nat || nat || 0.310338223551
nat || Z || 0.0946179293207
code_natural || fraction || 0.0795400758045
trans || symmetric || 0.0712896055822
trans || transitive || 0.0683016643827
trans || associative || 0.0676176037978
code_natural || Z || 0.0655198803776
wf || symmetric || 0.0597903367514
wf || associative || 0.0571445576474
wf || transitive || 0.055346033746
code_pcr_natural code_cr_natural || fraction2 || 0.0529700903022
code_pcr_natural code_cr_natural || fraction1 || 0.0529700903022
code_natural || times || 0.0463427390832
bNF_Ca1495478003natLeq || divides || 0.0458747084576
code_natural || le || 0.0452383166753
topological_subseq || increasing || 0.0450046934921
code_pcr_natural code_cr_natural || Z3 || 0.0420943114763
code_pcr_natural code_cr_natural || Z2 || 0.041190552061
order_strict_mono || injective || 0.0399420873996
code_pcr_natural code_cr_natural || sqrt || 0.0391168958313
bNF_Ca1495478003natLeq || Zlt || 0.0373589103333
code_pcr_natural code_cr_natural || A || 0.0370549728551
left_unique || injective || 0.0367593723958
left_total || injective || 0.0363444629306
right_unique || injective || 0.0361498660641
trans || antisymmetric || 0.0359870828703
bNF_Ca1495478003natLeq || gcd || 0.0356130741553
antisym || transitive || 0.0355775577138
less_than || divides || 0.0349803276199
right_total || injective || 0.0341732148798
nat || bool || 0.03359448072
bi_total || injective || 0.0333936773989
code_pcr_natural code_cr_natural || minus || 0.0327173105166
antisym || symmetric || 0.032600780074
bi_unique || injective || 0.0324088007852
bNF_Ca1495478003natLeq || plus || 0.0308855093484
less_than || Zlt || 0.0308415998133
int || nat || 0.030543877402
code_pcr_natural code_cr_natural || plus || 0.0305312203727
bNF_Ca829732799finite || transitive || 0.0303765682179
antisym || associative || 0.02974405533
wf || antisymmetric || 0.0297237307097
bNF_Ca829732799finite || symmetric || 0.0292095381921
left_unique || distributive || 0.028888211225
order_mono || injective || 0.0286822574954
less_than || gcd || 0.0286421068714
left_total || distributive || 0.0284701406647
right_unique || distributive || 0.0282749344491
bNF_Ca1495478003natLeq || times || 0.0276837345703
bNF_Ca829732799finite || associative || 0.0268890240064
bNF_Ca1495478003natLeq || le || 0.0267848684926
right_total || distributive || 0.0263233471105
bi_total || distributive || 0.02556913856
nat || R0 || 0.0255098974979
bNF_Ca1495478003natLeq || Zle || 0.0249339073112
nat || Q0 || 0.0246454344598
bi_unique || distributive || 0.024628541849
less_than || plus || 0.0243944347097
less_than || Zle || 0.0230201650924
less_than || times || 0.0216008797792
antisym || antisymmetric || 0.0206472742429
less_than || le || 0.0204230746318
pred_nat || divides || 0.0183947066348
bNF_Ca829732799finite || antisymmetric || 0.0178530158614
bNF_Ca1495478003natLeq || eqb || 0.0178096518653
trans || symmetricb || 0.0176301045534
bNF_Ca1495478003natLeq || Ztimes || 0.016363339289
trans || reflexive || 0.0162846152367
pred_nat || Zlt || 0.0158212554688
code_integer || fraction || 0.0155999159739
left_unique || monotonic || 0.0155271609767
left_total || monotonic || 0.0153571033907
pred_nat || gcd || 0.0153283596281
right_unique || monotonic || 0.0152773081122
wf || symmetricb || 0.0147370940337
bNF_Ca1495478003natLeq || Zplus || 0.0145611370477
less_than || Ztimes || 0.0144872474047
right_total || monotonic || 0.0144654554084
bi_total || monotonic || 0.014144623315
less_than || eqb || 0.0140482402709
trans || irreflexive || 0.0139928992545
bi_unique || monotonic || 0.0137387466804
wf || reflexive || 0.012932919265
bNF_Ca1495478003natLeq || lt || 0.0129135976901
pred_nat || plus || 0.0128924656812
code_pcr_natural code_cr_natural || Zplus || 0.0127744297448
code_integer || Z || 0.0127401767597
less_than || Zplus || 0.0126861399049
pred_nat || Zle || 0.0125185823899
less_than || Rplus || 0.0121806290198
bNF_Ca1495478003natLeq || Rplus || 0.0115112340659
less_than || Rmult || 0.0114319246883
code_natural || Ztimes || 0.0113803146841
pred_nat || times || 0.0113216264408
bNF_Ca1495478003natLeq || Rmult || 0.0109054496135
wf || irreflexive || 0.0108920715601
less_than || Qtimes0 || 0.010776271398
less_than || Qplus || 0.010776271398
pred_nat || le || 0.0107047489162
less_than || orb || 0.0106964707296
bNF_Ca1495478003natLeq || orb || 0.0106909885446
suc || nth_prime || 0.0106819246358
nat || Q || 0.0104913620128
bNF_Ca1495478003natLeq || Qplus || 0.0103231726084
bNF_Ca1495478003natLeq || Qtimes0 || 0.0103231726084
code_pcr_integer code_cr_integer || fraction2 || 0.0100257782422
code_pcr_integer code_cr_integer || fraction1 || 0.0100257782422
less_than || lt || 0.00997621109129
antisym || symmetricb || 0.00995253784
antisym || reflexive || 0.00953021685045
nat || ratio || 0.00952311112047
suc || nat2 || 0.00923694009211
code_pcr_natural code_cr_natural || Rplus || 0.00882890423153
bNF_Ca829732799finite || symmetricb || 0.00859152546395
code_pcr_natural code_cr_natural || orb || 0.00826386087912
code_integer || times || 0.00805668090599
antisym || irreflexive || 0.00803388187239
bNF_Ca1495478003natLeq || andb || 0.00796406756621
code_pcr_integer code_cr_integer || Z3 || 0.00794616728493
code_pcr_natural code_cr_natural || Qplus || 0.00788682802957
bNF_Ca829732799finite || reflexive || 0.00780010619378
code_pcr_integer code_cr_integer || Z2 || 0.00777688137367
pred_nat || eqb || 0.00776503045436
less_than || Qtimes || 0.0076438527212
less_than || andb || 0.0076394553965
pred_nat || Ztimes || 0.00762133487699
id2 || eq || 0.00726454428572
finite_psubset || append || 0.00715215268649
less_than || rtimes || 0.00707873879533
bNF_Ca1495478003natLeq || Qtimes || 0.0070555851251
bNF_Ca829732799finite || irreflexive || 0.00693266594608
pred_nat || Zplus || 0.00660498870081
bNF_Ca1495478003natLeq || rtimes || 0.00655426549363
code_natural || Rmult || 0.00643849853015
code_integer || le || 0.00642429466713
pred_nat || Rplus || 0.00640992821572
code_natural || orb || 0.00639025414661
code_pcr_natural code_cr_natural || andb || 0.00633202928264
code_pcr_natural code_cr_natural || defactorize || 0.00621559026389
code_natural || ratio || 0.00606874657241
code_natural || Qtimes0 || 0.00606381941496
pred_nat || Rmult || 0.00598594594475
code_pcr_integer code_cr_integer || defactorize || 0.00585410849999
code_integer || ratio || 0.00578192267467
pred_nat || Qplus || 0.00561624663315
pred_nat || Qtimes0 || 0.00561624663315
pred_nat || orb || 0.00556430405024
code_pcr_integer code_cr_integer || minus || 0.00555889411945
code_pcr_integer code_cr_integer || sqrt || 0.00541591659999
code_natural || andb || 0.00525947154113
pred_nat || lt || 0.00523320094182
code_pcr_integer code_cr_integer || plus || 0.00519076293303
code_pcr_integer code_cr_integer || A || 0.00513302481792
code_pcr_natural code_cr_natural || ratio2 || 0.00509298174822
int || bool || 0.0050722394859
code_pcr_integer code_cr_integer || ratio2 || 0.00483639543988
code_pcr_integer code_cr_integer || Rplus || 0.00460169092401
int || fraction || 0.00424325200189
code_pcr_integer code_cr_integer || Qplus || 0.00419224659121
int || nat_fact_all || 0.00419203824604
code_pcr_integer code_cr_integer || orb || 0.00412350060932
pred_nat || Qtimes || 0.00387630197242
pred_nat || andb || 0.00387152961543
nat || fraction || 0.00384227768128
nat || nat_fact_all || 0.00368529907581
pred_nat || rtimes || 0.00356772416184
code_integer || Rmult || 0.0034076091972
code_integer || Qtimes0 || 0.00326354636399
code_integer || orb || 0.00322778509013
code_pcr_integer code_cr_integer || andb || 0.00319744217933
set || list || 0.00307334283822
code_natural || nat || 0.00298266765019
code_pcr_integer code_cr_integer || Zplus || 0.0029361196388
code_integer || nat || 0.00289874774029
code_integer || andb || 0.00267176095969
code_integer || Ztimes || 0.0026262964466
int || R0 || 0.00241742943263
int || Q0 || 0.00234204884208
suc || notb || 0.00219274658818
int || Z || 0.00212456083204
code_pcr_natural code_cr_natural || ftimes || 0.0016692186362
code_pcr_integer code_cr_integer || ftimes || 0.00156562963528
nat || Formula || 0.00116941114402
less_than || same_atom || 0.00109525913714
bNF_Ca1495478003natLeq || same_atom || 0.00107561142639
pred_nat || same_atom || 0.000556145167964
left_unique || symmetric2 || 0.00042212787132
left_total || symmetric2 || 0.000417415915312
right_unique || symmetric2 || 0.000415205566502
right_total || symmetric2 || 0.00039273991987
bi_total || symmetric2 || 0.000383873527855
bi_unique || symmetric2 || 0.000372666574295
antisym || symmetric0 || 0.000370061916743
sym || symmetric0 || 0.000365789930532
trans || symmetric0 || 0.000315833206108
sym || reflexive || 0.000309388206049
sym || transitive || 0.000251749101486
trans || transitiveb || 0.000117159975247
wf || transitiveb || 8.8466635348e-05
antisym || transitiveb || 6.64166028418e-05
bNF_Ca829732799finite || transitiveb || 5.74812679751e-05
finite_psubset || eq10 || 2.1489577948e-05
induct_true || False || 1.0650476572e-05
set || carr1 || 6.25573056556e-06
finite_psubset || eq0 || 3.02100451077e-06
trans || transitive1 || 2.75712928612e-06
trans || symmetric10 || 2.75712928612e-06
trans || reflexive1 || 2.75712928612e-06
wf || transitive1 || 2.28258151859e-06
wf || symmetric10 || 2.28258151859e-06
wf || reflexive1 || 2.28258151859e-06
set || carr || 9.33129583034e-07
trans || symmetric1 || 4.37282039183e-07
trans || reflexive0 || 4.37282039183e-07
trans || transitive0 || 4.37282039183e-07
wf || symmetric1 || 3.61383852296e-07
wf || reflexive0 || 3.61383852296e-07
wf || transitive0 || 3.61383852296e-07
im || denom || 3.41498901335e-07
re || num || 3.36309535776e-07
complex2 || frac || 2.54238759148e-07
int || nat1 || 1.36800945991e-07
zero_zero || nat2 || 1.36370279766e-07
wf || lt || 1.32896161273e-07
real_V1632203528linear || injective || 1.24246108761e-07
nat || nat1 || 1.00024001449e-07
complex || nat || 8.1815138161e-08
int_ge_less_than2 || teta || 6.25798867395e-08
int_ge_less_than || teta || 6.25798867395e-08
real || nat1 || 6.09172298767e-08
root || Fmult || 5.445204161e-08
upto || defactorize_aux || 5.44154981462e-08
one_one || nat2 || 5.24868631407e-08
upt || moebius_aux || 4.31786793273e-08
suc || costante || 4.16340313635e-08
int_ge_less_than2 || nth_prime || 4.13571139456e-08
int_ge_less_than || nth_prime || 4.13571139456e-08
binomial || moebius_aux || 4.06882328475e-08
upt || defactorize_aux || 3.77166918898e-08
int_ge_less_than2 || fact || 3.69127614666e-08
int_ge_less_than || fact || 3.69127614666e-08
binomial || bc || 3.52780466956e-08
positive2 || prime || 3.28314566301e-08
real_V1632203528linear || distributive || 3.19263866339e-08
dup || A || 2.88640877343e-08
distinct || lt || 2.65806435371e-08
linorder_sorted || lt || 2.65694361115e-08
positive || prime || 2.54109640953e-08
complex || nat1 || 2.44129032862e-08
csqrt || A || 2.40755111173e-08
int_ge_less_than2 || nat2 || 2.38820007077e-08
int_ge_less_than || nat2 || 2.38820007077e-08
binomial || div || 2.3497416875e-08
nil || Z2 || 2.33501664516e-08
sqrt || A || 2.33303376175e-08
arccos || derivative || 2.22670974404e-08
real || fraction || 2.15510555306e-08
cnj || notb || 2.08557104905e-08
one_one || Z2 || 2.03132865782e-08
log2 || moebius_aux || 2.02910941744e-08
cnj || A || 1.94223833167e-08
real || Z || 1.88581962529e-08
cnj || nth_prime || 1.86556106912e-08
complex || bool || 1.8434461548e-08
arcsin || A || 1.7084567272e-08
arctan || A || 1.56640702162e-08
code_dup || A || 1.43021823647e-08
rat || nat1 || 1.37222325782e-08
cnj || nat2 || 1.34533569328e-08
real_V1632203528linear || monotonic || 1.32160396317e-08
one_one || monomio || 1.26443789654e-08
zero_zero || costante || 1.13251866391e-08
complex || nat_fact_all || 1.10972712215e-08
complex || fraction || 9.3455210679e-09
zero_zero || Z2 || 9.15632516228e-09
real || times || 8.14257062873e-09
real || ratio || 8.05862603333e-09
im || fraction2 || 7.55159571735e-09
im || fraction1 || 7.55159571735e-09
re || fraction2 || 7.46603559602e-09
re || fraction1 || 7.46603559602e-09
code_integer || nat1 || 7.05511245855e-09
real || le || 6.78710973261e-09
transitive_acyclic || le || 6.681659642e-09
im || Z3 || 6.36913101806e-09
re || Z3 || 6.30733004071e-09
im || Z2 || 6.25762578724e-09
re || Z2 || 6.19795319276e-09
im || defactorize || 5.10165099866e-09
re || defactorize || 5.0385144447e-09
real || nat || 5.0091950012e-09
im || ratio2 || 4.19967764461e-09
re || ratio2 || 4.15704624973e-09
im || minus || 2.9593345459e-09
im || sqrt || 2.94378754728e-09
re || minus || 2.9346649632e-09
re || sqrt || 2.91463367204e-09
im || A || 2.81768098921e-09
im || plus || 2.79253100661e-09
re || A || 2.79095252044e-09
re || plus || 2.77055150458e-09
real || orb || 2.41500471818e-09
real || andb || 2.05977105685e-09
bNF_Cardinal_cfinite || symmetric || 1.94908271365e-09
complex || R0 || 1.92822879893e-09
complex || Q0 || 1.88604802301e-09
complex || Z || 1.77168078093e-09
real || Rmult || 1.75487149892e-09
real || Qtimes0 || 1.7117425986e-09
im || orb || 1.67363480055e-09
re || orb || 1.65536986501e-09
ratreal || relation_class_of_argument_class || 1.55339842597e-09
bNF_Cardinal_cfinite || associative || 1.49090969399e-09
real || Ztimes || 1.48589274341e-09
im || andb || 1.35296809041e-09
re || andb || 1.3410672067e-09
im || Rplus || 1.29447765277e-09
archim2085082626_floor || carrier_of_relation_class || 1.28227379584e-09
re || Rplus || 1.2784574905e-09
real_V1632203528linear || symmetric2 || 1.2651020033e-09
im || Qplus || 1.2077495135e-09
re || Qplus || 1.19373829403e-09
nil || nth_prime || 1.15539514974e-09
product_unit || Z || 1.01511037205e-09
bNF_Cardinal_cfinite || transitive || 9.97700391449e-10
im || Zplus || 9.17494863668e-10
re || Zplus || 9.09287525642e-10
rat || variance || 8.5741464274e-10
product_unit || nat || 8.220673362e-10
real || unit || 7.73223725807e-10
induct_true || E.con || 7.68372478742e-10
induct_true || D.con || 7.68372478742e-10
induct_true || B.con || 7.68372478742e-10
induct_true || LETIN || 7.68372478742e-10
induct_true || A.con || 7.68372478742e-10
induct_true || C.con || 7.68372478742e-10
im || ftimes || 7.13602920794e-10
re || ftimes || 7.04335925999e-10
bNF_Cardinal_cone || Zlt || 5.707789549e-10
product_unit || R0 || 4.23601093766e-10
product_unit || bool || 4.12451446404e-10
bNF_Cardinal_cone || Zle || 4.09885081279e-10
product_unit || Q0 || 4.05910794216e-10
bNF_Cardinal_cone || Rplus || 3.96969162311e-10
bNF_Cardinal_cfinite || irreflexive || 3.93537514492e-10
bNF_Cardinal_cone || Rmult || 3.70646171493e-10
bNF_Cardinal_cone || Qplus || 3.48519095557e-10
bNF_Cardinal_cone || Qtimes0 || 3.48519095557e-10
bNF_Cardinal_cone || Ztimes || 3.32247548229e-10
bNF_Cardinal_cone || orb || 3.13073615042e-10
bNF_Cardinal_cone || Zplus || 2.88552631359e-10
bNF_Cardinal_cone || Qtimes || 2.70891054592e-10
product_unit || Q || 2.63224959771e-10
bNF_Cardinal_cone || gcd || 2.62281571073e-10
bNF_Cardinal_cone || rtimes || 2.48089564623e-10
one2 || nat_fact_all1 || 2.43495026258e-10
bNF_Cardinal_cfinite || antisymmetric || 2.39000995707e-10
product_unit || ratio || 2.23515937983e-10
bNF_Cardinal_cone || plus || 2.20846252569e-10
bNF_Cardinal_cone || andb || 2.19111709293e-10
bNF_Cardinal_cone || times || 1.94110338544e-10
nil || list1 || 1.83089838394e-10
bNF_Cardinal_cone || divides || 1.74097701371e-10
c_Predicate_Oeq || incl || 1.62265441581e-10
bNF_Cardinal_cfinite || symmetricb || 1.10516198263e-10
fun_is_measure || cmp_cases || 1.09747682182e-10
bNF_Cardinal_cone || le || 1.0869350186e-10
bNF_Cardinal_cfinite || reflexive || 8.78158375547e-11
bit1 || denominator || 7.90213211906e-11
bit1 || numerator || 7.90213211906e-11
list_ex1 || in_list || 7.78731895598e-11
gen_length || append || 7.24166681133e-11
bNF_Cardinal_cone || lt || 6.31265862523e-11
list_ex || in_list || 6.13693760775e-11
splice || append || 5.94606042034e-11
bit0 || denominator || 5.94419149922e-11
bit0 || numerator || 5.94419149922e-11
null || lt || 5.85502365979e-11
bNF_Cardinal_cone || eqb || 5.28690561982e-11
listMem || make_compatibility_goal || 3.54602386643e-11
append || append || 3.27236435557e-11
induct_true || R0 || 1.49271865295e-11
cons || Function || 1.21743640184e-11
bNF_Cardinal_cone || same_atom || 9.8071123886e-12
induct_true || Q0 || 6.40710817335e-12
product_unit || Formula || 6.3072650529e-12
bNF_Cardinal_cfinite || transitiveb || 1.7781476764e-12
none || eq || 8.99223628693e-13
c_Predicate_Oeq || leq || 7.3462781464e-13
is_none || symmetric0 || 6.48225419431e-13
is_none || reflexive || 4.76637754949e-13
one2 || Z1 || 3.44198021967e-13
is_none || transitive || 3.40088032715e-13
bot_bot || e || 3.27923524166e-13
semilattice || Morphism_Theory || 3.16159303808e-13
nat3 || increasing || 2.42732269521e-13
set || PreMonoid_OF_Group || 2.20193068181e-13
zero_Rep || nth_prime || 2.152447552e-13
bit1 || Z2 || 2.14556491274e-13
semilattice_axioms || function_type_of_morphism_signature || 1.98245928671e-13
image || image || 1.84799133082e-13
filtermap || image || 1.80513789126e-13
bit0 || Z3 || 1.76053393683e-13
filter || PreMonoid_OF_Group || 1.56631641292e-13
image2 || image || 1.20359629851e-13
pow || Zplus || 1.1611526155e-13
bit1 || Z3 || 1.02747278095e-13
abel_semigroup || function_type_of_morphism_signature || 1.01275799466e-13
lattic35693393ce_set || function_type_of_morphism_signature || 9.18175115836e-14
bit0 || Z2 || 8.131429455e-14
sqr || pred || 6.00851178708e-14
pow || minus || 5.99402977554e-14
zero_Rep || nat_fact_all1 || 3.71765095127e-14
bit0 || nat2 || 3.13603620224e-14
suc_Rep || denominator || 1.72358684578e-14
suc_Rep || numerator || 1.72358684578e-14
code_nat_of_integer || numerator || 1.15728826248e-14
nat3 || not_nf || 1.04495566754e-14
code_integer_of_int || nat_fact_to_fraction || 8.86910150391e-15
rep_Nat || negate || 7.08175887874e-15
rep_Nat || elim_not || 7.08175887874e-15
nat2 || nat_fact_all3 || 6.42194859342e-15
one2 || nat1 || 4.44071153257e-15
pos || nat_fact_to_fraction || 3.39025875642e-15
holds || factorize || 3.33374426364e-15
induct_implies || times || 3.32026028482e-15
abel_semigroup || Morphism_Theory || 3.15209111085e-15
nat_of_num || nat_fact_all3 || 3.06358869195e-15
if_pred || defactorize || 2.84627026862e-15
abel_s1917375468axioms || function_type_of_morphism_signature || 2.83477289606e-15
if_pred || factorize || 2.80273707058e-15
holds || defactorize || 2.74731167247e-15
nat2 || numerator || 2.32182192321e-15
induct_conj || minus || 2.01394429717e-15
induct_conj || plus || 1.74492089021e-15
induct_implies || Ztimes || 1.51181217315e-15
semigroup || function_type_of_morphism_signature || 1.43559914866e-15
induct_conj || Zplus || 1.17623432027e-15
left || bool2 || 1.08961803734e-15
right || bool1 || 9.69333744959e-16
nil || eq || 7.0562881928e-16
bit1 || nat2 || 6.48454049918e-16
null || symmetric0 || 4.04816176813e-16
inc || numerator || 3.78641466966e-16
null || reflexive || 2.92525381929e-16
bit1 || nat_fact_all3 || 2.38681314964e-16
bit0 || nat_fact_to_fraction || 2.14701312941e-16
null || transitive || 2.03755353778e-16
equiv_equivp || Morphism_Theory || 1.68168243308e-16
code_natural_of_nat || factorize || 1.6558963785e-16
distinct || symmetric0 || 1.53778985114e-16
code_nat_of_natural || defactorize || 1.48416659932e-16
code_nat_of_natural || factorize || 1.47991915666e-16
code_natural_of_nat || defactorize || 1.47108458573e-16
empty || eq || 1.35253377334e-16
distinct || reflexive || 1.3197350999e-16
semilattice || monomorphism || 1.1755881902e-16
distinct || transitive || 1.09247936396e-16
equiv_part_equivp || function_type_of_morphism_signature || 9.4615056383e-17
null2 || symmetric0 || 7.33881975281e-17
reflp || function_type_of_morphism_signature || 7.31757232785e-17
bit1 || fraction1 || 6.76103560335e-17
semilattice_axioms || morphism || 6.31903889316e-17
bit0 || fraction2 || 5.46793113216e-17
null2 || reflexive || 5.43720237124e-17
null2 || transitive || 3.8861567073e-17
abel_semigroup || morphism || 3.81945808496e-17
lattic35693393ce_set || morphism || 3.54578108387e-17
code_integer_of_int || factorize || 3.28444523347e-17
code_int_of_integer || factorize || 2.97965012036e-17
code_int_of_integer || defactorize || 2.97150738771e-17
code_integer_of_int || defactorize || 2.95696733708e-17
finite_psubset || A || 9.52201422412e-18
monoid || A\ || 7.08024191879e-18
semilattice_neutr || A\ || 7.03374626239e-18
trans || le || 4.55836405387e-18
set || B || 4.05012388426e-18
bNF_Wellorder_wo_rel || Morphism_Theory || 3.57838611413e-18
groups_monoid_list || A || 3.51284340425e-18
lattic1543629303tr_set || A || 3.25220401564e-18
holds || Zpred || 2.97869311781e-18
if_pred || Zsucc || 2.53357464854e-18
if_pred || Zpred || 2.51864675123e-18
holds || Zsucc || 2.38820289403e-18
antisym || function_type_of_morphism_signature || 2.35832460904e-18
wf || le || 1.98363413615e-18
trans || function_type_of_morphism_signature || 1.79146481032e-18
code_natural_of_nat || Zpred || 1.61796236634e-18
id2 || fact || 1.47690446668e-18
code_nat_of_natural || Zpred || 1.4550352494e-18
code_nat_of_natural || Zsucc || 1.44263634263e-18
code_natural_of_nat || Zsucc || 1.41183926575e-18
pow || Qtimes0 || 1.17587056599e-18
code_natural_of_nat || numeratorQ || 1.03399940953e-18
id2 || nat2 || 9.79645723933e-19
pow || Qplus || 9.34191704581e-19
rep_Nat || premonoid || 9.03784680381e-19
bNF_Wellorder_wo_rel || lt || 8.52493147143e-19
insert3 || Function || 8.0374936875e-19
code_nat_of_natural || nat_fact_all_to_Q || 7.56528718324e-19
abel_semigroup || monomorphism || 7.29872845489e-19
antisym || le || 7.07028852085e-19
rep_Nat || magma || 6.88508321833e-19
member3 || make_compatibility_goal || 6.32373396869e-19
monoid || B1 || 6.2433297197e-19
abel_s1917375468axioms || morphism || 5.70319086633e-19
nat3 || isMonoid || 5.49107403904e-19
semilattice_neutr || B1 || 5.35240521699e-19
semilattice || A\ || 5.34358317716e-19
one2 || Q10 || 5.03635858344e-19
nat3 || sorted_gt || 4.54375618482e-19
rep_Nat || sieve || 4.49865409276e-19
code_integer_of_int || Zpred || 4.26865555764e-19
sym || le || 4.1346251875e-19
comm_monoid || A\ || 4.10596136021e-19
nat3 || isSemiGroup || 4.03998814702e-19
groups_monoid_list || B || 4.01852573181e-19
code_int_of_integer || Zpred || 3.89051071969e-19
one2 || QO || 3.85554107895e-19
code_int_of_integer || Zsucc || 3.83772804981e-19
code_integer_of_int || Zsucc || 3.77513605701e-19
semigroup || morphism || 3.42112706904e-19
lattic1543629303tr_set || B || 3.21075289885e-19
holds || numeratorQ || 3.01514538753e-19
lattic35693393ce_set || A || 2.62069108039e-19
if_pred || nat_fact_all_to_Q || 1.90681556352e-19
if_pred || numeratorQ || 1.82810200113e-19
groups828474808id_set || A || 1.76502192779e-19
code_integer_of_int || numeratorQ || 1.52906478837e-19
holds || nat_fact_all_to_Q || 1.34795186053e-19
code_int_of_integer || nat_fact_all_to_Q || 1.14690021218e-19
pow || Qtimes || 1.09846694992e-19
equiv_equivp || monomorphism || 8.55248026842e-20
one2 || Qone || 5.9667841021e-20
semilattice || B1 || 5.39994633951e-20
equiv_part_equivp || morphism || 4.67480173644e-20
reflp || morphism || 3.85082194146e-20
is_none || le || 3.62728054086e-20
lattic35693393ce_set || B || 3.36020742654e-20
comm_monoid || B1 || 3.27297432956e-20
uminus_uminus || inv || 3.01332286167e-20
set || pregroup || 2.58907477742e-20
nat3 || decT || 2.27814543245e-20
char_of_nat || numeratorQ || 1.96360268231e-20
groups828474808id_set || B || 1.78256276384e-20
none || fact || 1.76292567187e-20
rep_Nat || sort || 1.6495816262e-20
none || nat2 || 1.28297288516e-20
code_n1042895779nteger || numeratorQ || 1.25694020549e-20
semilattice || function_type_of_morphism_signature || 1.15762776714e-20
lattic35693393ce_set || Morphism_Theory || 1.10407489944e-20
nat_of_char || nat_fact_all_to_Q || 1.10250593103e-20
pow || Ztimes || 9.98393867795e-21
pow || rtimes || 8.94064280558e-21
product_Abs_unit || numeratorQ || 8.24996749369e-21
code_i1730018169atural || nat_fact_all_to_Q || 8.0222720481e-21
nat3 || carrier || 6.67704826447e-21
rep_Nat || magma0 || 6.58278249316e-21
abs_real || numeratorQ || 5.95074542075e-21
abs_rat || numeratorQ || 5.95074542075e-21
abs_int || numeratorQ || 5.95074542075e-21
product_Rep_unit || nat_fact_all_to_Q || 5.78123577689e-21
one2 || Zone || 5.57317483028e-21
bNF_Wellorder_wo_rel || monomorphism || 4.50683176485e-21
one2 || ratio1 || 4.20621421978e-21
rep_real || nat_fact_all_to_Q || 4.01311745657e-21
rep_rat || nat_fact_all_to_Q || 4.01311745657e-21
rep_int || nat_fact_all_to_Q || 4.01311745657e-21
antisym || morphism || 2.77610117213e-21
transitive_acyclic || function_type_of_morphism_signature || 2.44989217732e-21
trans || morphism || 2.25993821829e-21
nat3 || isGroup || 1.93420859714e-21
rep_Nat || pregroup || 1.79074375054e-21
wf || Morphism_Theory || 1.57364414897e-21
code_nat_of_integer || numeratorQ || 1.09409850011e-21
code_integer_of_nat || nat_fact_all_to_Q || 7.56991789034e-22
abs_Nat || numeratorQ || 6.82734386347e-22
rep_Nat || nat_fact_all_to_Q || 4.89515434602e-22
nat3 || decidable || 2.4868876746e-22
rep_Nat || prime || 1.9630277289e-22
char_of_nat || factorize || 6.33996695812e-23
id2 || nth_prime || 5.5798358475e-23
code_n1042895779nteger || factorize || 5.40344595005e-23
nat_of_char || defactorize || 4.805796344e-23
code_i1730018169atural || defactorize || 4.59036372146e-23
product_Rep_unit || factorize || 4.44139100711e-23
product_Abs_unit || factorize || 4.44139100711e-23
code_n1042895779nteger || defactorize || 4.40980532698e-23
code_i1730018169atural || factorize || 4.40980532698e-23
char_of_nat || defactorize || 4.37012083557e-23
product_Rep_unit || defactorize || 4.09442741799e-23
product_Abs_unit || defactorize || 4.09442741799e-23
nat_of_char || factorize || 3.89765100628e-23
abs_real || factorize || 3.10191878112e-23
abs_rat || factorize || 3.10191878112e-23
abs_int || factorize || 3.10191878112e-23
rep_real || factorize || 2.827960244e-23
rep_rat || factorize || 2.827960244e-23
rep_int || factorize || 2.827960244e-23
rep_real || defactorize || 2.75809813789e-23
rep_rat || defactorize || 2.75809813789e-23
rep_int || defactorize || 2.75809813789e-23
abs_real || defactorize || 2.7089775884e-23
abs_rat || defactorize || 2.7089775884e-23
abs_int || defactorize || 2.7089775884e-23
rep_Nat || nth_prime || 2.49105807793e-23
num_of_nat || numeratorQ || 2.4132609577e-23
nat3 || prime || 2.08503730045e-23
bit1 || fraction2 || 1.79637905424e-23
nat_of_num || nat_fact_all_to_Q || 1.63791299321e-23
antisym || lt || 1.46764322464e-23
sym || lt || 1.45877266087e-23
bit0 || fraction1 || 1.45280657167e-23
semilattice || lt || 1.40336804301e-23
trans || lt || 1.34836615264e-23
explode || nat_fact_all_to_Q || 8.06274886402e-24
implode str || numeratorQ || 7.79774258018e-24
code_nat_of_integer || factorize || 7.40658407909e-24
code_integer_of_nat || factorize || 6.91660583828e-24
code_integer_of_nat || defactorize || 6.67264960016e-24
code_nat_of_integer || defactorize || 6.58984505842e-24
semilattice || morphism || 6.463063248e-24
lattic35693393ce_set || monomorphism || 6.23628912406e-24
semilattice_axioms || le || 6.12975473982e-24
none || nth_prime || 6.02191306684e-24
is_none || lt || 5.89014892968e-24
rep_Nat || factorize || 5.25387869394e-24
abs_Nat || factorize || 5.25387869394e-24
rep_Nat || defactorize || 4.87163336467e-24
abs_Nat || defactorize || 4.87163336467e-24
abel_semigroup || le || 4.82839972617e-24
lattic35693393ce_set || le || 4.64182045871e-24
cnj || rinv || 4.42696538492e-24
nibble_of_nat || numeratorQ || 3.43407231479e-24
nat_of_nibble || nat_fact_all_to_Q || 2.56823540433e-24
transitive_acyclic || morphism || 1.76855511464e-24
wf || monomorphism || 1.26244002173e-24
cnj || opposite_direction || 7.54961108912e-25
null || le || 7.20513171323e-25
nil || fact || 4.91252037967e-25
explode || factorize || 3.96524065299e-25
distinct || le || 3.5791011825e-25
nil || nat2 || 3.44314505218e-25
implode str || defactorize || 2.78907435509e-25
num_of_nat || factorize || 2.61915167211e-25
explode || defactorize || 2.54154247168e-25
cnj || finv || 2.32257727971e-25
nat_of_num || defactorize || 2.26388286728e-25
num_of_nat || defactorize || 2.20538712637e-25
nat_of_num || factorize || 2.180422767e-25
implode str || factorize || 2.0453588611e-25
code_nat_of_natural || numeratorQ || 1.88075994974e-25
code_natural_of_nat || nat_fact_all_to_Q || 1.5504197551e-25
cnj || Qinv || 9.68463695915e-26
char_of_nat || Zpred || 9.57885630884e-26
code_n1042895779nteger || Zpred || 8.39138327853e-26
null2 || le || 8.31194454263e-26
nat_of_char || Zsucc || 7.44174690036e-26
code_i1730018169atural || Zsucc || 7.13193698192e-26
product_Rep_unit || Zpred || 7.10241298471e-26
product_Abs_unit || Zpred || 7.10241298471e-26
code_i1730018169atural || Zpred || 6.93211426523e-26
code_n1042895779nteger || Zsucc || 6.69823636252e-26
product_Rep_unit || Zsucc || 6.43802968219e-26
product_Abs_unit || Zsucc || 6.43802968219e-26
char_of_nat || Zsucc || 6.40555989342e-26
nat_of_char || Zpred || 6.05831973405e-26
nibble_of_nat || factorize || 5.78509467119e-26
nat_of_nibble || factorize || 5.66249758133e-26
abs_real || Zpred || 5.38322229646e-26
abs_rat || Zpred || 5.38322229646e-26
abs_int || Zpred || 5.38322229646e-26
nat_of_nibble || defactorize || 5.37844744949e-26
nibble_of_nat || defactorize || 5.36433565246e-26
empty || fact || 5.03982032254e-26
rep_real || Zpred || 4.93634623528e-26
rep_rat || Zpred || 4.93634623528e-26
rep_int || Zpred || 4.93634623528e-26
rep_real || Zsucc || 4.74466069575e-26
rep_rat || Zsucc || 4.74466069575e-26
rep_int || Zsucc || 4.74466069575e-26
abel_semigroup || lt || 4.6150416643e-26
abs_real || Zsucc || 4.61358748128e-26
abs_rat || Zsucc || 4.61358748128e-26
abs_int || Zsucc || 4.61358748128e-26
empty || nat2 || 3.32339274882e-26
abel_s1917375468axioms || le || 2.97966736655e-26
code_int_of_integer || numeratorQ || 2.91154510815e-26
code_integer_of_int || nat_fact_all_to_Q || 2.42807700509e-26
semigroup || le || 2.34159042459e-26
code_nat_of_integer || Zpred || 1.7322805527e-26
equiv_equivp || lt || 1.6893440793e-26
code_integer_of_nat || Zpred || 1.62522472242e-26
code_integer_of_nat || Zsucc || 1.54458005927e-26
code_nat_of_integer || Zsucc || 1.51460773846e-26
rep_Nat || Zpred || 1.31399897154e-26
abs_Nat || Zpred || 1.31399897154e-26
rep_Nat || Zsucc || 1.19891704668e-26
abs_Nat || Zsucc || 1.19891704668e-26
equiv_part_equivp || le || 9.21636701967e-27
reflp || le || 8.31924332393e-27
cnj || Zopp || 7.78313014233e-27
suc_Rep || Z3 || 3.08921358252e-27
suc_Rep || Z2 || 1.77010732265e-27
explode || Zpred || 1.66738376855e-27
implode str || Zsucc || 1.22204742003e-27
num_of_nat || Zpred || 1.21480197e-27
nat_of_num || Zsucc || 1.05033830798e-27
explode || Zsucc || 1.03898936726e-27
nat_of_num || Zpred || 1.0240860051e-27
num_of_nat || Zsucc || 1.00414320555e-27
implode str || Zpred || 8.98597199677e-28
nibble_of_nat || Zpred || 3.58072266137e-28
nat_of_nibble || Zpred || 3.5097362263e-28
nat_of_nibble || Zsucc || 3.28512219618e-28
nibble_of_nat || Zsucc || 3.26915687067e-28
empty || nth_prime || 5.42488766322e-29
null2 || lt || 4.27104064897e-29
quotient_of || Z3 || 3.9156583903e-29
quotient_of || Z2 || 2.46926464582e-29
code_nat_of_natural || Z3 || 5.91394853674e-30
code_nat_of_natural || Z2 || 3.86978678176e-30
code_int_of_integer || Z3 || 1.83510973395e-30
semilattice || le || 1.78152739616e-30
lattic35693393ce_set || lt || 1.68062935495e-30
code_int_of_integer || Z2 || 1.226918446e-30
suc_Rep || nat2 || 1.49527373711e-31
quotient_of || nat2 || 8.24942024627e-33
suc || Z3 || 5.66712870265e-33
suc || Z2 || 4.15398244741e-33
code_nat_of_natural || nat2 || 2.2314166045e-33
code_int_of_integer || nat2 || 9.77169164383e-34
