334356
__constr_Coq_Numbers_BinNums_N_0_2 || im || 0.000864620142964
__constr_Coq_Numbers_BinNums_Z_0_2 || im || 0.000859940484248
Coq_Classes_RelationPairs_Measure_0 || left_unique || 0.000853500218743
Coq_NArith_BinNat_N_Odd || inc || 0.000850067601719
Coq_Init_Peano_le_0 || semilattice_axioms || 0.000845200730286
Coq_Classes_RelationPairs_Measure_0 || left_total || 0.000843557840771
Coq_Classes_RelationPairs_Measure_0 || right_unique || 0.000838897072164
Coq_Sets_Partial_Order_Strict_Rel_of || id_on || 0.000837761679662
Coq_Numbers_Natural_BigN_BigN_BigN_sqrt || inc || 0.000834535572179
Coq_Classes_RelationClasses_PER_0 || abel_s1917375468axioms || 0.000825222176885
Coq_Classes_RelationClasses_RewriteRelation_0 || semigroup || 0.000825222176885
Coq_NArith_BinNat_N_shiftl_nat || pow || 0.000823090525101
Coq_Sets_Relations_2_Rstar_0 || transitive_trancl || 0.0008209453178
Coq_Numbers_Natural_Binary_NBinary_N_Odd || inc || 0.000819822041539
Coq_Structures_OrdersEx_N_as_OT_Odd || inc || 0.000819822041539
Coq_Structures_OrdersEx_N_as_DT_Odd || inc || 0.000819822041539
Coq_Arith_PeanoNat_Nat_max || remdups_adj || 0.000813454270766
Coq_ZArith_BinInt_Z_succ || bit1 || 0.000796811988538
Coq_Classes_RelationPairs_Measure_0 || right_total || 0.000791640206949
Coq_Sets_Partial_Order_Rel_of || id_on || 0.000785745142429
Coq_ZArith_BinInt_Z_of_N || inc || 0.000775744481248
Coq_NArith_BinNat_N_Even || inc || 0.000774460649569
Coq_Classes_RelationPairs_Measure_0 || bi_total || 0.000773047379032
Coq_Sets_Relations_2_Rstar_0 || transitive_rtrancl || 0.000751943522491
Coq_Classes_RelationPairs_Measure_0 || bi_unique || 0.000749593563689
Coq_Numbers_Natural_Binary_NBinary_N_Even || inc || 0.000746903312113
Coq_Structures_OrdersEx_N_as_OT_Even || inc || 0.000746903312113
Coq_Structures_OrdersEx_N_as_DT_Even || inc || 0.000746903312113
Coq_Classes_RelationClasses_Reflexive || sym || 0.000745213764249
Coq_Classes_RelationClasses_PER_0 || antisym || 0.000741767594501
Coq_Numbers_Natural_BigN_BigN_BigN_log2 || inc || 0.000734472577873
Coq_Classes_RelationClasses_Transitive || sym || 0.000731618916132
Coq_ZArith_BinInt_Z_max || remdups_adj || 0.000728966340784
Coq_ZArith_BinInt_Z_sgn || suc || 0.000727043280652
Coq_Init_Peano_le_0 || abel_semigroup || 0.000724667298324
Coq_Sets_Partial_Order_Strict_Rel_of || measure || 0.00071460214871
Coq_PArith_BinPos_Pos_sqrt || inc || 0.000702618096941
Coq_Arith_PeanoNat_Nat_max || measure || 0.00069570925975
Coq_Classes_RelationClasses_PER_0 || trans || 0.000690386397693
Coq_NArith_BinNat_N_even || inc || 0.000689736688968
Coq_Numbers_Natural_Binary_NBinary_N_even || inc || 0.000665725519432
Coq_Structures_OrdersEx_N_as_OT_even || inc || 0.000665725519432
Coq_Structures_OrdersEx_N_as_DT_even || inc || 0.000665725519432
Coq_Classes_RelationClasses_RewriteRelation_0 || wf || 0.000662625125181
Coq_ZArith_BinInt_Z_of_N || bitM || 0.000662393768901
Coq_Init_Nat_max || remdups_adj || 0.00066226473155
Coq_PArith_BinPos_Pos_square || inc || 0.000659236482766
Coq_Init_Nat_max || remdups || 0.000656610914948
Coq_Numbers_Natural_Binary_NBinary_N_odd || inc || 0.000649614271823
Coq_Structures_OrdersEx_N_as_OT_odd || inc || 0.000649614271823
Coq_Structures_OrdersEx_N_as_DT_odd || inc || 0.000649614271823
Coq_Classes_RelationClasses_PER_0 || semigroup || 0.000646367082229
Coq_NArith_BinNat_N_odd || inc || 0.000619135734517
Coq_ZArith_BinInt_Z_abs_N || nat2 || 0.000615937305361
Coq_Arith_PeanoNat_Nat_max || measures || 0.000615233794415
Coq_Sets_Partial_Order_Rel_of || measure || 0.000607341153813
Coq_NArith_BinNat_N_succ_pos || bit0 || 0.00059558970951
__constr_Coq_Init_Datatypes_nat_0_2 || nil || 0.000586836261889
Coq_Init_Wf_well_founded || sym || 0.000585597118874
Coq_Sets_Partial_Order_Strict_Rel_of || measures || 0.000584786868105
Coq_Classes_RelationClasses_Asymmetric || semilattice_axioms || 0.000582216596303
Coq_NArith_BinNat_N_Odd || bit1 || 0.000576566300778
Coq_PArith_BinPos_Pos_to_nat || pos || 0.000575387488738
Coq_Numbers_Natural_Binary_NBinary_N_succ_pos || bit0 || 0.000572779800478
Coq_Structures_OrdersEx_N_as_OT_succ_pos || bit0 || 0.000572779800478
Coq_Structures_OrdersEx_N_as_DT_succ_pos || bit0 || 0.000572779800478
Coq_Numbers_Natural_BigN_BigN_BigN_of_pos || pos || 0.000571434549556
__constr_Coq_Numbers_BinNums_N_0_1 || int || 0.000568917586989
Coq_Numbers_Natural_Binary_NBinary_N_Odd || bit1 || 0.000556046643849
Coq_Structures_OrdersEx_N_as_OT_Odd || bit1 || 0.000556046643849
Coq_Structures_OrdersEx_N_as_DT_Odd || bit1 || 0.000556046643849
Coq_Arith_PeanoNat_Nat_sqrt_up || finite_psubset || 0.000548582859686
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || finite_psubset || 0.000548582859686
Coq_Structures_OrdersEx_Nat_as_OT_sqrt_up || finite_psubset || 0.000548582859686
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || nat2 || 0.000542988190143
Coq_NArith_BinNat_N_Even || bit1 || 0.000541199868904
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt_up || finite_psubset || 0.000529420605717
Coq_Structures_OrdersEx_Z_as_OT_sqrt_up || finite_psubset || 0.000529420605717
Coq_Structures_OrdersEx_Z_as_DT_sqrt_up || finite_psubset || 0.000529420605717
Coq_Arith_PeanoNat_Nat_log2_up || finite_psubset || 0.000525983799924
Coq_Structures_OrdersEx_Nat_as_DT_log2_up || finite_psubset || 0.000525983799924
Coq_Structures_OrdersEx_Nat_as_OT_log2_up || finite_psubset || 0.000525983799924
Coq_Numbers_Natural_Binary_NBinary_N_Even || bit1 || 0.000521938138188
Coq_Structures_OrdersEx_N_as_OT_Even || bit1 || 0.000521938138188
Coq_Structures_OrdersEx_N_as_DT_Even || bit1 || 0.000521938138188
Coq_Sets_Partial_Order_Rel_of || measures || 0.000515003447535
__constr_Coq_Init_Datatypes_nat_0_2 || suc_Rep || 0.000513673993836
Coq_Numbers_Integer_Binary_ZBinary_Z_log2_up || finite_psubset || 0.000507737559509
Coq_Structures_OrdersEx_Z_as_OT_log2_up || finite_psubset || 0.000507737559509
Coq_Structures_OrdersEx_Z_as_DT_log2_up || finite_psubset || 0.000507737559509
Coq_NArith_BinNat_N_even || bit1 || 0.00050444689185
Coq_Relations_Relation_Operators_le_AsB_0 || product || 0.000499106678832
__constr_Coq_Numbers_BinNums_Z_0_1 || product_unit || 0.000494974559941
Coq_Classes_RelationClasses_Symmetric || symp || 0.000492921546165
Coq_PArith_BinPos_Pos_to_nat || inc || 0.000491365243575
Coq_Numbers_Natural_Binary_NBinary_N_even || bit1 || 0.000487244409657
Coq_Structures_OrdersEx_N_as_OT_even || bit1 || 0.000487244409657
Coq_Structures_OrdersEx_N_as_DT_even || bit1 || 0.000487244409657
Coq_Classes_RelationClasses_PER_0 || wf || 0.000487071652478
Coq_PArith_BinPos_Pos_succ || inc || 0.000486829608693
__constr_Coq_Numbers_BinNums_N_0_2 || pos || 0.000484657508757
Coq_Numbers_Natural_Binary_NBinary_N_odd || bit1 || 0.000478700729353
Coq_Structures_OrdersEx_N_as_OT_odd || bit1 || 0.000478700729353
Coq_Structures_OrdersEx_N_as_DT_odd || bit1 || 0.000478700729353
Coq_PArith_BinPos_Pos_of_succ_nat || inc || 0.000478626410135
Coq_Classes_RelationClasses_Transitive || transp || 0.000478101131529
Coq_Classes_RelationClasses_Irreflexive || semilattice_axioms || 0.000472655338895
Coq_Numbers_Natural_BigN_BigN_BigN_double_size || cnj || 0.000469902707572
Coq_NArith_BinNat_N_odd || bit1 || 0.000466209267755
Coq_ZArith_BinInt_Z_of_N || nat2 || 0.000462871687075
Coq_Classes_RelationClasses_PreOrder_0 || abel_semigroup || 0.000462805654161
__constr_Coq_Numbers_BinNums_N_0_1 || product_unit || 0.000450018987909
Coq_Reals_Rbasic_fun_Rabs || code_Suc || 0.000447879900609
Coq_Reals_Raxioms_IZR || code_natural_of_nat || 0.000443882754245
Coq_Sets_Partial_Order_Strict_Rel_of || transitive_trancl || 0.000436611079132
Coq_PArith_POrderedType_Positive_as_DT_pred_N || nat2 || 0.000428149193555
Coq_PArith_POrderedType_Positive_as_OT_pred_N || nat2 || 0.000428149193555
Coq_Structures_OrdersEx_Positive_as_DT_pred_N || nat2 || 0.000428149193555
Coq_Structures_OrdersEx_Positive_as_OT_pred_N || nat2 || 0.000428149193555
Coq_Structures_OrdersEx_Nat_as_DT_max || remdups_adj || 0.000422973668166
Coq_Structures_OrdersEx_Nat_as_OT_max || remdups_adj || 0.000422973668166
Coq_Numbers_Natural_Binary_NBinary_N_lt || real_V1127708846m_norm || 0.000414784327934
Coq_Structures_OrdersEx_N_as_OT_lt || real_V1127708846m_norm || 0.000414784327934
Coq_Structures_OrdersEx_N_as_DT_lt || real_V1127708846m_norm || 0.000414784327934
Coq_Sets_Partial_Order_Rel_of || transitive_trancl || 0.000414503657596
Coq_NArith_BinNat_N_lt || real_V1127708846m_norm || 0.000413369481373
Coq_Sets_Partial_Order_Strict_Rel_of || transitive_rtrancl || 0.000412674822123
Coq_PArith_BinPos_Pos_of_succ_nat || bitM || 0.000399455120518
Coq_Classes_RelationClasses_Asymmetric || abel_semigroup || 0.000394942011483
Coq_Sets_Partial_Order_Rel_of || transitive_rtrancl || 0.000394651082808
Coq_ZArith_BinInt_Z_succ || nil || 0.000390760919324
Coq_Classes_RelationClasses_Asymmetric || lattic35693393ce_set || 0.000371407957891
Coq_Structures_OrdersEx_Nat_as_DT_max || measure || 0.000370978595051
Coq_Structures_OrdersEx_Nat_as_OT_max || measure || 0.000370978595051
Coq_Numbers_Natural_BigN_BigN_BigN_level || inc || 0.000354786075875
Coq_Structures_OrdersEx_Z_as_OT_max || measure || 0.000349568660163
Coq_Numbers_Integer_Binary_ZBinary_Z_max || measure || 0.000349568660163
Coq_Structures_OrdersEx_Z_as_DT_max || measure || 0.000349568660163
Coq_Structures_OrdersEx_N_as_DT_max || remdups || 0.00034933678838
Coq_Numbers_Natural_Binary_NBinary_N_max || remdups || 0.00034933678838
Coq_Structures_OrdersEx_N_as_OT_max || remdups || 0.00034933678838
Coq_NArith_BinNat_N_max || remdups || 0.000343891038995
Coq_Setoids_Setoid_Setoid_Theory || antisym || 0.000335175288812
Coq_Setoids_Setoid_Setoid_Theory || sym || 0.00033312703203
Coq_Structures_OrdersEx_Nat_as_DT_max || measures || 0.000325693830732
Coq_Structures_OrdersEx_Nat_as_OT_max || measures || 0.000325693830732
Coq_ZArith_BinInt_Z_square || suc || 0.000325183196859
Coq_Classes_RelationClasses_Irreflexive || lattic35693393ce_set || 0.000320426952523
Coq_ZArith_BinInt_Z_to_N || nat2 || 0.000309932273885
Coq_Init_Nat_add || measure || 0.000308798901721
Coq_Init_Datatypes_length || distinct || 0.000308200353974
Coq_Numbers_Integer_Binary_ZBinary_Z_max || measures || 0.000307910852241
Coq_Structures_OrdersEx_Z_as_OT_max || measures || 0.000307910852241
Coq_Structures_OrdersEx_Z_as_DT_max || measures || 0.000307910852241
Coq_Setoids_Setoid_Setoid_Theory || trans || 0.00030764994873
Coq_PArith_POrderedType_Positive_as_DT_succ || pos || 0.000305847220361
Coq_PArith_POrderedType_Positive_as_OT_succ || pos || 0.000305847220361
Coq_Structures_OrdersEx_Positive_as_DT_succ || pos || 0.000305847220361
Coq_Structures_OrdersEx_Positive_as_OT_succ || pos || 0.000305847220361
__constr_Coq_Numbers_BinNums_positive_0_1 || bit1 || 0.000303213197563
Coq_Structures_OrdersEx_Nat_as_DT_add || measure || 0.000301063394214
Coq_Structures_OrdersEx_Nat_as_OT_add || measure || 0.000301063394214
Coq_Numbers_Integer_Binary_ZBinary_Z_max || remdups_adj || 0.000300003239922
Coq_Structures_OrdersEx_Z_as_OT_max || remdups_adj || 0.000300003239922
Coq_Structures_OrdersEx_Z_as_DT_max || remdups_adj || 0.000300003239922
Coq_Arith_PeanoNat_Nat_add || measure || 0.000299866364806
__constr_Coq_Init_Datatypes_nat_0_1 || product_unit || 0.000299440055708
Coq_Arith_Factorial_fact || suc_Rep || 0.000295202547512
Coq_ZArith_BinInt_Z_abs_nat || nat2 || 0.000293055617109
Coq_PArith_BinPos_Pos_succ || pos || 0.000292427995873
Coq_Numbers_Natural_BigN_BigN_BigN_level || bitM || 0.000290819592141
Coq_Classes_RelationClasses_PER_0 || equiv_equivp || 0.000289711700259
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || sqr || 0.000287756121582
Coq_Structures_OrdersEx_Z_as_OT_pred || sqr || 0.000287756121582
Coq_Structures_OrdersEx_Z_as_DT_pred || sqr || 0.000287756121582
__constr_Coq_Numbers_BinNums_N_0_2 || bit1 || 0.000281345847764
Coq_Init_Datatypes_length || set2 || 0.000277714443175
Coq_Classes_RelationClasses_PreOrder_0 || equiv_equivp || 0.000277683528596
Coq_Init_Nat_add || measures || 0.000276596269381
Coq_Structures_OrdersEx_Nat_as_DT_Odd || inc || 0.000276439993999
Coq_Structures_OrdersEx_Nat_as_OT_Odd || inc || 0.000276439993999
Coq_Classes_RelationClasses_StrictOrder_0 || abel_semigroup || 0.000272616897707
Coq_PArith_BinPos_Pos_to_nat || bitM || 0.000272420287573
Coq_NArith_BinNat_N_of_nat || nat2 || 0.000270759973282
Coq_Structures_OrdersEx_Nat_as_DT_add || measures || 0.000270360254267
Coq_Structures_OrdersEx_Nat_as_OT_add || measures || 0.000270360254267
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || bit0 || 0.0002698035609
Coq_Structures_OrdersEx_Z_as_OT_pred || bit0 || 0.0002698035609
Coq_Structures_OrdersEx_Z_as_DT_pred || bit0 || 0.0002698035609
Coq_Arith_PeanoNat_Nat_add || measures || 0.000269392582346
Coq_Arith_PeanoNat_Nat_Odd || inc || 0.000268571507108
Coq_Arith_Even_even_0 || nat3 || 0.0002681690578
__constr_Coq_Numbers_BinNums_Z_0_1 || code_integer_of_num || 0.000267864464096
Coq_ZArith_BinInt_Z_opp || nat2 || 0.000262741106312
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || sqr || 0.000256741163194
Coq_Structures_OrdersEx_Z_as_OT_succ || sqr || 0.000256741163194
Coq_Structures_OrdersEx_Z_as_DT_succ || sqr || 0.000256741163194
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || bit0 || 0.0002566974782
Coq_Structures_OrdersEx_Z_as_OT_succ || bit0 || 0.0002566974782
Coq_Structures_OrdersEx_Z_as_DT_succ || bit0 || 0.0002566974782
Coq_Classes_RelationClasses_Equivalence_0 || transitive_acyclic || 0.000256182624637
Coq_PArith_BinPos_Pos_pred_N || nat2 || 0.000253053969791
Coq_ZArith_BinInt_Z_pred || bit0 || 0.000252723855428
Coq_ZArith_BinInt_Z_pred || sqr || 0.000252506614088
Coq_Structures_OrdersEx_Nat_as_DT_Even || inc || 0.000251831872024
Coq_Structures_OrdersEx_Nat_as_OT_Even || inc || 0.000251831872024
Coq_ZArith_BinInt_Z_le || trans || 0.000250799642813
Coq_Arith_PeanoNat_Nat_Even || inc || 0.000247453798579
Coq_Init_Nat_add || remdups || 0.000242479816382
Coq_Classes_RelationClasses_Equivalence_0 || abel_s1917375468axioms || 0.000241261333831
Coq_Structures_OrdersEx_Nat_as_DT_add || remdups || 0.000237977022743
Coq_Structures_OrdersEx_Nat_as_OT_add || remdups || 0.000237977022743
Coq_Arith_PeanoNat_Nat_add || remdups || 0.000237275120335
Coq_ZArith_BinInt_Z_of_nat || nat2 || 0.000237048203995
Coq_PArith_POrderedType_Positive_as_DT_pred || sqr || 0.00023346231674
Coq_PArith_POrderedType_Positive_as_OT_pred || sqr || 0.00023346231674
Coq_Structures_OrdersEx_Positive_as_DT_pred || sqr || 0.00023346231674
Coq_Structures_OrdersEx_Positive_as_OT_pred || sqr || 0.00023346231674
Coq_Arith_PeanoNat_Nat_sqrt || set || 0.000231362848045
Coq_Structures_OrdersEx_Nat_as_DT_sqrt || set || 0.000231362848045
Coq_Structures_OrdersEx_Nat_as_OT_sqrt || set || 0.000231362848045
Coq_Init_Peano_le_0 || transitive_acyclic || 0.000228016668763
Coq_Numbers_Natural_Binary_NBinary_N_succ || nat2 || 0.000227431783149
Coq_Structures_OrdersEx_N_as_OT_succ || nat2 || 0.000227431783149
Coq_Structures_OrdersEx_N_as_DT_succ || nat2 || 0.000227431783149
Coq_Numbers_Natural_Binary_NBinary_N_Odd || nat_of_num || 0.000227305269088
Coq_Structures_OrdersEx_N_as_OT_Odd || nat_of_num || 0.000227305269088
Coq_Structures_OrdersEx_N_as_DT_Odd || nat_of_num || 0.000227305269088
Coq_NArith_BinNat_N_succ || nat2 || 0.000226242409391
Coq_NArith_BinNat_N_Odd || nat_of_num || 0.000225841097198
Coq_ZArith_BinInt_Z_succ || suc || 0.000224741030083
Coq_Arith_PeanoNat_Nat_even || inc || 0.000224421360165
Coq_Structures_OrdersEx_Nat_as_DT_even || inc || 0.000224421360165
Coq_Structures_OrdersEx_Nat_as_OT_even || inc || 0.000224421360165
Coq_Classes_RelationClasses_Irreflexive || semigroup || 0.000224320037069
Coq_Numbers_Integer_Binary_ZBinary_Z_sqrt || set || 0.00022128873349
Coq_Structures_OrdersEx_Z_as_OT_sqrt || set || 0.00022128873349
Coq_Structures_OrdersEx_Z_as_DT_sqrt || set || 0.00022128873349
Coq_Numbers_Integer_Binary_ZBinary_Z_Odd || nat_of_num || 0.000217692475029
Coq_Structures_OrdersEx_Z_as_OT_Odd || nat_of_num || 0.000217692475029
Coq_Structures_OrdersEx_Z_as_DT_Odd || nat_of_num || 0.000217692475029
Coq_Arith_PeanoNat_Nat_odd || inc || 0.000217382943219
Coq_Structures_OrdersEx_Nat_as_DT_odd || inc || 0.000217382943219
Coq_Structures_OrdersEx_Nat_as_OT_odd || inc || 0.000217382943219
Coq_PArith_POrderedType_Positive_as_DT_sub || pow || 0.000217374136691
Coq_PArith_POrderedType_Positive_as_OT_sub || pow || 0.000217374136691
Coq_Structures_OrdersEx_Positive_as_DT_sub || pow || 0.000217374136691
Coq_Structures_OrdersEx_Positive_as_OT_sub || pow || 0.000217374136691
Coq_Numbers_Natural_BigN_BigN_BigN_double_size || bit1 || 0.000217290843583
Coq_Arith_PeanoNat_Nat_log2 || set || 0.000216198391347
Coq_Structures_OrdersEx_Nat_as_DT_log2 || set || 0.000216198391347
Coq_Structures_OrdersEx_Nat_as_OT_log2 || set || 0.000216198391347
Coq_Arith_PeanoNat_Nat_even || numeral_numeral || 0.000215420849448
Coq_Structures_OrdersEx_Nat_as_DT_even || numeral_numeral || 0.000215420849448
Coq_Structures_OrdersEx_Nat_as_OT_even || numeral_numeral || 0.000215420849448
Coq_Arith_PeanoNat_Nat_odd || numeral_numeral || 0.000212265907147
Coq_Structures_OrdersEx_Nat_as_DT_odd || numeral_numeral || 0.000212265907147
Coq_Structures_OrdersEx_Nat_as_OT_odd || numeral_numeral || 0.000212265907147
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || nat2 || 0.000211487748918
Coq_Numbers_Integer_Binary_ZBinary_Z_log2 || set || 0.000208992436706
Coq_Structures_OrdersEx_Z_as_OT_log2 || set || 0.000208992436706
Coq_Structures_OrdersEx_Z_as_DT_log2 || set || 0.000208992436706
Coq_PArith_BinPos_Pos_pred || sqr || 0.000208659230483
Coq_ZArith_BinInt_Z_succ || sqr || 0.000208581093146
Coq_Numbers_Natural_Binary_NBinary_N_Even || nat_of_num || 0.000208505032294
Coq_Structures_OrdersEx_N_as_OT_Even || nat_of_num || 0.000208505032294
Coq_Structures_OrdersEx_N_as_DT_Even || nat_of_num || 0.000208505032294
Coq_NArith_BinNat_N_Even || nat_of_num || 0.000207161932458
Coq_PArith_POrderedType_Positive_as_DT_add || measure || 0.000205350463328
Coq_PArith_POrderedType_Positive_as_OT_add || measure || 0.000205350463328
Coq_Structures_OrdersEx_Positive_as_DT_add || measure || 0.000205350463328
Coq_Structures_OrdersEx_Positive_as_OT_add || measure || 0.000205350463328
Coq_Classes_RelationClasses_Equivalence_0 || semigroup || 0.000205191098454
Coq_Numbers_Integer_Binary_ZBinary_Z_Even || nat_of_num || 0.000204824260453
Coq_Structures_OrdersEx_Z_as_OT_Even || nat_of_num || 0.000204824260453
Coq_Structures_OrdersEx_Z_as_DT_Even || nat_of_num || 0.000204824260453
Coq_PArith_POrderedType_Positive_as_DT_pred_N || inc || 0.000204791978615
Coq_PArith_POrderedType_Positive_as_OT_pred_N || inc || 0.000204791978615
Coq_Structures_OrdersEx_Positive_as_DT_pred_N || inc || 0.000204791978615
Coq_Structures_OrdersEx_Positive_as_OT_pred_N || inc || 0.000204791978615
Coq_Numbers_Natural_Binary_NBinary_N_gcd || upto || 0.000204678047425
Coq_Structures_OrdersEx_N_as_OT_gcd || upto || 0.000204678047425
Coq_Structures_OrdersEx_N_as_DT_gcd || upto || 0.000204678047425
Coq_ZArith_BinInt_Z_of_nat || bitM || 0.00020441580633
Coq_NArith_BinNat_N_gcd || upto || 0.000204361260227
Coq_ZArith_BinInt_Z_Odd || nat_of_num || 0.000203754332603
Coq_Numbers_Integer_Binary_ZBinary_Z_even || nat_of_num || 0.00020135631852
Coq_Structures_OrdersEx_Z_as_OT_even || nat_of_num || 0.00020135631852
Coq_Structures_OrdersEx_Z_as_DT_even || nat_of_num || 0.00020135631852
Coq_Numbers_Integer_BigZ_BigZ_BigZ_abs || code_Suc || 0.000201181449463
Coq_PArith_BinPos_Pos_sub || pow || 0.000200188088782
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || nat_of_num || 0.000196925567181
Coq_Structures_OrdersEx_Z_as_OT_odd || nat_of_num || 0.000196925567181
Coq_Structures_OrdersEx_Z_as_DT_odd || nat_of_num || 0.000196925567181
Coq_Classes_RelationClasses_Asymmetric || semilattice || 0.000195450574918
Coq_ZArith_BinInt_Z_Even || nat_of_num || 0.000192778895002
Coq_Numbers_Natural_Binary_NBinary_N_even || nat_of_num || 0.000191409918082
Coq_Structures_OrdersEx_N_as_OT_even || nat_of_num || 0.000191409918082
Coq_Structures_OrdersEx_N_as_DT_even || nat_of_num || 0.000191409918082
Coq_NArith_BinNat_N_even || nat_of_num || 0.000190027584114
Coq_ZArith_BinInt_Z_of_nat || inc || 0.000189738117258
Coq_PArith_BinPos_Pos_add || measure || 0.000189449526336
Coq_Structures_OrdersEx_Nat_as_DT_Odd || bit1 || 0.000187457384816
Coq_Structures_OrdersEx_Nat_as_OT_Odd || bit1 || 0.000187457384816
Coq_Numbers_Natural_Binary_NBinary_N_odd || nat_of_num || 0.000187001332843
Coq_Structures_OrdersEx_N_as_OT_odd || nat_of_num || 0.000187001332843
Coq_Structures_OrdersEx_N_as_DT_odd || nat_of_num || 0.000187001332843
Coq_Arith_PeanoNat_Nat_Odd || bit1 || 0.000183724765871
Coq_ZArith_BinInt_Z_even || nat_of_num || 0.000182573290974
Coq_PArith_POrderedType_Positive_as_DT_add || measures || 0.000180347029651
Coq_PArith_POrderedType_Positive_as_OT_add || measures || 0.000180347029651
Coq_Structures_OrdersEx_Positive_as_DT_add || measures || 0.000180347029651
Coq_Structures_OrdersEx_Positive_as_OT_add || measures || 0.000180347029651
Coq_Structures_OrdersEx_Nat_as_DT_Even || bit1 || 0.000175960224719
Coq_Structures_OrdersEx_Nat_as_OT_Even || bit1 || 0.000175960224719
Coq_ZArith_BinInt_Z_odd || nat_of_num || 0.0001747406557
Coq_Arith_PeanoNat_Nat_Even || bit1 || 0.000173728482903
Coq_NArith_BinNat_N_odd || nat_of_num || 0.000171451009479
Coq_ZArith_BinInt_Z_of_nat || numeral_numeral || 0.00017020930427
Coq_Classes_RelationClasses_Irreflexive || semilattice || 0.000167786534017
Coq_PArith_BinPos_Pos_add || measures || 0.000167480461843
Coq_ZArith_BinInt_Z_to_nat || nat2 || 0.00016743900093
Coq_Numbers_Natural_Binary_NBinary_N_Odd || nat2 || 0.000166423922283
Coq_Structures_OrdersEx_N_as_OT_Odd || nat2 || 0.000166423922283
Coq_Structures_OrdersEx_N_as_DT_Odd || nat2 || 0.000166423922283
Coq_NArith_BinNat_N_Odd || nat2 || 0.000165349466754
Coq_Arith_PeanoNat_Nat_even || bit1 || 0.000165196010385
Coq_Structures_OrdersEx_Nat_as_DT_even || bit1 || 0.000165196010385
Coq_Structures_OrdersEx_Nat_as_OT_even || bit1 || 0.000165196010385
Coq_Classes_RelationClasses_Asymmetric || antisym || 0.000163867398437
Coq_Numbers_Integer_Binary_ZBinary_Z_Odd || nat2 || 0.000162212140239
Coq_Structures_OrdersEx_Z_as_OT_Odd || nat2 || 0.000162212140239
Coq_Structures_OrdersEx_Z_as_DT_Odd || nat2 || 0.000162212140239
Coq_Arith_PeanoNat_Nat_odd || bit1 || 0.000161435446873
Coq_Structures_OrdersEx_Nat_as_DT_odd || bit1 || 0.000161435446873
Coq_Structures_OrdersEx_Nat_as_OT_odd || bit1 || 0.000161435446873
Coq_Numbers_Natural_BigN_BigN_BigN_even || default_default || 0.000161036840447
Coq_Numbers_Natural_BigN_BigN_BigN_odd || default_default || 0.000160543634626
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || default_default || 0.000160350847779
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || nil || 0.000159700252408
Coq_Structures_OrdersEx_Z_as_OT_succ || nil || 0.000159700252408
Coq_Structures_OrdersEx_Z_as_DT_succ || nil || 0.000159700252408
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || default_default || 0.000157769426382
Coq_Numbers_Integer_Binary_ZBinary_Z_even || nat2 || 0.000156496036596
Coq_Structures_OrdersEx_Z_as_OT_even || nat2 || 0.000156496036596
Coq_Structures_OrdersEx_Z_as_DT_even || nat2 || 0.000156496036596
Coq_Numbers_Natural_Binary_NBinary_N_Even || nat2 || 0.000156242891441
Coq_Structures_OrdersEx_N_as_OT_Even || nat2 || 0.000156242891441
Coq_Structures_OrdersEx_N_as_DT_Even || nat2 || 0.000156242891441
Coq_NArith_BinNat_N_Even || nat2 || 0.000155234154431
Coq_Numbers_Integer_Binary_ZBinary_Z_Even || nat2 || 0.000155050667891
Coq_Structures_OrdersEx_Z_as_OT_Even || nat2 || 0.000155050667891
Coq_Structures_OrdersEx_Z_as_DT_Even || nat2 || 0.000155050667891
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || nat2 || 0.000153889857564
Coq_Structures_OrdersEx_Z_as_OT_odd || nat2 || 0.000153889857564
Coq_Structures_OrdersEx_Z_as_DT_odd || nat2 || 0.000153889857564
Coq_ZArith_BinInt_Z_Odd || nat2 || 0.000152484138431
Coq_Numbers_Natural_Binary_NBinary_N_even || nat2 || 0.000146417143965
Coq_Structures_OrdersEx_N_as_OT_even || nat2 || 0.000146417143965
Coq_Structures_OrdersEx_N_as_DT_even || nat2 || 0.000146417143965
Coq_ZArith_BinInt_Z_Even || nat2 || 0.000146332688541
Coq_Numbers_Natural_BigN_BigN_BigN_double_size || bit0 || 0.000145774185904
Coq_NArith_BinNat_N_even || nat2 || 0.000145280967352
Coq_Numbers_Natural_Binary_NBinary_N_odd || nat2 || 0.000143860886644
Coq_Structures_OrdersEx_N_as_OT_odd || nat2 || 0.000143860886644
Coq_Structures_OrdersEx_N_as_DT_odd || nat2 || 0.000143860886644
Coq_ZArith_BinInt_Z_even || nat2 || 0.000143297281028
Coq_Classes_RelationClasses_Asymmetric || trans || 0.000142030616315
__constr_Coq_Numbers_BinNums_N_0_1 || code_integer_of_num || 0.000140568649349
__constr_Coq_Init_Datatypes_nat_0_1 || code_integer_of_num || 0.000139696834447
Coq_ZArith_BinInt_Z_odd || nat2 || 0.000138565136211
Coq_NArith_BinNat_N_odd || nat2 || 0.000134314457075
Coq_Numbers_Integer_Binary_ZBinary_Z_le || real_V1127708846m_norm || 0.000130463903392
Coq_Structures_OrdersEx_Z_as_OT_le || real_V1127708846m_norm || 0.000130463903392
Coq_Structures_OrdersEx_Z_as_DT_le || real_V1127708846m_norm || 0.000130463903392
Coq_Numbers_Integer_Binary_ZBinary_Z_div2 || cnj || 0.000129347506556
Coq_Structures_OrdersEx_Z_as_OT_div2 || cnj || 0.000129347506556
Coq_Structures_OrdersEx_Z_as_DT_div2 || cnj || 0.000129347506556
Coq_PArith_BinPos_Pos_of_succ_nat || bit0 || 0.000126591872619
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || code_pcr_integer code_cr_integer || 0.000125403366436
Coq_Classes_RelationClasses_StrictOrder_0 || equiv_equivp || 0.000124638336545
Coq_Classes_RelationClasses_Irreflexive || trans || 0.000124111530524
Coq_ZArith_BinInt_Z_le || real_V1127708846m_norm || 0.000123345468824
Coq_PArith_BinPos_Pos_pred_double || inc || 0.000122578599447
Coq_PArith_POrderedType_Positive_as_DT_pred_double || inc || 0.000121959654366
Coq_PArith_POrderedType_Positive_as_OT_pred_double || inc || 0.000121959654366
Coq_Structures_OrdersEx_Positive_as_DT_pred_double || inc || 0.000121959654366
Coq_Structures_OrdersEx_Positive_as_OT_pred_double || inc || 0.000121959654366
Coq_ZArith_BinInt_Z_pred || bit1 || 0.000117385919862
Coq_Numbers_Natural_BigN_BigN_BigN_one || product_unit || 0.00011593800564
Coq_Numbers_Natural_BigN_BigN_BigN_two || product_unit || 0.000112530484855
Coq_Numbers_Integer_BigZ_BigZ_BigZ_two || product_unit || 0.000111470131965
Coq_Classes_SetoidClass_equiv || remdups || 0.000111348783948
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || product_unit || 0.000110770252858
Coq_Init_Peano_le_0 || trans || 0.000110132294588
Coq_Numbers_Natural_BigN_BigN_BigN_zero || product_unit || 0.000109819474191
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || bit1 || 0.000108822951706
Coq_Structures_OrdersEx_Z_as_OT_pred || bit1 || 0.000108822951706
Coq_Structures_OrdersEx_Z_as_DT_pred || bit1 || 0.000108822951706
Coq_ZArith_BinInt_Z_div2 || cnj || 0.000108187890727
Coq_PArith_BinPos_Pos_pred_N || inc || 0.000107552612762
Coq_Structures_OrdersEx_N_as_DT_max || remdups_adj || 0.000104729672038
Coq_Numbers_Natural_Binary_NBinary_N_max || remdups_adj || 0.000104729672038
Coq_Structures_OrdersEx_N_as_OT_max || remdups_adj || 0.000104729672038
Coq_NArith_BinNat_N_max || remdups_adj || 0.000103160243236
Coq_Numbers_Integer_BigZ_BigZ_BigZ_zero || product_unit || 0.000103019036942
Coq_Numbers_Integer_Binary_ZBinary_Z_sgn || cnj || 0.000102792502995
Coq_Structures_OrdersEx_Z_as_OT_sgn || cnj || 0.000102792502995
Coq_Structures_OrdersEx_Z_as_DT_sgn || cnj || 0.000102792502995
Coq_NArith_BinNat_N_to_nat || nat2 || 0.000102726121777
Coq_Init_Datatypes_negb || inc || 0.000102540878649
Coq_ZArith_Zlogarithm_log_sup || nat_of_num || 0.000101279095325
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || bit1 || 0.00010042588625
Coq_Structures_OrdersEx_Z_as_OT_succ || bit1 || 0.00010042588625
Coq_Structures_OrdersEx_Z_as_DT_succ || bit1 || 0.00010042588625
Coq_QArith_QArith_base_Q_0 || code_integer || 0.000100156531785
__constr_Coq_Init_Datatypes_nat_0_2 || suc || 9.50445406797e-05
Coq_Numbers_Rational_BigQ_BigQ_BigN_BigZ_Zabs_N || code_integer_of_int || 9.34262982257e-05
Coq_ZArith_Zlogarithm_log_inf || nat_of_num || 9.32711213251e-05
Coq_ZArith_BinInt_Z_sgn || cnj || 9.05789958434e-05
Coq_Numbers_Natural_Binary_NBinary_N_even || numeral_numeral || 8.90928996137e-05
Coq_NArith_BinNat_N_even || numeral_numeral || 8.90928996137e-05
Coq_Structures_OrdersEx_N_as_OT_even || numeral_numeral || 8.90928996137e-05
Coq_Structures_OrdersEx_N_as_DT_even || numeral_numeral || 8.90928996137e-05
Coq_Numbers_Natural_Binary_NBinary_N_odd || numeral_numeral || 8.86422526835e-05
Coq_Structures_OrdersEx_N_as_OT_odd || numeral_numeral || 8.86422526835e-05
Coq_Structures_OrdersEx_N_as_DT_odd || numeral_numeral || 8.86422526835e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_div2 || code_Suc || 8.74795831686e-05
Coq_Numbers_Integer_Binary_ZBinary_Z_even || numeral_numeral || 8.65678744166e-05
Coq_Structures_OrdersEx_Z_as_OT_even || numeral_numeral || 8.65678744166e-05
Coq_Structures_OrdersEx_Z_as_DT_even || numeral_numeral || 8.65678744166e-05
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || numeral_numeral || 8.62091876007e-05
Coq_Structures_OrdersEx_Z_as_OT_odd || numeral_numeral || 8.62091876007e-05
Coq_Structures_OrdersEx_Z_as_DT_odd || numeral_numeral || 8.62091876007e-05
Coq_Numbers_Natural_BigN_BigN_BigN_odd || numeral_numeral || 8.48310210671e-05
Coq_Numbers_Natural_BigN_BigN_BigN_even || numeral_numeral || 8.47660140195e-05
Coq_PArith_BinPos_Pos_to_nat || bit0 || 8.44824573963e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || numeral_numeral || 8.44428322856e-05
Coq_NArith_BinNat_N_odd || numeral_numeral || 8.43504687216e-05
Coq_Numbers_Rational_BigQ_BigQ_BigQ_t || int || 8.41594793533e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || numeral_numeral || 8.4155718189e-05
Coq_ZArith_BinInt_Z_even || numeral_numeral || 8.40935349184e-05
__constr_Coq_Numbers_BinNums_Z_0_2 || inc || 8.29856628458e-05
Coq_Sets_Relations_1_Symmetric || sym || 8.28865634775e-05
Coq_ZArith_BinInt_Z_odd || numeral_numeral || 8.26014208814e-05
$equals3 || nil || 7.60617969755e-05
__constr_Coq_Numbers_BinNums_Z_0_2 || bitM || 7.39261260668e-05
__constr_Coq_Numbers_BinNums_Z_0_3 || nat_of_num || 7.28220041253e-05
Coq_Structures_OrdersEx_Positive_as_DT_le || transitive_acyclic || 7.11112978848e-05
Coq_Structures_OrdersEx_Positive_as_OT_le || transitive_acyclic || 7.11112978848e-05
Coq_PArith_POrderedType_Positive_as_DT_le || transitive_acyclic || 7.11112978848e-05
Coq_PArith_POrderedType_Positive_as_OT_le || transitive_acyclic || 7.11112978848e-05
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || code_nat_of_natural || 6.92819051174e-05
Coq_PArith_BinPos_Pos_le || transitive_acyclic || 6.92655944379e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt || code_Suc || 6.83770175297e-05
Coq_ZArith_BinInt_Z_to_nat || numeral_numeral || 6.75278105641e-05
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || default_default || 6.75247296563e-05
Coq_Structures_OrdersEx_Z_as_OT_odd || default_default || 6.75247296563e-05
Coq_Structures_OrdersEx_Z_as_DT_odd || default_default || 6.75247296563e-05
Coq_Numbers_Integer_Binary_ZBinary_Z_even || default_default || 6.64473815846e-05
Coq_Structures_OrdersEx_Z_as_OT_even || default_default || 6.64473815846e-05
Coq_Structures_OrdersEx_Z_as_DT_even || default_default || 6.64473815846e-05
Coq_Numbers_Natural_Binary_NBinary_N_odd || default_default || 6.6272510209e-05
Coq_Structures_OrdersEx_N_as_OT_odd || default_default || 6.6272510209e-05
Coq_Structures_OrdersEx_N_as_DT_odd || default_default || 6.6272510209e-05
Coq_ZArith_BinInt_Z_le || transitive_acyclic || 6.60367985938e-05
Coq_ZArith_BinInt_Z_abs_N || numeral_numeral || 6.58457235399e-05
Coq_Numbers_Natural_Binary_NBinary_N_even || default_default || 6.52444566276e-05
Coq_NArith_BinNat_N_even || default_default || 6.52444566276e-05
Coq_Structures_OrdersEx_N_as_OT_even || default_default || 6.52444566276e-05
Coq_Structures_OrdersEx_N_as_DT_even || default_default || 6.52444566276e-05
Coq_ZArith_BinInt_Z_abs_nat || numeral_numeral || 6.51510403003e-05
Coq_ZArith_BinInt_Z_to_N || numeral_numeral || 6.41847384572e-05
Coq_ZArith_BinInt_Z_of_N || numeral_numeral || 6.37737074822e-05
Coq_Relations_Relation_Operators_clos_trans_0 || butlast || 6.32394694143e-05
Coq_ZArith_BinInt_Z_log2_up || nat2 || 6.20417471373e-05
Coq_ZArith_BinInt_Z_even || default_default || 6.10264150809e-05
Coq_ZArith_BinInt_Z_odd || default_default || 5.97449694269e-05
Coq_NArith_BinNat_N_div2 || bit1 || 5.91678484007e-05
Coq_Structures_OrdersEx_N_as_DT_add || remdups || 5.88281177877e-05
Coq_Numbers_Natural_Binary_NBinary_N_add || remdups || 5.88281177877e-05
Coq_Structures_OrdersEx_N_as_OT_add || remdups || 5.88281177877e-05
Coq_Relations_Relation_Operators_clos_trans_0 || tl || 5.86509176217e-05
Coq_Arith_PeanoNat_Nat_odd || default_default || 5.84489307639e-05
Coq_Structures_OrdersEx_Nat_as_DT_odd || default_default || 5.84489307639e-05
Coq_Structures_OrdersEx_Nat_as_OT_odd || default_default || 5.84489307639e-05
Coq_ZArith_BinInt_Z_log2 || nat2 || 5.82120257639e-05
Coq_Arith_PeanoNat_Nat_even || default_default || 5.7859394213e-05
Coq_Structures_OrdersEx_Nat_as_DT_even || default_default || 5.7859394213e-05
Coq_Structures_OrdersEx_Nat_as_OT_even || default_default || 5.7859394213e-05
Coq_NArith_BinNat_N_add || remdups || 5.78385820702e-05
Coq_Init_Datatypes_negb || code_nat_of_integer || 5.75928357026e-05
Coq_NArith_BinNat_N_odd || default_default || 5.74848751736e-05
Coq_Classes_RelationClasses_complement || butlast || 5.6749235357e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_log2 || code_Suc || 5.64499460066e-05
Coq_Arith_Wf_nat_gtof || remdups || 5.52045479927e-05
Coq_Arith_Wf_nat_ltof || remdups || 5.52045479927e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sgn || code_Suc || 5.41780229336e-05
Coq_Structures_OrdersEx_N_as_DT_succ || nil || 5.38502075623e-05
Coq_Structures_OrdersEx_N_as_OT_succ || nil || 5.38502075623e-05
Coq_Numbers_Natural_Binary_NBinary_N_succ || nil || 5.38502075623e-05
Coq_NArith_BinNat_N_succ || nil || 5.34896576308e-05
Coq_Classes_SetoidClass_pequiv || id_on || 5.34125852901e-05
Coq_Classes_RelationClasses_complement || tl || 5.29149492368e-05
Coq_PArith_BinPos_Pos_sqrt || code_Suc || 5.27011769388e-05
Coq_Classes_SetoidTactics_DefaultRelation_0 || equiv_part_equivp || 5.19224607784e-05
Coq_Numbers_Natural_BigN_BigN_BigN_odd || top_top || 4.88480443521e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || top_top || 4.84322935838e-05
Coq_Numbers_Natural_BigN_BigN_BigN_even || top_top || 4.80596151404e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || top_top || 4.78548639303e-05
Coq_Numbers_Natural_Binary_NBinary_N_le || wf || 4.7467626425e-05
Coq_Structures_OrdersEx_N_as_OT_le || wf || 4.7467626425e-05
Coq_Structures_OrdersEx_N_as_DT_le || wf || 4.7467626425e-05
Coq_NArith_BinNat_N_le || wf || 4.73818156708e-05
Coq_Numbers_Natural_BigN_BigN_BigN_odd || bot_bot || 4.69608388028e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || bot_bot || 4.65690175451e-05
Coq_Numbers_Natural_BigN_BigN_BigN_even || bot_bot || 4.61859994976e-05
Coq_Init_Datatypes_negb || nat2 || 4.60805600918e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || bot_bot || 4.59892302244e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_zero || code_integer || 4.59289530675e-05
Coq_Numbers_Natural_BigN_BigN_BigN_two || code_integer || 4.52354160089e-05
Coq_NArith_BinNat_N_div2 || bit0 || 4.5166809465e-05
Coq_Numbers_Integer_BigZ_BigZ_BigZ_two || code_integer || 4.49057651621e-05
Coq_Classes_SetoidTactics_DefaultRelation_0 || reflp || 4.45513326348e-05
Coq_Sets_Relations_1_Transitive || sym || 4.36818066734e-05
__constr_Coq_Numbers_BinNums_Z_0_1 || product_Unity || 4.34528309652e-05
Coq_Numbers_Natural_BigN_BigN_BigN_zero || code_integer || 4.32442686388e-05
Coq_Structures_OrdersEx_Nat_as_DT_Odd || nat_of_num || 4.30495864219e-05
Coq_Structures_OrdersEx_Nat_as_OT_Odd || nat_of_num || 4.30495864219e-05
__constr_Coq_Numbers_BinNums_N_0_1 || product_Unity || 4.2248059747e-05
__constr_Coq_Init_Datatypes_nat_0_1 || product_Unity || 4.20538129789e-05
Coq_Arith_PeanoNat_Nat_Odd || nat_of_num || 4.19144396964e-05
Coq_Arith_Wf_nat_inv_lt_rel || remdups || 4.16499601368e-05
Coq_Classes_RelationClasses_RewriteRelation_0 || equiv_part_equivp || 4.14140241001e-05
Coq_Numbers_Natural_BigN_BigN_BigN_div2 || code_Suc || 4.00171498123e-05
Coq_Structures_OrdersEx_Nat_as_DT_Even || nat_of_num || 3.94882302894e-05
Coq_Structures_OrdersEx_Nat_as_OT_Even || nat_of_num || 3.94882302894e-05
Coq_Arith_PeanoNat_Nat_Even || nat_of_num || 3.88495699371e-05
Coq_Lists_List_rev || rotate1 || 3.78104039266e-05
Coq_ZArith_BinInt_Z_of_N || nat_of_num || 3.69788711617e-05
Coq_Arith_PeanoNat_Nat_even || nat_of_num || 3.69219457068e-05
Coq_Structures_OrdersEx_Nat_as_DT_even || nat_of_num || 3.69219457068e-05
Coq_Structures_OrdersEx_Nat_as_OT_even || nat_of_num || 3.69219457068e-05
Coq_Classes_RelationClasses_RewriteRelation_0 || reflp || 3.64752255209e-05
Coq_Arith_PeanoNat_Nat_odd || nat_of_num || 3.58202528198e-05
Coq_Structures_OrdersEx_Nat_as_DT_odd || nat_of_num || 3.58202528198e-05
Coq_Structures_OrdersEx_Nat_as_OT_odd || nat_of_num || 3.58202528198e-05
Coq_Classes_SetoidClass_pequiv || measure || 3.45300705161e-05
Coq_NArith_BinNat_N_pred || bit1 || 3.32896090024e-05
Coq_Classes_RelationClasses_PER_0 || equiv_part_equivp || 3.24323402089e-05
Coq_ZArith_BinInt_Z_opp || inc || 3.23689734689e-05
Coq_Structures_OrdersEx_Nat_as_DT_Odd || nat2 || 3.15564032398e-05
Coq_Structures_OrdersEx_Nat_as_OT_Odd || nat2 || 3.15564032398e-05
Coq_NArith_BinNat_N_div2 || inc || 3.13055218288e-05
Coq_Sets_Relations_1_Symmetric || wf || 3.10924661828e-05
Coq_Arith_PeanoNat_Nat_pred || bit1 || 3.09804244795e-05
Coq_Arith_PeanoNat_Nat_Odd || nat2 || 3.09339806624e-05
Coq_Numbers_Natural_BigN_BigN_BigN_sqrt || code_Suc || 3.06551777217e-05
Coq_Sets_Relations_1_Reflexive || sym || 3.05125682057e-05
Coq_NArith_BinNat_N_div2 || code_Suc || 2.98741152013e-05
Coq_Structures_OrdersEx_Nat_as_DT_Even || nat2 || 2.96256920053e-05
Coq_Structures_OrdersEx_Nat_as_OT_Even || nat2 || 2.96256920053e-05
Coq_Arith_PeanoNat_Nat_div2 || bit1 || 2.93414896182e-05
Coq_Classes_RelationClasses_PER_0 || reflp || 2.92881834853e-05
Coq_Arith_PeanoNat_Nat_Even || nat2 || 2.92551898821e-05
Coq_ZArith_BinInt_Z_abs || code_natural_of_nat || 2.89552733015e-05
Coq_ZArith_BinInt_Z_abs_N || bit0 || 2.88749990825e-05
Coq_Arith_PeanoNat_Nat_even || nat2 || 2.83959234137e-05
Coq_Structures_OrdersEx_Nat_as_DT_even || nat2 || 2.83959234137e-05
Coq_Structures_OrdersEx_Nat_as_OT_even || nat2 || 2.83959234137e-05
Coq_Arith_PeanoNat_Nat_odd || nat2 || 2.77526256552e-05
Coq_Structures_OrdersEx_Nat_as_DT_odd || nat2 || 2.77526256552e-05
Coq_Structures_OrdersEx_Nat_as_OT_odd || nat2 || 2.77526256552e-05
Coq_ZArith_BinInt_Z_of_N || code_nat_of_natural || 2.72704427752e-05
Coq_Init_Peano_lt || null || 2.679425178e-05
Coq_Arith_PeanoNat_Nat_div2 || bit0 || 2.67135743607e-05
Coq_Arith_PeanoNat_Nat_pred || bit0 || 2.64953942985e-05
__constr_Coq_Numbers_BinNums_Z_0_2 || code_nat_of_natural || 2.63594817017e-05
Coq_Classes_SetoidClass_pequiv || measures || 2.63041754919e-05
Coq_Init_Peano_le_0 || null || 2.61668663856e-05
Coq_ZArith_BinInt_Z_to_nat || default_default || 2.59523462428e-05
Coq_NArith_BinNat_N_pred || bit0 || 2.4653455643e-05
Coq_Numbers_Cyclic_Int31_Int31_phi_inv || bitM || 2.43083393359e-05
Coq_ZArith_BinInt_Z_abs_N || default_default || 2.40944271862e-05
Coq_PArith_BinPos_Pos_of_succ_nat || code_integer_of_int || 2.40048699716e-05
Coq_ZArith_BinInt_Z_abs_nat || default_default || 2.33718258389e-05
Coq_Structures_OrdersEx_Z_as_OT_le || trans || 2.29558591332e-05
Coq_Numbers_Integer_Binary_ZBinary_Z_le || trans || 2.29558591332e-05
Coq_Structures_OrdersEx_Z_as_DT_le || trans || 2.29558591332e-05
Coq_Numbers_Cyclic_Int31_Int31_phi_inv || inc || 2.25455642616e-05
Coq_ZArith_BinInt_Z_to_N || default_default || 2.24010607825e-05
Coq_ZArith_BinInt_Z_abs || bit1 || 2.23933646298e-05
__constr_Coq_Numbers_BinNums_positive_0_1 || nat_of_num || 2.21432625482e-05
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || top_top || 2.1962535865e-05
Coq_Structures_OrdersEx_Z_as_OT_odd || top_top || 2.1962535865e-05
Coq_Structures_OrdersEx_Z_as_DT_odd || top_top || 2.1962535865e-05
Coq_Numbers_Natural_BigN_BigN_BigN_log2 || code_Suc || 2.15651081135e-05
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || code_Nat || 2.15089361637e-05
Coq_Numbers_Natural_Binary_NBinary_N_odd || top_top || 2.13787473407e-05
Coq_Structures_OrdersEx_N_as_OT_odd || top_top || 2.13787473407e-05
Coq_Structures_OrdersEx_N_as_DT_odd || top_top || 2.13787473407e-05
__constr_Coq_Numbers_BinNums_N_0_2 || bit0 || 2.12967395681e-05
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || bot_bot || 2.11386679118e-05
Coq_Structures_OrdersEx_Z_as_OT_odd || bot_bot || 2.11386679118e-05
Coq_Structures_OrdersEx_Z_as_DT_odd || bot_bot || 2.11386679118e-05
Coq_Numbers_Integer_Binary_ZBinary_Z_even || top_top || 2.10546360222e-05
Coq_Structures_OrdersEx_Z_as_OT_even || top_top || 2.10546360222e-05
Coq_Structures_OrdersEx_Z_as_DT_even || top_top || 2.10546360222e-05
Coq_ZArith_BinInt_Z_odd || top_top || 2.10125438773e-05
Coq_Numbers_Natural_Binary_NBinary_N_odd || bot_bot || 2.05733358727e-05
Coq_Structures_OrdersEx_N_as_OT_odd || bot_bot || 2.05733358727e-05
Coq_Structures_OrdersEx_N_as_DT_odd || bot_bot || 2.05733358727e-05
Coq_Numbers_Natural_Binary_NBinary_N_even || top_top || 2.04720104047e-05
Coq_NArith_BinNat_N_even || top_top || 2.04720104047e-05
Coq_Structures_OrdersEx_N_as_OT_even || top_top || 2.04720104047e-05
Coq_Structures_OrdersEx_N_as_DT_even || top_top || 2.04720104047e-05
Coq_ZArith_BinInt_Z_even || inc || 2.04378347088e-05
Coq_ZArith_BinInt_Z_even || top_top || 2.04320406979e-05
Coq_NArith_BinNat_N_odd || top_top || 2.03089651834e-05
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || code_num_of_integer || 2.02709883265e-05
Coq_ZArith_BinInt_Z_odd || bot_bot || 2.02571560784e-05
Coq_Numbers_Integer_Binary_ZBinary_Z_even || bot_bot || 2.02540878094e-05
Coq_Structures_OrdersEx_Z_as_OT_even || bot_bot || 2.02540878094e-05
Coq_Structures_OrdersEx_Z_as_DT_even || bot_bot || 2.02540878094e-05
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || code_n1042895779nteger || 2.00707802552e-05
Coq_Init_Peano_lt || distinct || 1.999729481e-05
Coq_Numbers_Natural_Binary_NBinary_N_even || bot_bot || 1.96897299198e-05
Coq_NArith_BinNat_N_even || bot_bot || 1.96897299198e-05
Coq_Structures_OrdersEx_N_as_OT_even || bot_bot || 1.96897299198e-05
Coq_Structures_OrdersEx_N_as_DT_even || bot_bot || 1.96897299198e-05
Coq_ZArith_BinInt_Z_even || bot_bot || 1.96772681546e-05
Coq_NArith_BinNat_N_odd || bot_bot || 1.95807399473e-05
Coq_ZArith_BinInt_Z_odd || inc || 1.95186560376e-05
Coq_ZArith_BinInt_Z_abs || nat_of_num || 1.93352801985e-05
Coq_Arith_PeanoNat_Nat_odd || top_top || 1.90105039429e-05
Coq_Structures_OrdersEx_Nat_as_DT_odd || top_top || 1.90105039429e-05
Coq_Structures_OrdersEx_Nat_as_OT_odd || top_top || 1.90105039429e-05
Coq_NArith_BinNat_N_of_nat || code_nat_of_integer || 1.88324170276e-05
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || int_ge_less_than2 || 1.84028929141e-05
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || int_ge_less_than2 || 1.84028929141e-05
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || int_ge_less_than2 || 1.84028929141e-05
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || int_ge_less_than || 1.84028929141e-05
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || int_ge_less_than || 1.84028929141e-05
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || int_ge_less_than || 1.84028929141e-05
Coq_NArith_BinNat_N_sqrt_up || int_ge_less_than2 || 1.84003305419e-05
Coq_NArith_BinNat_N_sqrt_up || int_ge_less_than || 1.84003305419e-05
Coq_Arith_PeanoNat_Nat_odd || bot_bot || 1.82973719834e-05
Coq_Structures_OrdersEx_Nat_as_DT_odd || bot_bot || 1.82973719834e-05
Coq_Structures_OrdersEx_Nat_as_OT_odd || bot_bot || 1.82973719834e-05
Coq_ZArith_BinInt_Z_Odd || inc || 1.824577999e-05
Coq_Arith_PeanoNat_Nat_even || top_top || 1.81546648066e-05
Coq_Structures_OrdersEx_Nat_as_DT_even || top_top || 1.81546648066e-05
Coq_Structures_OrdersEx_Nat_as_OT_even || top_top || 1.81546648066e-05
Coq_Relations_Relation_Operators_clos_trans_0 || transitive_rtrancl || 1.80822547266e-05
Coq_Classes_SetoidClass_pequiv || transitive_trancl || 1.80138292523e-05
Coq_Numbers_Natural_Binary_NBinary_N_log2_up || int_ge_less_than2 || 1.75959616108e-05
Coq_Structures_OrdersEx_N_as_OT_log2_up || int_ge_less_than2 || 1.75959616108e-05
Coq_Structures_OrdersEx_N_as_DT_log2_up || int_ge_less_than2 || 1.75959616108e-05
Coq_Numbers_Natural_Binary_NBinary_N_log2_up || int_ge_less_than || 1.75959616108e-05
Coq_Structures_OrdersEx_N_as_OT_log2_up || int_ge_less_than || 1.75959616108e-05
Coq_Structures_OrdersEx_N_as_DT_log2_up || int_ge_less_than || 1.75959616108e-05
Coq_NArith_BinNat_N_log2_up || int_ge_less_than2 || 1.75935115923e-05
Coq_NArith_BinNat_N_log2_up || int_ge_less_than || 1.75935115923e-05
Coq_ZArith_BinInt_Z_of_N || default_default || 1.75675024745e-05
Coq_Arith_PeanoNat_Nat_even || bot_bot || 1.74609334825e-05
Coq_Structures_OrdersEx_Nat_as_DT_even || bot_bot || 1.74609334825e-05
Coq_Structures_OrdersEx_Nat_as_OT_even || bot_bot || 1.74609334825e-05
Coq_Sets_Relations_1_Order_0 || sym || 1.73130543025e-05
__constr_Coq_Numbers_BinNums_Z_0_2 || bit1 || 1.72193513917e-05
Coq_ZArith_BinInt_Z_Even || inc || 1.71907124147e-05
Coq_ZArith_BinInt_Z_abs_N || pos || 1.69974037105e-05
Coq_Classes_SetoidClass_pequiv || transitive_rtrancl || 1.66587755216e-05
Coq_ZArith_BinInt_Z_even || bit1 || 1.64478164385e-05
Coq_ZArith_BinInt_Z_abs_nat || bit0 || 1.60372238621e-05
Coq_ZArith_BinInt_Z_odd || bit1 || 1.59084401686e-05
Coq_ZArith_BinInt_Z_abs || num_of_nat || 1.56860426863e-05
Coq_Lists_List_rev || remdups_adj || 1.56215526202e-05
Coq_Numbers_Natural_Binary_NBinary_N_log2 || int_ge_less_than2 || 1.56154799973e-05
Coq_Structures_OrdersEx_N_as_OT_log2 || int_ge_less_than2 || 1.56154799973e-05
Coq_Structures_OrdersEx_N_as_DT_log2 || int_ge_less_than2 || 1.56154799973e-05
Coq_Numbers_Natural_Binary_NBinary_N_log2 || int_ge_less_than || 1.56154799973e-05
Coq_Structures_OrdersEx_N_as_OT_log2 || int_ge_less_than || 1.56154799973e-05
Coq_Structures_OrdersEx_N_as_DT_log2 || int_ge_less_than || 1.56154799973e-05
Coq_NArith_BinNat_N_log2 || int_ge_less_than2 || 1.56133057333e-05
Coq_NArith_BinNat_N_log2 || int_ge_less_than || 1.56133057333e-05
Coq_Lists_List_rev || remdups || 1.46579618659e-05
Coq_Numbers_Cyclic_Int31_Int31_incr || bit1 || 1.42277721642e-05
Coq_Numbers_Natural_Binary_NBinary_N_lt || wf || 1.42037082211e-05
Coq_Structures_OrdersEx_N_as_OT_lt || wf || 1.42037082211e-05
Coq_Structures_OrdersEx_N_as_DT_lt || wf || 1.42037082211e-05
Coq_NArith_BinNat_N_lt || wf || 1.41473416894e-05
Coq_ZArith_BinInt_Z_to_nat || bit1 || 1.41127468753e-05
Coq_PArith_BinPos_Pos_to_nat || bit1 || 1.40293305958e-05
Coq_ZArith_BinInt_Z_abs_nat || bit1 || 1.37163244958e-05
Coq_ZArith_BinInt_Z_abs_N || bit1 || 1.35797637229e-05
Coq_ZArith_BinInt_Z_to_N || bit1 || 1.30988385936e-05
Coq_ZArith_BinInt_Z_quot2 || bit1 || 1.2999819425e-05
Coq_ZArith_BinInt_Z_Odd || bit1 || 1.27264776471e-05
Coq_Numbers_Natural_Binary_NBinary_N_succ || int_ge_less_than2 || 1.26310770683e-05
Coq_Structures_OrdersEx_N_as_OT_succ || int_ge_less_than2 || 1.26310770683e-05
Coq_Structures_OrdersEx_N_as_DT_succ || int_ge_less_than2 || 1.26310770683e-05
Coq_Numbers_Natural_Binary_NBinary_N_succ || int_ge_less_than || 1.26310770683e-05
Coq_Structures_OrdersEx_N_as_OT_succ || int_ge_less_than || 1.26310770683e-05
Coq_Structures_OrdersEx_N_as_DT_succ || int_ge_less_than || 1.26310770683e-05
Coq_ZArith_BinInt_Z_succ || code_natural_of_nat || 1.26078766025e-05
Coq_NArith_BinNat_N_succ || int_ge_less_than2 || 1.25144075896e-05
Coq_NArith_BinNat_N_succ || int_ge_less_than || 1.25144075896e-05
Coq_ZArith_BinInt_Z_quot2 || bit0 || 1.24026133308e-05
Coq_PArith_BinPos_Pos_pred_N || bit0 || 1.2369186891e-05
Coq_ZArith_BinInt_Z_abs_nat || pos || 1.23281836057e-05
Coq_ZArith_BinInt_Z_Even || bit1 || 1.22113132342e-05
Coq_ZArith_BinInt_Z_div2 || bit1 || 1.1979570429e-05
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || inc || 1.1638640603e-05
Coq_Structures_OrdersEx_Z_as_OT_opp || inc || 1.1638640603e-05
Coq_Structures_OrdersEx_Z_as_DT_opp || inc || 1.1638640603e-05
Coq_ZArith_BinInt_Z_div2 || bit0 || 1.16040127733e-05
Coq_ZArith_BinInt_Z_to_nat || bit0 || 1.1586827179e-05
Coq_PArith_BinPos_Pos_square || code_Suc || 1.15439317441e-05
__constr_Coq_Numbers_BinNums_N_0_2 || code_nat_of_integer || 1.12626099216e-05
Coq_ZArith_BinInt_Z_of_nat || default_default || 1.11366422776e-05
Coq_ZArith_BinInt_Z_to_N || bit0 || 1.11253274277e-05
Coq_Numbers_Cyclic_Int31_Int31_incr || bit0 || 1.06514922043e-05
Coq_Classes_RelationClasses_Asymmetric || abel_s1917375468axioms || 1.06237713881e-05
Coq_ZArith_BinInt_Z_to_N || inc || 1.01745001243e-05
Coq_ZArith_BinInt_Z_abs_N || inc || 1.01347090388e-05
Coq_ZArith_BinInt_Z_of_nat || nat_of_num || 1.01021439548e-05
Coq_Numbers_Integer_Binary_ZBinary_Z_even || inc || 1.00699587382e-05
Coq_Structures_OrdersEx_Z_as_OT_even || inc || 1.00699587382e-05
Coq_Structures_OrdersEx_Z_as_DT_even || inc || 1.00699587382e-05
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || pos || 9.96922111829e-06
Coq_Structures_OrdersEx_Z_as_OT_pred || pos || 9.96922111829e-06
Coq_Structures_OrdersEx_Z_as_DT_pred || pos || 9.96922111829e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || inc || 9.83744445498e-06
Coq_Structures_OrdersEx_Z_as_OT_odd || inc || 9.83744445498e-06
Coq_Structures_OrdersEx_Z_as_DT_odd || inc || 9.83744445498e-06
Coq_NArith_BinNat_N_succ || inc || 9.75601778917e-06
Coq_ZArith_BinInt_Z_abs_nat || code_integer_of_int || 9.54693595628e-06
Coq_PArith_BinPos_Pos_div2_up || bit1 || 9.49867366627e-06
Coq_ZArith_BinInt_Z_of_nat || bit1 || 8.93896174799e-06
Coq_Numbers_Natural_BigN_BigN_BigN_of_N || code_integer_of_int || 8.80696865376e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_even || bit1 || 8.72762416567e-06
Coq_Structures_OrdersEx_Z_as_OT_even || bit1 || 8.72762416567e-06
Coq_Structures_OrdersEx_Z_as_DT_even || bit1 || 8.72762416567e-06
Coq_NArith_BinNat_N_to_nat || code_nat_of_integer || 8.72488651398e-06
Coq_NArith_BinNat_N_of_nat || bit0 || 8.63780294854e-06
Coq_Classes_RelationClasses_Irreflexive || abel_s1917375468axioms || 8.62350967442e-06
Coq_ZArith_BinInt_Z_pred || pos || 8.61241351727e-06
Coq_Numbers_Rational_BigQ_BigQ_BigN_BigZ_Zabs_N || code_Nat || 8.61210299546e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || bit1 || 8.58290604142e-06
Coq_Structures_OrdersEx_Z_as_OT_odd || bit1 || 8.58290604142e-06
Coq_Structures_OrdersEx_Z_as_DT_odd || bit1 || 8.58290604142e-06
Coq_PArith_BinPos_Pos_succ || nat_of_num || 8.57667347794e-06
Coq_ZArith_BinInt_Z_to_N || bitM || 8.25313407111e-06
Coq_ZArith_BinInt_Z_to_nat || top_top || 8.22304857795e-06
Coq_ZArith_BinInt_Z_max || transitive_trancl || 8.15280230932e-06
Coq_ZArith_BinInt_Z_abs_N || top_top || 8.01272657012e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || code_integer_of_int || 7.97177572272e-06
Coq_Structures_OrdersEx_Z_as_OT_succ || code_integer_of_int || 7.97177572272e-06
Coq_Structures_OrdersEx_Z_as_DT_succ || code_integer_of_int || 7.97177572272e-06
Coq_ZArith_BinInt_Z_of_nat || code_nat_of_integer || 7.96958961738e-06
Coq_PArith_BinPos_Pos_of_succ_nat || nat2 || 7.96397547839e-06
Coq_ZArith_BinInt_Z_abs_nat || top_top || 7.92369170174e-06
Coq_ZArith_BinInt_Z_to_nat || bot_bot || 7.91038415625e-06
Coq_ZArith_BinInt_Z_to_N || top_top || 7.80377313516e-06
Coq_ZArith_BinInt_Z_abs_N || bot_bot || 7.7156589049e-06
Coq_ZArith_BinInt_Z_abs_nat || bot_bot || 7.63296569587e-06
Coq_Numbers_Natural_Binary_NBinary_N_succ || code_integer_of_int || 7.58219301776e-06
Coq_Structures_OrdersEx_N_as_OT_succ || code_integer_of_int || 7.58219301776e-06
Coq_Structures_OrdersEx_N_as_DT_succ || code_integer_of_int || 7.58219301776e-06
Coq_ZArith_BinInt_Z_to_N || bot_bot || 7.52171888807e-06
Coq_Classes_RelationClasses_Asymmetric || semigroup || 7.49746447194e-06
Coq_NArith_BinNat_N_of_nat || pos || 7.42026442209e-06
Coq_Arith_PeanoNat_Nat_max || transitive_trancl || 7.38338362707e-06
Coq_NArith_BinNat_N_succ || code_integer_of_int || 7.37663703564e-06
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || code_nat_of_integer || 7.31119151552e-06
Coq_Numbers_Rational_BigQ_BigQ_BigN_BigZ_Zabs_N || code_n1042895779nteger || 7.30736903682e-06
Coq_ZArith_BinInt_Z_succ || code_integer_of_int || 7.03725230343e-06
Coq_ZArith_BinInt_Z_of_N || top_top || 6.74841342016e-06
Coq_Sets_Relations_1_facts_Complement || transitive_trancl || 6.7349804349e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sub || code_pcr_natural code_cr_natural || 6.68190564658e-06
Coq_ZArith_BinInt_Z_succ || num_of_nat || 6.6755018689e-06
Coq_Numbers_Natural_BigN_BigN_BigN_Ndigits || code_Nat || 6.52446428077e-06
Coq_ZArith_BinInt_Z_of_N || bot_bot || 6.51829361427e-06
Coq_NArith_BinNat_N_to_nat || code_integer_of_int || 6.49791857954e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_even || code_nat_of_integer || 6.44121762187e-06
Coq_Structures_OrdersEx_Z_as_OT_even || code_nat_of_integer || 6.44121762187e-06
Coq_Structures_OrdersEx_Z_as_DT_even || code_nat_of_integer || 6.44121762187e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || code_nat_of_integer || 6.37908405097e-06
Coq_Structures_OrdersEx_Z_as_OT_odd || code_nat_of_integer || 6.37908405097e-06
Coq_Structures_OrdersEx_Z_as_DT_odd || code_nat_of_integer || 6.37908405097e-06
__constr_Coq_Numbers_BinNums_Z_0_2 || code_Nat || 6.33854443468e-06
Coq_Numbers_Natural_Binary_NBinary_N_even || bit0 || 6.3346432953e-06
Coq_Structures_OrdersEx_N_as_OT_even || bit0 || 6.3346432953e-06
Coq_Structures_OrdersEx_N_as_DT_even || bit0 || 6.3346432953e-06
Coq_Numbers_Natural_Binary_NBinary_N_odd || bit0 || 6.33285913281e-06
Coq_Structures_OrdersEx_N_as_OT_odd || bit0 || 6.33285913281e-06
Coq_Structures_OrdersEx_N_as_DT_odd || bit0 || 6.33285913281e-06
Coq_PArith_BinPos_Pos_succ || code_Suc || 6.24527897499e-06
Coq_ZArith_Int_Z_as_Int__0 || code_integer || 6.23992491667e-06
Coq_NArith_BinNat_N_even || bit0 || 6.1998330472e-06
Coq_NArith_BinNat_N_odd || bit0 || 6.19062231164e-06
Coq_Numbers_Natural_BigN_BigN_BigN_two || bNF_Cardinal_cone || 6.12777693415e-06
__constr_Coq_Numbers_BinNums_Z_0_2 || code_n1042895779nteger || 6.04212577868e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_t__0 || int || 6.0251769831e-06
Coq_Reals_R_Ifp_Int_part || code_nat_of_integer || 5.99716505218e-06
Coq_ZArith_BinInt_Z_lt || null || 5.97372165189e-06
__constr_Coq_Numbers_BinNums_Z_0_2 || code_num_of_integer || 5.91931435542e-06
Coq_PArith_BinPos_Pos_pred_double || bit0 || 5.84913650103e-06
Coq_ZArith_BinInt_Z_le || null || 5.80696098547e-06
Coq_NArith_BinNat_N_succ || code_Suc || 5.73363795516e-06
Coq_ZArith_BinInt_Z_to_nat || bitM || 5.73097449261e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_two || bNF_Cardinal_cone || 5.71283548635e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_mul || code_pcr_integer code_cr_integer || 5.70943343985e-06
Coq_Numbers_Rational_BigQ_BigQ_BigN_BigZ_Z_of_N || code_integer_of_int || 5.68301139029e-06
Coq_Numbers_Natural_BigN_BigN_BigN_Ndigits || code_n1042895779nteger || 5.6315235949e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || default_default || 5.62025617629e-06
Coq_setoid_ring_Ring_theory_ring_theory_0 || bNF_rel_fun || 5.56945974012e-06
Coq_ZArith_BinInt_Z_even || code_nat_of_integer || 5.4846947149e-06
Coq_Numbers_Natural_BigN_BigN_BigN_lt || bNF_Cardinal_cfinite || 5.45360738876e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_Odd || inc || 5.4499856198e-06
Coq_Structures_OrdersEx_Z_as_OT_Odd || inc || 5.4499856198e-06
Coq_Structures_OrdersEx_Z_as_DT_Odd || inc || 5.4499856198e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_opp || nat2 || 5.44475257593e-06
Coq_ZArith_Int_Z_as_Int__0 || product_unit || 5.39433462774e-06
Coq_ZArith_BinInt_Z_odd || code_nat_of_integer || 5.38555271763e-06
Coq_Numbers_Natural_Binary_NBinary_N_succ_pos || code_integer_of_int || 5.36499046638e-06
Coq_Structures_OrdersEx_N_as_OT_succ_pos || code_integer_of_int || 5.36499046638e-06
Coq_Structures_OrdersEx_N_as_DT_succ_pos || code_integer_of_int || 5.36499046638e-06
Coq_NArith_BinNat_N_succ_pos || code_integer_of_int || 5.33825786963e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_add || code_natural || 5.22659093365e-06
__constr_Coq_Numbers_BinNums_Z_0_2 || bit0 || 5.20246108813e-06
Coq_Numbers_Natural_BigN_BigN_BigN_of_N || pos || 5.13182681613e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_Even || inc || 5.10394929607e-06
Coq_Structures_OrdersEx_Z_as_OT_Even || inc || 5.10394929607e-06
Coq_Structures_OrdersEx_Z_as_DT_Even || inc || 5.10394929607e-06
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || default_default || 4.94533069335e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || bNF_Cardinal_cfinite || 4.92438364929e-06
Coq_PArith_POrderedType_Positive_as_DT_pred_double || nat2 || 4.87755174118e-06
Coq_PArith_POrderedType_Positive_as_OT_pred_double || nat2 || 4.87755174118e-06
Coq_Structures_OrdersEx_Positive_as_DT_pred_double || nat2 || 4.87755174118e-06
Coq_Structures_OrdersEx_Positive_as_OT_pred_double || nat2 || 4.87755174118e-06
Coq_ZArith_BinInt_Z_to_nat || code_integer_of_int || 4.87479998248e-06
__constr_Coq_Init_Datatypes_nat_0_2 || id2 || 4.72394177604e-06
Coq_ZArith_BinInt_Z_abs_N || code_integer_of_int || 4.68951358452e-06
Coq_ZArith_BinInt_Z_to_N || nat_of_num || 4.62819938499e-06
Coq_Numbers_Natural_BigN_BigN_BigN_digits || code_int_of_integer || 4.62289166252e-06
Coq_ZArith_BinInt_Z_abs_N || nat_of_num || 4.61067950636e-06
Coq_ZArith_BinInt_Z_of_N || code_nat_of_integer || 4.56571435296e-06
Coq_ZArith_BinInt_Z_of_nat || top_top || 4.51828234602e-06
Coq_PArith_BinPos_Pos_pred_double || nat2 || 4.51240100688e-06
Coq_ZArith_BinInt_Z_lt || distinct || 4.45506034429e-06
Coq_ZArith_BinInt_Z_to_nat || pos || 4.4110482391e-06
__constr_Coq_Numbers_BinNums_positive_0_2 || bit1 || 4.38060424214e-06
Coq_ZArith_BinInt_Z_of_nat || bot_bot || 4.36964492825e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || nat || 4.36962791429e-06
Coq_Sets_Relations_1_facts_Complement || transitive_rtrancl || 4.26732532179e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || code_integer_of_int || 4.24675101858e-06
Coq_Structures_OrdersEx_Z_as_OT_pred || code_integer_of_int || 4.24675101858e-06
Coq_Structures_OrdersEx_Z_as_DT_pred || code_integer_of_int || 4.24675101858e-06
Coq_Numbers_Natural_Binary_NBinary_N_Odd || code_nat_of_integer || 4.08807954794e-06
Coq_Structures_OrdersEx_N_as_OT_Odd || code_nat_of_integer || 4.08807954794e-06
Coq_Structures_OrdersEx_N_as_DT_Odd || code_nat_of_integer || 4.08807954794e-06
Coq_NArith_BinNat_N_to_nat || pos || 4.06298810492e-06
Coq_NArith_BinNat_N_Odd || code_nat_of_integer || 4.05777827108e-06
Coq_ZArith_BinInt_Z_pred || inc || 4.0261346115e-06
Coq_Numbers_Natural_Binary_NBinary_N_succ || inc || 4.01892298654e-06
Coq_Structures_OrdersEx_N_as_OT_succ || inc || 4.01892298654e-06
Coq_Structures_OrdersEx_N_as_DT_succ || inc || 4.01892298654e-06
Coq_Numbers_Natural_BigN_BigN_BigN_one || bNF_Cardinal_cone || 3.99811068061e-06
Coq_Numbers_Natural_Binary_NBinary_N_Even || code_nat_of_integer || 3.91813591377e-06
Coq_Structures_OrdersEx_N_as_OT_Even || code_nat_of_integer || 3.91813591377e-06
Coq_Structures_OrdersEx_N_as_DT_Even || code_nat_of_integer || 3.91813591377e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_even || pos || 3.89133524414e-06
Coq_Structures_OrdersEx_Z_as_OT_even || pos || 3.89133524414e-06
Coq_Structures_OrdersEx_Z_as_DT_even || pos || 3.89133524414e-06
Coq_NArith_BinNat_N_Even || code_nat_of_integer || 3.88931369384e-06
Coq_ZArith_BinInt_Z_pred || code_Suc || 3.88343889422e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || pos || 3.88087702371e-06
Coq_Structures_OrdersEx_Z_as_OT_odd || pos || 3.88087702371e-06
Coq_Structures_OrdersEx_Z_as_DT_odd || pos || 3.88087702371e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || code_int_of_integer || 3.81362244563e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_Odd || bit1 || 3.78002381083e-06
Coq_Structures_OrdersEx_Z_as_OT_Odd || bit1 || 3.78002381083e-06
Coq_Structures_OrdersEx_Z_as_DT_Odd || bit1 || 3.78002381083e-06
Coq_Structures_OrdersEx_Nat_as_DT_max || transitive_trancl || 3.7715728294e-06
Coq_Structures_OrdersEx_Nat_as_OT_max || transitive_trancl || 3.7715728294e-06
__constr_Coq_Init_Datatypes_nat_0_2 || code_integer_of_int || 3.76506276461e-06
Coq_ZArith_BinInt_Z_succ || id2 || 3.76414763677e-06
Coq_ZArith_BinInt_Z_max || id_on || 3.76141684878e-06
Coq_Numbers_Natural_Binary_NBinary_N_even || pos || 3.76125496067e-06
Coq_Structures_OrdersEx_N_as_OT_even || pos || 3.76125496067e-06
Coq_Structures_OrdersEx_N_as_DT_even || pos || 3.76125496067e-06
Coq_ZArith_BinInt_Z_abs || nat2 || 3.75174814607e-06
Coq_Numbers_Natural_Binary_NBinary_N_odd || pos || 3.74945005341e-06
Coq_Structures_OrdersEx_N_as_OT_odd || pos || 3.74945005341e-06
Coq_Structures_OrdersEx_N_as_DT_odd || pos || 3.74945005341e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_Odd || code_nat_of_integer || 3.74831628559e-06
Coq_Structures_OrdersEx_Z_as_OT_Odd || code_nat_of_integer || 3.74831628559e-06
Coq_Structures_OrdersEx_Z_as_DT_Odd || code_nat_of_integer || 3.74831628559e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || code_nat_of_integer || 3.69748772918e-06
Coq_ZArith_BinInt_Z_pred || code_integer_of_int || 3.69434008739e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_Even || code_nat_of_integer || 3.64095260059e-06
Coq_Structures_OrdersEx_Z_as_OT_Even || code_nat_of_integer || 3.64095260059e-06
Coq_Structures_OrdersEx_Z_as_DT_Even || code_nat_of_integer || 3.64095260059e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_Even || bit1 || 3.61256411429e-06
Coq_Structures_OrdersEx_Z_as_OT_Even || bit1 || 3.61256411429e-06
Coq_Structures_OrdersEx_Z_as_DT_Even || bit1 || 3.61256411429e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || bNF_Cardinal_cone || 3.55197718301e-06
Coq_NArith_BinNat_N_of_nat || code_integer_of_int || 3.51420544896e-06
Coq_NArith_BinNat_N_even || pos || 3.51034353985e-06
__constr_Coq_Numbers_BinNums_Z_0_3 || bit0 || 3.49865109738e-06
Coq_Init_Peano_lt || bNF_Wellorder_wo_rel || 3.48056703346e-06
Coq_Arith_PeanoNat_Nat_max || id_on || 3.47864628688e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || numeral_numeral || 3.46670169452e-06
Coq_NArith_BinNat_N_odd || pos || 3.45851465753e-06
Coq_ZArith_BinInt_Z_Odd || code_nat_of_integer || 3.45346072102e-06
Coq_ZArith_Int_Z_as_Int_i2z || numeral_numeral || 3.45336085741e-06
Coq_Numbers_Natural_BigN_BigN_BigN_le || bNF_Cardinal_cfinite || 3.43385517691e-06
Coq_Classes_RelationClasses_Asymmetric || equiv_part_equivp || 3.42467702078e-06
Coq_ZArith_BinInt_Z_even || pos || 3.38319811028e-06
Coq_ZArith_BinInt_Z_Even || code_nat_of_integer || 3.36470763561e-06
Coq_ZArith_BinInt_Z_odd || pos || 3.36222861831e-06
Coq_ZArith_BinInt_Z_to_nat || inc || 3.35938663014e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || code_Nat || 3.32877350006e-06
Coq_Init_Nat_max || transitive_trancl || 3.29080526227e-06
Coq_ZArith_BinInt_Z_of_nat || code_nat_of_natural || 3.26398888143e-06
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || numeral_numeral || 3.21427601967e-06
Coq_Reals_Raxioms_INR || code_integer_of_int || 3.1912979011e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || code_n1042895779nteger || 3.16238201903e-06
Coq_ZArith_BinInt_Z_opp || nat_of_num || 3.15747216662e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_even || code_integer_of_int || 3.13501459418e-06
Coq_Structures_OrdersEx_Z_as_OT_even || code_integer_of_int || 3.13501459418e-06
Coq_Structures_OrdersEx_Z_as_DT_even || code_integer_of_int || 3.13501459418e-06
Coq_Structures_OrdersEx_Z_as_OT_odd || code_integer_of_int || 3.11312531622e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || code_integer_of_int || 3.11312531622e-06
Coq_Structures_OrdersEx_Z_as_DT_odd || code_integer_of_int || 3.11312531622e-06
Coq_Numbers_Natural_BigN_BigN_BigN_Ndigits || code_integer_of_int || 3.09535536056e-06
Coq_ZArith_BinInt_Z_max || transitive_rtrancl || 3.06415320614e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || bNF_Cardinal_cfinite || 3.03230157534e-06
Coq_Numbers_Natural_Binary_NBinary_N_even || code_nat_of_integer || 3.01651938607e-06
Coq_Structures_OrdersEx_N_as_DT_even || code_nat_of_integer || 3.01651938607e-06
Coq_Structures_OrdersEx_N_as_OT_even || code_nat_of_integer || 3.01651938607e-06
Coq_Numbers_Natural_Binary_NBinary_N_even || code_integer_of_int || 3.00773046739e-06
Coq_Structures_OrdersEx_N_as_DT_even || code_integer_of_int || 3.00773046739e-06
Coq_Structures_OrdersEx_N_as_OT_even || code_integer_of_int || 3.00773046739e-06
Coq_ZArith_BinInt_Z_opp || code_nat_of_natural || 2.99640635505e-06
Coq_Numbers_Natural_Binary_NBinary_N_odd || code_nat_of_integer || 2.98647176645e-06
Coq_Structures_OrdersEx_N_as_OT_odd || code_nat_of_integer || 2.98647176645e-06
Coq_Structures_OrdersEx_N_as_DT_odd || code_nat_of_integer || 2.98647176645e-06
Coq_Structures_OrdersEx_N_as_OT_odd || code_integer_of_int || 2.98473167842e-06
Coq_Structures_OrdersEx_N_as_DT_odd || code_integer_of_int || 2.98473167842e-06
Coq_Numbers_Natural_Binary_NBinary_N_odd || code_integer_of_int || 2.98473167842e-06
Coq_Classes_RelationClasses_Asymmetric || reflp || 2.97532446744e-06
Coq_Arith_PeanoNat_Nat_even || bit0 || 2.93107627377e-06
Coq_Structures_OrdersEx_Nat_as_DT_even || bit0 || 2.93107627377e-06
Coq_Structures_OrdersEx_Nat_as_OT_even || bit0 || 2.93107627377e-06
Coq_Arith_PeanoNat_Nat_odd || bit0 || 2.91622205596e-06
Coq_Structures_OrdersEx_Nat_as_DT_odd || bit0 || 2.91622205596e-06
Coq_Structures_OrdersEx_Nat_as_OT_odd || bit0 || 2.91622205596e-06
Coq_Classes_RelationClasses_Irreflexive || equiv_part_equivp || 2.91598219768e-06
Coq_NArith_BinNat_N_even || code_integer_of_int || 2.86522177267e-06
__constr_Coq_Init_Datatypes_nat_0_2 || inc || 2.85609582629e-06
__constr_Coq_Init_Datatypes_nat_0_2 || code_Suc || 2.84275661155e-06
Coq_NArith_BinNat_N_even || code_nat_of_integer || 2.82227503273e-06
Coq_ZArith_BinInt_Z_even || code_integer_of_int || 2.79096984333e-06
__constr_Coq_Numbers_BinNums_Z_0_2 || nat2 || 2.77244161933e-06
Coq_NArith_BinNat_N_odd || code_integer_of_int || 2.76832313314e-06
Coq_ZArith_Int_Z_as_Int_i2z || default_default || 2.75513427407e-06
Coq_ZArith_BinInt_Z_odd || code_integer_of_int || 2.75109345848e-06
Coq_Arith_PeanoNat_Nat_max || transitive_rtrancl || 2.71787749074e-06
Coq_NArith_BinNat_N_odd || code_nat_of_integer || 2.70340221726e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || null || 2.66206371626e-06
Coq_Structures_OrdersEx_Z_as_OT_lt || null || 2.66206371626e-06
Coq_Structures_OrdersEx_Z_as_DT_lt || null || 2.66206371626e-06
Coq_ZArith_BinInt_Z_lt || bNF_Wellorder_wo_rel || 2.60414736103e-06
Coq_Classes_RelationClasses_Equivalence_0 || null || 2.5816495264e-06
Coq_Classes_RelationClasses_Irreflexive || reflp || 2.57946803748e-06
Coq_Numbers_Natural_BigN_BigN_BigN_level || nat_of_num || 2.56287692464e-06
Coq_Numbers_Natural_BigN_BigN_BigN_double_size || inc || 2.56287692464e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_le || null || 2.55699564945e-06
Coq_Structures_OrdersEx_Z_as_OT_le || null || 2.55699564945e-06
Coq_Structures_OrdersEx_Z_as_DT_le || null || 2.55699564945e-06
Coq_Sets_Relations_3_coherent || id_on || 2.51961750913e-06
Coq_NArith_BinNat_N_to_nat || nat_of_num || 2.49563520081e-06
Coq_PArith_BinPos_Pos_pred || inc || 2.4937019043e-06
Coq_Numbers_Natural_BigN_BigN_BigN_double_size || code_Suc || 2.44604621488e-06
Coq_ZArith_BinInt_Z_to_N || code_integer_of_int || 2.43159710141e-06
Coq_ZArith_BinInt_Z_of_N || bit1 || 2.35574566624e-06
Coq_ZArith_BinInt_Z_succ || nat2 || 2.27483809607e-06
Coq_NArith_BinNat_N_to_nat || code_nat_of_natural || 2.23979273285e-06
Coq_PArith_BinPos_Pos_size || code_Nat || 2.23002038492e-06
Coq_PArith_BinPos_Pos_size || code_integer_of_int || 2.20082050938e-06
Coq_Numbers_Natural_BigN_BigN_BigN_level || code_nat_of_natural || 2.1923720956e-06
Coq_NArith_BinNat_N_to_nat || bit0 || 2.08492849698e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || top_top || 2.06248468406e-06
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || top_top || 2.01423956623e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || bot_bot || 1.99015064775e-06
Coq_Numbers_Natural_BigN_BigN_BigN_digits || nat2 || 1.96260078402e-06
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || bot_bot || 1.94815451326e-06
Coq_PArith_BinPos_Pos_size || code_n1042895779nteger || 1.94747858508e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || distinct || 1.9408183622e-06
Coq_Structures_OrdersEx_Z_as_OT_lt || distinct || 1.9408183622e-06
Coq_Structures_OrdersEx_Z_as_DT_lt || distinct || 1.9408183622e-06
Coq_ZArith_BinInt_Z_abs_nat || nat_of_num || 1.9180339245e-06
Coq_ZArith_BinInt_Z_to_nat || nat_of_num || 1.88535290636e-06
Coq_PArith_BinPos_Pos_sqrt || bit1 || 1.83121307814e-06
Coq_PArith_BinPos_Pos_of_nat || bit1 || 1.79597066216e-06
Coq_PArith_BinPos_Pos_square || bit1 || 1.77645248587e-06
Coq_Structures_OrdersEx_Nat_as_DT_max || id_on || 1.76948932781e-06
Coq_Structures_OrdersEx_Nat_as_OT_max || id_on || 1.76948932781e-06
Coq_ZArith_BinInt_Z_quot2 || suc || 1.74615333565e-06
Coq_ZArith_Zlogarithm_log_inf || code_int_of_integer || 1.72338048354e-06
Coq_Classes_RelationClasses_Symmetric || null || 1.69392537405e-06
Coq_Sets_Relations_3_coherent || measure || 1.67901399747e-06
Coq_Classes_RelationClasses_Reflexive || null || 1.65416885082e-06
Coq_Setoids_Setoid_Setoid_Theory || null || 1.62850089013e-06
Coq_Classes_RelationClasses_Transitive || null || 1.61674837179e-06
Coq_PArith_BinPos_Pos_to_nat || code_nat_of_natural || 1.58959505994e-06
Coq_ZArith_BinInt_Z_square || bit1 || 1.58260766345e-06
Coq_Numbers_Natural_Binary_NBinary_N_div2 || bit0 || 1.56702427209e-06
Coq_Structures_OrdersEx_N_as_OT_div2 || bit0 || 1.56702427209e-06
Coq_Structures_OrdersEx_N_as_DT_div2 || bit0 || 1.56702427209e-06
Coq_ZArith_BinInt_Z_to_N || pos || 1.5513974665e-06
Coq_Init_Nat_add || id_on || 1.53949928946e-06
Coq_Structures_OrdersEx_Nat_as_DT_add || id_on || 1.50952042011e-06
Coq_Structures_OrdersEx_Nat_as_OT_add || id_on || 1.50952042011e-06
Coq_Numbers_Natural_Binary_NBinary_N_sqrt_up || finite_psubset || 1.50863726865e-06
Coq_Structures_OrdersEx_N_as_OT_sqrt_up || finite_psubset || 1.50863726865e-06
Coq_Structures_OrdersEx_N_as_DT_sqrt_up || finite_psubset || 1.50863726865e-06
Coq_NArith_BinNat_N_sqrt_up || finite_psubset || 1.50590548196e-06
Coq_Arith_PeanoNat_Nat_add || id_on || 1.5048522023e-06
Coq_ZArith_Zlogarithm_log_inf || nat2 || 1.46920725058e-06
Coq_Numbers_Natural_Binary_NBinary_N_log2_up || finite_psubset || 1.44614953924e-06
Coq_Structures_OrdersEx_N_as_OT_log2_up || finite_psubset || 1.44614953924e-06
Coq_Structures_OrdersEx_N_as_DT_log2_up || finite_psubset || 1.44614953924e-06
Coq_NArith_BinNat_N_log2_up || finite_psubset || 1.44353090349e-06
Coq_PArith_BinPos_Pos_of_succ_nat || code_Nat || 1.42147354162e-06
Coq_Structures_OrdersEx_Nat_as_DT_max || transitive_rtrancl || 1.41290080522e-06
Coq_Structures_OrdersEx_Nat_as_OT_max || transitive_rtrancl || 1.41290080522e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || bit1 || 1.39397155397e-06
Coq_ZArith_BinInt_Z_square || bit0 || 1.37823054368e-06
Coq_Numbers_Natural_BigN_BigN_BigN_even || bit1 || 1.37411820929e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || bit1 || 1.37119469972e-06
Coq_Numbers_Natural_BigN_BigN_BigN_odd || bit1 || 1.35895442917e-06
Coq_ZArith_BinInt_Z_of_nat || code_int_of_integer || 1.34192906959e-06
Coq_Arith_PeanoNat_Nat_even || pos || 1.32538103696e-06
Coq_Structures_OrdersEx_Nat_as_DT_even || pos || 1.32538103696e-06
Coq_Structures_OrdersEx_Nat_as_OT_even || pos || 1.32538103696e-06
Coq_Init_Nat_add || transitive_trancl || 1.30889719463e-06
Coq_Sets_Relations_3_coherent || measures || 1.30799944606e-06
Coq_Arith_PeanoNat_Nat_odd || pos || 1.30558664233e-06
Coq_Structures_OrdersEx_Nat_as_DT_odd || pos || 1.30558664233e-06
Coq_Structures_OrdersEx_Nat_as_OT_odd || pos || 1.30558664233e-06
Coq_PArith_BinPos_Pos_of_succ_nat || code_n1042895779nteger || 1.2884949901e-06
Coq_Structures_OrdersEx_Nat_as_DT_add || transitive_trancl || 1.2869733102e-06
Coq_Structures_OrdersEx_Nat_as_OT_add || transitive_trancl || 1.2869733102e-06
Coq_Arith_PeanoNat_Nat_add || transitive_trancl || 1.28354854366e-06
Coq_PArith_BinPos_Pos_pred_N || bitM || 1.28043744489e-06
Coq_Arith_PeanoNat_Nat_even || code_integer_of_int || 1.27696996017e-06
Coq_Structures_OrdersEx_Nat_as_DT_even || code_integer_of_int || 1.27696996017e-06
Coq_Structures_OrdersEx_Nat_as_OT_even || code_integer_of_int || 1.27696996017e-06
Coq_Init_Nat_add || transitive_rtrancl || 1.26106552438e-06
Coq_PArith_BinPos_Pos_sqrt || bit0 || 1.25949965017e-06
Coq_Arith_PeanoNat_Nat_odd || code_integer_of_int || 1.25313233127e-06
Coq_Structures_OrdersEx_Nat_as_DT_odd || code_integer_of_int || 1.25313233127e-06
Coq_Structures_OrdersEx_Nat_as_OT_odd || code_integer_of_int || 1.25313233127e-06
Coq_ZArith_BinInt_Z_even || bit0 || 1.25265756626e-06
Coq_Structures_OrdersEx_Nat_as_DT_add || transitive_rtrancl || 1.24070104223e-06
Coq_Structures_OrdersEx_Nat_as_OT_add || transitive_rtrancl || 1.24070104223e-06
Coq_Arith_PeanoNat_Nat_add || transitive_rtrancl || 1.23751763954e-06
Coq_PArith_BinPos_Pos_square || bit0 || 1.22783927124e-06
Coq_ZArith_BinInt_Z_odd || bit0 || 1.22310753018e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_even || bit0 || 1.21113316834e-06
Coq_Structures_OrdersEx_Z_as_OT_even || bit0 || 1.21113316834e-06
Coq_Structures_OrdersEx_Z_as_DT_even || bit0 || 1.21113316834e-06
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || bit0 || 1.19569193521e-06
Coq_Structures_OrdersEx_Z_as_OT_odd || bit0 || 1.19569193521e-06
Coq_Structures_OrdersEx_Z_as_DT_odd || bit0 || 1.19569193521e-06
Coq_Reals_Raxioms_IZR || nat_of_num || 1.1563308482e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || bit0 || 1.12745380767e-06
Coq_Numbers_Natural_BigN_BigN_BigN_even || bit0 || 1.12732063762e-06
Coq_Numbers_Natural_BigN_BigN_BigN_odd || bit0 || 1.11717987581e-06
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || bit0 || 1.11262258212e-06
Coq_ZArith_BinInt_Z_sqrt || bit1 || 1.11067275844e-06
Coq_Setoids_Setoid_Setoid_Theory || distinct || 1.10210383839e-06
Coq_ZArith_BinInt_Z_sqrt || bit0 || 1.04452582496e-06
Coq_Numbers_Natural_Binary_NBinary_N_max || measure || 1.02487701891e-06
Coq_Structures_OrdersEx_N_as_OT_max || measure || 1.02487701891e-06
Coq_Structures_OrdersEx_N_as_DT_max || measure || 1.02487701891e-06
Coq_NArith_BinNat_N_max || measure || 1.00423389811e-06
Coq_PArith_BinPos_Pos_div2_up || bit0 || 9.99816006236e-07
Coq_Classes_RelationClasses_PER_0 || sym || 9.6989545249e-07
Coq_Numbers_Natural_Binary_NBinary_N_lt || null || 9.35682713184e-07
Coq_Structures_OrdersEx_N_as_OT_lt || null || 9.35682713184e-07
Coq_Structures_OrdersEx_N_as_DT_lt || null || 9.35682713184e-07
Coq_NArith_BinNat_N_lt || null || 9.2461983265e-07
Coq_Numbers_Natural_Binary_NBinary_N_le || null || 9.14347040101e-07
Coq_Structures_OrdersEx_N_as_OT_le || null || 9.14347040101e-07
Coq_Structures_OrdersEx_N_as_DT_le || null || 9.14347040101e-07
Coq_NArith_BinNat_N_le || null || 9.06256343949e-07
Coq_Numbers_Natural_Binary_NBinary_N_max || measures || 8.99731183723e-07
Coq_Structures_OrdersEx_N_as_OT_max || measures || 8.99731183723e-07
Coq_Structures_OrdersEx_N_as_DT_max || measures || 8.99731183723e-07
__constr_Coq_Numbers_BinNums_Z_0_2 || code_natural_of_nat || 8.9730121203e-07
Coq_NArith_BinNat_N_max || measures || 8.83501946769e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || code_integer_of_int || 8.60058520289e-07
Coq_Numbers_Natural_BigN_BigN_BigN_even || code_integer_of_int || 8.59626117502e-07
Coq_Numbers_Natural_BigN_BigN_BigN_odd || code_integer_of_int || 8.49064817184e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || nat_of_num || 8.45090258873e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || code_integer_of_int || 8.44632208114e-07
Coq_Structures_OrdersEx_Nat_as_DT_Odd || code_nat_of_integer || 8.38526822069e-07
Coq_Structures_OrdersEx_Nat_as_OT_Odd || code_nat_of_integer || 8.38526822069e-07
Coq_Numbers_Natural_Binary_NBinary_N_add || measure || 8.30001864846e-07
Coq_Structures_OrdersEx_N_as_OT_add || measure || 8.30001864846e-07
Coq_Structures_OrdersEx_N_as_DT_add || measure || 8.30001864846e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || nat_of_num || 8.27723419845e-07
Coq_Numbers_Natural_BigN_BigN_BigN_even || nat_of_num || 8.15714109417e-07
Coq_NArith_BinNat_N_add || measure || 8.11801543118e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || nat2 || 8.09425387898e-07
Coq_Numbers_Natural_BigN_BigN_BigN_odd || nat_of_num || 8.04284346122e-07
Coq_Arith_PeanoNat_Nat_Odd || code_nat_of_integer || 8.03630618013e-07
Coq_Structures_OrdersEx_Nat_as_DT_Even || code_nat_of_integer || 8.00379402087e-07
Coq_Structures_OrdersEx_Nat_as_OT_Even || code_nat_of_integer || 8.00379402087e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || nat2 || 7.9666786838e-07
Coq_Arith_PeanoNat_Nat_div2 || suc || 7.90028990475e-07
Coq_ZArith_Int_Z_as_Int_i2z || top_top || 7.8822374466e-07
Coq_Numbers_Integer_Binary_ZBinary_Z_max || transitive_trancl || 7.76353569976e-07
Coq_Structures_OrdersEx_Z_as_OT_max || transitive_trancl || 7.76353569976e-07
Coq_Structures_OrdersEx_Z_as_DT_max || transitive_trancl || 7.76353569976e-07
Coq_Numbers_Natural_BigN_BigN_BigN_even || nat2 || 7.75608298068e-07
Coq_Arith_PeanoNat_Nat_Even || code_nat_of_integer || 7.71679713989e-07
Coq_Numbers_Natural_BigN_BigN_BigN_odd || nat2 || 7.67317181892e-07
Coq_ZArith_Int_Z_as_Int_i2z || bot_bot || 7.56715183189e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || pos || 7.4600653315e-07
Coq_Numbers_Natural_BigN_BigN_BigN_even || pos || 7.45633695691e-07
Coq_Numbers_Natural_Binary_NBinary_N_add || measures || 7.45483352664e-07
Coq_Structures_OrdersEx_N_as_OT_add || measures || 7.45483352664e-07
Coq_Structures_OrdersEx_N_as_DT_add || measures || 7.45483352664e-07
Coq_Numbers_Natural_BigN_BigN_BigN_odd || pos || 7.3583041742e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || pos || 7.31694732022e-07
Coq_NArith_BinNat_N_add || measures || 7.30610750984e-07
Coq_Reals_Rdefinitions_Ropp || suc || 7.22943211797e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || bitM || 6.9839346529e-07
Coq_Init_Datatypes_length || hd || 6.81382231231e-07
Coq_Numbers_Natural_Binary_NBinary_N_lt || distinct || 6.7407658666e-07
Coq_Structures_OrdersEx_N_as_OT_lt || distinct || 6.7407658666e-07
Coq_Structures_OrdersEx_N_as_DT_lt || distinct || 6.7407658666e-07
Coq_NArith_BinNat_N_lt || distinct || 6.67066154916e-07
Coq_QArith_QArith_base_inject_Z || nat_of_num || 6.50316882404e-07
Coq_ZArith_BinInt_Z_abs_nat || inc || 6.43730824769e-07
Coq_Numbers_Natural_Binary_NBinary_N_sqrt || set || 6.40254151081e-07
Coq_Structures_OrdersEx_N_as_OT_sqrt || set || 6.40254151081e-07
Coq_Structures_OrdersEx_N_as_DT_sqrt || set || 6.40254151081e-07
Coq_NArith_BinNat_N_sqrt || set || 6.39094800639e-07
Coq_Structures_OrdersEx_Nat_as_OT_even || code_nat_of_integer || 6.31671293989e-07
Coq_Arith_PeanoNat_Nat_even || code_nat_of_integer || 6.31671293989e-07
Coq_Structures_OrdersEx_Nat_as_DT_even || code_nat_of_integer || 6.31671293989e-07
Coq_Arith_PeanoNat_Nat_odd || code_nat_of_integer || 6.22538539411e-07
Coq_Structures_OrdersEx_Nat_as_DT_odd || code_nat_of_integer || 6.22538539411e-07
Coq_Structures_OrdersEx_Nat_as_OT_odd || code_nat_of_integer || 6.22538539411e-07
Coq_Numbers_Natural_Binary_NBinary_N_log2 || set || 5.93409224148e-07
Coq_Structures_OrdersEx_N_as_OT_log2 || set || 5.93409224148e-07
Coq_Structures_OrdersEx_N_as_DT_log2 || set || 5.93409224148e-07
Coq_NArith_BinNat_N_log2 || set || 5.92334699082e-07
Coq_Init_Peano_le_0 || antisym || 5.39814938732e-07
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || inc || 5.23637545274e-07
Coq_NArith_BinNat_N_peano_rec || code_rec_natural || 5.12672228386e-07
Coq_NArith_BinNat_N_peano_rect || code_rec_natural || 5.12672228386e-07
Coq_PArith_BinPos_Pos_pred || code_nat_of_integer || 5.00629089709e-07
Coq_PArith_BinPos_Pos_peano_rect || code_rec_natural || 4.86753974701e-07
__constr_Coq_Numbers_BinNums_N_0_1 || left || 4.82350561133e-07
__constr_Coq_Numbers_BinNums_Z_0_2 || num_of_nat || 4.68356399527e-07
__constr_Coq_Numbers_BinNums_Z_0_3 || bit1 || 4.28517343206e-07
Coq_Reals_Raxioms_IZR || inc || 4.2294015892e-07
Coq_QArith_QArith_base_Qopp || suc || 4.13031501448e-07
Coq_PArith_BinPos_Pos_to_nat || code_nat_of_integer || 4.1088848428e-07
Coq_Numbers_Cyclic_Int31_Int31_twice_plus_one || bit1 || 4.09631076972e-07
Coq_PArith_BinPos_Pos_to_nat || code_integer_of_int || 4.0387312252e-07
Coq_ZArith_BinInt_Z_double || bit1 || 4.0226892724e-07
Coq_ZArith_BinInt_Z_succ_double || bit1 || 4.02107551438e-07
Coq_Numbers_Cyclic_Int31_Int31_twice || bit1 || 3.98446940044e-07
Coq_Init_Peano_le_0 || sym || 3.93429287851e-07
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || id2 || 3.61525979493e-07
Coq_Structures_OrdersEx_Z_as_OT_succ || id2 || 3.61525979493e-07
Coq_Structures_OrdersEx_Z_as_DT_succ || id2 || 3.61525979493e-07
Coq_Numbers_Integer_Binary_ZBinary_Z_max || id_on || 3.60446404179e-07
Coq_Structures_OrdersEx_Z_as_OT_max || id_on || 3.60446404179e-07
Coq_Structures_OrdersEx_Z_as_DT_max || id_on || 3.60446404179e-07
Coq_ZArith_BinInt_Z_succ_double || bit0 || 3.48316221091e-07
Coq_ZArith_BinInt_Z_double || bit0 || 3.48158202071e-07
Coq_PArith_BinPos_Pos_of_nat || nat2 || 3.25209637642e-07
Coq_Numbers_Cyclic_Int31_Int31_twice || bit0 || 3.14315164534e-07
Coq_Numbers_Cyclic_Int31_Int31_twice_plus_one || bit0 || 3.05149838955e-07
Coq_Numbers_Integer_Binary_ZBinary_Z_max || transitive_rtrancl || 2.91118668999e-07
Coq_Structures_OrdersEx_Z_as_OT_max || transitive_rtrancl || 2.91118668999e-07
Coq_Structures_OrdersEx_Z_as_DT_max || transitive_rtrancl || 2.91118668999e-07
Coq_Numbers_Natural_BigN_BigN_BigN_of_pos || bit0 || 2.85308965093e-07
Coq_Numbers_Natural_BigN_BigN_BigN_of_pos || code_integer_of_int || 2.66312570251e-07
Coq_Classes_RelationClasses_StrictOrder_0 || bNF_Cardinal_cfinite || 2.63552050151e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || inc || 2.57021745277e-07
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || bNF_Wellorder_wo_rel || 2.55042563294e-07
Coq_Structures_OrdersEx_Z_as_OT_lt || bNF_Wellorder_wo_rel || 2.55042563294e-07
Coq_Structures_OrdersEx_Z_as_DT_lt || bNF_Wellorder_wo_rel || 2.55042563294e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_abs || bit0 || 2.51580083212e-07
Coq_Reals_Rbasic_fun_Rabs || bit0 || 2.41973555369e-07
__constr_Coq_Numbers_BinNums_N_0_2 || code_integer_of_int || 2.3412221073e-07
Coq_Numbers_Natural_BigN_BigN_BigN_div2 || bit1 || 2.18328022325e-07
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || bitM || 2.17442671505e-07
__constr_Coq_Init_Datatypes_nat_0_2 || nat2 || 2.07401135313e-07
Coq_Reals_R_Ifp_Int_part || inc || 2.03861102819e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_div2 || bit1 || 2.0275362738e-07
__constr_Coq_Numbers_BinNums_N_0_2 || nat2 || 2.00836549543e-07
Coq_Init_Peano_lt || antisym || 1.82837477278e-07
Coq_Init_Peano_lt || sym || 1.81991439635e-07
Coq_Structures_OrdersEx_N_as_OT_le || transitive_acyclic || 1.7918941805e-07
Coq_Structures_OrdersEx_N_as_DT_le || transitive_acyclic || 1.7918941805e-07
Coq_Numbers_Natural_Binary_NBinary_N_le || transitive_acyclic || 1.7918941805e-07
Coq_NArith_BinNat_N_le || transitive_acyclic || 1.78145216817e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_two || bNF_Ca1495478003natLeq || 1.76762239929e-07
Coq_Numbers_Natural_BigN_BigN_BigN_div2 || bit0 || 1.75165851364e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_div2 || bit0 || 1.74710759839e-07
Coq_Arith_PeanoNat_Nat_pred || suc || 1.7140292861e-07
Coq_Init_Peano_lt || trans || 1.71256108451e-07
Coq_Reals_R_Ifp_Int_part || nat2 || 1.5239284665e-07
Coq_NArith_BinNat_N_pred || suc || 1.48596307861e-07
Coq_Reals_Raxioms_INR || pos || 1.44163819428e-07
Coq_Numbers_Integer_BigZ_BigZ_BigZ_two || less_than || 1.31769778078e-07
Coq_NArith_BinNat_N_div2 || suc || 1.276677843e-07
Coq_ZArith_BinInt_Z_le || antisym || 1.20348441104e-07
Coq_ZArith_BinInt_Z_quot2 || inc || 1.17246504258e-07
Coq_PArith_BinPos_Pos_to_nat || nat2 || 1.09998001724e-07
Coq_ZArith_BinInt_Z_div2 || inc || 9.99269269956e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || trans || 9.57420640523e-08
Coq_Reals_Raxioms_INR || bit0 || 9.04931970478e-08
Coq_ZArith_BinInt_Z_le || sym || 8.97341761138e-08
Coq_ZArith_BinInt_Z_log2_up || inc || 8.77922149144e-08
Coq_Numbers_Natural_Binary_NBinary_N_peano_rec || rec_sumbool || 8.75384385489e-08
Coq_Numbers_Natural_Binary_NBinary_N_peano_rect || rec_sumbool || 8.75384385489e-08
Coq_NArith_BinNat_N_peano_rec || rec_sumbool || 8.75384385489e-08
Coq_NArith_BinNat_N_peano_rect || rec_sumbool || 8.75384385489e-08
Coq_Structures_OrdersEx_N_as_OT_peano_rec || rec_sumbool || 8.75384385489e-08
Coq_Structures_OrdersEx_N_as_OT_peano_rect || rec_sumbool || 8.75384385489e-08
Coq_Structures_OrdersEx_N_as_DT_peano_rec || rec_sumbool || 8.75384385489e-08
Coq_Structures_OrdersEx_N_as_DT_peano_rect || rec_sumbool || 8.75384385489e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || wf || 8.62181990188e-08
Coq_ZArith_BinInt_Z_log2 || inc || 8.05826725552e-08
Coq_Reals_Rdefinitions_R0 || one2 || 7.99377370702e-08
Coq_ZArith_Zlogarithm_log_sup || bit1 || 7.77001536253e-08
Coq_Numbers_Natural_Binary_NBinary_N_peano_rec || case_sumbool || 7.7688735496e-08
Coq_Numbers_Natural_Binary_NBinary_N_peano_rect || case_sumbool || 7.7688735496e-08
Coq_NArith_BinNat_N_peano_rec || case_sumbool || 7.7688735496e-08
Coq_NArith_BinNat_N_peano_rect || case_sumbool || 7.7688735496e-08
Coq_Structures_OrdersEx_N_as_OT_peano_rec || case_sumbool || 7.7688735496e-08
Coq_Structures_OrdersEx_N_as_OT_peano_rect || case_sumbool || 7.7688735496e-08
Coq_Structures_OrdersEx_N_as_DT_peano_rec || case_sumbool || 7.7688735496e-08
Coq_Structures_OrdersEx_N_as_DT_peano_rect || case_sumbool || 7.7688735496e-08
Coq_Numbers_Natural_Binary_NBinary_N_recursion || rec_sumbool || 7.41262639597e-08
Coq_NArith_BinNat_N_recursion || rec_sumbool || 7.41262639597e-08
Coq_Structures_OrdersEx_N_as_OT_recursion || rec_sumbool || 7.41262639597e-08
Coq_Structures_OrdersEx_N_as_DT_recursion || rec_sumbool || 7.41262639597e-08
Coq_ZArith_Zlogarithm_log_inf || bit1 || 7.2951954949e-08
Coq_PArith_POrderedType_Positive_as_DT_succ || inc || 7.21099637936e-08
Coq_PArith_POrderedType_Positive_as_OT_succ || inc || 7.21099637936e-08
Coq_Structures_OrdersEx_Positive_as_DT_succ || inc || 7.21099637936e-08
Coq_Structures_OrdersEx_Positive_as_OT_succ || inc || 7.21099637936e-08
Coq_Numbers_Natural_Binary_NBinary_N_le || trans || 7.12496333969e-08
Coq_Structures_OrdersEx_N_as_OT_le || trans || 7.12496333969e-08
Coq_Structures_OrdersEx_N_as_DT_le || trans || 7.12496333969e-08
Coq_ZArith_BinInt_Z_pred || suc || 7.11838815964e-08
Coq_NArith_BinNat_N_le || trans || 7.09817940817e-08
Coq_PArith_BinPos_Pos_succ || suc || 7.07143219642e-08
Coq_Numbers_BinNums_positive_0 || product_unit || 7.03800286135e-08
Coq_ZArith_BinInt_Z_to_N || code_nat_of_natural || 6.99473714756e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_two || pred_nat || 6.91590834691e-08
Coq_ZArith_BinInt_Z_to_nat || code_nat_of_natural || 6.87913710248e-08
Coq_NArith_BinNat_N_succ || suc || 6.74491488761e-08
Coq_Numbers_Natural_Binary_NBinary_N_recursion || case_sumbool || 6.64197132916e-08
Coq_NArith_BinNat_N_recursion || case_sumbool || 6.64197132916e-08
Coq_Structures_OrdersEx_N_as_OT_recursion || case_sumbool || 6.64197132916e-08
Coq_Structures_OrdersEx_N_as_DT_recursion || case_sumbool || 6.64197132916e-08
Coq_NArith_BinNat_N_of_nat || nat_of_num || 6.21068759253e-08
Coq_PArith_BinPos_Pos_of_succ_nat || nat_of_num || 6.06088776082e-08
Coq_NArith_BinNat_N_of_nat || code_nat_of_natural || 5.75706483928e-08
Coq_ZArith_BinInt_Z_to_pos || bitM || 5.72865296609e-08
Coq_PArith_BinPos_Pos_of_succ_nat || code_nat_of_natural || 5.59148446286e-08
Coq_PArith_POrderedType_Positive_as_DT_pred_double || bit0 || 5.46362954332e-08
Coq_PArith_POrderedType_Positive_as_OT_pred_double || bit0 || 5.46362954332e-08
Coq_Structures_OrdersEx_Positive_as_DT_pred_double || bit0 || 5.46362954332e-08
Coq_Structures_OrdersEx_Positive_as_OT_pred_double || bit0 || 5.46362954332e-08
Coq_Sets_Relations_1_Symmetric || antisym || 5.28912184375e-08
Coq_Classes_RelationClasses_PreOrder_0 || bNF_Cardinal_cfinite || 5.28766535599e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || inc || 5.18124210673e-08
__constr_Coq_Numbers_BinNums_positive_0_3 || zero_Rep || 5.17779152113e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || inc || 5.1473589193e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || antisym || 5.0451085782e-08
Coq_ZArith_BinInt_Z_lt || antisym || 4.89330613625e-08
Coq_Sets_Relations_1_Symmetric || trans || 4.88170023699e-08
Coq_ZArith_BinInt_Z_succ || inc || 4.87832838569e-08
Coq_ZArith_BinInt_Z_lt || sym || 4.87060930952e-08
Coq_ZArith_BinInt_Z_to_pos || inc || 4.77901293197e-08
Coq_NArith_BinNat_N_pred || inc || 4.73476225223e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || bNF_Ca829732799finite || 4.65013771554e-08
__constr_Coq_Numbers_BinNums_Z_0_2 || abs_Nat || 4.63271154777e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_pred || pos || 4.60407577866e-08
Coq_ZArith_BinInt_Z_succ || code_Suc || 4.60283852587e-08
Coq_Logic_ClassicalFacts_boolP_0 || induct_true || 4.59414693613e-08
Coq_Logic_ClassicalFacts_BoolP || induct_true || 4.59414693613e-08
Coq_ZArith_BinInt_Z_lt || trans || 4.58265206573e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_succ || pos || 4.28430770723e-08
Coq_NArith_BinNat_N_pred || code_Suc || 4.15515265013e-08
Coq_Numbers_Natural_BigN_BigN_BigN_succ || pos || 4.09122906408e-08
__constr_Coq_Numbers_BinNums_Z_0_3 || code_integer_of_int || 3.93203586953e-08
Coq_ZArith_BinInt_Z_opp || code_nat_of_integer || 3.87251889706e-08
Coq_Numbers_Natural_Binary_NBinary_N_div2 || bit1 || 3.77307793807e-08
Coq_Structures_OrdersEx_N_as_OT_div2 || bit1 || 3.77307793807e-08
Coq_Structures_OrdersEx_N_as_DT_div2 || bit1 || 3.77307793807e-08
Coq_Numbers_Natural_BigN_BigN_BigN_of_N || bit0 || 3.76998360214e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || zero_zero || 3.67776896092e-08
Coq_Numbers_BinNums_N_0 || product_unit || 3.56372246697e-08
Coq_QArith_QArith_base_Q_0 || product_unit || 3.27374401629e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || code_nat_of_integer || 3.26483038721e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || code_nat_of_integer || 3.23534263305e-08
Coq_Numbers_Cyclic_Int31_Int31_incr || inc || 3.19228770177e-08
Coq_Init_Datatypes_nat_0 || product_unit || 3.07290526136e-08
Coq_Numbers_BinNums_Z_0 || product_unit || 3.03977383873e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_pred || bit0 || 2.85790846089e-08
Coq_ZArith_BinInt_Z_opp || code_Suc || 2.81577849207e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_succ || bit0 || 2.71518749972e-08
Coq_Numbers_Natural_BigN_BigN_BigN_succ || bit0 || 2.61541590397e-08
Coq_Numbers_Natural_BigN_BigN_BigN_even || inc || 2.5180645763e-08
Coq_Numbers_Natural_BigN_BigN_BigN_odd || inc || 2.50715077638e-08
Coq_Classes_RelationClasses_Reflexive || bNF_Cardinal_cfinite || 2.45162913053e-08
Coq_ZArith_BinInt_Z_log2 || code_nat_of_integer || 2.43463016143e-08
Coq_Reals_Raxioms_IZR || code_nat_of_natural || 2.43420938225e-08
Coq_Classes_RelationClasses_Transitive || bNF_Cardinal_cfinite || 2.36126544047e-08
Coq_QArith_QArith_base_Qlt || bNF_Cardinal_cone || 2.35303818751e-08
Coq_Numbers_Natural_BigN_BigN_BigN_sqrt || bit1 || 2.20679993746e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_pred || code_integer_of_int || 2.19202221576e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_zero || nat || 2.14447112357e-08
Coq_Init_Peano_lt || bNF_Cardinal_cone || 2.14100548223e-08
__constr_Coq_Numbers_BinNums_Z_0_2 || code_integer_of_int || 2.12051750457e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt || bit0 || 2.11186295077e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_succ || code_integer_of_int || 2.05044906389e-08
Coq_FSets_FMapPositive_PositiveMap_E_bits_lt || bNF_Cardinal_cone || 1.96992487619e-08
Coq_Numbers_Natural_BigN_BigN_BigN_succ || code_integer_of_int || 1.91271192688e-08
Coq_ZArith_BinInt_Z_opp || bit1 || 1.88800476322e-08
Coq_Reals_Rdefinitions_R || product_unit || 1.8574158375e-08
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt || bit1 || 1.81543971773e-08
Coq_Reals_Rdefinitions_Rlt || bNF_Cardinal_cone || 1.79482544085e-08
Coq_ZArith_BinInt_Z_abs || inc || 1.77221170295e-08
Coq_Structures_OrdersEx_PositiveOrderedTypeBits_lt || bNF_Cardinal_cone || 1.70104148415e-08
Coq_Numbers_Cyclic_Int31_Int31_incr || bitM || 1.58456038173e-08
Coq_Numbers_Natural_BigN_BigN_BigN_sqrt || bit0 || 1.55915811062e-08
Coq_QArith_Qreals_Q2R || nat_of_num || 1.55740277014e-08
Coq_Numbers_Natural_BigN_BigN_BigN_even || code_nat_of_integer || 1.53894688179e-08
Coq_Numbers_Natural_BigN_BigN_BigN_odd || code_nat_of_integer || 1.52980191718e-08
Coq_Classes_RelationClasses_Equivalence_0 || bNF_Cardinal_cfinite || 1.52003915212e-08
Coq_QArith_QArith_base_Qeq || bNF_Cardinal_cone || 1.47907254878e-08
Coq_MMaps_MMapPositive_PositiveMap_E_lt || bNF_Cardinal_cone || 1.4731557235e-08
Coq_QArith_QArith_base_Qopp || inc || 1.45178638272e-08
Coq_QArith_QArith_base_Qopp || code_Suc || 1.4016184879e-08
Coq_QArith_Qreals_Q2R || code_nat_of_natural || 1.37045315641e-08
Coq_MSets_MSetPositive_PositiveSet_E_lt || bNF_Cardinal_cone || 1.35131259537e-08
Coq_Init_Wf_well_founded || bNF_Cardinal_cfinite || 1.34242477727e-08
Coq_Reals_Rbasic_fun_Rabs || suc || 1.29800816334e-08
Coq_MSets_MSetPositive_PositiveSet_lt || bNF_Cardinal_cone || 1.27170340531e-08
Coq_Numbers_Integer_Binary_ZBinary_Z_le || antisym || 1.23849687232e-08
Coq_Structures_OrdersEx_Z_as_OT_le || antisym || 1.23849687232e-08
Coq_Structures_OrdersEx_Z_as_DT_le || antisym || 1.23849687232e-08
Coq_ZArith_BinInt_Z_log2 || bit1 || 1.21255872741e-08
Coq_PArith_BinPos_Pos_pred_N || code_integer_of_int || 1.20099060073e-08
Coq_Numbers_Natural_BigN_BigN_BigN_t || product_unit || 9.75380520933e-09
Coq_Reals_Rdefinitions_Ropp || bit0 || 9.40171125576e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_t || product_unit || 9.32575261489e-09
Coq_Numbers_Integer_Binary_ZBinary_Z_le || sym || 9.17857358376e-09
Coq_Structures_OrdersEx_Z_as_OT_le || sym || 9.17857358376e-09
Coq_Structures_OrdersEx_Z_as_DT_le || sym || 9.17857358376e-09
Coq_Numbers_Rational_BigQ_BigQ_BigQ_opp || inc || 9.17802282555e-09
Coq_ZArith_BinInt_Z_sgn || bit1 || 9.06261870741e-09
Coq_PArith_POrderedType_Positive_as_DT_pred_N || code_nat_of_integer || 9.02312546101e-09
Coq_PArith_POrderedType_Positive_as_OT_pred_N || code_nat_of_integer || 9.02312546101e-09
Coq_Structures_OrdersEx_Positive_as_DT_pred_N || code_nat_of_integer || 9.02312546101e-09
Coq_Structures_OrdersEx_Positive_as_OT_pred_N || code_nat_of_integer || 9.02312546101e-09
Coq_PArith_BinPos_Pos_of_succ_nat || code_nat_of_integer || 8.8850295273e-09
Coq_ZArith_BinInt_Z_abs_N || code_nat_of_integer || 8.87269171566e-09
Coq_Numbers_Rational_BigQ_BigQ_BigQ_opp || code_Suc || 8.83657471923e-09
Coq_ZArith_BinInt_Z_log2 || bit0 || 8.74545583859e-09
Coq_Numbers_Rational_BigQ_BigQ_BigQ_lt || bNF_Cardinal_cone || 8.72408904017e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sgn || bit0 || 8.41372839355e-09
Coq_PArith_POrderedType_Positive_as_DT_lt || bNF_Cardinal_cone || 8.39542521502e-09
Coq_PArith_POrderedType_Positive_as_OT_lt || bNF_Cardinal_cone || 8.39542521502e-09
Coq_Structures_OrdersEx_Positive_as_DT_lt || bNF_Cardinal_cone || 8.39542521502e-09
Coq_Structures_OrdersEx_Positive_as_OT_lt || bNF_Cardinal_cone || 8.39542521502e-09
Coq_Reals_Rtrigo_def_sin_n || bit1 || 8.23981939477e-09
Coq_Reals_Rtrigo_def_cos_n || bit1 || 8.23981939477e-09
Coq_Reals_Rsqrt_def_pow_2_n || bit1 || 8.23981939477e-09
Coq_PArith_BinPos_Pos_lt || bNF_Cardinal_cone || 8.16739451589e-09
Coq_Reals_Rgeom_yt || pow || 8.16017505958e-09
Coq_Reals_Rgeom_xt || pow || 8.16017505958e-09
Coq_Reals_RIneq_nonzero || bit1 || 7.8237705272e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_log2 || bit0 || 7.81530185765e-09
Coq_QArith_QArith_base_inject_Z || code_nat_of_natural || 7.76662447753e-09
Coq_MSets_MSetPositive_PositiveSet_t || product_unit || 7.69988825347e-09
Coq_Init_Peano_le_0 || bNF_Cardinal_cone || 7.49580487092e-09
Coq_Numbers_Natural_Binary_NBinary_N_lt || bNF_Cardinal_cone || 7.48083291236e-09
Coq_Structures_OrdersEx_N_as_OT_lt || bNF_Cardinal_cone || 7.48083291236e-09
Coq_Structures_OrdersEx_N_as_DT_lt || bNF_Cardinal_cone || 7.48083291236e-09
Coq_NArith_BinNat_N_lt || bNF_Cardinal_cone || 7.44363881839e-09
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || nat_of_num || 7.40995431913e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_opp || bit0 || 7.38612683035e-09
Coq_Numbers_Natural_BigN_BigN_BigN_log2 || bit1 || 6.86178997613e-09
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || code_nat_of_natural || 6.65140551608e-09
Coq_Numbers_Natural_BigN_BigN_BigN_lt || bNF_Cardinal_cone || 6.3884937026e-09
Coq_Reals_Rdefinitions_Rplus || pow || 6.3841626435e-09
Coq_Reals_Rtrigo_def_sin_n || bit0 || 6.35055310783e-09
Coq_Reals_Rtrigo_def_cos_n || bit0 || 6.35055310783e-09
Coq_Reals_Rsqrt_def_pow_2_n || bit0 || 6.35055310783e-09
Coq_Reals_RIneq_nonzero || bit0 || 6.09964293142e-09
Coq_Reals_Rpower_arcsinh || sqr || 6.01650666748e-09
Coq_Numbers_Rational_BigQ_BigQ_BigQ_t || product_unit || 5.98095655357e-09
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || bNF_Cardinal_cone || 5.93256949424e-09
Coq_Structures_OrdersEx_Z_as_OT_lt || bNF_Cardinal_cone || 5.93256949424e-09
Coq_Structures_OrdersEx_Z_as_DT_lt || bNF_Cardinal_cone || 5.93256949424e-09
Coq_Reals_Rtrigo_def_sinh || sqr || 5.58993660041e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || bNF_Cardinal_cone || 5.52088271204e-09
Coq_ZArith_BinInt_Z_lt || bNF_Cardinal_cone || 5.4659995116e-09
Coq_NArith_BinNat_N_peano_rec || rec_nat || 5.464854633e-09
Coq_NArith_BinNat_N_peano_rect || rec_nat || 5.464854633e-09
Coq_Reals_Ratan_ps_atan || sqr || 5.43124938921e-09
Coq_ZArith_BinInt_Z_abs_nat || code_nat_of_integer || 5.28171791308e-09
Coq_Reals_Rpower_arcsinh || bitM || 5.15287783917e-09
Coq_Numbers_Natural_Binary_NBinary_N_succ_pos || pos || 5.14172650852e-09
Coq_Structures_OrdersEx_N_as_OT_succ_pos || pos || 5.14172650852e-09
Coq_Structures_OrdersEx_N_as_DT_succ_pos || pos || 5.14172650852e-09
Coq_NArith_BinNat_N_succ_pos || pos || 5.14129106334e-09
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || antisym || 5.05714368781e-09
Coq_Structures_OrdersEx_Z_as_OT_lt || antisym || 5.05714368781e-09
Coq_Structures_OrdersEx_Z_as_DT_lt || antisym || 5.05714368781e-09
Coq_PArith_BinPos_Pos_peano_rect || rec_nat || 5.03661975548e-09
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || sym || 5.03193152224e-09
Coq_Structures_OrdersEx_Z_as_OT_lt || sym || 5.03193152224e-09
Coq_Structures_OrdersEx_Z_as_DT_lt || sym || 5.03193152224e-09
Coq_Reals_R_Ifp_frac_part || sqr || 4.98659697961e-09
Coq_Reals_Rtrigo_def_sinh || bitM || 4.8318516997e-09
Coq_PArith_BinPos_Pos_succ || nat2 || 4.79464135992e-09
Coq_Reals_Ratan_atan || sqr || 4.76504561202e-09
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || trans || 4.71357257393e-09
Coq_Structures_OrdersEx_Z_as_OT_lt || trans || 4.71357257393e-09
Coq_Structures_OrdersEx_Z_as_DT_lt || trans || 4.71357257393e-09
Coq_Reals_Ratan_ps_atan || bitM || 4.71125702369e-09
Coq_ZArith_BinInt_Z_quot2 || code_Suc || 4.67933425884e-09
Coq_PArith_BinPos_Pos_div2_up || inc || 4.40583275524e-09
Coq_Reals_Rtrigo1_tan || sqr || 4.38307718123e-09
Coq_Reals_R_Ifp_frac_part || bitM || 4.3696501876e-09
Coq_Structures_OrdersEx_PositiveOrderedTypeBits_eq || bNF_Cardinal_cone || 4.35954160445e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || trans || 4.33364050904e-09
Coq_Reals_Ratan_atan || bitM || 4.19726913392e-09
Coq_Numbers_Rational_BigQ_BigQ_BigN_BigZ_Z_of_N || bit0 || 4.16957407064e-09
Coq_PArith_BinPos_Pos_div2_up || code_Suc || 4.14869291471e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || bNF_Ca1495478003natLeq || 4.07549359217e-09
Coq_ZArith_BinInt_Z_div2 || code_Suc || 4.01040303964e-09
Coq_ZArith_BinInt_Z_to_N || code_nat_of_integer || 3.99193075537e-09
Coq_Reals_R_sqrt_sqrt || sqr || 3.96903565621e-09
Coq_Reals_Rtrigo1_tan || bitM || 3.89639272126e-09
Coq_Reals_RIneq_Rsqr || sqr || 3.84553602608e-09
Coq_Reals_Rbasic_fun_Rabs || bitM || 3.81140060527e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || less_than || 3.77620631321e-09
Coq_PArith_BinPos_Pos_pred_N || code_nat_of_integer || 3.76116232238e-09
Coq_Arith_PeanoNat_Nat_pred || inc || 3.74066189649e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sgn || bit1 || 3.69652481533e-09
Coq_Reals_Rbasic_fun_Rabs || sqr || 3.67170759229e-09
Coq_Arith_PeanoNat_Nat_div2 || inc || 3.64680795139e-09
Coq_Reals_Rtrigo_def_sin || sqr || 3.60505734715e-09
Coq_MMaps_MMapPositive_PositiveMap_E_eq || bNF_Cardinal_cone || 3.60015265036e-09
Coq_Reals_R_sqrt_sqrt || bitM || 3.56718073403e-09
Coq_Arith_PeanoNat_Nat_pred || code_Suc || 3.5529720499e-09
Coq_Reals_Rdefinitions_Rminus || pow || 3.53772417647e-09
Coq_Classes_RelationClasses_Symmetric || bNF_Cardinal_cfinite || 3.49615757503e-09
Coq_Reals_RIneq_Rsqr || bitM || 3.46692280357e-09
Coq_Arith_PeanoNat_Nat_div2 || code_Suc || 3.44728882933e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_log2 || bit1 || 3.44538170593e-09
Coq_ZArith_BinInt_Z_abs || bit0 || 3.38820364595e-09
Coq_Numbers_Natural_Binary_NBinary_N_divide || bNF_Cardinal_cone || 3.34375547233e-09
Coq_NArith_BinNat_N_divide || bNF_Cardinal_cone || 3.34375547233e-09
Coq_Structures_OrdersEx_N_as_OT_divide || bNF_Cardinal_cone || 3.34375547233e-09
Coq_Structures_OrdersEx_N_as_DT_divide || bNF_Cardinal_cone || 3.34375547233e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_abs || bit1 || 3.3360153888e-09
Coq_Reals_Rtrigo_def_sin || bitM || 3.26764307362e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || wf || 3.21867002581e-09
Coq_Reals_Rdefinitions_Ropp || sqr || 3.21686715008e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_opp || bit1 || 3.11504993035e-09
Coq_Numbers_Natural_Binary_NBinary_N_succ || code_nat_of_integer || 3.09471654751e-09
Coq_Structures_OrdersEx_N_as_OT_succ || code_nat_of_integer || 3.09471654751e-09
Coq_Structures_OrdersEx_N_as_DT_succ || code_nat_of_integer || 3.09471654751e-09
Coq_NArith_BinNat_N_succ || code_nat_of_integer || 3.0723871888e-09
Coq_Arith_PeanoNat_Nat_divide || bNF_Cardinal_cone || 3.04694146179e-09
Coq_Structures_OrdersEx_Nat_as_DT_divide || bNF_Cardinal_cone || 3.04694146179e-09
Coq_Structures_OrdersEx_Nat_as_OT_divide || bNF_Cardinal_cone || 3.04694146179e-09
Coq_PArith_POrderedType_Positive_as_DT_le || bNF_Cardinal_cone || 3.04622435057e-09
Coq_PArith_POrderedType_Positive_as_OT_le || bNF_Cardinal_cone || 3.04622435057e-09
Coq_Structures_OrdersEx_Positive_as_DT_le || bNF_Cardinal_cone || 3.04622435057e-09
Coq_Structures_OrdersEx_Positive_as_OT_le || bNF_Cardinal_cone || 3.04622435057e-09
Coq_PArith_BinPos_Pos_le || bNF_Cardinal_cone || 3.03545875264e-09
Coq_MSets_MSetPositive_PositiveSet_E_eq || bNF_Cardinal_cone || 2.99972986154e-09
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || bNF_Cardinal_cone || 2.95172932618e-09
Coq_Structures_OrdersEx_Z_as_OT_divide || bNF_Cardinal_cone || 2.95172932618e-09
Coq_Structures_OrdersEx_Z_as_DT_divide || bNF_Cardinal_cone || 2.95172932618e-09
Coq_Reals_Rdefinitions_Ropp || bitM || 2.94513305744e-09
Coq_PArith_POrderedType_Positive_as_DT_succ || code_integer_of_int || 2.87860043317e-09
Coq_PArith_POrderedType_Positive_as_OT_succ || code_integer_of_int || 2.87860043317e-09
Coq_Structures_OrdersEx_Positive_as_DT_succ || code_integer_of_int || 2.87860043317e-09
Coq_Structures_OrdersEx_Positive_as_OT_succ || code_integer_of_int || 2.87860043317e-09
Coq_Reals_Rtrigo_def_cos || size_nibble || 2.87810973734e-09
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || bit1 || 2.84653824443e-09
Coq_ZArith_BinInt_Z_sgn || bit0 || 2.82351459565e-09
Coq_PArith_BinPos_Pos_pred_N || nat_of_num || 2.77406414538e-09
Coq_ZArith_BinInt_Z_divide || bNF_Cardinal_cone || 2.72660955125e-09
Coq_PArith_BinPos_Pos_succ || code_integer_of_int || 2.71264245979e-09
Coq_Numbers_Natural_Binary_NBinary_N_succ || nat_of_num || 2.671585302e-09
Coq_Structures_OrdersEx_N_as_OT_succ || nat_of_num || 2.671585302e-09
Coq_Structures_OrdersEx_N_as_DT_succ || nat_of_num || 2.671585302e-09
Coq_ZArith_BinInt_Z_opp || bit0 || 2.67013358174e-09
Coq_NArith_BinNat_N_succ || nat_of_num || 2.65435474951e-09
Coq_ZArith_BinInt_Z_to_nat || code_nat_of_integer || 2.59136467812e-09
Coq_Numbers_Natural_BigN_BigN_BigN_log2 || bit0 || 2.49699142035e-09
Coq_Reals_ROrderedType_R_as_OT_eq || bNF_Cardinal_cone || 2.48706030951e-09
Coq_Reals_ROrderedType_R_as_DT_eq || bNF_Cardinal_cone || 2.48706030951e-09
Coq_PArith_BinPos_Pos_pred_N || code_nat_of_natural || 2.45247598217e-09
Coq_Numbers_Natural_Binary_NBinary_N_max || transitive_trancl || 2.43605853444e-09
Coq_Structures_OrdersEx_N_as_OT_max || transitive_trancl || 2.43605853444e-09
Coq_Structures_OrdersEx_N_as_DT_max || transitive_trancl || 2.43605853444e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || antisym || 2.40727696417e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_succ || id2 || 2.40440963728e-09
Coq_NArith_BinNat_N_max || transitive_trancl || 2.39824809053e-09
Coq_Numbers_Natural_BigN_BigN_BigN_eq || bNF_Cardinal_cone || 2.13637889426e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || bNF_Ca829732799finite || 2.1116274961e-09
Coq_Reals_Rdefinitions_R1 || code_pcr_integer code_cr_integer || 2.07795078158e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || bNF_Cardinal_cone || 2.03912233718e-09
Coq_Reals_Rdefinitions_R1 || code_pcr_natural code_cr_natural || 1.98139733061e-09
Coq_PArith_BinPos_Pos_of_succ_nat || pos || 1.96117379575e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || pred_nat || 1.93136084939e-09
Coq_Numbers_Natural_BigN_BigN_BigN_divide || bNF_Cardinal_cone || 1.88729494915e-09
Coq_Reals_Rdefinitions_Ropp || zero_zero || 1.87406464033e-09
Coq_Sets_Relations_1_Antisymmetric || bNF_Cardinal_cfinite || 1.86143954553e-09
Coq_Reals_Rdefinitions_R0 || code_integer || 1.84547920748e-09
Coq_Numbers_Natural_Binary_NBinary_N_le || bNF_Cardinal_cone || 1.82151481366e-09
Coq_Structures_OrdersEx_N_as_OT_le || bNF_Cardinal_cone || 1.82151481366e-09
Coq_Structures_OrdersEx_N_as_DT_le || bNF_Cardinal_cone || 1.82151481366e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || bNF_Cardinal_cone || 1.82066153842e-09
Coq_NArith_BinNat_N_le || bNF_Cardinal_cone || 1.81778775586e-09
Coq_Reals_Rdefinitions_R1 || nat || 1.79336508133e-09
Coq_Numbers_Cyclic_Abstract_CyclicAxioms_ZnZ_Specs_0 || wf || 1.76353466972e-09
Coq_Sets_Relations_1_Order_0 || bNF_Cardinal_cfinite || 1.66484036536e-09
Coq_Reals_Rdefinitions_R0 || code_natural || 1.6209956942e-09
Coq_Numbers_Integer_Binary_ZBinary_Z_le || bNF_Cardinal_cone || 1.61803852227e-09
Coq_Structures_OrdersEx_Z_as_OT_le || bNF_Cardinal_cone || 1.61803852227e-09
Coq_Structures_OrdersEx_Z_as_DT_le || bNF_Cardinal_cone || 1.61803852227e-09
Coq_ZArith_BinInt_Z_le || bNF_Cardinal_cone || 1.50757617693e-09
Coq_Sets_Relations_1_Reflexive || bNF_Cardinal_cfinite || 1.50310105709e-09
Coq_PArith_POrderedType_Positive_as_DT_succ || suc_Rep || 1.47510564496e-09
Coq_PArith_POrderedType_Positive_as_OT_succ || suc_Rep || 1.47510564496e-09
Coq_Structures_OrdersEx_Positive_as_DT_succ || suc_Rep || 1.47510564496e-09
Coq_Structures_OrdersEx_Positive_as_OT_succ || suc_Rep || 1.47510564496e-09
Coq_PArith_BinPos_Pos_succ || suc_Rep || 1.40941667498e-09
Coq_Sets_Relations_1_Transitive || bNF_Cardinal_cfinite || 1.31865107756e-09
Coq_Sets_Ensembles_Empty_set_0 || nil || 1.29590849855e-09
Coq_Numbers_Natural_BigN_BigN_BigN_le || bNF_Cardinal_cone || 1.29432522674e-09
Coq_Numbers_Cyclic_Int31_Int31_incr || suc || 1.288930254e-09
Coq_Numbers_Cyclic_Int31_Int31_phi_inv || nat_of_num || 1.26866732791e-09
__constr_Coq_Numbers_BinNums_Z_0_3 || abs_Nat || 1.26090369225e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || bNF_Cardinal_cone || 1.21321058797e-09
Coq_ZArith_Int_Z_as_Int__1 || nat || 1.1810484132e-09
__constr_Coq_Init_Datatypes_nat_0_2 || nat_of_num || 1.13612618139e-09
Coq_Numbers_Natural_Binary_NBinary_N_max || id_on || 1.13476104011e-09
Coq_Structures_OrdersEx_N_as_OT_max || id_on || 1.13476104011e-09
Coq_Structures_OrdersEx_N_as_DT_max || id_on || 1.13476104011e-09
Coq_NArith_BinNat_N_max || id_on || 1.11494951514e-09
Coq_Numbers_Natural_Binary_NBinary_N_succ || id2 || 1.09356302332e-09
Coq_Structures_OrdersEx_N_as_OT_succ || id2 || 1.09356302332e-09
Coq_Structures_OrdersEx_N_as_DT_succ || id2 || 1.09356302332e-09
Coq_Sets_Relations_3_coherent || transitive_trancl || 1.09239509475e-09
Coq_NArith_BinNat_N_succ || id2 || 1.08256436459e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || nat || 1.07137511381e-09
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || transitive_acyclic || 1.05970112894e-09
Coq_Numbers_Cyclic_Int31_Int31_phi_inv || code_nat_of_natural || 1.03140859007e-09
Coq_Sets_Relations_3_coherent || transitive_rtrancl || 1.02028858685e-09
Coq_Reals_Rtrigo_def_exp || int || 1.00044641924e-09
Coq_Numbers_Natural_Binary_NBinary_N_add || id_on || 9.66550847226e-10
Coq_Structures_OrdersEx_N_as_OT_add || id_on || 9.66550847226e-10
Coq_Structures_OrdersEx_N_as_DT_add || id_on || 9.66550847226e-10
Coq_MSets_MSetPositive_PositiveSet_eq || bNF_Cardinal_cone || 9.63380675248e-10
Coq_NArith_BinNat_N_add || id_on || 9.47752466455e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_Odd || nat2 || 9.26532642221e-10
Coq_Numbers_Natural_BigN_BigN_BigN_Odd || nat2 || 9.25440103979e-10
Coq_Numbers_Natural_Binary_NBinary_N_max || transitive_rtrancl || 9.12630802968e-10
Coq_Structures_OrdersEx_N_as_OT_max || transitive_rtrancl || 9.12630802968e-10
Coq_Structures_OrdersEx_N_as_DT_max || transitive_rtrancl || 9.12630802968e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lcm || upt || 9.09360151063e-10
Coq_ZArith_Int_Z_as_Int_i2z || zero_zero || 9.06749141215e-10
Coq_NArith_BinNat_N_max || transitive_rtrancl || 8.99103664388e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_Even || nat2 || 8.85744346959e-10
Coq_Numbers_Natural_BigN_BigN_BigN_Even || nat2 || 8.69006058682e-10
Coq_Numbers_Natural_BigN_BigN_BigN_Odd || nat_of_num || 8.6675678093e-10
Coq_Reals_Ranalysis1_derivable_pt_lim || left_unique || 8.55013780645e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_gcd || upt || 8.51900597626e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_Odd || nat_of_num || 8.46285440479e-10
Coq_Reals_Ranalysis1_derivable_pt_lim || left_total || 8.46179054269e-10
Coq_Reals_Rtrigo_def_sin || int || 8.45092376835e-10
Coq_Reals_Ranalysis1_derivable_pt_lim || right_unique || 8.42030413805e-10
Coq_Reals_Rtrigo_def_exp || nat || 8.33800051512e-10
Coq_Numbers_Natural_Binary_NBinary_N_add || transitive_trancl || 8.30178413801e-10
Coq_Structures_OrdersEx_N_as_OT_add || transitive_trancl || 8.30178413801e-10
Coq_Structures_OrdersEx_N_as_DT_add || transitive_trancl || 8.30178413801e-10
Coq_NArith_BinNat_N_add || transitive_trancl || 8.15838392477e-10
Coq_Numbers_Natural_Binary_NBinary_N_lt || bNF_Wellorder_wo_rel || 8.12460731988e-10
Coq_Structures_OrdersEx_N_as_OT_lt || bNF_Wellorder_wo_rel || 8.12460731988e-10
Coq_Structures_OrdersEx_N_as_DT_lt || bNF_Wellorder_wo_rel || 8.12460731988e-10
Coq_NArith_BinNat_N_lt || bNF_Wellorder_wo_rel || 8.06221013488e-10
Coq_Numbers_Natural_Binary_NBinary_N_add || transitive_rtrancl || 8.00369070789e-10
Coq_Structures_OrdersEx_N_as_OT_add || transitive_rtrancl || 8.00369070789e-10
Coq_Structures_OrdersEx_N_as_DT_add || transitive_rtrancl || 8.00369070789e-10
Coq_Reals_Ranalysis1_derivable_pt_lim || right_total || 7.99703063277e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_Even || nat_of_num || 7.96484722394e-10
Coq_Numbers_Natural_BigN_BigN_BigN_Even || nat_of_num || 7.95387042921e-10
Coq_Numbers_Natural_BigN_BigN_BigN_one || nat || 7.88689436303e-10
Coq_NArith_BinNat_N_add || transitive_rtrancl || 7.86926723275e-10
Coq_Reals_Ranalysis1_derivable_pt_lim || bi_total || 7.82914694362e-10
Coq_Reals_Rtrigo_def_sin || nat || 7.71749874945e-10
Coq_Reals_Ranalysis1_derivable_pt_lim || bi_unique || 7.61624615566e-10
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || zero_zero || 7.54260005033e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || linorder_sorted || 6.81991626006e-10
Coq_Reals_Rdefinitions_R1 || one2 || 6.78271991638e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || distinct || 6.72051308141e-10
Coq_Numbers_Cyclic_DoubleCyclic_DoubleType_zn2z_0 || list || 6.5006243951e-10
__constr_Coq_Numbers_BinNums_Z_0_3 || nat2 || 6.49020969348e-10
Coq_Numbers_Natural_BigN_BigN_BigN_Odd || inc || 6.04358687098e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_Odd || inc || 5.81817015118e-10
Coq_Numbers_Cyclic_Abstract_CyclicAxioms_ZnZ_Specs_0 || trans || 5.54736316201e-10
Coq_ZArith_BinInt_Z_abs || code_Suc || 5.51952310044e-10
Coq_Numbers_Natural_BigN_BigN_BigN_Even || inc || 5.50556813877e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_Even || inc || 5.44871603129e-10
Coq_Numbers_Rational_BigQ_BigQ_BigQ_eq || bNF_Cardinal_cone || 5.17229807298e-10
Coq_Numbers_Natural_BigN_BigN_BigN_Odd || code_nat_of_integer || 4.99323929644e-10
Coq_Sets_Image_Im_0 || bind || 4.96762214393e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_Odd || code_nat_of_integer || 4.92158559721e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_Even || code_nat_of_integer || 4.58817068878e-10
Coq_Reals_Rpower_Rpower || pow || 4.54264932197e-10
Coq_Numbers_Natural_BigN_BigN_BigN_Even || code_nat_of_integer || 4.51836815926e-10
Coq_Numbers_Natural_BigN_BigN_BigN_Odd || bit1 || 4.09794418125e-10
Coq_QArith_QArith_base_inject_Z || inc || 4.08575870721e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_Odd || bit1 || 4.03535534483e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_zero || int || 3.89500070516e-10
Coq_Numbers_Cyclic_DoubleCyclic_DoubleCyclic_mk_zn2z_ops_karatsuba || lenlex || 3.87675895817e-10
Coq_Numbers_Cyclic_DoubleCyclic_DoubleCyclic_mk_zn2z_ops || lenlex || 3.87675895817e-10
Coq_Reals_Rbasic_fun_Rabs || dup || 3.86707739566e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_Even || bit1 || 3.85661092512e-10
Coq_ZArith_BinInt_Z_log2_up || code_nat_of_integer || 3.8500552441e-10
Coq_Numbers_Natural_BigN_BigN_BigN_Even || bit1 || 3.84649130063e-10
Coq_Reals_Raxioms_IZR || bit1 || 3.76005960678e-10
Coq_Reals_Rbasic_fun_Rabs || code_dup || 3.6655694874e-10
Coq_Sets_Ensembles_In || member || 3.40844467817e-10
Coq_Sets_Ensembles_Strict_Included || list_ex1 || 3.24706457485e-10
Coq_Reals_Rdefinitions_Rinv || sqr || 3.18969639724e-10
Coq_Numbers_Cyclic_Int31_Cyclic31_int31_ops || less_than || 3.17194541555e-10
Coq_ZArith_Zlogarithm_log_sup || nat2 || 3.09908955007e-10
Coq_Numbers_Cyclic_DoubleCyclic_DoubleCyclic_mk_zn2z_ops_karatsuba || lexord || 3.03237269824e-10
Coq_Numbers_Cyclic_DoubleCyclic_DoubleCyclic_mk_zn2z_ops || lexord || 3.03237269824e-10
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibble0 || 2.87531103836e-10
Coq_Numbers_Cyclic_DoubleCyclic_DoubleType_zn2z_0 || set || 2.80504302686e-10
Coq_Sets_Ensembles_Union_0 || append || 2.74544981041e-10
Coq_Numbers_Cyclic_DoubleCyclic_DoubleCyclic_mk_zn2z_ops_karatsuba || min_ext || 2.73872548065e-10
Coq_Numbers_Cyclic_DoubleCyclic_DoubleCyclic_mk_zn2z_ops || min_ext || 2.73872548065e-10
Coq_Numbers_Cyclic_DoubleCyclic_DoubleCyclic_mk_zn2z_ops_karatsuba || lex || 2.61386054164e-10
Coq_Numbers_Cyclic_DoubleCyclic_DoubleCyclic_mk_zn2z_ops || lex || 2.61386054164e-10
Coq_Sets_Ensembles_Union_0 || splice || 2.5746211581e-10
Coq_Sets_Ensembles_Strict_Included || list_ex || 2.56761207803e-10
Coq_Numbers_Cyclic_Int31_Int31_int31_0 || nat || 2.54711601249e-10
Coq_Numbers_Natural_BigN_BigN_BigN_w5_op || less_than || 2.50418125868e-10
Coq_Numbers_Natural_BigN_BigN_BigN_w4_op || less_than || 2.50418125868e-10
Coq_Numbers_Natural_BigN_BigN_BigN_w3_op || less_than || 2.50418125868e-10
Coq_Numbers_Natural_BigN_BigN_BigN_w2_op || less_than || 2.50418125868e-10
Coq_Numbers_Natural_BigN_BigN_BigN_w1_op || less_than || 2.50418125868e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt_up || finite_psubset || 2.48432920805e-10
Coq_Numbers_Natural_BigN_BigN_BigN_w6_op || less_than || 2.42127910872e-10
Coq_Numbers_Cyclic_Int31_Cyclic31_int31_ops || pred_nat || 2.39080409311e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_log2_up || finite_psubset || 2.3820584789e-10
Coq_QArith_Qcanon_Qcopp || suc || 2.37451111938e-10
Coq_QArith_QArith_base_Qopp || bit0 || 2.3654778103e-10
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibble1 || 2.30282114162e-10
Coq_QArith_Qreals_Q2R || inc || 2.1913244443e-10
Coq_Sets_Ensembles_Add || cons || 2.18888107114e-10
Coq_Numbers_Natural_BigN_BigN_BigN_w5_op || pred_nat || 2.09676623126e-10
Coq_Numbers_Natural_BigN_BigN_BigN_w4_op || pred_nat || 2.09676623126e-10
Coq_Numbers_Natural_BigN_BigN_BigN_w3_op || pred_nat || 2.09676623126e-10
Coq_Numbers_Natural_BigN_BigN_BigN_w2_op || pred_nat || 2.09676623126e-10
Coq_Numbers_Natural_BigN_BigN_BigN_w1_op || pred_nat || 2.09676623126e-10
Coq_Numbers_Rational_BigQ_BigQ_BigQ_red || inc || 2.09262383402e-10
Coq_Numbers_Cyclic_DoubleCyclic_DoubleCyclic_mk_zn2z_ops_karatsuba || max_ext || 2.06009017602e-10
Coq_Numbers_Cyclic_DoubleCyclic_DoubleCyclic_mk_zn2z_ops || max_ext || 2.06009017602e-10
Coq_Numbers_Natural_BigN_BigN_BigN_w6_op || pred_nat || 2.04915538523e-10
Coq_Reals_Rtrigo_def_exp || bitM || 2.03449487027e-10
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Qc || nat_of_num || 1.99963588601e-10
Coq_Reals_Rdefinitions_R1 || code_integer_of_num || 1.93333024424e-10
Coq_QArith_Qreduction_Qred || suc || 1.89498659424e-10
Coq_Numbers_Natural_Binary_NBinary_N_div2 || suc || 1.8930772738e-10
Coq_Structures_OrdersEx_N_as_OT_div2 || suc || 1.8930772738e-10
Coq_Structures_OrdersEx_N_as_DT_div2 || suc || 1.8930772738e-10
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibbleA || 1.87131815455e-10
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibbleB || 1.83913292043e-10
Coq_QArith_QArith_base_Qopp || bit1 || 1.81906006919e-10
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibble8 || 1.81126069895e-10
Coq_Numbers_Rational_BigQ_BigQ_BigQ_red || code_Suc || 1.80181574485e-10
Coq_Numbers_Natural_BigN_BigN_BigN_dom_op || finite_psubset || 1.78222362028e-10
Coq_Reals_Raxioms_IZR || neg || 1.7751257646e-10
Coq_Reals_Raxioms_IZR || code_Neg || 1.75570242861e-10
Coq_Reals_Raxioms_IZR || pos || 1.74812333113e-10
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || one2 || 1.74215946659e-10
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibbleC || 1.72761946319e-10
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibbleD || 1.71141036241e-10
Coq_Reals_Raxioms_IZR || code_Pos || 1.70735687298e-10
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Qc || code_nat_of_natural || 1.69626309279e-10
Coq_Reals_Raxioms_IZR || bitM || 1.68222679454e-10
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibbleF || 1.66999924194e-10
__constr_Coq_Numbers_BinNums_positive_0_1 || nat2 || 1.64752790507e-10
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibble3 || 1.63651383482e-10
Coq_Reals_Rtrigo_def_cos || nat_of_nibble || 1.62869574716e-10
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibble9 || 1.60857131718e-10
Coq_Numbers_Natural_BigN_BigN_BigN_w5 || nat || 1.60505945232e-10
Coq_Numbers_Natural_BigN_BigN_BigN_w4 || nat || 1.60505945232e-10
Coq_Numbers_Natural_BigN_BigN_BigN_w3 || nat || 1.60505945232e-10
Coq_Numbers_Natural_BigN_BigN_BigN_w2 || nat || 1.60505945232e-10
Coq_Numbers_Natural_BigN_BigN_BigN_w1 || nat || 1.60505945232e-10
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibble5 || 1.6002179444e-10
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibble2 || 1.57747479979e-10
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibble4 || 1.57056277274e-10
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibble7 || 1.56394225655e-10
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibbleE || 1.56394225655e-10
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nibble6 || 1.55759161835e-10
Coq_Reals_Rtrigo_def_cos || product_size_unit || 1.48351173999e-10
Coq_Numbers_Cyclic_Int31_Cyclic31_int31_ops || bNF_Ca1495478003natLeq || 1.42712799982e-10
Coq_Reals_Rtrigo_def_cos || size_num || 1.4029369561e-10
Coq_Numbers_Cyclic_Abstract_CyclicAxioms_ZnZ_Specs_0 || asym || 1.27689150696e-10
Coq_Reals_Rdefinitions_Rinv || bit1 || 1.21643340794e-10
Coq_Numbers_Natural_BigN_BigN_BigN_w6 || nat || 1.16819578912e-10
Coq_Numbers_Cyclic_Abstract_CyclicAxioms_ZnZ_Specs_0 || irrefl || 1.16237759812e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt_up || int_ge_less_than2 || 1.1229850464e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt_up || int_ge_less_than || 1.1229850464e-10
Coq_Numbers_Cyclic_Int31_Cyclic31_Int31Cyclic_ops || less_than || 1.10031710254e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt || int_ge_less_than2 || 1.09663677241e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt || int_ge_less_than || 1.09663677241e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_max || id_on || 1.09143997798e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_log2_up || int_ge_less_than2 || 1.07363969998e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_log2_up || int_ge_less_than || 1.07363969998e-10
Coq_Numbers_Cyclic_Int31_Cyclic31_Int31Cyclic_t || nat || 1.05783193328e-10
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt || set || 1.03520831983e-10
Coq_Reals_Rtrigo_def_cos || pred_numeral || 9.95570990004e-11
Coq_Numbers_Integer_BigZ_BigZ_BigZ_log2 || set || 9.78808925783e-11
Coq_Numbers_Integer_BigZ_BigZ_BigZ_log2 || int_ge_less_than2 || 9.55949895516e-11
Coq_Numbers_Integer_BigZ_BigZ_BigZ_log2 || int_ge_less_than || 9.55949895516e-11
Coq_Numbers_Integer_BigZ_BigZ_BigZ_abs || int_ge_less_than2 || 9.33837228528e-11
Coq_Numbers_Integer_BigZ_BigZ_BigZ_abs || int_ge_less_than || 9.33837228528e-11
Coq_PArith_BinPos_Pos_pred_double || pos || 8.95567544863e-11
Coq_Numbers_Cyclic_Int31_Cyclic31_Int31Cyclic_ops || pred_nat || 8.90632154944e-11
Coq_Numbers_Natural_BigN_BigN_BigN_w5_op || bNF_Ca1495478003natLeq || 8.60244356827e-11
Coq_Numbers_Natural_BigN_BigN_BigN_w4_op || bNF_Ca1495478003natLeq || 8.60244356827e-11
Coq_Numbers_Natural_BigN_BigN_BigN_w3_op || bNF_Ca1495478003natLeq || 8.60244356827e-11
Coq_Numbers_Natural_BigN_BigN_BigN_w2_op || bNF_Ca1495478003natLeq || 8.60244356827e-11
Coq_Numbers_Natural_BigN_BigN_BigN_w1_op || bNF_Ca1495478003natLeq || 8.60244356827e-11
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || product_Unity || 8.49610522063e-11
Coq_Numbers_Cyclic_Abstract_CyclicAxioms_ZnZ_Specs_0 || antisym || 8.06825814698e-11
Coq_Numbers_Natural_BigN_BigN_BigN_w6_op || bNF_Ca1495478003natLeq || 7.65496364218e-11
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || bNF_Wellorder_wo_rel || 7.6543919972e-11
Coq_PArith_POrderedType_Positive_as_DT_pred_double || code_nat_of_integer || 7.60203253827e-11
Coq_PArith_POrderedType_Positive_as_OT_pred_double || code_nat_of_integer || 7.60203253827e-11
Coq_Structures_OrdersEx_Positive_as_DT_pred_double || code_nat_of_integer || 7.60203253827e-11
Coq_Structures_OrdersEx_Positive_as_OT_pred_double || code_nat_of_integer || 7.60203253827e-11
Coq_Reals_Rdefinitions_Ropp || one_one || 7.54203525089e-11
Coq_Sets_Finite_sets_Finite_0 || null || 7.41072155655e-11
Coq_romega_ReflOmegaCore_ZOmega_prop_stable || nat3 || 7.36486813135e-11
Coq_Numbers_Natural_BigN_BigN_BigN_dom_t || set || 7.34516174688e-11
Coq_Numbers_Cyclic_Abstract_CyclicAxioms_ZnZ_Specs_0 || bNF_Ca829732799finite || 7.29135699823e-11
Coq_Reals_Rdefinitions_Ropp || bit1 || 7.23029379224e-11
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || bNF_Wellorder_wo_rel || 7.11130831859e-11
Coq_Sets_Ensembles_Empty_set_0 || empty || 7.093779363e-11
Coq_Numbers_Integer_BigZ_BigZ_BigZ_max || measure || 7.05025425025e-11
Coq_PArith_BinPos_Pos_pred_double || code_nat_of_integer || 6.78044588225e-11
Coq_Sets_Finite_sets_Finite_0 || distinct || 6.39831713165e-11
Coq_Numbers_Integer_BigZ_BigZ_BigZ_max || measures || 6.20410925852e-11
Coq_Reals_Rtrigo_def_cosh || numeral_numeral || 6.02839543766e-11
Coq_QArith_QArith_base_inject_Z || bitM || 5.99068495054e-11
Coq_NArith_Ndigits_Nodd || nat_list || 5.94296251385e-11
Coq_Reals_Ranalysis1_derivable_pt_lim || ord_less || 5.9236166708e-11
Coq_Numbers_Integer_BigZ_BigZ_BigZ_max || transitive_trancl || 5.87171575837e-11
Coq_NArith_Ndigits_Neven || nat_list || 5.84899806213e-11
Coq_Numbers_Integer_BigZ_BigZ_BigZ_max || transitive_rtrancl || 5.6343955792e-11
Coq_Reals_Rdefinitions_Rmult || pow || 5.53837741653e-11
Coq_Reals_Rtrigo_def_cos || suc || 5.50193237755e-11
Coq_Reals_Rtrigo_def_cos || nat_of_num || 5.4514134511e-11
Coq_Numbers_Natural_Binary_NBinary_N_le || antisym || 5.29817298924e-11
Coq_Structures_OrdersEx_N_as_OT_le || antisym || 5.29817298924e-11
Coq_Structures_OrdersEx_N_as_DT_le || antisym || 5.29817298924e-11
Coq_Reals_Rtrigo_def_exp || numeral_numeral || 5.28086930815e-11
Coq_Sets_Ensembles_Intersection_0 || removeAll || 5.27305854519e-11
Coq_NArith_BinNat_N_le || antisym || 5.21536242924e-11
__constr_Coq_Numbers_BinNums_positive_0_2 || nat_of_num || 5.15250226118e-11
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lcm || upto || 4.93270723974e-11
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || ii || 4.91513972719e-11
Coq_Reals_Rbasic_fun_Rabs || bit1 || 4.75717788571e-11
Coq_Reals_Rtrigo_def_cos || numeral_numeral || 4.63556366264e-11
Coq_Numbers_Integer_BigZ_BigZ_BigZ_gcd || upto || 4.59536993478e-11
Coq_NArith_BinNat_N_div2 || return_list || 4.4949357042e-11
Coq_Reals_Rtrigo_def_cos || re || 4.48715546797e-11
Coq_Numbers_Natural_Binary_NBinary_N_le || sym || 4.19484635252e-11
Coq_Structures_OrdersEx_N_as_OT_le || sym || 4.19484635252e-11
Coq_Structures_OrdersEx_N_as_DT_le || sym || 4.19484635252e-11
Coq_NArith_BinNat_N_le || sym || 4.12326303398e-11
Coq_Sets_Ensembles_Intersection_0 || filter2 || 3.87353951099e-11
Coq_Numbers_Cyclic_Int31_Cyclic31_Int31Cyclic_ops || bNF_Ca1495478003natLeq || 3.82111862824e-11
Coq_PArith_BinPos_Pos_of_nat || nat_of_num || 3.60917870042e-11
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || sym || 3.46429038134e-11
Coq_ZArith_BinInt_Z_double || inc || 3.41598514483e-11
Coq_ZArith_BinInt_Z_succ_double || inc || 3.41368093428e-11
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || sym || 3.39742958967e-11
__constr_Coq_MMaps_MMapPositive_PositiveMap_tree_0_1 || nil || 3.39067894733e-11
Coq_Numbers_Natural_BigN_BigN_BigN_two || bNF_Ca1495478003natLeq || 3.29070684378e-11
Coq_romega_ReflOmegaCore_ZOmega_p_invert || suc_Rep || 3.27003182011e-11
Coq_romega_ReflOmegaCore_ZOmega_p_apply_right || suc_Rep || 3.27003182011e-11
Coq_romega_ReflOmegaCore_ZOmega_p_apply_left || suc_Rep || 3.27003182011e-11
Coq_Numbers_Cyclic_Int31_Int31_twice || suc || 3.19308237407e-11
Coq_Reals_Rdefinitions_R1 || real || 3.19252639119e-11
Coq_Numbers_Cyclic_Int31_Int31_twice_plus_one || suc || 3.10541655885e-11
Coq_Numbers_Cyclic_Int31_Int31_phi || code_i1730018169atural || 3.09592274819e-11
Coq_Sets_Ensembles_Included || contained || 2.75766700063e-11
Coq_Reals_Rdefinitions_Rinv || bitM || 2.72794904826e-11
Coq_ZArith_BinInt_Z_double || code_Suc || 2.67570933847e-11
Coq_ZArith_BinInt_Z_succ_double || code_Suc || 2.67350178933e-11
Coq_PArith_BinPos_Pos_pred || nat2 || 2.63168985643e-11
Coq_Init_Datatypes_IDProp || induct_true || 2.54122260471e-11
Coq_Classes_Morphisms_normalization_done_0 || induct_true || 2.54122260471e-11
Coq_Classes_Morphisms_PartialApplication_0 || induct_true || 2.54122260471e-11
Coq_Classes_Morphisms_apply_subrelation_0 || induct_true || 2.54122260471e-11
Coq_Classes_CMorphisms_normalization_done_0 || induct_true || 2.54122260471e-11
Coq_Classes_CMorphisms_PartialApplication_0 || induct_true || 2.54122260471e-11
Coq_Classes_CMorphisms_apply_subrelation_0 || induct_true || 2.54122260471e-11
Coq_NArith_BinNat_N_succ_double || embed_list || 2.52360230241e-11
Coq_Numbers_Natural_BigN_BigN_BigN_two || less_than || 2.45676701566e-11
Coq_NArith_BinNat_N_double || embed_list || 2.41263054992e-11
Coq_ZArith_BinInt_Z_of_nat || code_integer_of_int || 2.32484572438e-11
Coq_Numbers_Cyclic_Int31_Int31_tail031 || code_natural_of_nat || 2.12420811972e-11
Coq_Numbers_Cyclic_Int31_Int31_head031 || code_natural_of_nat || 2.12420811972e-11
Coq_Reals_Rtrigo_def_cos || one_one || 2.10486567313e-11
Coq_MMaps_MMapPositive_PositiveMap_find || find || 2.09775586608e-11
Coq_romega_ReflOmegaCore_ZOmega_move_right || rep_Nat || 1.99248839067e-11
Coq_romega_ReflOmegaCore_ZOmega_p_rewrite || rep_Nat || 1.98439168144e-11
Coq_Sets_Ensembles_In || member2 || 1.8339421542e-11
Coq_Numbers_Natural_BigN_BigN_BigN_lt || trans || 1.83007539318e-11
Coq_Sets_Ensembles_Add || sublist || 1.79695981258e-11
Coq_Numbers_Cyclic_Int31_Int31_size || int || 1.76374016411e-11
Coq_Sets_Partial_Order_Strict_Rel_of || transitive_tranclp || 1.75992532817e-11
Coq_Numbers_Natural_BigN_BigN_BigN_lt || wf || 1.68792882973e-11
Coq_Numbers_Cyclic_Int31_Cyclic31_tail031_alt || semiring_1_of_nat || 1.63331735676e-11
Coq_Numbers_Cyclic_Int31_Cyclic31_head031_alt || semiring_1_of_nat || 1.63331735676e-11
Coq_Reals_Rdefinitions_Rle || wf || 1.60773980848e-11
Coq_Numbers_Natural_Binary_NBinary_N_lt || antisym || 1.57297947137e-11
Coq_Structures_OrdersEx_N_as_OT_lt || antisym || 1.57297947137e-11
Coq_Structures_OrdersEx_N_as_DT_lt || antisym || 1.57297947137e-11
Coq_Numbers_Natural_Binary_NBinary_N_lt || sym || 1.56485169883e-11
Coq_Structures_OrdersEx_N_as_OT_lt || sym || 1.56485169883e-11
Coq_Structures_OrdersEx_N_as_DT_lt || sym || 1.56485169883e-11
Coq_NArith_BinNat_N_lt || antisym || 1.55049666469e-11
__constr_Coq_Init_Datatypes_option_0_2 || none || 1.54846930873e-11
Coq_NArith_BinNat_N_lt || sym || 1.54251906442e-11
Coq_Numbers_Natural_Binary_NBinary_N_lt || trans || 1.46247319303e-11
Coq_Structures_OrdersEx_N_as_OT_lt || trans || 1.46247319303e-11
Coq_Structures_OrdersEx_N_as_DT_lt || trans || 1.46247319303e-11
Coq_NArith_BinNat_N_lt || trans || 1.44200232404e-11
Coq_Reals_Rdefinitions_Ropp || pos || 1.44140112627e-11
Coq_Reals_Rdefinitions_Ropp || code_Pos || 1.42503036461e-11
Coq_Sets_Partial_Order_Rel_of || transitive_rtranclp || 1.41884065563e-11
Coq_Relations_Relation_Definitions_reflexive || reflp || 1.36201998311e-11
Coq_Numbers_Natural_BigN_BigN_BigN_two || pred_nat || 1.28891636896e-11
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || code_integer || 1.27798037388e-11
Coq_Sets_Ensembles_Add || join || 1.21221208525e-11
Coq_Sets_Ensembles_Add || insert2 || 1.18112074701e-11
Coq_Relations_Relation_Definitions_order_0 || equiv_equivp || 1.17405246446e-11
Coq_Numbers_BinNums_positive_0 || num || 1.1081777382e-11
Coq_Reals_Rdefinitions_R0 || int || 1.106115243e-11
Coq_QArith_Qcanon_Qcinv || suc || 1.05330859618e-11
Coq_Numbers_Integer_BigZ_BigZ_BigZ_max || remdups || 1.04626855483e-11
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || wf || 1.04376759673e-11
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || int || 1.01968990681e-11
Coq_Relations_Relation_Definitions_transitive || symp || 1.01289788013e-11
Coq_Numbers_Natural_BigN_BigN_BigN_lt || antisym || 9.65447866464e-12
Coq_Relations_Relation_Definitions_equivalence_0 || equiv_equivp || 8.95629827858e-12
Coq_Numbers_Natural_BigN_BigN_BigN_lt || bNF_Ca829732799finite || 8.86657072663e-12
Coq_Numbers_Integer_BigZ_BigZ_BigZ_succ || nil || 8.46094502306e-12
Coq_Reals_Rtrigo_def_cos || code_integer_of_num || 7.69268139463e-12
Coq_Relations_Relation_Definitions_antisymmetric || transp || 7.21417237136e-12
Coq_QArith_Qreals_Q2R || bitM || 6.96638743503e-12
Coq_MMaps_MMapPositive_PositiveMap_empty || nil || 6.78240780188e-12
Coq_MMaps_MMapPositive_PositiveMap_remove || removeAll || 6.69141615074e-12
Coq_Reals_Rdefinitions_R0 || nat || 6.39555367583e-12
Coq_Numbers_Rational_BigQ_BigQ_BigQ_inv_norm || inc || 6.12015037132e-12
Coq_Reals_Rtrigo_def_cosh || suc || 5.81230592627e-12
Coq_MMaps_MMapPositive_PositiveMap_remove || dropWhile || 5.74169587236e-12
Coq_MMaps_MMapPositive_PositiveMap_remove || remove1 || 5.68583958078e-12
Coq_Relations_Relation_Definitions_symmetric || transp || 5.52429598167e-12
Coq_Reals_Rtrigo_def_sinh || suc || 5.47829698259e-12
Coq_Reals_RIneq_nonneg || int_ge_less_than2 || 5.44664098608e-12
Coq_Reals_Rsqrt_def_Rsqrt || int_ge_less_than2 || 5.44664098608e-12
Coq_Reals_RIneq_nonneg || int_ge_less_than || 5.44664098608e-12
Coq_Reals_Rsqrt_def_Rsqrt || int_ge_less_than || 5.44664098608e-12
Coq_MMaps_MMapPositive_PositiveMap_remove || takeWhile || 5.40547144749e-12
Coq_Sorting_Sorted_Sorted_0 || ord_less || 5.31210255128e-12
Coq_Lists_SetoidList_NoDupA_0 || ord_less || 5.25963936676e-12
Coq_Numbers_Rational_BigQ_BigQ_BigQ_inv_norm || code_Suc || 4.99979966651e-12
Coq_Numbers_Rational_BigQ_BigQ_BigQ_inv || inc || 4.89313161488e-12
Coq_MMaps_MMapPositive_PositiveMap_remove || drop || 4.88034764795e-12
Coq_Reals_Rtrigo_def_cosh || nat || 4.79037449185e-12
Coq_Reals_Rdefinitions_R1 || code_integer || 4.78798135361e-12
Coq_MSets_MSetPositive_PositiveSet_elements || bit1 || 4.68073709857e-12
Coq_MMaps_MMapPositive_PositiveMap_remove || take || 4.65961994131e-12
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || inc || 4.58384073713e-12
Coq_Reals_Rtrigo_def_sinh || nat || 4.5749910063e-12
Coq_FSets_FSetPositive_PositiveSet_elements || bit1 || 4.51732320952e-12
Coq_MMaps_MMapPositive_PositiveMap_remove || filter2 || 4.49165636605e-12
Coq_Numbers_Natural_BigN_BigN_BigN_zero || nat || 4.33194379751e-12
Coq_Sets_Finite_sets_Finite_0 || null2 || 4.24099585693e-12
Coq_FSets_FMapPositive_PositiveMap_find || find || 4.17429822849e-12
Coq_Reals_Rdefinitions_R1 || less_than || 4.07026667223e-12
Coq_Numbers_Rational_BigQ_BigQ_BigQ_inv || code_Suc || 4.03117273661e-12
Coq_Relations_Relation_Definitions_transitive || semilattice_axioms || 3.9526229593e-12
Coq_Reals_Rdefinitions_R1 || bNF_Ca1495478003natLeq || 3.90092018656e-12
Coq_Numbers_Rational_BigQ_BigQ_BigQ_opp || bit1 || 3.72244686117e-12
Coq_FSets_FMapPositive_PositiveMap_empty || nil || 3.6243874454e-12
Coq_Reals_Rdefinitions_Rlt || wf || 3.5910415927e-12
Coq_MSets_MSetPositive_PositiveSet_elements || bit0 || 3.57950074163e-12
Coq_FSets_FSetPositive_PositiveSet_E_lt || one2 || 3.56878943276e-12
Coq_MSets_MSetPositive_PositiveSet_E_lt || one2 || 3.51495113292e-12
Coq_FSets_FSetPositive_PositiveSet_elements || bit0 || 3.48193136731e-12
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || bitM || 3.41562615684e-12
Coq_Reals_Rtrigo_def_cos || im || 3.41312405512e-12
Coq_romega_ReflOmegaCore_ZOmega_valid1 || nat3 || 3.27403533693e-12
Coq_MSets_MSetPositive_PositiveSet_E_eq || one2 || 3.22909844454e-12
Coq_Reals_AltSeries_PI_tg || int_ge_less_than2 || 3.13712637216e-12
Coq_Reals_AltSeries_PI_tg || int_ge_less_than || 3.13712637216e-12
Coq_FSets_FSetPositive_PositiveSet_E_eq || one2 || 3.12571087561e-12
Coq_Reals_Rdefinitions_Ropp || cnj || 2.92479346363e-12
Coq_Sets_Ensembles_Singleton_0 || remdups || 2.65055731855e-12
Coq_Reals_Rdefinitions_Rle || trans || 2.51139462031e-12
Coq_Reals_Rdefinitions_R0 || code_integer_of_num || 2.4946284826e-12
Coq_Relations_Relation_Definitions_PER_0 || semilattice || 2.47377190862e-12
Coq_Reals_Rdefinitions_R1 || pred_nat || 2.42670424015e-12
Coq_Numbers_Rational_BigQ_BigQ_BigQ_opp || bit0 || 2.35245646675e-12
Coq_Relations_Relation_Definitions_preorder_0 || semilattice || 2.16691193207e-12
Coq_Reals_Rtrigo1_PI2 || code_integer || 1.95447084069e-12
Coq_Reals_Raxioms_INR || int_ge_less_than2 || 1.87068810802e-12
Coq_Reals_Raxioms_INR || int_ge_less_than || 1.87068810802e-12
Coq_Reals_R_sqrt_sqrt || int_ge_less_than2 || 1.83197868819e-12
Coq_Reals_R_sqrt_sqrt || int_ge_less_than || 1.83197868819e-12
Coq_Reals_Rbasic_fun_Rmax || measure || 1.78927285541e-12
Coq_Reals_RIneq_Rsqr || int_ge_less_than2 || 1.76190470293e-12
Coq_Reals_RIneq_Rsqr || int_ge_less_than || 1.76190470293e-12
Coq_Reals_Rbasic_fun_Rabs || int_ge_less_than2 || 1.66478295477e-12
Coq_Reals_Rbasic_fun_Rabs || int_ge_less_than || 1.66478295477e-12
Coq_Reals_Rtrigo_def_exp || inc || 1.58122243051e-12
Coq_Reals_Rbasic_fun_Rmax || measures || 1.566158443e-12
Coq_Relations_Relation_Definitions_transitive || equiv_part_equivp || 1.54971755621e-12
Coq_Reals_Rdefinitions_Rlt || trans || 1.54493459475e-12
Coq_Relations_Relation_Definitions_reflexive || equiv_part_equivp || 1.53204526183e-12
Coq_Reals_Rdefinitions_R0 || product_Unity || 1.4782439573e-12
Coq_Reals_RIneq_pos || int_ge_less_than2 || 1.4151697436e-12
Coq_Reals_RIneq_pos || int_ge_less_than || 1.4151697436e-12
Coq_Relations_Relation_Definitions_preorder_0 || equiv_equivp || 1.40087222083e-12
Coq_Relations_Relation_Definitions_symmetric || abel_semigroup || 1.37611548113e-12
Coq_Reals_Rtrigo_def_exp || int_ge_less_than2 || 1.36027739743e-12
Coq_Reals_Rtrigo_def_exp || int_ge_less_than || 1.36027739743e-12
Coq_Relations_Relation_Definitions_transitive || reflp || 1.34302733929e-12
Coq_Relations_Relation_Definitions_reflexive || abel_semigroup || 1.34125322086e-12
Coq_Reals_Rgeom_yr || product_case_unit || 1.14768226484e-12
Coq_Reals_Rgeom_yr || product_rec_unit || 1.14768226484e-12
Coq_Relations_Relation_Definitions_order_0 || semilattice || 1.04608079251e-12
Coq_Relations_Relation_Definitions_transitive || abel_s1917375468axioms || 1.02913195669e-12
Coq_PArith_POrderedType_Positive_as_DT_pred_double || pos || 1.00965912168e-12
Coq_PArith_POrderedType_Positive_as_OT_pred_double || pos || 1.00965912168e-12
Coq_Structures_OrdersEx_Positive_as_DT_pred_double || pos || 1.00965912168e-12
Coq_Structures_OrdersEx_Positive_as_OT_pred_double || pos || 1.00965912168e-12
Coq_Relations_Relation_Definitions_equivalence_0 || semilattice || 1.00871112256e-12
Coq_Numbers_Natural_BigN_BigN_BigN_le || trans || 9.62721077759e-13
Coq_Relations_Relation_Definitions_antisymmetric || equiv_part_equivp || 9.43488063597e-13
Coq_romega_ReflOmegaCore_ZOmega_extract_hyp_pos || rep_Nat || 8.82156868133e-13
Coq_Numbers_Natural_BigN_BigN_BigN_one || bNF_Ca1495478003natLeq || 8.81450174553e-13
Coq_Reals_Rbasic_fun_Rmax || transitive_trancl || 8.72149231252e-13
Coq_Reals_R_sqrt_sqrt || inc || 8.3004985653e-13
Coq_Numbers_Natural_BigN_BigN_BigN_one || less_than || 8.20893944324e-13
Coq_Relations_Relation_Definitions_antisymmetric || reflp || 8.04021550474e-13
Coq_Reals_Rdefinitions_Rinv || bit0 || 7.94619326012e-13
Coq_Reals_Rdefinitions_Rlt || antisym || 7.65431931152e-13
Coq_Numbers_Cyclic_Int31_Int31_twice_plus_one || inc || 7.29184523451e-13
Coq_Reals_Rdefinitions_Rlt || bNF_Ca829732799finite || 7.13707564388e-13
Coq_Reals_Rdefinitions_Rle || antisym || 7.02444578239e-13
Coq_Numbers_Natural_BigN_BigN_BigN_le || wf || 7.00960412262e-13
Coq_Numbers_Cyclic_Int31_Int31_twice_plus_one || code_Suc || 7.00922874108e-13
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || bNF_Ca1495478003natLeq || 6.95552544746e-13
Coq_Numbers_Cyclic_Int31_Int31_incr || nat_of_num || 6.86729437283e-13
Coq_Init_Nat_pred || inc || 6.82398983405e-13
Coq_Relations_Relation_Definitions_symmetric || equiv_part_equivp || 6.67650213612e-13
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || less_than || 6.21779552745e-13
Coq_PArith_POrderedType_Positive_as_DT_succ || nat2 || 6.21336988928e-13
Coq_PArith_POrderedType_Positive_as_OT_succ || nat2 || 6.21336988928e-13
Coq_Structures_OrdersEx_Positive_as_DT_succ || nat2 || 6.21336988928e-13
Coq_Structures_OrdersEx_Positive_as_OT_succ || nat2 || 6.21336988928e-13
Coq_Numbers_Cyclic_Int31_Int31_incr || code_nat_of_natural || 6.04190130764e-13
Coq_Relations_Relation_Operators_clos_trans_0 || transitive_tranclp || 5.96481590169e-13
Coq_Relations_Relation_Definitions_symmetric || reflp || 5.76453255251e-13
Coq_Relations_Relation_Operators_clos_refl_trans_0 || transitive_rtranclp || 5.61713012931e-13
Coq_Relations_Relation_Definitions_PER_0 || abel_semigroup || 5.43500575049e-13
Coq_Reals_RIneq_Rsqr || bit0 || 5.19748364267e-13
Coq_Numbers_Natural_BigN_BigN_BigN_le || antisym || 5.11928655682e-13
Coq_Reals_Rdefinitions_Rle || bNF_Ca829732799finite || 5.06843059309e-13
Coq_Reals_R_sqrt_sqrt || nat || 5.06110645873e-13
Coq_Relations_Relation_Definitions_preorder_0 || abel_semigroup || 4.83724473418e-13
Coq_Relations_Relation_Definitions_transitive || abel_semigroup || 4.77597170487e-13
Coq_Numbers_Natural_BigN_BigN_BigN_succ || id2 || 4.75471452685e-13
Coq_PArith_BinPos_Pos_pred || suc || 4.69768968907e-13
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || product_unit || 4.56837108793e-13
Coq_Relations_Relation_Definitions_reflexive || semilattice_axioms || 4.5518028372e-13
Coq_Relations_Relation_Definitions_transitive || lattic35693393ce_set || 4.48211244484e-13
Coq_Numbers_Natural_BigN_BigN_BigN_le || bNF_Ca829732799finite || 4.37030867552e-13
Coq_Numbers_Natural_BigN_BigN_BigN_one || pred_nat || 4.23783261775e-13
Coq_Numbers_Natural_BigN_BigN_BigN_zero || int || 4.22918322402e-13
Coq_Numbers_Natural_BigN_BigN_BigN_succ || int_ge_less_than2 || 3.92709181966e-13
Coq_Numbers_Natural_BigN_BigN_BigN_succ || int_ge_less_than || 3.92709181966e-13
Coq_Relations_Relation_Definitions_symmetric || semilattice_axioms || 3.89200212905e-13
Coq_Numbers_Cyclic_Int31_Int31_positive_to_int31 || bitM || 3.86015568977e-13
Coq_Relations_Relation_Definitions_symmetric || semigroup || 3.67380948251e-13
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || pred_nat || 3.66252076005e-13
Coq_Reals_Rtrigo1_PI2 || product_unit || 3.63317422123e-13
Coq_FSets_FMapPositive_PositiveMap_Empty || null || 3.62641364407e-13
Coq_Relations_Relation_Definitions_reflexive || semigroup || 3.56702572194e-13
Coq_Relations_Relation_Definitions_PER_0 || equiv_equivp || 3.49700588084e-13
Coq_Reals_Rtrigo1_tan || numeral_numeral || 3.33116950577e-13
Coq_Reals_Ranalysis1_continuity_pt || trans || 3.16227967286e-13
Coq_Reals_Rbasic_fun_Rabs || id2 || 3.13532833851e-13
Coq_Reals_Rbasic_fun_Rmax || id_on || 3.07099806852e-13
Coq_Reals_Rtrigo_def_sin || numeral_numeral || 2.99959130553e-13
Coq_Relations_Relation_Definitions_reflexive || lattic35693393ce_set || 2.82757260398e-13
Coq_Numbers_Cyclic_Int31_Int31_int31_0 || one2 || 2.44868941123e-13
Coq_Relations_Relation_Definitions_symmetric || lattic35693393ce_set || 2.39892059374e-13
Coq_Reals_Rpower_ln || default_default || 2.28444072462e-13
Coq_Reals_Ranalysis1_continuity_pt || wf || 2.2757182406e-13
Coq_Numbers_Natural_BigN_BigN_BigN_le || transitive_acyclic || 2.25645459995e-13
Coq_Init_Datatypes_snd || plus_plus || 2.20623078179e-13
Coq_Numbers_BinNums_N_0 || num || 2.19397124636e-13
Coq_Reals_Rtrigo1_tan || default_default || 2.10992963742e-13
Coq_Relations_Relation_Definitions_equivalence_0 || abel_semigroup || 1.91667276038e-13
Coq_FSets_FMapPositive_PositiveMap_Empty || distinct || 1.91571608115e-13
Coq_Reals_Rpower_ln || numeral_numeral || 1.90653842916e-13
Coq_Relations_Relation_Definitions_order_0 || abel_semigroup || 1.85087701934e-13
Coq_Numbers_Cyclic_Int31_Int31_phi_inv_positive || bit1 || 1.84591071283e-13
Coq_Numbers_Natural_BigN_BigN_BigN_gcd || upt || 1.84131993786e-13
Coq_Numbers_Cyclic_Int31_Int31_phi_inv_positive || bit0 || 1.77378699631e-13
Coq_Reals_Rdefinitions_R1 || product_unit || 1.75406309052e-13
Coq_Reals_Ranalysis1_continuity_pt || antisym || 1.66713012049e-13
Coq_Reals_Rbasic_fun_Rmax || transitive_rtrancl || 1.65027702932e-13
Coq_Reals_Rtrigo_def_cos || default_default || 1.63354154715e-13
Coq_Reals_Rbasic_fun_Rabs || re || 1.60882250696e-13
Coq_Reals_Rtrigo_def_sin || default_default || 1.56128036334e-13
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || null || 1.54215428501e-13
Coq_Numbers_Cyclic_Int31_Int31_positive_to_int31 || bit0 || 1.53630348708e-13
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || null || 1.4831920586e-13
Coq_Reals_Ranalysis1_continuity_pt || bNF_Ca829732799finite || 1.44517335154e-13
Coq_Relations_Relation_Definitions_antisymmetric || semilattice_axioms || 1.34097606701e-13
Coq_Reals_Rdefinitions_Rle || transitive_acyclic || 1.12843101406e-13
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || distinct || 1.12275903173e-13
Coq_Relations_Relation_Definitions_transitive || semigroup || 1.11383099247e-13
Coq_Relations_Relation_Definitions_reflexive || abel_s1917375468axioms || 9.91380026968e-14
Coq_Reals_Rdefinitions_Rlt || bNF_Wellorder_wo_rel || 9.34796665977e-14
Coq_Relations_Relation_Operators_clos_trans_1n_0 || transitive_rtranclp || 8.76162104225e-14
Coq_Relations_Relation_Definitions_symmetric || abel_s1917375468axioms || 8.73443603198e-14
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Qc || inc || 8.6656568482e-14
Coq_Relations_Relation_Definitions_antisymmetric || abel_semigroup || 8.54791068383e-14
Coq_Numbers_Rational_BigQ_BigQ_BigQ_red || bit1 || 8.42659340971e-14
Coq_Relations_Relation_Operators_clos_refl_trans_1n_0 || transitive_tranclp || 8.41518783634e-14
Coq_Numbers_Natural_BigN_BigN_BigN_le || distinct || 8.11752540639e-14
Coq_Numbers_Natural_BigN_BigN_BigN_le || linorder_sorted || 8.10267019092e-14
Coq_Relations_Relation_Definitions_antisymmetric || lattic35693393ce_set || 7.96835184985e-14
Coq_Reals_Rtrigo1_tan || top_top || 6.59594407999e-14
Coq_QArith_Qcanon_this || bit1 || 6.51856110819e-14
Coq_Relations_Relation_Operators_clos_trans_n1_0 || transitive_rtranclp || 6.49169695316e-14
Coq_Relations_Relation_Operators_clos_refl_trans_n1_0 || transitive_tranclp || 6.40358175745e-14
Coq_Reals_Rtrigo1_tan || bot_bot || 6.34405728336e-14
Coq_Reals_Rpower_ln || top_top || 6.08543543831e-14
Coq_Numbers_Natural_BigN_BigN_BigN_sqrt_up || finite_psubset || 6.05598720308e-14
Coq_QArith_Qreduction_Qred || bit0 || 5.98361773866e-14
Coq_Init_Wf_well_founded || wfP || 5.95748498558e-14
Coq_Reals_Rtrigo_def_cos || top_top || 5.94664883507e-14
Coq_Reals_Rtrigo_def_sin || top_top || 5.91347723128e-14
Coq_Reals_Rpower_ln || bot_bot || 5.8353261209e-14
Coq_Numbers_Natural_BigN_BigN_BigN_log2_up || finite_psubset || 5.79977844024e-14
Coq_Reals_Rtrigo_def_cos || bot_bot || 5.73762440796e-14
Coq_Reals_Rtrigo_def_sin || bot_bot || 5.71020192199e-14
Coq_Numbers_Rational_BigQ_BigQ_BigQ_of_Qc || bit0 || 5.58479983524e-14
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Qc || bitM || 5.41729100461e-14
Coq_QArith_Qreduction_Qred || bit1 || 5.41056272865e-14
Coq_Numbers_Rational_BigQ_BigQ_BigQ_red || bit0 || 5.0234518498e-14
Coq_QArith_Qcanon_Qcopp || bit0 || 4.81081487567e-14
__constr_Coq_FSets_FMapPositive_PositiveMap_tree_0_1 || nil || 4.71524736481e-14
Coq_Reals_Rdefinitions_Rle || sym || 4.51891917502e-14
Coq_Sets_Ensembles_Singleton_0 || single || 4.38874467315e-14
Coq_Numbers_Natural_BigN_BigN_BigN_sqrt_up || int_ge_less_than2 || 3.79069904273e-14
Coq_Numbers_Natural_BigN_BigN_BigN_sqrt_up || int_ge_less_than || 3.79069904273e-14
Coq_Reals_Ranalysis1_derivable_pt || bNF_Wellorder_wo_rel || 3.76394720002e-14
Coq_QArith_Qcanon_Qcopp || bit1 || 3.69015255216e-14
Coq_Numbers_Natural_BigN_BigN_BigN_log2_up || int_ge_less_than2 || 3.62339684337e-14
Coq_Numbers_Natural_BigN_BigN_BigN_log2_up || int_ge_less_than || 3.62339684337e-14
Coq_Logic_EqdepFacts_UIP_refl_on_ || wfP || 3.24985445083e-14
Coq_Numbers_Natural_BigN_BigN_BigN_log2 || int_ge_less_than2 || 3.16999707687e-14
Coq_Numbers_Natural_BigN_BigN_BigN_log2 || int_ge_less_than || 3.16999707687e-14
Coq_Reals_Rdefinitions_R0 || product_unit || 3.1615882356e-14
Coq_Sets_Ensembles_In || eval || 3.01219686101e-14
Coq_Logic_EqdepFacts_Streicher_K_on_ || accp || 2.8553955425e-14
Coq_Reals_Rdefinitions_R1 || product_Unity || 2.80777999657e-14
Coq_Numbers_Natural_BigN_BigN_BigN_max || id_on || 2.66059919739e-14
Coq_Numbers_Natural_BigN_BigN_BigN_sqrt || set || 2.53780703654e-14
Coq_Relations_Relation_Definitions_antisymmetric || abel_s1917375468axioms || 2.50993803012e-14
Coq_Numbers_Natural_BigN_BigN_BigN_log2 || set || 2.36721431694e-14
Coq_Numbers_Natural_BigN_BigN_BigN_gcd || upto || 2.32547089529e-14
Coq_Numbers_Natural_BigN_BigN_BigN_add || id_on || 2.24576921682e-14
Coq_Reals_Rdefinitions_Rgt || bNF_Cardinal_cfinite || 1.95096663837e-14
Coq_Numbers_Natural_BigN_BigN_BigN_lt || bNF_Wellorder_wo_rel || 1.8785199373e-14
Coq_Numbers_Natural_BigN_BigN_BigN_max || measure || 1.73783295783e-14
Coq_Numbers_Natural_BigN_BigN_BigN_eq || bNF_Wellorder_wo_rel || 1.72707030205e-14
Coq_Classes_CMorphisms_ProperProxy || contained || 1.70406059855e-14
Coq_Classes_CMorphisms_Proper || contained || 1.70406059855e-14
Coq_Relations_Relation_Definitions_antisymmetric || semigroup || 1.67098789607e-14
Coq_Reals_Rdefinitions_Rle || distinct || 1.65999295498e-14
__constr_Coq_Init_Datatypes_list_0_1 || none || 1.65131009171e-14
Coq_Logic_ClassicalFacts_IndependenceOfGeneralPremises Coq_Logic_ClassicalFacts_DrinkerParadox || semiri1062155398ct_rel semiri882458588ct_rel || 1.58919582151e-14
Coq_Reals_Rdefinitions_R0 || bNF_Cardinal_cone || 1.52682944542e-14
Coq_Numbers_Natural_BigN_BigN_BigN_max || measures || 1.52320800958e-14
Coq_Reals_Rbasic_fun_Rmax || remdups || 1.4734494204e-14
Coq_Numbers_Natural_BigN_BigN_BigN_max || transitive_trancl || 1.4455663905e-14
$equals3 || empty || 1.4253088968e-14
Coq_Numbers_Natural_BigN_BigN_BigN_add || measure || 1.39191853617e-14
Coq_Numbers_Natural_BigN_BigN_BigN_max || transitive_rtrancl || 1.38595908968e-14
Coq_Numbers_Natural_BigN_BigN_BigN_add || transitive_trancl || 1.25271093421e-14
Coq_Numbers_Natural_BigN_BigN_BigN_add || measures || 1.24989198506e-14
Coq_Numbers_Natural_BigN_BigN_BigN_add || transitive_rtrancl || 1.20768349906e-14
Coq_Reals_Rtrigo_def_cosh || default_default || 1.18251993117e-14
Coq_FSets_FMapPositive_PositiveMap_remove || removeAll || 1.03048081942e-14
Coq_Lists_List_Forall2_0 || rel_option || 9.1512478585e-15
Coq_FSets_FMapPositive_PositiveMap_remove || dropWhile || 8.99403702111e-15
Coq_Sets_Image_Im_0 || inv_image || 8.94127284469e-15
Coq_FSets_FMapPositive_PositiveMap_remove || remove1 || 8.91587697365e-15
Coq_Init_Nat_pred || code_Suc || 8.65707631646e-15
Coq_FSets_FMapPositive_PositiveMap_remove || takeWhile || 8.52157623629e-15
Coq_PArith_BinPos_Pos_of_nat || code_nat_of_natural || 8.47281190009e-15
Coq_Numbers_Natural_BigN_BigN_BigN_le || sym || 8.22413635089e-15
Coq_FSets_FMapPositive_PositiveMap_remove || drop || 7.77358475007e-15
Coq_Reals_Rtrigo_def_exp || default_default || 7.47615821024e-15
Coq_FSets_FMapPositive_PositiveMap_remove || take || 7.45520992499e-15
Coq_Numbers_Natural_BigN_BigN_BigN_lt || sym || 7.39908824848e-15
Coq_FSets_FMapPositive_PositiveMap_remove || filter2 || 7.21126673546e-15
Coq_Classes_Morphisms_ProperProxy || contained || 6.75377272726e-15
Coq_Reals_Rbasic_fun_Rmax || remdups_adj || 6.32857220572e-15
Coq_Reals_Rdefinitions_R1 || bNF_Cardinal_cone || 5.28575018901e-15
Coq_Sets_Relations_1_Reflexive || reflp || 3.75605346466e-15
Coq_Reals_Rdefinitions_Rlt || bNF_Cardinal_cfinite || 3.75333594403e-15
Coq_Logic_ClassicalFacts_GodelDummett Coq_Logic_ClassicalFacts_RightDistributivityImplicationOverDisjunction || semiri1062155398ct_rel semiri882458588ct_rel || 3.61177185272e-15
Coq_Sets_Relations_1_Transitive || symp || 3.48720670034e-15
Coq_Sorting_Sorted_StronglySorted_0 || pred_option || 3.26327597245e-15
Coq_Sets_Finite_sets_Finite_0 || trans || 3.03497559152e-15
Coq_Sorting_Sorted_LocallySorted_0 || pred_option || 2.94377381075e-15
Coq_Sets_Finite_sets_Finite_0 || sym || 2.92785783989e-15
Coq_Relations_Relation_Operators_Desc_0 || pred_option || 2.86813546016e-15
Coq_Lists_List_ForallOrdPairs_0 || pred_option || 2.69226983517e-15
Coq_Lists_List_Forall_0 || pred_option || 2.69226983517e-15
Coq_Lists_List_NoDup_0 || is_none || 2.69031562375e-15
Coq_Reals_Rtrigo_def_cosh || top_top || 2.45290874669e-15
Coq_Reals_Rdefinitions_Rle || bNF_Cardinal_cfinite || 2.44275690324e-15
Coq_Numbers_Natural_BigN_BigN_BigN_eq || wf || 2.39367571785e-15
Coq_QArith_Qcanon_Qcinv || bit0 || 2.35851917507e-15
Coq_Reals_Rtrigo_def_cosh || bot_bot || 2.34134375513e-15
Coq_Sets_Relations_1_Antisymmetric || transp || 2.30325611877e-15
Coq_Sets_Relations_1_Equivalence_0 || equiv_equivp || 2.21190409226e-15
Coq_Sets_Relations_1_Order_0 || equiv_equivp || 2.19302693978e-15
Coq_Lists_SetoidList_NoDupA_0 || pred_option || 2.19225928527e-15
Coq_Sets_Finite_sets_Finite_0 || wf || 2.16650538333e-15
Coq_Sorting_Sorted_Sorted_0 || pred_option || 2.15389772133e-15
Coq_Reals_Rtrigo_def_exp || top_top || 2.13565965872e-15
Coq_Reals_Rtrigo_def_exp || bot_bot || 2.05055967597e-15
Coq_Sets_Relations_1_Symmetric || transp || 1.95187153106e-15
Coq_Classes_Morphisms_Proper || contained || 1.94089775897e-15
Coq_NArith_BinNat_N_div2 || abs_Nat || 1.83120167886e-15
Coq_QArith_Qcanon_Qcinv || bit1 || 1.80631468074e-15
Coq_Numbers_Rational_BigQ_BigQ_BigQ_inv_norm || bit1 || 1.67656720312e-15
Coq_Classes_RelationClasses_Equivalence_0 || null2 || 1.60825836404e-15
Coq_Reals_Rbasic_fun_Rabs || nil || 1.48874722839e-15
Coq_NArith_Ndigits_Nodd || nat3 || 1.46417136463e-15
Coq_Numbers_Natural_BigN_BigN_BigN_max || remdups || 1.45033579684e-15
Coq_NArith_Ndigits_Neven || nat3 || 1.44686228706e-15
Coq_Numbers_Rational_BigQ_BigQ_BigQ_inv || bit1 || 1.43896629521e-15
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || bNF_Cardinal_cone || 1.31493285472e-15
Coq_Numbers_Natural_BigN_BigN_BigN_add || remdups || 1.23555337997e-15
__constr_Coq_Numbers_BinNums_positive_0_3 || left || 1.23094358685e-15
Coq_Numbers_Natural_BigN_BigN_BigN_succ || nil || 1.14811092052e-15
Coq_Classes_RelationClasses_Symmetric || null2 || 1.01330382985e-15
Coq_Classes_RelationClasses_Reflexive || null2 || 9.89730421659e-16
Coq_Setoids_Setoid_Setoid_Theory || null2 || 9.74508460585e-16
Coq_Classes_RelationClasses_Transitive || null2 || 9.67538154891e-16
Coq_NArith_BinNat_N_succ_double || rep_Nat || 9.55673592285e-16
Coq_NArith_BinNat_N_double || rep_Nat || 9.22727821062e-16
Coq_Numbers_Rational_BigQ_BigQ_BigQ_inv_norm || bit0 || 8.35350541644e-16
Coq_Numbers_Rational_BigQ_BigQ_BigQ_inv || bit0 || 7.38550192859e-16
Coq_Reals_Rseries_Un_cv || bNF_Cardinal_cfinite || 6.83826254265e-16
Coq_Reals_AltSeries_PI_tg || product_unit || 6.72897664114e-16
Coq_Numbers_Rational_BigQ_BigQ_BigQ_Reduced || nat_is_nat || 5.61261159814e-16
Coq_PArith_BinPos_Pos_peano_rect || rec_sumbool || 4.87015576833e-16
Coq_PArith_POrderedType_Positive_as_DT_peano_rect || rec_sumbool || 4.87015576833e-16
Coq_PArith_POrderedType_Positive_as_OT_peano_rect || rec_sumbool || 4.87015576833e-16
Coq_Structures_OrdersEx_Positive_as_DT_peano_rect || rec_sumbool || 4.87015576833e-16
Coq_Structures_OrdersEx_Positive_as_OT_peano_rect || rec_sumbool || 4.87015576833e-16
Coq_Sets_Ensembles_Singleton_0 || id_on || 4.82318196473e-16
Coq_PArith_BinPos_Pos_peano_rect || case_sumbool || 4.2707055976e-16
Coq_PArith_POrderedType_Positive_as_DT_peano_rect || case_sumbool || 4.2707055976e-16
Coq_PArith_POrderedType_Positive_as_OT_peano_rect || case_sumbool || 4.2707055976e-16
Coq_Structures_OrdersEx_Positive_as_DT_peano_rect || case_sumbool || 4.2707055976e-16
Coq_Structures_OrdersEx_Positive_as_OT_peano_rect || case_sumbool || 4.2707055976e-16
Coq_Sets_Ensembles_Empty_set_0 || id2 || 4.20607677607e-16
Coq_Relations_Relation_Definitions_inclusion || partia17684980itions || 2.84690275919e-16
Coq_Reals_Ranalysis1_continuity_pt || bNF_Cardinal_cfinite || 2.60610212553e-16
Coq_Sets_Ensembles_Singleton_0 || measure || 2.40198277202e-16
Coq_Numbers_Rational_BigQ_BigQ_BigQ_div_norm || nat_tsub || 2.32675193787e-16
Coq_Numbers_Rational_BigQ_BigQ_BigQ_mul_norm || nat_tsub || 2.32675193787e-16
Coq_Numbers_Rational_BigQ_BigQ_BigQ_sub_norm || nat_tsub || 2.32675193787e-16
Coq_Numbers_Rational_BigQ_BigQ_BigQ_add_norm || nat_tsub || 2.32675193787e-16
Coq_Sets_Ensembles_Singleton_0 || measures || 1.98919205568e-16
Coq_Reals_R_sqrt_sqrt || product_unit || 1.76837697425e-16
Coq_Sets_Ensembles_Singleton_0 || transitive_trancl || 1.73563484346e-16
Coq_Reals_Rdefinitions_Rle || null || 1.71545379707e-16
Coq_Sets_Ensembles_Singleton_0 || transitive_rtrancl || 1.64544181395e-16
Coq_Relations_Relation_Operators_clos_refl_0 || partial_flat_ord || 1.35938567081e-16
Coq_Sets_Relations_2_Rstar_0 || partial_flat_ord || 1.34257095943e-16
Coq_Relations_Relation_Operators_clos_refl_trans_0 || partial_flat_lub || 1.21876064102e-16
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || partial_flat_lub || 1.1974476419e-16
Coq_Relations_Relation_Operators_clos_refl_trans_0 || partial_flat_ord || 1.05799321398e-16
Coq_Sets_Relations_2_Rstar1_0 || partial_flat_lub || 9.13299909233e-17
Coq_Sets_Relations_1_same_relation || partia17684980itions || 8.61099971388e-17
Coq_Sets_Relations_2_Rplus_0 || partial_flat_lub || 8.56994373357e-17
Coq_Sets_Relations_1_contains || partia17684980itions || 8.39607303631e-17
Coq_romega_ReflOmegaCore_ZOmega_valid_hyps || nat3 || 7.97320864628e-17
Coq_Numbers_Natural_BigN_BigN_BigN_mk_t || char2 || 7.71130083313e-17
Coq_Numbers_Natural_BigN_BigN_BigN_iter_t || rec_char || 7.61824468086e-17
Coq_Sets_Finite_sets_Finite_0 || antisym || 6.23223984122e-17
Coq_romega_ReflOmegaCore_ZOmega_constant_nul || rep_Nat || 4.39650605758e-17
Coq_romega_ReflOmegaCore_ZOmega_constant_neg || rep_Nat || 4.39650605758e-17
Coq_romega_ReflOmegaCore_ZOmega_constant_not_nul || rep_Nat || 4.39650605758e-17
Coq_Numbers_Natural_BigN_BigN_BigN_iter_t || case_char || 4.36515742921e-17
Coq_Sets_Relations_3_Locally_confluent || abel_s1917375468axioms || 3.97163560675e-17
Coq_romega_ReflOmegaCore_ZOmega_normalize_hyps || rep_Nat || 3.18950086591e-17
Coq_Sets_Relations_3_Confluent || abel_semigroup || 3.03571915949e-17
Coq_Numbers_Natural_BigN_BigN_BigN_lt || null || 2.63925287708e-17
Coq_Numbers_Natural_BigN_BigN_BigN_le || null || 2.58179605538e-17
Coq_Sets_Relations_2_Strongly_confluent || semilattice || 2.52386370548e-17
Coq_Sets_Relations_3_Noetherian || semigroup || 2.15666392958e-17
Coq_Init_Wf_Acc_0 || accp || 2.09403801023e-17
Coq_Numbers_Natural_BigN_BigN_BigN_lt || distinct || 1.8949480827e-17
__constr_Coq_Init_Datatypes_comparison_0_1 || nat || 1.58395669777e-17
Coq_NArith_Ndigits_N2Bv || im || 1.48542893141e-17
Coq_NArith_Ndigits_Bv2N || complex2 || 1.48311433486e-17
Coq_NArith_BinNat_N_size_nat || re || 1.34506644138e-17
Coq_Numbers_Cyclic_Int31_Int31_sneakr || complex2 || 1.13567130971e-17
Coq_Sets_Relations_3_Confluent || semilattice_axioms || 1.10646317779e-17
Coq_Numbers_Cyclic_Int31_Int31_shiftl || im || 9.23329188743e-18
Coq_Numbers_Cyclic_Int31_Int31_firstl || re || 7.46098438366e-18
Coq_FSets_FSetPositive_PositiveSet_ct_0 || dvd_dvd || 7.45990082489e-18
Coq_MSets_MSetPositive_PositiveSet_ct_0 || dvd_dvd || 7.45990082489e-18
Coq_Sets_Relations_3_Locally_confluent || semilattice_axioms || 6.78083417125e-18
Coq_Sets_Relations_3_Confluent || lattic35693393ce_set || 6.19403177439e-18
Coq_FSets_FSetPositive_PositiveSet_ct_0 || ord_less_eq || 5.46285868013e-18
Coq_MSets_MSetPositive_PositiveSet_ct_0 || ord_less_eq || 5.46285868013e-18
Coq_Logic_ChoiceFacts_FunctionalChoice_on || semilattice || 5.20177149838e-18
Coq_Numbers_Rational_BigQ_BigQ_BigQ_Reduced || nat3 || 4.52239885769e-18
Coq_Logic_ChoiceFacts_RelationalChoice_on || semilattice_axioms || 4.3840895155e-18
Coq_Sets_Relations_3_Confluent || semilattice || 4.32564198167e-18
Coq_Sets_Relations_3_Noetherian || abel_semigroup || 3.53024621768e-18
Coq_Sets_Relations_1_contains || eval || 3.32883531117e-18
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || abel_semigroup || 2.82390000907e-18
Coq_Numbers_Rational_BigQ_BigQ_BigQ_inv_norm || suc_Rep || 2.71285005884e-18
__constr_Coq_Init_Datatypes_comparison_0_3 || num || 2.63262842041e-18
__constr_Coq_Init_Datatypes_comparison_0_2 || num || 2.6167317375e-18
__constr_Coq_Init_Datatypes_bool_0_2 || right || 2.53033486619e-18
__constr_Coq_Init_Datatypes_bool_0_2 || left || 2.53033486619e-18
__constr_Coq_Init_Datatypes_bool_0_1 || right || 2.4503320757e-18
__constr_Coq_Init_Datatypes_bool_0_1 || left || 2.4503320757e-18
__constr_Coq_Init_Datatypes_comparison_0_3 || one2 || 2.25028518535e-18
__constr_Coq_Init_Datatypes_comparison_0_2 || one2 || 2.24152241031e-18
Coq_Sets_Relations_2_Rplus_0 || single || 2.07958542001e-18
Coq_Numbers_Rational_BigQ_BigQ_BigQ_opp || suc_Rep || 1.65865796254e-18
Coq_Sets_Relations_2_Rstar_0 || single || 1.6173779796e-18
Coq_Classes_CRelationClasses_relation_equivalence || finite_psubset || 1.60112788751e-18
Coq_Sets_Uniset_incl || predicate_contains || 1.37075597415e-18
Coq_Numbers_Rational_BigQ_BigQ_BigQ_of_Qc || rep_Nat || 1.25945209436e-18
Coq_Sets_Relations_2_Strongly_confluent || lattic35693393ce_set || 1.15407460068e-18
Coq_Init_Logic_inhabited_0 || assumption || 8.83659217109e-19
Coq_Numbers_Cyclic_Int31_Int31_sneakl || complex2 || 7.945735275e-19
Coq_Classes_RelationPairs_RelProd || sum_Plus || 7.62584681784e-19
Coq_Logic_ChoiceFacts_GuardedRelationalChoice_on || semilattice || 7.37217889453e-19
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || semilattice_axioms || 6.93013019344e-19
Coq_Relations_Relation_Operators_clos_refl_trans_1n_0 || transitive_rtranclp || 6.71703215893e-19
Coq_Logic_ChoiceFacts_RelationalChoice_on || abel_semigroup || 6.05013837794e-19
Coq_Numbers_Cyclic_Int31_Int31_shiftr || im || 5.7241090519e-19
Coq_Logic_ChoiceFacts_RelationalChoice_on || lattic35693393ce_set || 5.72323444212e-19
Coq_Logic_ChoiceFacts_RelationalChoice_on || abel_s1917375468axioms || 5.61882924127e-19
Coq_Numbers_Cyclic_Int31_Int31_firstr || re || 5.59700453145e-19
Coq_Init_Datatypes_prod_0 || sum_sum || 5.3845941425e-19
Coq_Logic_ChoiceFacts_FunctionalChoice_on || abel_semigroup || 5.36746266245e-19
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || lattic35693393ce_set || 4.7343795976e-19
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || transitive_rtranclp || 4.36256676849e-19
Coq_Reals_Ranalysis1_continuity || nat_is_nat || 4.01435915656e-19
Coq_Sets_Uniset_seq || member3 || 3.95129783166e-19
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || semigroup || 3.68504094797e-19
Coq_Classes_CRelationClasses_crelation || set || 3.59333006393e-19
Coq_Relations_Relation_Operators_clos_refl_trans_0 || transitive_tranclp || 3.42687273116e-19
Coq_QArith_QArith_base_inject_Z || bot_bot || 3.20079377584e-19
Coq_Classes_CRelationClasses_RewriteRelation_0 || trans || 3.04897146041e-19
Coq_QArith_Qround_Qceiling || pred || 3.04380051776e-19
Coq_QArith_QArith_base_Qle || is_empty || 2.61847829675e-19
Coq_Reals_Rtopology_union_domain || nat_tsub || 2.54250173903e-19
Coq_Reals_Ranalysis1_minus_fct || nat_tsub || 2.49257839858e-19
Coq_Reals_Ranalysis1_plus_fct || nat_tsub || 2.49257839858e-19
Coq_Sets_Relations_1_Symmetric || distinct || 2.34359035447e-19
Coq_Classes_CRelationClasses_RewriteRelation_0 || wf || 2.31614450831e-19
Coq_Reals_Ranalysis1_continuity || nat3 || 2.31551344754e-19
Coq_Reals_Ranalysis1_mult_fct || nat_tsub || 2.25919991195e-19
__constr_Coq_Init_Datatypes_nat_0_1 || left || 2.09231096081e-19
__constr_Coq_Init_Datatypes_nat_0_2 || none || 1.92693517748e-19
Coq_ZArith_BinInt_Z_opp || cnj || 1.82695236723e-19
Coq_Logic_ClassicalFacts_IndependenceOfGeneralPremises Coq_Logic_ClassicalFacts_DrinkerParadox || pcr_literal cr_literal || 1.79463315627e-19
Coq_Reals_Rtopology_open_set || nat_is_nat || 1.59995857993e-19
Coq_Reals_Ranalysis1_opp_fct || suc_Rep || 1.40911936993e-19
Coq_Arith_PeanoNat_Nat_recursion || rec_sumbool || 1.34216354854e-19
Coq_Structures_OrdersEx_Nat_as_DT_recursion || rec_sumbool || 1.34216354854e-19
Coq_Structures_OrdersEx_Nat_as_OT_recursion || rec_sumbool || 1.34216354854e-19
Coq_Init_Peano_lt || is_none || 1.27011165206e-19
Coq_Relations_Relation_Operators_clos_refl_trans_n1_0 || transitive_rtranclp || 1.26040621033e-19
Coq_Init_Peano_le_0 || is_none || 1.22696270302e-19
Coq_Classes_RelationClasses_Symmetric || finite_finite2 || 1.21502459216e-19
Coq_QArith_Qround_Qceiling || set || 1.20468966718e-19
Coq_Classes_RelationClasses_Reflexive || finite_finite2 || 1.19772935266e-19
Coq_Classes_RelationClasses_Transitive || finite_finite2 || 1.18116219356e-19
Coq_Sets_Relations_1_facts_Complement || butlast || 1.17759683493e-19
Coq_Arith_PeanoNat_Nat_recursion || case_sumbool || 1.15198570263e-19
Coq_Structures_OrdersEx_Nat_as_DT_recursion || case_sumbool || 1.15198570263e-19
Coq_Structures_OrdersEx_Nat_as_OT_recursion || case_sumbool || 1.15198570263e-19
Coq_QArith_QArith_base_Qle || finite_finite2 || 1.10649244576e-19
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || transitive_tranclp || 1.09929790014e-19
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || transitive_tranclp || 1.09929790014e-19
Coq_Reals_Rtopology_intersection_domain || nat_tsub || 1.03037962707e-19
Coq_Relations_Relation_Operators_symprod_0 || sum_Plus || 1.01636117896e-19
Coq_Classes_RelationClasses_Equivalence_0 || finite_finite2 || 1.01224992614e-19
Coq_Sets_Relations_1_facts_Complement || tl || 9.82430925504e-20
Coq_Logic_ChoiceFacts_GuardedRelationalChoice_on || abel_semigroup || 8.39705676883e-20
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || abel_s1917375468axioms || 7.82873398709e-20
Coq_Init_Wf_well_founded || finite_finite2 || 7.69800136926e-20
Coq_Logic_ChoiceFacts_RelationalChoice_on || semigroup || 7.22334001833e-20
Coq_ZArith_BinInt_Z_abs || re || 6.30519271012e-20
Coq_Logic_ClassicalFacts_GodelDummett Coq_Logic_ClassicalFacts_RightDistributivityImplicationOverDisjunction || pcr_literal cr_literal || 6.12991473574e-20
Coq_Classes_SetoidTactics_DefaultRelation_0 || fun_is_measure || 5.97969523038e-20
__constr_Coq_Sorting_Heap_Tree_0_1 || nil || 5.67490434309e-20
Coq_Numbers_Cyclic_Abstract_CyclicAxioms_ZnZ_Specs_0 || bNF_Cardinal_cfinite || 5.63495820175e-20
Coq_Sets_Relations_2_Rstar_0 || butlast || 5.31775107788e-20
Coq_Classes_CRelationClasses_Equivalence_0 || bNF_Wellorder_wo_rel || 5.09435358985e-20
Coq_Sorting_Heap_is_heap_0 || pred_list || 4.96090244268e-20
Coq_Sets_Image_Im_0 || fun_rp_inv_image || 4.88044670123e-20
Coq_Sets_Relations_2_Rstar_0 || tl || 4.8551918245e-20
Coq_Sorting_Heap_is_heap_0 || listsp || 4.84220025135e-20
Coq_Reals_Rtrigo_def_sin || zero_Rep || 4.33597250529e-20
Coq_ZArith_Zgcd_alt_Zgcd_bound || re || 4.30530151928e-20
Coq_Reals_Rtrigo_def_cos || zero_Rep || 4.26842544645e-20
Coq_Reals_Rbasic_fun_Rabs || zero_Rep || 4.16166498662e-20
Coq_Sets_Ensembles_Complement || basic_BNF_xtor || 3.86076000424e-20
Coq_ZArith_BinInt_Z_sgn || im || 3.70782653461e-20
Coq_Sets_Relations_3_coherent || remdups || 3.54663610303e-20
Coq_Classes_SetoidClass_equiv || set2 || 3.51172860248e-20
Coq_Sets_Finite_sets_Finite_0 || fun_reduction_pair || 3.50934062608e-20
Coq_Sets_Ensembles_Union_0 || cons || 3.20386995362e-20
Coq_ZArith_BinInt_Z_mul || complex2 || 3.11361723687e-20
Coq_ZArith_BinInt_Z_abs_N || re || 3.10874032542e-20
Coq_ZArith_BinInt_Z_even || re || 3.09235019175e-20
Coq_ZArith_BinInt_Z_odd || re || 2.97224405748e-20
Coq_Sets_Relations_1_Transitive || abel_s1917375468axioms || 2.71384145927e-20
Coq_romega_ReflOmegaCore_ZOmega_valid_list_hyps || nat3 || 2.66375921389e-20
Coq_romega_ReflOmegaCore_ZOmega_destructure_hyps || rep_Nat || 2.42996478733e-20
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || transitive_tranclp || 2.39576341288e-20
Coq_Numbers_Integer_Binary_ZBinary_Z_abs || re || 2.38373213997e-20
Coq_Structures_OrdersEx_Z_as_OT_abs || re || 2.38373213997e-20
Coq_Structures_OrdersEx_Z_as_DT_abs || re || 2.38373213997e-20
Coq_Numbers_Natural_BigN_BigN_BigN_iter_t || case_typerep || 2.1470949788e-20
Coq_Sets_Ensembles_Add || append || 2.09389228133e-20
Coq_Numbers_Integer_Binary_ZBinary_Z_sgn || im || 2.08127391842e-20
Coq_Structures_OrdersEx_Z_as_OT_sgn || im || 2.08127391842e-20
Coq_Structures_OrdersEx_Z_as_DT_sgn || im || 2.08127391842e-20
Coq_Numbers_Cyclic_Int31_Cyclic31_int31_ops || bNF_Cardinal_cone || 2.04731546219e-20
Coq_Logic_ClassicalFacts_IndependenceOfGeneralPremises Coq_Logic_ClassicalFacts_DrinkerParadox || pcr_real cr_real || 1.9611668644e-20
Coq_Relations_Relation_Operators_clos_trans_1n_0 || transitive_tranclp || 1.93340768261e-20
Coq_Sets_Relations_1_Transitive || semilattice_axioms || 1.92684578583e-20
Coq_Sets_Ensembles_Included || listMem || 1.89387042765e-20
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || complex2 || 1.70589204297e-20
Coq_Structures_OrdersEx_Z_as_OT_mul || complex2 || 1.70589204297e-20
Coq_Structures_OrdersEx_Z_as_DT_mul || complex2 || 1.70589204297e-20
Coq_Numbers_Natural_BigN_BigN_BigN_w5_op || bNF_Cardinal_cone || 1.70497364156e-20
Coq_Numbers_Natural_BigN_BigN_BigN_w4_op || bNF_Cardinal_cone || 1.70497364156e-20
Coq_Numbers_Natural_BigN_BigN_BigN_w3_op || bNF_Cardinal_cone || 1.70497364156e-20
Coq_Numbers_Natural_BigN_BigN_BigN_w2_op || bNF_Cardinal_cone || 1.70497364156e-20
Coq_Numbers_Natural_BigN_BigN_BigN_w1_op || bNF_Cardinal_cone || 1.70497364156e-20
Coq_Sets_Relations_1_PER_0 || abel_semigroup || 1.67944585839e-20
Coq_romega_ReflOmegaCore_ZOmega_execute_omega || rep_Nat || 1.65704478039e-20
Coq_Numbers_Natural_BigN_BigN_BigN_w6_op || bNF_Cardinal_cone || 1.60082834005e-20
Coq_Logic_ClassicalFacts_IndependenceOfGeneralPremises Coq_Logic_ClassicalFacts_DrinkerParadox || pcr_rat cr_rat || 1.53248459401e-20
Coq_Relations_Relation_Operators_le_AsB_0 || sum_Plus || 1.51365352261e-20
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || cnj || 1.4312078577e-20
Coq_Structures_OrdersEx_Z_as_OT_opp || cnj || 1.4312078577e-20
Coq_Structures_OrdersEx_Z_as_DT_opp || cnj || 1.4312078577e-20
Coq_Numbers_Natural_BigN_BigN_BigN_mk_t || typerep3 || 1.39930717354e-20
Coq_Relations_Relation_Operators_clos_trans_0 || transitive_rtranclp || 1.37586829809e-20
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || transitive_rtranclp || 1.32199237644e-20
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || transitive_rtranclp || 1.32199237644e-20
Coq_Sets_Relations_1_Preorder_0 || abel_semigroup || 1.28937726987e-20
Coq_Sets_Relations_1_Symmetric || semigroup || 1.27397819588e-20
Coq_Init_Datatypes_sum_0 || sum_sum || 1.23111209464e-20
Coq_Logic_ClassicalFacts_IndependenceOfGeneralPremises Coq_Logic_ClassicalFacts_DrinkerParadox || pcr_int cr_int || 1.21246446997e-20
Coq_Sets_Relations_1_PER_0 || semilattice || 1.16173118775e-20
Coq_Sets_Relations_1_Reflexive || semigroup || 1.12660017754e-20
Coq_Numbers_Cyclic_Int31_Int31_int31_0 || product_unit || 1.11696552062e-20
Coq_Lists_List_repeat || cons || 1.02740558426e-20
Coq_Numbers_Natural_BigN_BigN_BigN_w5 || product_unit || 9.71010910064e-21
Coq_Numbers_Natural_BigN_BigN_BigN_w4 || product_unit || 9.71010910064e-21
Coq_Numbers_Natural_BigN_BigN_BigN_w3 || product_unit || 9.71010910064e-21
Coq_Numbers_Natural_BigN_BigN_BigN_w2 || product_unit || 9.71010910064e-21
Coq_Numbers_Natural_BigN_BigN_BigN_w1 || product_unit || 9.71010910064e-21
Coq_Init_Datatypes_length || tl || 9.0248696238e-21
Coq_Sets_Relations_1_Preorder_0 || semilattice || 8.98530513539e-21
Coq_Sets_Relations_1_Symmetric || abel_semigroup || 8.74254131801e-21
Coq_Sets_Relations_1_Reflexive || abel_semigroup || 7.76942947431e-21
Coq_Arith_Wf_nat_gtof || set2 || 7.23670220201e-21
Coq_Arith_Wf_nat_ltof || set2 || 7.23670220201e-21
Coq_Logic_ClassicalFacts_GodelDummett Coq_Logic_ClassicalFacts_RightDistributivityImplicationOverDisjunction || pcr_real cr_real || 7.22360391739e-21
Coq_Numbers_Cyclic_Int31_Cyclic31_Int31Cyclic_ops || bNF_Cardinal_cone || 6.90292027561e-21
Coq_QArith_Qminmax_Qmax || set2 || 6.32784083127e-21
Coq_Arith_Wf_nat_inv_lt_rel || set2 || 6.01162166046e-21
Coq_Classes_CRelationClasses_RewriteRelation_0 || antisym || 5.9353081967e-21
Coq_Logic_ClassicalFacts_GodelDummett Coq_Logic_ClassicalFacts_RightDistributivityImplicationOverDisjunction || pcr_rat cr_rat || 5.69116006715e-21
Coq_Numbers_Natural_BigN_BigN_BigN_w6 || product_unit || 5.67496962286e-21
Coq_Logic_ClassicalFacts_IndependenceOfGeneralPremises Coq_Logic_ClassicalFacts_DrinkerParadox || code_pcr_natural code_cr_natural || 5.27062147725e-21
Coq_Numbers_Cyclic_Int31_Cyclic31_Int31Cyclic_t || product_unit || 4.89596607815e-21
Coq_Logic_ClassicalFacts_GodelDummett Coq_Logic_ClassicalFacts_RightDistributivityImplicationOverDisjunction || pcr_int cr_int || 4.53777253909e-21
Coq_Relations_Relation_Operators_clos_trans_n1_0 || transitive_tranclp || 4.44994761028e-21
Coq_Sets_Integers_Integers_0 || one2 || 4.13024163547e-21
Coq_Reals_Rsqrt_def_pow_2_n || zero_Rep || 3.4503858797e-21
Coq_Init_Datatypes_nat_0 || num || 3.10415888257e-21
Coq_Sets_Ensembles_In || ord_less_eq || 2.84683479598e-21
Coq_Sets_Image_Im_0 || bind2 || 2.81761840957e-21
Coq_Numbers_Integer_Binary_ZBinary_Z_even || re || 2.73124506505e-21
Coq_Structures_OrdersEx_Z_as_OT_even || re || 2.73124506505e-21
Coq_Structures_OrdersEx_Z_as_DT_even || re || 2.73124506505e-21
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || re || 2.67653152317e-21
Coq_Structures_OrdersEx_Z_as_OT_odd || re || 2.67653152317e-21
Coq_Structures_OrdersEx_Z_as_DT_odd || re || 2.67653152317e-21
Coq_Sets_Ensembles_Empty_set_0 || none || 2.62637114578e-21
Coq_Sets_Relations_1_contains || finite_psubset || 2.08961534722e-21
Coq_Sets_Relations_1_same_relation || finite_psubset || 2.05750765191e-21
Coq_Logic_ClassicalFacts_GodelDummett Coq_Logic_ClassicalFacts_RightDistributivityImplicationOverDisjunction || code_pcr_natural code_cr_natural || 2.02712828167e-21
$equals3 || none || 2.01235316103e-21
Coq_Numbers_Natural_BigN_BigN_BigN_pred_t || rep_filter || 2.00879106281e-21
Coq_Logic_ClassicalFacts_IndependenceOfGeneralPremises Coq_Logic_ClassicalFacts_DrinkerParadox || implode str || 1.90727361747e-21
Coq_Sets_Uniset_incl || comm_monoid || 1.76039528741e-21
Coq_Sets_Relations_2_Rstar1_0 || transitive_rtranclp || 1.7546987285e-21
Coq_Sets_Relations_1_Relation || set || 1.62566035356e-21
Coq_Reals_Ranalysis1_derivable_pt_lim || real_V1632203528linear || 1.48593011969e-21
Coq_Numbers_Natural_BigN_BigN_BigN_succ_t || abs_filter || 1.4611232487e-21
__constr_Coq_Init_Datatypes_list_0_1 || empty || 1.43910413696e-21
Coq_Reals_SeqProp_cv_infty || nat3 || 1.38295107231e-21
Coq_Sets_Relations_2_Rstar_0 || transitive_tranclp || 1.33310149015e-21
Coq_Relations_Relation_Definitions_order_0 || bNF_Wellorder_wo_rel || 1.25855782776e-21
Coq_Sets_Relations_1_Symmetric || wfP || 1.25445879782e-21
Coq_Sets_Relations_2_Strongly_confluent || abel_semigroup || 1.25142388605e-21
Coq_Classes_RelationClasses_Equivalence_0 || is_none || 1.09780871906e-21
Coq_Logic_ClassicalFacts_IndependenceOfGeneralPremises Coq_Logic_ClassicalFacts_DrinkerParadox || code_pcr_integer code_cr_integer || 1.08232031675e-21
Coq_romega_ReflOmegaCore_ZOmega_extract_hyp_neg || rep_Nat || 1.03533900052e-21
Coq_Sets_Relations_3_Confluent || abel_s1917375468axioms || 1.00552581506e-21
Coq_Sets_Ensembles_Intersection_0 || append || 9.80619220269e-22
Coq_Reals_Rseries_Un_growing || nat3 || 9.50695041188e-22
Coq_Relations_Relation_Definitions_equivalence_0 || bNF_Wellorder_wo_rel || 9.39759265835e-22
Coq_Sets_Finite_sets_Finite_0 || is_none || 9.1143344427e-22
Coq_romega_ReflOmegaCore_ZOmega_co_valid1 || nat3 || 8.90100299434e-22
Coq_Reals_Rdefinitions_R0 || real || 8.76076577601e-22
Coq_romega_ReflOmegaCore_ZOmega_apply_both || nat_tsub || 8.14914468653e-22
Coq_Relations_Relation_Definitions_transitive || antisym || 7.96449994599e-22
Coq_Logic_ClassicalFacts_GodelDummett Coq_Logic_ClassicalFacts_RightDistributivityImplicationOverDisjunction || implode str || 7.57853678608e-22
Coq_Sets_Relations_1_facts_Complement || transitive_tranclp || 7.529807089e-22
Coq_Sets_Uniset_seq || groups387199878d_list || 7.21489399084e-22
Coq_Reals_Rtrigo_def_exp || complex || 7.20023392046e-22
Coq_Sets_Ensembles_Union_0 || removeAll || 7.09336587969e-22
Coq_Sets_Relations_1_Preorder_0 || trans || 6.99977978495e-22
Coq_Sets_Uniset_incl || groups_monoid_list || 6.84161326619e-22
Coq_Sets_Relations_1_Equivalence_0 || trans || 6.6019946758e-22
Coq_Lists_List_ForallPairs || groups387199878d_list || 6.49710039089e-22
Coq_Relations_Relation_Definitions_transitive || trans || 6.40154961827e-22
Coq_Sets_Relations_1_Preorder_0 || wf || 5.98410421502e-22
__constr_Coq_Init_Datatypes_list_0_2 || join || 5.97787189686e-22
Coq_Relations_Relation_Definitions_reflexive || antisym || 5.94614943796e-22
Coq_Classes_RelationClasses_Symmetric || is_none || 5.94449871903e-22
Coq_Reals_Rtrigo_def_sin || complex || 5.88730725683e-22
Coq_Sets_Relations_3_Confluent || semigroup || 5.83313631291e-22
__constr_Coq_Init_Datatypes_list_0_2 || insert2 || 5.82970601925e-22
Coq_Classes_RelationClasses_Reflexive || is_none || 5.78692669508e-22
Coq_Relations_Relation_Definitions_preorder_0 || bNF_Wellorder_wo_rel || 5.76805437131e-22
Coq_Reals_Rdefinitions_R1 || im || 5.69408951093e-22
Coq_Setoids_Setoid_Setoid_Theory || is_none || 5.68574816098e-22
Coq_Sets_Relations_1_Equivalence_0 || wf || 5.68280763717e-22
Coq_Reals_Rdefinitions_R1 || re || 5.64643087887e-22
Coq_Classes_RelationClasses_Transitive || is_none || 5.63956530769e-22
Coq_romega_ReflOmegaCore_Z_as_Int_one || right || 5.62737066033e-22
Coq_Sets_Uniset_seq || semilattice_neutr || 5.24112561004e-22
Coq_Relations_Relation_Definitions_PER_0 || bNF_Wellorder_wo_rel || 4.99474690717e-22
Coq_Relations_Relation_Definitions_reflexive || trans || 4.89598760363e-22
Coq_Sets_Ensembles_Union_0 || filter2 || 4.79245439396e-22
Coq_romega_ReflOmegaCore_Z_as_Int_zero || left || 4.41996551629e-22
Coq_Logic_ClassicalFacts_GodelDummett Coq_Logic_ClassicalFacts_RightDistributivityImplicationOverDisjunction || code_pcr_integer code_cr_integer || 4.37792373824e-22
Coq_Lists_List_ForallOrdPairs_0 || comm_monoid || 4.25343895342e-22
Coq_Sets_Uniset_seq || predicate_contains || 3.97865479418e-22
Coq_Sets_Relations_3_coherent || transitive_rtranclp || 3.72968318961e-22
Coq_Lists_List_ForallPairs || semilattice_neutr || 3.60845469482e-22
Coq_Lists_Streams_Str_nth_tl || filter2 || 3.55701397887e-22
Coq_Reals_SeqProp_opp_seq || suc_Rep || 3.4524286817e-22
Coq_NArith_BinNat_N_div2 || im || 3.344799426e-22
Coq_NArith_BinNat_N_odd || re || 3.17889281817e-22
Coq_Sets_Uniset_seq || groups828474808id_set || 2.88193902995e-22
Coq_Relations_Relation_Definitions_symmetric || antisym || 2.85357270434e-22
Coq_Lists_List_ForallOrdPairs_0 || groups_monoid_list || 2.85134112718e-22
Coq_Reals_Rtrigo_def_exp || finite_psubset || 2.60935587608e-22
Coq_romega_ReflOmegaCore_ZOmega_term_stable || nat_is_nat || 2.55361761101e-22
Coq_Reals_Rseries_Cauchy_crit || nat3 || 2.55254426354e-22
Coq_Reals_Rseries_Un_cv || trans || 2.52148411143e-22
Coq_Relations_Relation_Definitions_antisymmetric || antisym || 2.52033499172e-22
Coq_Lists_List_ForallPairs || monoid || 2.45364243447e-22
Coq_Sets_Uniset_incl || member3 || 2.42834781734e-22
Coq_Relations_Relation_Definitions_symmetric || trans || 2.38317158542e-22
Coq_Lists_List_NoDup_0 || null2 || 2.29116216157e-22
Coq_Lists_Streams_tl || remdups || 2.23883624583e-22
Coq_Sets_Uniset_seq || monoid || 2.16578317325e-22
Coq_Relations_Relation_Definitions_antisymmetric || trans || 2.10703165179e-22
Coq_Reals_Rseries_Un_cv || wf || 2.07151859271e-22
Coq_Sets_Uniset_incl || lattic1543629303tr_set || 1.97554728794e-22
Coq_Lists_Streams_tl || rev || 1.7672709593e-22
Coq_Reals_Rtrigo_def_sin || finite_psubset || 1.49307235837e-22
Coq_Reals_Rtrigo_def_cos || finite_psubset || 1.45877735794e-22
Coq_Sets_Uniset_incl || monoid_axioms || 1.38127297328e-22
Coq_Reals_Exp_prop_E1 || set || 1.25997698323e-22
Coq_Reals_AltSeries_PI_tg || nat || 1.18652927025e-22
Coq_Lists_List_ForallPairs || groups828474808id_set || 1.15376632398e-22
Coq_romega_ReflOmegaCore_ZOmega_decompose_solve || rep_Nat || 1.09119074248e-22
Coq_Numbers_Natural_BigN_BigN_BigN_iter_t || case_complex || 1.05623186905e-22
Coq_Reals_Cos_rel_B1 || set || 9.73286477139e-23
Coq_Reals_Cos_rel_A1 || set || 9.64478491927e-23
Coq_Lists_List_ForallOrdPairs_0 || lattic1543629303tr_set || 8.15228886134e-23
Coq_Numbers_Natural_BigN_BigN_BigN_mk_t || complex2 || 8.05134396529e-23
Coq_Reals_Rdefinitions_R0 || bNF_Ca1495478003natLeq || 7.70540461783e-23
Coq_romega_ReflOmegaCore_ZOmega_valid_list_goal || nat3 || 7.68925103727e-23
Coq_Reals_Rdefinitions_R0 || less_than || 7.61383059019e-23
Coq_Lists_List_ForallOrdPairs_0 || monoid_axioms || 7.48537387187e-23
Coq_Sets_Relations_2_Strongly_confluent || equiv_equivp || 7.32846001961e-23
Coq_setoid_ring_BinList_jump || filter2 || 7.18895900689e-23
Coq_Reals_Rdefinitions_R0 || left || 6.22256318767e-23
Coq_Classes_CRelationClasses_RewriteRelation_0 || fun_is_measure || 6.10264159075e-23
Coq_Classes_RelationClasses_RewriteRelation_0 || fun_is_measure || 6.10264159075e-23
Coq_Lists_List_ForallPairs || groups1716206716st_set || 4.7034000144e-23
Coq_Lists_List_tl || remdups || 4.56061943088e-23
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || semiri1062155398ct_rel semiri882458588ct_rel || 4.24975097607e-23
Coq_Sets_Relations_3_Confluent || equiv_part_equivp || 4.0266750016e-23
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || semilattice_order || 3.89665566133e-23
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || right || 3.86903909531e-23
Coq_Lists_List_tl || rev || 3.63699455401e-23
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || nat || 3.34038423609e-23
Coq_Sets_Relations_3_Confluent || reflp || 3.27971499406e-23
Coq_Reals_Rdefinitions_R0 || pred_nat || 3.26830311029e-23
Coq_Reals_Rdefinitions_R1 || right || 3.18245483455e-23
Coq_Relations_Relation_Operators_clos_trans_0 || semilattice_order || 3.0099994128e-23
Coq_Numbers_Natural_Binary_NBinary_N_peano_rec || code_rec_natural || 2.66568966934e-23
Coq_Numbers_Natural_Binary_NBinary_N_peano_rect || code_rec_natural || 2.66568966934e-23
Coq_Structures_OrdersEx_N_as_OT_peano_rec || code_rec_natural || 2.66568966934e-23
Coq_Structures_OrdersEx_N_as_OT_peano_rect || code_rec_natural || 2.66568966934e-23
Coq_Structures_OrdersEx_N_as_DT_peano_rec || code_rec_natural || 2.66568966934e-23
Coq_Structures_OrdersEx_N_as_DT_peano_rect || code_rec_natural || 2.66568966934e-23
Coq_Numbers_Natural_Binary_NBinary_N_peano_rec || rec_nat || 2.44779940822e-23
Coq_Numbers_Natural_Binary_NBinary_N_peano_rect || rec_nat || 2.44779940822e-23
Coq_Structures_OrdersEx_N_as_OT_peano_rec || rec_nat || 2.44779940822e-23
Coq_Structures_OrdersEx_N_as_OT_peano_rect || rec_nat || 2.44779940822e-23
Coq_Structures_OrdersEx_N_as_DT_peano_rec || rec_nat || 2.44779940822e-23
Coq_Structures_OrdersEx_N_as_DT_peano_rect || rec_nat || 2.44779940822e-23
Coq_Numbers_Natural_Binary_NBinary_N_succ || suc || 2.32614730274e-23
Coq_Structures_OrdersEx_N_as_OT_succ || suc || 2.32614730274e-23
Coq_Structures_OrdersEx_N_as_DT_succ || suc || 2.32614730274e-23
Coq_Numbers_Natural_Binary_NBinary_N_succ || code_Suc || 2.08031584352e-23
Coq_Structures_OrdersEx_N_as_OT_succ || code_Suc || 2.08031584352e-23
Coq_Structures_OrdersEx_N_as_DT_succ || code_Suc || 2.08031584352e-23
Coq_Classes_Morphisms_Normalizes || groups387199878d_list || 2.05406967575e-23
Coq_Relations_Relation_Operators_clos_refl_trans_0 || semilattice_order || 2.01425594013e-23
Coq_romega_ReflOmegaCore_ZOmega_merge_eq || rep_Nat || 1.89194772652e-23
Coq_Reals_Rdefinitions_Rgt || trans || 1.84860789783e-23
Coq_Reals_Rseries_Un_cv || antisym || 1.71706084173e-23
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || semila1450535954axioms || 1.68971494178e-23
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || semila1450535954axioms || 1.68971494178e-23
Coq_Classes_RelationClasses_relation_equivalence || comm_monoid || 1.66231854123e-23
Coq_Reals_Rseries_Un_cv || bNF_Ca829732799finite || 1.57380834979e-23
Coq_Lists_List_ForallOrdPairs_0 || groups828474808id_set || 1.55689609764e-23
Coq_Lists_List_ForallPairs || comm_monoid || 1.5044341131e-23
Coq_Reals_Rdefinitions_Rgt || wf || 1.47880892569e-23
Coq_Relations_Relation_Operators_clos_trans_n1_0 || semila1450535954axioms || 1.47605811001e-23
Coq_Relations_Relation_Operators_clos_trans_1n_0 || semila1450535954axioms || 1.47605811001e-23
Coq_Lists_List_ForallOrdPairs_0 || groups387199878d_list || 1.34829799573e-23
Coq_Classes_Morphisms_Normalizes || semilattice_neutr || 1.24128080472e-23
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || lattic1693879045er_set || 1.19921880775e-23
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || lattic1693879045er_set || 1.19921880775e-23
Coq_romega_ReflOmegaCore_ZOmega_valid2 || nat3 || 1.12212432197e-23
Coq_ZArith_Znumtheory_Bezout_0 || comm_monoid || 1.04628094764e-23
Coq_Relations_Relation_Operators_clos_trans_n1_0 || lattic1693879045er_set || 1.01507378775e-23
Coq_Relations_Relation_Operators_clos_trans_1n_0 || lattic1693879045er_set || 1.01507378775e-23
Coq_Classes_RelationClasses_relation_equivalence || groups_monoid_list || 1.00776186467e-23
Coq_PArith_POrderedType_Positive_as_DT_max || remdups || 9.83473404535e-24
Coq_PArith_POrderedType_Positive_as_OT_max || remdups || 9.83473404535e-24
Coq_Structures_OrdersEx_Positive_as_DT_max || remdups || 9.83473404535e-24
Coq_Structures_OrdersEx_Positive_as_OT_max || remdups || 9.83473404535e-24
Coq_Relations_Relation_Operators_clos_refl_trans_n1_0 || semila1450535954axioms || 9.51080315927e-24
Coq_Reals_Rdefinitions_Rgt || antisym || 9.3780357243e-24
Coq_PArith_POrderedType_Positive_as_DT_le || distinct || 9.34203468053e-24
Coq_PArith_POrderedType_Positive_as_OT_le || distinct || 9.34203468053e-24
Coq_Structures_OrdersEx_Positive_as_DT_le || distinct || 9.34203468053e-24
Coq_Structures_OrdersEx_Positive_as_OT_le || distinct || 9.34203468053e-24
Coq_romega_ReflOmegaCore_ZOmega_reduce_lhyps || zero_Rep || 9.25342687218e-24
Coq_Relations_Relation_Operators_clos_refl_trans_1n_0 || semila1450535954axioms || 9.04346591123e-24
Coq_Reals_Rdefinitions_Rgt || bNF_Ca829732799finite || 8.61873010747e-24
Coq_PArith_POrderedType_Positive_as_DT_add || id_on || 8.46469481615e-24
Coq_PArith_POrderedType_Positive_as_OT_add || id_on || 8.46469481615e-24
Coq_Structures_OrdersEx_Positive_as_DT_add || id_on || 8.46469481615e-24
Coq_Structures_OrdersEx_Positive_as_OT_add || id_on || 8.46469481615e-24
Coq_romega_ReflOmegaCore_ZOmega_valid_lhyps || nat3 || 8.44885227804e-24
Coq_PArith_BinPos_Pos_max || remdups || 8.12677308368e-24
Coq_PArith_POrderedType_Positive_as_DT_lt || trans || 7.97748602397e-24
Coq_PArith_POrderedType_Positive_as_OT_lt || trans || 7.97748602397e-24
Coq_Structures_OrdersEx_Positive_as_DT_lt || trans || 7.97748602397e-24
Coq_Structures_OrdersEx_Positive_as_OT_lt || trans || 7.97748602397e-24
Coq_PArith_BinPos_Pos_le || distinct || 7.79511510771e-24
Coq_Classes_Morphisms_Normalizes || monoid || 7.67800022735e-24
Coq_Lists_Streams_tl || rotate1 || 7.10179704275e-24
Coq_Init_Peano_lt || abel_semigroup || 6.64258347156e-24
Coq_Relations_Relation_Operators_clos_refl_trans_n1_0 || lattic1693879045er_set || 6.63725597136e-24
Coq_Lists_Streams_Str_nth_tl || rotate || 6.50286659491e-24
Coq_Relations_Relation_Operators_clos_refl_trans_1n_0 || lattic1693879045er_set || 6.39842312331e-24
Coq_MSets_MSetPositive_PositiveSet_empty || zero_Rep || 6.24489176935e-24
Coq_Lists_List_ForallOrdPairs_0 || comm_monoid_axioms || 5.2411378608e-24
Coq_ZArith_Znumtheory_Zis_gcd_0 || groups387199878d_list || 4.66643021431e-24
Coq_Arith_Between_in_int || comm_monoid || 4.50401603392e-24
Coq_Classes_Morphisms_Normalizes || groups828474808id_set || 4.44664214979e-24
Coq_Sets_Ensembles_Full_set_0 || empty || 4.2573569551e-24
Coq_ZArith_Znumtheory_Bezout_0 || groups_monoid_list || 3.9466941038e-24
Coq_PArith_BinPos_Pos_add || id_on || 3.68384231245e-24
Coq_PArith_BinPos_Pos_lt || trans || 3.61128960444e-24
Coq_FSets_FSetPositive_PositiveSet_empty || zero_Rep || 3.47771481836e-24
Coq_ZArith_Znumtheory_Zis_gcd_0 || semilattice_neutr || 3.46940155715e-24
Coq_Reals_Rdefinitions_Ropp || abs_Nat || 3.4570002253e-24
Coq_Reals_Rdefinitions_R1 || zero_Rep || 3.37440215052e-24
Coq_Classes_RelationClasses_relation_equivalence || lattic1543629303tr_set || 3.06122967147e-24
Coq_Sets_Ensembles_In || contained || 3.03468137261e-24
Coq_PArith_POrderedType_Positive_as_DT_lt || antisym || 3.03188478687e-24
Coq_PArith_POrderedType_Positive_as_OT_lt || antisym || 3.03188478687e-24
Coq_Structures_OrdersEx_Positive_as_DT_lt || antisym || 3.03188478687e-24
Coq_Structures_OrdersEx_Positive_as_OT_lt || antisym || 3.03188478687e-24
Coq_PArith_POrderedType_Positive_as_DT_lt || sym || 3.00533633144e-24
Coq_PArith_POrderedType_Positive_as_OT_lt || sym || 3.00533633144e-24
Coq_Structures_OrdersEx_Positive_as_DT_lt || sym || 3.00533633144e-24
Coq_Structures_OrdersEx_Positive_as_OT_lt || sym || 3.00533633144e-24
Coq_MSets_MSetPositive_PositiveSet_Empty || nat3 || 2.94683791724e-24
Coq_Relations_Relation_Definitions_transitive || transitive_acyclic || 2.62843618052e-24
Coq_Classes_RelationClasses_relation_equivalence || monoid_axioms || 2.52882087875e-24
Coq_PArith_POrderedType_Positive_as_DT_succ || id2 || 2.52068251644e-24
Coq_PArith_POrderedType_Positive_as_OT_succ || id2 || 2.52068251644e-24
Coq_Structures_OrdersEx_Positive_as_DT_succ || id2 || 2.52068251644e-24
Coq_Structures_OrdersEx_Positive_as_OT_succ || id2 || 2.52068251644e-24
Coq_Init_Peano_le_0 || abel_s1917375468axioms || 2.42432252037e-24
Coq_Numbers_Natural_BigN_BigN_BigN_pred_t || pred3 || 2.20159412447e-24
Coq_Relations_Relation_Definitions_equivalence_0 || wf || 2.09153357892e-24
Coq_Reals_Rtrigo_def_cos || zero_zero || 2.06720257288e-24
Coq_Init_Peano_le_0 || semigroup || 2.03177862651e-24
Coq_ZArith_Znumtheory_Zis_gcd_0 || groups828474808id_set || 1.89770273776e-24
Coq_Sets_Cpo_PO_of_cpo || id_on || 1.84314262143e-24
Coq_PArith_POrderedType_Positive_as_DT_add || transitive_trancl || 1.83389777299e-24
Coq_PArith_POrderedType_Positive_as_OT_add || transitive_trancl || 1.83389777299e-24
Coq_Structures_OrdersEx_Positive_as_DT_add || transitive_trancl || 1.83389777299e-24
Coq_Structures_OrdersEx_Positive_as_OT_add || transitive_trancl || 1.83389777299e-24
Coq_PArith_POrderedType_Positive_as_DT_max || remdups_adj || 1.80321630298e-24
Coq_PArith_POrderedType_Positive_as_OT_max || remdups_adj || 1.80321630298e-24
Coq_Structures_OrdersEx_Positive_as_DT_max || remdups_adj || 1.80321630298e-24
Coq_Structures_OrdersEx_Positive_as_OT_max || remdups_adj || 1.80321630298e-24
Coq_PArith_POrderedType_Positive_as_DT_add || transitive_rtrancl || 1.74492854448e-24
Coq_PArith_POrderedType_Positive_as_OT_add || transitive_rtrancl || 1.74492854448e-24
Coq_Structures_OrdersEx_Positive_as_DT_add || transitive_rtrancl || 1.74492854448e-24
Coq_Structures_OrdersEx_Positive_as_OT_add || transitive_rtrancl || 1.74492854448e-24
Coq_Relations_Relation_Definitions_reflexive || transitive_acyclic || 1.73952496839e-24
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || comm_monoid || 1.65945625749e-24
Coq_Reals_Rdefinitions_Rge || transitive_acyclic || 1.63848264037e-24
Coq_Sets_Relations_2_Strongly_confluent || bNF_Wellorder_wo_rel || 1.63075009366e-24
Coq_Numbers_Natural_Binary_NBinary_N_divide || trans || 1.55507353652e-24
Coq_Structures_OrdersEx_N_as_OT_divide || trans || 1.55507353652e-24
Coq_Structures_OrdersEx_N_as_DT_divide || trans || 1.55507353652e-24
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || groups387199878d_list || 1.54413817099e-24
Coq_NArith_BinNat_N_divide || trans || 1.53693609304e-24
Coq_Relations_Relation_Definitions_preorder_0 || wf || 1.53565676941e-24
Coq_FSets_FSetPositive_PositiveSet_Empty || nat3 || 1.52690068674e-24
Coq_PArith_BinPos_Pos_max || remdups_adj || 1.49601198231e-24
Coq_Sets_Relations_2_Rplus_0 || transitive_tranclp || 1.47911983927e-24
Coq_Numbers_Natural_BigN_BigN_BigN_succ_t || eval || 1.3969213174e-24
Coq_Arith_PeanoNat_Nat_divide || trans || 1.38644231641e-24
Coq_Structures_OrdersEx_Nat_as_DT_divide || trans || 1.38644231641e-24
Coq_Structures_OrdersEx_Nat_as_OT_divide || trans || 1.38644231641e-24
Coq_ZArith_Znumtheory_Zis_gcd_0 || monoid || 1.37183754017e-24
Coq_PArith_BinPos_Pos_lt || antisym || 1.33795734106e-24
Coq_PArith_BinPos_Pos_lt || sym || 1.32646877059e-24
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || semila1450535954axioms || 1.30154439032e-24
Coq_ZArith_Znumtheory_Bezout_0 || lattic1543629303tr_set || 1.25128491684e-24
Coq_PArith_BinPos_Pos_succ || id2 || 1.12361718834e-24
Coq_Sets_Cpo_Totally_ordered_0 || real_V1632203528linear || 1.10459736233e-24
Coq_Relations_Relation_Definitions_order_0 || wf || 1.08782287824e-24
Coq_Relations_Relation_Operators_clos_trans_0 || semila1450535954axioms || 1.08753534015e-24
Coq_Lists_List_tl || rotate1 || 1.03847482381e-24
Coq_Sets_Relations_3_Confluent || antisym || 1.01648804519e-24
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || semilattice_neutr || 1.0145378012e-24
Coq_setoid_ring_BinList_jump || rotate || 9.33627059056e-25
Coq_Reals_Ranalysis1_derivable_pt_lim || divmod_nat_rel || 9.26532339648e-25
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || groups_monoid_list || 8.8052224231e-25
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || semilattice_order || 8.72543395662e-25
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || semilattice_order || 8.72543395662e-25
Coq_Relations_Relation_Definitions_symmetric || transitive_acyclic || 8.69296468874e-25
Coq_PArith_BinPos_Pos_add || transitive_trancl || 8.24988809001e-25
Coq_Relations_Relation_Operators_clos_trans_n1_0 || semilattice_order || 8.24787628314e-25
Coq_Relations_Relation_Operators_clos_trans_1n_0 || semilattice_order || 8.24787628314e-25
Coq_Sets_Relations_3_Confluent || trans || 8.1754399078e-25
Coq_Sorting_Sorted_StronglySorted_0 || groups387199878d_list || 8.04630487548e-25
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || lattic1693879045er_set || 7.98894387483e-25
Coq_PArith_BinPos_Pos_add || transitive_rtrancl || 7.86330761285e-25
Coq_ZArith_Znumtheory_Bezout_0 || monoid_axioms || 7.55395294352e-25
Coq_Relations_Relation_Definitions_transitive || semilattice || 7.49684950896e-25
Coq_Sets_Cpo_Complete_0 || trans || 7.47505139834e-25
Coq_Classes_Morphisms_Normalizes || groups1716206716st_set || 7.37074877052e-25
Coq_Numbers_Natural_BigN_BigN_BigN_recursion || rec_sumbool || 7.21419640722e-25
Coq_Sets_Integers_nat_po || real || 7.0997782012e-25
Coq_Relations_Relation_Definitions_PER_0 || wf || 7.06016069912e-25
Coq_Relations_Relation_Operators_clos_trans_0 || lattic1693879045er_set || 6.99005647027e-25
Coq_Classes_CRelationClasses_Equivalence_0 || semilattice || 6.94245449186e-25
Coq_Sorting_Sorted_Sorted_0 || comm_monoid || 6.89433572675e-25
Coq_Relations_Relation_Operators_clos_refl_trans_0 || semila1450535954axioms || 6.72987470364e-25
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || lexordp_eq || 6.59781167531e-25
Coq_Numbers_Natural_Binary_NBinary_N_lcm || transitive_trancl || 6.30437996128e-25
Coq_Structures_OrdersEx_N_as_OT_lcm || transitive_trancl || 6.30437996128e-25
Coq_Structures_OrdersEx_N_as_DT_lcm || transitive_trancl || 6.30437996128e-25
Coq_NArith_BinNat_N_lcm || transitive_trancl || 6.23462440609e-25
Coq_ZArith_Zdigits_binary_value || rep_filter || 6.13006483154e-25
Coq_Numbers_Natural_BigN_BigN_BigN_succ_t || pred3 || 5.88177222408e-25
Coq_Numbers_Natural_BigN_BigN_BigN_recursion || case_sumbool || 5.68395945326e-25
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || measure || 5.65789213005e-25
Coq_Arith_PeanoNat_Nat_lcm || transitive_trancl || 5.65446609931e-25
Coq_Structures_OrdersEx_Nat_as_DT_lcm || transitive_trancl || 5.65446609931e-25
Coq_Structures_OrdersEx_Nat_as_OT_lcm || transitive_trancl || 5.65446609931e-25
Coq_ZArith_Zdigits_Z_to_binary || abs_filter || 5.60185061117e-25
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || monoid || 5.53509974941e-25
Coq_Relations_Relation_Definitions_order_0 || lattic35693393ce_set || 5.35408959825e-25
Coq_Numbers_Natural_BigN_BigN_BigN_pred_t || eval || 5.22153718352e-25
Coq_Sorting_Sorted_StronglySorted_0 || semilattice_neutr || 5.07485947404e-25
Coq_Init_Datatypes_nat_0 || complex || 5.07304956236e-25
Coq_Relations_Relation_Operators_clos_refl_trans_n1_0 || semilattice_order || 4.99461531837e-25
Coq_Relations_Relation_Operators_clos_refl_trans_1n_0 || semilattice_order || 4.77558908733e-25
Coq_Relations_Relation_Definitions_reflexive || semilattice || 4.68027934344e-25
Coq_Sets_Integers_Integers_0 || im || 4.63215974387e-25
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || measures || 4.61868565076e-25
Coq_Sets_Integers_Integers_0 || re || 4.56993589841e-25
Coq_Relations_Relation_Definitions_equivalence_0 || lattic35693393ce_set || 4.4866290111e-25
Coq_Sets_Cpo_Complete_0 || antisym || 4.43443590415e-25
Coq_Sets_Cpo_Complete_0 || sym || 4.37885427947e-25
Coq_Numbers_Natural_BigN_BigN_BigN_zero || left || 4.30214646362e-25
Coq_Relations_Relation_Operators_clos_refl_trans_0 || lattic1693879045er_set || 4.2865649512e-25
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || groups828474808id_set || 4.17369227501e-25
Coq_Reals_Rdefinitions_R0 || zero_Rep || 4.02379510065e-25
Coq_Structures_OrdersEx_N_as_OT_lcm || id_on || 3.98133388858e-25
Coq_Structures_OrdersEx_N_as_DT_lcm || id_on || 3.98133388858e-25
Coq_Numbers_Natural_Binary_NBinary_N_lcm || id_on || 3.98133388858e-25
Coq_Sorting_Sorted_Sorted_0 || groups_monoid_list || 3.96735040989e-25
Coq_NArith_BinNat_N_lcm || id_on || 3.93518129376e-25
Coq_Sets_Uniset_incl || groups828474808id_set || 3.92238066856e-25
Coq_Relations_Relation_Operators_clos_refl_trans_0 || measure || 3.84303145381e-25
Coq_Arith_PeanoNat_Nat_lcm || id_on || 3.57696890027e-25
Coq_Structures_OrdersEx_Nat_as_DT_lcm || id_on || 3.57696890027e-25
Coq_Structures_OrdersEx_Nat_as_OT_lcm || id_on || 3.57696890027e-25
Coq_Sets_Uniset_seq || groups1716206716st_set || 3.54318758527e-25
Coq_Relations_Relation_Definitions_preorder_0 || lattic35693393ce_set || 3.42516341337e-25
Coq_Relations_Relation_Definitions_antisymmetric || transitive_acyclic || 3.20699313238e-25
Coq_Relations_Relation_Operators_clos_refl_trans_0 || measures || 3.1768689169e-25
Coq_Classes_RelationClasses_relation_equivalence || groups828474808id_set || 3.06630625756e-25
Coq_Relations_Relation_Definitions_PER_0 || lattic35693393ce_set || 3.02221761955e-25
Coq_Sets_Uniset_incl || comm_monoid_axioms || 3.00397395231e-25
Coq_Classes_Morphisms_Normalizes || comm_monoid || 2.97427410184e-25
Coq_Sorting_Sorted_StronglySorted_0 || monoid || 2.97189860671e-25
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || lattic1543629303tr_set || 2.80621143341e-25
Coq_Sets_Uniset_seq || comm_monoid || 2.73658125378e-25
Coq_Relations_Relation_Operators_clos_refl_trans_0 || lexordp_eq || 2.6576104816e-25
Coq_Sets_Relations_2_Rplus_0 || transitive_rtranclp || 2.6399229579e-25
Coq_Sets_Uniset_incl || groups387199878d_list || 2.57231030409e-25
Coq_Numbers_Natural_BigN_BigN_BigN_omake_op || monoid || 2.5407620484e-25
Coq_Reals_Rtrigo_def_sin_n || suc_Rep || 2.47273826863e-25
Coq_Reals_Rtrigo_def_cos_n || suc_Rep || 2.47273826863e-25
Coq_Reals_Rsqrt_def_pow_2_n || suc_Rep || 2.47273826863e-25
Coq_Sets_Relations_2_Rstar1_0 || transitive_tranclp || 2.43507626615e-25
Coq_Numbers_Natural_Binary_NBinary_N_mul || id_on || 2.42568528769e-25
Coq_Structures_OrdersEx_N_as_OT_mul || id_on || 2.42568528769e-25
Coq_Structures_OrdersEx_N_as_DT_mul || id_on || 2.42568528769e-25
Coq_Sets_Ensembles_Complement || rev || 2.39380943197e-25
Coq_Classes_RelationClasses_relation_equivalence || groups387199878d_list || 2.38890532672e-25
Coq_Classes_CRelationClasses_RewriteRelation_0 || semilattice_axioms || 2.38242448181e-25
Coq_NArith_BinNat_N_mul || id_on || 2.35689123921e-25
Coq_Relations_Relation_Definitions_symmetric || semilattice || 2.23459477228e-25
Coq_Reals_RIneq_nonzero || suc_Rep || 2.18259211139e-25
Coq_Arith_PeanoNat_Nat_mul || id_on || 2.1732884477e-25
Coq_Structures_OrdersEx_Nat_as_DT_mul || id_on || 2.1732884477e-25
Coq_Structures_OrdersEx_Nat_as_OT_mul || id_on || 2.1732884477e-25
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || monoid_axioms || 2.06198091585e-25
Coq_Logic_EqdepFacts_Inj_dep_pair_on || semila1450535954axioms || 2.03768334378e-25
Coq_Numbers_Natural_BigN_BigN_BigN_omake_op || semilattice_neutr || 2.00998747812e-25
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || lexordp2 || 2.00048430887e-25
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || lexordp2 || 2.00048430887e-25
Coq_Numbers_Natural_Binary_NBinary_N_lcm || transitive_rtrancl || 1.91757338866e-25
Coq_Structures_OrdersEx_N_as_OT_lcm || transitive_rtrancl || 1.91757338866e-25
Coq_Structures_OrdersEx_N_as_DT_lcm || transitive_rtrancl || 1.91757338866e-25
Coq_NArith_BinNat_N_lcm || transitive_rtrancl || 1.89612558955e-25
Coq_Sorting_Sorted_StronglySorted_0 || groups828474808id_set || 1.89441723793e-25
Coq_NArith_Ndigits_N2Bv_gen || abs_filter || 1.8710727272e-25
Coq_Sets_Cpo_PO_of_cpo || transitive_trancl || 1.81435598364e-25
Coq_Arith_PeanoNat_Nat_lcm || transitive_rtrancl || 1.71782304174e-25
Coq_Structures_OrdersEx_Nat_as_DT_lcm || transitive_rtrancl || 1.71782304174e-25
Coq_Structures_OrdersEx_Nat_as_OT_lcm || transitive_rtrancl || 1.71782304174e-25
Coq_Sets_Cpo_PO_of_cpo || transitive_rtrancl || 1.65164207466e-25
Coq_NArith_Ndigits_Bv2N || rep_filter || 1.62666425691e-25
Coq_Numbers_Natural_BigN_BigN_BigN_make_op || groups_monoid_list || 1.61606638657e-25
Coq_Numbers_Integer_BigZ_BigZ_BigZ_zero || complex || 1.56486060462e-25
Coq_Classes_CRelationClasses_RewriteRelation_0 || abel_semigroup || 1.54535423488e-25
Coq_Relations_Relation_Definitions_antisymmetric || semilattice || 1.50363280542e-25
Coq_Structures_OrdersEx_N_as_OT_mul || transitive_trancl || 1.47790474539e-25
Coq_Structures_OrdersEx_N_as_DT_mul || transitive_trancl || 1.47790474539e-25
Coq_Numbers_Natural_Binary_NBinary_N_mul || transitive_trancl || 1.47790474539e-25
Coq_Classes_CRelationClasses_RewriteRelation_0 || lattic35693393ce_set || 1.44674931341e-25
Coq_NArith_BinNat_N_mul || transitive_trancl || 1.44435475165e-25
Coq_Structures_OrdersEx_N_as_OT_mul || transitive_rtrancl || 1.42192778425e-25
Coq_Structures_OrdersEx_N_as_DT_mul || transitive_rtrancl || 1.42192778425e-25
Coq_Numbers_Natural_Binary_NBinary_N_mul || transitive_rtrancl || 1.42192778425e-25
Coq_NArith_BinNat_N_mul || transitive_rtrancl || 1.39025837924e-25
Coq_Arith_PeanoNat_Nat_mul || transitive_trancl || 1.32231132628e-25
Coq_Structures_OrdersEx_Nat_as_DT_mul || transitive_trancl || 1.32231132628e-25
Coq_Structures_OrdersEx_Nat_as_OT_mul || transitive_trancl || 1.32231132628e-25
Coq_Arith_PeanoNat_Nat_mul || transitive_rtrancl || 1.2722620208e-25
Coq_Structures_OrdersEx_Nat_as_DT_mul || transitive_rtrancl || 1.2722620208e-25
Coq_Structures_OrdersEx_Nat_as_OT_mul || transitive_rtrancl || 1.2722620208e-25
Coq_Sorting_Sorted_Sorted_0 || lattic1543629303tr_set || 1.26727133475e-25
Coq_Reals_Ranalysis1_derivable_pt || semilattice || 1.20312405217e-25
Coq_Numbers_Natural_BigN_BigN_BigN_make_op || lattic1543629303tr_set || 1.17665437258e-25
Coq_ZArith_Znumtheory_prime_prime || groups_monoid_list || 1.17513252813e-25
Coq_Classes_RelationClasses_relation_equivalence || comm_monoid_axioms || 1.16516282872e-25
Coq_Structures_OrdersEx_N_as_OT_divide || antisym || 9.91414990233e-26
Coq_Structures_OrdersEx_N_as_DT_divide || antisym || 9.91414990233e-26
Coq_Numbers_Natural_Binary_NBinary_N_divide || antisym || 9.91414990233e-26
Coq_Structures_OrdersEx_N_as_OT_divide || sym || 9.83212166347e-26
Coq_Structures_OrdersEx_N_as_DT_divide || sym || 9.83212166347e-26
Coq_Numbers_Natural_Binary_NBinary_N_divide || sym || 9.83212166347e-26
Coq_NArith_BinNat_N_divide || antisym || 9.74177858067e-26
Coq_NArith_BinNat_N_divide || sym || 9.66116585344e-26
Coq_Sorting_Sorted_Sorted_0 || monoid_axioms || 9.60404477162e-26
Coq_Arith_PeanoNat_Nat_divide || antisym || 8.87949292758e-26
Coq_Structures_OrdersEx_Nat_as_DT_divide || antisym || 8.87949292758e-26
Coq_Structures_OrdersEx_Nat_as_OT_divide || antisym || 8.87949292758e-26
Coq_Arith_PeanoNat_Nat_divide || sym || 8.80647915716e-26
Coq_Structures_OrdersEx_Nat_as_DT_divide || sym || 8.80647915716e-26
Coq_Structures_OrdersEx_Nat_as_OT_divide || sym || 8.80647915716e-26
Coq_Relations_Relation_Operators_clos_refl_trans_n1_0 || lexordp2 || 8.68974237956e-26
Coq_Logic_EqdepFacts_Eq_dep_eq_on || semilattice_order || 8.48554235496e-26
Coq_Relations_Relation_Operators_clos_refl_trans_1n_0 || lexordp2 || 8.42096138099e-26
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || real_V1127708846m_norm || 8.30192812123e-26
Coq_Numbers_Integer_BigZ_BigZ_BigZ_div2 || cnj || 8.21651409646e-26
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || real_V1127708846m_norm || 8.18272718508e-26
Coq_Lists_Streams_tl || butlast || 7.39805790881e-26
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || pcr_literal cr_literal || 6.85779255538e-26
Coq_Lists_Streams_Str_nth_tl || drop || 6.43427021842e-26
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sgn || cnj || 6.31239532185e-26
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt_up || cnj || 6.20474888414e-26
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sqrt || cnj || 6.1027066833e-26
Coq_ZArith_Znumtheory_prime_0 || monoid || 5.58875399107e-26
Coq_Relations_Relation_Operators_clos_refl_trans_n1_0 || lexordp_eq || 5.41296478137e-26
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || lexordp_eq || 5.32970685222e-26
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || lexordp_eq || 5.32970685222e-26
Coq_Relations_Relation_Operators_clos_refl_trans_1n_0 || lexordp_eq || 4.82516053618e-26
Coq_ZArith_Zgcd_alt_Zgcd_alt || divmod_nat || 4.61456257676e-26
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || lexordp2 || 4.56173770334e-26
__constr_Coq_Init_Datatypes_nat_0_2 || empty || 4.531262812e-26
Coq_ZArith_Zgcd_alt_Zgcd_alt || bNF_Ca646678531ard_of || 4.33174695638e-26
Coq_Relations_Relation_Operators_clos_refl_trans_0 || lexordp2 || 4.09157037783e-26
Coq_Classes_RelationPairs_Measure_0 || real_V1632203528linear || 3.8748514074e-26
Coq_ZArith_Znumtheory_Zis_gcd_0 || divmod_nat_rel || 3.87274244669e-26
Coq_ZArith_Znumtheory_Zis_gcd_0 || bNF_Ca1811156065der_on || 3.24133765309e-26
Coq_Init_Peano_lt || null2 || 2.61452567127e-26
Coq_Numbers_Rational_BigQ_BigQ_BigQ_t || complex || 2.58570995668e-26
Coq_Reals_Ranalysis1_continuity_pt || semilattice_axioms || 2.56959003119e-26
Coq_Numbers_Natural_BigN_BigN_BigN_succ_t || the2 || 2.55759037728e-26
Coq_Init_Peano_le_0 || null2 || 2.52664914394e-26
Coq_ZArith_Znumtheory_prime_prime || lattic1543629303tr_set || 2.4995397503e-26
Coq_Sorting_Sorted_StronglySorted_0 || groups1716206716st_set || 2.4485386551e-26
Coq_Numbers_Natural_BigN_BigN_BigN_pred_t || some || 2.23141919996e-26
Coq_ZArith_Znumtheory_Zis_gcd_0 || order_well_order_on || 2.19446634587e-26
Coq_QArith_QArith_base_Q_0 || real || 2.16230339157e-26
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || groups1716206716st_set || 2.1252151304e-26
Coq_Reals_Ranalysis1_continuity_pt || abel_semigroup || 1.93700624783e-26
Coq_Reals_Ranalysis1_continuity_pt || lattic35693393ce_set || 1.85045719867e-26
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || pcr_real cr_real || 1.81257014964e-26
Coq_Reals_Rdefinitions_Rle || is_none || 1.75551601519e-26
Coq_ZArith_BinInt_Z_gcd || bNF_Ca646678531ard_of || 1.66391581054e-26
Coq_Reals_Rbasic_fun_Rabs || none || 1.56217655327e-26
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || pcr_rat cr_rat || 1.55961656353e-26
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || im || 1.46284050764e-26
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || re || 1.44798588638e-26
Coq_Lists_List_tl || butlast || 1.4335097711e-26
Coq_ZArith_BinInt_Z_gcd || divmod_nat || 1.37199838533e-26
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || pcr_int cr_int || 1.35162451363e-26
Coq_ZArith_Znumtheory_prime_0 || semilattice_neutr || 1.31820380854e-26
Coq_setoid_ring_BinList_jump || drop || 1.23121409875e-26
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || groups828474808id_set || 1.17912218557e-26
Coq_Sorting_Sorted_Sorted_0 || groups828474808id_set || 1.1127590949e-26
Coq_Sorting_Sorted_StronglySorted_0 || comm_monoid || 1.10543394306e-26
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || comm_monoid || 1.08802708643e-26
Coq_ZArith_Znumtheory_Bezout_0 || order_well_order_on || 9.6141230783e-27
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || groups387199878d_list || 8.1987522263e-27
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || code_pcr_natural code_cr_natural || 8.09859586438e-27
Coq_Sorting_Sorted_Sorted_0 || groups387199878d_list || 8.01454223338e-27
Coq_Numbers_Natural_BigN_BigN_BigN_omake_op || semilattice || 7.58617588603e-27
Coq_Sets_Relations_2_Rstar_0 || transitive_rtranclp || 6.51543415852e-27
Coq_Init_Peano_le_0 || is_filter || 6.26073510274e-27
Coq_Relations_Relation_Operators_clos_refl_0 || transitive_rtranclp || 5.77491575049e-27
Coq_FSets_FMapPositive_PositiveMap_empty || id2 || 5.45987314876e-27
Coq_FSets_FMapPositive_PositiveMap_Empty || is_none || 5.26393935897e-27
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || comm_monoid_axioms || 5.12168349524e-27
Coq_PArith_POrderedType_Positive_as_DT_peano_rect || code_rec_natural || 4.90229711692e-27
Coq_PArith_POrderedType_Positive_as_OT_peano_rect || code_rec_natural || 4.90229711692e-27
Coq_Structures_OrdersEx_Positive_as_DT_peano_rect || code_rec_natural || 4.90229711692e-27
Coq_Structures_OrdersEx_Positive_as_OT_peano_rect || code_rec_natural || 4.90229711692e-27
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || suc || 4.84172383648e-27
Coq_Structures_OrdersEx_Z_as_OT_succ || suc || 4.84172383648e-27
Coq_Structures_OrdersEx_Z_as_DT_succ || suc || 4.84172383648e-27
Coq_PArith_POrderedType_Positive_as_DT_peano_rect || rec_nat || 4.75831998092e-27
Coq_PArith_POrderedType_Positive_as_OT_peano_rect || rec_nat || 4.75831998092e-27
Coq_Structures_OrdersEx_Positive_as_DT_peano_rect || rec_nat || 4.75831998092e-27
Coq_Structures_OrdersEx_Positive_as_OT_peano_rect || rec_nat || 4.75831998092e-27
Coq_Numbers_Natural_BigN_BigN_BigN_make_op || lattic35693393ce_set || 4.62312029388e-27
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || implode str || 4.30604169661e-27
Coq_Sorting_Sorted_Sorted_0 || comm_monoid_axioms || 4.28126101939e-27
Coq_ZArith_Znumtheory_Bezout_0 || groups828474808id_set || 4.19681466832e-27
Coq_Lists_Streams_EqSt_0 || c_Predicate_Oeq || 4.16350548885e-27
Coq_Lists_List_lel || c_Predicate_Oeq || 4.16350548885e-27
Coq_ZArith_Znumtheory_Zis_gcd_0 || groups1716206716st_set || 3.89607321634e-27
Coq_Numbers_Natural_BigN_BigN_BigN_omake_op || comm_monoid || 3.75653420092e-27
Coq_FSets_FMapPositive_PositiveMap_empty || none || 3.72011371152e-27
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || code_pcr_integer code_cr_integer || 3.01823968809e-27
Coq_ZArith_Znumtheory_Zis_gcd_0 || comm_monoid || 2.93374932314e-27
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || code_nat_of_natural || 2.90169990018e-27
Coq_Structures_OrdersEx_Z_as_OT_opp || code_nat_of_natural || 2.90169990018e-27
Coq_Structures_OrdersEx_Z_as_DT_opp || code_nat_of_natural || 2.90169990018e-27
Coq_Vectors_Fin_t_0 || rep_Nat || 2.83839800315e-27
Coq_Reals_Rtopology_adherence || rep_Nat || 2.83839800315e-27
Coq_PArith_POrderedType_Positive_as_DT_succ || suc || 2.77401813081e-27
Coq_PArith_POrderedType_Positive_as_OT_succ || suc || 2.77401813081e-27
Coq_Structures_OrdersEx_Positive_as_DT_succ || suc || 2.77401813081e-27
Coq_Structures_OrdersEx_Positive_as_OT_succ || suc || 2.77401813081e-27
Coq_Numbers_Natural_BigN_BigN_BigN_divide || trans || 2.67218951095e-27
Coq_Arith_PeanoNat_Nat_max || rep_filter || 2.65323318076e-27
Coq_ZArith_Znumtheory_Bezout_0 || comm_monoid_axioms || 2.57438938953e-27
Coq_ZArith_Znumtheory_Bezout_0 || groups387199878d_list || 2.48891145449e-27
Coq_Reals_Rtopology_interior || rep_Nat || 2.43581425011e-27
Coq_Logic_FinFun_Finite || nat3 || 2.36797558273e-27
Coq_Reals_Rtopology_closed_set || nat3 || 2.36797558273e-27
Coq_PArith_POrderedType_Positive_as_DT_succ || code_Suc || 2.24225233767e-27
Coq_PArith_POrderedType_Positive_as_OT_succ || code_Suc || 2.24225233767e-27
Coq_Structures_OrdersEx_Positive_as_DT_succ || code_Suc || 2.24225233767e-27
Coq_Structures_OrdersEx_Positive_as_OT_succ || code_Suc || 2.24225233767e-27
__constr_Coq_Init_Datatypes_nat_0_2 || quotient_of || 2.04437053648e-27
Coq_Numbers_Natural_BigN_BigN_BigN_make_op || groups828474808id_set || 1.96089722531e-27
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || code_Suc || 1.90710384612e-27
Coq_Structures_OrdersEx_Z_as_OT_pred || code_Suc || 1.90710384612e-27
Coq_Structures_OrdersEx_Z_as_DT_pred || code_Suc || 1.90710384612e-27
Coq_ZArith_Zdigits_Z_to_binary || pred3 || 1.898827397e-27
Coq_ZArith_Zdigits_binary_value || pred3 || 1.898827397e-27
Coq_FSets_FMapPositive_PositiveMap_Empty || antisym || 1.79274154865e-27
Coq_FSets_FMapPositive_PositiveMap_Empty || sym || 1.77096684895e-27
Coq_Reals_Rtopology_open_set || nat3 || 1.7569759196e-27
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || suc || 1.66413355953e-27
Coq_Structures_OrdersEx_Z_as_OT_pred || suc || 1.66413355953e-27
Coq_Structures_OrdersEx_Z_as_DT_pred || suc || 1.66413355953e-27
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || nat_of_num || 1.60299326756e-27
Coq_Structures_OrdersEx_Z_as_OT_opp || nat_of_num || 1.60299326756e-27
Coq_Structures_OrdersEx_Z_as_DT_opp || nat_of_num || 1.60299326756e-27
Coq_NArith_Ndigits_N2Bv_gen || pred3 || 1.52607802981e-27
Coq_FSets_FMapPositive_PositiveMap_Empty || trans || 1.51974396865e-27
Coq_ZArith_Zdigits_Z_to_binary || eval || 1.5029506271e-27
Coq_ZArith_Zdigits_binary_value || eval || 1.5029506271e-27
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || trans || 1.34299376675e-27
Coq_Init_Datatypes_identity_0 || c_Predicate_Oeq || 1.31094413722e-27
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || inc || 1.25759840089e-27
Coq_Structures_OrdersEx_Z_as_OT_pred || inc || 1.25759840089e-27
Coq_Structures_OrdersEx_Z_as_DT_pred || inc || 1.25759840089e-27
Coq_Numbers_Natural_BigN_BigN_BigN_lcm || id_on || 1.23610929965e-27
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || trans || 1.22288349221e-27
Coq_Structures_OrdersEx_Z_as_OT_divide || trans || 1.22288349221e-27
Coq_Structures_OrdersEx_Z_as_DT_divide || trans || 1.22288349221e-27
Coq_Structures_OrdersEx_Nat_as_DT_max || rep_filter || 1.18435317538e-27
Coq_Structures_OrdersEx_Nat_as_OT_max || rep_filter || 1.18435317538e-27
Coq_Sets_Finite_sets_cardinal_0 || monoid || 1.09712233148e-27
Coq_Sets_Finite_sets_Finite_0 || semigroup || 1.08181992229e-27
Coq_NArith_Ndigits_Bv2N || eval || 1.00843353251e-27
Coq_Init_Nat_add || rep_filter || 9.97064545476e-28
Coq_ZArith_Znumtheory_prime_prime || lattic35693393ce_set || 9.77127134492e-28
Coq_Structures_OrdersEx_Nat_as_DT_add || rep_filter || 9.73529271901e-28
Coq_Structures_OrdersEx_Nat_as_OT_add || rep_filter || 9.73529271901e-28
Coq_Arith_PeanoNat_Nat_add || rep_filter || 9.69882076828e-28
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || code_Suc || 9.65954706738e-28
Coq_Structures_OrdersEx_Z_as_OT_succ || code_Suc || 9.65954706738e-28
Coq_Structures_OrdersEx_Z_as_DT_succ || code_Suc || 9.65954706738e-28
Coq_Sets_Cpo_PO_of_cpo || measure || 8.70459858295e-28
Coq_Logic_ChoiceFacts_FunctionalChoice_on || equiv_equivp || 7.99039066036e-28
Coq_Numbers_Natural_Binary_NBinary_N_divide || distinct || 7.76208078634e-28
Coq_Structures_OrdersEx_N_as_OT_divide || distinct || 7.76208078634e-28
Coq_Structures_OrdersEx_N_as_DT_divide || distinct || 7.76208078634e-28
Coq_NArith_BinNat_N_divide || distinct || 7.72812466701e-28
Coq_Sets_Finite_sets_cardinal_0 || semilattice_neutr || 7.61856967839e-28
Coq_PArith_POrderedType_Positive_as_DT_le || trans || 7.26326657595e-28
Coq_PArith_POrderedType_Positive_as_OT_le || trans || 7.26326657595e-28
Coq_Structures_OrdersEx_Positive_as_DT_le || trans || 7.26326657595e-28
Coq_Structures_OrdersEx_Positive_as_OT_le || trans || 7.26326657595e-28
Coq_Sets_Finite_sets_Finite_0 || semilattice || 7.12153014208e-28
Coq_Arith_PeanoNat_Nat_divide || distinct || 7.11243939218e-28
Coq_Structures_OrdersEx_Nat_as_DT_divide || distinct || 7.11243939218e-28
Coq_Structures_OrdersEx_Nat_as_OT_divide || distinct || 7.11243939218e-28
Coq_Numbers_Natural_BigN_BigN_BigN_mul || id_on || 6.89405988784e-28
Coq_PArith_BinPos_Pos_le || trans || 6.29013092412e-28
Coq_Logic_FinFun_Fin2Restrict_extend || id_on || 6.26516313817e-28
Coq_Numbers_Natural_Binary_NBinary_N_lcm || remdups || 5.93257440306e-28
Coq_Structures_OrdersEx_N_as_OT_lcm || remdups || 5.93257440306e-28
Coq_Structures_OrdersEx_N_as_DT_lcm || remdups || 5.93257440306e-28
Coq_NArith_BinNat_N_lcm || remdups || 5.90831525266e-28
Coq_Classes_SetoidClass_equiv || rep_filter || 5.83304942578e-28
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lcm || id_on || 5.67012318821e-28
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || inc || 5.64194236149e-28
Coq_Structures_OrdersEx_Z_as_OT_succ || inc || 5.64194236149e-28
Coq_Structures_OrdersEx_Z_as_DT_succ || inc || 5.64194236149e-28
Coq_Sets_Ensembles_Inhabited_0 || semigroup || 5.63875679308e-28
Coq_ZArith_Znumtheory_prime_0 || semilattice || 5.49108440034e-28
Coq_Arith_PeanoNat_Nat_lcm || remdups || 5.46667897732e-28
Coq_Structures_OrdersEx_Nat_as_DT_lcm || remdups || 5.46667897732e-28
Coq_Structures_OrdersEx_Nat_as_OT_lcm || remdups || 5.46667897732e-28
Coq_Classes_CRelationClasses_Equivalence_0 || abel_semigroup || 5.4255861009e-28
Coq_Numbers_Integer_Binary_ZBinary_Z_lcm || id_on || 5.20533227833e-28
Coq_Structures_OrdersEx_Z_as_OT_lcm || id_on || 5.20533227833e-28
Coq_Structures_OrdersEx_Z_as_DT_lcm || id_on || 5.20533227833e-28
__constr_Coq_Init_Datatypes_nat_0_2 || code_nat_of_natural || 4.86051837143e-28
Coq_ZArith_Zgcd_alt_Zgcd_alt || id_on || 4.68334698705e-28
Coq_Sets_Cpo_PO_of_cpo || measures || 4.59505603426e-28
Coq_Numbers_Natural_BigN_BigN_BigN_lcm || transitive_trancl || 4.57340677873e-28
Coq_Sets_Ensembles_In || monoid || 4.54498527639e-28
Coq_Logic_FinFun_bFun || trans || 4.38123035055e-28
Coq_Numbers_Natural_BigN_BigN_BigN_lcm || transitive_rtrancl || 4.33202313907e-28
Coq_NArith_Ndigits_Bv2N || pred3 || 4.31431317518e-28
Coq_Sets_Cpo_Complete_0 || wf || 4.22041317353e-28
Coq_NArith_Ndigits_N2Bv_gen || eval || 4.14752088076e-28
Coq_Numbers_Natural_BigN_BigN_BigN_divide || antisym || 4.11530077753e-28
Coq_Numbers_Natural_BigN_BigN_BigN_divide || sym || 4.07831838354e-28
Coq_ZArith_Znumtheory_Zis_gcd_0 || refl_on || 4.07236450848e-28
Coq_Sets_Finite_sets_Finite_0 || abel_semigroup || 4.0568793666e-28
Coq_Sets_Finite_sets_cardinal_0 || comm_monoid || 4.03035627342e-28
Coq_PArith_POrderedType_Positive_as_DT_max || transitive_trancl || 3.79099944167e-28
Coq_PArith_POrderedType_Positive_as_OT_max || transitive_trancl || 3.79099944167e-28
Coq_Structures_OrdersEx_Positive_as_DT_max || transitive_trancl || 3.79099944167e-28
Coq_Structures_OrdersEx_Positive_as_OT_max || transitive_trancl || 3.79099944167e-28
Coq_Logic_ChoiceFacts_RelationalChoice_on || equiv_part_equivp || 3.67475595256e-28
Coq_Init_Peano_lt || equiv_equivp || 3.46845536113e-28
Coq_Numbers_Integer_BigZ_BigZ_BigZ_mul || id_on || 3.34119370857e-28
Coq_Numbers_Natural_BigN_BigN_BigN_mul || transitive_trancl || 3.30495399482e-28
Coq_PArith_BinPos_Pos_max || transitive_trancl || 3.25842996897e-28
Coq_Sets_Ensembles_Inhabited_0 || semilattice || 3.20325031598e-28
Coq_Numbers_Natural_BigN_BigN_BigN_mul || transitive_rtrancl || 3.17687940242e-28
Coq_Logic_ChoiceFacts_RelationalChoice_on || reflp || 3.09079952552e-28
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || id_on || 3.06489258409e-28
Coq_Structures_OrdersEx_Z_as_OT_mul || id_on || 3.06489258409e-28
Coq_Structures_OrdersEx_Z_as_DT_mul || id_on || 3.06489258409e-28
Coq_ZArith_BinInt_Z_divide || trans || 2.90559760156e-28
Coq_Numbers_Natural_Binary_NBinary_N_lcm || remdups_adj || 2.75765426291e-28
Coq_Structures_OrdersEx_N_as_OT_lcm || remdups_adj || 2.75765426291e-28
Coq_Structures_OrdersEx_N_as_DT_lcm || remdups_adj || 2.75765426291e-28
Coq_NArith_BinNat_N_lcm || remdups_adj || 2.74619526852e-28
Coq_Sets_Ensembles_In || semilattice_neutr || 2.72832785338e-28
Coq_Classes_CRelationClasses_RewriteRelation_0 || abel_s1917375468axioms || 2.69993437318e-28
Coq_Logic_ChoiceFacts_GuardedRelationalChoice_on || equiv_equivp || 2.69395057107e-28
Coq_PArith_POrderedType_Positive_as_DT_max || id_on || 2.54574535871e-28
Coq_PArith_POrderedType_Positive_as_OT_max || id_on || 2.54574535871e-28
Coq_Structures_OrdersEx_Positive_as_DT_max || id_on || 2.54574535871e-28
Coq_Structures_OrdersEx_Positive_as_OT_max || id_on || 2.54574535871e-28
Coq_Arith_PeanoNat_Nat_lcm || remdups_adj || 2.53777608804e-28
Coq_Structures_OrdersEx_Nat_as_DT_lcm || remdups_adj || 2.53777608804e-28
Coq_Structures_OrdersEx_Nat_as_OT_lcm || remdups_adj || 2.53777608804e-28
Coq_QArith_QArith_base_Qle || trans || 2.40843734078e-28
Coq_QArith_Qabs_Qabs || id2 || 2.30766977017e-28
Coq_Sets_Ensembles_Inhabited_0 || abel_semigroup || 2.26640702947e-28
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lcm || transitive_trancl || 2.22173151075e-28
Coq_PArith_BinPos_Pos_max || id_on || 2.17350439029e-28
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || c_Predicate_Oeq || 2.15207968424e-28
Coq_ZArith_Zdiv_eqm || c_Predicate_Oeq || 2.15207968424e-28
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || equiv_part_equivp || 2.13569675487e-28
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lcm || transitive_rtrancl || 2.11090423505e-28
Coq_Numbers_Integer_Binary_ZBinary_Z_lcm || transitive_trancl || 2.031191327e-28
Coq_Structures_OrdersEx_Z_as_OT_lcm || transitive_trancl || 2.031191327e-28
Coq_Structures_OrdersEx_Z_as_DT_lcm || transitive_trancl || 2.031191327e-28
Coq_Sets_Relations_3_coherent || semila1450535954axioms || 1.97925868509e-28
__constr_Coq_Init_Datatypes_nat_0_2 || code_int_of_integer || 1.95310742638e-28
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || antisym || 1.94547065664e-28
Coq_Numbers_Integer_Binary_ZBinary_Z_lcm || transitive_rtrancl || 1.92981370674e-28
Coq_Structures_OrdersEx_Z_as_OT_lcm || transitive_rtrancl || 1.92981370674e-28
Coq_Structures_OrdersEx_Z_as_DT_lcm || transitive_rtrancl || 1.92981370674e-28
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || sym || 1.92825658516e-28
Coq_Logic_FinFun_bFun || antisym || 1.89768281601e-28
Coq_Logic_FinFun_bFun || sym || 1.87506991302e-28
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || reflp || 1.86261704734e-28
Coq_Sets_Ensembles_In || comm_monoid || 1.80462510314e-28
Coq_Reals_Rtopology_included || is_none || 1.79510955681e-28
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || antisym || 1.78175512283e-28
Coq_Structures_OrdersEx_Z_as_OT_divide || antisym || 1.78175512283e-28
Coq_Structures_OrdersEx_Z_as_DT_divide || antisym || 1.78175512283e-28
Coq_Init_Peano_le_0 || equiv_part_equivp || 1.77067018016e-28
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || sym || 1.76607511181e-28
Coq_Structures_OrdersEx_Z_as_OT_divide || sym || 1.76607511181e-28
Coq_Structures_OrdersEx_Z_as_DT_divide || sym || 1.76607511181e-28
Coq_Classes_CRelationClasses_RewriteRelation_0 || semigroup || 1.76272630788e-28
Coq_Numbers_Integer_BigZ_BigZ_BigZ_mul || transitive_trancl || 1.64308161357e-28
Coq_Init_Peano_le_0 || reflp || 1.62155702563e-28
Coq_ZArith_BinInt_Z_gcd || id_on || 1.58878151416e-28
Coq_Numbers_Integer_BigZ_BigZ_BigZ_mul || transitive_rtrancl || 1.58162162587e-28
Coq_QArith_Qminmax_Qmax || id_on || 1.5437679156e-28
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || transitive_trancl || 1.5025254064e-28
Coq_Structures_OrdersEx_Z_as_OT_mul || transitive_trancl || 1.5025254064e-28
Coq_Structures_OrdersEx_Z_as_DT_mul || transitive_trancl || 1.5025254064e-28
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || transitive_rtrancl || 1.44627911837e-28
Coq_Structures_OrdersEx_Z_as_OT_mul || transitive_rtrancl || 1.44627911837e-28
Coq_Structures_OrdersEx_Z_as_DT_mul || transitive_rtrancl || 1.44627911837e-28
Coq_PArith_POrderedType_Positive_as_DT_lt || bNF_Wellorder_wo_rel || 1.43231029766e-28
Coq_PArith_POrderedType_Positive_as_OT_lt || bNF_Wellorder_wo_rel || 1.43231029766e-28
Coq_Structures_OrdersEx_Positive_as_DT_lt || bNF_Wellorder_wo_rel || 1.43231029766e-28
Coq_Structures_OrdersEx_Positive_as_OT_lt || bNF_Wellorder_wo_rel || 1.43231029766e-28
Coq_ZArith_Zdigits_Z_to_binary || the2 || 1.41864336665e-28
Coq_ZArith_BinInt_Z_lcm || id_on || 1.39069842539e-28
Coq_QArith_QArith_base_Qle || antisym || 1.29041038283e-28
Coq_Sets_Relations_3_Confluent || transitive_acyclic || 1.22523778777e-28
Coq_Reals_Rtopology_adherence || none || 1.21648458263e-28
Coq_PArith_BinPos_Pos_lt || bNF_Wellorder_wo_rel || 1.21300816897e-28
Coq_NArith_Ndigits_N2Bv_gen || the2 || 1.1609598178e-28
Coq_Lists_List_rev || basic_BNF_xtor || 1.12275508341e-28
Coq_ZArith_Zdigits_binary_value || some || 1.11877883891e-28
Coq_Numbers_Natural_Binary_NBinary_N_mul || remdups || 1.1183404962e-28
Coq_Structures_OrdersEx_N_as_OT_mul || remdups || 1.1183404962e-28
Coq_Structures_OrdersEx_N_as_DT_mul || remdups || 1.1183404962e-28
Coq_Classes_RelationClasses_Symmetric || is_filter || 1.10586991147e-28
Coq_NArith_BinNat_N_mul || remdups || 1.09872781869e-28
Coq_PArith_POrderedType_Positive_as_DT_max || transitive_rtrancl || 1.09611421267e-28
Coq_PArith_POrderedType_Positive_as_OT_max || transitive_rtrancl || 1.09611421267e-28
Coq_Structures_OrdersEx_Positive_as_DT_max || transitive_rtrancl || 1.09611421267e-28
Coq_Structures_OrdersEx_Positive_as_OT_max || transitive_rtrancl || 1.09611421267e-28
Coq_Classes_RelationClasses_Reflexive || is_filter || 1.08109146731e-28
Coq_Classes_RelationClasses_Transitive || is_filter || 1.05773320179e-28
Coq_Logic_FinFun_Fin2Restrict_extend || transitive_trancl || 1.02744648835e-28
Coq_Arith_PeanoNat_Nat_mul || remdups || 1.02714864356e-28
Coq_Structures_OrdersEx_Nat_as_DT_mul || remdups || 1.02714864356e-28
Coq_Structures_OrdersEx_Nat_as_OT_mul || remdups || 1.02714864356e-28
Coq_Logic_FinFun_Fin2Restrict_extend || transitive_rtrancl || 9.57991203597e-29
Coq_PArith_BinPos_Pos_max || transitive_rtrancl || 9.44313478539e-29
Coq_QArith_QArith_base_Qle || sym || 8.71060489511e-29
Coq_Sets_Relations_2_Strongly_confluent || wf || 8.58451075777e-29
Coq_Classes_RelationClasses_Equivalence_0 || is_filter || 8.38890166891e-29
Coq_PArith_POrderedType_Positive_as_DT_le || antisym || 8.06877723177e-29
Coq_PArith_POrderedType_Positive_as_OT_le || antisym || 8.06877723177e-29
Coq_Structures_OrdersEx_Positive_as_DT_le || antisym || 8.06877723177e-29
Coq_Structures_OrdersEx_Positive_as_OT_le || antisym || 8.06877723177e-29
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || pred_maxchain || 8.04472391748e-29
Coq_Sets_Relations_2_Rstar_0 || semilattice_order || 7.84763951647e-29
Coq_NArith_Ndigits_Bv2N || some || 7.76321861286e-29
Coq_Reals_Rtopology_adherence || id2 || 7.67942023678e-29
Coq_QArith_QArith_base_Qlt || bNF_Wellorder_wo_rel || 6.90783973401e-29
Coq_PArith_BinPos_Pos_le || antisym || 6.89239085893e-29
Coq_ZArith_BinInt_Z_mul || id_on || 6.85678796051e-29
Coq_Sorting_Heap_is_heap_0 || pred_option || 6.83773877166e-29
Coq_Arith_Between_in_int || monoid || 6.6141466107e-29
Coq_Classes_CRelationClasses_Equivalence_0 || equiv_equivp || 6.14828865762e-29
Coq_Numbers_Natural_BigN_BigN_BigN_pred_t || bNF_Ca646678531ard_of || 6.00511658823e-29
Coq_Relations_Relation_Operators_clos_trans_0 || pred_maxchain || 5.52323084468e-29
Coq_ZArith_BinInt_Z_lcm || transitive_trancl || 5.13586159301e-29
Coq_ZArith_Znumtheory_prime_prime || groups828474808id_set || 5.02994118293e-29
Coq_ZArith_BinInt_Z_lcm || transitive_rtrancl || 4.87730345771e-29
Coq_Numbers_Natural_BigN_BigN_BigN_succ_t || field2 || 4.57428613739e-29
Coq_ZArith_BinInt_Z_divide || antisym || 4.3965241872e-29
Coq_ZArith_BinInt_Z_divide || sym || 4.36042209251e-29
Coq_PArith_POrderedType_Positive_as_DT_le || sym || 4.27057887954e-29
Coq_PArith_POrderedType_Positive_as_OT_le || sym || 4.27057887954e-29
Coq_Structures_OrdersEx_Positive_as_DT_le || sym || 4.27057887954e-29
Coq_Structures_OrdersEx_Positive_as_OT_le || sym || 4.27057887954e-29
Coq_Logic_EqdepFacts_Inj_dep_pair_on || semilattice_order || 4.19364299919e-29
Coq_QArith_Qminmax_Qmax || transitive_trancl || 4.08153184361e-29
Coq_Relations_Relation_Definitions_preorder_0 || trans || 4.00967943257e-29
Coq_Logic_EqdepFacts_Eq_dep_eq_on || lattic1693879045er_set || 3.93307015509e-29
Coq_Relations_Relation_Operators_clos_refl_trans_0 || pred_maxchain || 3.90000038238e-29
Coq_QArith_Qminmax_Qmax || transitive_rtrancl || 3.88373599218e-29
Coq_Logic_ChoiceFacts_FunctionalChoice_on || bNF_Wellorder_wo_rel || 3.87664572277e-29
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || pred_chain || 3.82710128046e-29
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || pred_chain || 3.82710128046e-29
Coq_Reals_Ranalysis1_derivable_pt || abel_semigroup || 3.7913337286e-29
Coq_PArith_BinPos_Pos_le || sym || 3.65652344717e-29
__constr_Coq_Sorting_Heap_Tree_0_1 || none || 3.5472307146e-29
Coq_Init_Peano_lt || semigroup || 3.49923107515e-29
Coq_ZArith_Znumtheory_prime_0 || comm_monoid || 3.454550821e-29
Coq_ZArith_BinInt_Z_mul || transitive_trancl || 3.43661477609e-29
Coq_Relations_Relation_Operators_clos_refl_trans_0 || id_on || 3.33200568885e-29
Coq_ZArith_BinInt_Z_mul || transitive_rtrancl || 3.31878834443e-29
Coq_Relations_Relation_Operators_clos_trans_n1_0 || pred_chain || 2.89339517953e-29
Coq_Relations_Relation_Operators_clos_trans_1n_0 || pred_chain || 2.89339517953e-29
Coq_Logic_EqdepFacts_Inj_dep_pair_on || pred_chain || 2.78923111405e-29
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || pred_chain || 2.76354200777e-29
Coq_Reals_Rtopology_included || antisym || 2.74904688641e-29
Coq_Reals_Rtopology_included || sym || 2.71773505781e-29
Coq_Relations_Relation_Operators_clos_trans_0 || pred_chain || 2.70696816196e-29
Coq_Logic_EqdepFacts_Eq_dep_eq_on || pred_maxchain || 2.61208078722e-29
Coq_Reals_Rtopology_included || trans || 2.35352748808e-29
Coq_Classes_CRelationClasses_RewriteRelation_0 || equiv_part_equivp || 2.23305984841e-29
Coq_PArith_POrderedType_Positive_as_DT_SubMaskSpec_0 || divmod_nat_rel || 2.20684051378e-29
Coq_PArith_POrderedType_Positive_as_OT_SubMaskSpec_0 || divmod_nat_rel || 2.20684051378e-29
Coq_Structures_OrdersEx_Positive_as_DT_SubMaskSpec_0 || divmod_nat_rel || 2.20684051378e-29
Coq_Structures_OrdersEx_Positive_as_OT_SubMaskSpec_0 || divmod_nat_rel || 2.20684051378e-29
Coq_Logic_EqdepFacts_Inj_dep_pair_on || lexordp_eq || 2.14459808444e-29
Coq_Logic_ChoiceFacts_RelationalChoice_on || antisym || 2.00711136344e-29
Coq_Relations_Relation_Operators_clos_refl_trans_n1_0 || pred_chain || 1.99869967439e-29
Coq_Relations_Relation_Operators_clos_refl_trans_1n_0 || pred_chain || 1.92918242739e-29
Coq_Relations_Relation_Operators_clos_trans_n1_0 || pred_maxchain || 1.92006825391e-29
Coq_Relations_Relation_Operators_clos_trans_1n_0 || pred_maxchain || 1.92006825391e-29
Coq_PArith_BinPos_Pos_SubMaskSpec_0 || divmod_nat_rel || 1.91305937801e-29
Coq_Classes_CRelationClasses_RewriteRelation_0 || reflp || 1.89210583905e-29
Coq_Arith_Between_between_0 || c_Predicate_Oeq || 1.80104363167e-29
Coq_Relations_Relation_Operators_clos_trans_0 || lexordp_eq || 1.79316827997e-29
Coq_PArith_POrderedType_Positive_as_DT_sub_mask || divmod_nat || 1.77958936657e-29
Coq_PArith_POrderedType_Positive_as_OT_sub_mask || divmod_nat || 1.77958936657e-29
Coq_Structures_OrdersEx_Positive_as_DT_sub_mask || divmod_nat || 1.77958936657e-29
Coq_Structures_OrdersEx_Positive_as_OT_sub_mask || divmod_nat || 1.77958936657e-29
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || pred_maxchain || 1.77530521931e-29
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || pred_maxchain || 1.77530521931e-29
Coq_Logic_ChoiceFacts_RelationalChoice_on || trans || 1.66738574162e-29
Coq_Relations_Relation_Operators_clos_refl_trans_0 || pred_chain || 1.66236836442e-29
Coq_PArith_BinPos_Pos_sub_mask || divmod_nat || 1.5236941225e-29
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || id_on || 1.52187237723e-29
Coq_Logic_EqdepFacts_Eq_dep_eq_on || lexordp2 || 1.49530570066e-29
Coq_ZArith_Zsqrt_compat_Zsqrt_plain || groups_monoid_list || 1.40298968475e-29
Coq_Relations_Relation_Definitions_equivalence_0 || trans || 1.39019339028e-29
Coq_Logic_ChoiceFacts_GuardedRelationalChoice_on || bNF_Wellorder_wo_rel || 1.34251792888e-29
Coq_Relations_Relation_Operators_clos_trans_0 || lexordp2 || 1.30072691741e-29
Coq_Relations_Relation_Definitions_preorder_0 || antisym || 1.22927706477e-29
Coq_Relations_Relation_Definitions_preorder_0 || sym || 1.2132272536e-29
Coq_Reals_AltSeries_PI_tg || zero_Rep || 1.18511647875e-29
Coq_Reals_Ranalysis1_continuity_pt || abel_s1917375468axioms || 1.17804262847e-29
Coq_Relations_Relation_Operators_clos_refl_trans_n1_0 || pred_maxchain || 1.15205036533e-29
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || antisym || 1.12322324957e-29
Coq_Relations_Relation_Operators_clos_refl_trans_1n_0 || pred_maxchain || 1.10038948763e-29
Coq_Relations_Relation_Operators_clos_trans_n1_0 || lexordp2 || 1.01650475349e-29
Coq_Relations_Relation_Operators_clos_trans_1n_0 || lexordp2 || 1.01650475349e-29
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || trans || 9.73888912784e-30
Coq_Lists_SetoidPermutation_PermutationA_0 || transitive_rtranclp || 9.21689079212e-30
Coq_ZArith_BinInt_Z_sqrt || monoid || 9.19790675796e-30
Coq_Reals_Ranalysis1_continuity_pt || semigroup || 8.98422138418e-30
Coq_Reals_Ranalysis1_derivable_pt || equiv_equivp || 8.95833339787e-30
Coq_Relations_Relation_Operators_clos_trans_n1_0 || lexordp_eq || 8.41583682173e-30
Coq_Relations_Relation_Operators_clos_trans_1n_0 || lexordp_eq || 8.41583682173e-30
Coq_Reals_SeqProp_Un_decreasing || nat3 || 8.34906657987e-30
Coq_Relations_Relation_Operators_clos_refl_trans_0 || transitive_trancl || 8.32877772743e-30
Coq_Init_Wf_well_founded || is_filter || 8.06106311827e-30
Coq_Arith_Wf_nat_gtof || rep_filter || 7.93992696986e-30
Coq_Arith_Wf_nat_ltof || rep_filter || 7.93992696986e-30
Coq_Relations_Relation_Operators_clos_refl_trans_0 || transitive_rtrancl || 7.86989031026e-30
Coq_Lists_List_incl || c_Predicate_Oeq || 7.20555817641e-30
Coq_PArith_POrderedType_Positive_as_DT_sub_mask || bNF_Ca646678531ard_of || 6.97099909491e-30
Coq_PArith_POrderedType_Positive_as_OT_sub_mask || bNF_Ca646678531ard_of || 6.97099909491e-30
Coq_Structures_OrdersEx_Positive_as_DT_sub_mask || bNF_Ca646678531ard_of || 6.97099909491e-30
Coq_Structures_OrdersEx_Positive_as_OT_sub_mask || bNF_Ca646678531ard_of || 6.97099909491e-30
Coq_Numbers_Integer_BigZ_BigZ_BigZ_opp || cnj || 6.40156460636e-30
Coq_PArith_BinPos_Pos_sub_mask || bNF_Ca646678531ard_of || 6.04150913337e-30
Coq_ZArith_Zsqrt_compat_Zsqrt_plain || lattic1543629303tr_set || 5.37588928267e-30
Coq_Relations_Relation_Definitions_equivalence_0 || antisym || 5.03282142047e-30
Coq_Relations_Relation_Definitions_equivalence_0 || sym || 4.97527411662e-30
Coq_Relations_Relation_Definitions_inclusion || divmod_nat_rel || 4.61362317182e-30
Coq_Arith_Wf_nat_inv_lt_rel || rep_filter || 4.494840673e-30
Coq_PArith_POrderedType_Positive_as_DT_SubMaskSpec_0 || order_well_order_on || 4.36631175905e-30
Coq_PArith_POrderedType_Positive_as_OT_SubMaskSpec_0 || order_well_order_on || 4.36631175905e-30
Coq_Structures_OrdersEx_Positive_as_DT_SubMaskSpec_0 || order_well_order_on || 4.36631175905e-30
Coq_Structures_OrdersEx_Positive_as_OT_SubMaskSpec_0 || order_well_order_on || 4.36631175905e-30
Coq_Numbers_Natural_BigN_BigN_BigN_succ || none || 4.20628092713e-30
Coq_Lists_SetoidList_eqlistA_0 || transitive_tranclp || 4.10375288783e-30
Coq_PArith_POrderedType_Positive_as_DT_SubMaskSpec_0 || bNF_Ca1811156065der_on || 4.04235470368e-30
Coq_PArith_POrderedType_Positive_as_OT_SubMaskSpec_0 || bNF_Ca1811156065der_on || 4.04235470368e-30
Coq_Structures_OrdersEx_Positive_as_DT_SubMaskSpec_0 || bNF_Ca1811156065der_on || 4.04235470368e-30
Coq_Structures_OrdersEx_Positive_as_OT_SubMaskSpec_0 || bNF_Ca1811156065der_on || 4.04235470368e-30
Coq_Init_Nat_mul || nat_tsub || 4.00392004785e-30
Coq_Numbers_Natural_Binary_NBinary_N_succ || none || 3.90877849444e-30
Coq_Structures_OrdersEx_N_as_OT_succ || none || 3.90877849444e-30
Coq_Structures_OrdersEx_N_as_DT_succ || none || 3.90877849444e-30
Coq_Arith_Even_even_1 || nat_is_nat || 3.88518136412e-30
Coq_Relations_Relation_Operators_clos_trans_0 || divmod_nat || 3.87871818157e-30
Coq_PArith_BinPos_Pos_SubMaskSpec_0 || order_well_order_on || 3.8163560184e-30
Coq_ZArith_BinInt_Z_sqrt || semilattice_neutr || 3.80468887142e-30
Coq_Numbers_Integer_BigZ_BigZ_BigZ_even || re || 3.63128340867e-30
Coq_Sets_Partial_Order_Carrier_of || id_on || 3.54896431722e-30
Coq_Numbers_Integer_BigZ_BigZ_BigZ_odd || re || 3.54063271571e-30
Coq_PArith_BinPos_Pos_SubMaskSpec_0 || bNF_Ca1811156065der_on || 3.53234296785e-30
Coq_NArith_BinNat_N_succ || none || 3.46257169849e-30
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || none || 3.20917941002e-30
Coq_Structures_OrdersEx_Z_as_OT_succ || none || 3.20917941002e-30
Coq_Structures_OrdersEx_Z_as_DT_succ || none || 3.20917941002e-30
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || transitive_trancl || 3.14623057306e-30
Coq_Numbers_Integer_BigZ_BigZ_BigZ_succ || none || 3.05972106505e-30
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || transitive_rtrancl || 2.96432393539e-30
Coq_Relations_Relation_Operators_clos_trans_0 || bNF_Ca646678531ard_of || 2.82991869794e-30
Coq_Lists_List_rev || transitive_trancl || 2.81074027189e-30
Coq_Lists_List_ForallPairs || groups_monoid_list || 2.6962622712e-30
Coq_ZArith_BinInt_Z_Odd || monoid || 2.6558784822e-30
Coq_Numbers_Natural_BigN_BigN_BigN_lt || is_none || 2.62615004067e-30
Coq_Sets_Ensembles_Inhabited_0 || trans || 2.57187141002e-30
Coq_Numbers_Natural_BigN_BigN_BigN_le || is_none || 2.54437218869e-30
Coq_ZArith_Zeven_Zodd || groups_monoid_list || 2.49955340227e-30
Coq_Numbers_Natural_Binary_NBinary_N_lt || is_none || 2.4398472194e-30
Coq_Structures_OrdersEx_N_as_OT_lt || is_none || 2.4398472194e-30
Coq_Structures_OrdersEx_N_as_DT_lt || is_none || 2.4398472194e-30
Coq_Numbers_Natural_Binary_NBinary_N_le || is_none || 2.35960462771e-30
Coq_Structures_OrdersEx_N_as_OT_le || is_none || 2.35960462771e-30
Coq_Structures_OrdersEx_N_as_DT_le || is_none || 2.35960462771e-30
Coq_Init_Datatypes_length || transitive_rtrancl || 2.35439114611e-30
Coq_Sets_Uniset_seq || c_Predicate_Oeq || 2.32850236319e-30
Coq_Logic_EqdepFacts_Inj_dep_pair_on || transitive_rtranclp || 2.28913474777e-30
Coq_Reals_Ranalysis1_continuity_pt || equiv_part_equivp || 2.27202347505e-30
Coq_Arith_PeanoNat_Nat_Odd || monoid || 2.26740981609e-30
Coq_NArith_BinNat_N_lt || is_none || 2.16074503582e-30
Coq_NArith_BinNat_N_le || is_none || 2.0987422526e-30
Coq_Reals_Ranalysis1_continuity_pt || reflp || 2.03113041737e-30
Coq_Logic_EqdepFacts_Eq_dep_eq_on || transitive_tranclp || 1.92457465717e-30
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || is_none || 1.90562139377e-30
Coq_Structures_OrdersEx_Z_as_OT_lt || is_none || 1.90562139377e-30
Coq_Structures_OrdersEx_Z_as_DT_lt || is_none || 1.90562139377e-30
Coq_Arith_Even_even_1 || groups_monoid_list || 1.82890898421e-30
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || is_none || 1.82860170205e-30
Coq_Numbers_Integer_Binary_ZBinary_Z_le || is_none || 1.79944194321e-30
Coq_Structures_OrdersEx_Z_as_OT_le || is_none || 1.79944194321e-30
Coq_Structures_OrdersEx_Z_as_DT_le || is_none || 1.79944194321e-30
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || is_none || 1.72988692683e-30
Coq_Relations_Relation_Definitions_inclusion || order_well_order_on || 1.71988664884e-30
Coq_ZArith_BinInt_Z_Odd || semilattice_neutr || 1.71511520353e-30
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || c_Predicate_Oeq || 1.67873282977e-30
Coq_Arith_PeanoNat_Nat_Odd || semilattice_neutr || 1.65674692208e-30
Coq_Lists_List_ForallOrdPairs_0 || monoid || 1.6399778368e-30
Coq_Relations_Relation_Definitions_inclusion || bNF_Ca1811156065der_on || 1.59953109017e-30
Coq_ZArith_Zeven_Zodd || lattic1543629303tr_set || 1.51322722723e-30
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || induct_implies || 1.49667904027e-30
Coq_Structures_OrdersEx_Z_as_OT_mul || induct_implies || 1.49667904027e-30
Coq_Structures_OrdersEx_Z_as_DT_mul || induct_implies || 1.49667904027e-30
Coq_Arith_Even_even_0 || nat_is_nat || 1.2920007053e-30
Coq_QArith_Qcanon_Qcmult || induct_implies || 1.28678491109e-30
Coq_Sets_Ensembles_Union_0 || insert3 || 1.26920941479e-30
Coq_Init_Nat_add || nat_tsub || 1.25845652471e-30
Coq_Arith_Even_even_1 || lattic1543629303tr_set || 1.2570332505e-30
Coq_QArith_Qcanon_Qcplus || induct_conj || 1.24861504507e-30
Coq_Sets_Multiset_meq || c_Predicate_Oeq || 1.23472502263e-30
Coq_Sets_Ensembles_Inhabited_0 || antisym || 1.05394729087e-30
Coq_Sets_Ensembles_Inhabited_0 || sym || 1.04364359609e-30
Coq_ZArith_BinInt_Z_Even || monoid || 1.03231939514e-30
Coq_ZArith_Zeven_Zeven || groups_monoid_list || 1.02028505334e-30
Coq_Sets_Ensembles_Included || member3 || 9.94612747019e-31
__constr_Coq_Numbers_BinNums_positive_0_2 || nat2 || 9.7620525218e-31
Coq_Sets_Uniset_incl || monoid || 8.99837077008e-31
Coq_Numbers_Integer_Binary_ZBinary_Z_sub || induct_conj || 8.60924431558e-31
Coq_Structures_OrdersEx_Z_as_OT_sub || induct_conj || 8.60924431558e-31
Coq_Structures_OrdersEx_Z_as_DT_sub || induct_conj || 8.60924431558e-31
Coq_Reals_Rdefinitions_Rmult || induct_implies || 8.41021595476e-31
Coq_Init_Peano_le_0 || finite_finite2 || 8.25176828456e-31
Coq_ZArith_BinInt_Z_succ || none || 8.17224179196e-31
Coq_Lists_List_ForallPairs || lattic1543629303tr_set || 8.11465227271e-31
Coq_Sets_Uniset_incl || semilattice_neutr || 7.40568538278e-31
Coq_Numbers_Integer_Binary_ZBinary_Z_add || induct_conj || 7.24972623541e-31
Coq_Structures_OrdersEx_Z_as_OT_add || induct_conj || 7.24972623541e-31
Coq_Structures_OrdersEx_Z_as_DT_add || induct_conj || 7.24972623541e-31
Coq_Classes_RelationClasses_subrelation || c_Predicate_Oeq || 7.03405767684e-31
Coq_Arith_PeanoNat_Nat_lor || induct_implies || 6.67942090429e-31
Coq_Numbers_Natural_Binary_NBinary_N_lor || induct_implies || 6.67942090429e-31
Coq_Structures_OrdersEx_N_as_OT_lor || induct_implies || 6.67942090429e-31
Coq_Structures_OrdersEx_N_as_DT_lor || induct_implies || 6.67942090429e-31
Coq_Structures_OrdersEx_Nat_as_DT_lor || induct_implies || 6.67942090429e-31
Coq_Structures_OrdersEx_Nat_as_OT_lor || induct_implies || 6.67942090429e-31
Coq_Arith_PeanoNat_Nat_land || induct_implies || 6.50680080293e-31
Coq_Numbers_Natural_Binary_NBinary_N_land || induct_implies || 6.50680080293e-31
Coq_Structures_OrdersEx_N_as_OT_land || induct_implies || 6.50680080293e-31
Coq_Structures_OrdersEx_N_as_DT_land || induct_implies || 6.50680080293e-31
Coq_Structures_OrdersEx_Nat_as_DT_land || induct_implies || 6.50680080293e-31
Coq_Structures_OrdersEx_Nat_as_OT_land || induct_implies || 6.50680080293e-31
Coq_ZArith_BinInt_Z_Even || semilattice_neutr || 6.50017841313e-31
Coq_Sets_Partial_Order_Carrier_of || transitive_trancl || 6.24864999121e-31
Coq_QArith_Qcanon_Qclt || semilattice || 6.19513768169e-31
Coq_Arith_PeanoNat_Nat_land || induct_conj || 6.0422377068e-31
Coq_Numbers_Natural_Binary_NBinary_N_land || induct_conj || 6.0422377068e-31
Coq_Structures_OrdersEx_N_as_OT_land || induct_conj || 6.0422377068e-31
Coq_Structures_OrdersEx_N_as_DT_land || induct_conj || 6.0422377068e-31
Coq_Structures_OrdersEx_Nat_as_DT_land || induct_conj || 6.0422377068e-31
Coq_Structures_OrdersEx_Nat_as_OT_land || induct_conj || 6.0422377068e-31
Coq_ZArith_Zeven_Zeven || lattic1543629303tr_set || 6.0296918637e-31
Coq_Arith_PeanoNat_Nat_lor || induct_conj || 5.98091767729e-31
Coq_Numbers_Natural_Binary_NBinary_N_lor || induct_conj || 5.98091767729e-31
Coq_Structures_OrdersEx_N_as_OT_lor || induct_conj || 5.98091767729e-31
Coq_Structures_OrdersEx_N_as_DT_lor || induct_conj || 5.98091767729e-31
Coq_Structures_OrdersEx_Nat_as_DT_lor || induct_conj || 5.98091767729e-31
Coq_Structures_OrdersEx_Nat_as_OT_lor || induct_conj || 5.98091767729e-31
Coq_Sets_Partial_Order_Carrier_of || transitive_rtrancl || 5.88275310382e-31
Coq_Sets_Uniset_seq || groups_monoid_list || 5.79181079765e-31
Coq_ZArith_Zeven_Zeven || nat_is_nat || 5.73783997796e-31
Coq_Arith_PeanoNat_Nat_Even || monoid || 5.67527423451e-31
Coq_Lists_List_ForallOrdPairs_0 || semilattice_neutr || 5.41107120336e-31
Coq_NArith_BinNat_N_lor || induct_implies || 4.95324049975e-31
Coq_Arith_Even_even_0 || groups_monoid_list || 4.88571366494e-31
Coq_ZArith_Zsqrt_compat_Zsqrt_plain || lattic35693393ce_set || 4.84902348087e-31
Coq_NArith_BinNat_N_land || induct_implies || 4.71635279227e-31
Coq_ZArith_BinInt_Z_lt || is_none || 4.64995900323e-31
Coq_Reals_Rdefinitions_Rminus || induct_conj || 4.59953944608e-31
Coq_romega_ReflOmegaCore_Z_as_Int_lt || semilattice || 4.56940211081e-31
Coq_ZArith_Zdigits_binary_value || bNF_Ca646678531ard_of || 4.52322006084e-31
Coq_ZArith_BinInt_Z_le || is_none || 4.46714523843e-31
Coq_NArith_BinNat_N_land || induct_conj || 4.45340833498e-31
Coq_Sets_Uniset_seq || lattic1543629303tr_set || 4.44245621301e-31
Coq_NArith_BinNat_N_lor || induct_conj || 4.36987054135e-31
Coq_ZArith_Zeven_Zodd || nat_is_nat || 4.31180723253e-31
Coq_ZArith_BinInt_Z_add || nat_tsub || 4.27205921349e-31
Coq_PArith_POrderedType_Positive_as_DT_pred_double || code_integer_of_int || 4.05875869145e-31
Coq_PArith_POrderedType_Positive_as_OT_pred_double || code_integer_of_int || 4.05875869145e-31
Coq_Structures_OrdersEx_Positive_as_DT_pred_double || code_integer_of_int || 4.05875869145e-31
Coq_Structures_OrdersEx_Positive_as_OT_pred_double || code_integer_of_int || 4.05875869145e-31
Coq_PArith_POrderedType_Positive_as_DT_succ || code_nat_of_integer || 4.02269289412e-31
Coq_PArith_POrderedType_Positive_as_OT_succ || code_nat_of_integer || 4.02269289412e-31
Coq_Structures_OrdersEx_Positive_as_DT_succ || code_nat_of_integer || 4.02269289412e-31
Coq_Structures_OrdersEx_Positive_as_OT_succ || code_nat_of_integer || 4.02269289412e-31
Coq_Arith_PeanoNat_Nat_Even || semilattice_neutr || 4.0103489186e-31
Coq_ZArith_Zdigits_Z_to_binary || field2 || 3.97636820144e-31
Coq_PArith_BinPos_Pos_pred_double || code_integer_of_int || 3.76451893186e-31
Coq_PArith_BinPos_Pos_succ || code_nat_of_integer || 3.72912975056e-31
Coq_Reals_Rdefinitions_Rplus || induct_conj || 3.7197800115e-31
Coq_ZArith_BinInt_Z_sqrt || semilattice || 3.54598251055e-31
Coq_Arith_Even_even_0 || lattic1543629303tr_set || 3.25299497599e-31
Coq_Arith_PeanoNat_Nat_max || set2 || 3.122453833e-31
Coq_ZArith_BinInt_Z_mul || nat_tsub || 3.06224554938e-31
Coq_Numbers_Integer_Binary_ZBinary_Z_lor || induct_implies || 3.00228270284e-31
Coq_Structures_OrdersEx_Z_as_OT_lor || induct_implies || 3.00228270284e-31
Coq_Structures_OrdersEx_Z_as_DT_lor || induct_implies || 3.00228270284e-31
Coq_Numbers_Integer_Binary_ZBinary_Z_land || induct_implies || 2.93674335514e-31
Coq_Structures_OrdersEx_Z_as_OT_land || induct_implies || 2.93674335514e-31
Coq_Structures_OrdersEx_Z_as_DT_land || induct_implies || 2.93674335514e-31
Coq_QArith_Qcanon_Qcle || semilattice_axioms || 2.80967059658e-31
Coq_Init_Datatypes_eq_true_0 || nat3 || 2.78378135144e-31
Coq_Numbers_Integer_Binary_ZBinary_Z_land || induct_conj || 2.72550368229e-31
Coq_Structures_OrdersEx_Z_as_OT_land || induct_conj || 2.72550368229e-31
Coq_Structures_OrdersEx_Z_as_DT_land || induct_conj || 2.72550368229e-31
Coq_Numbers_Integer_Binary_ZBinary_Z_lor || induct_conj || 2.70266065632e-31
Coq_Structures_OrdersEx_Z_as_OT_lor || induct_conj || 2.70266065632e-31
Coq_Structures_OrdersEx_Z_as_DT_lor || induct_conj || 2.70266065632e-31
Coq_romega_ReflOmegaCore_Z_as_Int_le || semilattice_axioms || 1.95609979148e-31
Coq_QArith_Qcanon_Qcle || abel_semigroup || 1.95069966722e-31
Coq_Lists_List_rev || bNF_Ca646678531ard_of || 1.88727612096e-31
Coq_QArith_Qcanon_Qcle || lattic35693393ce_set || 1.84329320878e-31
Coq_ZArith_BinInt_Z_Odd || semilattice || 1.83019681477e-31
Coq_Arith_PeanoNat_Nat_Odd || semilattice || 1.74793116157e-31
Coq_NArith_Ndigits_N2Bv_gen || field2 || 1.74294199749e-31
Coq_NArith_Ndigits_Bv2N || bNF_Ca646678531ard_of || 1.71723079479e-31
Coq_ZArith_Zeven_Zodd || lattic35693393ce_set || 1.62100647684e-31
Coq_Structures_OrdersEx_N_as_OT_divide || wf || 1.40817015501e-31
Coq_Structures_OrdersEx_N_as_DT_divide || wf || 1.40817015501e-31
Coq_Numbers_Natural_Binary_NBinary_N_divide || wf || 1.40817015501e-31
Coq_PArith_POrderedType_Positive_as_DT_SubMaskSpec_0 || refl_on || 1.40803118531e-31
Coq_PArith_POrderedType_Positive_as_OT_SubMaskSpec_0 || refl_on || 1.40803118531e-31
Coq_Structures_OrdersEx_Positive_as_DT_SubMaskSpec_0 || refl_on || 1.40803118531e-31
Coq_Structures_OrdersEx_Positive_as_OT_SubMaskSpec_0 || refl_on || 1.40803118531e-31
Coq_romega_ReflOmegaCore_Z_as_Int_le || abel_semigroup || 1.38548288263e-31
Coq_Structures_OrdersEx_Nat_as_DT_max || set2 || 1.38124296869e-31
Coq_Structures_OrdersEx_Nat_as_OT_max || set2 || 1.38124296869e-31
Coq_NArith_BinNat_N_divide || wf || 1.35793021918e-31
Coq_Arith_Even_even_1 || lattic35693393ce_set || 1.34657844863e-31
Coq_Numbers_Natural_BigN_BigN_BigN_divide || wf || 1.33306455514e-31
__constr_Coq_Init_Datatypes_bool_0_1 || zero_Rep || 1.32271377912e-31
Coq_romega_ReflOmegaCore_Z_as_Int_le || lattic35693393ce_set || 1.31261377642e-31
Coq_romega_ReflOmegaCore_Z_as_Int_mult || induct_implies || 1.31139419549e-31
Coq_Arith_PeanoNat_Nat_divide || wf || 1.27665044216e-31
Coq_Structures_OrdersEx_Nat_as_DT_divide || wf || 1.27665044216e-31
Coq_Structures_OrdersEx_Nat_as_OT_divide || wf || 1.27665044216e-31
Coq_PArith_POrderedType_Positive_as_DT_sub_mask || id_on || 1.26880151895e-31
Coq_PArith_POrderedType_Positive_as_OT_sub_mask || id_on || 1.26880151895e-31
Coq_Structures_OrdersEx_Positive_as_DT_sub_mask || id_on || 1.26880151895e-31
Coq_Structures_OrdersEx_Positive_as_OT_sub_mask || id_on || 1.26880151895e-31
Coq_Init_Nat_add || set2 || 1.23393690085e-31
Coq_PArith_BinPos_Pos_SubMaskSpec_0 || refl_on || 1.23057736248e-31
Coq_Structures_OrdersEx_Nat_as_DT_add || set2 || 1.2141612401e-31
Coq_Structures_OrdersEx_Nat_as_OT_add || set2 || 1.2141612401e-31
Coq_Arith_PeanoNat_Nat_add || set2 || 1.21106946818e-31
Coq_romega_ReflOmegaCore_Z_as_Int_plus || induct_conj || 1.12977111102e-31
Coq_PArith_BinPos_Pos_sub_mask || id_on || 1.09677256745e-31
Coq_ZArith_BinInt_Z_lor || induct_implies || 1.03483403102e-31
Coq_ZArith_BinInt_Z_land || induct_implies || 9.99396072132e-32
Coq_ZArith_BinInt_Z_land || induct_conj || 9.38478519373e-32
Coq_ZArith_BinInt_Z_lor || induct_conj || 9.264698322e-32
Coq_Sorting_Permutation_Permutation_0 || order_well_order_on || 8.69140684932e-32
Coq_Sorting_Permutation_Permutation_0 || bNF_Ca1811156065der_on || 8.26565931487e-32
Coq_Structures_OrdersEx_N_as_OT_lcm || measure || 7.99118623695e-32
Coq_Structures_OrdersEx_N_as_DT_lcm || measure || 7.99118623695e-32
Coq_Numbers_Natural_Binary_NBinary_N_lcm || measure || 7.99118623695e-32
Coq_Arith_PeanoNat_Nat_Odd || comm_monoid || 7.83066685101e-32
Coq_NArith_BinNat_N_lcm || measure || 7.72280291301e-32
Coq_Numbers_Natural_BigN_BigN_BigN_lcm || measure || 7.58894335868e-32
Coq_ZArith_BinInt_Z_Even || semilattice || 7.46642527405e-32
Coq_Arith_PeanoNat_Nat_lcm || measure || 7.28581891914e-32
Coq_Structures_OrdersEx_Nat_as_DT_lcm || measure || 7.28581891914e-32
Coq_Structures_OrdersEx_Nat_as_OT_lcm || measure || 7.28581891914e-32
Coq_Classes_Morphisms_Normalizes || groups_monoid_list || 7.24006764295e-32
Coq_ZArith_Zsqrt_compat_Zsqrt_plain || groups828474808id_set || 7.08382025677e-32
Coq_ZArith_Zeven_Zeven || lattic35693393ce_set || 6.92647952971e-32
Coq_ZArith_BinInt_Z_Odd || comm_monoid || 6.64421753157e-32
Coq_Structures_OrdersEx_N_as_OT_lcm || measures || 6.35693406324e-32
Coq_Structures_OrdersEx_N_as_DT_lcm || measures || 6.35693406324e-32
Coq_Numbers_Natural_Binary_NBinary_N_lcm || measures || 6.35693406324e-32
Coq_NArith_BinNat_N_lcm || measures || 6.14245010612e-32
Coq_Numbers_Natural_BigN_BigN_BigN_lcm || measures || 6.03553658015e-32
Coq_ZArith_BinInt_Z_sqrt || comm_monoid || 6.01320481019e-32
Coq_Logic_FinFun_Fin2Restrict_extend || measure || 5.8924798957e-32
Coq_Arith_PeanoNat_Nat_lcm || measures || 5.79339231425e-32
Coq_Structures_OrdersEx_Nat_as_DT_lcm || measures || 5.79339231425e-32
Coq_Structures_OrdersEx_Nat_as_OT_lcm || measures || 5.79339231425e-32
Coq_Sets_Relations_2_Rstar_0 || rep_filter || 5.75133312106e-32
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || wf || 5.67050421455e-32
Coq_Sets_Relations_3_coherent || semilattice_order || 5.50290913271e-32
Coq_Arith_Even_even_1 || groups828474808id_set || 5.3567522546e-32
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || wf || 5.23444538792e-32
Coq_Structures_OrdersEx_Z_as_OT_divide || wf || 5.23444538792e-32
Coq_Structures_OrdersEx_Z_as_DT_divide || wf || 5.23444538792e-32
Coq_ZArith_Zeven_Zodd || groups828474808id_set || 5.18982836106e-32
Coq_Sets_Relations_1_Transitive || is_filter || 5.16032157388e-32
Coq_Classes_RelationClasses_relation_equivalence || monoid || 5.00457640828e-32
Coq_Logic_FinFun_bFun || wf || 4.99600418815e-32
Coq_Sets_Relations_3_coherent || lexordp_eq || 4.98572916239e-32
Coq_Arith_PeanoNat_Nat_Even || semilattice || 4.74277917558e-32
Coq_Sets_Relations_2_Rstar_0 || lattic1693879045er_set || 4.33812384779e-32
Coq_Numbers_Rational_BigQ_BigQ_BigQ_max || id_on || 4.31622546622e-32
Coq_Structures_OrdersEx_N_as_OT_mul || measure || 4.26724481751e-32
Coq_Structures_OrdersEx_N_as_DT_mul || measure || 4.26724481751e-32
Coq_Numbers_Natural_Binary_NBinary_N_mul || measure || 4.26724481751e-32
Coq_NArith_BinNat_N_mul || measure || 4.03913563129e-32
Coq_Numbers_Natural_BigN_BigN_BigN_mul || measure || 4.03451338484e-32
Coq_Logic_FinFun_Fin2Restrict_extend || measures || 3.96382107506e-32
Coq_PArith_POrderedType_Positive_as_DT_max || induct_implies || 3.96369920146e-32
Coq_PArith_POrderedType_Positive_as_DT_min || induct_implies || 3.96369920146e-32
Coq_PArith_POrderedType_Positive_as_OT_max || induct_implies || 3.96369920146e-32
Coq_PArith_POrderedType_Positive_as_OT_min || induct_implies || 3.96369920146e-32
Coq_Structures_OrdersEx_Positive_as_DT_max || induct_implies || 3.96369920146e-32
Coq_Structures_OrdersEx_Positive_as_DT_min || induct_implies || 3.96369920146e-32
Coq_Structures_OrdersEx_Positive_as_OT_max || induct_implies || 3.96369920146e-32
Coq_Structures_OrdersEx_Positive_as_OT_min || induct_implies || 3.96369920146e-32
Coq_Sets_Relations_3_coherent || pred_chain || 3.96136781559e-32
Coq_Relations_Relation_Definitions_inclusion || refl_on || 3.91852772463e-32
Coq_Arith_Even_even_0 || lattic35693393ce_set || 3.88537100826e-32
Coq_Arith_PeanoNat_Nat_mul || measure || 3.87925062719e-32
Coq_Structures_OrdersEx_Nat_as_DT_mul || measure || 3.87925062719e-32
Coq_Structures_OrdersEx_Nat_as_OT_mul || measure || 3.87925062719e-32
Coq_PArith_BinPos_Pos_sqrt || suc || 3.86873792823e-32
Coq_ZArith_BinInt_Z_mul || induct_implies || 3.79310226949e-32
Coq_Structures_OrdersEx_N_as_OT_mul || measures || 3.74237989501e-32
Coq_Structures_OrdersEx_N_as_DT_mul || measures || 3.74237989501e-32
Coq_Numbers_Natural_Binary_NBinary_N_mul || measures || 3.74237989501e-32
Coq_PArith_POrderedType_Positive_as_DT_max || induct_conj || 3.64418392923e-32
Coq_PArith_POrderedType_Positive_as_DT_min || induct_conj || 3.64418392923e-32
Coq_PArith_POrderedType_Positive_as_OT_max || induct_conj || 3.64418392923e-32
Coq_PArith_POrderedType_Positive_as_OT_min || induct_conj || 3.64418392923e-32
Coq_Structures_OrdersEx_Positive_as_DT_max || induct_conj || 3.64418392923e-32
Coq_Structures_OrdersEx_Positive_as_DT_min || induct_conj || 3.64418392923e-32
Coq_Structures_OrdersEx_Positive_as_OT_max || induct_conj || 3.64418392923e-32
Coq_Structures_OrdersEx_Positive_as_OT_min || induct_conj || 3.64418392923e-32
Coq_Relations_Relation_Operators_clos_trans_0 || id_on || 3.64234566169e-32
Coq_NArith_BinNat_N_mul || measures || 3.55087491962e-32
Coq_Numbers_Natural_BigN_BigN_BigN_mul || measures || 3.53968437476e-32
Coq_Sets_Cpo_PO_of_cpo || rep_filter || 3.41373506539e-32
Coq_Arith_PeanoNat_Nat_mul || measures || 3.40246322307e-32
Coq_Structures_OrdersEx_Nat_as_DT_mul || measures || 3.40246322307e-32
Coq_Structures_OrdersEx_Nat_as_OT_mul || measures || 3.40246322307e-32
Coq_PArith_POrderedType_Positive_as_DT_mul || induct_implies || 3.30158088219e-32
Coq_PArith_POrderedType_Positive_as_OT_mul || induct_implies || 3.30158088219e-32
Coq_Structures_OrdersEx_Positive_as_DT_mul || induct_implies || 3.30158088219e-32
Coq_Structures_OrdersEx_Positive_as_OT_mul || induct_implies || 3.30158088219e-32
__constr_Coq_Init_Datatypes_list_0_2 || insert3 || 3.25263477934e-32
Coq_Numbers_Rational_BigQ_BigQ_BigQ_le || trans || 3.17512826012e-32
Coq_Sets_Relations_2_Rstar_0 || pred_maxchain || 3.12549140253e-32
Coq_Sets_Relations_2_Rstar_0 || lexordp2 || 3.11212111868e-32
Coq_Lists_List_In || member3 || 3.02263441342e-32
Coq_Sets_Partial_Order_Strict_Rel_of || rep_filter || 2.95816155693e-32
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lcm || measure || 2.94740536833e-32
Coq_PArith_POrderedType_Positive_as_DT_add || induct_conj || 2.82927092504e-32
Coq_PArith_POrderedType_Positive_as_OT_add || induct_conj || 2.82927092504e-32
Coq_Structures_OrdersEx_Positive_as_DT_add || induct_conj || 2.82927092504e-32
Coq_Structures_OrdersEx_Positive_as_OT_add || induct_conj || 2.82927092504e-32
Coq_Classes_Morphisms_Normalizes || lattic1543629303tr_set || 2.74680274902e-32
Coq_Numbers_Integer_Binary_ZBinary_Z_lcm || measure || 2.73290936698e-32
Coq_Structures_OrdersEx_Z_as_OT_lcm || measure || 2.73290936698e-32
Coq_Structures_OrdersEx_Z_as_DT_lcm || measure || 2.73290936698e-32
Coq_ZArith_BinInt_Z_Even || comm_monoid || 2.60085753322e-32
Coq_PArith_BinPos_Pos_max || induct_implies || 2.49356558881e-32
Coq_PArith_BinPos_Pos_min || induct_implies || 2.49356558881e-32
Coq_Sets_Relations_1_Reflexive || is_filter || 2.48219519869e-32
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lcm || measures || 2.39764016068e-32
Coq_Numbers_Natural_Binary_NBinary_N_min || induct_implies || 2.37618806926e-32
Coq_Structures_OrdersEx_N_as_OT_min || induct_implies || 2.37618806926e-32
Coq_Structures_OrdersEx_N_as_DT_min || induct_implies || 2.37618806926e-32
Coq_Structures_OrdersEx_Nat_as_DT_min || induct_implies || 2.37618806926e-32
Coq_Structures_OrdersEx_Nat_as_OT_min || induct_implies || 2.37618806926e-32
Coq_Numbers_Natural_Binary_NBinary_N_max || induct_implies || 2.34674956451e-32
Coq_Structures_OrdersEx_N_as_OT_max || induct_implies || 2.34674956451e-32
Coq_Structures_OrdersEx_N_as_DT_max || induct_implies || 2.34674956451e-32
Coq_Structures_OrdersEx_Nat_as_DT_max || induct_implies || 2.34674956451e-32
Coq_Structures_OrdersEx_Nat_as_OT_max || induct_implies || 2.34674956451e-32
Coq_PArith_BinPos_Pos_max || induct_conj || 2.29557072636e-32
Coq_PArith_BinPos_Pos_min || induct_conj || 2.29557072636e-32
Coq_ZArith_BinInt_Z_to_pos || nat_of_num || 2.28230551769e-32
Coq_ZArith_BinInt_Z_sqrt || inc || 2.26676849196e-32
Coq_Numbers_Integer_Binary_ZBinary_Z_lcm || measures || 2.22251949044e-32
Coq_Structures_OrdersEx_Z_as_OT_lcm || measures || 2.22251949044e-32
Coq_Structures_OrdersEx_Z_as_DT_lcm || measures || 2.22251949044e-32
Coq_QArith_QArith_base_Qle || is_none || 2.22132753224e-32
Coq_Numbers_Natural_Binary_NBinary_N_max || induct_conj || 2.17903606474e-32
Coq_Structures_OrdersEx_N_as_OT_max || induct_conj || 2.17903606474e-32
Coq_Structures_OrdersEx_N_as_DT_max || induct_conj || 2.17903606474e-32
Coq_Structures_OrdersEx_Nat_as_DT_max || induct_conj || 2.17903606474e-32
Coq_Structures_OrdersEx_Nat_as_OT_max || induct_conj || 2.17903606474e-32
Coq_Sets_Cpo_Complete_0 || is_filter || 2.17522796398e-32
Coq_Numbers_Natural_Binary_NBinary_N_min || induct_conj || 2.16948278821e-32
Coq_Structures_OrdersEx_N_as_OT_min || induct_conj || 2.16948278821e-32
Coq_Structures_OrdersEx_N_as_DT_min || induct_conj || 2.16948278821e-32
Coq_Structures_OrdersEx_Nat_as_DT_min || induct_conj || 2.16948278821e-32
Coq_Structures_OrdersEx_Nat_as_OT_min || induct_conj || 2.16948278821e-32
Coq_ZArith_Zeven_Zeven || groups828474808id_set || 2.13148689167e-32
Coq_ZArith_BinInt_Z_sub || induct_conj || 2.12911884532e-32
Coq_QArith_Qabs_Qabs || none || 2.08944508948e-32
Coq_Classes_RelationClasses_relation_equivalence || semilattice_neutr || 2.0583405404e-32
Coq_ZArith_BinInt_Z_sqrt || code_Suc || 2.03464475391e-32
Coq_Arith_PeanoNat_Nat_Even || comm_monoid || 2.01537916142e-32
Coq_ZArith_BinInt_Z_to_pos || code_nat_of_natural || 1.88717914886e-32
Coq_Lists_List_rev || divmod_nat || 1.87279776721e-32
Coq_FSets_FMapPositive_PositiveMap_Empty || null2 || 1.84936010424e-32
Coq_ZArith_BinInt_Z_add || induct_conj || 1.82452057643e-32
Coq_FSets_FMapPositive_PositiveMap_empty || empty || 1.78664467685e-32
Coq_Lists_List_map || filtermap || 1.70616337729e-32
Coq_Numbers_Integer_BigZ_BigZ_BigZ_mul || measure || 1.67311814558e-32
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || measure || 1.55133702692e-32
Coq_Structures_OrdersEx_Z_as_OT_mul || measure || 1.55133702692e-32
Coq_Structures_OrdersEx_Z_as_DT_mul || measure || 1.55133702692e-32
Coq_Sorting_Permutation_Permutation_0 || divmod_nat_rel || 1.53339521002e-32
Coq_Numbers_Integer_BigZ_BigZ_BigZ_mul || measures || 1.47797950858e-32
Coq_Arith_Even_even_0 || groups828474808id_set || 1.46973639192e-32
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || measures || 1.37016072851e-32
Coq_Structures_OrdersEx_Z_as_OT_mul || measures || 1.37016072851e-32
Coq_Structures_OrdersEx_Z_as_DT_mul || measures || 1.37016072851e-32
Coq_ZArith_BinInt_Z_divide || wf || 1.34843926963e-32
Coq_Numbers_Rational_BigQ_BigQ_BigQ_le || antisym || 1.25672970325e-32
Coq_Numbers_Integer_Binary_ZBinary_Z_min || induct_implies || 1.25333654144e-32
Coq_Structures_OrdersEx_Z_as_OT_min || induct_implies || 1.25333654144e-32
Coq_Structures_OrdersEx_Z_as_DT_min || induct_implies || 1.25333654144e-32
Coq_Numbers_Rational_BigQ_BigQ_BigQ_le || sym || 1.24644556281e-32
Coq_Numbers_Integer_Binary_ZBinary_Z_max || induct_implies || 1.20097005603e-32
Coq_Structures_OrdersEx_Z_as_OT_max || induct_implies || 1.20097005603e-32
Coq_Structures_OrdersEx_Z_as_DT_max || induct_implies || 1.20097005603e-32
Coq_Numbers_Integer_Binary_ZBinary_Z_max || induct_conj || 1.14004766128e-32
Coq_Structures_OrdersEx_Z_as_OT_max || induct_conj || 1.14004766128e-32
Coq_Structures_OrdersEx_Z_as_DT_max || induct_conj || 1.14004766128e-32
Coq_PArith_POrderedType_Positive_as_DT_lt || is_none || 1.13340413635e-32
Coq_PArith_POrderedType_Positive_as_OT_lt || is_none || 1.13340413635e-32
Coq_Structures_OrdersEx_Positive_as_DT_lt || is_none || 1.13340413635e-32
Coq_Structures_OrdersEx_Positive_as_OT_lt || is_none || 1.13340413635e-32
Coq_Numbers_Integer_Binary_ZBinary_Z_min || induct_conj || 1.12341562677e-32
Coq_Structures_OrdersEx_Z_as_OT_min || induct_conj || 1.12341562677e-32
Coq_Structures_OrdersEx_Z_as_DT_min || induct_conj || 1.12341562677e-32
Coq_NArith_BinNat_N_max || induct_implies || 1.05660372668e-32
Coq_PArith_BinPos_Pos_mul || induct_implies || 1.02398854956e-32
Coq_NArith_BinNat_N_min || induct_implies || 9.93799470691e-33
Coq_Classes_RelationClasses_Symmetric || wfP || 9.89671154313e-33
Coq_Classes_RelationClasses_complement || transitive_tranclp || 9.79819509133e-33
Coq_NArith_BinNat_N_min || induct_conj || 9.55665118871e-33
Coq_NArith_BinNat_N_max || induct_conj || 9.35841711499e-33
Coq_Lists_List_map || map_option || 8.9870306059e-33
Coq_PArith_POrderedType_Positive_as_DT_succ || none || 8.77536154996e-33
Coq_PArith_POrderedType_Positive_as_OT_succ || none || 8.77536154996e-33
Coq_Structures_OrdersEx_Positive_as_DT_succ || none || 8.77536154996e-33
Coq_Structures_OrdersEx_Positive_as_OT_succ || none || 8.77536154996e-33
Coq_PArith_BinPos_Pos_add || induct_conj || 8.5927868313e-33
Coq_Numbers_Rational_BigQ_BigQ_BigQ_max || transitive_trancl || 7.94455835103e-33
Coq_PArith_POrderedType_Positive_as_DT_lt || distinct || 7.68364767971e-33
Coq_PArith_POrderedType_Positive_as_OT_lt || distinct || 7.68364767971e-33
Coq_Structures_OrdersEx_Positive_as_DT_lt || distinct || 7.68364767971e-33
Coq_Structures_OrdersEx_Positive_as_OT_lt || distinct || 7.68364767971e-33
Coq_ZArith_BinInt_Z_lcm || measure || 7.60573088343e-33
Coq_Numbers_Rational_BigQ_BigQ_BigQ_max || transitive_rtrancl || 7.53434621487e-33
Coq_PArith_BinPos_Pos_of_succ_nat || suc_Rep || 6.78949554095e-33
Coq_Logic_ChoiceFacts_RelationalChoice_on || semilattice || 6.55166642458e-33
Coq_PArith_POrderedType_Positive_as_DT_add || remdups || 6.36742854403e-33
Coq_PArith_POrderedType_Positive_as_OT_add || remdups || 6.36742854403e-33
Coq_Structures_OrdersEx_Positive_as_DT_add || remdups || 6.36742854403e-33
Coq_Structures_OrdersEx_Positive_as_OT_add || remdups || 6.36742854403e-33
Coq_ZArith_BinInt_Z_lcm || measures || 6.1536426751e-33
Coq_Logic_ChoiceFacts_FunctionalChoice_on || lattic35693393ce_set || 5.70469696365e-33
Coq_ZArith_Znumtheory_Bezout_0 || monoid || 5.66306577289e-33
Coq_PArith_BinPos_Pos_lt || is_none || 5.41557947583e-33
Coq_Reals_Rbasic_fun_Rabs || empty || 4.95919473887e-33
Coq_Reals_Rdefinitions_Rle || null2 || 4.64505232089e-33
Coq_ZArith_Znumtheory_Bezout_0 || semilattice_neutr || 4.50526913236e-33
Coq_PArith_BinPos_Pos_succ || none || 4.17880981839e-33
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || groups_monoid_list || 4.02279406073e-33
Coq_ZArith_Znumtheory_Zis_gcd_0 || groups_monoid_list || 4.01497976689e-33
Coq_Sets_Relations_2_Rstar1_0 || lexordp_eq || 3.98025657398e-33
Coq_PArith_BinPos_Pos_lt || distinct || 3.74078508859e-33
Coq_ZArith_BinInt_Z_mul || measure || 3.63567257865e-33
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || monoid || 3.34112976721e-33
Coq_Reals_Rbasic_fun_Rmax || induct_implies || 3.28371666757e-33
Coq_ZArith_BinInt_Z_mul || measures || 3.26206984896e-33
Coq_ZArith_BinInt_Z_min || induct_implies || 3.22950793528e-33
Coq_Logic_ChoiceFacts_GuardedRelationalChoice_on || lattic35693393ce_set || 3.20209695744e-33
Coq_Reals_Rbasic_fun_Rmin || induct_implies || 3.15974842797e-33
__constr_Coq_Init_Datatypes_list_0_1 || id2 || 3.11538692955e-33
Coq_Sorting_Permutation_Permutation_0 || c_Predicate_Oeq || 3.08197601094e-33
Coq_PArith_BinPos_Pos_add || remdups || 3.02975262373e-33
Coq_ZArith_Znumtheory_Zis_gcd_0 || lattic1543629303tr_set || 3.00423406216e-33
Coq_Reals_Rbasic_fun_Rmin || induct_conj || 3.00096005216e-33
Coq_Reals_Rbasic_fun_Rmax || induct_conj || 2.96342873675e-33
Coq_PArith_POrderedType_Positive_as_DT_succ || nil || 2.94967822945e-33
Coq_PArith_POrderedType_Positive_as_OT_succ || nil || 2.94967822945e-33
Coq_Structures_OrdersEx_Positive_as_DT_succ || nil || 2.94967822945e-33
Coq_Structures_OrdersEx_Positive_as_OT_succ || nil || 2.94967822945e-33
Coq_ZArith_BinInt_Z_max || induct_implies || 2.9261174469e-33
Coq_ZArith_BinInt_Z_max || induct_conj || 2.8925391731e-33
Coq_Arith_PeanoNat_Nat_min || induct_implies || 2.89098709195e-33
Coq_PArith_POrderedType_Positive_as_DT_add || rep_filter || 2.89053045842e-33
Coq_PArith_POrderedType_Positive_as_OT_add || rep_filter || 2.89053045842e-33
Coq_Structures_OrdersEx_Positive_as_DT_add || rep_filter || 2.89053045842e-33
Coq_Structures_OrdersEx_Positive_as_OT_add || rep_filter || 2.89053045842e-33
Coq_ZArith_BinInt_Z_min || induct_conj || 2.80089244918e-33
Coq_Arith_PeanoNat_Nat_max || induct_implies || 2.74427370044e-33
Coq_Sorting_Sorted_StronglySorted_0 || groups_monoid_list || 2.68950091461e-33
Coq_Arith_PeanoNat_Nat_max || induct_conj || 2.63081133985e-33
Coq_Arith_PeanoNat_Nat_min || induct_conj || 2.58662434711e-33
Coq_PArith_POrderedType_Positive_as_DT_lt || is_filter || 2.57667932353e-33
Coq_PArith_POrderedType_Positive_as_OT_lt || is_filter || 2.57667932353e-33
Coq_Structures_OrdersEx_Positive_as_DT_lt || is_filter || 2.57667932353e-33
Coq_Structures_OrdersEx_Positive_as_OT_lt || is_filter || 2.57667932353e-33
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || semilattice || 2.53466071962e-33
Coq_Reals_Rtrigo_def_exp || code_nat_of_natural || 2.42605698483e-33
Coq_Numbers_Natural_BigN_BigN_BigN_lt || semilattice || 2.0138748762e-33
Coq_Lists_SetoidPermutation_PermutationA_0 || semila1450535954axioms || 1.9571213671e-33
Coq_PArith_POrderedType_Positive_as_DT_of_nat || nat_of_num || 1.94678811524e-33
Coq_PArith_POrderedType_Positive_as_OT_of_nat || nat_of_num || 1.94678811524e-33
Coq_Structures_OrdersEx_Positive_as_DT_of_nat || nat_of_num || 1.94678811524e-33
Coq_Structures_OrdersEx_Positive_as_OT_of_nat || nat_of_num || 1.94678811524e-33
Coq_Logic_ChoiceFacts_RelationalChoice_on || transitive_acyclic || 1.94469869841e-33
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || lattic1543629303tr_set || 1.94359676044e-33
Coq_Sorting_Sorted_Sorted_0 || monoid || 1.89479596851e-33
Coq_PArith_POrderedType_Positive_as_DT_of_succ_nat || pos || 1.79721970344e-33
Coq_PArith_POrderedType_Positive_as_OT_of_succ_nat || pos || 1.79721970344e-33
Coq_Structures_OrdersEx_Positive_as_DT_of_succ_nat || pos || 1.79721970344e-33
Coq_Structures_OrdersEx_Positive_as_OT_of_succ_nat || pos || 1.79721970344e-33
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || semilattice_neutr || 1.73245291378e-33
Coq_Numbers_Natural_BigN_BigN_BigN_le || semilattice_axioms || 1.64019240468e-33
Coq_Lists_List_map || vimage || 1.63077922817e-33
Coq_Numbers_Natural_BigN_BigN_BigN_eq || semilattice || 1.6298357847e-33
Coq_Reals_Rdefinitions_Rinv || suc || 1.49756885828e-33
Coq_Relations_Relation_Operators_clos_refl_0 || lexordp_eq || 1.48121265592e-33
Coq_PArith_BinPos_Pos_succ || nil || 1.43800132102e-33
Coq_PArith_POrderedType_Positive_as_DT_pred || code_nat_of_integer || 1.41936400971e-33
Coq_PArith_POrderedType_Positive_as_OT_pred || code_nat_of_integer || 1.41936400971e-33
Coq_Structures_OrdersEx_Positive_as_DT_pred || code_nat_of_integer || 1.41936400971e-33
Coq_Structures_OrdersEx_Positive_as_OT_pred || code_nat_of_integer || 1.41936400971e-33
Coq_Classes_SetoidClass_pequiv || rep_filter || 1.39661495587e-33
Coq_PArith_POrderedType_Positive_as_DT_lt || null || 1.39074329923e-33
Coq_PArith_POrderedType_Positive_as_OT_lt || null || 1.39074329923e-33
Coq_Structures_OrdersEx_Positive_as_DT_lt || null || 1.39074329923e-33
Coq_Structures_OrdersEx_Positive_as_OT_lt || null || 1.39074329923e-33
Coq_Lists_List_NoDup_0 || antisym || 1.3815657862e-33
Coq_Lists_SetoidList_eqlistA_0 || semilattice_order || 1.3810993425e-33
Coq_Lists_List_NoDup_0 || sym || 1.36802238523e-33
Coq_Reals_Rdefinitions_Ropp || code_Suc || 1.22452098037e-33
Coq_Logic_ChoiceFacts_FunctionalChoice_on || wf || 1.2229404867e-33
Coq_PArith_POrderedType_Positive_as_DT_of_succ_nat || code_integer_of_int || 1.21599927853e-33
Coq_PArith_POrderedType_Positive_as_OT_of_succ_nat || code_integer_of_int || 1.21599927853e-33
Coq_Structures_OrdersEx_Positive_as_DT_of_succ_nat || code_integer_of_int || 1.21599927853e-33
Coq_Structures_OrdersEx_Positive_as_OT_of_succ_nat || code_integer_of_int || 1.21599927853e-33
Coq_Lists_List_NoDup_0 || trans || 1.20753452341e-33
Coq_Numbers_Natural_BigN_BigN_BigN_le || abel_semigroup || 1.20683389394e-33
Coq_Numbers_Natural_BigN_BigN_BigN_le || lattic35693393ce_set || 1.14933857171e-33
Coq_PArith_POrderedType_Positive_as_DT_pred || nat2 || 1.14919935167e-33
Coq_PArith_POrderedType_Positive_as_OT_pred || nat2 || 1.14919935167e-33
Coq_Structures_OrdersEx_Positive_as_DT_pred || nat2 || 1.14919935167e-33
Coq_Structures_OrdersEx_Positive_as_OT_pred || nat2 || 1.14919935167e-33
Coq_Sorting_Sorted_StronglySorted_0 || lattic1543629303tr_set || 1.13748088585e-33
Coq_Reals_Rdefinitions_Rgt || semilattice || 1.13005794478e-33
Coq_PArith_BinPos_Pos_add || rep_filter || 1.11898668876e-33
Coq_Reals_Rtrigo_def_exp || nat_of_num || 1.09820815963e-33
Coq_Reals_Rtopology_included || null || 1.06764107434e-33
Coq_PArith_BinPos_Pos_lt || is_filter || 1.01841986462e-33
Coq_PArith_POrderedType_Positive_as_DT_of_nat || nat2 || 1.00253797352e-33
Coq_PArith_POrderedType_Positive_as_OT_of_nat || nat2 || 1.00253797352e-33
Coq_Structures_OrdersEx_Positive_as_DT_of_nat || nat2 || 1.00253797352e-33
Coq_Structures_OrdersEx_Positive_as_OT_of_nat || nat2 || 1.00253797352e-33
Coq_Reals_Rtopology_adherence || nil || 8.70691777309e-34
Coq_Sorting_Sorted_Sorted_0 || semilattice_neutr || 8.61445902814e-34
Coq_Reals_Rdefinitions_Ropp || inc || 8.37334065027e-34
Coq_Logic_ChoiceFacts_GuardedRelationalChoice_on || wf || 7.50808868905e-34
Coq_QArith_Qcanon_Qclt || abel_semigroup || 7.08256239186e-34
Coq_PArith_BinPos_Pos_lt || null || 6.76149605624e-34
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || semilattice || 6.63639191514e-34
Coq_Logic_ChoiceFacts_FunctionalRelReification_on || transitive_acyclic || 6.39690494697e-34
Coq_Classes_RelationClasses_PER_0 || is_filter || 6.25163045909e-34
Coq_PArith_POrderedType_Positive_as_DT_lt || semilattice || 5.52706666999e-34
Coq_PArith_POrderedType_Positive_as_OT_lt || semilattice || 5.52706666999e-34
Coq_Structures_OrdersEx_Positive_as_DT_lt || semilattice || 5.52706666999e-34
Coq_Structures_OrdersEx_Positive_as_OT_lt || semilattice || 5.52706666999e-34
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || semilattice || 5.49822301408e-34
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || semilattice_axioms || 5.270291696e-34
Coq_Reals_Rdefinitions_Rge || semilattice_axioms || 5.21962802582e-34
Coq_Lists_List_rev || id_on || 4.80533868802e-34
Coq_Reals_RList_cons_Rlist || pow || 4.77236849388e-34
Coq_QArith_Qcanon_Qcle || abel_s1917375468axioms || 4.70790114416e-34
Coq_romega_ReflOmegaCore_Z_as_Int_lt || abel_semigroup || 4.54497373513e-34
Coq_QArith_QArith_base_Qlt || semilattice || 4.09702527008e-34
Coq_Reals_Rtopology_included || distinct || 4.09190852567e-34
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || abel_semigroup || 3.95502813915e-34
Coq_Reals_Rdefinitions_Rge || abel_semigroup || 3.84411047859e-34
Coq_Sorting_Permutation_Permutation_0 || refl_on || 3.79024075194e-34
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || lattic35693393ce_set || 3.77660748311e-34
Coq_Numbers_Natural_BigN_BigN_BigN_sqrt_up || cnj || 3.6898242236e-34
Coq_Reals_Rdefinitions_Rge || lattic35693393ce_set || 3.66109844052e-34
Coq_PArith_BinPos_Pos_lt || semilattice || 3.38726574822e-34
Coq_Sets_Relations_2_Rstar_0 || remdups || 3.37224968166e-34
Coq_QArith_Qcanon_Qcle || semigroup || 3.25841188298e-34
Coq_romega_ReflOmegaCore_Z_as_Int_le || abel_s1917375468axioms || 2.8534466418e-34
Coq_Init_Datatypes_orb || induct_implies || 2.83244933492e-34
Coq_Sets_Relations_1_Transitive || distinct || 2.7158573042e-34
Coq_Init_Datatypes_andb || induct_implies || 2.56064380995e-34
Coq_NArith_BinNat_N_of_nat || suc_Rep || 2.54806686639e-34
Coq_Init_Datatypes_andb || induct_conj || 2.54672752918e-34
Coq_Numbers_Natural_BigN_BigN_BigN_lt || real_V1127708846m_norm || 2.50844806483e-34
Coq_Init_Datatypes_orb || induct_conj || 2.47271810866e-34
Coq_Numbers_Natural_BigN_BigN_BigN_zero || complex || 2.38919617723e-34
Coq_Reals_Rtopology_included || null2 || 2.38687146037e-34
Coq_PArith_POrderedType_Positive_as_DT_le || semilattice_axioms || 2.38272137895e-34
Coq_PArith_POrderedType_Positive_as_OT_le || semilattice_axioms || 2.38272137895e-34
Coq_Structures_OrdersEx_Positive_as_DT_le || semilattice_axioms || 2.38272137895e-34
Coq_Structures_OrdersEx_Positive_as_OT_le || semilattice_axioms || 2.38272137895e-34
__constr_Coq_Reals_RList_Rlist_0_1 || one2 || 2.1492213299e-34
Coq_Reals_Rtopology_adherence || empty || 2.09552702894e-34
Coq_romega_ReflOmegaCore_Z_as_Int_le || semigroup || 2.01775935537e-34
Coq_PArith_POrderedType_Positive_as_DT_le || abel_semigroup || 1.79760470092e-34
Coq_PArith_POrderedType_Positive_as_OT_le || abel_semigroup || 1.79760470092e-34
Coq_Structures_OrdersEx_Positive_as_DT_le || abel_semigroup || 1.79760470092e-34
Coq_Structures_OrdersEx_Positive_as_OT_le || abel_semigroup || 1.79760470092e-34
Coq_PArith_POrderedType_Positive_as_DT_le || lattic35693393ce_set || 1.71765901142e-34
Coq_PArith_POrderedType_Positive_as_OT_le || lattic35693393ce_set || 1.71765901142e-34
Coq_Structures_OrdersEx_Positive_as_DT_le || lattic35693393ce_set || 1.71765901142e-34
Coq_Structures_OrdersEx_Positive_as_OT_le || lattic35693393ce_set || 1.71765901142e-34
Coq_Relations_Relation_Operators_clos_refl_0 || transitive_tranclp || 1.67976705618e-34
Coq_QArith_QArith_base_Qle || semilattice_axioms || 1.67225345066e-34
Coq_Reals_Rbasic_fun_Rmax || rep_filter || 1.60043723844e-34
Coq_Sets_Partial_Order_Strict_Rel_of || remdups || 1.58328606918e-34
Coq_PArith_BinPos_Pos_le || semilattice_axioms || 1.49050573627e-34
Coq_Sets_Partial_Order_Carrier_of || measure || 1.48750425688e-34
Coq_Sets_Ensembles_Inhabited_0 || wf || 1.46251564395e-34
Coq_NArith_Ndist_ni_min || pow || 1.41503854913e-34
Coq_Sets_Relations_1_Reflexive || distinct || 1.33992913548e-34
Coq_QArith_QArith_base_Qle || abel_semigroup || 1.28156608236e-34
Coq_QArith_QArith_base_Qle || lattic35693393ce_set || 1.22724412546e-34
Coq_Reals_Rdefinitions_Rle || is_filter || 1.19500840861e-34
Coq_PArith_BinPos_Pos_le || abel_semigroup || 1.12377918791e-34
Coq_Sets_Partial_Order_Carrier_of || measures || 1.0959982821e-34
Coq_PArith_BinPos_Pos_le || lattic35693393ce_set || 1.07371003379e-34
Coq_Sets_Relations_3_coherent || rep_filter || 1.07099749254e-34
Coq_QArith_Qcanon_Qclt || equiv_equivp || 1.06355143344e-34
Coq_Classes_CRelationClasses_Equivalence_0 || lattic35693393ce_set || 7.88161061847e-35
Coq_romega_ReflOmegaCore_Z_as_Int_lt || equiv_equivp || 7.63661791324e-35
Coq_Lists_SetoidList_eqlistA_0 || lattic1693879045er_set || 7.40778692666e-35
Coq_Sets_Relations_1_Symmetric || is_filter || 6.82976796089e-35
__constr_Coq_NArith_Ndist_natinf_0_1 || one2 || 6.80106354148e-35
Coq_Lists_SetoidPermutation_PermutationA_0 || semilattice_order || 6.4543876169e-35
Coq_Lists_SetoidList_eqlistA_0 || pred_maxchain || 5.66827759807e-35
Coq_Classes_CRelationClasses_RewriteRelation_0 || semilattice || 5.56599443312e-35
Coq_QArith_Qcanon_Qcle || equiv_part_equivp || 5.44957737963e-35
Coq_Lists_SetoidPermutation_PermutationA_0 || pred_chain || 4.95234250154e-35
Coq_Lists_List_map || map || 4.93080396516e-35
Coq_QArith_Qcanon_Qcle || reflp || 4.70686983099e-35
Coq_NArith_BinNat_N_to_nat || suc_Rep || 4.01394364007e-35
Coq_Structures_OrdersEx_Nat_as_DT_mul || induct_implies || 4.00336228318e-35
Coq_Structures_OrdersEx_Nat_as_OT_mul || induct_implies || 4.00336228318e-35
Coq_Numbers_Natural_Binary_NBinary_N_mul || induct_implies || 3.99322765805e-35
Coq_Structures_OrdersEx_N_as_OT_mul || induct_implies || 3.99322765805e-35
Coq_Structures_OrdersEx_N_as_DT_mul || induct_implies || 3.99322765805e-35
Coq_Structures_OrdersEx_Nat_as_DT_add || induct_conj || 3.90012726812e-35
Coq_Structures_OrdersEx_Nat_as_OT_add || induct_conj || 3.90012726812e-35
Coq_Numbers_Natural_Binary_NBinary_N_add || induct_conj || 3.8763690916e-35
Coq_Structures_OrdersEx_N_as_OT_add || induct_conj || 3.8763690916e-35
Coq_Structures_OrdersEx_N_as_DT_add || induct_conj || 3.8763690916e-35
Coq_Arith_PeanoNat_Nat_mul || induct_implies || 3.80775267563e-35
Coq_romega_ReflOmegaCore_Z_as_Int_le || equiv_part_equivp || 3.74679157488e-35
Coq_Arith_PeanoNat_Nat_add || induct_conj || 3.69506130909e-35
Coq_romega_ReflOmegaCore_Z_as_Int_le || reflp || 3.259961985e-35
Coq_PArith_POrderedType_Positive_as_DT_pred || inc || 2.57008715655e-35
Coq_PArith_POrderedType_Positive_as_OT_pred || inc || 2.57008715655e-35
Coq_Structures_OrdersEx_Positive_as_DT_pred || inc || 2.57008715655e-35
Coq_Structures_OrdersEx_Positive_as_OT_pred || inc || 2.57008715655e-35
Coq_NArith_BinNat_N_mul || induct_implies || 2.44028439794e-35
Coq_NArith_BinNat_N_add || induct_conj || 2.36105767017e-35
Coq_Lists_SetoidPermutation_PermutationA_0 || lexordp_eq || 2.34685492032e-35
Coq_Lists_SetoidList_eqlistA_0 || lexordp2 || 2.21221938762e-35
Coq_PArith_POrderedType_Positive_as_DT_of_nat || bit1 || 2.04917371659e-35
Coq_PArith_POrderedType_Positive_as_OT_of_nat || bit1 || 2.04917371659e-35
Coq_Structures_OrdersEx_Positive_as_DT_of_nat || bit1 || 2.04917371659e-35
Coq_Structures_OrdersEx_Positive_as_OT_of_nat || bit1 || 2.04917371659e-35
Coq_PArith_BinPos_Pos_of_succ_nat || quotient_of || 1.99735787879e-35
Coq_Sets_Cpo_PO_of_cpo || remdups || 1.9153412164e-35
Coq_Sets_Uniset_incl || order_well_order_on || 1.64391956111e-35
Coq_Sets_Relations_2_Rstar_0 || lexordp_eq || 1.63018632824e-35
Coq_PArith_POrderedType_Positive_as_DT_of_succ_nat || bit0 || 1.61390855118e-35
Coq_PArith_POrderedType_Positive_as_OT_of_succ_nat || bit0 || 1.61390855118e-35
Coq_Structures_OrdersEx_Positive_as_DT_of_succ_nat || bit0 || 1.61390855118e-35
Coq_Structures_OrdersEx_Positive_as_OT_of_succ_nat || bit0 || 1.61390855118e-35
Coq_Lists_List_ForallPairs || bNF_Ca1811156065der_on || 1.51091096349e-35
Coq_Numbers_Natural_BigN_BigN_BigN_le || abel_s1917375468axioms || 1.36188881274e-35
Coq_Numbers_Cyclic_Int31_Int31_incr || code_nat_of_integer || 1.35147662754e-35
Coq_Lists_SetoidPermutation_PermutationA_0 || transitive_tranclp || 1.22881492346e-35
Coq_Lists_List_ForallOrdPairs_0 || order_well_order_on || 1.17048585895e-35
Coq_Sets_Cpo_Complete_0 || distinct || 1.16810122777e-35
Coq_Sets_Uniset_seq || bNF_Ca1811156065der_on || 1.118213778e-35
Coq_Numbers_Natural_BigN_BigN_BigN_lt || abel_semigroup || 1.1160235603e-35
Coq_Numbers_Natural_BigN_BigN_BigN_le || semigroup || 9.81465744663e-36
Coq_Numbers_Cyclic_Int31_Int31_twice || code_integer_of_int || 9.80331121471e-36
Coq_Numbers_Natural_BigN_BigN_BigN_eq || abel_semigroup || 9.41634196433e-36
Coq_PArith_BinPos_Pos_to_nat || suc_Rep || 8.50479377332e-36
Coq_Numbers_Cyclic_Int31_Int31_twice_plus_one || nat2 || 8.40686813699e-36
Coq_Numbers_Natural_Binary_NBinary_N_lt || semilattice || 7.97109700103e-36
Coq_Structures_OrdersEx_N_as_OT_lt || semilattice || 7.97109700103e-36
Coq_Structures_OrdersEx_N_as_DT_lt || semilattice || 7.97109700103e-36
Coq_NArith_BinNat_N_lt || semilattice || 7.22508755775e-36
Coq_Logic_FinFun_Fin2Restrict_extend || rep_filter || 7.12614539242e-36
Coq_Logic_FinFun_bFun || is_filter || 6.37167586956e-36
Coq_PArith_BinPos_Pos_of_succ_nat || suc || 6.1083415675e-36
Coq_QArith_Qcanon_Qclt || bNF_Wellorder_wo_rel || 5.66376038033e-36
Coq_QArith_Qcanon_Qcopp || cnj || 4.84244016327e-36
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || suc_Rep || 4.70186481339e-36
Coq_Structures_OrdersEx_Z_as_OT_pred || suc_Rep || 4.70186481339e-36
Coq_Structures_OrdersEx_Z_as_DT_pred || suc_Rep || 4.70186481339e-36
Coq_Numbers_Natural_Binary_NBinary_N_divide || is_filter || 4.07182714664e-36
Coq_Structures_OrdersEx_N_as_OT_divide || is_filter || 4.07182714664e-36
Coq_Structures_OrdersEx_N_as_DT_divide || is_filter || 4.07182714664e-36
Coq_romega_ReflOmegaCore_Z_as_Int_lt || bNF_Wellorder_wo_rel || 4.03827361631e-36
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || abel_s1917375468axioms || 3.95753301571e-36
Coq_Reals_Rtrigo_calc_toRad || suc_Rep || 3.93855157994e-36
Coq_NArith_BinNat_N_divide || is_filter || 3.91359759499e-36
Coq_QArith_Qabs_Qabs || nil || 3.90387018425e-36
Coq_Numbers_Cyclic_Int31_Int31_twice_plus_one || nat_of_num || 3.89164654319e-36
Coq_Numbers_Natural_BigN_BigN_BigN_divide || is_filter || 3.82957534431e-36
Coq_Numbers_Cyclic_Int31_Int31_twice || pos || 3.66061452547e-36
Coq_Arith_PeanoNat_Nat_divide || is_filter || 3.64774507584e-36
Coq_Structures_OrdersEx_Nat_as_DT_divide || is_filter || 3.64774507584e-36
Coq_Structures_OrdersEx_Nat_as_OT_divide || is_filter || 3.64774507584e-36
Coq_Reals_Rdefinitions_Rlt || semilattice || 3.55375221068e-36
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || abel_semigroup || 3.32823800001e-36
Coq_Numbers_Natural_Binary_NBinary_N_le || semilattice_axioms || 3.27460853432e-36
Coq_Structures_OrdersEx_N_as_OT_le || semilattice_axioms || 3.27460853432e-36
Coq_Structures_OrdersEx_N_as_DT_le || semilattice_axioms || 3.27460853432e-36
Coq_QArith_Qcanon_Qcle || antisym || 3.20219983234e-36
Coq_Reals_Ranalysis1_derivable_pt || lattic35693393ce_set || 3.06120695441e-36
Coq_NArith_BinNat_N_le || semilattice_axioms || 2.97440173812e-36
Coq_QArith_QArith_base_Qle || distinct || 2.92736683748e-36
Coq_Numbers_Cyclic_Int31_Int31_incr || nat2 || 2.92363653762e-36
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || semigroup || 2.91433241601e-36
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || abel_semigroup || 2.86245256645e-36
Coq_Lists_List_map || image2 || 2.80143397145e-36
Coq_Numbers_Natural_Binary_NBinary_N_lcm || rep_filter || 2.78637764274e-36
Coq_Structures_OrdersEx_N_as_OT_lcm || rep_filter || 2.78637764274e-36
Coq_Structures_OrdersEx_N_as_DT_lcm || rep_filter || 2.78637764274e-36
Coq_QArith_Qcanon_Qcle || trans || 2.74053332873e-36
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || semilattice || 2.69816441103e-36
Coq_Structures_OrdersEx_Z_as_OT_lt || semilattice || 2.69816441103e-36
Coq_Structures_OrdersEx_Z_as_DT_lt || semilattice || 2.69816441103e-36
Coq_NArith_BinNat_N_lcm || rep_filter || 2.6848992091e-36
Coq_Numbers_Natural_BigN_BigN_BigN_lcm || rep_filter || 2.63052632944e-36
Coq_Numbers_Natural_Binary_NBinary_N_le || abel_semigroup || 2.5877380363e-36
Coq_Structures_OrdersEx_N_as_OT_le || abel_semigroup || 2.5877380363e-36
Coq_Structures_OrdersEx_N_as_DT_le || abel_semigroup || 2.5877380363e-36
Coq_QArith_QArith_base_Qle || null || 2.56634146588e-36
Coq_Numbers_Rational_BigQ_BigQ_BigQ_of_Qc || pos || 2.52369801447e-36
Coq_QArith_Qcanon_this || nat_of_num || 2.51876946706e-36
Coq_Arith_PeanoNat_Nat_lcm || rep_filter || 2.51309153063e-36
Coq_Structures_OrdersEx_Nat_as_DT_lcm || rep_filter || 2.51309153063e-36
Coq_Structures_OrdersEx_Nat_as_OT_lcm || rep_filter || 2.51309153063e-36
Coq_Numbers_Natural_Binary_NBinary_N_le || lattic35693393ce_set || 2.48889452499e-36
Coq_Structures_OrdersEx_N_as_OT_le || lattic35693393ce_set || 2.48889452499e-36
Coq_Structures_OrdersEx_N_as_DT_le || lattic35693393ce_set || 2.48889452499e-36
Coq_ZArith_BinInt_Z_of_N || suc_Rep || 2.46226470532e-36
Coq_NArith_BinNat_N_le || abel_semigroup || 2.35124522421e-36
Coq_NArith_BinNat_N_le || lattic35693393ce_set || 2.26153851281e-36
Coq_Numbers_Natural_BigN_BigN_BigN_succ || empty || 2.22915598552e-36
Coq_romega_ReflOmegaCore_Z_as_Int_le || antisym || 2.18960918078e-36
Coq_Numbers_Natural_Binary_NBinary_N_succ || empty || 2.05004087292e-36
Coq_Structures_OrdersEx_N_as_OT_succ || empty || 2.05004087292e-36
Coq_Structures_OrdersEx_N_as_DT_succ || empty || 2.05004087292e-36
Coq_Classes_CRelationClasses_RewriteRelation_0 || transitive_acyclic || 1.99327235488e-36
Coq_Numbers_Natural_BigN_BigN_BigN_le || equiv_part_equivp || 1.97932163627e-36
Coq_Numbers_Natural_BigN_BigN_BigN_lt || equiv_equivp || 1.9732148812e-36
Coq_Classes_CRelationClasses_Equivalence_0 || wf || 1.9520362626e-36
Coq_romega_ReflOmegaCore_Z_as_Int_le || trans || 1.88825602544e-36
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || empty || 1.87840223357e-36
Coq_Structures_OrdersEx_Z_as_OT_succ || empty || 1.87840223357e-36
Coq_Structures_OrdersEx_Z_as_DT_succ || empty || 1.87840223357e-36
Coq_NArith_BinNat_N_succ || empty || 1.76981890726e-36
Coq_Numbers_Integer_BigZ_BigZ_BigZ_succ || empty || 1.74490552029e-36
Coq_Numbers_Natural_BigN_BigN_BigN_le || reflp || 1.7258556097e-36
Coq_PArith_BinPos_Pos_of_nat || bitM || 1.7242389682e-36
Coq_Numbers_Integer_Binary_ZBinary_Z_lnot || cnj || 1.69112847227e-36
Coq_Structures_OrdersEx_Z_as_OT_lnot || cnj || 1.69112847227e-36
Coq_Structures_OrdersEx_Z_as_DT_lnot || cnj || 1.69112847227e-36
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || code_nat_of_integer || 1.68112582773e-36
Coq_Numbers_Natural_BigN_BigN_BigN_eq || equiv_equivp || 1.65298447052e-36
Coq_Numbers_Rational_BigQ_BigQ_BigQ_of_Qc || code_integer_of_int || 1.62682321341e-36
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || nat2 || 1.62532223383e-36
Coq_Numbers_Natural_Binary_NBinary_N_mul || rep_filter || 1.61717268227e-36
Coq_Structures_OrdersEx_N_as_OT_mul || rep_filter || 1.61717268227e-36
Coq_Structures_OrdersEx_N_as_DT_mul || rep_filter || 1.61717268227e-36
Coq_PArith_BinPos_Pos_of_nat || inc || 1.61437704543e-36
Coq_Classes_SetoidClass_pequiv || remdups || 1.60545124226e-36
Coq_Classes_Morphisms_Normalizes || bNF_Ca1811156065der_on || 1.57878084952e-36
Coq_Reals_Ranalysis1_continuity_pt || semilattice || 1.54781512187e-36
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || is_filter || 1.53369682089e-36
Coq_NArith_BinNat_N_mul || rep_filter || 1.52939941136e-36
Coq_Numbers_Natural_BigN_BigN_BigN_mul || rep_filter || 1.52041774071e-36
Coq_Arith_PeanoNat_Nat_mul || rep_filter || 1.45432166197e-36
Coq_Structures_OrdersEx_Nat_as_DT_mul || rep_filter || 1.45432166197e-36
Coq_Structures_OrdersEx_Nat_as_OT_mul || rep_filter || 1.45432166197e-36
Coq_Reals_Rdefinitions_Rle || semilattice_axioms || 1.44495506259e-36
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || is_filter || 1.40260098455e-36
Coq_Structures_OrdersEx_Z_as_OT_divide || is_filter || 1.40260098455e-36
Coq_Structures_OrdersEx_Z_as_DT_divide || is_filter || 1.40260098455e-36
Coq_QArith_Qminmax_Qmax || remdups || 1.36134031453e-36
__constr_Coq_Init_Datatypes_nat_0_2 || product_Rep_unit || 1.34211527117e-36
Coq_NArith_BinNat_N_of_nat || quotient_of || 1.34161957794e-36
Coq_Classes_RelationClasses_relation_equivalence || order_well_order_on || 1.31782552817e-36
Coq_QArith_Qcanon_this || nat2 || 1.3162145037e-36
Coq_Reals_Rdefinitions_Rgt || abel_semigroup || 1.24347040416e-36
Coq_PArith_BinPos_Pos_pred || bit1 || 1.23386070205e-36
Coq_ZArith_BinInt_Z_pred || suc_Rep || 1.20159200925e-36
Coq_Numbers_Natural_BigN_BigN_BigN_lt || null2 || 1.17423195169e-36
Coq_Reals_Rdefinitions_Rle || abel_semigroup || 1.15137518637e-36
Coq_Numbers_Natural_BigN_BigN_BigN_le || null2 || 1.13822596068e-36
Coq_Numbers_Rational_BigQ_BigQ_BigQ_le || wf || 1.13366328344e-36
Coq_Reals_Rdefinitions_Rle || lattic35693393ce_set || 1.10872899241e-36
Coq_Numbers_Natural_Binary_NBinary_N_lt || null2 || 1.08004489073e-36
Coq_Structures_OrdersEx_N_as_OT_lt || null2 || 1.08004489073e-36
Coq_Structures_OrdersEx_N_as_DT_lt || null2 || 1.08004489073e-36
Coq_Numbers_Integer_Binary_ZBinary_Z_le || semilattice_axioms || 1.07863591927e-36
Coq_Structures_OrdersEx_Z_as_OT_le || semilattice_axioms || 1.07863591927e-36
Coq_Structures_OrdersEx_Z_as_DT_le || semilattice_axioms || 1.07863591927e-36
Coq_Numbers_Natural_Binary_NBinary_N_le || null2 || 1.04506597352e-36
Coq_Structures_OrdersEx_N_as_OT_le || null2 || 1.04506597352e-36
Coq_Structures_OrdersEx_N_as_DT_le || null2 || 1.04506597352e-36
Coq_Numbers_Rational_BigQ_BigQ_BigQ_max || measure || 1.04150953818e-36
Coq_Init_Nat_pred || bit1 || 1.03925607181e-36
Coq_romega_ReflOmegaCore_Z_as_Int_opp || cnj || 1.02353087371e-36
Coq_ZArith_BinInt_Z_lnot || cnj || 1.02353087371e-36
Coq_NArith_BinNat_N_of_nat || suc || 1.01377245497e-36
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lcm || rep_filter || 9.90061992478e-37
Coq_Init_Nat_pred || bit0 || 9.4395581751e-37
Coq_PArith_BinPos_Pos_pred || bit0 || 9.43385413733e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || null2 || 9.35865757688e-37
Coq_Structures_OrdersEx_Z_as_OT_lt || null2 || 9.35865757688e-37
Coq_Structures_OrdersEx_Z_as_DT_lt || null2 || 9.35865757688e-37
Coq_NArith_BinNat_N_lt || null2 || 9.33204241328e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_lcm || rep_filter || 9.10294115397e-37
Coq_Structures_OrdersEx_Z_as_OT_lcm || rep_filter || 9.10294115397e-37
Coq_Structures_OrdersEx_Z_as_DT_lcm || rep_filter || 9.10294115397e-37
Coq_NArith_BinNat_N_le || null2 || 9.068314242e-37
__constr_Coq_Init_Datatypes_nat_0_2 || rep_rat || 9.03590114803e-37
__constr_Coq_Init_Datatypes_nat_0_2 || rep_int || 9.03590114803e-37
__constr_Coq_Init_Datatypes_nat_0_2 || rep_real || 9.03590114803e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_le || null2 || 8.84581756611e-37
Coq_Structures_OrdersEx_Z_as_OT_le || null2 || 8.84581756611e-37
Coq_Structures_OrdersEx_Z_as_DT_le || null2 || 8.84581756611e-37
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || null2 || 8.7602880744e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_le || abel_semigroup || 8.64196731217e-37
Coq_Structures_OrdersEx_Z_as_OT_le || abel_semigroup || 8.64196731217e-37
Coq_Structures_OrdersEx_Z_as_DT_le || abel_semigroup || 8.64196731217e-37
Coq_Reals_Rdefinitions_Rge || abel_s1917375468axioms || 8.45598913598e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_le || lattic35693393ce_set || 8.32852403211e-37
Coq_Structures_OrdersEx_Z_as_OT_le || lattic35693393ce_set || 8.32852403211e-37
Coq_Structures_OrdersEx_Z_as_DT_le || lattic35693393ce_set || 8.32852403211e-37
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || null2 || 8.29509300721e-37
Coq_Numbers_Rational_BigQ_BigQ_BigQ_max || measures || 8.16937424825e-37
Coq_Classes_RelationClasses_PER_0 || distinct || 7.43898274571e-37
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || equiv_equivp || 6.55910857858e-37
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || equiv_part_equivp || 6.49109683038e-37
__constr_Coq_Numbers_BinNums_Z_0_3 || suc_Rep || 6.30730827144e-37
Coq_Reals_Rdefinitions_Rge || semigroup || 6.20432736408e-37
Coq_Numbers_Integer_BigZ_BigZ_BigZ_mul || rep_filter || 6.01351501129e-37
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || reflp || 5.70488859068e-37
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || equiv_equivp || 5.60729739222e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || rep_filter || 5.52768161314e-37
Coq_Structures_OrdersEx_Z_as_OT_mul || rep_filter || 5.52768161314e-37
Coq_Structures_OrdersEx_Z_as_DT_mul || rep_filter || 5.52768161314e-37
Coq_PArith_POrderedType_Positive_as_DT_lt || abel_semigroup || 5.12500295381e-37
Coq_PArith_POrderedType_Positive_as_OT_lt || abel_semigroup || 5.12500295381e-37
Coq_Structures_OrdersEx_Positive_as_DT_lt || abel_semigroup || 5.12500295381e-37
Coq_Structures_OrdersEx_Positive_as_OT_lt || abel_semigroup || 5.12500295381e-37
__constr_Coq_Init_Datatypes_nat_0_2 || nat_of_char || 4.72431266659e-37
__constr_Coq_Init_Datatypes_nat_0_2 || explode || 4.72431266659e-37
__constr_Coq_Init_Datatypes_nat_0_2 || rep_Nat || 4.72431266659e-37
Coq_ZArith_BinInt_Z_of_nat || suc_Rep || 4.65313456133e-37
Coq_Relations_Relation_Definitions_preorder_0 || is_filter || 4.1983250555e-37
Coq_ZArith_BinInt_Z_succ || empty || 4.05597494295e-37
Coq_ZArith_BinInt_Z_lt || semilattice || 4.05099723101e-37
Coq_NArith_BinNat_N_to_nat || suc || 3.55212811574e-37
Coq_PArith_BinPos_Pos_of_succ_nat || code_int_of_integer || 3.51686024523e-37
Coq_Relations_Relation_Operators_clos_refl_trans_0 || rep_filter || 3.41049111844e-37
Coq_QArith_QArith_base_Qlt || abel_semigroup || 3.33645442172e-37
Coq_PArith_BinPos_Pos_lt || abel_semigroup || 3.27723336855e-37
Coq_PArith_POrderedType_Positive_as_DT_le || abel_s1917375468axioms || 3.25564831957e-37
Coq_PArith_POrderedType_Positive_as_OT_le || abel_s1917375468axioms || 3.25564831957e-37
Coq_Structures_OrdersEx_Positive_as_DT_le || abel_s1917375468axioms || 3.25564831957e-37
Coq_Structures_OrdersEx_Positive_as_OT_le || abel_s1917375468axioms || 3.25564831957e-37
Coq_ZArith_BinInt_Z_divide || is_filter || 3.12514099115e-37
Coq_NArith_BinNat_N_to_nat || quotient_of || 2.87732618766e-37
Coq_FSets_FMapPositive_PositiveMap_ME_eqke || bNF_Ca1811156065der_on || 2.65875951846e-37
Coq_PArith_POrderedType_Positive_as_DT_le || wf || 2.64972077388e-37
Coq_PArith_POrderedType_Positive_as_OT_le || wf || 2.64972077388e-37
Coq_Structures_OrdersEx_Positive_as_DT_le || wf || 2.64972077388e-37
Coq_Structures_OrdersEx_Positive_as_OT_le || wf || 2.64972077388e-37
Coq_PArith_POrderedType_Positive_as_DT_max || measure || 2.52960697053e-37
Coq_PArith_POrderedType_Positive_as_OT_max || measure || 2.52960697053e-37
Coq_Structures_OrdersEx_Positive_as_DT_max || measure || 2.52960697053e-37
Coq_Structures_OrdersEx_Positive_as_OT_max || measure || 2.52960697053e-37
Coq_Reals_Rdefinitions_Rgt || equiv_equivp || 2.52001613893e-37
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || order_well_order_on || 2.50412512515e-37
Coq_PArith_POrderedType_Positive_as_DT_le || semigroup || 2.45103636851e-37
Coq_PArith_POrderedType_Positive_as_OT_le || semigroup || 2.45103636851e-37
Coq_Structures_OrdersEx_Positive_as_DT_le || semigroup || 2.45103636851e-37
Coq_Structures_OrdersEx_Positive_as_OT_le || semigroup || 2.45103636851e-37
Coq_QArith_Qminmax_Qmax || measure || 2.41509319919e-37
Coq_QArith_QArith_base_Qle || wf || 2.35160411522e-37
Coq_romega_ReflOmegaCore_Z_as_Int_plus || pow || 2.28695288375e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || suc_Rep || 2.28068157597e-37
Coq_Structures_OrdersEx_Z_as_OT_succ || suc_Rep || 2.28068157597e-37
Coq_Structures_OrdersEx_Z_as_DT_succ || suc_Rep || 2.28068157597e-37
Coq_ZArith_BinInt_Z_lcm || rep_filter || 2.2248361535e-37
Coq_PArith_BinPos_Pos_le || abel_s1917375468axioms || 2.1254132443e-37
Coq_PArith_BinPos_Pos_le || wf || 2.11433343518e-37
Coq_QArith_QArith_base_Qle || abel_s1917375468axioms || 2.00762032383e-37
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || suc_Rep || 1.99650403118e-37
Coq_Structures_OrdersEx_Z_as_OT_opp || suc_Rep || 1.99650403118e-37
Coq_Structures_OrdersEx_Z_as_DT_opp || suc_Rep || 1.99650403118e-37
Coq_PArith_POrderedType_Positive_as_DT_max || measures || 1.9897183277e-37
Coq_PArith_POrderedType_Positive_as_OT_max || measures || 1.9897183277e-37
Coq_Structures_OrdersEx_Positive_as_DT_max || measures || 1.9897183277e-37
Coq_Structures_OrdersEx_Positive_as_OT_max || measures || 1.9897183277e-37
Coq_PArith_BinPos_Pos_max || measure || 1.98766935972e-37
Coq_ZArith_BinInt_Z_lt || null2 || 1.94852517084e-37
Coq_ZArith_BinInt_Z_le || null2 || 1.8731754617e-37
Coq_QArith_Qminmax_Qmax || measures || 1.87157126165e-37
Coq_Sets_Relations_1_Order_0 || is_filter || 1.71017939336e-37
Coq_ZArith_BinInt_Z_le || semilattice_axioms || 1.61250338234e-37
Coq_Sorting_Sorted_StronglySorted_0 || bNF_Ca1811156065der_on || 1.61017404358e-37
Coq_PArith_BinPos_Pos_le || semigroup || 1.59837366609e-37
Coq_PArith_BinPos_Pos_max || measures || 1.57112302278e-37
Coq_Sets_Partial_Order_Rel_of || rep_filter || 1.57066713152e-37
Coq_QArith_QArith_base_Qle || semigroup || 1.5371492366e-37
Coq_Init_Datatypes_CompOpp || cnj || 1.49202168423e-37
Coq_PArith_BinPos_Pos_to_nat || suc || 1.44113511806e-37
Coq_Reals_Rdefinitions_Rge || equiv_part_equivp || 1.37989069439e-37
Coq_Sorting_Sorted_Sorted_0 || order_well_order_on || 1.34445199448e-37
Coq_ZArith_BinInt_Z_le || abel_semigroup || 1.31062108991e-37
Coq_Relations_Relation_Definitions_equivalence_0 || is_filter || 1.28241681026e-37
Coq_ZArith_BinInt_Z_le || lattic35693393ce_set || 1.2657670083e-37
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || rep_filter || 1.2321787325e-37
Coq_Reals_Rdefinitions_Rge || reflp || 1.21543721843e-37
Coq_PArith_POrderedType_Positive_as_DT_lt || equiv_equivp || 1.18683913558e-37
Coq_PArith_POrderedType_Positive_as_OT_lt || equiv_equivp || 1.18683913558e-37
Coq_Structures_OrdersEx_Positive_as_DT_lt || equiv_equivp || 1.18683913558e-37
Coq_Structures_OrdersEx_Positive_as_OT_lt || equiv_equivp || 1.18683913558e-37
Coq_romega_ReflOmegaCore_Z_as_Int_zero || one2 || 1.18106621593e-37
Coq_ZArith_BinInt_Z_mul || rep_filter || 1.14949482897e-37
Coq_QArith_QArith_base_Qlt || equiv_equivp || 8.42721067938e-38
__constr_Coq_Init_Datatypes_option_0_1 || rep_filter || 7.81879783928e-38
Coq_PArith_BinPos_Pos_to_nat || quotient_of || 7.81236922698e-38
Coq_PArith_BinPos_Pos_lt || equiv_equivp || 7.54407273207e-38
Coq_ZArith_BinInt_Z_of_N || suc || 6.91033886266e-38
Coq_PArith_POrderedType_Positive_as_DT_le || equiv_part_equivp || 6.17213978052e-38
Coq_PArith_POrderedType_Positive_as_OT_le || equiv_part_equivp || 6.17213978052e-38
Coq_Structures_OrdersEx_Positive_as_DT_le || equiv_part_equivp || 6.17213978052e-38
Coq_Structures_OrdersEx_Positive_as_OT_le || equiv_part_equivp || 6.17213978052e-38
Coq_PArith_POrderedType_Positive_as_DT_le || reflp || 5.48653417835e-38
Coq_PArith_POrderedType_Positive_as_OT_le || reflp || 5.48653417835e-38
Coq_Structures_OrdersEx_Positive_as_DT_le || reflp || 5.48653417835e-38
Coq_Structures_OrdersEx_Positive_as_OT_le || reflp || 5.48653417835e-38
__constr_Coq_Init_Datatypes_option_0_1 || basic_BNF_xtor || 5.38064394789e-38
Coq_ZArith_BinInt_Z_succ || suc_Rep || 5.27494786017e-38
Coq_Sets_Relations_2_Rstar_0 || set2 || 4.85075499541e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || quotient_of || 4.73539227282e-38
Coq_Structures_OrdersEx_Z_as_OT_pred || quotient_of || 4.73539227282e-38
Coq_Structures_OrdersEx_Z_as_DT_pred || quotient_of || 4.73539227282e-38
Coq_Sets_Relations_1_Transitive || finite_finite2 || 4.37629868587e-38
__constr_Coq_Init_Datatypes_nat_0_2 || nat_of_nibble || 4.26929148631e-38
Coq_QArith_QArith_base_Qle || equiv_part_equivp || 4.19629216917e-38
Coq_PArith_BinPos_Pos_le || equiv_part_equivp || 4.00470976039e-38
Coq_QArith_QArith_base_Qle || reflp || 3.75300130779e-38
Coq_Numbers_Natural_BigN_BigN_BigN_divide || distinct || 3.56225838827e-38
Coq_PArith_BinPos_Pos_le || reflp || 3.5582819511e-38
Coq_PArith_POrderedType_Positive_as_DT_add || set2 || 3.39176032545e-38
Coq_PArith_POrderedType_Positive_as_OT_add || set2 || 3.39176032545e-38
Coq_Structures_OrdersEx_Positive_as_DT_add || set2 || 3.39176032545e-38
Coq_Structures_OrdersEx_Positive_as_OT_add || set2 || 3.39176032545e-38
Coq_NArith_BinNat_N_of_nat || code_int_of_integer || 3.36287955437e-38
Coq_PArith_POrderedType_Positive_as_DT_lt || finite_finite2 || 3.08136242129e-38
Coq_PArith_POrderedType_Positive_as_OT_lt || finite_finite2 || 3.08136242129e-38
Coq_Structures_OrdersEx_Positive_as_DT_lt || finite_finite2 || 3.08136242129e-38
Coq_Structures_OrdersEx_Positive_as_OT_lt || finite_finite2 || 3.08136242129e-38
__constr_Coq_Numbers_BinNums_Z_0_3 || suc || 3.03618984625e-38
Coq_Reals_Ranalysis1_derivable_pt || wf || 2.84547861882e-38
Coq_ZArith_BinInt_Z_of_N || quotient_of || 2.73718508605e-38
Coq_Numbers_Natural_BigN_BigN_BigN_le || is_filter || 2.71526376509e-38
Coq_Numbers_Natural_BigN_BigN_BigN_lcm || remdups || 2.55707038278e-38
Coq_ZArith_BinInt_Z_of_nat || suc || 2.52137342375e-38
Coq_Numbers_Natural_Binary_NBinary_N_le || is_filter || 2.47122751993e-38
Coq_Structures_OrdersEx_N_as_OT_le || is_filter || 2.47122751993e-38
Coq_Structures_OrdersEx_N_as_DT_le || is_filter || 2.47122751993e-38
Coq_Reals_Rdefinitions_Rgt || bNF_Wellorder_wo_rel || 2.4662289108e-38
Coq_Sets_Partial_Order_Strict_Rel_of || set2 || 2.22656181626e-38
Coq_NArith_BinNat_N_le || is_filter || 2.05177132874e-38
Coq_Reals_Ranalysis1_continuity_pt || transitive_acyclic || 2.0411865548e-38
Coq_Sets_Relations_1_Reflexive || finite_finite2 || 2.02567355874e-38
Coq_Numbers_Natural_BigN_BigN_BigN_max || rep_filter || 1.96028561476e-38
Coq_Sets_Partial_Order_Carrier_of || rep_filter || 1.94905129748e-38
Coq_QArith_Qabs_Qabs || empty || 1.9482905651e-38
Coq_PArith_BinPos_Pos_add || set2 || 1.81419794583e-38
Coq_Numbers_Natural_Binary_NBinary_N_max || rep_filter || 1.77547290872e-38
Coq_Structures_OrdersEx_N_as_OT_max || rep_filter || 1.77547290872e-38
Coq_Structures_OrdersEx_N_as_DT_max || rep_filter || 1.77547290872e-38
Coq_Sets_Ensembles_Inhabited_0 || is_filter || 1.75575738969e-38
__constr_Coq_Init_Datatypes_nat_0_2 || implode str || 1.73588929148e-38
Coq_ZArith_BinInt_Z_opp || suc_Rep || 1.72059636143e-38
Coq_PArith_BinPos_Pos_lt || finite_finite2 || 1.67045475464e-38
Coq_QArith_QArith_base_Qle || null2 || 1.63391837555e-38
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || distinct || 1.60490919e-38
Coq_Reals_R_sqrt_sqrt || code_nat_of_integer || 1.604000554e-38
Coq_Numbers_Natural_BigN_BigN_BigN_mul || remdups || 1.55612979148e-38
Coq_Sets_Ensembles_Singleton_0 || rep_filter || 1.55536129419e-38
Coq_Logic_FinFun_Fin2Restrict_extend || remdups || 1.51197912622e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || distinct || 1.49324963001e-38
Coq_Structures_OrdersEx_Z_as_OT_divide || distinct || 1.49324963001e-38
Coq_Structures_OrdersEx_Z_as_DT_divide || distinct || 1.49324963001e-38
Coq_ZArith_BinInt_Z_pred || quotient_of || 1.48725915554e-38
Coq_Numbers_Natural_BigN_BigN_BigN_add || rep_filter || 1.47042995807e-38
Coq_Reals_Rdefinitions_Rge || antisym || 1.45719591665e-38
Coq_NArith_BinNat_N_max || rep_filter || 1.45524007566e-38
Coq_Numbers_Natural_Binary_NBinary_N_add || rep_filter || 1.34886823396e-38
Coq_Structures_OrdersEx_N_as_OT_add || rep_filter || 1.34886823396e-38
Coq_Structures_OrdersEx_N_as_DT_add || rep_filter || 1.34886823396e-38
Coq_Reals_Rdefinitions_Rge || trans || 1.27338629814e-38
Coq_Logic_FinFun_bFun || distinct || 1.23637093507e-38
Coq_Sets_Finite_sets_Finite_0 || is_filter || 1.23244366887e-38
Coq_Reals_RIneq_Rsqr || code_integer_of_int || 1.23037868929e-38
Coq_NArith_BinNat_N_add || rep_filter || 1.10356809954e-38
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lcm || remdups || 1.09028223238e-38
__constr_Coq_Init_Datatypes_nat_0_2 || arctan || 1.083205232e-38
Coq_Reals_Rbasic_fun_Rabs || nat2 || 1.05486358685e-38
Coq_Numbers_Integer_Binary_ZBinary_Z_lcm || remdups || 1.01890025238e-38
Coq_Structures_OrdersEx_Z_as_OT_lcm || remdups || 1.01890025238e-38
Coq_Structures_OrdersEx_Z_as_DT_lcm || remdups || 1.01890025238e-38
Coq_NArith_BinNat_N_to_nat || code_int_of_integer || 8.71641767244e-39
__constr_Coq_Numbers_BinNums_Z_0_3 || quotient_of || 8.5819534463e-39
Coq_Numbers_Integer_BigZ_BigZ_BigZ_mul || remdups || 6.91967425128e-39
Coq_ZArith_BinInt_Z_of_nat || quotient_of || 6.61646122375e-39
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || remdups || 6.46593998476e-39
Coq_Structures_OrdersEx_Z_as_OT_mul || remdups || 6.46593998476e-39
Coq_Structures_OrdersEx_Z_as_DT_mul || remdups || 6.46593998476e-39
Coq_Numbers_Natural_Binary_NBinary_N_lt || abel_semigroup || 6.31676304528e-39
Coq_Structures_OrdersEx_N_as_OT_lt || abel_semigroup || 6.31676304528e-39
Coq_Structures_OrdersEx_N_as_DT_lt || abel_semigroup || 6.31676304528e-39
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || code_nat_of_natural || 6.2618608458e-39
Coq_Structures_OrdersEx_Z_as_OT_pred || code_nat_of_natural || 6.2618608458e-39
Coq_Structures_OrdersEx_Z_as_DT_pred || code_nat_of_natural || 6.2618608458e-39
Coq_NArith_BinNat_N_lt || abel_semigroup || 5.74783828603e-39
__constr_Coq_Init_Datatypes_option_0_1 || pred3 || 5.45079554349e-39
Coq_Reals_Rbasic_fun_Rabs || nat_of_num || 5.0957560384e-39
Coq_PArith_BinPos_Pos_of_succ_nat || bit1 || 5.06944479256e-39
Coq_Reals_RIneq_Rsqr || pos || 5.03952327033e-39
__constr_Coq_Init_Datatypes_nat_0_2 || cnj || 4.81636170938e-39
Coq_Reals_Rbasic_fun_Rmax || set2 || 4.54946230796e-39
Coq_Numbers_Natural_Binary_NBinary_N_succ_double || suc_Rep || 4.48218662363e-39
Coq_Structures_OrdersEx_N_as_OT_succ_double || suc_Rep || 4.48218662363e-39
Coq_Structures_OrdersEx_N_as_DT_succ_double || suc_Rep || 4.48218662363e-39
Coq_Reals_R_sqrt_sqrt || nat2 || 4.25188065092e-39
Coq_ZArith_BinInt_Z_divide || distinct || 4.17010907137e-39
Coq_PArith_POrderedType_Positive_as_DT_lt || null2 || 3.880967749e-39
Coq_PArith_POrderedType_Positive_as_OT_lt || null2 || 3.880967749e-39
Coq_Structures_OrdersEx_Positive_as_DT_lt || null2 || 3.880967749e-39
Coq_Structures_OrdersEx_Positive_as_OT_lt || null2 || 3.880967749e-39
Coq_Numbers_Natural_Binary_NBinary_N_le || abel_s1917375468axioms || 3.83426782724e-39
Coq_Structures_OrdersEx_N_as_OT_le || abel_s1917375468axioms || 3.83426782724e-39
Coq_Structures_OrdersEx_N_as_DT_le || abel_s1917375468axioms || 3.83426782724e-39
Coq_Reals_Rdefinitions_Rle || finite_finite2 || 3.65660910695e-39
Coq_PArith_POrderedType_Positive_as_DT_succ || empty || 3.64651335784e-39
Coq_PArith_POrderedType_Positive_as_OT_succ || empty || 3.64651335784e-39
Coq_Structures_OrdersEx_Positive_as_DT_succ || empty || 3.64651335784e-39
Coq_Structures_OrdersEx_Positive_as_OT_succ || empty || 3.64651335784e-39
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || quotient_of || 3.59045712095e-39
Coq_Structures_OrdersEx_Z_as_OT_succ || quotient_of || 3.59045712095e-39
Coq_Structures_OrdersEx_Z_as_DT_succ || quotient_of || 3.59045712095e-39
Coq_NArith_BinNat_N_le || abel_s1917375468axioms || 3.49644695469e-39
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || quotient_of || 3.20260105322e-39
Coq_Structures_OrdersEx_Z_as_OT_opp || quotient_of || 3.20260105322e-39
Coq_Structures_OrdersEx_Z_as_DT_opp || quotient_of || 3.20260105322e-39
Coq_ZArith_BinInt_Z_lcm || remdups || 3.0825750992e-39
Coq_Numbers_Natural_Binary_NBinary_N_le || semigroup || 3.02652617239e-39
Coq_Structures_OrdersEx_N_as_OT_le || semigroup || 3.02652617239e-39
Coq_Structures_OrdersEx_N_as_DT_le || semigroup || 3.02652617239e-39
Coq_Numbers_Integer_Binary_ZBinary_Z_sub || rep_filter || 3.02206313337e-39
Coq_Structures_OrdersEx_Z_as_OT_sub || rep_filter || 3.02206313337e-39
Coq_Structures_OrdersEx_Z_as_DT_sub || rep_filter || 3.02206313337e-39
Coq_NArith_BinNat_N_le || semigroup || 2.76063272792e-39
Coq_PArith_BinPos_Pos_to_nat || code_int_of_integer || 2.75987526486e-39
Coq_Reals_Rdefinitions_Rlt || abel_semigroup || 2.72856229795e-39
Coq_Init_Datatypes_negb || cnj || 2.22502660004e-39
Coq_Numbers_Natural_Binary_NBinary_N_succ || quotient_of || 2.21481364968e-39
Coq_Structures_OrdersEx_N_as_OT_succ || quotient_of || 2.21481364968e-39
Coq_Structures_OrdersEx_N_as_DT_succ || quotient_of || 2.21481364968e-39
Coq_Numbers_Integer_Binary_ZBinary_Z_sub || basic_BNF_xtor || 2.16772250723e-39
Coq_Structures_OrdersEx_Z_as_OT_sub || basic_BNF_xtor || 2.16772250723e-39
Coq_Structures_OrdersEx_Z_as_DT_sub || basic_BNF_xtor || 2.16772250723e-39
Coq_ZArith_BinInt_Z_pred || code_nat_of_natural || 2.13347478103e-39
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || abel_semigroup || 1.98753298283e-39
Coq_Structures_OrdersEx_Z_as_OT_lt || abel_semigroup || 1.98753298283e-39
Coq_Structures_OrdersEx_Z_as_DT_lt || abel_semigroup || 1.98753298283e-39
Coq_NArith_BinNat_N_succ || quotient_of || 1.87135610719e-39
Coq_Numbers_Natural_Binary_NBinary_N_lt || equiv_equivp || 1.86388204709e-39
Coq_Structures_OrdersEx_N_as_OT_lt || equiv_equivp || 1.86388204709e-39
Coq_Structures_OrdersEx_N_as_DT_lt || equiv_equivp || 1.86388204709e-39
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || code_int_of_integer || 1.77173472528e-39
Coq_Structures_OrdersEx_Z_as_OT_pred || code_int_of_integer || 1.77173472528e-39
Coq_Structures_OrdersEx_Z_as_DT_pred || code_int_of_integer || 1.77173472528e-39
Coq_NArith_BinNat_N_lt || equiv_equivp || 1.69837717741e-39
Coq_Reals_Rtrigo_calc_toRad || quotient_of || 1.69204386625e-39
Coq_ZArith_BinInt_Z_mul || remdups || 1.68533998946e-39
Coq_Reals_Rdefinitions_Rle || abel_s1917375468axioms || 1.64003632038e-39
Coq_PArith_BinPos_Pos_lt || null2 || 1.63380396751e-39
Coq_PArith_BinPos_Pos_succ || empty || 1.51977101349e-39
Coq_Reals_Rdefinitions_Rle || semigroup || 1.30555389899e-39
__constr_Coq_Init_Datatypes_nat_0_2 || sqrt || 1.30503398569e-39
__constr_Coq_Numbers_BinNums_Z_0_3 || code_nat_of_natural || 1.27823113333e-39
Coq_Numbers_Integer_Binary_ZBinary_Z_le || abel_s1917375468axioms || 1.17480103124e-39
Coq_Structures_OrdersEx_Z_as_OT_le || abel_s1917375468axioms || 1.17480103124e-39
Coq_Structures_OrdersEx_Z_as_DT_le || abel_s1917375468axioms || 1.17480103124e-39
Coq_Numbers_Natural_Binary_NBinary_N_double || suc_Rep || 1.14823881701e-39
Coq_Structures_OrdersEx_N_as_OT_double || suc_Rep || 1.14823881701e-39
Coq_Structures_OrdersEx_N_as_DT_double || suc_Rep || 1.14823881701e-39
Coq_ZArith_BinInt_Z_of_N || code_int_of_integer || 1.08945220492e-39
Coq_Numbers_Natural_BigN_BigN_BigN_le || semilattice || 1.03115235077e-39
Coq_ZArith_BinInt_Z_succ || quotient_of || 1.01668516594e-39
Coq_Numbers_Natural_Binary_NBinary_N_le || equiv_part_equivp || 9.57535487998e-40
Coq_Structures_OrdersEx_N_as_OT_le || equiv_part_equivp || 9.57535487998e-40
Coq_Structures_OrdersEx_N_as_DT_le || equiv_part_equivp || 9.57535487998e-40
Coq_Numbers_Integer_Binary_ZBinary_Z_le || semigroup || 9.40608969415e-40
Coq_Structures_OrdersEx_Z_as_OT_le || semigroup || 9.40608969415e-40
Coq_Structures_OrdersEx_Z_as_DT_le || semigroup || 9.40608969415e-40
Coq_Relations_Relation_Definitions_preorder_0 || distinct || 9.29983548255e-40
Coq_NArith_BinNat_N_le || equiv_part_equivp || 8.74611901637e-40
Coq_Relations_Relation_Operators_clos_refl_trans_0 || remdups || 8.69018882285e-40
Coq_Numbers_Natural_Binary_NBinary_N_le || reflp || 8.65853595268e-40
Coq_Structures_OrdersEx_N_as_OT_le || reflp || 8.65853595268e-40
Coq_Structures_OrdersEx_N_as_DT_le || reflp || 8.65853595268e-40
Coq_Reals_Rdefinitions_Rlt || equiv_equivp || 8.40762629869e-40
Coq_romega_ReflOmegaCore_Z_as_Int_plus || root || 8.30932605862e-40
Coq_QArith_Qcanon_Qclt || lattic35693393ce_set || 8.24040618972e-40
Coq_QArith_Qcanon_Qcle || semilattice || 8.12502901774e-40
Coq_NArith_BinNat_N_le || reflp || 7.9094623155e-40
Coq_ZArith_BinInt_Z_pred || code_int_of_integer || 6.33355037417e-40
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || equiv_equivp || 6.3075889386e-40
Coq_Structures_OrdersEx_Z_as_OT_lt || equiv_equivp || 6.3075889386e-40
Coq_Structures_OrdersEx_Z_as_DT_lt || equiv_equivp || 6.3075889386e-40
Coq_NArith_BinNat_N_of_nat || bit1 || 5.94329289752e-40
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || code_nat_of_natural || 5.6681296008e-40
Coq_Structures_OrdersEx_Z_as_OT_succ || code_nat_of_natural || 5.6681296008e-40
Coq_Structures_OrdersEx_Z_as_DT_succ || code_nat_of_natural || 5.6681296008e-40
Coq_Sets_Partial_Order_Rel_of || remdups || 5.41201769042e-40
Coq_Numbers_Natural_BigN_BigN_BigN_lt || lattic35693393ce_set || 5.25749025663e-40
Coq_Sets_Relations_1_Order_0 || distinct || 5.2523937435e-40
Coq_romega_ReflOmegaCore_Z_as_Int_lt || lattic35693393ce_set || 4.94899587545e-40
Coq_romega_ReflOmegaCore_Z_as_Int_le || semilattice || 4.68857956918e-40
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || remdups || 4.67168212377e-40
Coq_Numbers_Natural_BigN_BigN_BigN_eq || lattic35693393ce_set || 4.61602473743e-40
Coq_Relations_Relation_Definitions_equivalence_0 || distinct || 4.37266458758e-40
Coq_Reals_Rdefinitions_Rle || equiv_part_equivp || 4.30245174364e-40
Coq_Reals_Rdefinitions_Rle || reflp || 3.90277318949e-40
__constr_Coq_Numbers_BinNums_Z_0_3 || code_int_of_integer || 3.87998312382e-40
Coq_ZArith_BinInt_Z_opp || quotient_of || 3.84870244713e-40
Coq_Numbers_Natural_Binary_NBinary_N_succ || code_nat_of_natural || 3.60846879202e-40
Coq_Structures_OrdersEx_N_as_OT_succ || code_nat_of_natural || 3.60846879202e-40
Coq_Structures_OrdersEx_N_as_DT_succ || code_nat_of_natural || 3.60846879202e-40
__constr_Coq_Init_Datatypes_option_0_1 || principal || 3.45166004451e-40
Coq_Numbers_Integer_Binary_ZBinary_Z_le || equiv_part_equivp || 3.18632388219e-40
Coq_Structures_OrdersEx_Z_as_OT_le || equiv_part_equivp || 3.18632388219e-40
Coq_Structures_OrdersEx_Z_as_DT_le || equiv_part_equivp || 3.18632388219e-40
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || semilattice || 3.13693117586e-40
Coq_NArith_BinNat_N_succ || code_nat_of_natural || 3.08224593184e-40
Coq_ZArith_BinInt_Z_lt || abel_semigroup || 2.90328424731e-40
Coq_Numbers_Integer_Binary_ZBinary_Z_le || reflp || 2.89663032929e-40
Coq_Structures_OrdersEx_Z_as_OT_le || reflp || 2.89663032929e-40
Coq_Structures_OrdersEx_Z_as_DT_le || reflp || 2.89663032929e-40
Coq_Numbers_Integer_Binary_ZBinary_Z_sub || pred3 || 2.8035266832e-40
Coq_Structures_OrdersEx_Z_as_OT_sub || pred3 || 2.8035266832e-40
Coq_Structures_OrdersEx_Z_as_DT_sub || pred3 || 2.8035266832e-40
Coq_ZArith_Int_Z_as_Int_i2z || suc_Rep || 2.49444262852e-40
Coq_QArith_Qcanon_Qcle || transitive_acyclic || 1.80482992476e-40
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || code_int_of_integer || 1.78094596543e-40
Coq_Structures_OrdersEx_Z_as_OT_succ || code_int_of_integer || 1.78094596543e-40
Coq_Structures_OrdersEx_Z_as_DT_succ || code_int_of_integer || 1.78094596543e-40
Coq_ZArith_BinInt_Z_succ || code_nat_of_natural || 1.74093909771e-40
Coq_NArith_BinNat_N_to_nat || bit1 || 1.72046933733e-40
Coq_ZArith_BinInt_Z_le || abel_s1917375468axioms || 1.71037875819e-40
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || lattic35693393ce_set || 1.61992967713e-40
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || code_int_of_integer || 1.60769031318e-40
Coq_Structures_OrdersEx_Z_as_OT_opp || code_int_of_integer || 1.60769031318e-40
Coq_Structures_OrdersEx_Z_as_DT_opp || code_int_of_integer || 1.60769031318e-40
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || lattic35693393ce_set || 1.44410917532e-40
Coq_QArith_Qcanon_Qclt || wf || 1.43764364476e-40
Coq_ZArith_BinInt_Z_le || semigroup || 1.38928941891e-40
Coq_Numbers_Rational_BigQ_BigQ_BigQ_max || rep_filter || 1.36686423379e-40
Coq_Numbers_Rational_BigQ_BigQ_BigQ_le || is_filter || 1.22967417555e-40
__constr_Coq_Init_Datatypes_option_0_1 || rev || 1.17359081214e-40
Coq_Sets_Partial_Order_Carrier_of || remdups || 1.16704525681e-40
Coq_Numbers_Natural_Binary_NBinary_N_succ || code_int_of_integer || 1.15525564143e-40
Coq_Structures_OrdersEx_N_as_OT_succ || code_int_of_integer || 1.15525564143e-40
Coq_Structures_OrdersEx_N_as_DT_succ || code_int_of_integer || 1.15525564143e-40
Coq_Bool_Bool_Is_true || suc_Rep || 1.11985314377e-40
Coq_ZArith_BinInt_Z_sub || rep_filter || 1.00378348385e-40
Coq_NArith_BinNat_N_succ || code_int_of_integer || 9.93196770677e-41
Coq_ZArith_BinInt_Z_lt || equiv_equivp || 9.91756261386e-41
Coq_Sets_Ensembles_Inhabited_0 || distinct || 9.74835128151e-41
Coq_romega_ReflOmegaCore_Z_as_Int_le || transitive_acyclic || 9.47602101351e-41
Coq_romega_ReflOmegaCore_Z_as_Int_lt || wf || 7.87248541381e-41
Coq_Reals_Rtrigo_def_exp || suc_Rep || 7.85857725877e-41
Coq_ZArith_BinInt_Z_sub || basic_BNF_xtor || 7.4852838369e-41
Coq_Reals_Rtrigo_calc_toRad || code_nat_of_natural || 6.64745278361e-41
Coq_ZArith_BinInt_Z_succ || code_int_of_integer || 5.74139177673e-41
Coq_Arith_PeanoNat_Nat_b2n || suc_Rep || 5.65630861197e-41
Coq_Numbers_Natural_Binary_NBinary_N_b2n || suc_Rep || 5.65630861197e-41
Coq_NArith_BinNat_N_b2n || suc_Rep || 5.65630861197e-41
Coq_Structures_OrdersEx_N_as_OT_b2n || suc_Rep || 5.65630861197e-41
Coq_Structures_OrdersEx_N_as_DT_b2n || suc_Rep || 5.65630861197e-41
Coq_Structures_OrdersEx_Nat_as_DT_b2n || suc_Rep || 5.65630861197e-41
Coq_Structures_OrdersEx_Nat_as_OT_b2n || suc_Rep || 5.65630861197e-41
__constr_Coq_Numbers_BinNums_Z_0_2 || suc_Rep || 5.38967523227e-41
Coq_ZArith_BinInt_Z_le || equiv_part_equivp || 5.04545526959e-41
Coq_Sets_Cpo_PO_of_cpo || set2 || 4.79351833385e-41
Coq_ZArith_BinInt_Z_le || reflp || 4.61168734415e-41
Coq_Numbers_Integer_Binary_ZBinary_Z_b2z || suc_Rep || 4.16244782943e-41
Coq_Structures_OrdersEx_Z_as_OT_b2z || suc_Rep || 4.16244782943e-41
Coq_Structures_OrdersEx_Z_as_DT_b2z || suc_Rep || 4.16244782943e-41
Coq_ZArith_BinInt_Z_b2z || suc_Rep || 4.16244782943e-41
Coq_Sets_Cpo_Complete_0 || finite_finite2 || 3.67053123706e-41
Coq_PArith_POrderedType_Positive_as_DT_max || rep_filter || 3.19567291121e-41
Coq_PArith_POrderedType_Positive_as_OT_max || rep_filter || 3.19567291121e-41
Coq_Structures_OrdersEx_Positive_as_DT_max || rep_filter || 3.19567291121e-41
Coq_Structures_OrdersEx_Positive_as_OT_max || rep_filter || 3.19567291121e-41
Coq_QArith_Qminmax_Qmax || rep_filter || 2.95485219519e-41
Coq_Numbers_Natural_Binary_NBinary_N_divide || finite_finite2 || 2.84971917876e-41
Coq_Structures_OrdersEx_N_as_OT_divide || finite_finite2 || 2.84971917876e-41
Coq_Structures_OrdersEx_N_as_DT_divide || finite_finite2 || 2.84971917876e-41
Coq_NArith_BinNat_N_divide || finite_finite2 || 2.76109895312e-41
Coq_Numbers_Natural_BigN_BigN_BigN_divide || finite_finite2 || 2.73441212167e-41
Coq_PArith_POrderedType_Positive_as_DT_le || is_filter || 2.70614049585e-41
Coq_PArith_POrderedType_Positive_as_OT_le || is_filter || 2.70614049585e-41
Coq_Structures_OrdersEx_Positive_as_DT_le || is_filter || 2.70614049585e-41
Coq_Structures_OrdersEx_Positive_as_OT_le || is_filter || 2.70614049585e-41
Coq_Arith_PeanoNat_Nat_divide || finite_finite2 || 2.64974649727e-41
Coq_Structures_OrdersEx_Nat_as_DT_divide || finite_finite2 || 2.64974649727e-41
Coq_Structures_OrdersEx_Nat_as_OT_divide || finite_finite2 || 2.64974649727e-41
Coq_PArith_BinPos_Pos_max || rep_filter || 2.52442064183e-41
Coq_ZArith_BinInt_Z_opp || code_int_of_integer || 2.39313554233e-41
Coq_QArith_QArith_base_Qle || is_filter || 2.3368254791e-41
Coq_Numbers_Integer_Binary_ZBinary_Z_sub || principal || 2.33128900902e-41
Coq_Structures_OrdersEx_Z_as_OT_sub || principal || 2.33128900902e-41
Coq_Structures_OrdersEx_Z_as_DT_sub || principal || 2.33128900902e-41
Coq_PArith_BinPos_Pos_le || is_filter || 2.15955265889e-41
Coq_PArith_BinPos_Pos_of_succ_nat || product_Rep_unit || 2.14816030872e-41
Coq_Numbers_Natural_Binary_NBinary_N_lcm || set2 || 1.78104313165e-41
Coq_Structures_OrdersEx_N_as_OT_lcm || set2 || 1.78104313165e-41
Coq_Structures_OrdersEx_N_as_DT_lcm || set2 || 1.78104313165e-41
Coq_NArith_BinNat_N_lcm || set2 || 1.729041186e-41
Coq_Numbers_Natural_BigN_BigN_BigN_lcm || set2 || 1.71318569985e-41
Coq_Arith_PeanoNat_Nat_lcm || set2 || 1.66321776371e-41
Coq_Structures_OrdersEx_Nat_as_DT_lcm || set2 || 1.66321776371e-41
Coq_Structures_OrdersEx_Nat_as_OT_lcm || set2 || 1.66321776371e-41
Coq_Numbers_Integer_BigZ_BigZ_BigZ_divide || finite_finite2 || 1.53185427984e-41
Coq_NArith_BinNat_N_succ_double || suc_Rep || 1.45424771756e-41
Coq_Numbers_Integer_Binary_ZBinary_Z_divide || finite_finite2 || 1.44472190638e-41
Coq_Structures_OrdersEx_Z_as_OT_divide || finite_finite2 || 1.44472190638e-41
Coq_Structures_OrdersEx_Z_as_DT_divide || finite_finite2 || 1.44472190638e-41
Coq_Structures_OrdersEx_Nat_as_DT_add || root || 1.36258865562e-41
Coq_Structures_OrdersEx_Nat_as_OT_add || root || 1.36258865562e-41
Coq_Numbers_Natural_Binary_NBinary_N_add || root || 1.31456749546e-41
Coq_Structures_OrdersEx_N_as_OT_add || root || 1.31456749546e-41
Coq_Structures_OrdersEx_N_as_DT_add || root || 1.31456749546e-41
Coq_Arith_PeanoNat_Nat_add || root || 1.26884961595e-41
Coq_Numbers_Natural_Binary_NBinary_N_mul || set2 || 1.24862649983e-41
Coq_Structures_OrdersEx_N_as_OT_mul || set2 || 1.24862649983e-41
Coq_Structures_OrdersEx_N_as_DT_mul || set2 || 1.24862649983e-41
Coq_ZArith_BinInt_Z_sub || pred3 || 1.21901925695e-41
Coq_Numbers_Natural_BigN_BigN_BigN_mul || set2 || 1.19773889744e-41
Coq_NArith_BinNat_N_mul || set2 || 1.19622348864e-41
Coq_Arith_PeanoNat_Nat_mul || set2 || 1.16399093397e-41
Coq_Structures_OrdersEx_Nat_as_DT_mul || set2 || 1.16399093397e-41
Coq_Structures_OrdersEx_Nat_as_OT_mul || set2 || 1.16399093397e-41
__constr_Coq_Init_Datatypes_option_0_1 || some || 1.09817120216e-41
Coq_PArith_BinPos_Pos_of_succ_nat || rep_rat || 9.97165025326e-42
Coq_PArith_BinPos_Pos_of_succ_nat || rep_int || 9.97165025326e-42
Coq_PArith_BinPos_Pos_of_succ_nat || rep_real || 9.97165025326e-42
Coq_Reals_Rtrigo_calc_toRad || code_int_of_integer || 9.32575113241e-42
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lcm || set2 || 9.24970099467e-42
Coq_NArith_BinNat_N_add || root || 9.1224001189e-42
Coq_Numbers_Integer_Binary_ZBinary_Z_sub || rev || 8.76182034512e-42
Coq_Structures_OrdersEx_Z_as_OT_sub || rev || 8.76182034512e-42
Coq_Structures_OrdersEx_Z_as_DT_sub || rev || 8.76182034512e-42
Coq_Numbers_Integer_Binary_ZBinary_Z_lcm || set2 || 8.75342818055e-42
Coq_Structures_OrdersEx_Z_as_OT_lcm || set2 || 8.75342818055e-42
Coq_Structures_OrdersEx_Z_as_DT_lcm || set2 || 8.75342818055e-42
Coq_Numbers_Integer_Binary_ZBinary_Z_add || root || 7.6223861656e-42
Coq_Structures_OrdersEx_Z_as_OT_add || root || 7.6223861656e-42
Coq_Structures_OrdersEx_Z_as_DT_add || root || 7.6223861656e-42
Coq_Numbers_Natural_Binary_NBinary_N_succ_double || quotient_of || 7.58893604551e-42
Coq_Structures_OrdersEx_N_as_OT_succ_double || quotient_of || 7.58893604551e-42
Coq_Structures_OrdersEx_N_as_DT_succ_double || quotient_of || 7.58893604551e-42
Coq_NArith_BinNat_N_double || suc_Rep || 7.58893604551e-42
Coq_Numbers_Natural_Binary_NBinary_N_mul || root || 6.90174249213e-42
Coq_Structures_OrdersEx_N_as_OT_mul || root || 6.90174249213e-42
Coq_Structures_OrdersEx_N_as_DT_mul || root || 6.90174249213e-42
Coq_Arith_PeanoNat_Nat_mul || root || 6.71326594684e-42
Coq_Structures_OrdersEx_Nat_as_DT_mul || root || 6.71326594684e-42
Coq_Structures_OrdersEx_Nat_as_OT_mul || root || 6.71326594684e-42
Coq_Numbers_Integer_BigZ_BigZ_BigZ_mul || set2 || 6.62923619136e-42
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || set2 || 6.27391271007e-42
Coq_Structures_OrdersEx_Z_as_OT_mul || set2 || 6.27391271007e-42
Coq_Structures_OrdersEx_Z_as_DT_mul || set2 || 6.27391271007e-42
Coq_Classes_SetoidClass_pequiv || set2 || 5.50829722981e-42
Coq_NArith_BinNat_N_mul || root || 5.16785534988e-42
Coq_ZArith_BinInt_Z_divide || finite_finite2 || 5.05535690797e-42
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || bit1 || 4.28133710112e-42
Coq_Structures_OrdersEx_Z_as_OT_opp || bit1 || 4.28133710112e-42
Coq_Structures_OrdersEx_Z_as_DT_opp || bit1 || 4.28133710112e-42
Coq_Classes_RelationClasses_PER_0 || finite_finite2 || 3.44068469683e-42
Coq_ZArith_BinInt_Z_lcm || set2 || 3.2614728474e-42
Coq_Reals_Rdefinitions_Rge || semilattice || 3.13005468259e-42
Coq_Reals_Rdefinitions_Rgt || lattic35693393ce_set || 2.96200436681e-42
Coq_PArith_BinPos_Pos_of_succ_nat || nat_of_char || 2.88656559478e-42
Coq_PArith_BinPos_Pos_of_succ_nat || explode || 2.88656559478e-42
Coq_PArith_BinPos_Pos_of_succ_nat || rep_Nat || 2.88656559478e-42
Coq_Numbers_Natural_Binary_NBinary_N_double || quotient_of || 2.52392506004e-42
Coq_Structures_OrdersEx_N_as_OT_double || quotient_of || 2.52392506004e-42
Coq_Structures_OrdersEx_N_as_DT_double || quotient_of || 2.52392506004e-42
Coq_Numbers_Integer_Binary_ZBinary_Z_mul || root || 2.5144095326e-42
Coq_Structures_OrdersEx_Z_as_OT_mul || root || 2.5144095326e-42
Coq_Structures_OrdersEx_Z_as_DT_mul || root || 2.5144095326e-42
__constr_Coq_Numbers_BinNums_Z_0_2 || quotient_of || 2.40065212044e-42
Coq_Sets_Relations_3_coherent || set2 || 2.16497214261e-42
Coq_ZArith_BinInt_Z_mul || set2 || 2.08565282644e-42
Coq_Numbers_Rational_BigQ_BigQ_BigQ_max || remdups || 1.77544847128e-42
Coq_Numbers_Integer_BigZ_BigZ_BigZ_max || rep_filter || 1.76352442405e-42
Coq_Sets_Relations_1_Symmetric || finite_finite2 || 1.64270793136e-42
Coq_Numbers_Integer_Binary_ZBinary_Z_max || rep_filter || 1.56012948958e-42
Coq_Structures_OrdersEx_Z_as_OT_max || rep_filter || 1.56012948958e-42
Coq_Structures_OrdersEx_Z_as_DT_max || rep_filter || 1.56012948958e-42
Coq_Numbers_Rational_BigQ_BigQ_BigQ_le || distinct || 1.49773900597e-42
Coq_ZArith_BinInt_Z_sub || principal || 1.31581819191e-42
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || is_filter || 1.25345176911e-42
Coq_PArith_POrderedType_Positive_as_DT_le || semilattice || 1.14045141379e-42
Coq_PArith_POrderedType_Positive_as_OT_le || semilattice || 1.14045141379e-42
Coq_Structures_OrdersEx_Positive_as_DT_le || semilattice || 1.14045141379e-42
Coq_Structures_OrdersEx_Positive_as_OT_le || semilattice || 1.14045141379e-42
Coq_PArith_POrderedType_Positive_as_DT_lt || lattic35693393ce_set || 1.13179654672e-42
Coq_PArith_POrderedType_Positive_as_OT_lt || lattic35693393ce_set || 1.13179654672e-42
Coq_Structures_OrdersEx_Positive_as_DT_lt || lattic35693393ce_set || 1.13179654672e-42
Coq_Structures_OrdersEx_Positive_as_OT_lt || lattic35693393ce_set || 1.13179654672e-42
Coq_Numbers_Integer_Binary_ZBinary_Z_le || is_filter || 1.11103915631e-42
Coq_Structures_OrdersEx_Z_as_OT_le || is_filter || 1.11103915631e-42
Coq_Structures_OrdersEx_Z_as_DT_le || is_filter || 1.11103915631e-42
Coq_Numbers_Natural_BigN_BigN_BigN_le || finite_finite2 || 1.02826905773e-42
Coq_Numbers_Integer_Binary_ZBinary_Z_sub || some || 1.00946132854e-42
Coq_Structures_OrdersEx_Z_as_OT_sub || some || 1.00946132854e-42
Coq_Structures_OrdersEx_Z_as_DT_sub || some || 1.00946132854e-42
Coq_Numbers_Natural_Binary_NBinary_N_le || finite_finite2 || 9.65725751084e-43
Coq_Structures_OrdersEx_N_as_OT_le || finite_finite2 || 9.65725751084e-43
Coq_Structures_OrdersEx_N_as_DT_le || finite_finite2 || 9.65725751084e-43
Coq_NArith_BinNat_N_le || finite_finite2 || 8.54569041595e-43
Coq_PArith_BinPos_Pos_le || semilattice || 8.15044099669e-43
Coq_PArith_BinPos_Pos_lt || lattic35693393ce_set || 7.92990631976e-43
Coq_NArith_BinNat_N_of_nat || product_Rep_unit || 7.39043396951e-43
Coq_ZArith_Int_Z_as_Int_i2z || quotient_of || 7.29093931784e-43
Coq_Init_Datatypes_CompOpp || suc_Rep || 6.98750473699e-43
Coq_QArith_QArith_base_Qlt || lattic35693393ce_set || 6.70521811617e-43
Coq_Numbers_Natural_BigN_BigN_BigN_max || set2 || 6.70114945161e-43
Coq_QArith_QArith_base_Qle || semilattice || 6.48786647593e-43
Coq_Numbers_Natural_Binary_NBinary_N_max || set2 || 6.27521143186e-43
Coq_Structures_OrdersEx_N_as_OT_max || set2 || 6.27521143186e-43
Coq_Structures_OrdersEx_N_as_DT_max || set2 || 6.27521143186e-43
Coq_Logic_FinFun_Fin2Restrict_extend || set2 || 5.79128319307e-43
Coq_Numbers_Natural_BigN_BigN_BigN_add || set2 || 5.5547102903e-43
Coq_NArith_BinNat_N_max || set2 || 5.50885828951e-43
Coq_ZArith_BinInt_Z_sub || rev || 5.44919776318e-43
Coq_ZArith_BinInt_Z_add || root || 5.37108152422e-43
Coq_Logic_FinFun_bFun || finite_finite2 || 5.29341205646e-43
Coq_Numbers_Natural_Binary_NBinary_N_add || set2 || 5.24445975866e-43
Coq_Structures_OrdersEx_N_as_OT_add || set2 || 5.24445975866e-43
Coq_Structures_OrdersEx_N_as_DT_add || set2 || 5.24445975866e-43
Coq_Numbers_Natural_Binary_NBinary_N_succ_double || code_nat_of_natural || 5.05086827736e-43
Coq_Structures_OrdersEx_N_as_OT_succ_double || code_nat_of_natural || 5.05086827736e-43
Coq_Structures_OrdersEx_N_as_DT_succ_double || code_nat_of_natural || 5.05086827736e-43
Coq_NArith_BinNat_N_add || set2 || 4.59280998505e-43
Coq_Bool_Bool_Is_true || quotient_of || 3.78794207334e-43
Coq_Reals_Raxioms_IZR || suc_Rep || 3.74260245124e-43
Coq_NArith_BinNat_N_of_nat || rep_rat || 3.72626257361e-43
Coq_NArith_BinNat_N_of_nat || rep_int || 3.72626257361e-43
Coq_NArith_BinNat_N_of_nat || rep_real || 3.72626257361e-43
Coq_ZArith_BinInt_Z_max || rep_filter || 3.64253326229e-43
Coq_ZArith_BinInt_Z_of_N || bit0 || 3.02880964178e-43
Coq_Reals_Rtrigo_def_exp || quotient_of || 2.83334380829e-43
Coq_Reals_Raxioms_INR || suc_Rep || 2.59339334436e-43
Coq_ZArith_BinInt_Z_le || is_filter || 2.55336723103e-43
Coq_ZArith_BinInt_Z_mul || root || 2.38316425093e-43
__constr_Coq_Numbers_BinNums_Z_0_2 || code_int_of_integer || 2.35489606919e-43
Coq_Arith_PeanoNat_Nat_b2n || quotient_of || 2.1628628858e-43
Coq_Numbers_Natural_Binary_NBinary_N_b2n || quotient_of || 2.1628628858e-43
Coq_NArith_BinNat_N_b2n || quotient_of || 2.1628628858e-43
Coq_Structures_OrdersEx_N_as_OT_b2n || quotient_of || 2.1628628858e-43
Coq_Structures_OrdersEx_N_as_DT_b2n || quotient_of || 2.1628628858e-43
Coq_Structures_OrdersEx_Nat_as_DT_b2n || quotient_of || 2.1628628858e-43
Coq_Structures_OrdersEx_Nat_as_OT_b2n || quotient_of || 2.1628628858e-43
Coq_Numbers_Natural_Binary_NBinary_N_double || code_nat_of_natural || 1.85542382545e-43
Coq_Structures_OrdersEx_N_as_OT_double || code_nat_of_natural || 1.85542382545e-43
Coq_Structures_OrdersEx_N_as_DT_double || code_nat_of_natural || 1.85542382545e-43
Coq_PArith_BinPos_Pos_of_succ_nat || code_Suc || 1.84292470053e-43
Coq_QArith_QArith_base_Qle || transitive_acyclic || 1.81410964067e-43
Coq_Numbers_Integer_Binary_ZBinary_Z_b2z || quotient_of || 1.68072784938e-43
Coq_Structures_OrdersEx_Z_as_OT_b2z || quotient_of || 1.68072784938e-43
Coq_Structures_OrdersEx_Z_as_DT_b2z || quotient_of || 1.68072784938e-43
Coq_ZArith_BinInt_Z_b2z || quotient_of || 1.68072784938e-43
Coq_QArith_QArith_base_Qlt || wf || 1.55094134976e-43
Coq_NArith_BinNat_N_of_nat || nat_of_char || 1.2293955749e-43
Coq_NArith_BinNat_N_of_nat || explode || 1.2293955749e-43
Coq_NArith_BinNat_N_of_nat || rep_Nat || 1.2293955749e-43
Coq_ZArith_BinInt_Z_of_nat || bit0 || 1.11612834404e-43
Coq_NArith_BinNat_N_to_nat || product_Rep_unit || 1.11205709087e-43
Coq_Relations_Relation_Definitions_preorder_0 || finite_finite2 || 1.00534834307e-43
Coq_Numbers_Natural_Binary_NBinary_N_succ_double || code_int_of_integer || 9.5885484139e-44
Coq_Structures_OrdersEx_N_as_OT_succ_double || code_int_of_integer || 9.5885484139e-44
Coq_Structures_OrdersEx_N_as_DT_succ_double || code_int_of_integer || 9.5885484139e-44
Coq_Relations_Relation_Operators_clos_refl_trans_0 || set2 || 9.13640515642e-44
Coq_ZArith_BinInt_Z_sub || some || 7.69501653535e-44
Coq_NArith_BinNat_N_succ_double || quotient_of || 7.05761942501e-44
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || bit0 || 6.66237682688e-44
Coq_Structures_OrdersEx_Z_as_OT_opp || bit0 || 6.66237682688e-44
Coq_Structures_OrdersEx_Z_as_DT_opp || bit0 || 6.66237682688e-44
Coq_Sets_Relations_1_Order_0 || finite_finite2 || 6.41758309897e-44
Coq_Sets_Partial_Order_Rel_of || set2 || 6.25913543693e-44
Coq_ZArith_Int_Z_as_Int_i2z || code_nat_of_natural || 5.97539499652e-44
Coq_NArith_BinNat_N_to_nat || rep_rat || 5.85716092213e-44
Coq_NArith_BinNat_N_to_nat || rep_int || 5.85716092213e-44
Coq_NArith_BinNat_N_to_nat || rep_real || 5.85716092213e-44
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || set2 || 5.51765880544e-44
Coq_Relations_Relation_Definitions_equivalence_0 || finite_finite2 || 5.51040783307e-44
Coq_Numbers_Cyclic_Int31_Int31_phi || suc_Rep || 5.47360892151e-44
Coq_NArith_BinNat_N_double || quotient_of || 4.11740079773e-44
Coq_Numbers_Natural_Binary_NBinary_N_double || code_int_of_integer || 3.72993833495e-44
Coq_Structures_OrdersEx_N_as_OT_double || code_int_of_integer || 3.72993833495e-44
Coq_Structures_OrdersEx_N_as_DT_double || code_int_of_integer || 3.72993833495e-44
Coq_PArith_BinPos_Pos_of_succ_nat || nat_of_nibble || 3.52048199231e-44
Coq_Bool_Bool_Is_true || code_nat_of_natural || 3.28276984462e-44
Coq_PArith_BinPos_Pos_to_nat || product_Rep_unit || 2.27149102682e-44
Coq_NArith_BinNat_N_to_nat || nat_of_char || 2.07066550119e-44
Coq_NArith_BinNat_N_to_nat || explode || 2.07066550119e-44
Coq_NArith_BinNat_N_to_nat || rep_Nat || 2.07066550119e-44
Coq_Arith_PeanoNat_Nat_b2n || code_nat_of_natural || 1.96457044864e-44
Coq_Numbers_Natural_Binary_NBinary_N_b2n || code_nat_of_natural || 1.96457044864e-44
Coq_NArith_BinNat_N_b2n || code_nat_of_natural || 1.96457044864e-44
Coq_Structures_OrdersEx_N_as_OT_b2n || code_nat_of_natural || 1.96457044864e-44
Coq_Structures_OrdersEx_N_as_DT_b2n || code_nat_of_natural || 1.96457044864e-44
Coq_Structures_OrdersEx_Nat_as_DT_b2n || code_nat_of_natural || 1.96457044864e-44
Coq_Structures_OrdersEx_Nat_as_OT_b2n || code_nat_of_natural || 1.96457044864e-44
Coq_Sets_Partial_Order_Carrier_of || set2 || 1.85962215594e-44
Coq_Numbers_Natural_Binary_NBinary_N_le || semilattice || 1.81244779583e-44
Coq_Structures_OrdersEx_N_as_OT_le || semilattice || 1.81244779583e-44
Coq_Structures_OrdersEx_N_as_DT_le || semilattice || 1.81244779583e-44
Coq_Numbers_Natural_Binary_NBinary_N_lt || lattic35693393ce_set || 1.81209340405e-44
Coq_Structures_OrdersEx_N_as_OT_lt || lattic35693393ce_set || 1.81209340405e-44
Coq_Structures_OrdersEx_N_as_DT_lt || lattic35693393ce_set || 1.81209340405e-44
Coq_Sets_Ensembles_Inhabited_0 || finite_finite2 || 1.70477330611e-44
Coq_NArith_BinNat_N_le || semilattice || 1.67524853454e-44
Coq_NArith_BinNat_N_lt || lattic35693393ce_set || 1.67095890174e-44
Coq_Sets_Ensembles_Singleton_0 || set2 || 1.55996658805e-44
Coq_Numbers_Integer_Binary_ZBinary_Z_b2z || code_nat_of_natural || 1.55887301476e-44
Coq_Structures_OrdersEx_Z_as_OT_b2z || code_nat_of_natural || 1.55887301476e-44
Coq_Structures_OrdersEx_Z_as_DT_b2z || code_nat_of_natural || 1.55887301476e-44
Coq_ZArith_BinInt_Z_b2z || code_nat_of_natural || 1.55887301476e-44
Coq_Sets_Finite_sets_Finite_0 || finite_finite2 || 1.32262631257e-44
Coq_ZArith_Int_Z_as_Int_i2z || code_int_of_integer || 1.27905692169e-44
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || product_Rep_unit || 1.23890326941e-44
Coq_Structures_OrdersEx_Z_as_OT_pred || product_Rep_unit || 1.23890326941e-44
Coq_Structures_OrdersEx_Z_as_DT_pred || product_Rep_unit || 1.23890326941e-44
Coq_PArith_BinPos_Pos_to_nat || rep_rat || 1.23890326941e-44
Coq_PArith_BinPos_Pos_to_nat || rep_int || 1.23890326941e-44
Coq_PArith_BinPos_Pos_to_nat || rep_real || 1.23890326941e-44
Coq_NArith_BinNat_N_of_nat || code_Suc || 1.03577116657e-44
Coq_Reals_Rdefinitions_Rlt || lattic35693393ce_set || 8.13902511435e-45
Coq_Reals_Rdefinitions_Rle || semilattice || 8.11638150584e-45
Coq_PArith_BinPos_Pos_of_succ_nat || implode str || 7.26342952152e-45
Coq_Bool_Bool_Is_true || code_int_of_integer || 7.25774211594e-45
Coq_NArith_BinNat_N_succ_double || code_nat_of_natural || 7.02562702685e-45
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || rep_rat || 6.84498042733e-45
Coq_Structures_OrdersEx_Z_as_OT_pred || rep_rat || 6.84498042733e-45
Coq_Structures_OrdersEx_Z_as_DT_pred || rep_rat || 6.84498042733e-45
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || rep_int || 6.84498042733e-45
Coq_Structures_OrdersEx_Z_as_OT_pred || rep_int || 6.84498042733e-45
Coq_Structures_OrdersEx_Z_as_DT_pred || rep_int || 6.84498042733e-45
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || rep_real || 6.84498042733e-45
Coq_Structures_OrdersEx_Z_as_OT_pred || rep_real || 6.84498042733e-45
Coq_Structures_OrdersEx_Z_as_DT_pred || rep_real || 6.84498042733e-45
Coq_ZArith_BinInt_Z_of_N || product_Rep_unit || 6.39452634489e-45
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || lattic35693393ce_set || 5.7997278394e-45
Coq_Structures_OrdersEx_Z_as_OT_lt || lattic35693393ce_set || 5.7997278394e-45
Coq_Structures_OrdersEx_Z_as_DT_lt || lattic35693393ce_set || 5.7997278394e-45
Coq_Numbers_Integer_Binary_ZBinary_Z_le || semilattice || 5.714357102e-45
Coq_Structures_OrdersEx_Z_as_OT_le || semilattice || 5.714357102e-45
Coq_Structures_OrdersEx_Z_as_DT_le || semilattice || 5.714357102e-45
Coq_Reals_Rtrigo_def_exp || code_int_of_integer || 5.64233828403e-45
Coq_Init_Datatypes_CompOpp || quotient_of || 5.62099386294e-45
Coq_PArith_POrderedType_Positive_as_DT_succ || quotient_of || 5.62099386294e-45
Coq_PArith_POrderedType_Positive_as_OT_succ || quotient_of || 5.62099386294e-45
Coq_Structures_OrdersEx_Positive_as_DT_succ || quotient_of || 5.62099386294e-45
Coq_Structures_OrdersEx_Positive_as_OT_succ || quotient_of || 5.62099386294e-45
Coq_PArith_BinPos_Pos_to_nat || nat_of_char || 4.62903952286e-45
Coq_PArith_BinPos_Pos_to_nat || explode || 4.62903952286e-45
Coq_PArith_BinPos_Pos_to_nat || rep_Nat || 4.62903952286e-45
Coq_Arith_PeanoNat_Nat_b2n || code_int_of_integer || 4.46329715216e-45
Coq_Numbers_Natural_Binary_NBinary_N_b2n || code_int_of_integer || 4.46329715216e-45
Coq_NArith_BinNat_N_b2n || code_int_of_integer || 4.46329715216e-45
Coq_Structures_OrdersEx_N_as_OT_b2n || code_int_of_integer || 4.46329715216e-45
Coq_Structures_OrdersEx_N_as_DT_b2n || code_int_of_integer || 4.46329715216e-45
Coq_Structures_OrdersEx_Nat_as_DT_b2n || code_int_of_integer || 4.46329715216e-45
Coq_Structures_OrdersEx_Nat_as_OT_b2n || code_int_of_integer || 4.46329715216e-45
Coq_NArith_BinNat_N_double || code_nat_of_natural || 4.2788689983e-45
Coq_Numbers_Integer_Binary_ZBinary_Z_b2z || code_int_of_integer || 3.58480546665e-45
Coq_Structures_OrdersEx_Z_as_OT_b2z || code_int_of_integer || 3.58480546665e-45
Coq_Structures_OrdersEx_Z_as_DT_b2z || code_int_of_integer || 3.58480546665e-45
Coq_ZArith_BinInt_Z_b2z || code_int_of_integer || 3.58480546665e-45
Coq_ZArith_BinInt_Z_of_N || rep_rat || 3.58218235233e-45
Coq_ZArith_BinInt_Z_of_N || rep_int || 3.58218235233e-45
Coq_ZArith_BinInt_Z_of_N || rep_real || 3.58218235233e-45
Coq_Reals_Raxioms_IZR || quotient_of || 3.32445375109e-45
Coq_PArith_BinPos_Pos_of_succ_nat || arctan || 3.22242018516e-45
Coq_ZArith_BinInt_Z_pred || product_Rep_unit || 3.07186392997e-45
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || nat_of_char || 2.61047834293e-45
Coq_Structures_OrdersEx_Z_as_OT_pred || nat_of_char || 2.61047834293e-45
Coq_Structures_OrdersEx_Z_as_DT_pred || nat_of_char || 2.61047834293e-45
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || explode || 2.61047834293e-45
Coq_Structures_OrdersEx_Z_as_OT_pred || explode || 2.61047834293e-45
Coq_Structures_OrdersEx_Z_as_DT_pred || explode || 2.61047834293e-45
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || rep_Nat || 2.61047834293e-45
Coq_Structures_OrdersEx_Z_as_OT_pred || rep_Nat || 2.61047834293e-45
Coq_Structures_OrdersEx_Z_as_DT_pred || rep_Nat || 2.61047834293e-45
Coq_Reals_Raxioms_INR || quotient_of || 2.43992295054e-45
Coq_NArith_BinNat_N_of_nat || nat_of_nibble || 2.31680453452e-45
Coq_PArith_BinPos_Pos_succ || quotient_of || 2.11168881413e-45
Coq_NArith_BinNat_N_to_nat || code_Suc || 2.02048293136e-45
Coq_Structures_OrdersEx_Z_as_OT_le || transitive_acyclic || 1.96403836169e-45
Coq_Structures_OrdersEx_Z_as_DT_le || transitive_acyclic || 1.96403836169e-45
Coq_Numbers_Integer_Binary_ZBinary_Z_le || transitive_acyclic || 1.96403836169e-45
Coq_ZArith_BinInt_Z_pred || rep_rat || 1.74685933164e-45
Coq_ZArith_BinInt_Z_pred || rep_int || 1.74685933164e-45
Coq_ZArith_BinInt_Z_pred || rep_real || 1.74685933164e-45
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || wf || 1.69902350222e-45
Coq_Structures_OrdersEx_Z_as_OT_lt || wf || 1.69902350222e-45
Coq_Structures_OrdersEx_Z_as_DT_lt || wf || 1.69902350222e-45
Coq_NArith_BinNat_N_succ_double || code_int_of_integer || 1.68342387411e-45
__constr_Coq_Numbers_BinNums_Z_0_3 || product_Rep_unit || 1.59033853239e-45
Coq_ZArith_BinInt_Z_of_N || nat_of_char || 1.39644449599e-45
Coq_ZArith_BinInt_Z_of_N || explode || 1.39644449599e-45
Coq_ZArith_BinInt_Z_of_N || rep_Nat || 1.39644449599e-45
Coq_ZArith_BinInt_Z_of_nat || product_Rep_unit || 1.16574652638e-45
Coq_NArith_BinNat_N_double || code_int_of_integer || 1.05127889853e-45
Coq_ZArith_BinInt_Z_lt || lattic35693393ce_set || 9.66410233581e-46
Coq_ZArith_BinInt_Z_le || semilattice || 9.60114599343e-46
__constr_Coq_Numbers_BinNums_Z_0_3 || rep_rat || 9.16372673141e-46
__constr_Coq_Numbers_BinNums_Z_0_3 || rep_int || 9.16372673141e-46
__constr_Coq_Numbers_BinNums_Z_0_3 || rep_real || 9.16372673141e-46
Coq_Reals_Rtrigo_calc_toRad || suc || 8.74554912612e-46
Coq_Numbers_Rational_BigQ_BigQ_BigQ_max || set2 || 8.42142978498e-46
Coq_PArith_BinPos_Pos_of_succ_nat || cnj || 8.14979874254e-46
Coq_Numbers_Rational_BigQ_BigQ_BigQ_le || finite_finite2 || 7.70190498955e-46
Coq_ZArith_BinInt_Z_pred || nat_of_char || 6.9739997794e-46
Coq_ZArith_BinInt_Z_pred || explode || 6.9739997794e-46
Coq_ZArith_BinInt_Z_pred || rep_Nat || 6.9739997794e-46
Coq_Init_Datatypes_CompOpp || code_nat_of_natural || 6.80659683109e-46
Coq_PArith_POrderedType_Positive_as_DT_succ || code_nat_of_natural || 6.80659683109e-46
Coq_PArith_POrderedType_Positive_as_OT_succ || code_nat_of_natural || 6.80659683109e-46
Coq_Structures_OrdersEx_Positive_as_DT_succ || code_nat_of_natural || 6.80659683109e-46
Coq_Structures_OrdersEx_Positive_as_OT_succ || code_nat_of_natural || 6.80659683109e-46
Coq_ZArith_BinInt_Z_of_nat || rep_rat || 6.75845360672e-46
Coq_ZArith_BinInt_Z_of_nat || rep_int || 6.75845360672e-46
Coq_ZArith_BinInt_Z_of_nat || rep_real || 6.75845360672e-46
Coq_Numbers_Cyclic_Int31_Int31_phi || quotient_of || 6.52951399505e-46
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || product_Rep_unit || 5.62989376967e-46
Coq_Structures_OrdersEx_Z_as_OT_succ || product_Rep_unit || 5.62989376967e-46
Coq_Structures_OrdersEx_Z_as_DT_succ || product_Rep_unit || 5.62989376967e-46
Coq_NArith_BinNat_N_of_nat || implode str || 5.51992967483e-46
Coq_PArith_BinPos_Pos_to_nat || code_Suc || 5.08223419659e-46
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || product_Rep_unit || 4.91500700816e-46
Coq_Structures_OrdersEx_Z_as_OT_opp || product_Rep_unit || 4.91500700816e-46
Coq_Structures_OrdersEx_Z_as_DT_opp || product_Rep_unit || 4.91500700816e-46
Coq_NArith_BinNat_N_to_nat || nat_of_nibble || 4.91500700816e-46
__constr_Coq_Numbers_BinNums_Z_0_3 || nat_of_char || 3.73590905933e-46
__constr_Coq_Numbers_BinNums_Z_0_3 || explode || 3.73590905933e-46
__constr_Coq_Numbers_BinNums_Z_0_3 || rep_Nat || 3.73590905933e-46
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || rep_rat || 3.31036664562e-46
Coq_Structures_OrdersEx_Z_as_OT_succ || rep_rat || 3.31036664562e-46
Coq_Structures_OrdersEx_Z_as_DT_succ || rep_rat || 3.31036664562e-46
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || rep_int || 3.31036664562e-46
Coq_Structures_OrdersEx_Z_as_OT_succ || rep_int || 3.31036664562e-46
Coq_Structures_OrdersEx_Z_as_DT_succ || rep_int || 3.31036664562e-46
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || rep_real || 3.31036664562e-46
Coq_Structures_OrdersEx_Z_as_OT_succ || rep_real || 3.31036664562e-46
Coq_Structures_OrdersEx_Z_as_DT_succ || rep_real || 3.31036664562e-46
Coq_PArith_POrderedType_Positive_as_DT_max || set2 || 3.23472794629e-46
Coq_PArith_POrderedType_Positive_as_OT_max || set2 || 3.23472794629e-46
Coq_Structures_OrdersEx_Positive_as_DT_max || set2 || 3.23472794629e-46
Coq_Structures_OrdersEx_Positive_as_OT_max || set2 || 3.23472794629e-46
Coq_Numbers_Natural_Binary_NBinary_N_succ || product_Rep_unit || 3.17363303073e-46
Coq_Structures_OrdersEx_N_as_OT_succ || product_Rep_unit || 3.17363303073e-46
Coq_Structures_OrdersEx_N_as_DT_succ || product_Rep_unit || 3.17363303073e-46
Coq_Reals_Raxioms_INR || code_nat_of_natural || 3.14135064572e-46
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || rep_rat || 2.89753282208e-46
Coq_Structures_OrdersEx_Z_as_OT_opp || rep_rat || 2.89753282208e-46
Coq_Structures_OrdersEx_Z_as_DT_opp || rep_rat || 2.89753282208e-46
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || rep_int || 2.89753282208e-46
Coq_Structures_OrdersEx_Z_as_OT_opp || rep_int || 2.89753282208e-46
Coq_Structures_OrdersEx_Z_as_DT_opp || rep_int || 2.89753282208e-46
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || rep_real || 2.89753282208e-46
Coq_Structures_OrdersEx_Z_as_OT_opp || rep_real || 2.89753282208e-46
Coq_Structures_OrdersEx_Z_as_DT_opp || rep_real || 2.89753282208e-46
Coq_PArith_POrderedType_Positive_as_DT_le || finite_finite2 || 2.84174503792e-46
Coq_PArith_POrderedType_Positive_as_OT_le || finite_finite2 || 2.84174503792e-46
Coq_Structures_OrdersEx_Positive_as_DT_le || finite_finite2 || 2.84174503792e-46
Coq_Structures_OrdersEx_Positive_as_OT_le || finite_finite2 || 2.84174503792e-46
Coq_ZArith_BinInt_Z_of_nat || nat_of_char || 2.78228656109e-46
Coq_ZArith_BinInt_Z_of_nat || explode || 2.78228656109e-46
Coq_ZArith_BinInt_Z_of_nat || rep_Nat || 2.78228656109e-46
Coq_PArith_BinPos_Pos_max || set2 || 2.77931762923e-46
Coq_PArith_BinPos_Pos_succ || code_nat_of_natural || 2.74731044362e-46
Coq_NArith_BinNat_N_of_nat || arctan || 2.63069560918e-46
Coq_NArith_BinNat_N_succ || product_Rep_unit || 2.59961010868e-46
Coq_PArith_BinPos_Pos_le || finite_finite2 || 2.45758796864e-46
Coq_Numbers_Natural_Binary_NBinary_N_succ || rep_rat || 1.8865208671e-46
Coq_Structures_OrdersEx_N_as_OT_succ || rep_rat || 1.8865208671e-46
Coq_Structures_OrdersEx_N_as_DT_succ || rep_rat || 1.8865208671e-46
Coq_Numbers_Natural_Binary_NBinary_N_succ || rep_int || 1.8865208671e-46
Coq_Structures_OrdersEx_N_as_OT_succ || rep_int || 1.8865208671e-46
Coq_Structures_OrdersEx_N_as_DT_succ || rep_int || 1.8865208671e-46
Coq_Numbers_Natural_Binary_NBinary_N_succ || rep_real || 1.8865208671e-46
Coq_Structures_OrdersEx_N_as_OT_succ || rep_real || 1.8865208671e-46
Coq_Structures_OrdersEx_N_as_DT_succ || rep_real || 1.8865208671e-46
Coq_Init_Datatypes_CompOpp || code_int_of_integer || 1.8287529955e-46
Coq_PArith_POrderedType_Positive_as_DT_succ || code_int_of_integer || 1.8287529955e-46
Coq_PArith_POrderedType_Positive_as_OT_succ || code_int_of_integer || 1.8287529955e-46
Coq_Structures_OrdersEx_Positive_as_DT_succ || code_int_of_integer || 1.8287529955e-46
Coq_Structures_OrdersEx_Positive_as_OT_succ || code_int_of_integer || 1.8287529955e-46
Coq_ZArith_BinInt_Z_of_N || code_Suc || 1.67866141005e-46
Coq_NArith_BinNat_N_succ || rep_rat || 1.55109507167e-46
Coq_NArith_BinNat_N_succ || rep_int || 1.55109507167e-46
Coq_NArith_BinNat_N_succ || rep_real || 1.55109507167e-46
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || nat_of_char || 1.39375745174e-46
Coq_Structures_OrdersEx_Z_as_OT_succ || nat_of_char || 1.39375745174e-46
Coq_Structures_OrdersEx_Z_as_DT_succ || nat_of_char || 1.39375745174e-46
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || explode || 1.39375745174e-46
Coq_Structures_OrdersEx_Z_as_OT_succ || explode || 1.39375745174e-46
Coq_Structures_OrdersEx_Z_as_DT_succ || explode || 1.39375745174e-46
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || rep_Nat || 1.39375745174e-46
Coq_Structures_OrdersEx_Z_as_OT_succ || rep_Nat || 1.39375745174e-46
Coq_Structures_OrdersEx_Z_as_DT_succ || rep_Nat || 1.39375745174e-46
Coq_ZArith_BinInt_Z_succ || product_Rep_unit || 1.26458103422e-46
Coq_NArith_BinNat_N_to_nat || implode str || 1.26458103422e-46
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || nat_of_char || 1.22499820867e-46
Coq_Structures_OrdersEx_Z_as_OT_opp || nat_of_char || 1.22499820867e-46
Coq_Structures_OrdersEx_Z_as_DT_opp || nat_of_char || 1.22499820867e-46
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || explode || 1.22499820867e-46
Coq_Structures_OrdersEx_Z_as_OT_opp || explode || 1.22499820867e-46
Coq_Structures_OrdersEx_Z_as_DT_opp || explode || 1.22499820867e-46
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || rep_Nat || 1.22499820867e-46
Coq_Structures_OrdersEx_Z_as_OT_opp || rep_Nat || 1.22499820867e-46
Coq_Structures_OrdersEx_Z_as_DT_opp || rep_Nat || 1.22499820867e-46
Coq_Reals_Raxioms_IZR || code_int_of_integer || 1.15023358996e-46
Coq_PArith_BinPos_Pos_of_succ_nat || sqrt || 9.40249836019e-47
Coq_Numbers_Cyclic_Int31_Int31_phi || code_nat_of_natural || 9.23096182519e-47
Coq_Reals_Raxioms_INR || code_int_of_integer || 8.74947353066e-47
Coq_Numbers_Natural_Binary_NBinary_N_succ || nat_of_char || 8.08168605261e-47
Coq_Structures_OrdersEx_N_as_OT_succ || nat_of_char || 8.08168605261e-47
Coq_Structures_OrdersEx_N_as_DT_succ || nat_of_char || 8.08168605261e-47
Coq_Numbers_Natural_Binary_NBinary_N_succ || explode || 8.08168605261e-47
Coq_Structures_OrdersEx_N_as_OT_succ || explode || 8.08168605261e-47
Coq_Structures_OrdersEx_N_as_DT_succ || explode || 8.08168605261e-47
Coq_Numbers_Natural_Binary_NBinary_N_succ || rep_Nat || 8.08168605261e-47
Coq_Structures_OrdersEx_N_as_OT_succ || rep_Nat || 8.08168605261e-47
Coq_Structures_OrdersEx_N_as_DT_succ || rep_Nat || 8.08168605261e-47
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || nat_of_nibble || 7.99209836303e-47
Coq_Structures_OrdersEx_Z_as_OT_pred || nat_of_nibble || 7.99209836303e-47
Coq_Structures_OrdersEx_Z_as_DT_pred || nat_of_nibble || 7.99209836303e-47
Coq_PArith_BinPos_Pos_succ || code_int_of_integer || 7.69915806205e-47
Coq_ZArith_BinInt_Z_succ || rep_rat || 7.64642980909e-47
Coq_ZArith_BinInt_Z_succ || rep_int || 7.64642980909e-47
Coq_ZArith_BinInt_Z_succ || rep_real || 7.64642980909e-47
Coq_NArith_BinNat_N_of_nat || cnj || 7.4808977175e-47
Coq_NArith_BinNat_N_succ || nat_of_char || 6.68448108805e-47
Coq_NArith_BinNat_N_succ || explode || 6.68448108805e-47
Coq_NArith_BinNat_N_succ || rep_Nat || 6.68448108805e-47
Coq_NArith_BinNat_N_to_nat || arctan || 6.26250369898e-47
__constr_Coq_Numbers_BinNums_Z_0_3 || code_Suc || 4.94340202737e-47
Coq_ZArith_BinInt_Z_of_N || nat_of_nibble || 4.60345963618e-47
Coq_Numbers_Integer_BigZ_BigZ_BigZ_max || set2 || 4.26735376051e-47
Coq_ZArith_BinInt_Z_opp || product_Rep_unit || 4.03750304713e-47
Coq_Numbers_Integer_Binary_ZBinary_Z_max || set2 || 3.93319735211e-47
Coq_Structures_OrdersEx_Z_as_OT_max || set2 || 3.93319735211e-47
Coq_Structures_OrdersEx_Z_as_DT_max || set2 || 3.93319735211e-47
Coq_ZArith_BinInt_Z_of_nat || code_Suc || 3.75939690259e-47
Coq_PArith_BinPos_Pos_to_nat || implode str || 3.62183220639e-47
Coq_ZArith_BinInt_Z_succ || nat_of_char || 3.36591440809e-47
Coq_ZArith_BinInt_Z_succ || explode || 3.36591440809e-47
Coq_ZArith_BinInt_Z_succ || rep_Nat || 3.36591440809e-47
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || finite_finite2 || 3.31797513197e-47
Coq_Numbers_Natural_Binary_NBinary_N_succ_double || suc || 3.08952604637e-47
Coq_Structures_OrdersEx_N_as_OT_succ_double || suc || 3.08952604637e-47
Coq_Structures_OrdersEx_N_as_DT_succ_double || suc || 3.08952604637e-47
Coq_Numbers_Integer_Binary_ZBinary_Z_le || finite_finite2 || 3.06142350776e-47
Coq_Structures_OrdersEx_Z_as_OT_le || finite_finite2 || 3.06142350776e-47
Coq_Structures_OrdersEx_Z_as_DT_le || finite_finite2 || 3.06142350776e-47
Coq_Numbers_Cyclic_Int31_Int31_phi || code_int_of_integer || 2.71684175921e-47
Coq_ZArith_BinInt_Z_opp || rep_rat || 2.49174997214e-47
Coq_ZArith_BinInt_Z_pred || nat_of_nibble || 2.49174997214e-47
Coq_ZArith_BinInt_Z_opp || rep_int || 2.49174997214e-47
Coq_ZArith_BinInt_Z_opp || rep_real || 2.49174997214e-47
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || implode str || 2.23947997127e-47
Coq_Structures_OrdersEx_Z_as_OT_pred || implode str || 2.23947997127e-47
Coq_Structures_OrdersEx_Z_as_DT_pred || implode str || 2.23947997127e-47
Coq_NArith_BinNat_N_to_nat || cnj || 1.89675611965e-47
Coq_PArith_BinPos_Pos_to_nat || arctan || 1.85030983717e-47
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || code_Suc || 1.75267735924e-47
Coq_Structures_OrdersEx_Z_as_OT_opp || code_Suc || 1.75267735924e-47
Coq_Structures_OrdersEx_Z_as_DT_opp || code_Suc || 1.75267735924e-47
Coq_Numbers_Natural_Binary_NBinary_N_double || suc || 1.52456308767e-47
Coq_Structures_OrdersEx_N_as_OT_double || suc || 1.52456308767e-47
Coq_Structures_OrdersEx_N_as_DT_double || suc || 1.52456308767e-47
Coq_ZArith_BinInt_Z_max || set2 || 1.43712841752e-47
__constr_Coq_Numbers_BinNums_Z_0_3 || nat_of_nibble || 1.43296674918e-47
Coq_ZArith_BinInt_Z_of_N || implode str || 1.3225086321e-47
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || arctan || 1.15746969397e-47
Coq_Structures_OrdersEx_Z_as_OT_pred || arctan || 1.15746969397e-47
Coq_Structures_OrdersEx_Z_as_DT_pred || arctan || 1.15746969397e-47
Coq_ZArith_BinInt_Z_opp || nat_of_char || 1.13322901682e-47
Coq_ZArith_BinInt_Z_opp || explode || 1.13322901682e-47
Coq_ZArith_BinInt_Z_opp || rep_Nat || 1.13322901682e-47
Coq_ZArith_BinInt_Z_of_nat || nat_of_nibble || 1.10304031515e-47
Coq_ZArith_BinInt_Z_le || finite_finite2 || 1.10281943813e-47
Coq_NArith_BinNat_N_of_nat || sqrt || 1.02757738966e-47
Coq_ZArith_BinInt_Z_pred || implode str || 7.35590496534e-48
Coq_ZArith_BinInt_Z_of_N || arctan || 6.92142825334e-48
Coq_ZArith_Int_Z_as_Int_i2z || suc || 6.79872129488e-48
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || nat_of_nibble || 5.96392258649e-48
Coq_Structures_OrdersEx_Z_as_OT_succ || nat_of_nibble || 5.96392258649e-48
Coq_Structures_OrdersEx_Z_as_DT_succ || nat_of_nibble || 5.96392258649e-48
Coq_PArith_BinPos_Pos_to_nat || cnj || 5.89886557e-48
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || nat_of_nibble || 5.31609633733e-48
Coq_Structures_OrdersEx_Z_as_OT_opp || nat_of_nibble || 5.31609633733e-48
Coq_Structures_OrdersEx_Z_as_DT_opp || nat_of_nibble || 5.31609633733e-48
Coq_Bool_Bool_Is_true || suc || 4.42034036333e-48
__constr_Coq_Numbers_BinNums_Z_0_3 || implode str || 4.33324081466e-48
Coq_ZArith_BinInt_Z_pred || arctan || 3.90275720315e-48
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || cnj || 3.76148221068e-48
Coq_Structures_OrdersEx_Z_as_OT_pred || cnj || 3.76148221068e-48
Coq_Structures_OrdersEx_Z_as_DT_pred || cnj || 3.76148221068e-48
Coq_Numbers_Natural_Binary_NBinary_N_succ || nat_of_nibble || 3.66853401383e-48
Coq_Structures_OrdersEx_N_as_OT_succ || nat_of_nibble || 3.66853401383e-48
Coq_Structures_OrdersEx_N_as_DT_succ || nat_of_nibble || 3.66853401383e-48
Coq_Reals_Rtrigo_def_exp || suc || 3.64833826775e-48
Coq_ZArith_BinInt_Z_of_nat || implode str || 3.37319255302e-48
Coq_NArith_BinNat_N_succ || nat_of_nibble || 3.09662696672e-48
Coq_Arith_PeanoNat_Nat_b2n || suc || 3.0501759564e-48
Coq_Numbers_Natural_Binary_NBinary_N_b2n || suc || 3.0501759564e-48
Coq_NArith_BinNat_N_b2n || suc || 3.0501759564e-48
Coq_Structures_OrdersEx_N_as_OT_b2n || suc || 3.0501759564e-48
Coq_Structures_OrdersEx_N_as_DT_b2n || suc || 3.0501759564e-48
Coq_Structures_OrdersEx_Nat_as_DT_b2n || suc || 3.0501759564e-48
Coq_Structures_OrdersEx_Nat_as_OT_b2n || suc || 3.0501759564e-48
Coq_NArith_BinNat_N_to_nat || sqrt || 2.86320963885e-48
Coq_ZArith_BinInt_Z_b2z || suc || 2.57910901994e-48
Coq_Numbers_Integer_Binary_ZBinary_Z_b2z || suc || 2.57910901994e-48
Coq_Structures_OrdersEx_Z_as_OT_b2z || suc || 2.57910901994e-48
Coq_Structures_OrdersEx_Z_as_DT_b2z || suc || 2.57910901994e-48
__constr_Coq_Numbers_BinNums_Z_0_3 || arctan || 2.32703462619e-48
Coq_ZArith_BinInt_Z_of_N || cnj || 2.29625329518e-48
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || implode str || 1.87182196715e-48
Coq_Structures_OrdersEx_Z_as_OT_succ || implode str || 1.87182196715e-48
Coq_Structures_OrdersEx_Z_as_DT_succ || implode str || 1.87182196715e-48
Coq_ZArith_BinInt_Z_of_nat || arctan || 1.82173247148e-48
Coq_ZArith_BinInt_Z_succ || nat_of_nibble || 1.67652166969e-48
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || implode str || 1.67652166969e-48
Coq_Structures_OrdersEx_Z_as_OT_opp || implode str || 1.67652166969e-48
Coq_Structures_OrdersEx_Z_as_DT_opp || implode str || 1.67652166969e-48
Coq_NArith_BinNat_N_succ_double || suc || 1.44281521489e-48
Coq_ZArith_BinInt_Z_pred || cnj || 1.32437810971e-48
Coq_Numbers_Natural_Binary_NBinary_N_succ || implode str || 1.17483140651e-48
Coq_Structures_OrdersEx_N_as_OT_succ || implode str || 1.17483140651e-48
Coq_Structures_OrdersEx_N_as_DT_succ || implode str || 1.17483140651e-48
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || arctan || 1.02422059454e-48
Coq_Structures_OrdersEx_Z_as_OT_succ || arctan || 1.02422059454e-48
Coq_Structures_OrdersEx_Z_as_DT_succ || arctan || 1.02422059454e-48
Coq_NArith_BinNat_N_double || suc || 1.00298395503e-48
Coq_NArith_BinNat_N_succ || implode str || 9.98595762166e-49
Coq_PArith_BinPos_Pos_to_nat || sqrt || 9.617572711e-49
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || arctan || 9.19578762552e-49
Coq_Structures_OrdersEx_Z_as_OT_opp || arctan || 9.19578762552e-49
Coq_Structures_OrdersEx_Z_as_DT_opp || arctan || 9.19578762552e-49
__constr_Coq_Numbers_BinNums_Z_0_3 || cnj || 8.05635879676e-49
Coq_Numbers_Natural_Binary_NBinary_N_succ || arctan || 6.49409655822e-49
Coq_Structures_OrdersEx_N_as_OT_succ || arctan || 6.49409655822e-49
Coq_Structures_OrdersEx_N_as_DT_succ || arctan || 6.49409655822e-49
Coq_ZArith_BinInt_Z_of_nat || cnj || 6.36624887312e-49
Coq_Numbers_Integer_Binary_ZBinary_Z_pred || sqrt || 6.31250146269e-49
Coq_Structures_OrdersEx_Z_as_OT_pred || sqrt || 6.31250146269e-49
Coq_Structures_OrdersEx_Z_as_DT_pred || sqrt || 6.31250146269e-49
Coq_ZArith_BinInt_Z_opp || nat_of_nibble || 6.31250146269e-49
Coq_ZArith_BinInt_Z_succ || implode str || 5.54230232329e-49
Coq_NArith_BinNat_N_succ || arctan || 5.53931758384e-49
Coq_ZArith_BinInt_Z_of_N || sqrt || 3.97564203134e-49
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || cnj || 3.65776277993e-49
Coq_Structures_OrdersEx_Z_as_OT_succ || cnj || 3.65776277993e-49
Coq_Structures_OrdersEx_Z_as_DT_succ || cnj || 3.65776277993e-49
Coq_ZArith_BinInt_Z_succ || arctan || 3.11316854652e-49
Coq_Init_Datatypes_CompOpp || suc || 2.56710061043e-49
Coq_ZArith_BinInt_Z_pred || sqrt || 2.37268599906e-49
Coq_Numbers_Natural_Binary_NBinary_N_succ || cnj || 2.35865344521e-49
Coq_Structures_OrdersEx_N_as_OT_succ || cnj || 2.35865344521e-49
Coq_Structures_OrdersEx_N_as_DT_succ || cnj || 2.35865344521e-49
Coq_ZArith_BinInt_Z_opp || implode str || 2.16859924721e-49
Coq_NArith_BinNat_N_succ || cnj || 2.02362696148e-49
Coq_Reals_Raxioms_IZR || suc || 1.78306836735e-49
__constr_Coq_Numbers_BinNums_Z_0_3 || sqrt || 1.48777037041e-49
Coq_Reals_Raxioms_INR || suc || 1.43721882513e-49
Coq_ZArith_BinInt_Z_opp || arctan || 1.2420516386e-49
Coq_ZArith_BinInt_Z_of_nat || sqrt || 1.19245334091e-49
Coq_ZArith_BinInt_Z_succ || cnj || 1.16124399038e-49
__constr_Coq_Numbers_BinNums_Z_0_2 || product_Rep_unit || 1.14727175117e-49
__constr_Coq_Numbers_BinNums_Z_0_2 || rep_rat || 7.77173826437e-50
__constr_Coq_Numbers_BinNums_Z_0_2 || rep_int || 7.77173826437e-50
__constr_Coq_Numbers_BinNums_Z_0_2 || rep_real || 7.77173826437e-50
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || sqrt || 7.08075437461e-50
Coq_Structures_OrdersEx_Z_as_OT_succ || sqrt || 7.08075437461e-50
Coq_Structures_OrdersEx_Z_as_DT_succ || sqrt || 7.08075437461e-50
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || sqrt || 6.4219418226e-50
Coq_Structures_OrdersEx_Z_as_OT_opp || sqrt || 6.4219418226e-50
Coq_Structures_OrdersEx_Z_as_DT_opp || sqrt || 6.4219418226e-50
Coq_Numbers_Cyclic_Int31_Int31_phi || suc || 5.68807376708e-50
Coq_Numbers_Natural_Binary_NBinary_N_succ || sqrt || 4.68451449116e-50
Coq_Structures_OrdersEx_N_as_OT_succ || sqrt || 4.68451449116e-50
Coq_Structures_OrdersEx_N_as_DT_succ || sqrt || 4.68451449116e-50
__constr_Coq_Numbers_BinNums_Z_0_2 || nat_of_char || 4.10375619578e-50
__constr_Coq_Numbers_BinNums_Z_0_2 || explode || 4.10375619578e-50
__constr_Coq_Numbers_BinNums_Z_0_2 || rep_Nat || 4.10375619578e-50
Coq_NArith_BinNat_N_succ || sqrt || 4.0548994275e-50
Coq_ZArith_BinInt_Z_succ || sqrt || 2.40192283766e-50
Coq_ZArith_BinInt_Z_opp || sqrt || 1.03995622286e-50
__constr_Coq_Numbers_BinNums_Z_0_2 || code_Suc || 9.52488934754e-51
__constr_Coq_Numbers_BinNums_Z_0_2 || implode str || 1.58039716626e-51
__constr_Coq_Numbers_BinNums_Z_0_2 || arctan || 9.92370590588e-52
__constr_Coq_Numbers_BinNums_Z_0_2 || cnj || 4.45910672555e-52
__constr_Coq_Numbers_BinNums_Z_0_2 || sqrt || 1.22808858344e-52
