__constr_Coq_Numbers_BinNums_Z_0_1 || (0. F_Complex) (0. Z_2) NAT 0c || 0.952305243493
$ Coq_Numbers_BinNums_Z_0 || $ real || 0.956156198024
$ Coq_Init_Datatypes_nat_0 || $true || 0.905315600438
Coq_Init_Peano_le_0 || c= || 0.874278918619
Coq_ZArith_BinInt_Z_le || <= || 0.871181314338
(Coq_ZArith_BinInt_Z_le __constr_Coq_Numbers_BinNums_Z_0_1) || (<= NAT) || 0.800017260108
__constr_Coq_Init_Datatypes_nat_0_1 || op0 {} || 0.79674998331
$ Coq_Numbers_BinNums_N_0 || $ natural || 0.778575730376
Coq_ZArith_BinInt_Z_mul || * || 0.73955319679
$true || $ QC-alphabet || 0.698458713409
$ (Coq_Init_Datatypes_list_0 $V_$true) || $ ((Element3 (QC-WFF $V_QC-alphabet)) (CQC-WFF $V_QC-alphabet)) || 0.688139717014
Coq_Init_Peano_lt || c< || 0.686781327352
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || ((=0 omega) REAL) || 0.674247960296
$ Coq_Numbers_Integer_BigZ_BigZ_BigZ_t || $ (& Function-like (& ((quasi_total omega) REAL) (Element (bool (([:..:] omega) REAL))))) || 0.829143554269
Coq_Sorting_Permutation_Permutation_0 || <==>1 || 0.621116137891
(Coq_Structures_OrdersEx_N_as_OT_le __constr_Coq_Numbers_BinNums_N_0_1) || (<= 1) || 0.586329097953
Coq_ZArith_BinInt_Z_sub || - || 0.581982957641
Coq_PArith_BinPos_Pos_of_nat || meet0 || 0.576428375188
Coq_Numbers_Integer_BigZ_BigZ_BigZ_opp || ((-7 omega) REAL) || 0.556509446229
__constr_Coq_Init_Datatypes_nat_0_2 || {..}1 || 0.555624806077
Coq_ZArith_BinInt_Z_opp || -0 || 0.550460579387
Coq_ZArith_BinInt_Z_abs || *1 || 0.575364765647
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sub || (((-13 omega) REAL) REAL) || 0.546264218272
Coq_Numbers_Integer_BigZ_BigZ_BigZ_add || (((+17 omega) REAL) REAL) || 0.607342974786
Coq_Numbers_Natural_BigN_BigN_BigN_eq || ((=1 omega) COMPLEX) || 0.539231378475
$ Coq_Numbers_Natural_BigN_BigN_BigN_t || $ (& Function-like (& ((quasi_total omega) COMPLEX) (Element (bool (([:..:] omega) COMPLEX))))) || 0.777166321104
__constr_Coq_Init_Datatypes_list_0_1 || VERUM || 0.533545431234
$ $V_$true || $ ((Element3 (QC-variables $V_QC-alphabet)) (bound_QC-variables $V_QC-alphabet)) || 0.519287978154
__constr_Coq_Init_Datatypes_list_0_2 || All1 || 0.58486133197
Coq_Lists_List_lel || |-|0 || 0.612433915386
$ Coq_Numbers_BinNums_positive_0 || $ ordinal || 0.515145347356
$ (=> $V_$true (=> $V_$true $o)) || $ (Element (bool (CQC-WFF $V_QC-alphabet))) || 0.511862877142
Coq_Numbers_Natural_BigN_BigN_BigN_mul || (((#slash##quote# omega) COMPLEX) COMPLEX) || 0.481248916095
Coq_Numbers_Natural_BigN_BigN_BigN_shiftl || ((((#hash#)5 omega) COMPLEX) COMPLEX) || 0.457057702497
Coq_Numbers_Integer_BigZ_BigZ_BigZ_mul || ((((#hash#) omega) REAL) REAL) || 0.456163792959
Coq_Structures_OrdersEx_Nat_as_DT_add || #slash##bslash#0 || 0.447042206755
__constr_Coq_Numbers_BinNums_Z_0_2 || TOP-REAL || 0.427593872792
__constr_Coq_Numbers_BinNums_positive_0_3 || EdgeSelector 2 (({..}2 k5_ordinal1) 1) || 0.536114395336
Coq_ZArith_BinInt_Z_add || + || 0.426843694929
Coq_Numbers_Integer_Binary_ZBinary_Z_opp || 0. || 0.413588332416
__constr_Coq_Init_Datatypes_bool_0_2 || (1. Z_2) 0_NN VertexSelector 1 (1_ F_Complex) 1r (elementary_tree NAT) ({..}1 {}) || 0.405768210267
Coq_Lists_List_ForallPairs || |=7 || 0.403863231393
Coq_Numbers_Natural_BigN_BigN_BigN_div2 || ((-11 omega) COMPLEX) || 0.399157061337
Coq_Init_Nat_sub || #bslash#3 || 0.394275876756
Coq_Init_Nat_add || #bslash##slash#0 || 0.377366467663
Coq_Reals_Rpow_def_pow || |1 || 0.376699095106
$ Coq_Reals_Rdefinitions_R || $ (& Relation-like (& Function-like complex-valued)) || 0.384793780665
Coq_Reals_Rdefinitions_Ropp || -3 || 0.406976344689
Coq_Lists_List_ForallOrdPairs_0 || |-2 || 0.374956706473
Coq_ZArith_BinInt_Z_to_nat || min || 0.366265005193
Coq_ZArith_Zsqrt_compat_Zsqrt_plain || ^20 || 0.35474312126
$equals3 || ComplRelStr || 0.352832371914
Coq_Numbers_BinNums_positive_0 || (Necklace 4) || 0.602830724921
Coq_Classes_RelationClasses_Equivalence_0 || are_isomorphic || 0.395250855223
$ (Coq_Numbers_Natural_BigN_BigN_BigN_dom_t (__constr_Coq_Init_Datatypes_nat_0_2 $V_Coq_Init_Datatypes_nat_0)) || $ (Element (TOL $V_$true)) || 0.347526087566
Coq_Numbers_Natural_BigN_BigN_BigN_pred_t || id$1 || 0.461726263343
Coq_Sets_Ensembles_Included || is_proper_subformula_of1 || 0.345209050954
$ (Coq_Sets_Ensembles_Ensemble $V_$true) || $ (Element (QC-WFF $V_QC-alphabet)) || 0.417641827901
Coq_Sets_Ensembles_Union_0 || \or\0 || 0.438081857941
Coq_ZArith_BinInt_Z_lcm || -\1 || 0.344361554307
$ (= $V_Coq_Init_Datatypes_nat_0 $V_Coq_Init_Datatypes_nat_0) || $ (Element (carrier\ ((c1Cat* $V_$true) $V_$true))) || 0.334370829692
$ ((Coq_Init_Peano_le_0 $V_Coq_Init_Datatypes_nat_0) $V_Coq_Init_Datatypes_nat_0) || $ (Element (carrier\ ((c1Cat $V_$true) $V_$true))) || 0.334370829692
Coq_Numbers_Natural_BigN_BigN_BigN_succ_t || cod7 || 0.317987601753
$ (Coq_Bool_Bvector_Bvector $V_Coq_Init_Datatypes_nat_0) || $ (Element (CSp $V_$true)) || 0.314804914491
Coq_ZArith_Zdigits_binary_value || id$0 || 0.329969810347
__constr_Coq_Init_Datatypes_bool_0_1 || ({..}1 -infty) || 0.309448198453
Coq_Init_Datatypes_orb || #bslash#0 || 0.364684355059
Coq_Lists_List_rev || SepVar || 0.29734185796
Coq_Numbers_Natural_BigN_BigN_BigN_lxor || (((+15 omega) COMPLEX) COMPLEX) || 0.295882253518
Coq_Reals_Rdefinitions_Rmult || #slash#20 || 0.294056275244
$ ((Coq_Init_Datatypes_prod_0 Coq_Numbers_BinNums_positive_0) $V_$true) || $ (Element (QC-symbols $V_QC-alphabet)) || 0.287625710339
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || <=2 || 0.368876932291
Coq_FSets_FMapPositive_PositiveMap_ME_ltk || < || 0.339215244377
Coq_PArith_BinPos_Pos_le || c=0 || 0.286592462801
Coq_Reals_Rdefinitions_Rminus || -5 || 0.283498835142
Coq_Structures_OrdersEx_Nat_as_DT_mul || #bslash#+#bslash# || 0.273265764507
Coq_ZArith_Zdigits_Z_to_binary || cod6 || 0.258874879404
Coq_PArith_BinPos_Pos_succ || succ1 || 0.253654261748
Coq_ZArith_BinInt_Z_leb || . || 0.247983430484
Coq_Reals_Rbasic_fun_Rabs || abs7 || 0.247195595421
Coq_Numbers_Natural_BigN_BigN_BigN_shiftr || (((#hash#)4 omega) COMPLEX) || 0.244931734539
Coq_Numbers_Natural_BigN_BigN_BigN_one || (-0 1r) || 0.269587761363
Coq_Numbers_Natural_BigN_BigN_BigN_succ || (*\ omega) || 0.244625037656
Coq_Numbers_Natural_BigN_BigN_BigN_le || ((=0 omega) COMPLEX) || 0.352120212468
Coq_Lists_List_incl || |-4 || 0.239268677211
Coq_Numbers_Natural_Binary_NBinary_N_divide || divides || 0.238626966468
Coq_Numbers_Natural_Binary_NBinary_N_lcm || lcm0 || 0.255372952347
Coq_ZArith_BinInt_Z_quot || #slash# || 0.233257162626
Coq_Structures_OrdersEx_Nat_as_DT_sqrt || proj3_4 || 0.227116212372
__constr_Coq_Numbers_BinNums_N_0_1 || (0. SCMPDS) (0. SCM+FSA) (0. SCM) omega || 0.217175271276
Coq_PArith_BinPos_Pos_mul || -Veblen0 || 0.190816190847
Coq_Arith_PeanoNat_Nat_pow || PFuncs || 0.187937014449
Coq_Sets_Ensembles_Empty_set_0 || VERUM0 || 0.183211538307
Coq_Sets_Ensembles_Strict_Included || is_immediate_constituent_of1 || 0.241753056344
Coq_Init_Datatypes_length || index0 || 0.180366820661
Coq_Numbers_Natural_Binary_NBinary_N_succ || dl. || 0.179029729926
(__constr_Coq_Numbers_BinNums_Z_0_2 __constr_Coq_Numbers_BinNums_positive_0_3) || sinh1 || 0.178221421978
Coq_PArith_BinPos_Pos_ge || is_cofinal_with || 0.17158382132
Coq_Numbers_Natural_BigN_BigN_BigN_lcm || (((-12 omega) COMPLEX) COMPLEX) || 0.167229551458
$ (Coq_Vectors_Fin_t_0 $V_Coq_Init_Datatypes_nat_0) || $ (& (total $V_$true) (& symmetric1 (& transitive3 (Element (bool (([:..:] $V_$true) $V_$true)))))) || 0.166790079076
__constr_Coq_Vectors_Fin_t_0_2 || Class0 || 0.18747671748
Coq_Init_Datatypes_app || <=> || 0.161061774852
Coq_Sorting_Sorted_StronglySorted_0 || |- || 0.158969026742
Coq_Numbers_Integer_Binary_ZBinary_Z_lnot || cpx2euc || 0.157995911132
Coq_Numbers_Natural_BigN_BigN_BigN_sqrt || ((#quote#3 omega) COMPLEX) || 0.157137604054
Coq_Arith_PeanoNat_Nat_testbit || Funcs || 0.155272185993
Coq_Arith_PeanoNat_Nat_log2_up || NOT1 || 0.154324930371
Coq_Numbers_Integer_Binary_ZBinary_Z_even || ([....]5 -infty) || 0.146226180476
Coq_Numbers_Integer_Binary_ZBinary_Z_odd || (]....]0 -infty) || 0.178089002324
Coq_Structures_OrdersEx_Z_as_OT_even || ([....[0 -infty) || 0.144952243045
Coq_Structures_OrdersEx_Z_as_OT_odd || (]....[1 -infty) || 0.176793585458
Coq_ZArith_BinInt_Z_quot2 || (. signum) || 0.141864517089
Coq_Arith_PeanoNat_Nat_ones || <*..*>4 || 0.141738832342
Coq_Arith_PeanoNat_Nat_lnot || |--0 || 0.154799203088
Coq_romega_ReflOmegaCore_ZOmega_negate_contradict || SubstitutionSet || 0.141685176241
Coq_ZArith_Zcomplements_Zlength || QuantNbr || 0.137777910128
Coq_Reals_RIneq_Rsqr || ^21 || 0.13621718766
Coq_Arith_PeanoNat_Nat_square || 1TopSp || 0.135744876115
Coq_PArith_BinPos_Pos_lt || are_equipotent || 0.133945778657
Coq_Reals_Rdefinitions_Rdiv || #slash##quote#2 || 0.132906692652
Coq_Arith_PeanoNat_Nat_mul || INTERSECTION0 || 0.132836163813
Coq_Numbers_Integer_BigZ_BigZ_BigZ_min || (((#slash##quote#0 omega) REAL) REAL) || 0.132718318759
Coq_Structures_OrdersEx_Nat_as_OT_mul || UNION0 || 0.131782339841
Coq_PArith_BinPos_Pos_max || +^1 || 0.130238786747
Coq_Numbers_Integer_Binary_ZBinary_Z_succ || euc2cpx || 0.126658225043
Coq_ZArith_BinInt_Z_sgn || sgn || 0.126064433459
Coq_Structures_OrdersEx_Nat_as_DT_log2_up || Web || 0.124221859127
Coq_PArith_BinPos_Pos_to_nat || UNIVERSE || 0.122707041006
(Coq_Numbers_Natural_Binary_NBinary_N_lt __constr_Coq_Numbers_BinNums_N_0_1) || (<= 4) || 0.121315795207
(Coq_Numbers_Natural_Binary_NBinary_N_lt (__constr_Coq_Numbers_BinNums_N_0_2 __constr_Coq_Numbers_BinNums_positive_0_3)) || (<= 2) || 0.190901391151
Coq_Numbers_Natural_Binary_NBinary_N_log2_up || Radix || 0.149598353783
Coq_Numbers_Natural_BigN_BigN_BigN_log2_up || Partial_Sums1 || 0.120748435349
Coq_ZArith_Znumtheory_prime_0 || (<= ((* 2) P_t)) || 0.117425662265
Coq_Init_Datatypes_CompOpp || Rev0 || 0.116687552216
Coq_ZArith_Int_Z_as_Int_i2z || (. cosh1) || 0.116432484305
Coq_Structures_OrdersEx_Nat_as_DT_sqrt_up || proj1_4 || 0.115182385089
Coq_ZArith_BinInt_Z_sqrt_up || max+1 || 0.115182385089
Coq_Structures_OrdersEx_Nat_as_OT_log2_up || product#quote# || 0.113927808294
$ (=> Coq_Init_Datatypes_nat_0 $o) || $ Relation-like || 0.113860333048
Coq_Arith_Between_between_0 || are_divergent_wrt || 0.130312128104
Coq_ZArith_BinInt_Z_of_nat || SymGroup || 0.113433918152
Coq_ZArith_Znat_neq || r3_tarski || 0.13775508473
Coq_ZArith_BinInt_Zne || are_isomorphic3 || 0.131643717976
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sgn || ((abs0 omega) REAL) || 0.107831293948
Coq_Arith_PeanoNat_Nat_sqrt || \not\11 || 0.106846747012
Coq_Numbers_Natural_Binary_NBinary_N_gcd || gcd || 0.106305900085
Coq_NArith_Ndigits_eqf || are_isomorphic2 || 0.103473572176
Coq_PArith_BinPos_Pos_testbit_nat || RelIncl0 || 0.132486925544
$ Coq_Init_Datatypes_bool_0 || $ integer || 0.103428024674
Coq_ZArith_Zpower_two_p || ((#slash#. COMPLEX) cos_C) || 0.0963101715976
(Coq_ZArith_BinInt_Z_pow (__constr_Coq_Numbers_BinNums_Z_0_2 (__constr_Coq_Numbers_BinNums_positive_0_2 __constr_Coq_Numbers_BinNums_positive_0_3))) || (. sin1) || 0.0970031393999
Coq_romega_ReflOmegaCore_ZOmega_valid_hyps || (are_equipotent {}) || 0.0960616297602
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lor || (#hash##hash#) || 0.0946102471199
Coq_Numbers_Integer_BigZ_BigZ_BigZ_land || (+7 REAL) || 0.128477557956
Coq_Numbers_Integer_BigZ_BigZ_BigZ_minus_one || ((#slash# P_t) 6) || 0.0931180602175
Coq_NArith_BinNat_N_double || Goto || 0.0868054724803
Coq_Numbers_Integer_Binary_ZBinary_Z_b2z || scf || 0.0846510842339
Coq_Numbers_Integer_Binary_ZBinary_Z_testbit || (.1 REAL) || 0.0927895792038
Coq_Arith_PeanoNat_Nat_lcm || [:..:] || 0.0822432285211
Coq_Numbers_Integer_Binary_ZBinary_Z_double || ((#slash#. COMPLEX) sin_C) || 0.0821623967656
Coq_NArith_BinNat_N_odd || succ0 || 0.080502276491
__constr_Coq_Numbers_BinNums_Z_0_3 || (#slash# (^20 3)) || 0.0755999340773
Coq_Structures_OrdersEx_Z_as_OT_double || ((#slash#. COMPLEX) sinh_C) || 0.0752794175798
Coq_Structures_OrdersEx_Z_as_DT_double || ((#slash#. COMPLEX) cosh_C) || 0.0741990435551
Coq_QArith_QArith_base_Qle || is_subformula_of1 || 0.0737775125046
$ Coq_QArith_QArith_base_Q_0 || $ (& ZF-formula-like (FinSequence omega)) || 0.210506202623
Coq_QArith_QArith_base_Qlt || is_immediate_constituent_of0 || 0.240443656695
Coq_Structures_OrdersEx_N_as_OT_divide || is_expressible_by || 0.0735175512449
Coq_Structures_OrdersEx_N_as_OT_lcm || NEG_MOD || 0.123200788283
Coq_Numbers_Integer_BigZ_BigZ_BigZ_to_Z || cos || 0.0734312480944
Coq_Numbers_Natural_Binary_NBinary_N_sub || mod3 || 0.0728427701304
(Coq_Structures_OrdersEx_Z_as_OT_mul (__constr_Coq_Numbers_BinNums_Z_0_2 (__constr_Coq_Numbers_BinNums_positive_0_2 __constr_Coq_Numbers_BinNums_positive_0_3))) || (. sinh0) || 0.071392979973
Coq_QArith_Qround_Qceiling || len || 0.0711792252207
(Coq_Structures_OrdersEx_Z_as_DT_mul (__constr_Coq_Numbers_BinNums_Z_0_2 (__constr_Coq_Numbers_BinNums_positive_0_2 __constr_Coq_Numbers_BinNums_positive_0_3))) || (. sinh1) || 0.0697139223372
Coq_Numbers_Natural_Binary_NBinary_N_lt_alt || exp || 0.0660511887276
Coq_Numbers_Natural_Binary_NBinary_N_eqf || are_equipotent0 || 0.0622134018854
Coq_Numbers_Natural_Binary_NBinary_N_testbit || Seg || 0.0662787664108
Coq_Structures_OrdersEx_Nat_as_DT_compare || <*..*>5 || 0.0619545271211
Coq_Structures_OrdersEx_N_as_OT_lt_alt || frac0 || 0.0612250555679
(Coq_Init_Nat_mul (__constr_Coq_Init_Datatypes_nat_0_2 (__constr_Coq_Init_Datatypes_nat_0_2 __constr_Coq_Init_Datatypes_nat_0_1))) || *0 || 0.0611261735858
Coq_Structures_OrdersEx_N_as_OT_lt || div || 0.0607219136962
Coq_Arith_PeanoNat_Nat_divide || meets || 0.0599608136597
(Coq_Numbers_Integer_Binary_ZBinary_Z_mul (__constr_Coq_Numbers_BinNums_Z_0_2 (__constr_Coq_Numbers_BinNums_positive_0_2 __constr_Coq_Numbers_BinNums_positive_0_3))) || (. sin0) || 0.0573198086948
(Coq_ZArith_BinInt_Z_add (__constr_Coq_Numbers_BinNums_Z_0_2 __constr_Coq_Numbers_BinNums_positive_0_3)) || exp1 || 0.0513879570157
Coq_ZArith_BinInt_Z_succ || P_cos || 0.0548457994993
Coq_NArith_BinNat_N_lcm || lcm || 0.0513879125178
Coq_Structures_OrdersEx_N_as_DT_lt_alt || div0 || 0.0513661763772
Coq_Structures_OrdersEx_N_as_DT_lt || mod || 0.0583616020418
Coq_Numbers_Natural_Binary_NBinary_N_lt || |^ || 0.0510320035136
Coq_Numbers_Cyclic_Int31_Int31_phi_inv || (]....[ -infty) || 0.046788149563
Coq_Numbers_Cyclic_Int31_Int31_phi || (#bslash#0 REAL) || 0.0652821328769
((Coq_ZArith_BinInt_Z_pow (__constr_Coq_Numbers_BinNums_Z_0_2 (__constr_Coq_Numbers_BinNums_positive_0_2 __constr_Coq_Numbers_BinNums_positive_0_3))) (Coq_ZArith_BinInt_Z_of_nat Coq_Numbers_Cyclic_Int31_Int31_size)) || +infty || 0.0749835043312
Coq_ZArith_BinInt_Z_modulo || [....[ || 0.0860650597044
Coq_NArith_BinNat_N_lt || are_relative_prime || 0.0415971066019
$ Coq_Init_Datatypes_comparison_0 || $ (& Relation-like (& Function-like FinSequence-like)) || 0.0402826815281
Coq_Structures_OrdersEx_N_as_DT_lcm || gcd0 || 0.0387312331492
