nat || nat || 0.313159322679
$true || $true || 0.290456457767
$ (=> (pred $V_$true) $o) || $ (=> (powerset $V_$true) $true) || 0.220649695615
$ ((product_prod $V_$true) $V_$true) || $ ((Prod $V_$true) $V_$true) || 0.20348829255
product_snd || snd || 0.145133289853
product_Pair || Prod1 || 0.14071391381
$ (=> (pred $V_$true) $o) || $ (=> (powerset $V_$true) $o) || 0.137929009333
product_fst || fst || 0.128914269586
$ (=> ((product_prod $V_$true) $V_$true) $o) || $ (=> ((Prod $V_$true) $V_$true) $true) || 0.128375522974
pred3 || powerset1 || 0.119819658276
nil || list1 || 0.110916518761
id2 || eq || 0.109664522054
$ $V_$true || $ $V_$true || 0.108026392691
nat || Z || 0.101800681524
$ (pred $V_$true) || $ (powerset $V_$true) || 0.0918770563374
c_Predicate_Oeq || incl || 0.0899336180997
trans || transitive || 0.0813083119774
trans || associative || 0.080502162854
code_natural || fraction || 0.0801667355602
$ (=> ((product_prod $V_$true) $V_$true) $o) || $ (=> ((Prod $V_$true) $V_$true) $o) || 0.0773463517046
trans || symmetric || 0.0732702945185
$ (list $V_$true) || $ (list $V_$true) || 0.0724150507325
$ (=> $V_$true $o) || $ (=> $V_$true powerset.ind) || 0.0699426872684
wf || associative || 0.0687166990007
code_natural || Z || 0.0660493734977
wf || symmetric || 0.0615073049992
wf || transitive || 0.0568893570615
none || eq || 0.0568585639056
code_pcr_natural code_cr_natural || fraction2 || 0.0533995615638
code_pcr_natural code_cr_natural || fraction1 || 0.0533995615638
append || append || 0.0523222186524
antisym || transitive || 0.0488017725159
bNF_Ca1495478003natLeq || divides || 0.047014149736
code_natural || times || 0.0467800609686
cons || list2 || 0.0462973729528
empty || list1 || 0.0460590429079
code_natural || le || 0.0456177794386
nil || eq || 0.0448093227435
topological_subseq || increasing || 0.0429297198689
code_pcr_natural code_cr_natural || Z3 || 0.0424430519678
code_pcr_natural code_cr_natural || Z2 || 0.0415322068337
bNF_Ca1495478003natLeq || Zlt || 0.0407907505097
code_pcr_natural code_cr_natural || sqrt || 0.0394470460968
empty || eq || 0.0383290969723
is_none || symmetric0 || 0.0381626106116
list_ex1 || in_list || 0.038120800539
order_strict_mono || injective || 0.0380912187945
code_pcr_natural code_cr_natural || A || 0.0373685626423
left_unique || injective || 0.0370622070072
left_total || injective || 0.0366440810573
right_unique || injective || 0.0364479738609
trans || antisymmetric || 0.0363361399433
bNF_Ca1495478003natLeq || gcd || 0.0361747244044
nat || bool || 0.0359434605059
less_than || divides || 0.0356968103903
finite_psubset || append || 0.035660727918
gen_length || append || 0.0345891471906
right_total || injective || 0.0344559177932
splice || append || 0.0338214690934
bi_total || injective || 0.0336702735265
antisym || symmetric || 0.0335476199691
less_than || Zlt || 0.0333177684777
code_pcr_natural code_cr_natural || minus || 0.033030433681
bi_unique || injective || 0.0326776562905
$ (=> $V_$true $o) || $ $V_$true || 0.0326399445866
list_ex || in_list || 0.0318501820459
bNF_Ca1495478003natLeq || plus || 0.0313755519343
bNF_Ca829732799finite || transitive || 0.0313549260038
is_none || reflexive || 0.0312152547913
int || nat || 0.0308512200639
code_pcr_natural code_cr_natural || plus || 0.0308242254995
antisym || associative || 0.0306122561787
bNF_Ca829732799finite || symmetric || 0.0300629208532
wf || antisymmetric || 0.0299935286277
left_unique || distributive || 0.0295491626117
less_than || gcd || 0.029366233451
left_total || distributive || 0.0291220585488
order_mono || injective || 0.0290207565359
right_unique || distributive || 0.0289226282541
trans || reflexive || 0.0288315324075
bNF_Ca1495478003natLeq || times || 0.0281247389604
bNF_Ca1495478003natLeq || Zle || 0.0276991264464
bNF_Ca829732799finite || associative || 0.0276777031513
nat || R0 || 0.027563367522
bNF_Ca1495478003natLeq || le || 0.0273431208482
right_total || distributive || 0.0269285977936
nat || Q0 || 0.026636696335
bi_total || distributive || 0.0261578844427
bi_unique || distributive || 0.0251966254752
less_than || Zle || 0.0250496767445
less_than || plus || 0.0250143854631
$ (=> nat nat) || $ (=> nat nat) || 0.0247329471516
is_none || transitive || 0.0244542692601
antisym || reflexive || 0.0237811465823
insert2 || list2 || 0.0227566721321
null || symmetric0 || 0.0223829181911
less_than || times || 0.022151680596
insert3 || list2 || 0.0215119746444
antisym || antisymmetric || 0.0208578189143
less_than || le || 0.020788363138
null2 || symmetric0 || 0.019596255131
$ (pred $V_$true) || $ (list $V_$true) || 0.0188457694568
member3 || in_list || 0.0187097236551
pred_nat || divides || 0.0185737853263
join || list2 || 0.0185334859846
$ (set $V_$true) || $ (list $V_$true) || 0.0184424249199
bNF_Ca829732799finite || antisymmetric || 0.0180356724469
bNF_Ca1495478003natLeq || eqb || 0.0179655917048
null || reflexive || 0.0178479288154
trans || symmetricb || 0.0177840633809
bNF_Ca1495478003natLeq || Ztimes || 0.0175334589775
$ (seq $V_$true) || $ (list $V_$true) || 0.0174285806717
antisym || symmetric0 || 0.0170380041968
sym || symmetric0 || 0.0168462266856
pred_nat || Zlt || 0.0168117143813
null2 || reflexive || 0.0158634275374
less_than || Ztimes || 0.0157430695277
code_integer || fraction || 0.0157328857611
pred_nat || gcd || 0.0157120210507
left_unique || monotonic || 0.0156622623584
bNF_Ca1495478003natLeq || Zplus || 0.0156051722025
set || list || 0.0155788363059
left_total || monotonic || 0.015490753893
right_unique || monotonic || 0.0154102775945
trans || irreflexive || 0.0150503865693
wf || symmetricb || 0.0148663819214
trans || symmetric0 || 0.0145950522704
right_total || monotonic || 0.0145914876961
sym || reflexive || 0.0143034810016
bi_total || monotonic || 0.0142679099439
less_than || eqb || 0.0141717196081
$ $V_$true || $ (list $V_$true) || 0.0140450684224
bi_unique || monotonic || 0.0138585564672
less_than || Zplus || 0.0137886110714
code_pcr_natural code_cr_natural || Zplus || 0.0135601029265
null || transitive || 0.0135378527421
$ nat || $ (list $V_$true) || 0.013436213131
less_than || Rplus || 0.0133870212923
bNF_Ca1495478003natLeq || lt || 0.0133371119996
pred_nat || Zle || 0.0132204599125
pred_nat || plus || 0.0132160581695
$ (pred $V_$true) || $ $V_$true || 0.0131365621311
wf || reflexive || 0.0130546921122
code_integer || Z || 0.0128496092914
less_than || Rmult || 0.0125654577167
bNF_Ca1495478003natLeq || Rplus || 0.0123474680581
null2 || transitive || 0.0122638422719
code_natural || Ztimes || 0.0120812940877
less_than || Qplus || 0.0118489446727
less_than || Qtimes0 || 0.0118489446727
less_than || orb || 0.0117015579517
bNF_Ca1495478003natLeq || Rmult || 0.01169845962
wf || irreflexive || 0.0116854234206
sym || transitive || 0.0116842765475
pred_nat || times || 0.0116062970369
nat || Q || 0.0114564040451
bNF_Ca1495478003natLeq || orb || 0.0114263914965
bNF_Ca1495478003natLeq || Qplus || 0.0110749295539
bNF_Ca1495478003natLeq || Qtimes0 || 0.0110749295539
pred_nat || le || 0.0108146554461
suc || nth_prime || 0.0107787586927
distinct || symmetric0 || 0.010755475165
nat || ratio || 0.0104008839475
less_than || lt || 0.0102416170923
code_pcr_integer code_cr_integer || fraction2 || 0.010111723519
code_pcr_integer code_cr_integer || fraction1 || 0.010111723519
antisym || symmetricb || 0.0100403016349
distinct || reflexive || 0.00944733112383
suc || nat2 || 0.00943533801095
code_pcr_natural code_cr_natural || Rplus || 0.00926478674173
bNF_Ca829732799finite || symmetricb || 0.00866741599265
antisym || irreflexive || 0.00865951451714
code_pcr_natural code_cr_natural || orb || 0.00865705387504
bNF_Ca1495478003natLeq || andb || 0.00851417560394
less_than || Qtimes || 0.00845058522743
less_than || andb || 0.00836043514818
pred_nat || Ztimes || 0.00829287881413
code_pcr_natural code_cr_natural || Qplus || 0.00827420990072
code_integer || times || 0.00818104152313
distinct || transitive || 0.00801681036143
code_pcr_integer code_cr_integer || Z3 || 0.0080147517476
bNF_Ca829732799finite || reflexive || 0.00788494777601
code_pcr_integer code_cr_integer || Z2 || 0.00784402394891
pred_nat || eqb || 0.00783379412082
less_than || rtimes || 0.00782805504515
bNF_Ca1495478003natLeq || Qtimes || 0.00757626761483
bNF_Ca829732799finite || irreflexive || 0.0074733756307
pred_nat || Zplus || 0.00718775658549
pred_nat || Rplus || 0.00706249263055
bNF_Ca1495478003natLeq || rtimes || 0.0070365672099
code_natural || Rmult || 0.00675717138941
code_natural || orb || 0.00669505742738
code_pcr_natural code_cr_natural || andb || 0.00663407388807
pred_nat || Rmult || 0.00659570838281
code_integer || le || 0.00648309014694
code_natural || Qtimes0 || 0.00636223373721
code_pcr_natural code_cr_natural || defactorize || 0.00626478008375
pred_nat || Qplus || 0.00619049658733
pred_nat || Qtimes0 || 0.00619049658733
code_natural || ratio || 0.00611598190936
pred_nat || orb || 0.00609894682028
code_pcr_integer code_cr_integer || defactorize || 0.00590045312721
code_integer || ratio || 0.00582695218449
code_pcr_integer code_cr_integer || minus || 0.00564490874039
code_natural || andb || 0.00551051052133
code_pcr_integer code_cr_integer || sqrt || 0.00546552737392
pred_nat || lt || 0.00529425165284
code_pcr_integer code_cr_integer || plus || 0.00527113079315
int || bool || 0.00518436404111
code_pcr_integer code_cr_integer || A || 0.00518007056616
code_pcr_natural code_cr_natural || ratio2 || 0.00513309376451
code_pcr_integer code_cr_integer || ratio2 || 0.00487450407461
code_pcr_integer code_cr_integer || Rplus || 0.00470362627567
pred_nat || Qtimes || 0.00429855304072
code_pcr_integer code_cr_integer || Qplus || 0.00428522553661
int || fraction || 0.00427634991428
pred_nat || andb || 0.00424436647117
int || nat_fact_all || 0.00422528085359
code_pcr_integer code_cr_integer || orb || 0.00421472297288
pred_nat || rtimes || 0.00395755456424
nat || fraction || 0.00387225108719
nat || nat_fact_all || 0.00371453916567
$ (=> (pred $V_$true) $o) || $ (=> (subset $V_setoid) $true) || 0.00363890822363
code_integer || Rmult || 0.00348318614881
code_integer || Qtimes0 || 0.00333599686688
code_integer || orb || 0.0032992869634
code_pcr_integer code_cr_integer || andb || 0.00326827410055
code_natural || nat || 0.00300634970753
code_pcr_integer code_cr_integer || Zplus || 0.00300148946131
code_integer || nat || 0.00292176472395
code_integer || andb || 0.00273095520596
code_integer || Ztimes || 0.00268478693372
int || R0 || 0.00247109976075
int || Q0 || 0.00239409130063
suc || notb || 0.00228592686922
$ (=> product_unit $o) || $ (=> unit $true) || 0.00220737179151
int || Z || 0.0021719014528
$ num || $ nat || 0.00196157812048
$ (=> (pred $V_$true) $o) || $ (=> (subset $V_setoid) $o) || 0.00178073519973
code_pcr_natural code_cr_natural || ftimes || 0.00168167812841
pred3 || subset1 || 0.00167954090359
code_pcr_integer code_cr_integer || ftimes || 0.00157732793029
one2 || Z1 || 0.00143089948963
$ nat || $ nat || 0.00133463398082
$ product_unit || $ unit || 0.0013163893835
$ (pred $V_$true) || $ (subset $V_setoid) || 0.00124877429652
product_Unity || unit1 || 0.00124638293518
nat || Formula || 0.00117937765051
less_than || same_atom || 0.00110458546435
$ (=> product_unit $o) || $ (=> unit $o) || 0.00109487439645
bNF_Ca1495478003natLeq || same_atom || 0.00108477898271
finite_psubset || eq0 || 0.00100575810184
$ (=> $V_$true $o) || $ (carr1 ((function_space_setoid1 (setoid1_of_setoid $V_setoid)) CCProp)) || 0.0008350443719
$true || $ setoid || 0.000813692876246
bit1 || Z2 || 0.000760611552722
im || denom || 0.000711213253566
re || num || 0.000700413330808
pred_nat || same_atom || 0.000560898807833
pow || minus || 0.000540026846567
complex2 || frac || 0.000529579523114
bit0 || Z3 || 0.0005249759107
$ complex || $ Q0 || 0.000496627926443
bit1 || Z3 || 0.000448232132383
left_unique || symmetric2 || 0.000425283936563
left_total || symmetric2 || 0.000420536816833
right_unique || symmetric2 || 0.000418309972428
one2 || nat1 || 0.000415215354496
right_total || symmetric2 || 0.000395676648439
bit0 || nat2 || 0.000389059114334
bi_total || symmetric2 || 0.000386744070794
bi_unique || symmetric2 || 0.00037545345228
sqr || pred || 0.000366922656327
nat || nat1 || 0.000362151247429
bit0 || Z2 || 0.000361376422489
set || carr || 0.000310874571886
one_one || nat2 || 0.000279557861333
bit1 || fraction1 || 0.000271605364231
sqr || Zopp || 0.000249472839273
bit0 || fraction2 || 0.000219669983279
bitM || Zopp || 0.000214244500464
inc || Z_of_nat || 0.000184970668147
binomial || bc || 0.000182535449766
zero_zero || nat2 || 0.000159553142231
bit1 || nat2 || 0.000151475681195
trans || symmetric1 || 0.000145226247031
trans || reflexive0 || 0.000145226247031
trans || transitive0 || 0.000145226247031
pow || plus || 0.000137529877675
upt || moebius_aux || 0.000136019222727
binomial || moebius_aux || 0.00012957791374
wf || symmetric1 || 0.000120822036259
wf || reflexive0 || 0.000120822036259
wf || transitive0 || 0.000120822036259
bit1 || fraction2 || 0.000120703850911
trans || transitiveb || 0.000118133429861
pow || Zplus || 0.000106287198729
nat_of_num || Z2 || 0.00010438838321
nat3 || sorted_gt || 9.95068867476e-05
rep_Nat || sieve || 9.85192618767e-05
bit0 || fraction1 || 9.76204859368e-05
wf || transitiveb || 8.92021998457e-05
nat2 || Z_of_nat || 8.60181609646e-05
num_of_nat || defactorize || 8.48245456521e-05
binomial || div || 8.4488949147e-05
nat_of_num || factorize || 8.38644362796e-05
binomial || exp || 8.1139027438e-05
nat3 || decidable || 7.48151273017e-05
binomial || times || 7.45753493357e-05
nil || Z2 || 7.3561069406e-05
finite_psubset || eq10 || 7.08076153047e-05
pos || nat2 || 6.91651168181e-05
antisym || transitiveb || 6.69689006683e-05
rep_Nat || nth_prime || 6.50309238361e-05
one_one || Z2 || 6.46949710556e-05
rep_Nat || prime || 5.90563399822e-05
bNF_Ca829732799finite || transitiveb || 5.79593195165e-05
$ num || $ Z || 5.64307580102e-05
code_integer_of_nat || factorize || 5.52343836486e-05
rep_Nat || factorize || 5.51756307552e-05
nat3 || prime || 5.44320264149e-05
num_of_nat || pred || 5.35803696265e-05
code_nat_of_integer || defactorize || 5.26250864156e-05
abs_Nat || defactorize || 5.11615395769e-05
root || Fmult || 5.01704748147e-05
code_natural_of_nat || factorize || 4.58832362704e-05
code_nat_of_natural || defactorize || 4.11249711456e-05
suc || costante || 3.83607979187e-05
$ real || $ (=> R0 R0) || 3.83127422775e-05
nat_of_num || nat2 || 3.73078510229e-05
real || nat1 || 3.63790911781e-05
suc || Z3 || 3.45935715393e-05
suc || Z2 || 3.40953252841e-05
code_nat_of_integer || pred || 3.18366360019e-05
abs_Nat || pred || 3.12572765953e-05
code_nat_of_natural || pred || 2.48201633008e-05
log2 || moebius_aux || 2.40569464466e-05
complex || nat1 || 2.35035334971e-05
csqrt || A || 2.29834658301e-05
suc || derivative || 2.22724605692e-05
code_integer_of_nat || nat2 || 2.21984883241e-05
rep_Nat || nat2 || 2.21890060467e-05
set || carr1 || 2.06131945218e-05
one_one || costante || 1.938052766e-05
code_natural_of_nat || nat2 || 1.92062232864e-05
cnj || A || 1.88618160428e-05
zero_zero || monomio || 1.86628929866e-05
sqrt || A || 1.84057669981e-05
$true || $ setoid10 || 1.7390194139e-05
positive2 || prime || 1.56652696357e-05
positive || prime || 1.35069325261e-05
zero_zero || Z2 || 1.08558034209e-05
induct_true || False || 1.0650476572e-05
trans || transitive1 || 9.07377059231e-06
trans || symmetric10 || 9.07377059231e-06
trans || reflexive1 || 9.07377059231e-06
$ real || $ nat || 8.90152479009e-06
dup || A || 8.73397309942e-06
arcsin || A || 8.44404064373e-06
$ (=> ((product_prod $V_$true) $V_$true) $o) || $ (=> ((And0 $V_And.ind) $V_And.ind) $true) || 8.13755858746e-06
$ (=> ((product_prod $V_$true) $V_$true) $o) || $ (=> ((And2 $V_And.ind1) $V_And.ind1) $true) || 8.13755858746e-06
code_dup || A || 8.03527486722e-06
arctan || A || 7.76712084637e-06
wf || transitive1 || 7.53087540292e-06
wf || symmetric10 || 7.53087540292e-06
wf || reflexive1 || 7.53087540292e-06
rat || nat1 || 7.293954619e-06
$ (=> ((product_prod $V_$true) $V_$true) $o) || $ (=> ((iff0 $V_iff.ind) $V_iff.ind) $true) || 7.07572014444e-06
$ ((product_prod $V_$true) $V_$true) || $ ((And0 $V_And.ind) $V_And.ind) || 6.92506320892e-06
$ ((product_prod $V_$true) $V_$true) || $ ((And2 $V_And.ind1) $V_And.ind1) || 6.92506320892e-06
int || nat1 || 6.40620248923e-06
$ ((product_prod $V_$true) $V_$true) || $ ((iff0 $V_iff.ind) $V_iff.ind) || 6.01903479993e-06
product_Pair || And11 || 5.40089550994e-06
product_Pair || And10 || 5.40089550994e-06
pow || Ztimes || 4.94115052501e-06
product_Pair || iff1 || 4.69427795268e-06
$ $V_$true || $ $V_And.ind1 || 4.38366898204e-06
$ $V_$true || $ $V_And.ind || 4.38366898204e-06
$ (=> ((product_prod $V_$true) $V_$true) $o) || $ (=> ((And2 $V_And.ind1) $V_And.ind1) $o) || 4.26380674868e-06
$ (=> ((product_prod $V_$true) $V_$true) $o) || $ (=> ((And0 $V_And.ind) $V_And.ind) $o) || 4.26380674868e-06
$ code_natural || $ nat_fact_all || 4.21340794914e-06
$true || $ And.ind || 4.19867180151e-06
$true || $ And.ind1 || 4.19867180151e-06
code_integer || nat1 || 3.96373062402e-06
arccos || derivative || 3.89425657345e-06
$ $V_$true || $ (=> $V_iff.ind $V_iff.ind) || 3.81013812944e-06
$ (=> ((product_prod $V_$true) $V_$true) $o) || $ (=> ((iff0 $V_iff.ind) $V_iff.ind) $o) || 3.70254361254e-06
wf || lt || 3.62597473393e-06
$true || $ iff.ind || 3.47823227293e-06
$ int || $ nat || 3.16690658778e-06
one2 || Zone || 2.75822566027e-06
one_one || monomio || 2.21135863927e-06
one2 || nat_fact_all1 || 2.19195100293e-06
$true || $ Group || 2.10313300214e-06
$ num || $ fraction || 2.07868365125e-06
num_of_nat || Zpred || 2.0116902457e-06
zero_zero || costante || 1.98064730022e-06
nat_of_num || Zpred || 1.88378698555e-06
num_of_nat || Zsucc || 1.84710264783e-06
nat_of_num || Zsucc || 1.7393418487e-06
int_ge_less_than2 || teta || 1.7358595554e-06
int_ge_less_than || teta || 1.7358595554e-06
$ (=> $V_$true $V_$true) || $ ((morphism $V_Group) $V_Group) || 1.72910625593e-06
filtermap || image || 1.60897199139e-06
sup_sup || op || 1.42727448902e-06
image || image || 1.38187977283e-06
bot_bot || e || 1.32765855016e-06
int_ge_less_than2 || nth_prime || 1.17624514255e-06
int_ge_less_than || nth_prime || 1.17624514255e-06
$ (set $V_$true) || $ (Type_OF_Group $V_Group) || 1.16958676482e-06
image2 || image || 1.06381278147e-06
int_ge_less_than2 || fact || 1.05547363674e-06
int_ge_less_than || fact || 1.05547363674e-06
$ (set ((product_prod $V_$true) $V_$true)) || $ ((morphism $V_Group) $V_Group) || 8.54798245715e-07
set || PreMonoid_OF_Group || 8.4833907937e-07
set || Magma_OF_Group || 8.39597219548e-07
bit1 || denominator || 7.00851941644e-07
bit1 || numerator || 7.00851941644e-07
filter || PreMonoid_OF_Group || 6.98834371727e-07
int_ge_less_than2 || nat2 || 6.93829213832e-07
int_ge_less_than || nat2 || 6.93829213832e-07
filter || Magma_OF_Group || 5.90506574116e-07
bit0 || denominator || 5.43509530112e-07
bit0 || numerator || 5.43509530112e-07
$ (filter $V_$true) || $ (Type_OF_Group $V_Group) || 5.03296753169e-07
inc || denominator_integral_fraction || 4.29622845664e-07
rep_real || factorize || 4.16284982926e-07
abs_real || defactorize || 3.98770354455e-07
nat_of_num || enumerator_integral_fraction || 3.87093099838e-07
uminus_uminus || inv || 3.82844205503e-07
code_natural_of_nat || numeratorQ || 3.68830975468e-07
set || pregroup || 3.28943287885e-07
code_n1042895779nteger || numeratorQ || 3.08925950452e-07
code_nat_of_integer || Z_of_nat || 2.77751760644e-07
code_nat_of_natural || nat_fact_all_to_Q || 2.69856297976e-07
pos || finv || 2.52648422529e-07
bit1 || enumerator_integral_fraction || 2.45498814153e-07
nat2 || denominator_integral_fraction || 2.42554231559e-07
abs_real || pred || 2.34012110541e-07
rep_int || factorize || 2.14774617988e-07
listMem || make_compatibility_goal || 2.13950377498e-07
semilattice || Morphism_Theory || 2.10056712138e-07
code_n1042895779nteger || factorize || 2.08879062439e-07
$true || $ Arguments || 2.06513207172e-07
abs_int || defactorize || 2.05738264242e-07
code_integer_of_int || nat2 || 2.01864183485e-07
code_i1730018169atural || nat_fact_all_to_Q || 1.97168352432e-07
$true || $ nat || 1.84442739396e-07
code_i1730018169atural || defactorize || 1.77448041378e-07
nat2 || Z2 || 1.62492530429e-07
code_integer_of_int || factorize || 1.62394638992e-07
rep_real || nat2 || 1.60440898256e-07
bit0 || finv || 1.52135889951e-07
code_int_of_integer || defactorize || 1.46921882587e-07
$ (=> $V_$true (=> $V_$true $V_$true)) || $ Relation_Class || 1.35427602861e-07
real_V1632203528linear || injective || 1.24490417485e-07
abel_semigroup || Morphism_Theory || 1.23831516014e-07
semilattice_axioms || function_type_of_morphism_signature || 1.20727121075e-07
abs_int || pred || 1.18158558301e-07
abel_s1917375468axioms || function_type_of_morphism_signature || 1.0186898005e-07
code_int_of_integer || pred || 8.68853026565e-08
complex || nat || 8.20185190189e-08
rep_int || nat2 || 8.10106130666e-08
equiv_equivp || Morphism_Theory || 7.56190605995e-08
cons || Function || 7.34543883952e-08
abel_semigroup || function_type_of_morphism_signature || 7.03051433158e-08
lattic35693393ce_set || function_type_of_morphism_signature || 6.46212763262e-08
semigroup || function_type_of_morphism_signature || 6.26742845944e-08
$ $V_$true || $ Relation_Class || 6.18314525906e-08
bNF_Wellorder_wo_rel || Morphism_Theory || 5.83064639282e-08
semilattice_neutr || A\ || 5.05180945196e-08
monoid || A\ || 4.94609806904e-08
semilattice || function_type_of_morphism_signature || 4.78448713525e-08
$ (list $V_$true) || $ ((Morphism_Theory $V_Arguments) $V_Relation_Class) || 4.77851616114e-08
lattic35693393ce_set || Morphism_Theory || 4.56315260773e-08
insert3 || Function || 4.49854253371e-08
finite_psubset || A || 4.47433235818e-08
comm_monoid || A\ || 4.31865200302e-08
ratreal || relation_class_of_argument_class || 4.22534979882e-08
semilattice || A\ || 4.21993935842e-08
equiv_part_equivp || function_type_of_morphism_signature || 4.12383392885e-08
semilattice_neutr || B1 || 3.94711772643e-08
monoid || B1 || 3.8845650508e-08
is_none || le || 3.75680228752e-08
antisym || function_type_of_morphism_signature || 3.69503701256e-08
transitive_acyclic || function_type_of_morphism_signature || 3.63274928476e-08
member3 || make_compatibility_goal || 3.53936035398e-08
archim2085082626_floor || carrier_of_relation_class || 3.48787231478e-08
$ (set ((product_prod $V_$true) $V_$true)) || $ Relation_Class || 3.44997583721e-08
comm_monoid || B1 || 3.44841015382e-08
reflp || function_type_of_morphism_signature || 3.40046971387e-08
semilattice || B1 || 3.39125741507e-08
$ rat || $ (X_Relation_Class variance) || 3.27625971894e-08
real_V1632203528linear || distributive || 3.2005427639e-08
trans || function_type_of_morphism_signature || 3.0430106831e-08
id2 || nth_prime || 2.92467257207e-08
id2 || fact || 2.91050135424e-08
$ (set $V_$true) || $ ((Morphism_Theory $V_Arguments) $V_Relation_Class) || 2.73996518679e-08
trans || le || 2.71424344896e-08
$ code_integer || $ nat_fact_all || 2.5117819193e-08
groups_monoid_list || B || 2.50030440973e-08
groups_monoid_list || A || 2.45399360797e-08
$ (=> $V_$true (=> $V_$true $o)) || $ Relation_Class || 2.43348657648e-08
lattic1543629303tr_set || B || 2.3677616639e-08
lattic1543629303tr_set || A || 2.33581292518e-08
wf || Morphism_Theory || 2.33343115418e-08
rat || variance || 2.33222642285e-08
id2 || nat2 || 2.19548820029e-08
real || fraction || 2.16031861405e-08
lattic35693393ce_set || B || 2.11026698803e-08
real || unit || 2.10322137994e-08
lattic35693393ce_set || A || 2.06961458399e-08
cnj || notb || 2.03689235746e-08
basic_sndsp || infgraph_spec || 1.97932022629e-08
basic_fstsp || infgraph_spec || 1.96788867283e-08
set || B || 1.90312683739e-08
real || Z || 1.89037355695e-08
groups828474808id_set || B || 1.87811055395e-08
cnj || nth_prime || 1.87005340068e-08
null || le || 1.86419009894e-08
groups828474808id_set || A || 1.85645090219e-08
complex || bool || 1.84274693102e-08
none || fact || 1.75837084484e-08
null2 || le || 1.74033630883e-08
none || nth_prime || 1.68290871841e-08
is_none || lt || 1.64608536857e-08
antisym || le || 1.62896202305e-08
sym || le || 1.62021080842e-08
nil || nth_prime || 1.40276898334e-08
nil || fact || 1.39523021284e-08
none || nat2 || 1.38271357893e-08
cnj || nat2 || 1.34856797118e-08
real_V1632203528linear || monotonic || 1.32525444211e-08
distinct || le || 1.32492493144e-08
$ ((product_prod $V_$true) $V_$true) || $ (sort (list_eqType (fsort $V_finType))) || 1.1495055253e-08
nil || nat2 || 1.12622475071e-08
complex || nat_fact_all || 1.11218957632e-08
empty || nth_prime || 1.01559197802e-08
empty || fact || 9.93274940553e-09
wf || le || 9.76367988285e-09
complex || fraction || 9.36660553891e-09
null || lt || 8.52386919822e-09
real || times || 8.16471674794e-09
real || ratio || 8.07680713484e-09
product_snd || infgraph || 8.01410102393e-09
null2 || lt || 7.99580544252e-09
product_fst || infgraph || 7.86338248604e-09
antisym || lt || 7.65243264486e-09
sym || lt || 7.61445999889e-09
im || fraction2 || 7.56986284584e-09
im || fraction1 || 7.56986284584e-09
re || fraction2 || 7.48409515061e-09
re || fraction1 || 7.48409515061e-09
empty || nat2 || 7.42723388979e-09
trans || lt || 7.13482509505e-09
real || le || 6.80585680206e-09
$true || $ finType || 6.58615675116e-09
im || Z3 || 6.38451190614e-09
re || Z3 || 6.32256131068e-09
im || Z2 || 6.27273673017e-09
distinct || lt || 6.22364816838e-09
re || Z2 || 6.21291968297e-09
im || defactorize || 5.11297167065e-09
re || defactorize || 5.04969452596e-09
real || nat || 5.02031026816e-09
im || ratio2 || 4.20901851715e-09
re || ratio2 || 4.16629203191e-09
$ complex || $ bool || 3.68910360297e-09
code_integer_of_int || numeratorQ || 3.38962029372e-09
im || minus || 2.96738382591e-09
im || sqrt || 2.95191923433e-09
re || minus || 2.94264701463e-09
re || sqrt || 2.92268464649e-09
im || A || 2.82546357576e-09
im || plus || 2.80012576214e-09
re || A || 2.79866112329e-09
re || plus || 2.77808637532e-09
code_int_of_integer || nat_fact_all_to_Q || 2.54244049495e-09
real || orb || 2.41901949789e-09
real || andb || 2.06319495196e-09
bNF_Cardinal_cfinite || symmetric || 1.94908271365e-09
complex || R0 || 1.93348337502e-09
complex || Q0 || 1.89118547425e-09
complex || Z || 1.7764991941e-09
real || Rmult || 1.75965366265e-09
real || Qtimes0 || 1.71640525513e-09
im || orb || 1.67641689593e-09
re || orb || 1.65812147404e-09
bNF_Cardinal_cfinite || associative || 1.49090969399e-09
real || Ztimes || 1.48993390322e-09
im || andb || 1.35521733996e-09
re || andb || 1.34329660634e-09
im || Rplus || 1.29800526962e-09
re || Rplus || 1.28194132632e-09
real_V1632203528linear || symmetric2 || 1.26826037292e-09
im || Qplus || 1.2110393826e-09
re || Qplus || 1.19698989549e-09
product_unit || Z || 1.01511037205e-09
bNF_Cardinal_cfinite || transitive || 9.97700391449e-10
im || Zplus || 9.19990183523e-10
re || Zplus || 9.1176047817e-10
product_unit || nat || 8.220673362e-10
induct_true || LETIN || 7.68372478742e-10
induct_true || E.con || 7.68372478742e-10
induct_true || D.con || 7.68372478742e-10
induct_true || C.con || 7.68372478742e-10
induct_true || A.con || 7.68372478742e-10
induct_true || B.con || 7.68372478742e-10
im || ftimes || 7.15384492691e-10
re || ftimes || 7.06094286512e-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
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
bNF_Cardinal_cone || divides || 1.74097701371e-10
bNF_Cardinal_cfinite || symmetricb || 1.10516198263e-10
bNF_Cardinal_cone || le || 1.0869350186e-10
bNF_Cardinal_cfinite || reflexive || 8.78158375547e-11
bNF_Cardinal_cone || lt || 6.31265862523e-11
bNF_Cardinal_cone || eqb || 5.28690561982e-11
induct_implies || times || 1.60719307958e-11
induct_true || R0 || 1.49271865295e-11
bNF_Cardinal_cone || same_atom || 9.8071123886e-12
$o || $ nat || 9.33208107549e-12
induct_conj || gcd || 7.11516215995e-12
induct_true || Q0 || 6.40710817335e-12
induct_conj || minus || 6.32788926372e-12
product_unit || Formula || 6.3072650529e-12
induct_conj || plus || 5.65055733454e-12
$true || $ (=> nat nat) || 5.06858096062e-12
semilattice || permut || 4.42379244245e-12
$ (=> $V_$true (=> $V_$true $V_$true)) || $ nat || 3.67184045551e-12
if_pred || factorize || 3.38739462952e-12
holds || defactorize || 3.32040736273e-12
abel_semigroup || permut || 2.61727085002e-12
semilattice_axioms || bijn || 2.39370219593e-12
abel_s1917375468axioms || bijn || 2.06521510253e-12
bNF_Cardinal_cfinite || transitiveb || 1.7781476764e-12
abel_semigroup || bijn || 1.67762405145e-12
equiv_equivp || permut || 1.62590890423e-12
lattic35693393ce_set || bijn || 1.58639214363e-12
semigroup || bijn || 1.50072924202e-12
bNF_Wellorder_wo_rel || permut || 1.43653581138e-12
semilattice || bijn || 1.22206568681e-12
lattic35693393ce_set || permut || 1.04920874069e-12
$ (set ((product_prod $V_$true) $V_$true)) || $ nat || 1.01467034841e-12
equiv_part_equivp || bijn || 9.75220023004e-13
antisym || bijn || 9.38715173287e-13
$ (pred product_unit) || $ nat_fact_all || 9.02084015515e-13
transitive_acyclic || bijn || 8.95516525119e-13
holds || pred || 8.78146753463e-13
reflp || bijn || 8.58067408419e-13
trans || bijn || 8.24011419621e-13
$ (=> $V_$true (=> $V_$true $o)) || $ nat || 6.86087446758e-13
wf || permut || 6.01124004853e-13
if_pred || nat2 || 5.75312791647e-13
c_Predicate_Oeq || leq || 3.99679362024e-13
if_pred || numeratorQ || 2.95213966062e-13
nat3 || increasing || 2.42732269521e-13
holds || nat_fact_all_to_Q || 2.17676155139e-13
zero_Rep || nth_prime || 2.152447552e-13
$ ind || $ nat || 1.08614990137e-13
$ $V_$true || $ (A1 $V_axiom_set) || 7.96497799065e-14
zero_Rep || Z1 || 7.65010386026e-14
$true || $ axiom_set || 7.36041678997e-14
suc_Rep || Z3 || 6.23734725916e-14
suc_Rep || Z2 || 6.01432586128e-14
suc_Rep || nat2 || 4.98777091645e-14
nat3 || not_nf || 4.60894738085e-14
rep_Nat || negate || 3.12352524129e-14
rep_Nat || elim_not || 3.12352524129e-14
$ code_natural || $ nat || 2.35474524516e-14
$ nat || $ Formula || 1.80280426306e-14
code_nat_of_natural || factorize || 1.71784734345e-14
code_natural_of_nat || defactorize || 1.70759242909e-14
zero_Rep || nat1 || 1.4455017346e-14
code_nat_of_natural || nat2 || 1.17358797658e-14
code_natural_of_nat || pred || 6.43013912763e-15
code_n1042895779nteger || defactorize || 5.97029501768e-15
code_i1730018169atural || factorize || 5.97029501768e-15
code_nat_of_natural || Z3 || 3.93764510691e-15
code_nat_of_natural || Z2 || 3.84997764215e-15
$ nat || $ nat_fact_all || 3.63069214185e-15
$ code_integer || $ nat || 3.50239094656e-15
code_n1042895779nteger || pred || 2.8868528506e-15
induct_implies || Ztimes || 2.83024316918e-15
code_int_of_integer || factorize || 2.67524468084e-15
code_integer_of_int || defactorize || 2.65487920406e-15
induct_conj || Zplus || 2.20201239905e-15
code_i1730018169atural || nat2 || 1.92462272287e-15
code_int_of_integer || nat2 || 1.88175131746e-15
code_nat_of_integer || denominator_integral_fraction || 1.86350023986e-15
$o || $ Z || 1.54703147975e-15
code_nat_of_integer || numeratorQ || 1.35461100795e-15
abs_Nat || numeratorQ || 1.29030507904e-15
left || bool2 || 1.08961803734e-15
code_integer_of_int || pred || 1.01914808666e-15
right || bool1 || 9.69333744959e-16
code_integer_of_nat || nat_fact_all_to_Q || 9.37236830371e-16
rep_Nat || nat_fact_all_to_Q || 9.2513906457e-16
nat2 || enumerator_integral_fraction || 8.92990880158e-16
code_nat_of_integer || factorize || 8.56473758505e-16
holds || Zpred || 8.42212374629e-16
code_integer_of_int || finv || 8.41795981427e-16
abs_Nat || factorize || 8.26604750628e-16
if_pred || Zpred || 7.88887716224e-16
code_integer_of_nat || defactorize || 7.71603916354e-16
rep_Nat || defactorize || 7.66465218772e-16
holds || factorize || 7.62522976604e-16
holds || Zsucc || 7.48030237279e-16
if_pred || Zsucc || 7.16357085693e-16
code_nat_of_natural || numeratorQ || 7.04021208665e-16
if_pred || defactorize || 6.51023685624e-16
$ int || $ nat_fact_all || 6.26231014182e-16
code_int_of_integer || Z3 || 6.07609030645e-16
zero_Rep || nat_fact_all1 || 5.98492940196e-16
code_int_of_integer || Z2 || 5.94693246521e-16
code_natural_of_nat || nat_fact_all_to_Q || 5.80365607038e-16
$ int || $ fraction || 4.5000519832e-16
$ (pred product_unit) || $ Z || 3.87830961068e-16
$ code_natural || $ Z || 3.53699290559e-16
$ ind || $ fraction || 3.41158102211e-16
abs_int || numeratorQ || 3.11952956971e-16
suc_Rep || denominator || 2.77474828201e-16
suc_Rep || numerator || 2.77474828201e-16
code_natural_of_nat || Zpred || 2.73604158281e-16
code_nat_of_natural || Zpred || 2.60380654136e-16
code_natural_of_nat || Zsucc || 2.5265067063e-16
code_nat_of_natural || Zsucc || 2.43955799247e-16
rep_int || nat_fact_all_to_Q || 2.10377653342e-16
abs_int || factorize || 1.86089908999e-16
$o || $ nat_fact_all || 1.8026926082e-16
rep_int || defactorize || 1.65463465586e-16
holds || numeratorQ || 1.56361286696e-16
$ (pred product_unit) || $ nat || 1.21404705452e-16
code_int_of_integer || numeratorQ || 1.20727317812e-16
code_integer_of_int || nat_fact_all_to_Q || 1.00680296329e-16
$ nat || $ Z || 1.00409137075e-16
if_pred || nat_fact_all_to_Q || 9.88848286508e-17
pow || Qtimes0 || 8.63097331056e-17
pow || Qplus || 8.4681442165e-17
code_n1042895779nteger || Zpred || 8.39987456209e-17
code_i1730018169atural || Zpred || 7.83550689921e-17
code_n1042895779nteger || Zsucc || 7.57115004499e-17
code_i1730018169atural || Zsucc || 7.13915382535e-17
$ num || $ Q0 || 6.99945270114e-17
one2 || Q10 || 3.69672290245e-17
one2 || QO || 3.49492269404e-17
pos || nat_fact_to_fraction || 2.98979883749e-17
$ code_integer || $ Z || 2.96251812219e-17
code_integer_of_int || Zpred || 2.71478613585e-17
nat_of_num || nat_fact_all3 || 2.70171528719e-17
code_int_of_integer || Zpred || 2.5951366703e-17
$ num || $ nat_fact || 2.53577297625e-17
code_integer_of_int || Zsucc || 2.51817684689e-17
code_int_of_integer || Zsucc || 2.44072419573e-17
inc || numerator || 2.40873999835e-17
code_nat_of_integer || Zpred || 2.10881677976e-17
code_integer_of_nat || Zpred || 2.05920813924e-17
rep_Nat || Zpred || 2.05099788137e-17
abs_Nat || Zpred || 2.05099788137e-17
nat2 || numerator || 2.04756656811e-17
code_nat_of_integer || Zsucc || 1.91905312525e-17
if_pred || pred || 1.90096823561e-17
code_integer_of_nat || Zsucc || 1.88031686992e-17
rep_Nat || Zsucc || 1.87136852916e-17
abs_Nat || Zsucc || 1.87136852916e-17
bit1 || nat_fact_all3 || 1.51837894254e-17
bit0 || nat_fact_to_fraction || 1.36582938029e-17
holds || nat2 || 1.3397434363e-17
$ int || $ Z || 1.10619636729e-17
code_nat_of_integer || numerator || 6.93374357707e-18
code_integer_of_int || nat_fact_to_fraction || 5.31380794057e-18
nat2 || nat_fact_all3 || 3.84762779122e-18
abs_int || Zpred || 2.92876236247e-18
rep_int || Zpred || 2.83672708163e-18
$ int || $ nat_fact || 2.77877125415e-18
abs_int || Zsucc || 2.6512501206e-18
rep_int || Zsucc || 2.58135051891e-18
rep_Nat || premonoid || 2.23805285407e-18
rep_Nat || magma || 1.61201840678e-18
nat3 || isMonoid || 1.35976125639e-18
$ rat || $ nat || 1.33426701798e-18
char_of_nat || numeratorQ || 9.80494926454e-19
nat3 || isSemiGroup || 9.45890565104e-19
rep_rat || factorize || 7.23350165507e-19
$ nat || $ Monoid || 7.15424828234e-19
abs_rat || defactorize || 6.92916172029e-19
quotient_of || nat2 || 6.63145318882e-19
$ char || $ nat_fact_all || 6.58331775233e-19
nat_of_char || nat_fact_all_to_Q || 5.50519451567e-19
$ nat || $ SemiGroup || 5.00417884976e-19
char_of_nat || factorize || 4.40936182115e-19
quotient_of || Z3 || 4.30856520806e-19
quotient_of || Z2 || 4.19085904371e-19
nat_of_char || defactorize || 3.34236677563e-19
abs_rat || pred || 2.79313076905e-19
rep_rat || nat2 || 1.91499651675e-19
product_Abs_unit || numeratorQ || 1.81299968265e-19
pow || Qtimes || 1.36607656734e-19
product_Rep_unit || nat_fact_all_to_Q || 1.2704751427e-19
$ product_unit || $ nat_fact_all || 1.15492626782e-19
product_Abs_unit || factorize || 8.16693442567e-20
product_Rep_unit || defactorize || 7.52892960333e-20
one2 || Qone || 7.42041801516e-20
$ num || $ Q || 6.10941792579e-20
abs_rat || numeratorQ || 5.47697135231e-20
nat3 || decT || 5.40162718452e-20
rep_Nat || sort || 3.91126256835e-20
rep_rat || nat_fact_all_to_Q || 3.69360942017e-20
$ rat || $ nat_fact_all || 2.91301015541e-20
nat3 || carrier || 2.56463537634e-20
rep_Nat || magma0 || 2.52842815987e-20
abs_rat || factorize || 2.31353826301e-20
rep_rat || defactorize || 2.05710272428e-20
pow || rtimes || 1.97872883485e-20
$ nat || $ eqType || 1.82691138861e-20
abs_real || numeratorQ || 1.21886880567e-20
$ nat || $ PreMonoid || 1.14048372868e-20
$ num || $ ratio || 9.47737163491e-21
one2 || ratio1 || 9.30912636062e-21
rep_real || nat_fact_all_to_Q || 8.21991756573e-21
$ literal || $ nat_fact_all || 8.05502668176e-21
explode || nat_fact_all_to_Q || 6.42468723727e-21
implode str || numeratorQ || 6.21352073335e-21
nat3 || isGroup || 5.82068270267e-21
rep_Nat || pregroup || 5.38894883886e-21
explode || defactorize || 4.82671119399e-21
$ real || $ nat_fact_all || 4.59739248646e-21
abs_real || factorize || 4.42893078213e-21
rep_real || defactorize || 3.93802243225e-21
implode str || factorize || 3.8843956458e-21
$ nibble || $ nat_fact_all || 3.35903894313e-21
nibble_of_nat || numeratorQ || 2.98636064248e-21
$ nat || $ Group || 2.35080995363e-21
nat_of_nibble || nat_fact_all_to_Q || 2.23340583106e-21
nibble_of_nat || factorize || 1.7919766668e-21
nat_of_nibble || defactorize || 1.66601462567e-21
cnj || rinv || 1.57296202782e-21
$ complex || $ ratio || 9.99570687732e-22
cnj || opposite_direction || 3.49575050764e-22
num_of_nat || numeratorQ || 2.89798421677e-22
$ complex || $ rewrite_direction || 2.29346289963e-22
nat_of_num || nat_fact_all_to_Q || 1.96690125351e-22
$ num || $ nat_fact_all || 1.63029682386e-22
cnj || Qinv || 1.5431806748e-22
num_of_nat || factorize || 1.38010263347e-22
nat_of_num || defactorize || 1.19290178582e-22
$ complex || $ Q || 1.16752720932e-22
cnj || finv || 9.19997402429e-23
char_of_nat || defactorize || 8.27952373757e-23
nat_of_char || factorize || 7.38439398851e-23
$ char || $ Z || 7.25476009471e-23
char_of_nat || Zpred || 6.483224215e-23
$ complex || $ fraction || 5.92134308503e-23
char_of_nat || Zsucc || 5.70830491651e-23
product_Rep_unit || factorize || 5.62585292005e-23
nat_of_char || Zpred || 5.39886237879e-23
product_Abs_unit || defactorize || 5.18635859994e-23
nat_of_char || Zsucc || 5.03677183901e-23
$ char || $ nat || 3.45885798458e-23
$ product_unit || $ Z || 2.36394601733e-23
product_Rep_unit || Zpred || 2.17593783503e-23
product_Abs_unit || Zpred || 2.17593783503e-23
$ product_unit || $ nat || 2.14001340376e-23
product_Rep_unit || Zsucc || 1.97239338218e-23
product_Abs_unit || Zsucc || 1.97239338218e-23
char_of_nat || pred || 1.52949344295e-23
nat_of_char || nat2 || 9.59028971747e-24
product_Abs_unit || pred || 9.03449652147e-24
abs_rat || Zpred || 7.55598941782e-24
rep_rat || Zpred || 7.29011315715e-24
$ rat || $ Z || 7.27933609573e-24
abs_rat || Zsucc || 6.81345537689e-24
rep_rat || Zsucc || 6.65969265876e-24
cnj || Zopp || 6.38505367103e-24
product_Rep_unit || nat2 || 6.29819579327e-24
$ literal || $ Z || 5.32911296671e-24
$ complex || $ Z || 4.47855765344e-24
explode || Zpred || 4.18498255169e-24
explode || Zsucc || 3.72666340789e-24
implode str || Zpred || 3.22310257254e-24
implode str || Zsucc || 3.06722856885e-24
$ nibble || $ Z || 2.24848834519e-24
explode || factorize || 2.13033530014e-24
abs_real || Zpred || 1.674203138e-24
rep_real || Zpred || 1.61312442905e-24
abs_real || Zsucc || 1.50765167533e-24
nibble_of_nat || Zpred || 1.50519498316e-24
implode str || defactorize || 1.4984370618e-24
nat_of_nibble || Zpred || 1.49229405301e-24
rep_real || Zsucc || 1.4756079887e-24
nibble_of_nat || Zsucc || 1.39000284976e-24
nat_of_nibble || Zsucc || 1.38093617305e-24
$ real || $ Z || 1.28166483966e-24
$ literal || $ nat || 1.02499973154e-24
nat_of_nibble || factorize || 4.95548181163e-25
nibble_of_nat || defactorize || 4.69454818751e-25
implode str || pred || 3.90375711329e-25
explode || nat2 || 3.34496058493e-25
$ nibble || $ nat || 3.0168367103e-25
nibble_of_nat || pred || 1.33537613348e-25
nat_of_nibble || nat2 || 9.78301040446e-26
