$true || $ (& Function-like (Element (bool (([:..:] REAL) REAL)))) || 0.243341788737
Coq_Reals_Rdefinitions_R0 || *101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || 0.217259828098
$true || $ l1_absred_0 || 0.214825831879
$ ((Coq_Init_Datatypes_prod_0 Coq_Numbers_BinNums_positive_0) $V_$true) || $ (Element (carrier $V_l1_absred_0)) || 0.253662682918
$ (Coq_Sets_Uniset_uniset_0 $V_$true) || $ (Element (carrier $V_l1_absred_0)) || 0.219028695899
$ (Coq_Sets_Ensembles_Ensemble $V_$true) || $ (Element (carrier $V_l1_absred_0)) || 0.225520807933
$true || $ QC-alphabet || 0.216641882829
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || ((=3 omega) REAL) || 0.210361846742
$ Coq_Numbers_Integer_BigZ_BigZ_BigZ_t || $ (& Function-like (& ((quasi_total omega) REAL) (Element (bool (([:..:] omega) REAL))))) || 0.230878790071
__constr_Coq_Numbers_BinNums_N_0_1 || *101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || 0.208003764437
__constr_Coq_Init_Datatypes_nat_0_1 || *101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || 0.209820277991
Coq_Sets_Ensembles_Strict_Included || r4_absred_0 || 0.207301662068
(Coq_Init_Peano_le_0 __constr_Coq_Init_Datatypes_nat_0_1) || (<= 1) || 0.206097575212
__constr_Coq_Numbers_BinNums_Z_0_1 || *101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || 0.203827451715
$ (Coq_Relations_Relation_Definitions_relation $V_$true) || $ (Element (bool (([:..:] (^omega $V_$true)) (^omega $V_$true)))) || 0.203529233429
$ $V_$true || $ (Element (^omega $V_$true)) || 0.238780278425
__constr_Coq_Init_Datatypes_nat_0_1 || op0 k5_ordinal1 {} || 0.199053820674
__constr_Coq_Numbers_BinNums_N_0_1 || op0 k5_ordinal1 {} || 0.199139184735
Coq_Reals_Rtrigo_def_cos || cos || 0.198544638837
Coq_Reals_Rtrigo_def_sin || sin || 0.223512252217
$ Coq_Reals_Rdefinitions_R || $ real || 0.197986670487
Coq_Reals_RIneq_Rsqr || min || 0.215746882437
Coq_Reals_R_sqrt_sqrt || ^20 || 0.215921591959
(Coq_Reals_Rdefinitions_Rle Coq_Reals_Rdefinitions_R0) || (<= NAT) || 0.218632391702
Coq_Reals_Rtrigo1_tan || tan || 0.203626821377
Coq_Reals_Rdefinitions_Rminus || - || 0.200752645232
((Coq_Reals_Rdefinitions_Rdiv Coq_Reals_Rtrigo1_PI) ((Coq_Reals_Rdefinitions_Rplus Coq_Reals_Rdefinitions_R1) Coq_Reals_Rdefinitions_R1)) || ((#slash# P_t) 2) || 0.211220434924
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || P_t || 0.198441649728
$true || $ (~ empty0) || 0.197403539622
Coq_Lists_List_list_prod || |:..:|5 || 0.218657070376
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || ((=4 omega) COMPLEX) || 0.195745403504
$ Coq_Numbers_Integer_BigZ_BigZ_BigZ_t || $ (& Function-like (& ((quasi_total omega) COMPLEX) (Element (bool (([:..:] omega) COMPLEX))))) || 0.227422297858
(Coq_Reals_Rdefinitions_Rlt Coq_Reals_Rdefinitions_R0) || (<= NAT) || 0.194961225104
Coq_Numbers_Natural_BigN_BigN_BigN_eq || ((=3 omega) REAL) || 0.194691391861
$ Coq_Numbers_Natural_BigN_BigN_BigN_t || $ (& Function-like (& ((quasi_total omega) REAL) (Element (bool (([:..:] omega) REAL))))) || 0.231863318838
Coq_Init_Datatypes_xorb || *47 || 0.19755967369
$true || $true || 0.193244581575
Coq_Numbers_Natural_BigN_BigN_BigN_zero || *101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || 0.193732759413
Coq_Numbers_Integer_BigZ_BigZ_BigZ_zero || *101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || 0.194823500642
$ ($V_(=> Coq_Numbers_BinNums_N_0 $true) __constr_Coq_Numbers_BinNums_N_0_1) || $ (SimplicialComplexStr $V_$true) || 0.191240157429
__constr_Coq_Numbers_BinNums_Z_0_1 || op0 k5_ordinal1 {} || 0.191203102936
__constr_Coq_Init_Datatypes_bool_0_1 || op0 k5_ordinal1 {} || 0.193267347846
__constr_Coq_Init_Datatypes_bool_0_1 || *101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || 0.195529591248
__constr_Coq_Numbers_BinNums_positive_0_2 || TOP-REAL || 0.222077303736
Coq_Init_Datatypes_orb || .14 || 0.20932136786
__constr_Coq_Numbers_BinNums_positive_0_3 || a_Term EdgeSelector 2 (({..}3 k5_ordinal1) 1) || 0.201848926133
Coq_FSets_FMapPositive_PositiveMap_is_empty || k1_nat_6 || 0.19614878777
__constr_Coq_Init_Datatypes_bool_0_2 || *101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || 0.191873385952
__constr_Coq_Init_Datatypes_bool_0_2 || op0 k5_ordinal1 {} || 0.196373590571
__constr_Coq_Init_Datatypes_bool_0_2 || one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || 0.197448078669
Coq_Setoids_Setoid_Setoid_Theory || is_strictly_convex_on || 0.190433588441
Coq_Reals_Rdefinitions_Rle || <= || 0.187376482881
Coq_Numbers_Natural_BigN_BigN_BigN_eq || ((=4 omega) COMPLEX) || 0.187230767304
$ Coq_Numbers_Natural_BigN_BigN_BigN_t || $ (& Function-like (& ((quasi_total omega) COMPLEX) (Element (bool (([:..:] omega) COMPLEX))))) || 0.227544620613
$ (=> $V_$true (=> $V_$true $o)) || $true || 0.186892401966
Coq_Setoids_Setoid_Setoid_Theory || is_strongly_quasiconvex_on || 0.195313557535
$ Coq_Numbers_Natural_BigN_BigN_BigN_t || $ real || 0.186576189063
$ Coq_Numbers_Integer_BigZ_BigZ_BigZ_t || $ real || 0.18930157181
__constr_Coq_Init_Datatypes_bool_0_1 || one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || 0.185389512393
Coq_Bool_Zerob_zerob || (halt0 (InstructionsF SCM+FSA)) || 0.18867439484
__constr_Coq_Numbers_BinNums_N_0_2 || <*> || 0.184541045008
$true || $ (& Function-like (Element (bool (([:..:] COMPLEX) COMPLEX)))) || 0.184142298853
CASE || op0 k5_ordinal1 {} || 0.184030625294
(Coq_Init_Peano_le_0 __constr_Coq_Init_Datatypes_nat_0_1) || (<= NAT) || 0.182859559654
(Coq_ZArith_BinInt_Z_le __constr_Coq_Numbers_BinNums_Z_0_1) || (<= NAT) || 0.183379942618
(Coq_Init_Peano_lt __constr_Coq_Init_Datatypes_nat_0_1) || (<= NAT) || 0.18512102859
Coq_Setoids_Setoid_Setoid_Theory || is_differentiable_on6 || 0.182627365421
Coq_Reals_Rdefinitions_R1 || one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || 0.181651302272
Coq_Reals_Rtrigo_def_cos || sin || 0.182337504654
Coq_Reals_Rtrigo_def_sin || cos || 0.19268094974
__constr_Coq_Numbers_BinNums_positive_0_3 || (0. SCMPDS) (0. SCM+FSA) (0. SCM) omega || 0.181091211327
__constr_Coq_Numbers_BinNums_Z_0_2 || <*> || 0.189618804867
__constr_Coq_Numbers_BinNums_positive_0_3 || (carrier R^1) +infty0 REAL || 0.189777185917
__constr_Coq_Numbers_BinNums_positive_0_3 || COMPLEX || 0.184818841993
Coq_FSets_FSetPositive_PositiveSet_mem || k1_nat_6 || 0.180212263403
$ Coq_Reals_Rdefinitions_R || $ ext-real || 0.179552440964
Coq_Reals_Rdefinitions_Rminus || -60 || 0.18528044845
$ Coq_Reals_Rdefinitions_R || $ complex || 0.18099328118
Coq_Reals_Rdefinitions_Rlt || <= || 0.179690888089
$ (Coq_Init_Datatypes_list_0 $V_$true) || $ ((Element3 (QC-WFF $V_QC-alphabet)) (CQC-WFF $V_QC-alphabet)) || 0.178714206414
Coq_Sorting_Permutation_Permutation_0 || <==>1 || 0.189031441931
__constr_Coq_Init_Datatypes_list_0_2 || All1 || 0.191499044313
Coq_Lists_List_lel || |-|0 || 0.179696482826
Coq_QArith_QArith_base_Qeq || ((=4 omega) COMPLEX) || 0.17852300062
$ Coq_QArith_QArith_base_Q_0 || $ (& Function-like (& ((quasi_total omega) COMPLEX) (Element (bool (([:..:] omega) COMPLEX))))) || 0.234196564568
Coq_QArith_QArith_base_Qpower || (^#bslash# COMPLEX) || 0.232669460011
Coq_QArith_QArith_base_Qpower_positive || (^#bslash# COMPLEX) || 0.213096349757
Coq_QArith_QArith_base_Qinv || ((#quote#3 omega) COMPLEX) || 0.210853833631
$ $V_$true || $ ((Element3 (QC-variables $V_QC-alphabet)) (bound_QC-variables $V_QC-alphabet)) || 0.177919103698
__constr_Coq_Numbers_BinNums_Z_0_2 || TOP-REAL || 0.177754248242
$ Coq_Numbers_BinNums_N_0 || $ real || 0.177211073239
__constr_Coq_Init_Datatypes_bool_0_1 || ({..}2 -infty0) || 0.201475816178
$ Coq_Numbers_BinNums_Z_0 || $ real || 0.177216227945
$ Coq_Init_Datatypes_nat_0 || $ real || 0.181487169839
$ (=> $V_$true (=> $V_$true $o)) || $ real || 0.186470336211
Coq_Setoids_Setoid_Setoid_Theory || is_right_differentiable_in || 0.186827079533
Coq_Setoids_Setoid_Setoid_Theory || is_left_differentiable_in || 0.191239558036
Coq_Init_Datatypes_orb || #bslash#0 || 0.177679272947
Coq_Setoids_Setoid_Setoid_Theory || is_differentiable_in || 0.177450609178
Coq_Setoids_Setoid_Setoid_Theory || is_convex_on || 0.176327240084
Coq_Setoids_Setoid_Setoid_Theory || partially_orders || 0.180452300884
$true || $ Relation-like || 0.180084622433
__constr_Coq_Init_Datatypes_nat_0_1 || one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || 0.176216681808
__constr_Coq_Init_Datatypes_nat_0_1 || (carrier R^1) +infty0 REAL || 0.178938064503
$ (Coq_Relations_Relation_Definitions_relation $V_$true) || $true || 0.175734422027
Coq_Classes_RelationClasses_Transitive || is_strictly_quasiconvex_on || 0.175437143841
Coq_Vectors_VectorDef_shiftin || Monom || 0.174886270281
Coq_Vectors_VectorDef_last || coefficient || 0.222308514983
$ ((Coq_Vectors_VectorDef_t_0 $V_$true) $V_Coq_Init_Datatypes_nat_0) || $ (& Relation-like (& (-defined $V_$true) (& Function-like (& (total $V_$true) (& natural-valued finite-support))))) || 0.190302968484
Coq_Setoids_Setoid_Setoid_Theory || is_metric_of || 0.174125892488
$ (=> $V_$true (=> $V_$true $o)) || $ (& Function-like (& ((quasi_total (([:..:] $V_$true) $V_$true)) REAL) (Element (bool (([:..:] (([:..:] $V_$true) $V_$true)) REAL))))) || 0.203973785228
(__constr_Coq_Numbers_BinNums_Z_0_2 __constr_Coq_Numbers_BinNums_positive_0_3) || one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || 0.174070039711
(Coq_ZArith_BinInt_Z_lt __constr_Coq_Numbers_BinNums_Z_0_1) || (<= NAT) || 0.173873754437
__constr_Coq_Init_Datatypes_nat_0_2 || <*> || 0.173564626865
Coq_Setoids_Setoid_Setoid_Theory || is_differentiable_in0 || 0.173353063349
Coq_ZArith_BinInt_Z_le || <= || 0.173256982631
Coq_Classes_RelationClasses_Symmetric || is_strictly_quasiconvex_on || 0.172608656526
Coq_Classes_RelationClasses_Reflexive || is_strictly_quasiconvex_on || 0.174896687386
Coq_Sets_Relations_1_facts_Complement || bounded_metric || 0.172099855336
__constr_Coq_Numbers_BinNums_N_0_1 || (carrier R^1) +infty0 REAL || 0.17209893701
__constr_Coq_Numbers_BinNums_N_0_1 || one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || 0.17204877168
__constr_Coq_Numbers_BinNums_Z_0_1 || one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || 0.172945977733
__constr_Coq_Numbers_BinNums_positive_0_3 || SourceSelector 3 || 0.172609803146
__constr_Coq_Numbers_BinNums_positive_0_2 || seq_n^ || 0.203306011279
__constr_Coq_Numbers_BinNums_N_0_1 || (seq_n^ 2) || 0.175067360604
__constr_Coq_Numbers_BinNums_N_0_2 || Big_Oh || 0.172796210985
$ Coq_Numbers_BinNums_positive_0 || $ real || 0.170967544854
__constr_Coq_Numbers_BinNums_positive_0_3 || *101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || 0.179848055599
Coq_Numbers_Cyclic_ZModulo_ZModulo_zmod_ops || Fermat || 0.187856104945
$ (Coq_Relations_Relation_Definitions_relation $V_$true) || $ real || 0.173540927811
$ (Coq_Relations_Relation_Definitions_relation $V_$true) || $ (& (~ empty0) (& (compl-closed $V_(~ empty0)) (& (sigma-multiplicative $V_(~ empty0)) (Element (bool (bool $V_(~ empty0))))))) || 0.172146442154
$ ((Coq_Classes_RelationClasses_Equivalence_0 $V_$true) $V_(Coq_Relations_Relation_Definitions_relation $V_$true)) || $ (& Function-like (& ((quasi_total $V_(& (~ empty0) (& (compl-closed $V_(~ empty0)) (& (sigma-multiplicative $V_(~ empty0)) (Element (bool (bool $V_(~ empty0)))))))) 0) (& zeroed (& nonnegative (& ((sigma-additive $V_(~ empty0)) $V_(& (~ empty0) (& (compl-closed $V_(~ empty0)) (& (sigma-multiplicative $V_(~ empty0)) (Element (bool (bool $V_(~ empty0)))))))) (Element (bool (([:..:] $V_(& (~ empty0) (& (compl-closed $V_(~ empty0)) (& (sigma-multiplicative $V_(~ empty0)) (Element (bool (bool $V_(~ empty0)))))))) 0)))))))) || 0.198904275438
$ (! $V_$V_$true, (! $V_$V_$true, ((Coq_Init_Specif_sumbool_0 (($V_(Coq_Relations_Relation_Definitions_relation $V_$true) $V_$V_$true) $V_$V_$true)) (~ (($V_(Coq_Relations_Relation_Definitions_relation $V_$true) $V_$V_$true) $V_$V_$true))))) || $ (& Function-like (& ((quasi_total $V_(& (~ empty0) (& (compl-closed $V_(~ empty0)) (& (sigma-multiplicative $V_(~ empty0)) (Element (bool (bool $V_(~ empty0)))))))) 0) (& zeroed (& nonnegative (& ((sigma-additive $V_(~ empty0)) $V_(& (~ empty0) (& (compl-closed $V_(~ empty0)) (& (sigma-multiplicative $V_(~ empty0)) (Element (bool (bool $V_(~ empty0)))))))) (Element (bool (([:..:] $V_(& (~ empty0) (& (compl-closed $V_(~ empty0)) (& (sigma-multiplicative $V_(~ empty0)) (Element (bool (bool $V_(~ empty0)))))))) 0)))))))) || 0.196748813235
Coq_Classes_Equivalence_equiv || r1_lpspacc1 || 0.19068893769
Coq_Sorting_PermutSetoid_permutation || r1_lpspacc1 || 0.192746368948
Coq_Classes_Equivalence_equiv || a.e.= || 0.188471767323
Coq_Sorting_PermutSetoid_permutation || a.e.= || 0.189570761557
Coq_Lists_List_firstn || |19 || 0.170948210979
Coq_Init_Nat_min || (|3 omega) || 0.207007898241
$ Coq_Numbers_BinNums_N_0 || $ natural || 0.170361525175
(__constr_Coq_Numbers_BinNums_N_0_2 __constr_Coq_Numbers_BinNums_positive_0_3) || one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || 0.176598752733
$ Coq_Numbers_BinNums_N_0 || $ (& ordinal natural) || 0.169836430243
$ Coq_Numbers_BinNums_positive_0 || $ natural || 0.169651277719
$ Coq_Init_Datatypes_nat_0 || $ natural || 0.172448500356
Coq_ZArith_Zgcd_alt_Zgcdn || dist_min0 || 0.181301726352
$ Coq_Numbers_Natural_BigN_BigN_BigN_t || $ natural || 0.170763971173
Coq_Numbers_Natural_BigN_BigN_BigN_View_t_0 || (<= 1) || 0.181775569923
$ Coq_Numbers_BinNums_Z_0 || $ natural || 0.172734408408
Coq_Numbers_Cyclic_ZModulo_ZModulo_compare || Sum20 || 0.182858922897
$ Coq_Reals_Rdefinitions_R || $ natural || 0.173150339038
Coq_Reals_Rgeom_xr || GenFib || 0.195183405779
$ (Coq_Relations_Relation_Definitions_relation $V_$true) || $ (Element (carrier $V_l1_absred_0)) || 0.169148501482
__constr_Coq_Numbers_BinNums_positive_0_3 || op0 k5_ordinal1 {} || 0.168649009442
Coq_Sets_Ensembles_Strict_Included || r8_absred_0 || 0.167684200917
Coq_FSets_FMapPositive_PositiveMap_xfind || Taylor || 0.1670425899
Coq_FSets_FMapPositive_PositiveMap_find || Maclaurin || 0.16743043614
Coq_ZArith_Zdigits_bit_value || SD_Add_Carry || 0.166726437441
(Coq_Reals_Rdefinitions_Rminus Coq_Reals_Rdefinitions_R1) || (+ 1) || 0.166691502444
Coq_Reals_Rtrigo_def_sin || (. sinh0) || 0.170184308859
Coq_Reals_Rtrigo_def_cos || (. sinh1) || 0.1727758109
(Coq_Reals_Rdefinitions_Rmult ((Coq_Reals_Rdefinitions_Rplus Coq_Reals_Rdefinitions_R1) Coq_Reals_Rdefinitions_R1)) || (* 2) || 0.171519154599
__constr_Coq_Numbers_Rational_BigQ_BigQ_BigQ_t__0_2 || Cage || 0.166221477627
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || proj4_4 || 0.17751262846
Coq_QArith_QArith_base_Qeq || c= || 0.175533254277
$ Coq_Numbers_Rational_BigQ_BigQ_BigQ_t || $ (& Relation-like Function-like) || 0.176345428637
$ Coq_Numbers_Integer_BigZ_BigZ_BigZ_t || $ (& (compact0 (TOP-REAL 2)) (& (~ horizontal) (& (~ vertical) (Element (bool (carrier (TOP-REAL 2))))))) || 0.165543039786
Coq_Numbers_Rational_BigQ_BigQ_BigQ_norm_denum || Lower_Seq || 0.173536820784
Coq_Numbers_Rational_BigQ_BigQ_BigQ_norm_denum || Upper_Seq || 0.177817494072
Coq_Numbers_Rational_BigQ_BigQ_BigQ_norm || Lower_Seq || 0.165885792961
Coq_Numbers_Rational_BigQ_BigQ_BigQ_norm || Upper_Seq || 0.169008594509
(Coq_Structures_OrdersEx_N_as_OT_le __constr_Coq_Numbers_BinNums_N_0_1) || (<= 1) || 0.165355985285
(Coq_Structures_OrdersEx_N_as_DT_le __constr_Coq_Numbers_BinNums_N_0_1) || (<= 1) || 0.1668265849
(Coq_Numbers_Natural_Binary_NBinary_N_le __constr_Coq_Numbers_BinNums_N_0_1) || (<= 1) || 0.168375243932
(Coq_NArith_BinNat_N_le __constr_Coq_Numbers_BinNums_N_0_1) || (<= 1) || 0.170005103032
$ Coq_Numbers_BinNums_N_0 || $ ordinal || 0.165077569839
$ Coq_Numbers_BinNums_N_0 || $ integer || 0.165956801137
$ Coq_Numbers_BinNums_N_0 || $ ext-real || 0.166707079063
$ Coq_Numbers_BinNums_Z_0 || $ ext-real || 0.16888460034
$ Coq_Init_Datatypes_nat_0 || $ ext-real || 0.171664042064
$ Coq_Numbers_BinNums_Z_0 || $ integer || 0.166651785413
$ Coq_Init_Datatypes_nat_0 || $ integer || 0.168626570155
$ Coq_Numbers_BinNums_N_0 || $ complex || 0.166487554392
$ Coq_Numbers_BinNums_Z_0 || $ complex || 0.167740267502
__constr_Coq_Numbers_BinNums_Z_0_3 || (- ((* 2) P_t)) || 0.183394343304
$ Coq_Init_Datatypes_nat_0 || $ complex || 0.169253219741
Coq_Init_Datatypes_CompOpp || +17 || 0.169850645559
$ Coq_Numbers_BinNums_N_0 || $true || 0.165965843873
Coq_Logic_Decidable_decidable || (are_equipotent {}) || 0.166919493486
Coq_Logic_Decidable_decidable || (<= NAT) || 0.168565021784
(Coq_Structures_OrdersEx_Z_as_OT_le __constr_Coq_Numbers_BinNums_Z_0_1) || (<= NAT) || 0.16531667744
(Coq_Numbers_Integer_Binary_ZBinary_Z_le __constr_Coq_Numbers_BinNums_Z_0_1) || (<= NAT) || 0.166910320946
(Coq_Structures_OrdersEx_Z_as_DT_le __constr_Coq_Numbers_BinNums_Z_0_1) || (<= NAT) || 0.168605926957
Coq_ZArith_BinInt_Z_modulo || div0 || 0.165222195222
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || ==>* || 0.164892114046
(__constr_Coq_Init_Datatypes_nat_0_2 __constr_Coq_Init_Datatypes_nat_0_1) || one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || 0.164572341969
(Coq_Init_Peano_lt (__constr_Coq_Init_Datatypes_nat_0_2 __constr_Coq_Init_Datatypes_nat_0_1)) || (<= 2) || 0.176580914748
Coq_Sets_Uniset_incl || r12_absred_0 || 0.164525887395
Coq_Sets_Uniset_incl || r13_absred_0 || 0.167954539347
Coq_Sets_Uniset_incl || r11_absred_0 || 0.165881872886
Coq_Sets_Uniset_incl || r7_absred_0 || 0.167655314855
$ Coq_QArith_QArith_base_Q_0 || $true || 0.164204445956
$ Coq_Numbers_BinNums_positive_0 || $true || 0.165888270396
$ Coq_Numbers_Natural_BigN_BigN_BigN_t || $true || 0.167427624951
$ Coq_Numbers_Integer_BigZ_BigZ_BigZ_t || $true || 0.165699816166
$ Coq_Init_Datatypes_nat_0 || $true || 0.166719866397
Coq_PArith_BinPos_Pos_of_nat || meet || 0.182779723407
Coq_Logic_FinFun_bInjective || SpaceMetr || 0.170935147831
Coq_PArith_BinPos_Pos_lor || mlt0 || 0.166531461785
$ Coq_Numbers_BinNums_Z_0 || $true || 0.165864579866
Coq_Init_Datatypes_CompOpp || Rev0 || 0.174482775542
Coq_Init_Datatypes_CompOpp || #quote#0 || 0.172184896678
__constr_Coq_Init_Datatypes_comparison_0_2 || *101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || 0.169248954224
Coq_Numbers_Natural_BigN_BigN_BigN_mk_t_w || SDSub2INT || 0.164023173575
Coq_Relations_Relation_Operators_clos_refl_trans_0 || ==>* || 0.163853191141
(Coq_NArith_BinNat_N_le __constr_Coq_Numbers_BinNums_N_0_1) || (<= NAT) || 0.163841820016
(Coq_Structures_OrdersEx_N_as_OT_le __constr_Coq_Numbers_BinNums_N_0_1) || (<= NAT) || 0.165254577409
(Coq_Structures_OrdersEx_N_as_DT_le __constr_Coq_Numbers_BinNums_N_0_1) || (<= NAT) || 0.166780897349
(Coq_Numbers_Natural_Binary_NBinary_N_le __constr_Coq_Numbers_BinNums_N_0_1) || (<= NAT) || 0.16838310532
(Coq_Numbers_Integer_BigZ_BigZ_BigZ_le Coq_Numbers_Integer_BigZ_BigZ_BigZ_zero) || (<= NAT) || 0.165363004689
(Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt Coq_Numbers_Integer_BigZ_BigZ_BigZ_zero) || (<= NAT) || 0.167178944205
(Coq_Numbers_Integer_Binary_ZBinary_Z_lt __constr_Coq_Numbers_BinNums_Z_0_1) || (<= NAT) || 0.165398789547
(Coq_Structures_OrdersEx_Z_as_DT_lt __constr_Coq_Numbers_BinNums_Z_0_1) || (<= NAT) || 0.167679208687
(Coq_Structures_OrdersEx_Z_as_OT_lt __constr_Coq_Numbers_BinNums_Z_0_1) || (<= NAT) || 0.170156679002
(Coq_Numbers_Natural_Binary_NBinary_N_lt __constr_Coq_Numbers_BinNums_N_0_1) || (<= NAT) || 0.168054308072
(Coq_Structures_OrdersEx_N_as_OT_lt __constr_Coq_Numbers_BinNums_N_0_1) || (<= NAT) || 0.170411237384
(Coq_Structures_OrdersEx_N_as_DT_lt __constr_Coq_Numbers_BinNums_N_0_1) || (<= NAT) || 0.172954664971
(Coq_NArith_BinNat_N_lt __constr_Coq_Numbers_BinNums_N_0_1) || (<= NAT) || 0.175668986378
(Coq_Numbers_Natural_BigN_BigN_BigN_lt Coq_Numbers_Natural_BigN_BigN_BigN_zero) || (<= NAT) || 0.163767376476
__constr_Coq_Init_Datatypes_comparison_0_2 || op0 k5_ordinal1 {} || 0.162831938605
$ Coq_Numbers_BinNums_positive_0 || $ complex || 0.162783001706
Coq_QArith_QArith_base_Qpower_positive || #slash##slash##slash#2 || 0.170672985569
$ Coq_QArith_QArith_base_Q_0 || $ complex-membered || 0.172475376992
Coq_QArith_QArith_base_Qpower_positive || **7 || 0.178477156178
$ Coq_Numbers_BinNums_N_0 || $ (& Relation-like (& Function-like (& real-valued FinSequence-like))) || 0.162600884024
__constr_Coq_Numbers_BinNums_positive_0_3 || one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || 0.165727666128
Coq_Reals_Rdefinitions_R0 || one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || 0.163043555932
Coq_Sets_Uniset_incl || r10_absred_0 || 0.162492799832
Coq_FSets_FMapPositive_PositiveMap_ME_ltk || r8_absred_0 || 0.162461466846
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || ==>* || 0.162395943599
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || ==>* || 0.165410222546
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || -->. || 0.164109406374
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || createGraph || 0.162372357925
Coq_Relations_Relation_Operators_clos_refl_sym_trans_0 || ==>. || 0.166589496034
(Coq_Numbers_Natural_BigN_BigN_BigN_le Coq_Numbers_Natural_BigN_BigN_BigN_zero) || (<= 1) || 0.162277856469
(Coq_Numbers_Natural_BigN_BigN_BigN_le Coq_Numbers_Natural_BigN_BigN_BigN_zero) || (<= NAT) || 0.169659312936
$ Coq_Init_Datatypes_bool_0 || $ (& Relation-like (& (-defined (carrier SCM+FSA)) (& Function-like (-compatible ((the_Values_of (card3 3)) SCM+FSA))))) || 0.16178475932
__constr_Coq_Init_Datatypes_bool_0_2 || -6 || 0.161668988254
Coq_Numbers_Cyclic_Int31_Int31_Tn || (((([..]1 omega) omega) NAT) NAT) || 0.161386367411
$ $V_$true || $ (& Function-like (& ((quasi_total $V_$true) $V_(~ empty0)) (Element (bool (([:..:] $V_$true) $V_(~ empty0)))))) || 0.16110823945
Coq_Relations_Relation_Operators_clos_refl_trans_0 || createGraph || 0.182990203717
Coq_Relations_Relation_Operators_clos_trans_0 || createGraph || 0.186261237438
Coq_Relations_Relation_Operators_clos_trans_0 || ==>* || 0.162371461524
$ Coq_Init_Datatypes_nat_0 || $ ordinal || 0.160967172248
(Coq_Init_Peano_lt (__constr_Coq_Init_Datatypes_nat_0_2 __constr_Coq_Init_Datatypes_nat_0_1)) || (are_equipotent 1) || 0.168809883898
$ Coq_Numbers_BinNums_Z_0 || $ ordinal || 0.161872694671
(__constr_Coq_Numbers_BinNums_Z_0_2 (__constr_Coq_Numbers_BinNums_positive_0_2 __constr_Coq_Numbers_BinNums_positive_0_3)) || a_Term EdgeSelector 2 (({..}3 k5_ordinal1) 1) || 0.161735768081
$ Coq_Numbers_BinNums_Z_0 || $ (& ordinal natural) || 0.160963966492
$ Coq_Init_Datatypes_nat_0 || $ (& ordinal natural) || 0.168462264785
$ (Coq_Relations_Relation_Definitions_relation $V_$true) || $ (& Function-like (& ((quasi_total (([:..:] $V_$true) $V_$true)) REAL) (Element (bool (([:..:] (([:..:] $V_$true) $V_$true)) REAL))))) || 0.160548090133
(__constr_Coq_Numbers_BinNums_Z_0_2 __constr_Coq_Numbers_BinNums_positive_0_3) || *101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || 0.160499764342
$ Coq_Numbers_BinNums_Z_0 || $ (& (~ empty) (& TopSpace-like TopStruct)) || 0.160919710172
Coq_Sets_Ensembles_Included || r3_absred_0 || 0.160334768898
__constr_Coq_Numbers_BinNums_Z_0_1 || (carrier R^1) +infty0 REAL || 0.160271380771
__constr_Coq_Init_Datatypes_comparison_0_2 || (carrier R^1) +infty0 REAL || 0.161338987372
__constr_Coq_Numbers_BinNums_Z_0_1 || (-0 1) || 0.160216270971
Coq_Numbers_Integer_BigZ_BigZ_BigZ_opp || ((-13 omega) COMPLEX) || 0.160193092688
Coq_Numbers_Natural_BigN_BigN_BigN_zeron || OpSymbolsOf || 0.160012911927
Coq_Numbers_Natural_BigN_BigN_BigN_dom_op || LettersOf || 0.161525919415
$ Coq_Numbers_BinNums_Z_0 || $ (Element (carrier F_Complex)) || 0.159976128094
Coq_Reals_Rfunctions_R_dist || (.5 dist14) || 0.15946829337
Coq_Lists_List_Exists_0 || |- || 0.1593920151
Coq_Lists_List_skipn || #slash#^ || 0.15933364416
$ Coq_Init_Datatypes_bool_0 || $ (Element (carrier Z_2)) || 0.159302162489
Coq_Classes_RelationClasses_Equivalence_0 || is_strongly_quasiconvex_on || 0.159201713789
Coq_Numbers_Natural_BigN_BigN_BigN_zero || one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || 0.159146890513
Coq_Numbers_Integer_BigZ_BigZ_BigZ_zero || one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || 0.160511148999
Coq_FSets_FMapPositive_PositiveMap_ME_ltk || r4_absred_0 || 0.15913530696
Coq_Reals_Rdefinitions_Rinv || (#slash#2 F_Complex) || 0.159077554744
$ Coq_Reals_Rdefinitions_R || $ (Element (carrier F_Complex)) || 0.16227010669
$ Coq_Numbers_BinNums_N_0 || $ (Element (carrier F_Complex)) || 0.162328596553
$ Coq_Init_Datatypes_nat_0 || $ (Element (carrier F_Complex)) || 0.164209912778
Coq_Bool_Bool_eqb || div3 || 0.159077395505
$ Coq_Numbers_BinNums_Z_0 || $ boolean || 0.158831132332
__constr_Coq_Init_Datatypes_bool_0_1 || FALSE || 0.170506053407
Coq_ZArith_Zpower_two_power_nat || BDD-Family0 || 0.158766570529
__constr_Coq_Init_Logic_eq_0_1 || `24 || 0.158201787484
$ (= $V_$V_$true $V_$V_$true) || $ (Element (vSUB $V_QC-alphabet)) || 0.189958924416
$ $V_$true || $ ((Element3 (QC-Sub-WFF $V_QC-alphabet)) (CQC-Sub-WFF $V_QC-alphabet)) || 0.166542291184
Coq_Numbers_Rational_BigQ_BigQ_BigQ_zero || [+] || 0.158014934177
$ (Coq_Sets_Relations_1_Relation $V_$true) || $ (Element (bool (([:..:] (^omega $V_$true)) (^omega $V_$true)))) || 0.157644877997
Coq_Init_Datatypes_xorb || div3 || 0.157621120501
Coq_Bool_Zerob_zerob || (halt0 (InstructionsF SCM)) || 0.157497509089
Coq_Reals_Rtrigo_def_cos || (. sin1) || 0.157441342532
Coq_Reals_Rtrigo_def_sin || (. sin0) || 0.166857526915
Coq_Init_Datatypes_CompOpp || ~4 || 0.157435437531
__constr_Coq_Init_Datatypes_list_0_1 || VERUM || 0.157421286841
$ (=> $V_$true (=> $V_$true $o)) || $ (Element (bool (CQC-WFF $V_QC-alphabet))) || 0.174077786064
$ (=> $V_$true $o) || $ (Element (bool (CQC-WFF $V_QC-alphabet))) || 0.161099450529
Coq_Numbers_Cyclic_ZModulo_ZModulo_eq0 || len0 || 0.157005687957
Coq_Init_Peano_lt || c< || 0.156920331968
$ (Coq_Logic_ExtensionalityFacts_Delta_0 $V_$true) || $ (& (~ empty0) (& cap-closed (& (compl-closed $V_(~ empty0)) (Element (bool (bool $V_(~ empty0))))))) || 0.156528426964
Coq_Logic_ExtensionalityFacts_pi2 || monotoneclass || 0.176381378565
Coq_Relations_Relation_Operators_clos_refl_trans_0 || -->. || 0.156444497533
Coq_Relations_Relation_Operators_clos_trans_0 || -->. || 0.15805163556
__constr_Coq_Init_Datatypes_prod_0_1 || [..]1 || 0.156327781685
Coq_Classes_RelationClasses_Equivalence_0 || is_strictly_convex_on || 0.156081593668
Coq_Relations_Relation_Definitions_transitive || is_strictly_quasiconvex_on || 0.156008591754
$ (=> $V_$true (=> $V_$true $o)) || $ complex || 0.155767156549
$ Coq_Init_Datatypes_bool_0 || $ complex || 0.158770258992
Coq_Lists_List_rev || \not\5 || 0.155754704581
Coq_Lists_List_In || Vars0 || 0.160850460473
$ (! $V_$V_$true, (! $V_$V_$true, ((Coq_Init_Specif_sumbool_0 (= $V_$V_$true $V_$V_$true)) (~ (= $V_$V_$true $V_$V_$true))))) || $ ((Element3 (QC-variables $V_QC-alphabet)) (bound_QC-variables $V_QC-alphabet)) || 0.166471723851
Coq_Lists_List_nodup || Ex || 0.172938704011
$ (Coq_Init_Datatypes_list_0 $V_$true) || $ (Element (QC-WFF $V_QC-alphabet)) || 0.169168636241
Coq_Lists_List_nodup || All || 0.181133074938
$ $V_$true || $ (& (~ empty0) (Element (bool (QC-variables $V_QC-alphabet)))) || 0.18133952745
Coq_Lists_List_rev_append || \or\0 || 0.167659239938
Coq_Reals_Rfunctions_powerRZ || -Root || 0.155746021811
(__constr_Coq_Numbers_BinNums_N_0_2 __constr_Coq_Numbers_BinNums_positive_0_3) || op0 k5_ordinal1 {} || 0.155520892952
Coq_Sets_Relations_1_Symmetric || is_metric_of || 0.155349908477
$ (Coq_Sets_Relations_1_Relation $V_$true) || $ (& Function-like (& ((quasi_total (([:..:] $V_(~ empty0)) $V_(~ empty0))) REAL) (Element (bool (([:..:] (([:..:] $V_(~ empty0)) $V_(~ empty0))) REAL))))) || 0.165228164825
Coq_Sets_Relations_2_Rstar_0 || bounded_metric || 0.156599692545
Coq_Reals_Rbasic_fun_Rabs || *1 || 0.155066752211
Coq_Structures_OrdersEx_Z_as_OT_le || <= || 0.154920962524
Coq_Numbers_Integer_Binary_ZBinary_Z_le || <= || 0.155545901375
Coq_Structures_OrdersEx_Z_as_DT_le || <= || 0.15618510863
Coq_Numbers_Natural_BigN_BigN_BigN_lt || <= || 0.154988725067
Coq_Init_Peano_lt || <= || 0.155411607116
(Coq_Init_Peano_lt __constr_Coq_Init_Datatypes_nat_0_1) || (<= 1) || 0.156009458695
Coq_Reals_Rpow_def_pow || |^ || 0.155606482016
Coq_Init_Peano_le_0 || <= || 0.155350298489
Coq_Numbers_Natural_Binary_NBinary_N_le || <= || 0.155843242115
Coq_Structures_OrdersEx_N_as_OT_le || <= || 0.156610807131
Coq_Structures_OrdersEx_N_as_DT_le || <= || 0.157388211481
Coq_NArith_BinNat_N_le || <= || 0.157394634582
Coq_Numbers_Integer_BigZ_BigZ_BigZ_le || <= || 0.156822892886
$ Coq_Numbers_Integer_BigZ_BigZ_BigZ_t || $ ext-real || 0.160276983921
$ Coq_Numbers_Natural_BigN_BigN_BigN_t || $ ext-real || 0.157386985768
$ Coq_Numbers_BinNums_N_0 || $ boolean || 0.155788729052
(Coq_Init_Peano_lt __constr_Coq_Init_Datatypes_nat_0_1) || (<= 4) || 0.155098011239
(Coq_Init_Peano_lt __constr_Coq_Init_Datatypes_nat_0_1) || (are_equipotent {}) || 0.157141187374
Coq_Numbers_Natural_BigN_BigN_BigN_le || <= || 0.154534201642
Coq_Lists_List_count_occ || FinUnion0 || 0.153997062631
$ Coq_Numbers_BinNums_Z_0 || $ (& Relation-like (& Function-like (& real-valued FinSequence-like))) || 0.153838161333
$ Coq_Numbers_BinNums_positive_0 || $ (& Relation-like (& Function-like (& real-valued FinSequence-like))) || 0.153937093554
$ Coq_Init_Datatypes_nat_0 || $ (& Relation-like (& Function-like (& real-valued FinSequence-like))) || 0.15931877327
Coq_QArith_QArith_base_Qpower || (((#hash#)4 omega) COMPLEX) || 0.153737051837
Coq_ZArith_BinInt_Z_lt || <= || 0.153604125245
Coq_Numbers_Natural_Binary_NBinary_N_lt || <= || 0.153985320231
Coq_Structures_OrdersEx_N_as_OT_lt || <= || 0.154804560434
Coq_Structures_OrdersEx_N_as_DT_lt || <= || 0.155655803827
Coq_NArith_BinNat_N_lt || <= || 0.156191507369
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lt || <= || 0.156852421339
$ Coq_Numbers_Integer_BigZ_BigZ_BigZ_t || $ natural || 0.159847756283
Coq_Numbers_Natural_BigN_BigN_BigN_eq || <= || 0.154621646661
Coq_Numbers_Natural_BigN_BigN_BigN_even || csch#quote# || 0.154488967648
Coq_Numbers_Natural_BigN_BigN_BigN_odd || csch#quote# || 0.15624053374
Coq_Numbers_Natural_BigN_BigN_BigN_even || sinh#quote# || 0.15702229543
Coq_Numbers_Natural_BigN_BigN_BigN_odd || sinh#quote# || 0.158979423553
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || <= || 0.153832490353
Coq_Numbers_Integer_Binary_ZBinary_Z_lt || <= || 0.153934654131
Coq_Structures_OrdersEx_Z_as_OT_lt || <= || 0.154946997173
Coq_Structures_OrdersEx_Z_as_DT_lt || <= || 0.156009124007
__constr_Coq_Init_Datatypes_comparison_0_2 || FALSE || 0.15601866166
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || c= || 0.153460204452
$ Coq_Numbers_Integer_BigZ_BigZ_BigZ_t || $ complex-membered || 0.176066948
Coq_Classes_RelationClasses_Transitive || is_quasiconvex_on || 0.153389848524
$ (Coq_Logic_ExtensionalityFacts_Delta_0 $V_$true) || $ (& (Square-Matrix-yielding $V_(~ empty0)) (FinSequence (*0 (*0 $V_(~ empty0))))) || 0.153125476029
Coq_Numbers_Cyclic_ZModulo_ZModulo_to_Z || NormPolynomial || 0.1530759746
__constr_Coq_Numbers_BinNums_Z_0_1 || (seq_n^ 2) || 0.152992227853
Coq_Numbers_Natural_BigN_BigN_BigN_mk_t_w || DigitSD2 || 0.152849682571
$ Coq_Reals_Rdefinitions_R || $ (& Relation-like (& Function-like complex-valued)) || 0.15276791511
$ Coq_Reals_Rdefinitions_R || $ ordinal || 0.154484440018
(Coq_Reals_Rdefinitions_Rlt Coq_Reals_Rdefinitions_R0) || (are_equipotent NAT) || 0.175055977102
$ Coq_Reals_Rdefinitions_R || $true || 0.154930458073
Coq_Reals_Ranalysis1_opp_fct || ~4 || 0.167817110558
Coq_Reals_Rtopology_neighbourhood || is_DTree_rooted_at || 0.167591206672
$ (=> Coq_Reals_Rdefinitions_R Coq_Reals_Rdefinitions_R) || $ Relation-like || 0.15815944878
Coq_Reals_Ranalysis1_continuity_pt || is_reflexive_in || 0.166646834439
$ Coq_Reals_Rdefinitions_R || $ (Element 0) || 0.154769008746
Coq_Reals_Rpow_def_pow || |^25 || 0.155477003731
(Coq_Reals_Rdefinitions_Rlt Coq_Reals_Rdefinitions_R0) || (<= 1) || 0.154409370672
Coq_Relations_Relation_Operators_clos_refl_trans_0 || ==>. || 0.152713050413
Coq_Relations_Relation_Operators_clos_refl_trans_n1_0 || ==>* || 0.157776681358
Coq_Relations_Relation_Operators_clos_refl_trans_1n_0 || ==>* || 0.159085230469
Coq_Relations_Relation_Operators_clos_trans_0 || ==>. || 0.153851748955
Coq_Sets_Ensembles_Strict_Included || r7_absred_0 || 0.152234902544
$ Coq_Numbers_Integer_BigZ_BigZ_BigZ_t || $ ext-real-membered || 0.151995919319
Coq_Reals_Rdefinitions_Rinv || (#slash#1 Ser0) || 0.151852429105
Coq_Classes_RelationClasses_Transitive || is_Lcontinuous_in || 0.151762679359
Coq_Classes_RelationClasses_Transitive || is_Rcontinuous_in || 0.154762705832
Coq_Numbers_Natural_BigN_BigN_BigN_pred || (#slash# 1) || 0.151722300331
Coq_Lists_List_firstn || |3 || 0.151387792805
Coq_FSets_FMapPositive_PositiveMap_ME_ltk || r7_absred_0 || 0.151288019171
__constr_Coq_Numbers_BinNums_N_0_2 || 0. || 0.151272180227
Coq_Reals_Rdefinitions_Rle || c= || 0.151220110594
Coq_Reals_Rdefinitions_Rlt || are_equipotent || 0.152246726704
Coq_Reals_Raxioms_INR || dom2 || 0.160259888315
$ (Coq_Init_Datatypes_list_0 $V_$true) || $ (& (Matrix-yielding $V_(~ empty0)) (FinSequence (*0 (*0 $V_(~ empty0))))) || 0.151167321848
Coq_Reals_Rtrigo_calc_sind || sech || 0.1509212351
$ Coq_Numbers_BinNums_N_0 || $ (& Relation-like (& Function-like (& FinSequence-like complex-valued))) || 0.150778148501
Coq_Init_Peano_le_0 || c= || 0.15071678767
Coq_QArith_QArith_base_Qle || c= || 0.150560054802
(__constr_Coq_Numbers_BinNums_Z_0_2 __constr_Coq_Numbers_BinNums_positive_0_3) || (1. F_Complex) || 0.150544771392
Coq_Sets_Ensembles_Included || r1_absred_0 || 0.150498066316
Coq_Sets_Ensembles_Strict_Included || r3_absred_0 || 0.161117070951
Coq_Sets_Ensembles_Included || r2_absred_0 || 0.154864428286
$ (=> $V_$true $true) || $ (& (total $V_(~ empty0)) (Element (bool (([:..:] $V_(~ empty0)) $V_(~ empty0))))) || 0.150358920971
__constr_Coq_Init_Specif_sigT_0_1 || Tau || 0.194290982422
__constr_Coq_Init_Specif_sigT_0_1 || SIGMA || 0.182832354498
$ ($V_(=> $V_$true $true) $V_$V_$true) || $ (Element (carrier (((BASSModel $V_(~ empty0)) $V_(& (total $V_(~ empty0)) (Element (bool (([:..:] $V_(~ empty0)) $V_(~ empty0)))))) $V_(& (~ empty0) (Element (bool (ModelSP $V_(~ empty0)))))))) || 0.177485687422
$ $V_$true || $ (& (~ empty0) (Element (bool (ModelSP $V_(~ empty0))))) || 0.175217760681
$ ($V_(=> $V_$true $true) $V_$V_$true) || $ (Element (bool $V_(~ empty0))) || 0.186849359108
Coq_Reals_Raxioms_IZR || P_cos || 0.150311296108
Coq_Reals_Rpower_ln || min || 0.150155265791
Coq_Classes_RelationClasses_Symmetric || is_quasiconvex_on || 0.150084661493
Coq_Classes_RelationClasses_Reflexive || is_quasiconvex_on || 0.151803323797
Coq_FSets_FMapPositive_PositiveMap_is_empty || |....|13 || 0.150058398915
Coq_FSets_FMapPositive_PositiveMap_Empty || emp || 0.16359433902
__constr_Coq_Init_Datatypes_comparison_0_3 || one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || 0.149814561499
$ Coq_Numbers_BinNums_positive_0 || $ ordinal || 0.149782095963
Coq_Classes_RelationClasses_Transitive || is_a_pseudometric_of || 0.149628448465
Coq_Classes_RelationClasses_Transitive || quasi_orders || 0.150890731033
Coq_Classes_RelationClasses_Transitive || is_strongly_quasiconvex_on || 0.14993845487
Coq_Classes_RelationClasses_Transitive || is_continuous_on1 || 0.150882197057
Coq_Classes_RelationClasses_Transitive || is_continuous_in5 || 0.153581877237
Coq_Classes_RelationClasses_Transitive || is_convex_on || 0.153397506366
Coq_Classes_RelationClasses_Transitive || is_continuous_in || 0.156081192635
$ $V_$true || $ (Element $V_(~ empty0)) || 0.148578968552
$ (Coq_Init_Datatypes_list_0 $V_$true) || $ (& Function-like (& ((quasi_total (([:..:] $V_(~ empty0)) $V_(~ empty0))) $V_(~ empty0)) (Element (bool (([:..:] (([:..:] $V_(~ empty0)) $V_(~ empty0))) $V_(~ empty0)))))) || 0.156168808874
Coq_Init_Datatypes_prod_0 || [:..:] || 0.157940779179
Coq_Lists_List_In || is_a_right_unity_wrt || 0.164506837428
Coq_Lists_List_In || is_a_left_unity_wrt || 0.167260060153
Coq_Classes_Equivalence_equiv || are_conjugated_under || 0.149456604408
$ ((Coq_Classes_RelationClasses_Equivalence_0 $V_$true) $V_(Coq_Relations_Relation_Definitions_relation $V_$true)) || $ (& Function-like (& ((quasi_total (carrier $V_(& (~ empty) (& unital multMagma)))) ((Funcs $V_(~ empty0)) $V_(~ empty0))) (& ((being_left_operation $V_(& (~ empty) (& unital multMagma))) $V_(~ empty0)) (Element (bool (([:..:] (carrier $V_(& (~ empty) (& unital multMagma)))) ((Funcs $V_(~ empty0)) $V_(~ empty0)))))))) || 0.172986298515
$ (Coq_Relations_Relation_Definitions_relation $V_$true) || $ (~ empty0) || 0.159166794142
$true || $ (& (~ empty) (& Group-like (& associative multMagma))) || 0.157142433809
Coq_Sorting_PermutSetoid_permutation || are_conjugated_under || 0.157839507072
Coq_Sets_Ensembles_Singleton_0 || carr || 0.156484264073
$ (! $V_$V_$true, (! $V_$V_$true, ((Coq_Init_Specif_sumbool_0 (($V_(Coq_Relations_Relation_Definitions_relation $V_$true) $V_$V_$true) $V_$V_$true)) (~ (($V_(Coq_Relations_Relation_Definitions_relation $V_$true) $V_$V_$true) $V_$V_$true))))) || $ (& Function-like (& ((quasi_total (carrier $V_(& (~ empty) (& unital multMagma)))) ((Funcs $V_(~ empty0)) $V_(~ empty0))) (& ((being_left_operation $V_(& (~ empty) (& unital multMagma))) $V_(~ empty0)) (Element (bool (([:..:] (carrier $V_(& (~ empty) (& unital multMagma)))) ((Funcs $V_(~ empty0)) $V_(~ empty0)))))))) || 0.156101667559
$true || $ (& (~ empty) (& unital multMagma)) || 0.158184330739
Coq_Sets_Ensembles_Couple_0 || *37 || 0.150732433797
Coq_Classes_RelationClasses_complement || <- || 0.150616406735
Coq_Classes_RelationClasses_Irreflexive || is_one-to-one_at || 0.150768948154
$ $V_$true || $ (Subgroup $V_(& (~ empty) (& Group-like (& associative multMagma)))) || 0.149262334502
Coq_Relations_Relation_Definitions_inclusion || are_conjugated1 || 0.175879027661
Coq_Classes_Morphisms_Normalizes || are_conjugated1 || 0.18106756225
Coq_Sets_Ensembles_Union_0 || *38 || 0.160387258701
Coq_Init_Wf_Acc_0 || are_not_conjugated || 0.153909082948
$ (= $V_$V_$true $V_$V_$true) || $ (& (-element 1) (FinSequence $V_(~ empty0))) || 0.148877080194
$ Coq_FSets_FSetPositive_PositiveSet_elt || $ (& natural prime) || 0.148351229633
$ Coq_FSets_FSetPositive_PositiveSet_t || $ integer || 0.163922464618
Coq_FSets_FSetPositive_PositiveSet_In || divides0 || 0.169949963329
$ Coq_Numbers_Natural_BigN_BigN_BigN_t || $ integer || 0.148934109996
Coq_Reals_Rpow_def_pow || -Root || 0.148077641855
Coq_ZArith_Zquot_Remainder || DecSD2 || 0.147686143104
Coq_ZArith_Zquot_Remainder_alt || DecSD || 0.188111196577
Coq_Relations_Relation_Operators_clos_refl_trans_n1_0 || -->. || 0.147513338017
Coq_Relations_Relation_Operators_clos_trans_n1_0 || -->. || 0.149180060188
Coq_Relations_Relation_Operators_clos_trans_1n_0 || -->. || 0.152270298119
Coq_Relations_Relation_Operators_clos_refl_trans_1n_0 || -->. || 0.15363220657
Coq_Relations_Relation_Operators_clos_refl_sym_trans_n1_0 || -->. || 0.156700451106
Coq_Relations_Relation_Operators_clos_refl_sym_trans_1n_0 || -->. || 0.160437758704
$ Coq_Numbers_BinNums_Z_0 || $ (& Relation-like (& Function-like complex-valued)) || 0.147230250061
$ Coq_Numbers_BinNums_Z_0 || $ (~ empty0) || 0.147492383972
$ Coq_Numbers_BinNums_Z_0 || $ (& (~ empty0) Tree-like) || 0.147550720499
$ Coq_Numbers_BinNums_N_0 || $ (& (~ empty0) Tree-like) || 0.154663820209
Coq_Classes_RelationClasses_Symmetric || is_Lcontinuous_in || 0.14717204301
Coq_Classes_RelationClasses_Symmetric || is_Rcontinuous_in || 0.14993482109
Coq_Classes_RelationClasses_Reflexive || is_Lcontinuous_in || 0.14762914981
Coq_Classes_RelationClasses_Reflexive || is_Rcontinuous_in || 0.150178111099
$ $V_$true || $ (SimplicialComplexStr $V_$true) || 0.146923913912
Coq_Numbers_Integer_BigZ_BigZ_BigZ_one || one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || 0.146877749012
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || r1_absred_0 || 0.146804261744
Coq_FSets_FMapPositive_PositiveMap_ME_ltk || r3_absred_0 || 0.156292434944
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || r2_absred_0 || 0.151063233409
Coq_FSets_FMapPositive_PositiveMap_ME_eqk || r7_absred_0 || 0.14753601866
Coq_Relations_Relation_Definitions_reflexive || is_strictly_quasiconvex_on || 0.14648906405
Coq_Logic_FinFun_bSurjective || MetrStruct0 || 0.146477643711
Coq_Logic_FinFun_bFun || is_metric_of || 0.173365173062
$ (=> Coq_Init_Datatypes_nat_0 Coq_Init_Datatypes_nat_0) || $ (& Function-like (& ((quasi_total (([:..:] $V_$true) $V_$true)) REAL) (Element (bool (([:..:] (([:..:] $V_$true) $V_$true)) REAL))))) || 0.170953295598
__constr_Coq_Init_Datatypes_nat_0_1 || (0. SCMPDS) (0. SCM+FSA) (0. SCM) omega || 0.146472903698
__constr_Coq_Init_Datatypes_bool_0_2 || c[10] ((|[..]| 1) NAT) || 0.146330500644
Coq_Numbers_Integer_BigZ_BigZ_BigZ_square || permutations || 0.146290180334
Coq_Numbers_Natural_BigN_BigN_BigN_dom_t || AllSymbolsOf || 0.146278323238
Coq_Numbers_Cyclic_Abstract_CyclicAxioms_ZnZ_to_Z || #slash##bslash#3 || 0.157806573943
Coq_NArith_BinNat_N_size_nat || len1 || 0.146259482504
Coq_NArith_BinNat_N_testbit_nat || #slash#^5 || 0.157208406777
Coq_Lists_List_In || is_a_unity_wrt || 0.146174182908
Coq_Lists_List_In || |- || 0.146687610806
Coq_Lists_List_nodup || All1 || 0.166538469447
Coq_Sorting_Permutation_Permutation_0 || |-|0 || 0.154245151156
Coq_Reals_Rdefinitions_Ropp || -0 || 0.146083675469
(__constr_Coq_Numbers_BinNums_N_0_2 __constr_Coq_Numbers_BinNums_positive_0_3) || *101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || 0.146041456244
Coq_Logic_ExtensionalityFacts_pi1 || sigma0 || 0.14598373801
Coq_Sets_Ensembles_Included || c=1 || 0.145781322783
$ (Coq_Sets_Ensembles_Ensemble $V_$true) || $ (& Relation-like (& (-defined $V_$true) (& Function-like (total $V_$true)))) || 0.175364380328
Coq_Sets_Ensembles_Intersection_0 || #slash##bslash#5 || 0.160194772452
Coq_Sets_Ensembles_Empty_set_0 || [[0]] || 0.15964701338
__constr_Coq_Numbers_BinNums_Z_0_2 || Big_Oh || 0.145630779716
