nibble || GCD-Algorithm || 0.585789385902
zero_zero || -0 || 0.565537253234
nat || 0_NN VertexSelector 1 || 0.56407985645
size_size || . || 0.55821415085
size_nibble || Moebius || 0.522009753069
zero_zero || {..}1 || 0.445274646067
nat || op0 {} || 0.430737322758
nat || EdgeSelector 2 || 0.335951900077
nibble || sec || 0.326971377627
nat || omega || 0.319394562329
trans || c= || 0.299728390059
nibble || sin1 || 0.277088082647
wf || <= || 0.266950169976
wf || are_equipotent || 0.263492279335
product_Unity || NAT || 0.254567446867
int || 0_NN VertexSelector 1 || 0.25407886543
zero_zero || goto0 || 0.243208016916
nil || 0. || 0.240025064575
wf || c= || 0.239977830606
zero_zero || return || 0.23970061658
nat || SBP || 0.231426268779
size_nibble || !5 || 0.231182945938
one2 || op0 {} || 0.226787572793
nat || NAT || 0.223188961944
zero_zero || halt || 0.219422094408
size_nibble || elementary_tree || 0.213216846911
zero_zero || elementary_tree || 0.208399715638
size_nibble || cos || 0.205335078026
size_nibble || ConwayDay || 0.202861611564
int || NAT || 0.199623215719
size_nibble || Mycielskian0 || 0.197007008988
product_Unity || 0_NN VertexSelector 1 || 0.193579811351
nat || SCMPDS || 0.192741467835
code_nat_of_natural || code || 0.180162233064
nat || ConwayZero || 0.164588958678
id || {..}1 || 0.158926144804
int || op0 {} || 0.158481082881
size_nibble || carrier || 0.148663293972
int || omega || 0.144903107235
code_int_of_integer || code || 0.143526860799
size_nibble || tree0 || 0.135325191147
code_natural || VAR || 0.130180869249
one2 || NAT || 0.125261605035
sub || -41 || 0.122373844735
ord_max || {..}1 || 0.122050210763
ord_min || {..}1 || 0.121855149541
nat || REAL || 0.120262610115
zero_zero || CompleteRelStr || 0.11814902841
code_pcr_natural code_cr_natural || +16 || 0.107965990807
real || 0_NN VertexSelector 1 || 0.1055275611
code_integer || VAR || 0.104933236812
real || op0 {} || 0.104879451299
trans || are_equipotent || 0.102778586964
size_char || Top || 0.0995279638741
code_sub || -41 || 0.0949938002236
nat2 || Top0 || 0.0917953971403
distinct || <= || 0.0917874621881
nibble0 || P_t || 0.0913831096717
uminus_uminus || SubstPoset || 0.0907318338191
bNF_Ca1495478003natLeq || REAL || 0.0899688627832
linorder_sorted || <= || 0.0872858662821
trans || c< || 0.0854098231393
bNF_Ca1495478003natLeq || RAT || 0.0850250755792
char2 || SubstLatt || 0.0799726292344
neg || EmptyGrammar || 0.0798230907603
product_size_unit || Moebius || 0.0798040773842
less_than || REAL || 0.0790907399646
nibble1 || P_t || 0.0782946554386
less_than || RAT || 0.0777641729192
nat || INT || 0.0775976126546
product_unit || Rea0 || 0.0754409442303
zero_zero || Seg || 0.0753995024927
bNF_Ca1495478003natLeq || COMPLEX || 0.0731526442266
wf || c< || 0.0719370247264
map_fun || {..}8 || 0.0717412320673
size_num || Moebius || 0.0713009131337
nat_of_nibble || Moebius || 0.0695779599483
less_than || COMPLEX || 0.0683203495479
finite_psubset || xi || 0.0683147101241
code_integer || k5_ordinal1 || 0.068141567585
nibbleA || P_t || 0.0670371444813
one_one || elementary_tree || 0.0664791688418
nibbleB || P_t || 0.0661347084639
size_size || PFBrt || 0.0658543581116
code_integer || 0_NN VertexSelector 1 || 0.0657399558023
nibble0 || SourceSelector 3 || 0.065702101945
nibble8 || P_t || 0.0653477092017
less_than || REAL+ || 0.0653354054545
code_natural_of_nat || WeightSelector 5 || 0.0645887388676
one2 || P_t || 0.0635103881835
trans || r3_tarski || 0.0631804622458
nibbleC || P_t || 0.0629547812155
nibbleD || P_t || 0.0624855315919
nibbleF || P_t || 0.0612783981204
nibble3 || P_t || 0.0602934759554
product_unit || <i>0 || 0.0596734560114
nibble9 || P_t || 0.0594654665066
nibble5 || P_t || 0.0592168426313
code_natural || -66 || 0.0586547474565
nibble2 || P_t || 0.0585373650317
nibble4 || P_t || 0.0583301125773
nibbleE || P_t || 0.0581312724916
nibble7 || P_t || 0.0581312724916
nibble6 || P_t || 0.0579402351695
one_one || -0 || 0.0573268851489
nat2 || ELabelSelector 6 || 0.057272111926
product_unit || <j> || 0.0571191365161
product_unit || *63 || 0.0571191365161
nibble1 || SourceSelector 3 || 0.0559689493204
product_unit || op0 {} || 0.0551569722061
code_int_of_integer || TargetSelector 4 || 0.0548459278461
product_unit || GCD-Algorithm || 0.0529925732441
wf || r3_tarski || 0.0526354694739
code_nat_of_natural || ^25 || 0.0521604352648
nat || RAT || 0.0518952183501
nat2 || Lang1 || 0.0509953340463
finite_psubset || LowerCompoundersOf || 0.0498844613037
less_than || DYADIC || 0.0496926594513
code_natural || NAT || 0.049545940376
bNF_Ca1495478003natLeq || DYADIC || 0.0495132970852
bNF_Ca1495478003natLeq || REAL+ || 0.0494130969267
finite_psubset || AtomicFormulaSymbolsOf || 0.0492206480565
product_unit || R^2-unit_square || 0.0488463730637
ratrel || ICC || 0.048240099977
nibble0 || NAT || 0.0481498673323
code_size_natural || ^25 || 0.0480329405456
nibbleA || SourceSelector 3 || 0.0480025955125
one2 || SourceSelector 3 || 0.0479526457283
lattic929149872er_Max || {..}1 || 0.0478173472354
code_Nat || VLabelSelector 7 || 0.0477962413988
antisym || c= || 0.0476377839644
product_Unity || P_t || 0.0475268227549
code_natural || SourceSelector 3 || 0.0474372054107
nibbleB || SourceSelector 3 || 0.0474115800213
zero_zero || <*> || 0.0471447833547
code_pcr_natural code_cr_natural || *31 || 0.0471142042917
nibble8 || SourceSelector 3 || 0.0468950684661
product_prod || [..] || 0.0455413195485
num || GCD-Algorithm || 0.0455359978018
nibbleC || SourceSelector 3 || 0.0453182476184
one_one || +46 || 0.0451293189631
nibbleD || SourceSelector 3 || 0.0450079099154
code_n1042895779nteger || VLabelSelector 7 || 0.0447917902579
bNF_Ca1495478003natLeq || INT || 0.0442476437361
nibbleF || SourceSelector 3 || 0.0442078643161
finite_psubset || North_Arc || 0.0441383090393
finite_psubset || South_Arc || 0.0441383090393
less_than || SCM+FSA-Memory || 0.04400010669
less_than || continuum || 0.043934250266
finite_psubset || TermSymbolsOf || 0.0437010149565
nibble3 || SourceSelector 3 || 0.0435532596868
pred_numeral || Moebius || 0.0431641284747
less_than || S4-Taut || 0.0431366365895
zero_zero || +46 || 0.0431236703829
nat_of_num || code || 0.0431178089069
nibble9 || SourceSelector 3 || 0.0430016617003
one2 || <i>0 || 0.04286693448
nibble5 || SourceSelector 3 || 0.0428358056531
nat2 || ProperPrefixes || 0.042572791412
one2 || *63 || 0.0425571773465
one2 || <j> || 0.0425571773465
semiring_1_of_nat || {..}3 || 0.0425251434623
nibble2 || SourceSelector 3 || 0.042381986537
nibble4 || SourceSelector 3 || 0.0422434055078
nibbleE || SourceSelector 3 || 0.0421103797761
nibble7 || SourceSelector 3 || 0.0421103797761
antisym || c< || 0.0420461354799
nibble6 || SourceSelector 3 || 0.0419825098001
one_one || {..}1 || 0.0419641577512
at_top || {..}1 || 0.0418110860324
nibble0 || Example || 0.0418081391794
int_ge_less_than2 || -CycleSet || 0.0410509686834
int_ge_less_than || -CycleSet || 0.0410509686834
finite_psubset || Domains_of || 0.0410502730227
rat || op0 {} || 0.040407552601
neg || <*..*>4 || 0.0399735898474
pred_nat || RAT || 0.0399579946775
one_one || <*> || 0.0399100697039
product_Unity || SourceSelector 3 || 0.0398813737137
finite_psubset || sup5 || 0.039803794015
fun_pair_less || ICC || 0.0396645454678
typerep || 0_NN VertexSelector 1 || 0.0393208014397
less_than || INT || 0.0392045152429
code_integer_of_nat || ^25 || 0.0391184545406
nibble1 || NAT || 0.0390125031137
suc || {..}1 || 0.0388381165411
nibble_of_nat || TWOELEMENTSETS || 0.0387594808173
finite_psubset || Trees || 0.0387248501236
bNF_Ca829732799finite || c< || 0.0384728460116
int_ge_less_than2 || i_e_s || 0.0384710439399
int_ge_less_than || i_e_s || 0.0384710439399
int_ge_less_than2 || i_n_w || 0.0384710439399
int_ge_less_than || i_n_w || 0.0384710439399
int_ge_less_than2 || i_n_e || 0.0384710439399
int_ge_less_than || i_n_e || 0.0384710439399
int_ge_less_than2 || i_s_w || 0.0384710439399
int_ge_less_than || i_s_w || 0.0384710439399
int_ge_less_than2 || i_w_s || 0.0384710439399
int_ge_less_than || i_w_s || 0.0384710439399
int_ge_less_than2 || i_s_e || 0.0384710439399
int_ge_less_than || i_s_e || 0.0384710439399
pred_nat || REAL+ || 0.0384020039677
nibble_of_nat || arccos || 0.0379384336457
finite_finite2 || {..}1 || 0.0378383880172
nibble0 || op0 {} || 0.0368193338205
nibbleA || 14 || 0.0367227520011
code_pcr_integer code_cr_integer || +16 || 0.036252209149
upt || height0 || 0.0360236098639
bNF_Ca1495478003natLeq || SCM+FSA-Memory || 0.0359922758453
nibbleB || 14 || 0.0358805065409
pred_nat || REAL || 0.0357620907429
nibble8 || 14 || 0.0351580599939
finite_psubset || dom0 || 0.0348554070405
int_ge_less_than2 || dyadic || 0.0347562996292
int_ge_less_than || dyadic || 0.0347562996292
int_ge_less_than2 || k1_integr20 || 0.0346052012985
int_ge_less_than || k1_integr20 || 0.0346052012985
nibble0 || 14 || 0.0339722822801
complex || NAT || 0.033461531062
finite_3 || op0 {} || 0.0334347364881
bNF_Ca829732799finite || c= || 0.0330818292862
nibbleC || 14 || 0.0330287445173
int_ge_less_than2 || i_w_n || 0.0330116097052
int_ge_less_than || i_w_n || 0.0330116097052
int_ge_less_than2 || width || 0.0330116097052
int_ge_less_than || width || 0.0330116097052
int_ge_less_than2 || i_e_n || 0.0330116097052
int_ge_less_than || i_e_n || 0.0330116097052
one2 || 0_NN VertexSelector 1 || 0.0328215319459
pred_nat || COMPLEX || 0.0327645664457
nibbleD || 14 || 0.0326227987582
nibble1 || 14 || 0.0326227987582
default_default || *64 || 0.0323115327205
intrel || ICC || 0.0322988601248
less_than || <NAT,+> || 0.0322190680946
product_unit || NAT || 0.0320521307817
antisym || are_equipotent || 0.0317421290365
nibble1 || Example || 0.031735091012
finite_psubset || Toler_on_subsets || 0.0316957618234
nibbleF || 14 || 0.0315955324847
pred_nat || DYADIC || 0.0315803927421
antisym || r3_tarski || 0.0315284398382
numeral_numeral || {..}3 || 0.0314732892654
member || is_primitive_root_of_degree || 0.0314685600359
finite_psubset || CnS4 || 0.031268500709
bind || #slash#0 || 0.0312467591544
nibble3 || 14 || 0.0307751895626
zero_zero || 0. || 0.0305898674229
finite_psubset || LConSet || 0.0303883251724
finite_psubset || RConSet || 0.0303883251724
nat_of_num || Col || 0.0303594137684
product_size_unit || Mycielskian0 || 0.0302949968466
num_of_nat || TWOELEMENTSETS || 0.0302058709552
default_default || Im20 || 0.0301161938887
default_default || Rea || 0.0301161938887
nibble9 || 14 || 0.0300976640261
one_one || Col || 0.0299391013118
nat || SourceSelector 3 || 0.0299376711576
nibble5 || 14 || 0.029896354863
default_default || Im10 || 0.0298854369615
int_ge_less_than2 || QC-symbols || 0.0298309368272
int_ge_less_than || QC-symbols || 0.0298309368272
abs_abs || {..}1 || 0.0297509165293
bNF_Ca1495478003natLeq || INT- || 0.0296928677655
finite_psubset || Aut || 0.0296531708107
finite_psubset || .103 || 0.0296153451082
finite_psubset || Scott-Convergence || 0.0295580698883
default_default || <k>0 || 0.0295580694865
nibble2 || 14 || 0.0293511371213
default_default || ^28 || 0.0293059285229
nibble4 || 14 || 0.0291862666744
nibbleE || 14 || 0.0290287116063
nibble7 || 14 || 0.0290287116063
code_int_of_integer || product || 0.0288793137425
nibble6 || 14 || 0.028877911506
int_ge_less_than2 || len || 0.0288417516262
int_ge_less_than || len || 0.0288417516262
zero_zero || idseq || 0.0288112146659
finite_psubset || bool || 0.0287553860751
code_int_of_integer || ^25 || 0.0280511192462
set_ord_atMost || L~ || 0.0278272615704
inv_image || #quote#**#quote# || 0.0276653111109
int_ge_less_than2 || ApproxIndex || 0.0275062361575
int_ge_less_than || ApproxIndex || 0.0275062361575
return_list || <NAT,*,1> || 0.0274775332426
return_list || <NAT,+,0> || 0.0274747206273
bNF_Ca829732799finite || r3_tarski || 0.0274493263105
int || REAL || 0.0273552068901
finite_psubset || Toler0 || 0.0272375296021
code_integer || NAT || 0.0272315608077
nat2 || ^25 || 0.0271235259477
one2 || Example || 0.0269973177822
code_natural || sqrreal || 0.0269540295435
int_ge_less_than2 || symplexes || 0.0269229741855
int_ge_less_than || symplexes || 0.0269229741855
finite_psubset || Seg || 0.0268979803113
bNF_Ca1495478003natLeq || TrivialInfiniteTree || 0.0268475319387
one2 || <i> || 0.0268295601237
pred_nat || SCM+FSA-Memory || 0.0266384216025
less_than || INT- || 0.0265895233527
product_unit || 0q0 || 0.026553696979
bNF_Ca1495478003natLeq || S4-Taut || 0.0265401647316
num || VAR || 0.0264226623329
product_unit || 1r || 0.026409934641
suc || dl. || 0.0260320421703
finite_psubset || *64 || 0.0260031685291
nat_of_num || cpx2euc || 0.0259155091754
nat_of_num || Moebius || 0.0258928757778
product_size_unit || elementary_tree || 0.0258080235461
gcd_lcm || -SD_Sub_S || 0.0257983709149
default_default || index_of || 0.0257205318255
int_ge_less_than2 || k5_moebius2 || 0.0257009126334
int_ge_less_than || k5_moebius2 || 0.0257009126334
upt || SubstitutionSet || 0.0253380080369
num_of_nat || arccos || 0.0252177524945
int || Trivial-addLoopStr || 0.0250866580738
nibble0 || EdgeSelector 2 || 0.0250591757334
int_ge_less_than2 || Entropy || 0.0247102870173
int_ge_less_than || Entropy || 0.0247102870173
int_ge_less_than2 || -SD_Sub || 0.024534374607
int_ge_less_than || -SD_Sub || 0.024534374607
int_ge_less_than2 || -SD_Sub_S || 0.024534374607
int_ge_less_than || -SD_Sub_S || 0.024534374607
nibbleA || Example || 0.0245263311652
nibble1 || op0 {} || 0.0244704583472
gcd_gcd || -SD_Sub_S || 0.0244634011321
one2 || EdgeSelector 2 || 0.0244591779754
code_natural || *31 || 0.0242920012606
int_ge_less_than2 || Normal_forms_on || 0.0242350039518
int_ge_less_than || Normal_forms_on || 0.0242350039518
less_than || SCM-Memory || 0.0242066662426
product_unit || <i> || 0.0241310163469
nat || IPC-Taut || 0.0238695285661
nibbleB || Example || 0.0238579968651
default_default || #quote#20 || 0.0237838588196
finite_psubset || the_proper_Tree_of || 0.0236982177418
finite_psubset || S-most || 0.0235975704646
product_size_unit || !5 || 0.0235956121434
less_than || TrivialInfiniteTree || 0.0235507795581
nat || *63 || 0.023539415469
default_default || ^31 || 0.0235389132219
nat || <j> || 0.0235385870895
code_pcr_integer code_cr_integer || *31 || 0.0233906512307
finite_psubset || ConSet || 0.0233286652455
nibble8 || Example || 0.0232883499146
return_list || SourceSelector 3 || 0.0232692306518
finite_psubset || W-most || 0.0232597330068
bNF_Ca829732799finite || are_equipotent || 0.023242227307
finite_psubset || E-most || 0.0232383155179
upto || k3_fuznum_1 || 0.0232217289008
finite_psubset || OwnSymbolsOf0 || 0.0231979267162
finite_psubset || N-most || 0.0231368442333
int_ge_less_than2 || -SD0 || 0.0230663928627
int_ge_less_than || -SD0 || 0.0230663928627
bNF_Ca1495478003natLeq || continuum || 0.02302376354
product_unit || sec || 0.0229687918561
transitive_trancl || multMagma0 || 0.0229230190854
bNF_Ca1495478003natLeq || SCM-Memory || 0.022903696157
default_default || len- || 0.0228878228096
binomial || |14 || 0.0227712519583
binomial || |21 || 0.0226551947003
less_than || <NAT,*> || 0.0226318764591
pred_nat || S4-Taut || 0.0225436022156
int_ge_less_than2 || Toler_on_subsets || 0.0224067109886
int_ge_less_than || Toler_on_subsets || 0.0224067109886
code_integer_of_nat || <*..*>4 || 0.0223618080578
fract || |8 || 0.0220989662339
sin_coeff || ^25 || 0.0220423916949
nibble_of_nat || width || 0.022026632539
neg || root-tree0 || 0.0220119866072
pred_nat || *30 || 0.0220031894837
upt || k3_fuznum_1 || 0.0219746095298
int_ge_less_than2 || MidOpGroupObjects || 0.0217128643348
int_ge_less_than || MidOpGroupObjects || 0.0217128643348
int_ge_less_than2 || AbGroupObjects || 0.0217128643348
int_ge_less_than || AbGroupObjects || 0.0217128643348
size_num || Mycielskian0 || 0.0216898246861
less_than || 1[01] || 0.0216820770321
less_than || 0[01] || 0.0216820770321
nat_of_nibble || !5 || 0.0216469645016
pred_nat || +20 || 0.0216297620877
nibbleC || Example || 0.0216295422448
finite_psubset || -SD_Sub || 0.0216196440224
upto || height0 || 0.0214528354623
size_num || !5 || 0.0214027148328
nibbleD || Example || 0.0213168046736
nat_of_nibble || cos || 0.0213096320673
upt || ||....||2 || 0.0212865815617
num || sec || 0.0211328764282
upto || ||....||2 || 0.0210059855026
nat_of_nibble || elementary_tree || 0.0209927469693
size_num || elementary_tree || 0.0209724138983
nibbleA || TargetSelector 4 || 0.0209077467716
code_integer || 1r || 0.0208969231247
default_default || lim || 0.0208760778708
num_of_nat || InsCode || 0.0208752192967
less_than || CPC-Taut || 0.0208348173746
nibbleB || TargetSelector 4 || 0.0206175335645
finite_psubset || Subgroups || 0.0205582539382
nibbleF || Example || 0.0205305532208
nibble0 || k5_ordinal1 || 0.020525483332
sublist || *18 || 0.0204571972942
product_unit || EdgeSelector 2 || 0.0204376687143
nibble8 || TargetSelector 4 || 0.0203646579656
product_size_unit || ConwayDay || 0.0203600166625
product_unit || 1q0 || 0.0203446079868
product_unit || k2_moebius2 || 0.0202767744636
product_unit || k1_moebius2 || 0.0202767744636
nibble1 || EdgeSelector 2 || 0.0202758353732
sup_sup || NOT1 || 0.0202481180716
re || Moebius || 0.0200348771464
inf_inf || NOT1 || 0.0200254659346
nat || SCM+FSA || 0.0199424468039
nibble0 || TargetSelector 4 || 0.0199413913791
nibble3 || Example || 0.0199080487517
map || multLoopStr0 || 0.0198048438862
finite_psubset || bool3 || 0.0196927914289
nibbleC || TargetSelector 4 || 0.019596991843
bit0 || {..}1 || 0.0195409372791
map || {..}4 || 0.0195354294518
nibbleD || TargetSelector 4 || 0.0194466679527
nibble1 || TargetSelector 4 || 0.0194466679527
nibble9 || Example || 0.0193975647839
im || ^31 || 0.0193666823274
dvd_dvd || are_congruent_mod || 0.0193562240252
pred_nat || INT || 0.0193213389503
nat_of_nibble || Mycielskian0 || 0.0192989936255
bind || RightModule || 0.0192577287982
nibble5 || Example || 0.0192465283985
int_ge_less_than2 || *57 || 0.0191868431051
int_ge_less_than || *57 || 0.0191868431051
int_ge_less_than2 || HFuncs || 0.0191868431051
int_ge_less_than || HFuncs || 0.0191868431051
nat || <i>0 || 0.0191610200816
nat || SCM || 0.0191411071168
product_unit || sin1 || 0.0190978638977
sgn_sgn || {..}1 || 0.0190724093391
sup_sup || permutations || 0.0190683448346
bit1 || RN_Base || 0.0190630330571
nibbleF || TargetSelector 4 || 0.0190602843538
dup || \not\11 || 0.0190567927137
cos_coeff || Leaves || 0.0190328145076
zero_zero || 1.REAL || 0.0189290986571
inf_inf || permutations || 0.0188698315059
nibble2 || Example || 0.018838950364
upto || delta1 || 0.0188156183931
upto || dist || 0.0188156183931
pred_list || are_orthogonal1 || 0.0187786201267
nibble3 || TargetSelector 4 || 0.0187453681523
nibble4 || Example || 0.0187161293477
cofinite || NOT1 || 0.0186111135777
nibbleE || Example || 0.0185989442763
nibble7 || Example || 0.0185989442763
int_ge_less_than2 || GroupObjects || 0.0185793194454
int_ge_less_than || GroupObjects || 0.0185793194454
code_integer || -66 || 0.0185476072474
listsp || are_orthogonal1 || 0.0185420444153
nibble6 || Example || 0.018486954185
nibble9 || TargetSelector 4 || 0.0184808589886
nibble5 || TargetSelector 4 || 0.0184014776241
measure || Sum0 || 0.0183344488861
int || k5_ordinal1 || 0.01824280035
size_num || ConwayDay || 0.0182152493851
upt || delta1 || 0.0182061291601
upt || dist || 0.0182061291601
nibble2 || TargetSelector 4 || 0.0181846307016
product_size_unit || cos || 0.0181485390825
finite_psubset || lambda0 || 0.018138198566
nibble4 || TargetSelector 4 || 0.018118517342
product_unit || Z_2 || 0.0180974986156
bit1 || denominator0 || 0.0180649283597
nibbleE || TargetSelector 4 || 0.018055100117
nibble7 || TargetSelector 4 || 0.018055100117
finite_card || UBD || 0.0180134070531
nibble6 || TargetSelector 4 || 0.0179941830815
size_nibble || dom0 || 0.0179504322041
product_Unity || 14 || 0.0179458750007
int_ge_less_than2 || Catalan || 0.0179278016854
int_ge_less_than || Catalan || 0.0179278016854
num || sin1 || 0.0176713941018
finite_psubset || the_Tree_of || 0.0176461132399
pred_list || are_orthogonal0 || 0.017643302387
int_ge_less_than2 || vol || 0.0175876877874
int_ge_less_than || vol || 0.0175876877874
nibble0 || 0_NN VertexSelector 1 || 0.0175797465383
int_ge_less_than2 || k4_rvsum_3 || 0.017529077165
int_ge_less_than || k4_rvsum_3 || 0.017529077165
default_default || base- || 0.017518208669
default_default || limit- || 0.017518208669
int_ge_less_than2 || RingObjects || 0.0174904722299
int_ge_less_than || RingObjects || 0.0174904722299
listsp || are_orthogonal0 || 0.0174333034583
less_than || 0 || 0.0173506575422
sup_sup || derangements || 0.0173396399301
finite_card || BDD || 0.0172883106554
size_num || cos || 0.0172838321627
inf_inf || derangements || 0.0171741041731
plus_plus || #bslash# || 0.0171692175485
trans || is_quadratic_residue_mod || 0.0170973530115
equiv_equivp || in || 0.0170521647046
normal1132893779malize || NOT1 || 0.0169369531245
real || NAT || 0.0168780642453
bNF_Ca1495478003natLeq || 0 || 0.0168662943217
semiring_1_of_nat || -tuples_on || 0.0168494768863
nat || REAL+ || 0.0168402652529
product_unit || set-constr || 0.0167960039783
product_case_unit || |^24 || 0.016791244834
product_rec_unit || |^24 || 0.016791244834
re || ^25 || 0.0166848143836
nat || CPC-Taut || 0.0165844158863
pred_nat || continuum || 0.0165359896263
times_times || #bslash# || 0.0165301039984
upto || .cost()0 || 0.0164254052972
int_ge_less_than2 || cf || 0.0163732763725
int_ge_less_than || cf || 0.0163732763725
plus_plus || #bslash##slash# || 0.0163480796623
product_unit || Im30 || 0.016303427168
int_ge_less_than2 || frac || 0.0162857894189
int_ge_less_than || frac || 0.0162857894189
cofinite || permutations || 0.0162843046973
int_ge_less_than2 || .order() || 0.0161630332505
int_ge_less_than || .order() || 0.0161630332505
complex || 1q0 || 0.0161419107435
upt || .cost()0 || 0.0161005468857
finite_psubset || CnCPC || 0.0160581695103
size_num || tree0 || 0.0160559616629
times_times || #bslash##slash# || 0.0160501454175
bNF_Ca1495478003natLeq || VAR || 0.0160011722921
arg || ^25 || 0.0159822341124
nibbleA || NAT || 0.0159369899669
int_ge_less_than2 || nextcard || 0.0159362467398
int_ge_less_than || nextcard || 0.0159362467398
finite_psubset || variables_in4 || 0.0158995091076
sup_sup || CompleteSGraph || 0.0158974002132
upto || len3 || 0.0158922283662
nibbleB || NAT || 0.0157623282112
inf_inf || CompleteSGraph || 0.015757159913
nat || RAT+ || 0.0157505443152
nat_of_nibble || ConwayDay || 0.0157018639162
im || Leaves || 0.0156469653603
upt || len3 || 0.0156241247975
finite_psubset || Family_open_set0 || 0.015620348995
nibble8 || NAT || 0.0156092988742
set || OpSymbolsOf || 0.0156018256768
pred_nat || SCM-Memory || 0.015562012721
pred_nat || INT- || 0.0155548294694
int_ge_less_than2 || denominator || 0.0155350120877
int_ge_less_than || denominator || 0.0155350120877
normal1132893779malize || permutations || 0.0155345204619
product_case_unit || *14 || 0.0155294096989
product_rec_unit || *14 || 0.0155294096989
splice || *110 || 0.0155180695447
complex || op0 {} || 0.0154628208638
set || carrier || 0.0154424960701
complex || <i>0 || 0.0154377685124
code_pcr_natural code_cr_natural || +51 || 0.0154341111878
semilattice || are_equipotent || 0.0153970685461
wf || is_quadratic_residue_mod || 0.0153075689559
wf || in || 0.0152833648508
nat || COMPLEX || 0.0152013032412
bNF_Ca1495478003natLeq || EdgeSelector 2 || 0.0151911402875
lattic35693393ce_set || are_equipotent || 0.0151712336924
set || ConSet || 0.0151703758534
im || Rea || 0.0151665710042
im || Im20 || 0.0151567604043
one2 || 0c || 0.0151554403884
nibbleC || NAT || 0.0151398844007
suc || LeftComp || 0.0151239136221
nibble1 || 0_NN VertexSelector 1 || 0.0151220543155
im || Im10 || 0.0151028364766
nibbleA || EdgeSelector 2 || 0.015102330867
bit0 || RN_Base || 0.0150801013201
pred_nat || k1_finance2 || 0.015067387973
nibbleD || NAT || 0.0150470972871
int_ge_less_than2 || Center || 0.0150345830421
int_ge_less_than || Center || 0.0150345830421
gen_length || +10 || 0.0149925608518
suc || RightComp || 0.0149758631828
complex || <j> || 0.0149570996784
complex || *63 || 0.0149560136277
nibbleB || EdgeSelector 2 || 0.0149370130962
nat2 || EdgeSelector 2 || 0.0149284433147
int_ge_less_than2 || card0 || 0.0148888365296
int_ge_less_than || card0 || 0.0148888365296
product_unit || 0_NN VertexSelector 1 || 0.0148366141633
removeAll || *18 || 0.0148236998522
upto || the_set_of_l2ComplexSequences || 0.0148204545219
nibbleF || NAT || 0.0148072813369
nibble8 || EdgeSelector 2 || 0.014792167284
ord_max || #bslash# || 0.0147907727614
nat || TargetSelector 4 || 0.0147836847665
ord_min || #bslash# || 0.0147783213805
finite_psubset || On || 0.0147727649224
finite_psubset || ElementaryInstructions || 0.0147607805937
num_of_nat || width || 0.014754625947
sup_sup || sproduct || 0.0146762018288
upt || the_set_of_l2ComplexSequences || 0.014658497847
nibble3 || NAT || 0.0146104021902
inf_inf || sproduct || 0.0145557796475
product_Unity || Example || 0.0145420296427
finite_psubset || Seg0 || 0.0144913548063
bit0 || denominator0 || 0.0144469540485
nibble9 || NAT || 0.014444039937
left_unique || is_a_unity_wrt || 0.0144366913074
nibble5 || NAT || 0.0143939344642
csqrt || \not\11 || 0.0143931485109
nibble1 || k5_ordinal1 || 0.0143857696868
pred_numeral || elementary_tree || 0.0143556294544
nibbleC || EdgeSelector 2 || 0.0143478370135
left_total || is_a_unity_wrt || 0.0142842845813
nibbleD || EdgeSelector 2 || 0.0142600048504
nibble2 || NAT || 0.0142566374592
sqrt || \not\11 || 0.0142472595731
nat || SCM-Memory || 0.0142228699583
finite_psubset || sproduct || 0.0142203799575
nibble4 || NAT || 0.0142146538851
right_unique || is_a_unity_wrt || 0.0142127355979
default_default || Sum^ || 0.0141879874303
nibbleE || NAT || 0.0141743278586
nibble7 || NAT || 0.0141743278586
upto || ||....||3 || 0.0141426636907
nibble6 || NAT || 0.0141355412489
int_ge_less_than2 || sproduct || 0.0140849725286
int_ge_less_than || sproduct || 0.0140849725286
nibble_of_nat || InsCode || 0.0140517642154
sub || * || 0.0140431336634
upt || ||....||3 || 0.0140421692885
nibbleF || EdgeSelector 2 || 0.0140329902542
product_case_unit || Fdfl || 0.0140119629683
product_rec_unit || Fdfl || 0.0140119629683
product_case_unit || Finf || 0.0140119629683
product_rec_unit || Finf || 0.0140119629683
one2 || k5_ordinal1 || 0.0139792908247
product_unit || INT.Group1 || 0.0139586042041
code_sub || * || 0.0139555309401
int_ge_less_than2 || |....|2 || 0.0139369814843
int_ge_less_than || |....|2 || 0.0139369814843
arcsin || \not\11 || 0.0139277215903
div_mod || #bslash# || 0.0138800128723
int_ge_less_than2 || k1_numpoly1 || 0.0138552494102
int_ge_less_than || k1_numpoly1 || 0.0138552494102
nibble3 || EdgeSelector 2 || 0.0138466149559
nat2 || proj1 || 0.0138141481683
set || sigma || 0.0137976120327
less_than || SCM+FSA-Instr || 0.0137526850109
pred_numeral || !5 || 0.0137040939169
nibble9 || EdgeSelector 2 || 0.0136891245096
nibble5 || EdgeSelector 2 || 0.0136416903697
id_on || ^7 || 0.0136070500241
pred_nat || TrivialInfiniteTree || 0.013600708582
normal1132893779malize || derangements || 0.013595361574
transitive_trancl || #bslash##slash#0 || 0.0135830409881
ord_max || #bslash##slash# || 0.0135564713408
ord_min || #bslash##slash# || 0.0135460095037
default_default || ord-type || 0.0135200062245
nibble2 || EdgeSelector 2 || 0.0135117115694
code_dup || \not\11 || 0.0135028069039
right_total || is_a_unity_wrt || 0.0134834432089
nibble4 || EdgeSelector 2 || 0.0134719653129
int || 1r || 0.0134577524247
nibbleE || EdgeSelector 2 || 0.0134337880563
nibble7 || EdgeSelector 2 || 0.0134337880563
nibble6 || EdgeSelector 2 || 0.0133970679882
left_unique || is_distributive_wrt0 || 0.0133896524856
sup_sup || -SD0 || 0.0133485075612
complex || REAL || 0.0132940166676
cofinite || derangements || 0.0132707566135
product_unit || Benzene || 0.0132420502924
left_total || is_distributive_wrt0 || 0.0132379411154
inf_inf || -SD0 || 0.0132176850675
bi_total || is_a_unity_wrt || 0.0131945464899
drop || *18 || 0.0131920036283
product_case_unit || Fint || 0.0131903244286
product_rec_unit || Fint || 0.0131903244286
product_case_unit || Fcl || 0.0131903244286
product_rec_unit || Fcl || 0.0131903244286
int_ge_less_than2 || Arg || 0.0131742931797
int_ge_less_than || Arg || 0.0131742931797
right_unique || is_distributive_wrt0 || 0.0131667946306
splice || +10 || 0.0131299465585
set || the_Options_of || 0.0130982935697
zero_zero || [[0]] || 0.0130936412545
nat_of_nibble || carrier || 0.0130886577569
pred_numeral || cos || 0.0130824793038
less_than || y>=0-plane || 0.0130742258616
one2 || 14 || 0.0129977677012
ord_less_eq || in1 || 0.0129767732138
set || CnIPC || 0.0129468919081
upto || frac0 || 0.0129413554443
upt || frac0 || 0.0129385601913
set || !5 || 0.0129034332977
set || W-min || 0.012900936726
upt || prob || 0.0128985791388
upto || prob || 0.0128981337199
product_case_unit || Shift3 || 0.0128655188937
product_rec_unit || Shift3 || 0.0128655188937
bi_unique || is_a_unity_wrt || 0.012828490923
sup_sup || Fin || 0.0128143936014
less_than || VAR || 0.0128045273762
ii || SourceSelector 3 || 0.0127993518189
nat_of_nibble || tree0 || 0.0127947723229
div_mod || #bslash##slash# || 0.0127873560643
finite_psubset || Family_open_set || 0.0127835231846
cnj || \not\11 || 0.0127314085535
inf_inf || Fin || 0.0127213298752
less_than || *31 || 0.0126938230202
arctan || \not\11 || 0.0126849016581
product_Unity || EdgeSelector 2 || 0.0126835032427
nat || y=0-line || 0.0126806554099
bNF_Ca1495478003natLeq || CPC-Taut || 0.0126655648194
id || 0_Rmatrix0 || 0.012612802782
ii || Example || 0.0125762624361
nat || SCM-Instr || 0.0125734828022
minus_minus || #bslash# || 0.0125594836259
ii || P_t || 0.0125389137894
set || E-max || 0.0125333132295
right_total || is_distributive_wrt0 || 0.0124443931985
divide_divide || #bslash# || 0.0123877505698
dropWhile || *18 || 0.0123697784384
has_ve2132708402vative || {..}1 || 0.0123690939346
remove1 || *18 || 0.0123167844944
int_ge_less_than2 || *64 || 0.0122652867544
int_ge_less_than || *64 || 0.0122652867544
nibbleA || k5_ordinal1 || 0.0122651998187
sup_sup || Seg || 0.012244788231
sup_sup || *0 || 0.012244018487
filter2 || *18 || 0.0122349548345
one_one || +45 || 0.0122179049337
pred_numeral || Mycielskian0 || 0.0121976893991
code_Pos || {..}1 || 0.0121719584627
inf_inf || Seg || 0.0121682701206
bi_total || is_distributive_wrt0 || 0.0121596388511
inf_inf || *0 || 0.0121586414294
top_top || *64 || 0.0121464948927
divide_divide || #bslash##slash# || 0.0120928298619
trans || is_differentiable_on1 || 0.0120907836247
normal1132893779malize || CompleteSGraph || 0.0120793198594
sup_sup || Bags || 0.0120784496341
sup_sup || product || 0.0120588563618
product_Unity || TargetSelector 4 || 0.0120552959735
nibbleB || k5_ordinal1 || 0.0120458348668
takeWhile || *18 || 0.0120424531668
nat || one || 0.0120206383019
minus_minus || #bslash##slash# || 0.0120095362483
inf_inf || Bags || 0.0119952426205
product_size_unit || tree0 || 0.0119811342342
inf_inf || product || 0.0119759043241
pow || hcf || 0.0119473078093
nat_of_num || FinSETS || 0.0119398369939
product_case_unit || |^15 || 0.01190367479
product_rec_unit || |^15 || 0.01190367479
measure || ^7 || 0.0118609779215
nibble8 || k5_ordinal1 || 0.011856091393
int_ge_less_than2 || proj1 || 0.0118321220109
int_ge_less_than || proj1 || 0.0118321220109
pred_nat || omega || 0.0118229444148
nibble_of_nat || <k>0 || 0.0118041675372
bi_unique || is_distributive_wrt0 || 0.0117999907611
uminus_uminus || #slash# || 0.0117392169239
bot_bot || *64 || 0.0117266768726
int_ge_less_than2 || ^omega || 0.0115967498285
int_ge_less_than || ^omega || 0.0115967498285
int_ge_less_than2 || CnPos || 0.0115850768377
int_ge_less_than || CnPos || 0.0115850768377
pow || mod^ || 0.011568030748
pow || $^ || 0.011568030748
less_than || EdgeSelector 2 || 0.0115035264516
default_default || |^5 || 0.0114943715946
less_than || +21 || 0.0114858312231
sup_sup || bool || 0.0114721599033
code_pcr_natural code_cr_natural || *78 || 0.0113982881436
inf_inf || bool || 0.0113966636979
code_pcr_integer code_cr_integer || *78 || 0.0113246191681
dup || Leaves || 0.0113209090916
top_top || Im20 || 0.0113162605913
top_top || Rea || 0.0113162605913
one_one || CompleteRelStr || 0.0113137023825
nibbleC || k5_ordinal1 || 0.0112879658565
measure || ConsecutiveSet2 || 0.0112853448975
measure || ConsecutiveSet || 0.0112853448975
top_top || Im10 || 0.011282418411
int_ge_less_than2 || the_Tree_of || 0.0112614739538
int_ge_less_than || the_Tree_of || 0.0112614739538
splice || +9 || 0.0112449312699
take || *18 || 0.0112359437393
top_top || <k>0 || 0.0112339145295
transitive_trancl || exp4 || 0.0112047848107
pred_numeral || ConwayDay || 0.0111824107117
nibbleD || k5_ordinal1 || 0.0111780901507
code_integer || op0 {} || 0.0111747715123
finite_psubset || BCK-part || 0.0111590818381
finite_psubset || AtomSet || 0.0111590818381
product_case_unit || *109 || 0.0111249104467
product_rec_unit || *109 || 0.0111249104467
cofinite || CompleteSGraph || 0.0111188686195
code_pcr_integer code_cr_integer || +51 || 0.0110912983648
pred_nat || CPC-Taut || 0.0110886682123
bot_bot || NOT1 || 0.0110645191342
nat || IVERUM || 0.0110115815365
default_default || sech || 0.0110075723626
upto || SubstitutionSet || 0.0109471072682
finite_psubset || sup3 || 0.0109462979349
bot_bot || Im20 || 0.0109249770783
bot_bot || Rea || 0.0109249770783
nibbleF || k5_ordinal1 || 0.010897711468
default_default || |....| || 0.0108938011816
bot_bot || Im10 || 0.0108934301577
normal1132893779malize || sproduct || 0.0108644739098
suc || 0. || 0.0108606615568
bot_bot || <k>0 || 0.0108482046003
less_than || +16 || 0.0107720495082
normal1132893779malize || -SD0 || 0.0107244677368
code_integer_of_num || <*..*>4 || 0.010712273829
nibble3 || k5_ordinal1 || 0.0106713463492
sqr || pr1 || 0.0106633642996
measures || ^7 || 0.010541162026
pred_nat || 0_NN VertexSelector 1 || 0.0105334546974
bot_bot || permutations || 0.0105043461246
nibble9 || k5_ordinal1 || 0.0104826939519
pred_numeral || tree0 || 0.010476566533
id_on || ConsecutiveSet2 || 0.0104669747572
id_on || ConsecutiveSet || 0.0104669747572
measure || Product1 || 0.0104516911279
nat_of_num || Mycielskian0 || 0.010445420204
nibble5 || k5_ordinal1 || 0.0104263395492
int_ge_less_than2 || diameter || 0.0104011120027
int_ge_less_than || diameter || 0.0104011120027
product_case_unit || |^14 || 0.0103715454418
product_rec_unit || |^14 || 0.0103715454418
num_of_nat || <k>0 || 0.0103662813882
im || ^25 || 0.0103539537471
finite_psubset || lim_sup || 0.010348821501
num_of_nat || UsedIntLoc || 0.0103299840205
finite_psubset || cliquecover#hash# || 0.010329642628
pow || -^ || 0.0103221380222
product_size_unit || carrier || 0.0103130429333
default_default || Im3 || 0.010299931283
nibble2 || k5_ordinal1 || 0.0102730078241
default_default || Re2 || 0.0102348824159
nibble4 || k5_ordinal1 || 0.0102264368874
left_unique || is_an_inverseOp_wrt || 0.0101948818649
nibbleE || k5_ordinal1 || 0.0101818428262
nibble7 || k5_ordinal1 || 0.0101818428262
pow || ^\ || 0.0101497211941
nibble6 || k5_ordinal1 || 0.0101390783463
sqrt || *1 || 0.0101120188444
left_total || is_an_inverseOp_wrt || 0.0100567297887
product_case_unit || Reloc || 0.0100413365043
product_rec_unit || Reloc || 0.0100413365043
size_num || carrier || 0.0100243986012
nat || {}2 || 0.0100097382968
right_unique || is_an_inverseOp_wrt || 0.00999212989903
rotate1 || Half || 0.00996295634373
append || *110 || 0.00996294386396
int_ge_less_than2 || topology || 0.00994051582262
int_ge_less_than || topology || 0.00994051582262
product_unit || INT.Ring0 || 0.00988630454292
transitive_trancl || +*0 || 0.00986007187379
one_one || Seg || 0.00985576088297
one_one || 1.REAL || 0.00983054703001
sqr || pr2 || 0.00982570681534
sqr || firstdom || 0.00982570681534
set || proj4_4 || 0.00980103112942
nat || <i> || 0.00975956595734
condit1810911227_above || NOT1 || 0.0097449117734
transitive_rtrancl || ^7 || 0.00973999411205
normal1132893779malize || Seg || 0.00973111876764
code_natural || 0_NN VertexSelector 1 || 0.00968281085101
bot_bot || derangements || 0.00966734959158
product_Unity || k5_ordinal1 || 0.00963864526864
int || COMPLEX || 0.00963849700107
code_pcr_natural code_cr_natural || sin1 || 0.00962900455491
sublist || BCI-power || 0.00962807839489
nibble_of_nat || `1 || 0.00959575561265
nibble_of_nat || `2 || 0.00956865606722
equiv_part_equivp || in || 0.00954943067718
finite_psubset || InnerVertices || 0.00954891046554
cofinite || sproduct || 0.00953619920125
gen_length || -1 || 0.00951756164813
transitive_trancl || ^7 || 0.00950776084725
int_ge_less_than2 || |....| || 0.00949690281622
int_ge_less_than || |....| || 0.00949690281622
zero_zero || TOP-REAL || 0.00946679823565
times_times || {..}1 || 0.00944911600568
antisym || is_quadratic_residue_mod || 0.00940777621135
finite_psubset || bool0 || 0.00936811126943
splice || +2 || 0.00934594763839
right_total || is_an_inverseOp_wrt || 0.00934303065852
int_ge_less_than2 || k1_matrix_0 || 0.00933414445781
int_ge_less_than || k1_matrix_0 || 0.00933414445781
product_unit || F_Complex || 0.00933100795028
product_Unity || op0 {} || 0.00931874256274
measure || FinMeetCl || 0.00925627543102
measures || ConsecutiveSet2 || 0.00923735321757
measures || ConsecutiveSet || 0.00923735321757
int_ge_less_than2 || dom0 || 0.00923054338365
int_ge_less_than || dom0 || 0.00923054338365
append || -1 || 0.00919560111331
transp || in || 0.00917654268578
code_integer || sqrreal || 0.00916854567069
symp || in || 0.0091448236038
normal1132893779malize || Fin || 0.00912607904349
one2 || TargetSelector 4 || 0.00912209333732
id || +45 || 0.00912004021125
finite_psubset || union0 || 0.00911946392059
pos || {..}1 || 0.00909423026237
bi_total || is_an_inverseOp_wrt || 0.00909060495643
set || {..}1 || 0.00908692950039
ord_max || 0_Rmatrix0 || 0.0090343786713
distinct || are_equipotent || 0.00902623531232
ord_min || 0_Rmatrix0 || 0.00901501672645
product_unit || -infty || 0.00899927012437
numeral_numeral || {..}1 || 0.00899004120786
bitM || pr1 || 0.00897472142397
condit1810911227_above || permutations || 0.0089690430414
set || nabla || 0.00896717059182
int_ge_less_than2 || *1 || 0.00896615066341
int_ge_less_than || *1 || 0.00896615066341
product_case_unit || *32 || 0.00895511074264
product_rec_unit || *32 || 0.00895511074264
bot_bot || CompleteSGraph || 0.00895372518626
finite_psubset || *1 || 0.00895328253019
product_unit || +infty || 0.00894257313241
finite_psubset || chromatic#hash# || 0.00893185378461
product_case_unit || k8_compos_0 || 0.00893184747226
product_rec_unit || k8_compos_0 || 0.00893184747226
nat_of_num || elementary_tree || 0.00890671710564
removeAll || NF0 || 0.00889850628992
default_default || arccos || 0.00884304691382
finite_psubset || k1_latticea || 0.00883560166573
sqr || apply || 0.00882859605637
bi_unique || is_an_inverseOp_wrt || 0.00877457666324
default_default || 0. || 0.00876195522546
finite_psubset || NonZero || 0.00874251829875
splice || +89 || 0.00872538043632
splice || -1 || 0.00872466617206
pred_nat || 0 || 0.00870923114586
product_case_unit || *158 || 0.00870861585188
product_rec_unit || *158 || 0.00870861585188
cis || Leaves || 0.00868235364621
set || k1_int_8 || 0.00867675738849
default_default || arity || 0.00866702061533
int_ge_less_than2 || carrier || 0.0086618495657
int_ge_less_than || carrier || 0.0086618495657
pow || ConsecutiveSet2 || 0.00865871386287
pow || ConsecutiveSet || 0.00865871386287
product_unit || <e1> || 0.00863382600662
normal1132893779malize || *0 || 0.00861937477996
bNF_Ca829732799finite || is_quadratic_residue_mod || 0.00858643513666
append || +9 || 0.00858482583677
set || IConSet || 0.00857328288204
nat_of_num || tree0 || 0.00853436530815
bNF_Ca1495478003natLeq || SCM+FSA-Instr || 0.00853156681887
sqr || the_transitive-closure_of || 0.00849674757713
product_unit || <e2> || 0.00849656218926
set || the_normal_subgroups_of || 0.00849295356628
normal1132893779malize || Bags || 0.008474456784
butlast || Half || 0.00846244279725
csqrt || Leaves || 0.00845875230083
normal1132893779malize || product || 0.00845737098784
pow || -24 || 0.00845517326933
semiring_1_of_nat || NOT1 || 0.00845411171719
nibble0 || TriangleGraph || 0.00843566551029
num_of_nat || `1_31 || 0.00840214800669
append || +10 || 0.00839881712538
remdups_adj || Half || 0.00838734297761
nibble_of_nat || Sum4 || 0.0083678122215
product_unit || <e3> || 0.00836055728112
bitM || pr2 || 0.00835562003182
bitM || firstdom || 0.00835562003182
bot_bot || sproduct || 0.00833813849983
ord_less_eq || are_congruent_mod || 0.00833057454701
remdups || Half || 0.00831637835553
transitive_trancl || (#hash#)12 || 0.00828722208568
transitive_trancl || (#hash#)11 || 0.00828722208568
code_natural || sin0 || 0.00827833282028
product_case_unit || BCI-power || 0.00823465114505
product_rec_unit || BCI-power || 0.00823465114505
pred_numeral || carrier || 0.00821789613443
set || RelSymbolsOf || 0.00819372583621
set || omega0 || 0.00819353614638
set || k3_rvsum_3 || 0.00818313742479
bNF_Ca1495478003natLeq || y>=0-plane || 0.00817452534256
product_case_unit || GenFib || 0.00808442425204
product_rec_unit || GenFib || 0.00808442425204
finite_psubset || k1_rvsum_3 || 0.00805176229381
set || InnAut || 0.00804457409665
gen_length || *110 || 0.00803811450781
set || LettersOf || 0.00803653422255
nibble_of_nat || Product2 || 0.00801564948397
numeral_numeral || Rank || 0.00800527060817
sqr || k15_trees_3 || 0.00800296394938
default_default || 1. || 0.00798606573707
semiring_1_of_nat || permutations || 0.00797212034132
normal1132893779malize || bool || 0.00795191201888
ord_max || +45 || 0.00794635245719
set || LowerCompoundersOf || 0.00792169055085
set || OwnSymbolsOf0 || 0.00792169055085
finite_psubset || [#slash#..#bslash#] || 0.0078961154258
pow || #bslash#+#bslash# || 0.00789408202278
ord_min || +45 || 0.00788928282236
condit1810911227_above || derangements || 0.00788835878921
measures || FinMeetCl || 0.00788387642898
dropWhile || NF0 || 0.00786102073787
int || Z_3 || 0.00785873039748
nibble_of_nat || Rea || 0.00781908116339
sqr || disjoin || 0.00781167129042
remove1 || NF0 || 0.00779830048627
wf || is_differentiable_on1 || 0.00779172302194
finite_psubset || Upper_Arc || 0.00777147445463
sqr || proj4_4 || 0.0077647774269
num_of_nat || Inv0 || 0.00776343227299
default_default || Catalan || 0.00776206702229
finite_psubset || Lower_Arc || 0.00775300238434
product_unit || 0c || 0.00774834479532
nat_of_num || cos || 0.00774035777091
code_integer_of_num || Moebius || 0.00773195601193
cis || <*..*>4 || 0.00772352640001
inf_inf || *18 || 0.00769650270516
int || ConwayZero0 || 0.00768584479268
tl || Half || 0.00768498877404
set || Irr || 0.00767825463449
nibble_of_nat || Im20 || 0.00766466289388
bit1 || |^5 || 0.00765861446968
ii || EdgeSelector 2 || 0.00765566599222
bot_bot || 1. || 0.00765238853534
linorder_sorted || are_equipotent || 0.00764907722833
set || lambda0 || 0.00763338249075
nibble_of_nat || Im10 || 0.00762991003798
complete_Sup_Sup || NOT1 || 0.0076281039921
int || VERUM2 || 0.0076156418465
bitM || apply || 0.00760782769255
default_default || Euler || 0.0075914326532
nibble_of_nat || `1_31 || 0.00758237919399
id2 || the_transitive-closure_of || 0.00756443405382
id2 || succ1 || 0.00755746654724
finite_psubset || proj1 || 0.0075238982701
product_unit || P_t || 0.00750939962552
sqr || ProperPrefixes || 0.00750036626392
cofinite || -SD0 || 0.00749345682554
cofinite || Fin || 0.00749061469913
takeWhile || NF0 || 0.00748042186477
cofinite || Seg || 0.00746374248468
sqr || proj1 || 0.0074436044666
bot_bot || -SD0 || 0.00739649252281
numeral_numeral || -tuples_on || 0.00739176468608
abs_Nat || elementary_tree || 0.00738989762617
id2 || [*] || 0.00738648666291
bot_bot || Fin || 0.00737884567654
bot_bot || Seg || 0.00737561814335
set || R_Algebra_of_BoundedLinearOperators || 0.00736928265751
bitM || the_transitive-closure_of || 0.00735587038609
nat_of_num || !5 || 0.0073538289153
set || k5_rvsum_3 || 0.00731915323398
set || Lim1 || 0.00730043470249
set || R_Normed_Algebra_of_BoundedLinearOperators || 0.00729091516019
set || Open_Domains_of || 0.00727845707733
set || Closed_Domains_of || 0.00727845707733
semiring_1_of_nat || derangements || 0.00726359435407
default_default || *1 || 0.00726273455798
finite_psubset || len || 0.00726170495986
bot_bot || product || 0.00725527576739
bitM || proj4_4 || 0.00723831788492
rev || -6 || 0.00722184537625
finite_psubset || TAUT || 0.00720125031045
code_integer || *31 || 0.00719666829114
left_unique || is_distributive_wrt || 0.00719526119354
sqr || varcl || 0.00719302731624
im || chromatic#hash#0 || 0.00716946229908
complete_Sup_Sup || permutations || 0.00714845286351
set || k6_rvsum_3 || 0.00713442633643
set || lim_inf-Convergence || 0.00712363814625
top_top || 1. || 0.00712337986987
left_total || is_distributive_wrt || 0.00711697300841
default_default || SetPrimes || 0.00710815313377
id2 || CnPos || 0.00710684853856
inc || NOT1 || 0.00710507357004
cos_coeff || ^31 || 0.00709292366752
right_unique || is_distributive_wrt || 0.00708023550702
bot_bot || *0 || 0.0070797848479
set || Generators || 0.00707212672848
bitM || proj1 || 0.00707097035548
set || -SD_Sub_S || 0.00707008645427
rev || Half || 0.00703833924566
condit1810911227_above || CompleteSGraph || 0.00703658887497
id2 || k5_ltlaxio3 || 0.0069936790074
bot_bot || Bags || 0.00699250903081
default_default || S-bound || 0.00699246063862
pred_nat || SCM+FSA-Instr || 0.00698795464294
bitM || k15_trees_3 || 0.00697772353001
set || TermSymbolsOf || 0.00697335346028
complex || 0_NN VertexSelector 1 || 0.0069640059109
transitive_trancl || ConsecutiveSet2 || 0.00695574382527
transitive_trancl || ConsecutiveSet || 0.00695574382527
cnj || Leaves || 0.00695150951905
num_of_nat || Rea || 0.00694382222992
cofinite || *0 || 0.0069408504903
ii || NAT || 0.00693813084462
product_case_unit || |^2 || 0.00693634573275
product_rec_unit || |^2 || 0.00693634573275
int || 0.1 || 0.00692639154264
pred_nat || VAR || 0.00691953370116
bot_bot || bool || 0.00691912031719
set || FinTrees || 0.00690511537326
real || ConwayZero || 0.00688819395701
sqr || TWOELEMENTSETS || 0.00688658441099
drop || NF0 || 0.00687067134415
num_of_nat || Im20 || 0.006864304857
zero_zero || +45 || 0.00685207946752
measure || max || 0.00684953976237
num_of_nat || Im10 || 0.0068323012386
real || REAL || 0.00683127831519
bitM || disjoin || 0.00683011514112
append || +2 || 0.00681797482716
numeral_numeral || the_Tree_of0 || 0.00681243691099
default_default || Arg || 0.00681133656744
nibble_of_nat || UsedIntLoc || 0.00680074302938
num_of_nat || Sum4 || 0.00679614595968
cofinite || Bags || 0.00678729228476
cofinite || product || 0.00676929377698
cnj || Mycielskian1 || 0.00676746979438
zero_zero || 1. || 0.00675485505037
sublist || *8 || 0.00674821636229
nat_of_num || 0_NN VertexSelector 1 || 0.00671864587097
bot_bot || 0. || 0.00671669274472
int || SCM-Data-Loc || 0.00670896669063
right_total || is_distributive_wrt || 0.00670635712116
re || cos || 0.0066817158942
sqr || ..1 || 0.00667794487747
semiring_1_of_nat || CompleteSGraph || 0.00667040832682
arctan || #quote# || 0.00666870528704
id2 || CnIPC || 0.00664888242929
default_default || Fib || 0.00662767746767
nibble1 || TriangleGraph || 0.00662421806848
nibble_of_nat || Sum || 0.00662370974189
zero_zero || Stop || 0.00662160971682
sqr || uncurry\ || 0.00661736792578
sqr || doms || 0.00661736792578
take || NF0 || 0.00660846295829
pred_nat || y>=0-plane || 0.00660577284921
re || elementary_tree || 0.00660174533879
nat || *30 || 0.00659497420984
bitM || ProperPrefixes || 0.0065884851195
set || NatDivisors || 0.00658613830079
id2 || CnCPC || 0.00658132602183
id2 || Subtrees0 || 0.00658132602183
transitive_rtrancl || ConsecutiveSet2 || 0.0065750523239
transitive_rtrancl || ConsecutiveSet || 0.0065750523239
product_case_unit || |^1 || 0.00657109956496
product_rec_unit || |^1 || 0.00657109956496
less_than || IPC-Taut || 0.00656509783288
inc || permutations || 0.00656184837226
bi_total || is_distributive_wrt || 0.00655855104812
pow || #bslash#3 || 0.00655408505781
normal1132893779malize || 1_Rmatrix || 0.00655162706693
default_default || exp1 || 0.00653353281546
bot_bot || ^31 || 0.00652530576289
id2 || Inv0 || 0.0065190946888
sqr || ~1 || 0.00650688437098
sqr || curry || 0.00650688437098
sqr || curry\ || 0.00650688437098
set || CnCPC || 0.00650112996663
nat || +20 || 0.00649283403127
re || ConwayDay || 0.00648910198674
antisym || is_differentiable_on1 || 0.00648777553923
default_default || W-bound || 0.00648629666709
nibble_of_nat || Inv0 || 0.00646746434422
cnj || *\10 || 0.00646511464986
complete_Sup_Sup || derangements || 0.00645362197011
sublist || *3 || 0.00642452604644
bit0 || |^5 || 0.0064229930247
less_than || Borel_Sets || 0.00640883237385
sqr || uncurry || 0.00640837363673
filter2 || NF0 || 0.00640647465185
gen_length || #bslash#1 || 0.00640606798368
product_case_unit || |^8 || 0.00639106171143
product_rec_unit || |^8 || 0.00639106171143
set || TWOELEMENTSETS || 0.00637635099775
bi_unique || is_distributive_wrt || 0.0063715180291
sqr || Funcs1 || 0.00636292716664
id2 || CnS4 || 0.00635788781905
condit1810911227_above || sproduct || 0.0063493962943
bitM || varcl || 0.00634763415185
sup_sup || +9 || 0.00633246968717
id2 || sup4 || 0.00631102498182
ii || k5_ordinal1 || 0.00630100108776
cos_coeff || Im20 || 0.00627454730237
cofinite || bool || 0.00624677031795
cos_coeff || Im10 || 0.00624527007853
int || SourceSelector 3 || 0.00624419518609
top_top || ^28 || 0.00621607372356
set || SortsWithConstants || 0.00620341593826
code_integer_of_num || tree0 || 0.00620255654811
nibbleA || TriangleGraph || 0.00619864494034
code_dup || Leaves || 0.0061793251294
semiring_1_of_nat || sproduct || 0.00616665360841
product_case_unit || *29 || 0.00615756861113
product_rec_unit || *29 || 0.00615756861113
default_default || Bottom || 0.0061563925803
cos_coeff || Rea || 0.00615417595591
re || !5 || 0.00615352721495
id2 || Mycielskian1 || 0.00614902421565
code_natural || sqrcomplex || 0.00611505293421
bitM || TWOELEMENTSETS || 0.00610658345734
sqr || SubFuncs || 0.00609845023917
pow || ++3 || 0.0060963882023
bNF_Ca829732799finite || is_differentiable_on1 || 0.00607691484579
im || P_cos || 0.00607343249024
top_top || #quote#20 || 0.0060699709212
measures || max || 0.00606196056399
bitM || doms || 0.00605866405168
set || 0. || 0.00604421440466
nibbleB || TriangleGraph || 0.00602650055313
sqr || Rank || 0.00600675720658
default_default || Fermat || 0.00599313201708
top_top || lim || 0.00598615053748
cnj || -0 || 0.00595496388741
bitM || ..1 || 0.00594100279867
bot_bot || ^28 || 0.00593180202422
sqr || Sgm || 0.00592458160552
bitM || uncurry\ || 0.00589275123466
complete_Sup_Sup || CompleteSGraph || 0.00588130934096
nibble8 || TriangleGraph || 0.00587992400629
nibbleA || op0 {} || 0.00587369480193
int || INT || 0.0058333159007
pred_nat || EdgeSelector 2 || 0.00582651293618
bot_bot || #quote#20 || 0.00581413607286
id2 || Rank || 0.00581332733538
sqrt || Leaves || 0.00580794661971
bitM || ~1 || 0.0058045388617
bitM || curry || 0.0058045388617
bitM || curry\ || 0.0058045388617
nibbleB || op0 {} || 0.00580102719878
top_top || ^31 || 0.00579926081391
tl || -6 || 0.00579477080877
set || support0 || 0.0057706056395
finite_psubset || N-bound || 0.00575807170057
pow || ^0 || 0.00575307657283
default_default || P_cos || 0.00575144566285
bot_bot || lim || 0.00574699416276
nibble8 || op0 {} || 0.00573752964158
semiring_1_of_nat || |->0 || 0.00572611868043
bitM || uncurry || 0.00572565553914
splice || #bslash#1 || 0.00571010958963
condit1810911227_above || Seg || 0.00570131916927
sup_sup || *18 || 0.00570020415294
set || Free || 0.00569261054643
bitM || Funcs1 || 0.00568918976595
semiring_1_of_nat || Seg || 0.0056745692104
rotate1 || -6 || 0.00564725342514
gen_length || +9 || 0.00564093842212
bitM || SubFuncs || 0.00562013111914
default_default || N-bound || 0.00560336327989
remdups || -6 || 0.00560201181668
nat_of_num || carrier || 0.00557858968587
sqr || field || 0.00557751246037
id_on || ^0 || 0.00557729870962
pow || +*0 || 0.0055705354325
bitM || Rank || 0.00556456562799
set || Fin || 0.00554875930577
nibbleC || op0 {} || 0.00554373645984
sqr || Mersenne || 0.00553754221637
sqr || .67 || 0.00553754221637
sup_sup || 1_Rmatrix || 0.00553561072818
sqr || meet0 || 0.00553054427355
complex || F_Complex || 0.0055133738395
nibbleD || op0 {} || 0.00550560500881
arctan || *1 || 0.00549428770526
top_top || 0. || 0.00549082433504
inf_inf || 1_Rmatrix || 0.00549052622443
abs_Nat || CompleteRelStr || 0.00548499352305
pow || Rotate || 0.00547119271719
nibbleC || TriangleGraph || 0.00545386992014
set || Ring_of_BoundedLinearOperators || 0.0054359306124
finite_psubset || E-bound || 0.00542161041985
nibbleF || op0 {} || 0.00540731680518
complete_Sup_Sup || sproduct || 0.00540198303197
zero_zero || {}1 || 0.00539923966806
inc || derangements || 0.00539791607917
semiring_1_of_nat || Fin || 0.00539599878283
nat || F_Complex || 0.00538785538866
nibbleD || TriangleGraph || 0.00537367411814
gcd_lcm || #bslash# || 0.00536622737393
set || RRing || 0.00536059078915
condit1810911227_above || Fin || 0.00535850899942
set || meet0 || 0.00535731018794
default_default || 1_ || 0.00534248885533
bitM || Sgm || 0.00533499441337
nibble3 || op0 {} || 0.00532691140866
append || +89 || 0.0053199624358
one2 || ConwayZero0 || 0.00530488432578
num_of_nat || `1 || 0.00527572107905
ring_1_of_int || NOT1 || 0.0052703397107
num_of_nat || `2 || 0.00526023137447
nibble9 || op0 {} || 0.00525916865779
sqr || Catalan || 0.00524445622935
nibble5 || op0 {} || 0.00523880140038
im || Moebius || 0.00523130398961
set || succ1 || 0.00521479801815
pos || FinSETS || 0.00521113089391
default_default || E-bound || 0.00519718722153
gcd_gcd || #bslash# || 0.00519548566827
nibble2 || op0 {} || 0.00518307632641
nibbleF || TriangleGraph || 0.00517223409127
nibble4 || op0 {} || 0.00516606101542
semiring_1_of_nat || *0 || 0.00515925870299
pow || +` || 0.00515475493255
finite_psubset || upper_bound2 || 0.00514987044974
nibbleE || op0 {} || 0.00514972834238
nibble7 || op0 {} || 0.00514972834238
nat || cosh1 || 0.00514730599624
arcsin || Leaves || 0.00514644050848
nat || invquaternion || 0.00514623445302
transitive_acyclic || is_finer_than || 0.00514314890093
nat || RealOrd || 0.00513496833672
nibble6 || op0 {} || 0.00513402918644
transitive_trancl || sigma0 || 0.00512864808147
order_under || EqTh || 0.00512752237149
sqr || ~2 || 0.00512590417456
semiring_1_of_nat || Bags || 0.0050904804252
bot_bot || +14 || 0.00508996010152
abs_Nat || {..}1 || 0.00508885303738
zero_Rep || op0 {} || 0.00508735352398
real_V1632203528linear || is_a_unity_wrt || 0.00508326003163
complete_Sup_Sup || Seg || 0.00508308283252
semiring_1_of_nat || product || 0.00508233955622
condit1810911227_above || *0 || 0.00506796564497
int || EdgeSelector 2 || 0.00506105284802
pow || #bslash##slash#0 || 0.00505976687901
pred_nat || IPC-Taut || 0.00505900547464
bitM || field || 0.00505125169844
cofinite || 1_Rmatrix || 0.00502737413682
set || product || 0.0050163301289
nibble3 || TriangleGraph || 0.00501292839556
bitM || meet0 || 0.00501262091742
id_on || #bslash##slash#0 || 0.00500981985665
measure || Product4 || 0.00500717885271
ring_1_of_int || -SD0 || 0.00500270621341
code_natural || -45 || 0.00499909678545
condit1810911227_above || Bags || 0.00498472463196
condit1810911227_above || product || 0.00497490626117
num_of_nat || Sum || 0.00496898098544
top_top || |....| || 0.00495160454569
gcd_lcm || #bslash##slash# || 0.00494164389244
ring_1_of_int || permutations || 0.00492650221677
sqr || SD_Add_Carry || 0.00490124027763
code_integer || sqrcomplex || 0.00489109985651
nat2 || Product1 || 0.004888938878
nibble9 || TriangleGraph || 0.00488240951656
lattic929149872er_Max || 0_Rmatrix0 || 0.00487772907875
remdups_adj || -6 || 0.00487282723124
num_of_nat || First*NotUsed || 0.00486862379997
real_Vector_of_real || NOT1 || 0.00486196021218
bot_bot || #quote# || 0.00485775051644
nibble5 || TriangleGraph || 0.00484381363192
semiring_1_of_nat || bool || 0.00483840329088
bitM || Mersenne || 0.00483142997953
bitM || .67 || 0.00483142997953
measure || ^0 || 0.00481120259049
bot_bot || |....| || 0.00480196493861
gcd_gcd || #bslash##slash# || 0.00479648208966
removeAll || *8 || 0.00477527129043
nat2 || NAT || 0.00477469127476
nibble2 || TriangleGraph || 0.00473970788725
num_of_nat || Product2 || 0.00473858326138
transitive_acyclic || tolerates || 0.00473808474684
arctan || Leaves || 0.00472743996438
semiring_1_of_nat || -SD0 || 0.00472216375499
re || carrier || 0.00471182818922
nibble4 || TriangleGraph || 0.0047083496872
filter2 || *8 || 0.00469749481532
sqr || id6 || 0.00469520255726
nat2 || 0_NN VertexSelector 1 || 0.00469114422524
condit1810911227_above || bool || 0.00468403418511
complete_Sup_Sup || Fin || 0.00468047529706
nibbleE || TriangleGraph || 0.00467843621253
nibble7 || TriangleGraph || 0.00467843621253
bitM || ~2 || 0.0046774381636
inc || CompleteSGraph || 0.0046715816382
pow || -\1 || 0.00466514541836
pow || gcd || 0.00466514541836
tan || #slash# || 0.00466294448952
nat || G_Quaternion || 0.00465602599507
nibble6 || TriangleGraph || 0.00464985411317
set || Upper_Middle_Point || 0.00464088114108
set || Lower_Middle_Point || 0.00464043409069
pow || #slash#^1 || 0.00463830719971
set || UMP || 0.00463794994122
set || LMP || 0.00463794994122
inf_inf || +9 || 0.0046366343572
gen_length || +2 || 0.00462066899402
default_default || sin || 0.00461073546417
bitM || Catalan || 0.00460479328609
butlast || -6 || 0.00460392817802
real || EdgeSelector 2 || 0.00460087584789
nat2 || #quote# || 0.00459615889071
num_of_nat || UsedInt*Loc || 0.00457328059
id2 || Subspaces || 0.00451790556125
id2 || Submodules || 0.00451790556125
id2 || Subspaces2 || 0.00451790556125
real_Vector_of_real || permutations || 0.00451353723244
nat || sinh0 || 0.00450444974895
sqr || cf || 0.00449259960826
inverse_inverse || #slash# || 0.00448564985288
semiring_1_of_nat || #slash# || 0.00448020595361
complete_Sup_Sup || *0 || 0.00446165580079
nat || sinh1 || 0.00445923490003
ring_1_of_int || derangements || 0.00443130092149
product_Unity || Trivial-multMagma || 0.00442142849034
nat2 || upper_bound1 || 0.00442119478163
condit1810911227_above || -SD0 || 0.00441384278683
nat || 1q0 || 0.00440898033738
complete_Sup_Sup || Bags || 0.00439832991791
complete_Sup_Sup || product || 0.004390841724
sqr || union0 || 0.0043860958849
measures || ^0 || 0.00436604905953
pow || -51 || 0.00432962118017
top_top || Im3 || 0.00432960016413
top_top || Re2 || 0.00431788457057
bitM || id6 || 0.00431584137181
pos || CompleteRelStr || 0.00431578331957
zero_Rep || NAT || 0.00428441832658
top_top || |^5 || 0.00426824009413
nat2 || *86 || 0.00424820119458
field_char_0_of_rat || NOT1 || 0.00422458428488
bitM || SD_Add_Carry || 0.00422101536414
top_top || len- || 0.00421885713961
measure || #bslash##slash#0 || 0.00421263536654
nat || P_sin || 0.00420816351788
bot_bot || Im3 || 0.00419065402238
one_one || tree0 || 0.00418844793236
bot_bot || Re2 || 0.00417967723959
normal627294541factor || NOT1 || 0.0041784845168
finite_psubset || succ0 || 0.00416959881114
complete_Sup_Sup || bool || 0.00416717756903
sqr || arctan0 || 0.00416117659445
nat_of_num || ConwayDay || 0.00414565199733
transitive_trancl || ^0 || 0.00413742334763
dropWhile || *8 || 0.0041367311284
code_natural || *78 || 0.00413059727823
drop || *8 || 0.00413056282938
bot_bot || |^5 || 0.00411958966813
remove1 || *8 || 0.00411894224343
pow || +56 || 0.00411443344954
inc || sproduct || 0.00411337181205
top_top || index_of || 0.00409337234833
pos || elementary_tree || 0.00408902308688
normal627294541factor || -SD0 || 0.00406805727986
less_than || *78 || 0.00405665346169
bitM || union0 || 0.0040531392873
measure || + || 0.00404365576079
real_V1127708846m_norm || . || 0.004041197573
takeWhile || *8 || 0.00402686523515
ring_1_of_int || CompleteSGraph || 0.00402604198101
set || S-min || 0.00402297247559
zero_zero || tree0 || 0.00402226251129
real_Vector_of_real || derangements || 0.00401939519894
sgn_sgn || 0_Rmatrix0 || 0.00401410833196
bot_bot || len- || 0.00401032345262
set || N-max || 0.00400754677781
set || E-min || 0.00400315995928
abs_Nat || -0 || 0.0039998927561
transitive_rtrancl || ^0 || 0.00399908563411
set || S-max || 0.00399776866521
set || W-max || 0.00399735450509
default_default || cos || 0.00399280209487
set || VERUM || 0.00396596896303
root || -56 || 0.00391770289389
set || N-min || 0.00391043533196
bitM || cf || 0.00390871747893
field_char_0_of_rat || permutations || 0.00388271914512
sqr || Fib || 0.00388260426162
bot_bot || index_of || 0.00387073676057
measures || #bslash##slash#0 || 0.00386708685897
top_top || base- || 0.0038471960098
top_top || limit- || 0.0038471960098
zero_zero || Moebius || 0.00384119038784
set || max#hash# || 0.0038401552205
append || #bslash#1 || 0.00383066949349
nat || sin1 || 0.00382601389898
nat || sin0 || 0.00382379467969
normal627294541factor || permutations || 0.00380971568505
code_integer_of_num || Mycielskian0 || 0.00380728337043
nibble_of_nat || Product7 || 0.00378311655461
take || *8 || 0.00375626348248
measures || + || 0.00375385877252
transitive_rtrancl || #bslash##slash#0 || 0.00372947145783
set || id1 || 0.00372573304892
code_natural || 0c || 0.00371470974705
sqr || arcsin1 || 0.00370343144952
ring_1_of_int || sproduct || 0.00368847816264
bot_bot || base- || 0.00367292546091
bot_bot || limit- || 0.00367292546091
num_of_nat || *64 || 0.00367121901067
complete_Sup_Sup || -SD0 || 0.00366816326516
default_default || Lucas || 0.00365731640781
nibble0 || ECIW-signature || 0.00365649584411
bitM || arctan0 || 0.00365366220426
nibble_of_nat || Product4 || 0.0036323304893
at_top || 0_Rmatrix0 || 0.00362619692027
zero_Rep || 0_NN VertexSelector 1 || 0.00362565462624
real_Vector_of_real || CompleteSGraph || 0.00362188557607
default_default || UNIVERSE || 0.00361654823343
one_one || carrier || 0.00360349839852
top_top || Sum^ || 0.00359161850822
code_integer || -45 || 0.00357261162616
sin || -tuples_on || 0.00355480413652
top_top || ord-type || 0.00353556477813
cos || -tuples_on || 0.00352529373226
bitM || Fib || 0.00351706446589
im || product || 0.00351539968912
bit0 || +45 || 0.00350621163726
ring_1_of_int || Seg || 0.00350593875086
sqr || cosh || 0.00350416878978
abs_abs || 0_Rmatrix0 || 0.00349408389887
re || product || 0.0034876686906
set || inf4 || 0.00348754295753
set || lim_inf || 0.00347333039307
nat || 0 || 0.00345429317913
set || len || 0.00345094767468
left_unique || is_integral_of || 0.00344909602125
top_top || *1 || 0.00344418778056
bot_bot || Sum^ || 0.00343923623014
real || <j> || 0.00343783459456
one2 || TriangleGraph || 0.00343761464928
real || *63 || 0.00343757412788
left_total || is_integral_of || 0.00340869205867
field_char_0_of_rat || derangements || 0.0034080028463
trans || <= || 0.00340407112263
right_unique || is_integral_of || 0.00338975275638
bot_bot || ord-type || 0.00338779767974
code_int_of_integer || #quote# || 0.00337703804531
uminus_uminus || + || 0.00336495048485
rat || NAT || 0.00336401963083
csqrt || MIM || 0.00335915678484
inc || Fin || 0.00335205138487
bot_bot || *1 || 0.00334379146652
code_integer || Example || 0.00334028317588
set || 1. || 0.00333836653903
minus_minus || +9 || 0.00332287190911
id_on || FinMeetCl || 0.00332164351766
normal627294541factor || derangements || 0.00330558247519
real_Vector_of_real || sproduct || 0.00329555551391
bitM || arcsin1 || 0.00329357816835
set || k2_rvsum_3 || 0.00327988754144
condit1810911227_above || 1_Rmatrix || 0.00326585397613
one_one || Mycielskian0 || 0.0032604720011
code_natural || 1r || 0.00325806059387
sqr || tan || 0.00324315517065
set || stability#hash# || 0.00321356088586
sqr || +14 || 0.00321155554401
set || clique#hash# || 0.00320757942994
right_total || is_integral_of || 0.00319776762714
set || order0 || 0.00319125803703
normal627294541factor || 1_Rmatrix || 0.0031872844966
ring_1_of_int || Fin || 0.00318356098306
inc || -SD0 || 0.00318311015086
inc || *0 || 0.00313835263195
bitM || cosh || 0.003134307661
product_Unity || FinSETS || 0.00312941731649
code_integer_of_num || NAT || 0.0031258988974
nibble_of_nat || *64 || 0.00312261269713
bi_total || is_integral_of || 0.00312225718618
set || Im20 || 0.00308803621199
set || Rea || 0.00308803621199
product_Unity || 15 || 0.00308779037275
dup || -25 || 0.00308318712166
root || -32 || 0.00308075004937
set || Im10 || 0.00307997173779
inc || Bags || 0.00307790393989
code_integer_of_num || elementary_tree || 0.00307683508313
inc || product || 0.00307079654408
set || <k>0 || 0.00306840277863
sqr || ^20 || 0.00304104040531
field_char_0_of_rat || CompleteSGraph || 0.00303510297006
top_top || arity || 0.00303311106321
ring_1_of_int || *0 || 0.00303119023307
id2 || Subgroups || 0.0030280872382
bi_unique || is_integral_of || 0.00302702634128
finite_finite2 || 0_Rmatrix0 || 0.00302190162759
cnj || sqr || 0.00299522964268
ring_1_of_int || Bags || 0.00298716045084
ring_1_of_int || product || 0.00298195594955
re || tree0 || 0.00294465103623
id2 || bool3 || 0.00294350443593
rat || 0_NN VertexSelector 1 || 0.0029282430399
default_default || SymGroup || 0.00292710876539
bot_bot || arity || 0.00292368423561
bitM || tan || 0.00292316497695
code_Suc || dl. || 0.00292139154487
num_of_nat || *1 || 0.00291691005776
normal627294541factor || CompleteSGraph || 0.00291665244001
sup_sup || #bslash##slash# || 0.00290594666322
code_integer || *78 || 0.00289855502663
bitM || +14 || 0.00289746041048
sqr || #quote# || 0.00287845344623
inc || bool || 0.0028623804583
cis || Im20 || 0.00284831873115
code_integer || 0c || 0.00284410235847
bNF_Ca1495478003natLeq || IPC-Taut || 0.00284062647313
cis || Im10 || 0.00283580298372
ring_1_of_int || bool || 0.00282669379138
cis || Rea || 0.00282196243651
pos || 0_NN VertexSelector 1 || 0.00282125195601
code_integer_of_num || SETS || 0.00282092188051
trans || linearly_orders || 0.00281904489395
ii || op0 {} || 0.00281732811924
real_Vector_of_real || Fin || 0.0028155379787
set || Center || 0.0028145653829
bitM || ^20 || 0.00281163621532
default_default || Mersenne || 0.0028077587322
top_top || arccos || 0.00279392641224
finite_3 || NAT || 0.00279375613063
cnj || Inv0 || 0.00279239102903
field_char_0_of_rat || -SD0 || 0.00277625519239
ord_less_eq || c=1 || 0.00277128103838
id2 || east_halfline || 0.00276457034117
id2 || west_halfline || 0.00276457034117
set || [#bslash#..#slash#] || 0.00275717830032
top_top || S-bound || 0.00275619001034
sup_sup || ^31 || 0.00275163456244
normal627294541factor || Seg || 0.00273696914191
field_char_0_of_rat || sproduct || 0.00273509642191
sqr || Im3 || 0.002721987954
id2 || the_Tree_of || 0.00272033497995
id2 || Big_Omega || 0.00272033497995
complete_Sup_Sup || 1_Rmatrix || 0.00271421088014
pow2 || 1.0 || 0.00271261876681
inf_inf || ^31 || 0.00271035195216
sqr || Re2 || 0.00270986409925
bot_bot || 1_Rmatrix || 0.00270316592385
cis || ^31 || 0.00269867349829
num_of_nat || Product7 || 0.00269373078799
bot_bot || arccos || 0.00268740783623
real_Vector_of_real || -SD0 || 0.00268217806552
id2 || Subtrees || 0.00268115602445
top_top || sech || 0.00267275681287
real_Vector_of_real || *0 || 0.00267257309754
cnj || MIM || 0.00267242507989
top_top || W-bound || 0.00267205590192
set || S-bound || 0.00267125155061
bot_bot || S-bound || 0.00266371881291
bitM || Im3 || 0.00265181686974
real_Vector_of_real || Bags || 0.002631423285
real_Vector_of_real || product || 0.00262656399483
bitM || #quote# || 0.00262303560784
int || Example || 0.00261591994052
one_one || halt || 0.00261581814579
id2 || the_right_side_of || 0.00261442074408
normal627294541factor || sproduct || 0.00260854602498
set || Im3 || 0.00260571727357
set || Re2 || 0.00259944151647
ring_1_of_int || 1_Rmatrix || 0.00259748372712
semiring_1_of_nat || 1_Rmatrix || 0.00259255463846
set || W-bound || 0.00259217026063
top_top || Bottom || 0.00258892452365
id2 || nextcard || 0.00258560664231
id2 || south_halfline || 0.00258560664231
id2 || Big_Theta || 0.00258560664231
id2 || north_halfline || 0.00258560664231
bot_bot || W-bound || 0.00258505396869
bitM || Re2 || 0.00258232067961
real || G_Quaternion || 0.00257496105328
zero_Rep || EdgeSelector 2 || 0.00256510038871
bot_bot || sech || 0.0025572284514
zero_zero || 0_Rmatrix0 || 0.00255671321936
dup || MIM || 0.00254819860046
default_default || loci_of || 0.00254283981858
top_top || Arg || 0.00253847347667
csqrt || -25 || 0.00253404069355
complex || VAR || 0.00252864797226
set || lower_bound0 || 0.00252222902213
pow || - || 0.00251931563779
nibble_of_nat || *1 || 0.0025192524681
top_top || Fib || 0.00251607774611
complex || G_Quaternion || 0.00250185203214
real_Vector_of_real || bool || 0.00248206427186
nibble_of_nat || Sum11 || 0.00247968191718
lattic929149872er_Max || +45 || 0.00246726878537
pred_nat || +infty || 0.00245903376424
num_of_nat || Product4 || 0.00245424421078
zero_zero || Mycielskian0 || 0.0024540868723
sqr || sin || 0.00245129153038
bot_bot || Arg || 0.00245022813396
finite_psubset || Dir_of_Lines || 0.00244348628131
real || <i>0 || 0.00244294398729
pow || + || 0.00243213170979
bot_bot || Fib || 0.0024296801616
sup_sup || #quote#31 || 0.00242778181068
id_on || R_EAL1 || 0.00241471711792
finite_3 || 0_NN VertexSelector 1 || 0.00240129051726
inf_inf || #quote#31 || 0.00239422596299
real_Vector_of_real || Seg || 0.00236806469344
im || *31 || 0.00236161471072
nibble1 || ECIW-signature || 0.00236016560367
code_pcr_integer code_cr_integer || sin1 || 0.00235930986367
code_integer_of_num || 0_NN VertexSelector 1 || 0.00235580593671
code_integer_of_num || cos || 0.0023551190178
sup_sup || #slash##bslash# || 0.00235474024644
bNF_Wellorder_wo_rel || c< || 0.00235290581669
bot_bot || Bottom || 0.0023485203909
top_top || 1_ || 0.00234813763081
re || *31 || 0.00233490008366
sqr || *1 || 0.00232037172939
one2 || ECIW-signature || 0.00231867407658
product_Unity || -infty || 0.0023175477851
product_Unity || 0.1 || 0.00231570692717
id2 || Tarski-Class || 0.00230620886503
product_Unity || +infty || 0.00230448861103
field_char_0_of_rat || Fin || 0.00230386497999
bit0 || -0 || 0.00230215220808
top_top || Catalan || 0.00229943143718
cnj || -25 || 0.00229058236645
inc || 1_Rmatrix || 0.00228743967899
top_top || Euler || 0.00228213705229
sup_sup || +46 || 0.0022767641679
bot_bot || 1_ || 0.00227526369864
order_underS || InvCl || 0.00226983183436
order_underS || StabCl || 0.00226983183436
bitM || sin || 0.00226333831083
inf_inf || +46 || 0.00224906655444
code_nat_of_integer || k2_zmodul05 || 0.00224252134271
code_integer || EdgeSelector 2 || 0.00223624893962
ring_1_of_int || #slash# || 0.00223025883801
inc || +46 || 0.00222951213189
id2 || Big_Oh || 0.00221288371159
product_unit || TargetSelector 4 || 0.00221124535126
bot_bot || Catalan || 0.00220889211029
top_top || N-bound || 0.00220667052462
bot_bot || Euler || 0.00219292709178
real || F_Complex || 0.00218752489911
default_default || EvenFibs || 0.00218549895621
default_default || k1_numpoly1 || 0.00218304725967
field_char_0_of_rat || *0 || 0.0021777292425
normal627294541factor || Fin || 0.00217340403068
real_V1127708846m_norm || NOT1 || 0.00217140890386
sqrt || MIM || 0.00216600061916
bitM || *1 || 0.00215122888198
num || REAL || 0.00215067982126
order_under || TRS || 0.00214195539482
field_char_0_of_rat || Bags || 0.00214161706458
top_top || E-bound || 0.00213927310666
field_char_0_of_rat || product || 0.00213735835266
top_top || P_cos || 0.00213512357824
bot_bot || N-bound || 0.00213259463442
inc || ^31 || 0.00212353140666
top_top || sin || 0.00211772669142
nibble_of_nat || Sum19 || 0.00211372074461
nibbleA || ECIW-signature || 0.00210561796539
set || F_primeSet || 0.00209546105188
re || Mycielskian0 || 0.00209181938184
complex || sin1 || 0.00208619060713
top_top || exp1 || 0.00208182521698
bot_bot || E-bound || 0.00206958087305
set || ProperPrefixes || 0.00206870617371
bot_bot || P_cos || 0.00206072574549
nibbleB || ECIW-signature || 0.0020577206996
bot_bot || sin || 0.00205427530253
at_top || +45 || 0.00205268487495
csqrt || R_Quaternion || 0.00204952102061
normal627294541factor || *0 || 0.00204786538656
complex || sec || 0.00204756871872
default_default || diameter || 0.00204750292195
code_integer || sin0 || 0.00203601465889
transitive_trancl || FinMeetCl || 0.00203479711469
real_V1127708846m_norm || permutations || 0.00203344860638
real_V1908273582scaleR || NOT1 || 0.00202790243996
code_integer || invquaternion || 0.00202429006182
has_field_derivative || NOT1 || 0.00202286047813
pow || |^22 || 0.00201687556404
nibble8 || ECIW-signature || 0.00201663510942
normal627294541factor || Bags || 0.0020120692622
field_char_0_of_rat || bool || 0.0020112655597
sym || c= || 0.00201115019146
normal627294541factor || product || 0.00200785207589
real || COMPLEX || 0.00200434433134
bot_bot || exp1 || 0.00200281295325
nibble_of_nat || First*NotUsed || 0.00199946458825
plus_plus || #slash#. || 0.00199509254201
union || _#bslash##slash#_0 || 0.00198394908325
code_nat_of_integer || Product1 || 0.00197740468334
id2 || code || 0.00197481851147
code_Pos || elementary_tree || 0.00196645390378
measure || R_EAL1 || 0.00195924381011
product_unit || empty_f_net || 0.00195692926856
sqr || new_set2 || 0.00195677130499
sqr || new_set || 0.00195677130499
transitive_rtrancl || FinMeetCl || 0.00193876750337
product_Unity || TriangleGraph || 0.001923314405
union || _#slash##bslash#_0 || 0.00191843427287
pow || |^10 || 0.00190766421429
nibbleC || ECIW-signature || 0.00189552266656
nil || *1 || 0.00189242536521
real_V1908273582scaleR || permutations || 0.00188746148559
has_field_derivative || permutations || 0.00188621719114
normal627294541factor || bool || 0.0018833947693
nibble_of_nat || UsedInt*Loc || 0.00188309130191
code_integer_of_num || !5 || 0.00188286197935
nibbleD || ECIW-signature || 0.00187242822674
im || elementary_tree || 0.00184868517201
dup || sqrt0 || 0.00184639743419
set2 || UAp0 || 0.00183674933565
set2 || LAp0 || 0.00183674933565
real_V1127708846m_norm || derangements || 0.00183393155971
top_top || cos || 0.00182997098501
nibbleF || ECIW-signature || 0.0018139770527
sqrt || *\10 || 0.00180816389685
dup || R_Quaternion || 0.00180390135641
code_nat_of_integer || #quote# || 0.00178942855546
int || invquaternion || 0.0017886505637
transitive_trancl || ]....[1 || 0.00178331467928
plus_plus || +2 || 0.00177530746076
bot_bot || cos || 0.00177504341293
inc || `1 || 0.00176967240347
ring_1_of_int || {..}1 || 0.00176740409693
nibble3 || ECIW-signature || 0.00176728832383
wf || linearly_orders || 0.00176628304581
inc || #quote#31 || 0.00176622537358
finite_finite2 || +45 || 0.00175368475337
sqrt || -25 || 0.00174903781015
im || code || 0.0017439498713
bit0 || 0_Rmatrix0 || 0.00173819373064
times_times || *29 || 0.00173616216972
nibble9 || ECIW-signature || 0.00172871901926
ratreal || 0_NN VertexSelector 1 || 0.00172846253484
re || code || 0.00172384081248
nat || SCM+FSA-Data*-Loc || 0.00171837792513
nibble5 || ECIW-signature || 0.00171725747553
code_nat_of_integer || upper_bound1 || 0.00171507109968
num || SourceSelector 3 || 0.00171220961002
real || omega || 0.00170011214178
nibble_of_nat || ^28 || 0.00169268955737
one2 || ConwayZero || 0.00169260333387
num_of_nat || Sum11 || 0.00169086695428
has_field_derivative || derangements || 0.00169052868684
real_V1908273582scaleR || derangements || 0.00168715533406
nibble2 || ECIW-signature || 0.00168621138601
field_char_0_of_rat || {..}1 || 0.00168166573164
remdups || max || 0.00168164664792
im || cos || 0.00167934906612
ii || TriangleGraph || 0.00167817925485
nibble4 || ECIW-signature || 0.00167682201821
one_one || Moebius || 0.00167242554503
real_V1127708846m_norm || CompleteSGraph || 0.00166989548982
nibbleE || ECIW-signature || 0.00166784871188
nibble7 || ECIW-signature || 0.00166784871188
one_one || {}1 || 0.00166618250875
minus_minus || +2 || 0.00166161070729
code_dup || R_Quaternion || 0.00166070291341
nibble6 || ECIW-signature || 0.00165925961277
measures || R_EAL1 || 0.00165572123451
gcd_gcd || +2 || 0.00165172136084
antisym || linearly_orders || 0.00163495606508
csqrt || *\10 || 0.0016271289594
default_default || min0 || 0.00162030208567
pow || RED || 0.00160992458767
pow || quotient || 0.00160992458767
code_nat_of_integer || *86 || 0.00160872282164
cofinite || ^31 || 0.00158680891849
default_default || max0 || 0.00158308160492
dup || -54 || 0.00158230963798
pow2 || OSCl || 0.00158069197328
pow || free_magma || 0.00157402143685
one_one || 0. || 0.00156200284236
field_char_0_of_rat || Seg || 0.00154929024487
pow || div^ || 0.00154227529651
real_V1127708846m_norm || sproduct || 0.00153272146548
has_field_derivative || CompleteSGraph || 0.00153138188755
top_top || SetPrimes || 0.00153057068786
nat || INT- || 0.00152962156577
real_V1908273582scaleR || CompleteSGraph || 0.00152499413856
code_dup || MIM || 0.00152282476832
cnj || R_Quaternion || 0.00152277390546
code_nat_of_natural || k2_zmodul05 || 0.00151764998463
dup || Card0 || 0.00151623782246
set || the_Field_of_Quotients || 0.0015136807726
normal1132893779malize || ^31 || 0.00151022179908
uminus_uminus || k22_pre_poly || 0.00150247743413
cnj || abs8 || 0.00148535106825
bNF_Ca829732799finite || linearly_orders || 0.00148493354801
sqr || |^5 || 0.00147657864475
product_Unity || WeightSelector 5 || 0.00146728879419
cnj || *1 || 0.00146614304017
arcsin || R_Quaternion || 0.00146350096432
bot_bot || SetPrimes || 0.00146275984637
nat || |....|11 || 0.00145626322388
one_one || 1. || 0.00145232916235
arcsin || MIM || 0.00145095876031
default_default || 1_Rmatrix || 0.00144747935909
less_than || +20 || 0.0014312806155
code_integer || F_Complex || 0.00142787842494
code_Pos || 0_NN VertexSelector 1 || 0.00141479812865
pow || **6 || 0.00140671240979
real || 1q0 || 0.00140610096815
code_integer || omega || 0.00140312090564
has_field_derivative || sproduct || 0.00139951816133
code_int_of_integer || Product1 || 0.00139799809841
real_V1908273582scaleR || sproduct || 0.00139115028078
pow || lcm0 || 0.00139009498663
transitive_ntrancl || #bslash#*#bslash# || 0.00137696749003
pow || |^|^ || 0.00137463008895
sqrt || R_Quaternion || 0.00136837479011
bot_bot || {..}1 || 0.00136620202514
inc || `2 || 0.00135998417209
pos || TotalGrammar || 0.00135615259122
nat2 || k2_zmodul05 || 0.00135528957371
im || carrier || 0.00135473794703
pow || exp4 || 0.00134665127149
top_top || Fermat || 0.00134511303155
pow || compose || 0.00133393102594
bitM || |^5 || 0.00133148769701
real_V1127708846m_norm || Fin || 0.00132660247756
num_of_nat || ^28 || 0.00132618629672
ii || ECIW-signature || 0.00132465173103
code_integer_of_nat || 0_NN VertexSelector 1 || 0.00132187984821
arctan || MIM || 0.00131498275357
inf_inf || *3 || 0.00131115216839
product_unit || SourceSelector 3 || 0.00130992014314
transitive_trancl || || || 0.0013034713797
product_Unity || SETS || 0.00130232235325
code_dup || -25 || 0.00130212033839
normal1132893779malize || +46 || 0.00129928129441
nibble0 || 0c || 0.00129593331289
arctan || R_Quaternion || 0.0012951095333
cofinite || +46 || 0.00129377232886
product_Unity || ECIW-signature || 0.0012905863541
normal1132893779malize || #quote#31 || 0.0012902860487
transitive_trancl || R_EAL1 || 0.00128835929898
product_Unity || 17 || 0.00128599938957
bot_bot || Fermat || 0.00128594136967
default_default || card || 0.00128493000526
nat || -infty || 0.00128475086064
code_integer_of_num || ConwayDay || 0.00128303805155
finite_3 || *63 || 0.00127729480646
finite_3 || <j> || 0.00127729480646
pow || exp || 0.00127083119285
pow || *` || 0.00127083119285
default_default || Top || 0.00126965773293
real_V1127708846m_norm || *0 || 0.00126417671991
order_underS || Result2 || 0.00126401582511
empty || (Omega). || 0.00126346194225
cofinite || #quote#31 || 0.0012623778228
order_underS || EqCl1 || 0.0012546512261
code_nat_of_natural || upper_bound1 || 0.00124872605449
real_V1127708846m_norm || Bags || 0.00124611832218
product_size_unit || dom0 || 0.00124449527062
sqr || Moebius || 0.00124402470735
real_V1127708846m_norm || product || 0.00124398316472
dup || abs8 || 0.00123527033913
nat_of_nibble || dom0 || 0.00123261584976
finite_2 || op0 {} || 0.00123150676013
code_natural || omega || 0.00122726589979
transitive_rtrancl || R_EAL1 || 0.0012258482654
pow || (#hash#)0 || 0.00122338715512
nil || 1. || 0.00121844141262
im || +16 || 0.00121826789629
ring_1_of_int || |->0 || 0.00121742040452
top_top || Lucas || 0.00121702692445
re || +16 || 0.00120584126855
pow || *^ || 0.00120362304668
has_field_derivative || Fin || 0.00120347695807
num_of_nat || Sum19 || 0.00119708209287
real_V1908273582scaleR || Fin || 0.00119304642587
nil || k1_numpoly1 || 0.00119236022639
size_num || dom0 || 0.00119107509363
code_nat_of_natural || *86 || 0.00119022845781
finite_3 || |....|11 || 0.00118931727391
ord_less_eq || is_exactly_partitable_wrt || 0.00118490769208
pow || frac0 || 0.00118033651118
real_V1127708846m_norm || bool || 0.00118022997676
one_one || ConwayDay || 0.00117588093171
nil || Lucas || 0.00117525219477
bot_bot || Lucas || 0.00117202108533
cis || 1_Rmatrix || 0.00117063517933
pow || *45 || 0.00116978979247
nil || |....|2 || 0.00116498200326
code_integer_of_int || 0_NN VertexSelector 1 || 0.00116472268139
numeral_numeral || SetPrimes || 0.00115760958684
nil || In_Power || 0.00115565077548
code_integer_of_num || SourceSelector 3 || 0.00115135406805
has_field_derivative || *0 || 0.00114459912072
pow || k2_numpoly1 || 0.00114419630566
numeral_numeral || Fermat || 0.00114177839887
real_V1632203528linear || is_distributive_wrt0 || 0.00113675973687
real_V1908273582scaleR || *0 || 0.00113375624526
real_V1127708846m_norm || Seg || 0.00113242950662
rat || *63 || 0.00113068551696
rat || <j> || 0.00113068551696
has_field_derivative || Bags || 0.00112760985035
im || tree0 || 0.00112561534746
has_field_derivative || product || 0.0011256023699
dup || doms || 0.00112552944889
remdups || + || 0.00112389568559
pow || -Root || 0.00112151834169
arcsin || -25 || 0.00111911338393
real_V1908273582scaleR || Bags || 0.00111666581628
real_V1908273582scaleR || product || 0.00111464691016
nibble1 || 0c || 0.00110943188612
trans || misses || 0.00110895116
nibble0 || 0.1 || 0.00110179113992
dup || *\10 || 0.0010969529632
dup || sqr || 0.0010938861727
semiring_1_of_nat || {..}1 || 0.00108946533243
code_integer || ConwayZero || 0.0010885228803
product_unit || G_Quaternion || 0.00108754685437
pow || div || 0.00107893729834
bNF_Cardinal_cone || DYADIC || 0.00107876708591
int || <j> || 0.00107784087832
int || *63 || 0.00107784087832
bitM || Moebius || 0.00107582784327
order_underS || TRS || 0.00106816320046
pos || -0 || 0.0010678305653
has_field_derivative || bool || 0.00106578470889
int || F_Complex || 0.00106083602963
real_V1908273582scaleR || bool || 0.00105453993447
code_dup || *\10 || 0.00105131398231
append || -23 || 0.00104883887713
sqr || Euler || 0.00104554360605
bit0 || succ1 || 0.00104007162031
top_top || SmallestPartition || 0.00103955575915
one_one || Stop || 0.00103701690891
arctan || -25 || 0.00103596681727
dup || SubFuncs || 0.00103340332115
code_integer || REAL || 0.00103306598826
code_Pos || CompleteRelStr || 0.00102399306513
has_field_derivative || Seg || 0.00102164667459
pos || Seg || 0.001016368526
real_V1908273582scaleR || Seg || 0.00101031579176
arctan || *\10 || 0.00100875376521
nat || Z_2 || 0.00100486676093
code_integer || Newton_Coeff || 0.000991033237023
product_Unity || a_Type0 || 0.000989227160058
divide_divide || ^ || 0.000980266078954
code_Pos || -0 || 0.0009793718514
code_integer || G_Quaternion || 0.000975326200766
code_integer_of_num || WeightSelector 5 || 0.000966105134417
code_natural || SCM || 0.000959371379838
semiring_1_of_nat || ^31 || 0.000954876658615
arcsin || *\10 || 0.000951618882541
pow || -root || 0.000946075891537
times_times || ^ || 0.000939154428087
sqrt || Inv0 || 0.000935821371594
wf || misses || 0.000930421858251
drop || #bslash#*#bslash# || 0.000929811573147
pred_numeral || dom0 || 0.000926587948896
condit1810911227_above || ^31 || 0.000924132525355
minus_minus || *18 || 0.000923193835535
bitM || Euler || 0.000922620669742
semiring_1_of_nat || +46 || 0.000922261166383
order_under || variables_in2 || 0.000919381555683
nibble1 || 0.1 || 0.000913551133053
order_underS || variables_in3 || 0.000913254337481
numeral_numeral || UNIVERSE || 0.000908110317117
rat || |....|11 || 0.000905294861198
default_default || succ0 || 0.000896685680673
diffs || .13 || 0.000891753963962
condit1810911227_above || +46 || 0.000891660273577
arg || multreal || 0.000891130022711
sqr || Lucas || 0.000886215439504
cis || 0* || 0.00088570995807
code_natural || SCMPDS || 0.000880587428466
top_top || UNIVERSE || 0.000875935993655
complete_Sup_Sup || Width || 0.000872960634068
finite_comp_fun_idem || LE || 0.000870577682351
sqr || k1_numpoly1 || 0.000869223212727
sgn_sgn || Rev || 0.000861835622248
transitive_acyclic || are_equipotent || 0.000861051298459
append || _#bslash##slash#_0 || 0.000857897187408
semiring_1_of_nat || #quote#31 || 0.000856233652567
set2 || Free1 || 0.000850967060244
set2 || Fixed || 0.000850967060244
ii || i_FC || 0.000850413923249
complete_Sup_Sup || Len || 0.000849737949816
code_integer_of_num || carrier || 0.000846871444754
bot_bot || UNIVERSE || 0.000838253574097
product_unit || k10_numpoly1 || 0.000837499917601
tl || -22 || 0.000836286716801
append || _#slash##bslash#_0 || 0.000829862192512
of_int || 0_NN VertexSelector 1 || 0.000829584869812
default_default || kind_of || 0.000826682516017
int || |....|11 || 0.000824586265107
real || -66 || 0.000814801230989
product_unit || Trivial-addLoopStr || 0.000813432546422
product_Unity || 0q0 || 0.000810216381025
real || |....|11 || 0.000808031721773
numeral_numeral || alef || 0.000803151705358
im || !5 || 0.000802313102293
sgn_sgn || k4_matrix_0 || 0.000800220185479
condit1810911227_above || #quote#31 || 0.000798482189384
uminus_uminus || ` || 0.00079596976182
none || (Omega). || 0.000795821418497
bitM || Lucas || 0.000795722671914
im || ConwayDay || 0.000794073954398
pow || |^ || 0.000790292811187
set2 || Up || 0.000789553228651
bot_bot || +46 || 0.000782060887559
bitM || k1_numpoly1 || 0.000781954081394
set_of_seq || Right_Cosets || 0.000780897249853
one_one || !5 || 0.000780429528961
pos || k3_lattad_1 || 0.000777780013303
pos || k1_lattad_1 || 0.000777780013303
complete_Sup_Sup || +46 || 0.000775979133406
code_integer || SourceSelector 3 || 0.000773543070235
set2 || NormPolynomial || 0.000772577242128
sym || are_equipotent || 0.000769386489434
complete_Sup_Sup || ^31 || 0.000767584429062
code_integer_of_num || omega || 0.000755475932581
nat || NATOrd || 0.00074444653078
code_nat_of_natural || #quote# || 0.000744407878892
int || G_Quaternion || 0.000739292064371
code_integer || INT || 0.000734921126033
re || dom0 || 0.000733999130664
ord_less_eq || #bslash# || 0.000730530126638
pos || LattRel0 || 0.000728896325995
product_Unity || omega || 0.00072360677266
uminus_uminus || -6 || 0.000723235561284
code_integer || TriangleGraph || 0.000719903353776
code_natural || INT || 0.00071621141596
top_top || Mersenne || 0.000716087536405
union || #slash##bslash#9 || 0.000709301891908
nat_of_num || *0 || 0.000708449005577
top_top || SymGroup || 0.000706141550262
less_than || *30 || 0.000705856503343
bot_bot || #quote#31 || 0.00070393121327
real || SourceSelector 3 || 0.000696406946047
top_top || k1_numpoly1 || 0.000696162272765
sqrt || sqr || 0.000693749032513
numeral_numeral || arccos || 0.000693151983686
set_of_seq || Left_Cosets || 0.000691927494526
union || <*..*>16 || 0.000687601494108
bot_bot || Mersenne || 0.000686160311632
nil || (Omega). || 0.000683390224982
complete_Sup_Sup || #quote#31 || 0.000681665714265
product_Unity || 1q0 || 0.000677039043082
bot_bot || SymGroup || 0.000675560650074
arg || lower_bound1 || 0.000674816309434
union || <=>1 || 0.000670427708526
bot_bot || k1_numpoly1 || 0.000669924412696
list_ex || eval || 0.000669914029637
bNF_Cardinal_cfinite || are_equipotent || 0.000669349479729
ord_less_eq || =3 || 0.000668524896542
real_V1632203528linear || is_an_inverseOp_wrt || 0.000662507263441
pow || #slash# || 0.000660652677163
member3 || c=1 || 0.000658507160704
minus_minus || *3 || 0.000658212554265
product_Unity || 0c || 0.000651779734344
normal627294541factor || #slash#2 || 0.00065066101859
gcd_lcm || +2 || 0.00064980455787
real || TargetSelector 4 || 0.000647853906892
nat || k5_ordinal1 || 0.00064311011904
bNF_Cardinal_cfinite || are_orthogonal || 0.000640479444658
one2 || 0.1 || 0.000638635215241
real_V1127708846m_norm || -SD0 || 0.000636216607433
default_default || -50 || 0.000635009008852
numeral_numeral || Arg || 0.000631490807973
set2 || uparrow0 || 0.000628407337959
code_Pos || Seg || 0.00062813717138
uminus_uminus || #slash#2 || 0.000624925128524
int || Newton_Coeff || 0.000624697586115
set || fixed_QC-variables || 0.000621608287907
set || free_QC-variables || 0.000621608287907
code_integer_of_num || op0 {} || 0.000618225517495
minus_minus || ^ || 0.00061813404929
sup_sup || *3 || 0.000615455650908
ord_max || +2 || 0.000613289625558
top_top || diameter || 0.000613038779362
pred_list || eval || 0.000612282943476
plus_plus || ^ || 0.000610177004212
abs_abs || +45 || 0.000605302190059
code_Neg || ppf || 0.000589231199339
bot_bot || diameter || 0.000589035832664
set2 || downarrow0 || 0.000588883306032
order_under || Following || 0.000586549848651
set2 || still_not-bound_in || 0.000579772937272
cnj || idseq || 0.000577250656321
set2 || ||....||2 || 0.000577192506032
inc || Seg || 0.000575336063455
int || TriangleGraph || 0.000574949654849
union || \or\0 || 0.000573465936378
inc || SymbolsOf || 0.000569611681151
code_Neg || pfexp || 0.000567365047668
top_top || min0 || 0.000564329383264
set_option || Right_Cosets || 0.00056249721538
top_top || card || 0.000561618827779
top_top || max0 || 0.000559561901874
cos_coeff || I[01]0 || 0.000558918262973
union || =>1 || 0.000556363804375
nat2 || permutations || 0.000554160754434
minus_minus || Trivial-doubleLoopStr || 0.000550692553621
real_Vector_of_real || ^31 || 0.000548391820349
numeral_numeral || |^5 || 0.000546710411917
code_integer_of_num || EdgeSelector 2 || 0.000546574684567
bot_bot || card || 0.000544120085652
bot_bot || min0 || 0.000543920214589
plus_plus || Trivial-doubleLoopStr || 0.000542062478694
union || \&\0 || 0.000541773224192
times_times || *8 || 0.000539701477153
bot_bot || max0 || 0.000539494259417
product_Unity || 1r || 0.000539209642028
field_char_0_of_rat || ^31 || 0.000537485352105
finite_psubset || k6_rvsum_3 || 0.000534430652853
code_dup || -- || 0.000534389358125
bit0 || proj4_4 || 0.000533684586302
gcd_gcd || Trivial-doubleLoopStr || 0.000531653389622
inc || subset-closed_closure_of || 0.000531313033023
one_one || cos || 0.000530428798371
product_unit || ECIW-signature || 0.000529839233799
complex || absreal || 0.000526318633677
bit0 || card || 0.000523217598527
code_dup || Carr || 0.00052229346323
real_V1632203528linear || is_distributive_wrt || 0.000520917896754
remdups_adj || Double0 || 0.000519363538331
real || sqrreal || 0.000516660340739
bit0 || ^20 || 0.000515513335838
ord_less_eq || is_distributive_wrt0 || 0.000512900693257
set_option || Left_Cosets || 0.000512686358767
union || #quote##bslash##slash##quote#4 || 0.000507283020506
bit0 || proj1 || 0.00050553278703
product_unit || VarPoset || 0.000504323861018
top_top || EvenFibs || 0.000502504575703
union || #quote##slash##bslash##quote#1 || 0.000502156105782
bit1 || <*..*>4 || 0.000500751538388
real_V1632203528linear || is_integral_of || 0.000498495764057
bit0 || *1 || 0.000494663145661
finite_finite2 || are_isomorphic11 || 0.000492284590712
top_top || Top || 0.000489393898041
insert || *18 || 0.000488997048036
bot_bot || EvenFibs || 0.000480268568362
real_Vector_of_real || #quote#31 || 0.000480169949122
code_integer_of_num || Trivial-multMagma || 0.000479526257838
diffs || Closed-Interval-TSpace || 0.000475237607145
dup || -- || 0.000473723731042
bot_bot || Top || 0.0004727375404
bit0 || min || 0.000468955101544
pow || +^1 || 0.000466686538771
field_char_0_of_rat || #quote#31 || 0.000463664853543
bot_bot || StandardStackSystem || 0.00046312657713
transitive_trancl || {..}2 || 0.000459492259875
remove || E-max || 0.000457816488989
product_unit || invquaternion || 0.0004545444506
neg || ppf || 0.000453686573059
fract || |(..)| || 0.000447392448393
set || bound_QC-variables || 0.000445693028372
complex || GCD-Algorithm || 0.000445321970774
finite_finite2 || is_DIL_of || 0.000443510446508
product_Unity || VLabelSelector 7 || 0.000440506259044
has_ve2132708402vative || 0_Rmatrix0 || 0.000439785906846
top_top || 1_Rmatrix || 0.000439122780568
inc || +14 || 0.00043898756242
neg || pfexp || 0.00043675213999
ring_1_of_int || ^31 || 0.000435862109127
bNF_Cardinal_cone || REAL || 0.000435479314343
dup || Carr || 0.000435414569381
top_top || succ0 || 0.000433363803263
real_Vector_of_real || +46 || 0.000428190535213
has_ve2132708402vative || +45 || 0.000426187355761
diffs || -root || 0.000423791801957
default_default || Sum2 || 0.000422449948381
has_field_derivative || -SD0 || 0.000422438496474
bot_bot || succ0 || 0.000420946301976
butlast || Double0 || 0.000420193638658
code_dup || #quote##quote# || 0.000417144860128
cnj || Seg || 0.000409469898648
finite_3 || <i>0 || 0.000406629120607
union || ^23 || 0.000405623604566
coset || GenUnivAlg || 0.000400762073652
inc || #quote# || 0.00039725490514
cnj || *\16 || 0.000397251729776
bit0 || #quote#20 || 0.000396668418662
top_top || loci_of || 0.000395833378925
inc || Subtrees0 || 0.000394556510188
uminus_uminus || -2 || 0.000394045994119
real_Vector_of_real || 1_Rmatrix || 0.000390466431742
real_V1908273582scaleR || -SD0 || 0.000389224831207
ring_1_of_int || #quote#31 || 0.000385622937084
field_char_0_of_rat || +46 || 0.000382322786506
code_dup || #quote##quote#0 || 0.000375790094548
inc || sup4 || 0.000374636281152
bot_bot || loci_of || 0.000374226079665
im || Mycielskian0 || 0.000373915163505
suc_Rep || RN_Base || 0.000372312672693
inc || k19_finseq_1 || 0.000370646499605
set2 || Right_Cosets || 0.000369029954904
pi || +16 || 0.000368446737726
antisym || misses || 0.000367684536926
complex || sinh1 || 0.000365989521253
append || #slash##bslash#9 || 0.000364527674621
set2 || the_set_of_l2ComplexSequences || 0.000364091533534
bNF_Cardinal_cone || <e3> || 0.000363506205828
real || *31 || 0.000363308525653
sqrt || abs8 || 0.00035999648836
rat || <i>0 || 0.000356453714431
code_dup || --0 || 0.000355561803325
inverse_inverse || -6 || 0.000354607712876
distinct || ||....||2 || 0.0003521649175
set2 || ||....||3 || 0.000351828164916
zero_zero || !5 || 0.000351555823344
append || <*..*>16 || 0.000348826141808
csqrt || #quote#31 || 0.000347006486024
set2 || Left_Cosets || 0.000346641703381
dup || #quote##quote# || 0.000344288334348
product_unit || WeightSelector 5 || 0.00034334906316
cons || +9 || 0.000343065977503
pos || <*..*>4 || 0.000342297714072
suc_Rep || denominator0 || 0.000340744915283
code_nat_of_natural || Product1 || 0.00033963813946
numeral_numeral || sech || 0.000339383449084
id || -0 || 0.000338460895249
bNF_Ca829732799finite || misses || 0.000338208962401
bit1 || bool0 || 0.00033440816035
replicate || #bslash#*#bslash# || 0.0003337473669
diffs || -41 || 0.000331914983673
product_Unity || 257 || 0.000328641856681
bit0 || -50 || 0.000328598243423
ring_1_of_int || +46 || 0.000326980370338
int || <i>0 || 0.000326802690439
numeral_numeral || EvenFibs || 0.000326391357556
uminus_uminus || {..}2 || 0.000325838645577
code_integer || P_t || 0.000325595256666
numeral_numeral || 1_ || 0.00032521403489
pi || +51 || 0.000320724152034
one_one || 1_ || 0.000320409681493
nat || +21 || 0.000318836365492
uminus_uminus || <*..*>5 || 0.000318422699065
transitive_rtrancl || Directed0 || 0.000315748797822
numeral_numeral || Lucas || 0.000314483670883
code_Pos || FinSETS || 0.000314301224097
code_integer_of_num || FinSETS || 0.000314166849485
gcd_lcm || Trivial-doubleLoopStr || 0.000308905002241
dup || #quote##quote#0 || 0.00030686418573
semilattice || c< || 0.000305283822762
cons || +2 || 0.000303176703484
insert || eval || 0.000301764698706
bNF_Cardinal_cfinite || is_quadratic_residue_mod || 0.000301589418122
times_times || +2 || 0.00030153944808
bit0 || #quote# || 0.000301477941498
is_empty || c= || 0.000297466835743
nat_of_num || ord-type || 0.000296259278223
bot_bot || id1 || 0.000294602864628
bit1 || Subtrees || 0.000292102906061
lattic35693393ce_set || c< || 0.000290814197436
append || #quote##bslash##slash##quote#4 || 0.00028965014747
dup || --0 || 0.000289597772743
ord_max || Trivial-doubleLoopStr || 0.000288840985175
bNF_Cardinal_cfinite || is_differentiable_on1 || 0.000288405060994
append || #quote##slash##bslash##quote#1 || 0.000287694437437
numeral_numeral || 1_Rmatrix || 0.000286545495816
real_V1127708846m_norm || deg0 || 0.000286098007801
nat || *31 || 0.000285573622521
append || <=>1 || 0.000284997714275
zero_Rep || ConwayZero || 0.000284550746997
cnj || #quote#31 || 0.000283600416122
plus_plus || *8 || 0.000282305516875
cos_coeff || 4096 || 0.000282088082355
insert3 || E-max || 0.000280921737292
pos || numbering || 0.000280322468213
product_unit || SCM || 0.000280054663988
bit1 || proj4_4 || 0.000279557886043
times_times || +45 || 0.000277185872599
nat_of_num || dom0 || 0.000276326381747
default_default || Top0 || 0.000275619893611
nat || +16 || 0.00027402088731
numeral_numeral || P_cos || 0.000272966040303
sin_coeff || *31 || 0.000271028990013
complex || COMPLEX || 0.000270963792497
set2 || chi6 || 0.000268624519459
cos_coeff || 0_NN VertexSelector 1 || 0.000267010281758
append || \or\0 || 0.00026499011022
sqrt || #quote#31 || 0.000264402953815
append || =>1 || 0.000261146362676
append || \&\0 || 0.00025778155316
sqr || +76 || 0.000256892347175
re || union0 || 0.000255718135586
int || P_t || 0.000254959963118
sin_coeff || 0_NN VertexSelector 1 || 0.000254931831874
inc || |....|12 || 0.00025397911988
product_unit || SCMPDS || 0.000253959604253
cos_coeff || NAT || 0.000252863661612
wf || is_strongly_connected_in || 0.000251909339201
default_default || Flow || 0.000250565649972
default_default || ^20 || 0.000250519513632
sup_sup || *8 || 0.000248872708869
one_one || goto0 || 0.000246990350862
bit1 || succ1 || 0.000246454706453
pred_nat || NATPLUS || 0.000245449941155
real_V1127708846m_norm || 1_Rmatrix || 0.000244105823026
drop || eval || 0.000244025775487
real || sin0 || 0.000237706933994
distinct || the_set_of_l2ComplexSequences || 0.000236850030938
numeral_numeral || cos || 0.000234865315345
inf_inf || *8 || 0.000234862514989
bit1 || -19 || 0.000234487862359
field_char_0_of_rat || 1_Rmatrix || 0.000233503332038
product_unit || SCM+FSA || 0.000233058711707
nat2 || field || 0.000230517650004
product_Unity || 11 || 0.000230273415546
distinct || ||....||3 || 0.000227502169097
finite_finite2 || c= || 0.000226550098209
divide_divide || *8 || 0.000226118313516
pow || -47 || 0.000225612045354
arcsin || #quote#31 || 0.000225221879957
numeral_numeral || Im3 || 0.000224810077525
sin_coeff || +16 || 0.000224257994263
numeral_numeral || Re2 || 0.000224215473773
wf || is_antisymmetric_in || 0.000223308012989
dup || #quote#31 || 0.000222735396116
pred || product#quote# || 0.000221382068936
top_top || -50 || 0.000221319804797
code_integer || Rea0 || 0.000220864591317
real_V1908273582scaleR || 1_Rmatrix || 0.000219646450031
append || #bslash#+#bslash#2 || 0.00021818139577
has_field_derivative || 1_Rmatrix || 0.000218091787306
code_Neg || {..}1 || 0.000218012110224
bit0 || carrier || 0.000217109775225
rotate || *8 || 0.00021683056137
code_dup || #quote#31 || 0.000215474297607
numeral_numeral || 1. || 0.000215020298973
set || MultiSet_over || 0.000214879693993
times_times || 0_Rmatrix0 || 0.000213852150121
bot_bot || -50 || 0.000213325896747
wf || is_transitive_in || 0.000213237922575
divide_divide || -1 || 0.000210817534342
one2 || Vars || 0.000210652840564
trans || c=0 || 0.000208970344266
divide_divide || +2 || 0.000208943516505
top_top || kind_of || 0.000207048338936
nil || Constants || 0.000206486992438
arctan || #quote#31 || 0.000206471061812
remdups || FinMeetCl || 0.000205875243752
finite_psubset || QuasiAdjs || 0.000202994233111
times_times || -1 || 0.000202943565426
bit1 || -0 || 0.00020129371506
code_integer_of_num || 0.1 || 0.000200034449823
bot_bot || +52 || 0.000198734857946
bot_bot || kind_of || 0.000198234581125
numeral_numeral || *1 || 0.000198052571011
neg || {..}1 || 0.000193899211868
suc_Rep || |^5 || 0.000188697599895
wf || is_reflexive_in || 0.000187745898822
numeral_numeral || len- || 0.000187507368941
nil || Subspaces || 0.000187337970459
nil || Submodules || 0.000187337970459
nil || Subspaces2 || 0.000187337970459
default_default || carrier\ || 0.000186688144342
code_integer || <i>0 || 0.00018411943509
nat2 || proj4_4 || 0.000183242131502
bNF_Cardinal_cone || <e2> || 0.000179594529018
nat_of_num || Subtrees || 0.000179530220796
ord_max || -0 || 0.000178689403098
ord_min || -0 || 0.000178490614126
code_integer || <j> || 0.000177825401167
code_integer || *63 || 0.000177825401167
bit1 || +45 || 0.000176933240673
product_Unity || 13 || 0.000173682864391
lattic929149872er_Max || -0 || 0.000173198531225
cofinite || +14 || 0.000173122623812
set || UnSubAlLattice || 0.000172655685086
numeral_numeral || base- || 0.00017154996126
numeral_numeral || limit- || 0.00017154996126
cos_coeff || 64 || 0.000170538058867
code_integer_of_num || k5_ordinal1 || 0.00016983795669
bot_bot || 0* || 0.000166600576143
minus_minus || *8 || 0.000165960231657
cos_coeff || 32 || 0.000162618700859
nat2 || SymbolsOf || 0.000162371647374
default_default || len || 0.00016078927562
numeral_numeral || Sum^ || 0.00016051715443
code_dup || -54 || 0.00016041788833
cofinite || #quote# || 0.000158272816049
numeral_numeral || ord-type || 0.000158090830602
pred || union0 || 0.000157743501028
append || ^23 || 0.000156330518817
code_Neg || <*..*>4 || 0.000155679003477
nat2 || subset-closed_closure_of || 0.000155269535116
minus_minus || -1 || 0.000155093126783
plus_plus || -1 || 0.000153244229665
code_integer || R^2-unit_square || 0.000152373184434
code_integer_of_num || -infty || 0.000152205502198
code_Pos || <*..*>4 || 0.000152009806532
at_top || -0 || 0.000151902723169
code_integer_of_num || +infty || 0.00015105548053
set || product#quote# || 0.000146936810177
bNF_Cardinal_cone || EdgeSelector 2 || 0.000146487470274
cnj || AV || 0.000145251618866
less_than || hcflatplus || 0.000145019241318
less_than || lcmlatplus || 0.000145019241318
one_one || dom0 || 0.000144545890862
nil || Subgroups || 0.000143006178645
hd || ||....||2 || 0.000142980962676
code_integer || TargetSelector 4 || 0.000142441120282
im || sin1 || 0.000142383814203
re || sin1 || 0.000141419213421
nil || bool3 || 0.00014014850781
divide_divide || NOT1 || 0.000140113577336
re || Product1 || 0.000138704451289
code_integer_of_num || dom0 || 0.000138596322671
cos_coeff || 16 || 0.000138509234679
finite_finite2 || -0 || 0.000138404279452
top_top || Sum2 || 0.000137714885789
real_Vector_of_real || |->0 || 0.000137649605536
re || denominator || 0.000137620824509
numeral_numeral || arity || 0.000136234254622
product_Unity || ELabelSelector 6 || 0.000136156762554
rotate || #bslash#*#bslash# || 0.000135480662557
nat || TernaryFieldEx || 0.000135104256358
sin_coeff || 12 || 0.000134747858475
nil || east_halfline || 0.000133953898711
nil || west_halfline || 0.000133953898711
numeral_numeral || SymGroup || 0.000133129220251
real_V1127708846m_norm || ^31 || 0.000133008812296
divide_divide || permutations || 0.000132767434196
has_field_derivative || ^31 || 0.00013267510536
bot_bot || Sum2 || 0.000132551760991
nil || the_Tree_of || 0.000132390027982
nil || Big_Omega || 0.000132390027982
nat_of_num || succ1 || 0.000132232339167
nil || Subtrees || 0.000130993817178
re || #quote# || 0.000130026112834
one2 || |....|11 || 0.000129021410354
real_V1908273582scaleR || ^31 || 0.00012901998934
code_integer || TernaryFieldEx || 0.00012873837033
nil || the_right_side_of || 0.000128591129208
nat2 || Subtrees0 || 0.000128050812869
default_default || carrier || 0.000128012674997
normal1132893779malize || +14 || 0.000127948824935
sgn_sgn || +45 || 0.000127545036844
nil || nextcard || 0.000127544041047
nil || south_halfline || 0.000127544041047
nil || Big_Theta || 0.000127544041047
nil || north_halfline || 0.000127544041047
bit1 || +46 || 0.000125313430526
times_times || Trivial-doubleLoopStr || 0.000124182147849
nat || Example || 0.000124101585412
numeral_numeral || *64 || 0.000123677705758
nat2 || sup4 || 0.00012303252984
divide_divide || derangements || 0.000121842278446
product_Unity || 24 || 0.000121342972266
condit1810911227_above || +14 || 0.000121311912967
im || *78 || 0.00012101926845
finite_psubset || QuasiTypes || 0.000120815753779
product_Unity || 10 || 0.000120794473058
nat2 || k19_finseq_1 || 0.000120727822803
code_integer || ECIW-signature || 0.000120514564183
set_of_seq || +23 || 0.000120106613277
normal1132893779malize || #quote# || 0.000119771326986
re || *78 || 0.000119614099691
nat_of_num || bool0 || 0.000119183377536
real_V1127708846m_norm || +46 || 0.000119174021951
has_field_derivative || +46 || 0.000118313701276
product_Unity || 127 || 0.000118227406037
real_V1127708846m_norm || #quote#31 || 0.000118039190037
top_top || ^20 || 0.00011781604355
im || +51 || 0.000117362646829
numeral_numeral || diameter || 0.000117352778002
nil || Tarski-Class || 0.000117073616782
has_field_derivative || #quote#31 || 0.000116976061158
default_default || In_Power || 0.000116931892141
re || +51 || 0.000116097503489
diffs || to_power1 || 0.0001160306848
splice || *18 || 0.000115699210195
numeral_numeral || Rea || 0.000115324802567
numeral_numeral || Im20 || 0.000115324802567
real_V1908273582scaleR || +46 || 0.000115308188221
numeral_numeral || 0. || 0.000115075310242
numeral_numeral || Im10 || 0.000114985816597
numeral_numeral || <k>0 || 0.000114499910207
bot_bot || ^20 || 0.000114356600186
set || union0 || 0.000114229059057
condit1810911227_above || #quote# || 0.000113781279891
bit0 || curry\ || 0.000113611741204
nil || Big_Oh || 0.000113441705591
real_V1908273582scaleR || #quote#31 || 0.000113438865977
divide_divide || CompleteSGraph || 0.000112575952845
nat_of_num || <*..*>4 || 0.000111748248764
numeral_numeral || card || 0.000111600488244
sin_coeff || *78 || 0.000111154167108
inc || Im20 || 0.000110679503238
inc || Rea || 0.000110679503238
real || 0c || 0.000110586289274
cos_coeff || 8 || 0.000110295522625
inc || Im10 || 0.000110150436569
divide_divide || -SD0 || 0.000108842041884
nil || succ1 || 0.000108563983395
numeral_numeral || min0 || 0.000107858347165
real || 1r || 0.000107842991696
cos_coeff || <i>0 || 0.00010732659285
numeral_numeral || max0 || 0.000106961202765
root || <X> || 0.000106848527426
sup_sup || +14 || 0.000106403212781
sin_coeff || <i>0 || 0.000106063225507
sin_coeff || ELabelSelector 6 || 0.000105879395964
set_of_seq || +30 || 0.000105811121382
code_Pos || ppf || 0.00010569021281
inf_inf || +14 || 0.000105647039695
pos || Open_setLatt || 0.000105342079651
re || *1 || 0.000105059977501
divide_divide || sproduct || 0.000104618382047
null || <= || 0.000103867433233
im || dom0 || 0.000103662376738
semiring_1_of_nat || L~ || 0.000103546158697
empty || -3 || 0.000103402025362
complete_Sup_Sup || +14 || 0.000103057260972
pred_of_seq || Right_Cosets || 0.000102808235391
product_unit || VLabelSelector 7 || 0.000102637865014
cos_coeff || *63 || 0.000102426586741
empty || -25 || 0.000102164232167
sin_coeff || WeightSelector 5 || 0.000101997566872
code_Pos || pfexp || 0.000101881284287
less_than || MP-variables || 0.000101632145308
sin_coeff || <j> || 0.000101265996089
top_top || Flow || 0.000101028148331
sup_sup || #quote# || 0.000100988908066
nat_of_num || proj4_4 || 0.000100657387712
int || ECIW-signature || 0.000100627642514
hd || the_set_of_l2ComplexSequences || 0.000100619154025
product_Unity || 31 || 0.000100521069021
inf_inf || #quote# || 0.000100306995223
sin_coeff || *30 || 0.000100213026869
bot_bot || Top0 || 0.000100062551949
product_Unity || continuum || 9.95480234465e-05
bNF_Ca1495478003natLeq || omega || 9.92555361937e-05
pos || IncProjSp_of0 || 9.91135939713e-05
suc || -0 || 9.78617006767e-05
semiring_1_of_nat || +14 || 9.77443899402e-05
bot_bot || Flow || 9.76900320626e-05
real_Vector_of_real || #slash# || 9.7675228222e-05
complete_Sup_Sup || #quote# || 9.7587211344e-05
sin_coeff || +51 || 9.7362162232e-05
nat2 || SpStSeq || 9.73122656104e-05
cnj || k4_ltlaxio2 || 9.69584788367e-05
trans || meets || 9.66092513888e-05
top_top || Top0 || 9.63953223417e-05
sin_coeff || +20 || 9.63770284392e-05
hd || ||....||3 || 9.61917464535e-05
set_option || +23 || 9.39225498254e-05
pred || carrier || 9.3542453966e-05
one2 || omega || 9.31112896659e-05
semiring_1_of_nat || #quote# || 9.28867234257e-05
rotate || Ex || 9.25106159627e-05
pred_of_seq || Left_Cosets || 9.23625197212e-05
finite_2 || NAT || 9.23553221165e-05
plus_plus || {..}1 || 9.23515847491e-05
pos || ppf || 9.23244714396e-05
divide_divide || Fin || 9.22834614387e-05
sym || r3_tarski || 9.18924784989e-05
sin_coeff || TargetSelector 4 || 9.16965431464e-05
pos || pfexp || 8.8932891938e-05
one2 || 1r || 8.88711703574e-05
top_top || carrier\ || 8.86551346438e-05
id2 || *1 || 8.86208681519e-05
divide_divide || *0 || 8.84543078265e-05
wf || meets || 8.83760291036e-05
code_integer_of_num || 17 || 8.80129738107e-05
bitM || Im20 || 8.74366535973e-05
bitM || Rea || 8.74366535973e-05
divide_divide || Bags || 8.73382865535e-05
divide_divide || product || 8.72060831787e-05
bitM || Im10 || 8.70230100426e-05
code_integer || <i> || 8.6888104077e-05
top_top || len || 8.659348054e-05
finite_2 || 0_NN VertexSelector 1 || 8.62796995212e-05
bot_bot || carrier\ || 8.60740956544e-05
gen_length || *152 || 8.56663081293e-05
code_integer || 0q0 || 8.54196981054e-05
product_unit || RAT || 8.48736885887e-05
nat2 || sqr || 8.4716121338e-05
set_option || +30 || 8.47085773799e-05
append || *18 || 8.46667455197e-05
rotate || All || 8.44385925774e-05
bot_bot || len || 8.43716139606e-05
take || #bslash#*#bslash# || 8.32805156758e-05
divide_divide || bool || 8.32341727547e-05
ii || TargetSelector 4 || 8.29462328068e-05
bit1 || Col || 8.28896953828e-05
bitM || -54 || 8.27267502639e-05
complex2 || cat0 || 8.25901590148e-05
ii || 14 || 8.2348753659e-05
code_integer_of_num || 257 || 8.14508744456e-05
sin_coeff || SourceSelector 3 || 8.02691467177e-05
bitM || <k>0 || 7.9955785788e-05
less_than || omega || 7.96604770501e-05
code_num_of_integer || min || 7.8589971854e-05
code_sub || ++0 || 7.79358222915e-05
product_unit || Euclide-Algorithm || 7.49952724416e-05
cos_coeff || <j> || 7.47506250598e-05
product_Unity || 28 || 7.39872322518e-05
sin_coeff || *63 || 7.39064630513e-05
code_integer_of_num || 0q0 || 7.34970000788e-05
none || -3 || 7.33130592644e-05
ratreal || FinSETS || 7.32412087874e-05
none || -25 || 7.29605457286e-05
top_top || carrier || 7.28015025198e-05
suc || bool || 7.27732536616e-05
sub || ++0 || 7.26599220138e-05
code_integer_of_int || |....| || 7.2611461299e-05
nat || MP-conectives || 7.24775609621e-05
field_char_0_of_rat || 1_ || 7.24118358937e-05
null || wayabove || 7.22644651341e-05
nat2 || Top || 7.1828844159e-05
divide_divide || Seg || 7.13109887284e-05
bot_bot || carrier || 7.10527992587e-05
bNF_Ca1495478003natLeq || MP-variables || 7.10330596422e-05
numeral_numeral || #quote#20 || 7.06992522399e-05
product_Unity || 36 || 7.0632037573e-05
product_Unity || 21 || 7.05266612427e-05
product_unit || k2_topgen_6 || 7.01030036189e-05
bit1 || #quote#14 || 6.99803462111e-05
nat2 || Points || 6.99623610386e-05
sin_coeff || *136 || 6.8601804541e-05
numeral_numeral || ^28 || 6.85983477563e-05
sin_coeff || *137 || 6.82014763303e-05
rotate1 || \not\5 || 6.81830719405e-05
sin_coeff || +73 || 6.77796963585e-05
numeral_numeral || lim || 6.7596439906e-05
sin_coeff || multextreal || 6.73835823302e-05
splice || *152 || 6.72837302645e-05
int || TernaryFieldEx || 6.675991017e-05
is_empty2 || ^01 || 6.67564610219e-05
id_on || max || 6.66354890174e-05
set || QuasiTerms || 6.63182505323e-05
set2 || +23 || 6.62966911927e-05
normal627294541factor || ^31 || 6.61567738893e-05
numeral_numeral || Fib || 6.54960404014e-05
product_unit || INT || 6.54825131778e-05
code_nat_of_integer || SpStSeq || 6.45437388745e-05
nil || -3 || 6.42808141984e-05
code_integer || 1q0 || 6.42421737867e-05
numeral_numeral || ^31 || 6.41356782343e-05
nil || -25 || 6.39946470336e-05
code_integer_of_nat || FinSETS || 6.38231893076e-05
code_integer || Z_2 || 6.37045238636e-05
inc || Sum11 || 6.3294761011e-05
real || SCMPDS || 6.28369520628e-05
dup || nextcard || 6.26279980258e-05
complex || HP-WFF || 6.14948244365e-05
set2 || +30 || 6.14047353385e-05
code_integer || k2_moebius2 || 6.10710341349e-05
code_integer || k1_moebius2 || 6.10710341349e-05
zero_zero || carrier || 6.08724694097e-05
bitM || -25 || 6.06748927998e-05
id2 || k1_numpoly1 || 5.97930756262e-05
less_than || Constructors || 5.97925516038e-05
zero_zero || ConwayDay || 5.88119501736e-05
code_dup || nextcard || 5.8561037061e-05
remdups_adj || \not\5 || 5.84732304345e-05
id2 || Lucas || 5.76358839949e-05
numeral_numeral || |....| || 5.74496716112e-05
code_integer || set-constr || 5.70756452919e-05
bit0 || Seg || 5.69826704967e-05
id2 || |....|2 || 5.69739310625e-05
ring_1_of_int || 1_ || 5.68228962045e-05
bitM || -- || 5.64173836181e-05
normal627294541factor || #quote#31 || 5.63794893089e-05
id2 || In_Power || 5.63756252e-05
product_Unity || k11_numpoly1 || 5.63358841588e-05
zero_zero || cos || 5.59107051325e-05
code_integer_of_num || 1q0 || 5.58689668638e-05
transitive_trancl || max || 5.57111433364e-05
pred_nat || MP-variables || 5.55380318767e-05
one_one || return || 5.54741041869e-05
ring_1_of_int || {..}3 || 5.5169734395e-05
bit0 || #quote#14 || 5.47266074633e-05
gen_length || *18 || 5.46675424358e-05
code_dup || sqrt0 || 5.45174612088e-05
inc || <k>0 || 5.4070470605e-05
remdups || \not\5 || 5.37492988227e-05
transitive_rtrancl || max || 5.35174174362e-05
re || sqr || 5.31326872898e-05
numeral_numeral || exp1 || 5.28929385665e-05
real || SBP || 5.28839462687e-05
nat || P_t || 5.27854508048e-05
finite_psubset || RightComp || 5.25026707445e-05
code_integer || Benzene || 5.21351579931e-05
nat_of_num || Im20 || 5.17410586282e-05
nat_of_num || Rea || 5.17410586282e-05
sublist || *158 || 5.164398651e-05
complex2 || latt0 || 5.1593881381e-05
complex2 || latt2 || 5.1593881381e-05
nat_of_num || Im10 || 5.15080033742e-05
gen_length || #slash#19 || 5.13881638668e-05
code_integer || Im30 || 5.12190880689e-05
bit1 || +76 || 5.11563371623e-05
rev || \not\5 || 5.10021424839e-05
code_integer || INT.Group1 || 5.03041975088e-05
real || k5_ordinal1 || 4.92601633083e-05
semiring_1_of_nat || Rank || 4.88839210797e-05
set_option || bool2 || 4.88502974564e-05
sqrt || k4_ltlaxio2 || 4.88347343931e-05
nat || Vars || 4.83510329774e-05
code_integer_of_num || VLabelSelector 7 || 4.81367168004e-05
numeral_numeral || Catalan || 4.79064159593e-05
numeral_numeral || Euler || 4.75570274474e-05
code_int_of_integer || SpStSeq || 4.72833498754e-05
real || sqrcomplex || 4.71389462509e-05
numeral_numeral || Mersenne || 4.66723851152e-05
bit1 || {..}1 || 4.64537128275e-05
numeral_numeral || index_of || 4.60812482024e-05
code_dup || Card0 || 4.58768165569e-05
product_unit || y=0-line || 4.57829783636e-05
sin_coeff || +21 || 4.54362521591e-05
bNF_Ca1495478003natLeq || Constructors || 4.47706095823e-05
rat || k5_ordinal1 || 4.45289453341e-05
ord_min || *8 || 4.45070195333e-05
code_integer_of_int || FinSETS || 4.44143638863e-05
product_unit || 8 || 4.43683131868e-05
id_on || + || 4.35991885326e-05
splice || #slash#19 || 4.3308999965e-05
numeral_numeral || k1_numpoly1 || 4.32675270808e-05
code_natural_of_nat || FinSETS || 4.26181664633e-05
product_unit || ELabelSelector 6 || 4.2537967717e-05
semiring_1_of_nat || 1_ || 4.24652311797e-05
re || len || 4.15498518196e-05
complex2 || CohSp || 4.13655370396e-05
product_Unity || 38 || 4.12413155533e-05
bit0 || +14 || 4.1225458072e-05
top_top || In_Power || 4.07194718634e-05
default_default || alef || 4.04608750313e-05
re || |....| || 4.04038413062e-05
product_unit || while<>0 || 4.03469247668e-05
field_char_0_of_rat || Rank || 4.02842070139e-05
normal627294541factor || +46 || 3.98588662464e-05
is_empty || are_isomorphic11 || 3.93506070877e-05
bot_bot || In_Power || 3.92491606519e-05
code_int_of_integer || upper_bound1 || 3.91742591349e-05
transitive_trancl || + || 3.85985024495e-05
bNF_Cardinal_cfinite || c< || 3.85469761745e-05
diffs || . || 3.84652236988e-05
bNF_Cardinal_cone || REAL+ || 3.79975673173e-05
product_unit || Partition || 3.78770770972e-05
inc || the_rank_of0 || 3.78306229987e-05
complex2 || |2 || 3.77573057993e-05
transitive_rtrancl || + || 3.75322168665e-05
code_int_of_integer || *86 || 3.7440394764e-05
real || TernaryFieldEx || 3.74224600377e-05
bitM || alef || 3.71482761106e-05
some || union6 || 3.69377772864e-05
real || RAT || 3.67119365637e-05
bitM || sqrt0 || 3.66238569351e-05
trans || is_strongly_connected_in || 3.63276951312e-05
code_dup || abs8 || 3.63129709381e-05
null || are_equipotent || 3.60749847544e-05
code_dup || doms || 3.52092352064e-05
code_int_of_integer || ppf || 3.51897404982e-05
ring_1_of_int || 1. || 3.51712621465e-05
product_unit || omega || 3.49664777557e-05
code_integer || INT.Ring0 || 3.45620262626e-05
bitM || UNIVERSE || 3.43815195205e-05
remdups || -22 || 3.359021628e-05
ring_1_of_int || Product3 || 3.35544476769e-05
set || QuasiTypes || 3.33778901562e-05
divide_divide || +19 || 3.32901214607e-05
ring_1_of_int || L~ || 3.32592855812e-05
code_natural_of_nat || 0_NN VertexSelector 1 || 3.25458505735e-05
nat || lcmlat || 3.24549056011e-05
nat || hcflat || 3.24549056011e-05
field_char_0_of_rat || 1. || 3.24050549272e-05
product_Unity || 120 || 3.21148879979e-05
append || *152 || 3.20751872374e-05
code_integer || -infty || 3.1942413225e-05
times_times || +19 || 3.1825634212e-05
code_integer || +infty || 3.17798547406e-05
trans || is_antisymmetric_in || 3.16611627773e-05
product_case_unit || *144 || 3.13620224034e-05
product_rec_unit || *144 || 3.13620224034e-05
pred_nat || Constructors || 3.12889231236e-05
bitM || Card0 || 3.12529732178e-05
code_dup || SubFuncs || 3.11888106289e-05
code_dup || sqr || 3.11359350072e-05
bNF_Cardinal_cfinite || c= || 3.06542010959e-05
code_integer || empty_f_net || 3.05490682026e-05
product_case_unit || -46 || 3.01865338344e-05
product_rec_unit || -46 || 3.01865338344e-05
trans || is_transitive_in || 3.00517378132e-05
real || INT || 2.97574908675e-05
numeral_numeral || S-bound || 2.90663772297e-05
code_integer_of_num || 1r || 2.89007571838e-05
rotate1 || #slash#2 || 2.87321136336e-05
ring_1_of_int || Rank || 2.86306566177e-05
code_integer || <e1> || 2.83382519213e-05
code_integer || <e2> || 2.83382519213e-05
code_integer || <e3> || 2.83382519213e-05
numeral_numeral || W-bound || 2.82008374547e-05
numeral_numeral || Bottom || 2.81389620199e-05
real || -45 || 2.80523761961e-05
im || Web || 2.78577869173e-05
real || HP-WFF || 2.78565086503e-05
product_unit || k5_ordinal1 || 2.74062006966e-05
numeral_numeral || sin || 2.72995107615e-05
product_Unity || 12 || 2.68832697548e-05
product_Unity || SCM-Data-Loc || 2.67835461017e-05
bitM || nextcard || 2.6768788556e-05
code_integer_of_num || 0c || 2.67192101479e-05
trans || is_reflexive_in || 2.60574736805e-05
butlast || #slash#2 || 2.60370393028e-05
remdups_adj || #slash#2 || 2.5893924602e-05
code_int_of_integer || k2_zmodul05 || 2.57643415945e-05
remdups || #slash#2 || 2.57578922966e-05
bitM || abs8 || 2.55258697995e-05
cnj || sort_d || 2.53899235666e-05
cnj || sort_a || 2.53899235666e-05
is_empty2 || Int || 2.52553977135e-05
append || #slash#19 || 2.50718330441e-05
cnj || k8_rvsum_3 || 2.50401107431e-05
tl || #slash#2 || 2.45117073652e-05
code_integer_of_num || 13 || 2.44529549246e-05
int || Vars || 2.43275419112e-05
set || LeftComp || 2.41739473278e-05
rat || TernaryFieldEx || 2.39096182855e-05
nat_of_num || -Matrices_over || 2.39087442967e-05
re || min || 2.3391130211e-05
rev || #slash#2 || 2.31625392635e-05
code_integer_of_num || 11 || 2.30853252353e-05
sin_coeff || NAT || 2.28167163585e-05
is_empty || is_DIL_of || 2.2668654284e-05
code_integer_of_num || ELabelSelector 6 || 2.25986812148e-05
bitM || sqr || 2.23983701433e-05
semiring_1_of_nat || 1. || 2.23730748239e-05
real || *78 || 2.23714663908e-05
numeral_numeral || N-bound || 2.23249560975e-05
numeral_numeral || E-bound || 2.16601312589e-05
bit1 || nextcard || 2.13862281568e-05
default_default || proj1 || 2.13631022216e-05
null || divides || 2.1249337087e-05
bNF_Cardinal_cone || SCM+FSA-Memory || 2.11431290801e-05
antisym || is_strongly_connected_in || 2.0748230977e-05
cnj || X_axis || 2.07318992383e-05
cnj || Y_axis || 2.07318992383e-05
code_natural || k5_ordinal1 || 2.04826538261e-05
bit1 || Tarski-Class || 1.93509310694e-05
int_ge_less_than2 || carrier\ || 1.87804462027e-05
int_ge_less_than || carrier\ || 1.87804462027e-05
int || <i> || 1.84374024764e-05
bNF_Ca829732799finite || is_strongly_connected_in || 1.81694263546e-05
rat || <i> || 1.81627131429e-05
bNF_Cardinal_cone || continuum || 1.80676526445e-05
antisym || is_antisymmetric_in || 1.78140445767e-05
product_unit || IVERUM || 1.75491368554e-05
finite_2 || *63 || 1.74844939083e-05
finite_2 || <j> || 1.74844939083e-05
default_default || Partial_Sums || 1.73532955238e-05
bNF_Cardinal_cone || SCM-Memory || 1.70329584693e-05
neg || card || 1.7017134951e-05
finite_3 || <i> || 1.70060654846e-05
nat_of_num || idseq || 1.69801291239e-05
code_Neg || card || 1.68837749269e-05
antisym || is_transitive_in || 1.68184499119e-05
pos || card || 1.68137310135e-05
minus_minus || NOT1 || 1.67818721329e-05
default_default || NonZero || 1.66531046536e-05
code_Pos || card || 1.65170833089e-05
nat2 || SymGroup || 1.64673901084e-05
gcd_lcm || @3 || 1.63549737441e-05
pos || *+^+<0> || 1.61565044466e-05
finite_2 || |....|11 || 1.61515795876e-05
real || <i> || 1.61334285246e-05
nil || (Omega).3 || 1.60173381393e-05
minus_minus || permutations || 1.59303822547e-05
bNF_Ca829732799finite || is_antisymmetric_in || 1.58596296834e-05
real || 0 || 1.55432465357e-05
gcd_gcd || @3 || 1.54677054762e-05
code_natural || op0 {} || 1.54350242484e-05
ii || 0_NN VertexSelector 1 || 1.51750272537e-05
distinct || divides || 1.50709323146e-05
bNF_Ca829732799finite || is_transitive_in || 1.50612053706e-05
complex || omega || 1.49013427881e-05
minus_minus || derangements || 1.46585237462e-05
uminus_uminus || <*..*>1 || 1.45697025683e-05
code_integer_of_num || TargetSelector 4 || 1.44009137241e-05
antisym || is_reflexive_in || 1.43873909903e-05
bit1 || card || 1.39884310791e-05
inc || +45 || 1.39728266976e-05
rat || F_Complex || 1.38233896065e-05
insert3 || #bslash##slash#2 || 1.38062104254e-05
minus_minus || CompleteSGraph || 1.35745125333e-05
code_integer || Euclide-Algorithm || 1.32362952746e-05
bNF_Ca829732799finite || is_reflexive_in || 1.30758677301e-05
complex2 || TolSets || 1.30355720538e-05
complex2 || TolClasses || 1.30355720538e-05
diffs || .51 || 1.28695180592e-05
nat2 || Sgm || 1.27419803821e-05
bitM || #quote##quote# || 1.27180430571e-05
distinct || Free1 || 1.26586553336e-05
distinct || Fixed || 1.26586553336e-05
minus_minus || sproduct || 1.26396914741e-05
product_unit || one || 1.25951889871e-05
bit0 || +46 || 1.25869919875e-05
nil || Top1 || 1.25744309276e-05
code_integer || WeightSelector 5 || 1.25720937169e-05
removeAll || #bslash#*#bslash# || 1.23204829527e-05
bNF_Cardinal_cone || IPC-Taut || 1.17558925259e-05
minus_minus || Fin || 1.11834045452e-05
top_top || proj1 || 1.10933170079e-05
product_unit || cosh1 || 1.10802356511e-05
eval || is_a_cluster_point_of0 || 1.1076438439e-05
numeral_numeral || Top || 1.08077089273e-05
bot_bot || proj1 || 1.07970749727e-05
minus_minus || *0 || 1.07295226761e-05
minus_minus || Bags || 1.05970753766e-05
minus_minus || product || 1.05813808868e-05
divide_divide || ^31 || 1.03566961849e-05
code_integer || RAT || 1.01681258485e-05
nat2 || carrier || 1.01575545851e-05
minus_minus || bool || 1.01093774759e-05
bit1 || curry\ || 1.00849969942e-05
code_Suc || +45 || 9.99335673811e-06
code_integer || Trivial-addLoopStr || 9.86902371277e-06
numeral_numeral || loci_of || 9.81409576959e-06
real || ECIW-signature || 9.59859975239e-06
bitM || Carr || 9.50637293999e-06
product_unit || {}2 || 9.48943523026e-06
bNF_Cardinal_cfinite || linearly_orders || 9.46321720953e-06
bitM || --0 || 9.3874725072e-06
divide_divide || #quote#31 || 9.36431618084e-06
top_top || alef || 9.27913145759e-06
sin_coeff || P_t || 9.22911066428e-06
real || sinh1 || 9.21227636331e-06
bitM || #quote##quote#0 || 9.19810064308e-06
numeral_numeral || In_Power || 9.10403256386e-06
product_unit || sinh0 || 9.08966884322e-06
product_unit || sinh1 || 8.95891011032e-06
pred_of_seq || +23 || 8.89517954262e-06
inc || alef || 8.89272885654e-06
code_integer || VarPoset || 8.8867557259e-06
code_integer || k10_numpoly1 || 8.88103831327e-06
bot_bot || alef || 8.86823428708e-06
filter2 || #bslash#*#bslash# || 8.7657085804e-06
bNF_Cardinal_cone || COMPLEX || 8.74748877671e-06
nat_of_num || Im3 || 8.7329851348e-06
real || arcsec1 || 8.6852454653e-06
code_integer || SCM || 8.66421381738e-06
inc || proj1 || 8.63723086592e-06
finite_finite2 || ex_inf_of || 8.3925794845e-06
product_unit || P_sin || 8.25312374657e-06
product_unit || RealOrd || 8.24878825457e-06
inc || UNIVERSE || 8.22657917284e-06
pred || len || 8.19979861859e-06
nat_of_num || On || 8.18791903206e-06
divide_divide || +46 || 8.16923591305e-06
finite_psubset || NonTerminals || 8.15501332239e-06
bNF_Cardinal_cone || RAT || 8.03386943417e-06
code_integer || SCMPDS || 7.97713797428e-06
product_unit || REAL+ || 7.73447320292e-06
finite_finite2 || ex_sup_of || 7.65577657802e-06
code_integer || SCM+FSA || 7.57021783305e-06
suc || -19 || 7.55030786739e-06
top_top || Partial_Sums || 7.54931903723e-06
bot_bot || Partial_Sums || 7.3131333383e-06
product_unit || sin0 || 7.23530177281e-06
pred_of_seq || +30 || 7.13717666684e-06
im || numerator || 7.03471593624e-06
code_Suc || +46 || 6.92993110062e-06
numeral_numeral || proj1 || 6.87906915354e-06
bitM || the_rank_of0 || 6.85830328607e-06
re || succ0 || 6.83226556444e-06
bit0 || -19 || 6.44311145188e-06
nil || 1_ || 6.42330840933e-06
finite_psubset || weight || 6.41983058338e-06
bit0 || bool0 || 6.3673694886e-06
sup_sup || ^#bslash# || 6.2884173472e-06
product_unit || Sorgenfrey-line || 6.17977963248e-06
inc || Rank || 6.06687776084e-06
set2 || ^7 || 6.03474757849e-06
code_nat_of_integer || SymbolsOf || 5.99960835732e-06
numeral_numeral || Top0 || 5.98946096501e-06
inc || ^20 || 5.93982698158e-06
finite_psubset || SortsWithConstants || 5.86293641993e-06
top_top || NonZero || 5.84930523976e-06
antisym || <= || 5.82174754614e-06
sym || <= || 5.7981945538e-06
finite_psubset || sup4 || 5.79462366173e-06
inc || carrier || 5.76861348883e-06
empty || Bottom0 || 5.7451363516e-06
nat_of_num || arity || 5.72220268461e-06
code_integer_of_num || continuum || 5.71356226767e-06
numeral_numeral || Flow || 5.67185235896e-06
nat2 || arity0 || 5.67135075613e-06
finite_2 || <i>0 || 5.65986603826e-06
bot_bot || NonZero || 5.63896493753e-06
numeral_numeral || Sum2 || 5.51378657687e-06
bitM || Sum11 || 5.43807761252e-06
numeral_numeral || ^20 || 5.3432143505e-06
set || ~0 || 5.23136956213e-06
inc || topology || 5.11083556713e-06
code_natural_of_nat || Sum || 5.0988019477e-06
numeral_numeral || carrier\ || 4.99393534011e-06
id_on || +` || 4.93129215643e-06
pos || .104 || 4.90400241123e-06
id_on || exp4 || 4.89379656143e-06
diffs || `|0 || 4.84344953288e-06
less_than || OddNAT || 4.7805972197e-06
bit1 || *1 || 4.75487648312e-06
set_of_seq || ~7 || 4.61222581164e-06
id2 || epsilon_ || 4.57106298176e-06
field_char_0_of_rat || +14 || 4.40486414871e-06
real || sec || 4.3744867923e-06
inc || Im3 || 4.35183187334e-06
cos_coeff || sin1 || 4.34551012991e-06
bit0 || 1TopSp || 4.33918796685e-06
nat_of_num || *1 || 4.22534628359e-06
id_on || +^1 || 4.18315162736e-06
real || P_sin || 4.16448078081e-06
nat || EvenNAT || 4.16279648713e-06
bit0 || nextcard || 4.1560739276e-06
field_char_0_of_rat || #quote# || 4.12944330152e-06
numeral_numeral || carrier || 4.11715869133e-06
inc || Re2 || 4.11630227224e-06
set2 || ConsecutiveSet2 || 4.09008818063e-06
set2 || ConsecutiveSet || 4.09008818063e-06
bNF_Cardinal_cfinite || r3_tarski || 4.0753447381e-06
code_nat_of_natural || Im20 || 4.07512566984e-06
code_nat_of_natural || Rea || 4.07512566984e-06
semilattice_axioms || are_equipotent || 4.07183439715e-06
code_nat_of_natural || Im10 || 4.05852541833e-06
real_Vector_of_real || +14 || 4.02601977773e-06
transitive_trancl || +` || 3.99254686724e-06
sin_coeff || REAL || 3.97505322412e-06
default_default || weight || 3.86725025936e-06
pred_of_seq || ~7 || 3.84117253163e-06
bit0 || Tarski-Class || 3.82352925748e-06
transitive_rtrancl || +` || 3.81020479791e-06
ring_1_of_int || +14 || 3.79499581654e-06
real_Vector_of_real || #quote# || 3.79338076303e-06
transitive_rtrancl || exp4 || 3.78764538281e-06
real || sin1 || 3.7776920112e-06
code_integer_of_num || 24 || 3.7694392436e-06
bit0 || InclPoset || 3.71095772711e-06
nat2 || |....| || 3.67335496984e-06
bit0 || +76 || 3.61128707907e-06
ring_1_of_int || #quote# || 3.5888423535e-06
abel_semigroup || are_equipotent || 3.58586233588e-06
nat_of_num || ProjectiveLines || 3.51728294604e-06
nat_of_num || Proj_Inc || 3.51728294604e-06
numeral_numeral || -50 || 3.49210106733e-06
transitive_trancl || +^1 || 3.48546794869e-06
im || sgn || 3.47763692516e-06
set_option || ~7 || 3.35809744535e-06
nat_of_num || dyadic || 3.34813741499e-06
transitive_rtrancl || +^1 || 3.34558688931e-06
nat_of_num || Topology_of || 3.31811979122e-06
code_natural_of_nat || <*..*>4 || 3.27470689977e-06
cnj || Subformulae0 || 3.25188352477e-06
product_unit || R^1 || 3.2324670873e-06
inc || +76 || 3.2003754228e-06
ii || VERUM2 || 3.15829527412e-06
code_Suc || |....|12 || 3.13724560656e-06
divide_divide || 1_Rmatrix || 3.13094239035e-06
code_Suc || +76 || 3.0667118126e-06
nat_of_num || [#hash#] || 3.0319370784e-06
set || density || 3.0043431274e-06
code_Suc || -54 || 2.90373627747e-06
code_integer_of_num || 10 || 2.73547797487e-06
set2 || ^0 || 2.67164659358e-06
product_Unity || REAL || 2.62448779565e-06
pred_nat || OddNAT || 2.58108390666e-06
code_Nat || min || 2.56404143024e-06
nat_of_num || Sum11 || 2.52881562133e-06
set || inf5 || 2.50942763979e-06
bNF_Cardinal_cone || INT || 2.49279190681e-06
set2 || #bslash##slash#0 || 2.46509248496e-06
cnj || +14 || 2.46455822064e-06
code_n1042895779nteger || min || 2.44001072746e-06
pos || 1TopSp || 2.42931260807e-06
abs_abs || -0 || 2.42858887753e-06
pred || ~0 || 2.37952533825e-06
bNF_Cardinal_cone || S4-Taut || 2.37871225444e-06
nil || Bottom0 || 2.350181401e-06
code_nat_of_natural || Sum11 || 2.34028665373e-06
code_Suc || -- || 2.32917673581e-06
cnj || OddFibs || 2.32501791598e-06
nat_of_num || <k>0 || 2.29861770501e-06
code_nat_of_natural || SpStSeq || 2.29119701519e-06
set || Terminals || 2.27059350612e-06
set2 || ~7 || 2.26925466973e-06
bNF_Ca1495478003natLeq || OddNAT || 2.25189797803e-06
code_integer || k2_topgen_6 || 2.24047371067e-06
code_Suc || -25 || 2.14415683202e-06
bNF_Wellorder_wo_rel || <N< || 2.13996366966e-06
complex2 || * || 2.09020186013e-06
of_int || FinSETS || 2.08389292121e-06
distinct || still_not-bound_in || 2.07335175352e-06
uminus_uminus || root-tree || 2.07213289023e-06
pos || InclPoset || 2.05303913202e-06
minus_minus || -SD0 || 2.0456859974e-06
none || Bottom0 || 2.03858109683e-06
code_integer_of_num || 127 || 2.02660824508e-06
union || Ex || 2.01702612798e-06
code_nat_of_natural || <k>0 || 2.00835693672e-06
code_integer_of_int || {..}1 || 1.90253861332e-06
sqr || card || 1.84618381153e-06
complex2 || Base_FinSeq || 1.81057848304e-06
bNF_Cardinal_cone || y>=0-plane || 1.80355069593e-06
set || InputVertices || 1.79140389289e-06
union || All || 1.78548715842e-06
pos || Open_Domains_Lattice || 1.74685056515e-06
pos || Closed_Domains_Lattice || 1.74685056515e-06
nat2 || Lines || 1.7285624212e-06
nat2 || Inc || 1.7285624212e-06
bitM || card || 1.70310687995e-06
code_natural || TernaryFieldEx || 1.6838340809e-06
pos || Domains_Lattice || 1.67508155066e-06
pos || lattice || 1.67402182642e-06
inc || First*NotUsed || 1.64231529841e-06
cnj || Op-RightShift || 1.64017748372e-06
code_integer_of_num || 31 || 1.63836304165e-06
bNF_Cardinal_cfinite || are_relative_prime || 1.62686059126e-06
bNF_Cardinal_cone || 10 || 1.62387538402e-06
code_integer_of_num || a_Type0 || 1.59723691474e-06
cos_coeff || EdgeSelector 2 || 1.58621562676e-06
code_integer || y=0-line || 1.56904485314e-06
null || c= || 1.54078537861e-06
nat_of_num || Concept-with-all-Objects || 1.53779705191e-06
insert || Ex || 1.47595223323e-06
plus_plus || +45 || 1.47356668635e-06
hd || Free1 || 1.47100257524e-06
hd || Fixed || 1.47100257524e-06
pos || EqRelLatt || 1.46635961143e-06
distinct || c= || 1.42957815289e-06
code_integer_of_num || 15 || 1.4280591349e-06
bNF_Cardinal_cone || INT- || 1.42275885397e-06
list_update || [....]2 || 1.42191281271e-06
inc || SymGroup || 1.41022466659e-06
product_unit || REAL || 1.38042454581e-06
nat2 || topology || 1.37754882503e-06
nat_of_num || (Omega). || 1.37402565151e-06
cnj || -57 || 1.36965727234e-06
pos || ConceptLattice || 1.36781446745e-06
inc || Leaves1 || 1.35075749598e-06
insert || All || 1.34471053464e-06
code_natural_of_nat || {..}1 || 1.34386385374e-06
code_natural || EdgeSelector 2 || 1.33301075996e-06
cnj || NatDivisors || 1.32147736805e-06
minus_minus || Seg || 1.31050785774e-06
cnj || -54 || 1.29020116626e-06
cnj || Row_Marginal || 1.26136179571e-06
nat_of_num || nabla || 1.25711073815e-06
bNF_Cardinal_cone || TrivialInfiniteTree || 1.25700350806e-06
code_natural || F_Complex || 1.25143771401e-06
code_integer_of_num || 28 || 1.22263392098e-06
cnj || Re3 || 1.21590911123e-06
cnj || Im4 || 1.21590911123e-06
code_integer_of_num || 36 || 1.20884638169e-06
code_integer_of_num || 21 || 1.20840374913e-06
product_unit || RAT+ || 1.19149653406e-06
plus_plus || 0_Rmatrix0 || 1.15793652413e-06
splice || #slash##bslash#9 || 1.15031694731e-06
bNF_Cardinal_cone || CPC-Taut || 1.14819000995e-06
top_top || weight || 1.13904858314e-06
hd || still_not-bound_in || 1.11648786623e-06
bot_bot || weight || 1.09409731006e-06
bNF_Cardinal_cone || 0 || 1.0673553538e-06
cnj || -3 || 1.04842608505e-06
cnj || SubFuncs || 1.04133532759e-06
inc || Sgm || 9.81173253592e-07
find || +87 || 9.77628835572e-07
bit1 || -Matrices_over || 9.74064336761e-07
code_integer || VLabelSelector 7 || 9.48369265978e-07
minus_minus || 1_Rmatrix || 9.3017925245e-07
code_integer_of_num || 120 || 9.22800233095e-07
code_nat_of_natural || carrier || 9.11992251931e-07
numeral_numeral || len || 9.09091619088e-07
antisym || divides || 8.72896574983e-07
sym || divides || 8.68178783109e-07
product_unit || IPC-Taut || 8.49651496825e-07
product_unit || SCM-Memory || 8.47530182706e-07
trans || divides || 8.08942990965e-07
gen_length || *83 || 8.03247265897e-07
bNF_Cardinal_cone || SCM+FSA-Instr || 7.74903899369e-07
bit1 || idseq || 7.48243475149e-07
bit0 || Psingle_e_net || 7.43305689862e-07
bit0 || Psingle_f_net || 7.43305689862e-07
bit0 || Tsingle_e_net || 7.43305689862e-07
abs_Nat || Seg || 7.28388767946e-07
product_unit || CPC-Taut || 7.27235500527e-07
code_integer_of_int || k3_lattad_1 || 7.15150068172e-07
code_integer_of_int || k1_lattad_1 || 7.15150068172e-07
splice || *83 || 6.87126424576e-07
zero_Rep || SourceSelector 3 || 6.82425703912e-07
bNF_Cardinal_cone || VAR || 6.75373287563e-07
code_integer_of_int || LattRel0 || 6.74401507971e-07
bit0 || Tsingle_f_net || 6.69428418128e-07
uminus_uminus || {..}3 || 6.62885955052e-07
numeral_numeral || kind_of || 6.60671805578e-07
bit0 || bubble-sort || 6.40532380417e-07
minus_minus || ^31 || 6.37826161318e-07
bit0 || insert-sort0 || 6.26174415153e-07
nat || TriangleGraph || 6.15955968594e-07
gen_length || #slash##bslash#9 || 5.935551838e-07
inc || carrier\ || 5.84315967313e-07
code_nat_of_integer || field || 5.80938693313e-07
minus_minus || #quote#31 || 5.78357552625e-07
set_of_seq || the_argument_of || 5.53824623528e-07
bot_bot || Bottom0 || 5.34879122198e-07
product_unit || SCM-Instr || 5.14224429612e-07
bit0 || root-tree0 || 4.93646653079e-07
real_Vector_of_real || {..}3 || 4.8946041551e-07
none || carrier || 4.84650607029e-07
empty || Top0 || 4.56693965398e-07
code_integer || 8 || 4.50405006206e-07
code_integer || ELabelSelector 6 || 4.34417225354e-07
gen_length || |^17 || 4.34064602183e-07
cos_coeff || sinh0 || 4.18108048413e-07
minus_minus || +46 || 4.15565063152e-07
append || *83 || 4.143001206e-07
code_nat_of_integer || proj4_4 || 4.07709766105e-07
splice || *38 || 4.03750094504e-07
rat || omega || 4.00045711456e-07
sublist || [....]1 || 3.92251215251e-07
code_nat_of_integer || proj1 || 3.85691537209e-07
product_unit || SCM+FSA-Data*-Loc || 3.8187335811e-07
re || upper_bound1 || 3.79609951128e-07
sublist || |^6 || 3.78405500212e-07
splice || *41 || 3.77604506842e-07
sublist || |^1 || 3.7161792537e-07
splice || |^17 || 3.67693947217e-07
nat_of_num || *79 || 3.65609527615e-07
set_of_pred || \not\5 || 3.65144677565e-07
re || *86 || 3.64139144753e-07
inc || -0 || 3.63495410933e-07
nat_of_num || ProjectivePoints || 3.61888331761e-07
gen_length || *71 || 3.51433051949e-07
nat_of_num || {..}1 || 3.49927706297e-07
code_integer_of_num || SCM-Data-Loc || 3.46591639933e-07
pos || MidOpGroupCat || 3.28992977172e-07
pos || AbGroupCat || 3.28992977172e-07
pos || the_Complex_Space || 3.22897919619e-07
antisym || c=0 || 3.17396887995e-07
sgn_sgn || -0 || 3.16168056236e-07
sym || c=0 || 3.1558015411e-07
pow2 || ~7 || 3.14146372388e-07
bNF_Cardinal_cfinite || misses || 3.1089466857e-07
gen_length || |^6 || 3.06892450373e-07
has_ve2132708402vative || -0 || 3.06602862901e-07
splice || *71 || 3.05987757096e-07
code_integer_of_num || k11_numpoly1 || 3.03871872489e-07
nat_of_num || MidOpGroupObjects || 3.01306994264e-07
nat_of_num || AbGroupObjects || 3.01306994264e-07
nat_of_num || setvect || 2.98780592403e-07
contained || << || 2.9826542609e-07
nat_of_num || Sub0 || 2.97899945134e-07
nat_of_num || C_3 || 2.96946999578e-07
code_nat_of_natural || Im3 || 2.71569731581e-07
splice || |^6 || 2.71487421953e-07
nat_of_num || k26_zmodul02 || 2.69296067465e-07
nat_of_num || LinComb || 2.69295762919e-07
default_default || field || 2.67047645613e-07
nat_of_num || Subgroups || 2.63472326716e-07
nat_of_num || Open_Domains_of || 2.56872830266e-07
nat_of_num || Closed_Domains_of || 2.56872830266e-07
rotate1 || #quote#4 || 2.55919282426e-07
nat_of_num || Domains_of || 2.55323965146e-07
removeAll || [....]1 || 2.53682370658e-07
nat_of_num || OpenClosedSet || 2.52568140479e-07
nat_of_num || StoneS || 2.5196869684e-07
pos || Psingle_e_net || 2.51482182247e-07
pos || Psingle_f_net || 2.51482182247e-07
pos || Tsingle_e_net || 2.51482182247e-07
normal627294541factor || +14 || 2.46136251686e-07
append || *38 || 2.42872970265e-07
pos || vectgroup || 2.41090093375e-07
wf || c=0 || 2.36692202624e-07
pos || OpenClosedSetLatt || 2.34184285179e-07
dropWhile || [....]1 || 2.33559434308e-07
append || *41 || 2.33056131156e-07
remove1 || [....]1 || 2.32294462217e-07
bit1 || carrier || 2.31157513848e-07
code_Suc || -0 || 2.30384646759e-07
remdups_adj || #quote#4 || 2.30277630507e-07
normal627294541factor || #quote# || 2.2985215996e-07
takeWhile || [....]1 || 2.25791051523e-07
remdups || #quote#4 || 2.22387889941e-07
times_times || -0 || 2.21400227898e-07
butlast || #quote#4 || 2.17863482335e-07
finite_finite2 || \not\3 || 2.16551603602e-07
pos || ProjectiveSpace || 2.16350555886e-07
append || |^17 || 2.1591054003e-07
contained || >= || 2.15066362833e-07
drop || [....]1 || 2.12858841932e-07
pos || UnSubAlLattice || 2.10453061912e-07
pos || StoneLatt || 2.09528246834e-07
pos || k31_zmodul02 || 2.09129501645e-07
pos || LC_RLSpace || 2.09117796841e-07
take || [....]1 || 2.07099456903e-07
rev || #quote#4 || 2.05999828272e-07
tl || #quote#4 || 2.05688922649e-07
cos_coeff || sinh1 || 2.03412825846e-07
filter2 || [....]1 || 2.0257632481e-07
code_nat_of_integer || Top || 1.95864486983e-07
real_V1127708846m_norm || +14 || 1.9330842643e-07
append || *71 || 1.92803246337e-07
nat_of_num || Quot. || 1.91211510975e-07
code_nat_of_integer || Points || 1.8860767151e-07
list_ex1 || misses2 || 1.88524092772e-07
none || Top0 || 1.86566881932e-07
pos || the_Field_of_Quotients || 1.85881348202e-07
real_V1127708846m_norm || #quote# || 1.83012166485e-07
bit1 || +14 || 1.8240803825e-07
real_V1908273582scaleR || +14 || 1.80961867048e-07
has_field_derivative || +14 || 1.78751899285e-07
append || |^6 || 1.78437804717e-07
pos || MPS || 1.77295934108e-07
code_integer_of_int || Open_setLatt || 1.76919811667e-07
code_Suc || +14 || 1.71839136715e-07
real_V1908273582scaleR || #quote# || 1.70756069888e-07
bit0 || the_Complex_Space || 1.70287478721e-07
pos || |[..]|2 || 1.70162898667e-07
has_field_derivative || #quote# || 1.68835447494e-07
code_integer_of_int || IncProjSp_of0 || 1.67453238385e-07
numeral_numeral || NonZero || 1.64320674012e-07
insert2 || Ex || 1.61129232753e-07
cnj || Directed || 1.60037894308e-07
bit1 || |....|12 || 1.59022575491e-07
nil || Top0 || 1.53592724795e-07
nat_of_num || Re2 || 1.48639911562e-07
list_ex || misses2 || 1.48477163052e-07
insert2 || =>1 || 1.47667006532e-07
nil || <*> || 1.39308819617e-07
bit0 || k3_lattad_1 || 1.36967989324e-07
bit0 || k1_lattad_1 || 1.36967989324e-07
bit1 || ord-type || 1.35714548358e-07
code_nat_of_natural || Re2 || 1.33471520817e-07
bit1 || *79 || 1.32597940225e-07
bit0 || LattRel0 || 1.31727783372e-07
bit1 || ProjectivePoints || 1.305022731e-07
inc || |....| || 1.29025534538e-07
nat_of_num || REAL0 || 1.28905169322e-07
real || sinh0 || 1.22729761595e-07
nat2 || Bottom || 1.22606079888e-07
bit1 || Ball2 || 1.17892913731e-07
code_Suc || sqrt0 || 1.1558539452e-07
bit1 || MidOpGroupObjects || 1.14461936259e-07
bit1 || AbGroupObjects || 1.14461936259e-07
bit1 || setvect || 1.14141596787e-07
bit1 || Sub0 || 1.14011254276e-07
bit1 || Topology_of || 1.13995464563e-07
bit1 || C_3 || 1.13854896215e-07
insert3 || All || 1.10219436423e-07
bit0 || numbering || 1.10205108153e-07
bit1 || k26_zmodul02 || 1.06134055908e-07
bit1 || LinComb || 1.06134028066e-07
is_none || are_equipotent || 1.05206335296e-07
pos || TOP-REAL || 1.01365873097e-07
top_top || field || 1.01362796019e-07
bit1 || OpenClosedSet || 1.0126427803e-07
bit1 || StoneS || 1.01170012807e-07
antisym || meets || 1.0091332406e-07
code_Suc || Card0 || 9.8338017813e-08
bit0 || MidOpGroupCat || 9.83309901612e-08
bit0 || AbGroupCat || 9.83309901612e-08
bot_bot || field || 9.78794143709e-08
insert3 || \&\0 || 9.6910463163e-08
bit1 || Subgroups || 9.4900170682e-08
code_Nat || -54 || 9.45657217379e-08
bit1 || Open_Domains_of || 9.27324396186e-08
bit1 || Closed_Domains_of || 9.27324396186e-08
bit1 || Domains_of || 9.2700481859e-08
nat_of_num || ^20 || 9.12661170299e-08
code_integer || Sorgenfrey-line || 9.09176361559e-08
pos || 1* || 9.03265504338e-08
nat_of_num || {}0 || 9.01710907665e-08
sublist || #bslash#11 || 9.00735162818e-08
bit1 || Family_open_set0 || 8.667419341e-08
code_n1042895779nteger || -54 || 8.46676728177e-08
code_Suc || abs8 || 8.29143906969e-08
bit1 || Quot. || 8.24402981517e-08
bit0 || vectgroup || 8.19278029276e-08
code_int_of_integer || Sum0 || 8.18514962707e-08
bit0 || OpenClosedSetLatt || 8.05307175662e-08
bit0 || *+^+<0> || 8.00275119895e-08
bit0 || TopUnitSpace || 7.83144858666e-08
pos || 1.REAL || 7.82388850312e-08
bit1 || Family_open_set || 7.78706072535e-08
bit0 || ProjectiveSpace || 7.65102291913e-08
code_Suc || doms || 7.64605228132e-08
numeral_numeral || Partial_Sums || 7.61135900745e-08
bit0 || Open_Domains_Lattice || 7.59885558092e-08
bit0 || Closed_Domains_Lattice || 7.59885558092e-08
bit0 || UnSubAlLattice || 7.5256357858e-08
gen_length || #bslash#11 || 7.52248991453e-08
bit0 || StoneLatt || 7.50918979477e-08
bit0 || k31_zmodul02 || 7.49873897069e-08
bit0 || LC_RLSpace || 7.49858642981e-08
bit0 || lattice || 7.48932415145e-08
code_Suc || sqr || 7.48038188548e-08
bit0 || Open_setLatt || 7.44550936551e-08
bit0 || Domains_Lattice || 7.39767694017e-08
bit0 || bool || 7.32015878931e-08
code_Suc || SubFuncs || 7.11004319112e-08
bit0 || the_Field_of_Quotients || 6.94987715643e-08
bit0 || MPS || 6.72495681742e-08
remdups || #bslash##slash#0 || 6.68728859264e-08
splice || #bslash#11 || 6.57284123031e-08
bit0 || |[..]|2 || 6.49353484088e-08
bit1 || *0 || 6.46248495263e-08
bNF_Ca829732799finite || meets || 6.45793565717e-08
numeral_numeral || weight || 6.03815359316e-08
bit1 || REAL0 || 6.03772059714e-08
code_integer_of_int || euc2cpx || 5.99201291409e-08
bit0 || TopSpaceMetr || 5.95763561668e-08
nat_of_num || Ball2 || 5.9408991082e-08
code_nat_of_integer || subset-closed_closure_of || 5.75628700187e-08
nat2 || -0 || 5.51600151686e-08
removeAll || #quote##slash##bslash##quote#1 || 5.31808369529e-08
remdups || ^7 || 5.12381178364e-08
transpose || #quote#21 || 5.11486011598e-08
re || Re2 || 4.90905169225e-08
code_nat_of_integer || *1 || 4.86394773786e-08
remdups_adj || +*0 || 4.81673720146e-08
remdups || +*0 || 4.79569908469e-08
code_Suc || Carr || 4.73278749339e-08
dropWhile || #quote##slash##bslash##quote#1 || 4.65650807025e-08
append || #bslash#11 || 4.65265074201e-08
remove1 || #quote##slash##bslash##quote#1 || 4.63363688263e-08
nil || the_transitive-closure_of || 4.59710695621e-08
nil || [*] || 4.51886405938e-08
pos || min || 4.51884455706e-08
takeWhile || #quote##slash##bslash##quote#1 || 4.51569440324e-08
bit0 || TOP-REAL || 4.4868003357e-08
remdups_adj || #bslash##slash#0 || 4.45093164505e-08
nil || CnPos || 4.39387956345e-08
nil || k5_ltlaxio3 || 4.34257394798e-08
filter2 || #quote##slash##bslash##quote#1 || 4.31004658984e-08
bit0 || <*..*>4 || 4.29750510669e-08
nat2 || ^20 || 4.28720990882e-08
drop || #quote##slash##bslash##quote#1 || 4.27935652099e-08
code_nat_of_integer || Subtrees0 || 4.18404877031e-08
nil || CnIPC || 4.18359385193e-08
take || #quote##slash##bslash##quote#1 || 4.17331742035e-08
nil || CnCPC || 4.15196244082e-08
nil || Subtrees0 || 4.15196244082e-08
code_integer || R^1 || 4.14495916287e-08
nil || Inv0 || 4.1226813474e-08
code_integer_of_num || REAL || 4.07125408553e-08
nil || CnS4 || 4.04618370334e-08
nil || sup4 || 4.02376856406e-08
code_int_of_integer || carr1 || 4.00379887877e-08
code_nat_of_integer || sup4 || 3.95360561641e-08
remdups || ConsecutiveSet2 || 3.94794893227e-08
remdups || ConsecutiveSet || 3.94794893227e-08
nil || Mycielskian1 || 3.94565542388e-08
code_nat_of_integer || k19_finseq_1 || 3.84896596135e-08
suc || card || 3.84609344225e-08
code_Suc || #quote##quote# || 3.81571516454e-08
nil || Rank || 3.78061923141e-08
suc || ^20 || 3.75496042214e-08
pos || TopUnitSpace || 3.71311581535e-08
suc || *1 || 3.67360098514e-08
re || proj1 || 3.61924650056e-08
suc || proj4_4 || 3.53906246254e-08
code_Suc || #quote##quote#0 || 3.50905767868e-08
suc || min || 3.47407726178e-08
suc || proj1 || 3.35413768829e-08
find || +32 || 3.34480323514e-08
code_Suc || --0 || 3.33022631715e-08
find || +65 || 3.28179583274e-08
id2 || StoneH1 || 3.2804673639e-08
nat_of_num || Family_open_set0 || 3.27949697421e-08
find || +81 || 3.13498088178e-08
nat_of_num || Concept-with-all-Attributes || 3.13211993807e-08
nil || (Omega).2 || 3.04580544586e-08
list_update || mid || 2.92650292107e-08
nat_of_num || (1). || 2.89853894819e-08
nat_of_num || Family_open_set || 2.82602347719e-08
re || abs7 || 2.81223434632e-08
nat2 || Subtrees || 2.78896950127e-08
nat2 || product || 2.53680414692e-08
pos || TopSpaceMetr || 2.40463844262e-08
cnj || varcl || 2.38930973375e-08
set2 || ord || 2.36657272473e-08
code_Nat || product4 || 2.23980394913e-08
re || k1_matrix_0 || 2.23975918133e-08
suc || #quote#20 || 2.23565675667e-08
nil || (Omega).5 || 2.23372334653e-08
nat2 || succ1 || 2.20406660249e-08
remdups || ^0 || 2.18235061281e-08
nil || (Omega).1 || 2.163657022e-08
list || carrier || 2.11622556863e-08
nat_of_num || id1 || 2.10817540574e-08
code_n1042895779nteger || product4 || 2.08582143112e-08
nat2 || bool0 || 2.04235679966e-08
is_none || ex_inf_of || 2.00032361453e-08
nat2 || <*..*>4 || 1.92408494882e-08
top_top || Open_setLatt || 1.91485290392e-08
suc || -50 || 1.91453152402e-08
is_none || ex_sup_of || 1.91230926706e-08
inc || field || 1.82492158736e-08
pred_option || is_eventually_in || 1.79174824605e-08
set || HTopSpace || 1.76788606653e-08
suc || #quote# || 1.75689494919e-08
complex || Vars || 1.74597512982e-08
code_integer || GCD-Algorithm || 1.73139230843e-08
refl_on || preserves_implication || 1.57233485998e-08
refl_on || preserves_top || 1.57233485998e-08
refl_on || preserves_bottom || 1.57233485998e-08
some || [:..:] || 1.50129544434e-08
bNF_Cardinal_cone || MP-variables || 1.47668378346e-08
re || k2_zmodul05 || 1.46498708346e-08
code_integer_of_int || numbering || 1.44221412594e-08
inc || proj4_4 || 1.43966287872e-08
distinct || ord || 1.37474109813e-08
sublist || smid || 1.28021178748e-08
suc || carrier || 1.24055644874e-08
none || Subspaces || 1.16024920676e-08
none || Submodules || 1.16024920676e-08
none || Subspaces2 || 1.16024920676e-08
numeral_numeral || succ0 || 1.09453765032e-08
inc || Top || 1.08205446728e-08
nat2 || 0. || 1.07832676139e-08
code_integer_of_int || .104 || 9.66946117453e-09
zero_Rep || TargetSelector 4 || 9.12416585586e-09
nat2 || First*NotUsed || 8.98153408682e-09
bNF_Cardinal_cone || Constructors || 8.82900349585e-09
nat_of_num || zerovect || 8.78949248147e-09
pos || Tsingle_f_net || 8.46113036158e-09
rev || AuxBottom || 8.44051798355e-09
product_unit || MP-conectives || 8.40996035723e-09
none || Subgroups || 8.2712852141e-09
removeAll || smid || 8.21215717243e-09
none || bool3 || 8.07099618036e-09
nat_of_num || q1. || 8.01191069822e-09
measure || +` || 7.88289036543e-09
measure || exp4 || 7.80042097882e-09
complex || INT || 7.74016758517e-09
nat_of_num || ProjectiveCollinearity || 7.71855579028e-09
pos || bubble-sort || 7.71563874769e-09
nat_of_num || q0. || 7.69376456103e-09
rotate1 || Rev || 7.66695445533e-09
none || east_halfline || 7.64257158744e-09
none || west_halfline || 7.64257158744e-09
hd || ord || 7.55940414918e-09
none || the_Tree_of || 7.53564252714e-09
none || Big_Omega || 7.53564252714e-09
pos || insert-sort0 || 7.44303665528e-09
none || Subtrees || 7.44059196017e-09
dropWhile || smid || 7.42884823262e-09
remove1 || smid || 7.38046486471e-09
none || the_right_side_of || 7.27793371076e-09
none || nextcard || 7.20740597994e-09
none || south_halfline || 7.20740597994e-09
none || Big_Theta || 7.20740597994e-09
none || north_halfline || 7.20740597994e-09
takeWhile || smid || 7.13330936064e-09
butlast || Rev || 6.85172126942e-09
remdups_adj || Rev || 6.8090384621e-09
pred_list || >= || 6.78105566419e-09
remdups || Rev || 6.7685244646e-09
measures || +` || 6.75995009909e-09
finite_2 || <i> || 6.7433742494e-09
listsp || >= || 6.73196565907e-09
measures || exp4 || 6.69833379043e-09
drop || smid || 6.64969697674e-09
nat || ECIW-signature || 6.64115537052e-09
nat2 || [#hash#] || 6.5719172331e-09
none || Tarski-Class || 6.51393906311e-09
take || smid || 6.4376564605e-09
tl || Rev || 6.39993410421e-09
measure || +^1 || 6.31117503108e-09
none || Big_Oh || 6.27830741469e-09
filter2 || smid || 6.27255827244e-09
nat2 || Leaves1 || 6.27090259288e-09
none || succ1 || 6.18717592887e-09
nat2 || ord-type || 6.07299079631e-09
rev || Rev || 6.00604536466e-09
removeAll || |3 || 5.98417017662e-09
inj_on || c=3 || 5.67502355705e-09
finite_finite2 || Free1 || 5.67279669109e-09
finite_finite2 || Fixed || 5.67279669109e-09
take || |3 || 5.6639411024e-09
nat2 || On || 5.62830076857e-09
nat2 || dyadic || 5.59933187469e-09
measures || +^1 || 5.56121811434e-09
dropWhile || |3 || 5.55501272026e-09
remove1 || |3 || 5.5278059049e-09
takeWhile || |3 || 5.38749527156e-09
set2 || opp+id || 5.37009137569e-09
inc || Bottom || 5.25441324612e-09
pos || root-tree0 || 5.22413104216e-09
code_nat_of_integer || Lines || 5.12422393601e-09
code_nat_of_integer || Inc || 5.12422393601e-09
drop || |3 || 5.10628210691e-09
nat2 || 1. || 5.10562397269e-09
zero_zero || dom0 || 5.06870623954e-09
remdups || inf || 4.97341151969e-09
inc || 0. || 4.96136489403e-09
filter2 || |3 || 4.88055507235e-09
nat2 || Collinearity || 4.83648017501e-09
nat_of_num || k19_zmodul02 || 4.74678806247e-09
nat_of_num || PR || 4.70918942953e-09
finite_card || OpenNeighborhoods || 4.66911055731e-09
pred_option || >= || 4.63017914591e-09
product_unit || Vars || 4.51773923286e-09
code_nat_of_natural || Sum || 4.31309415383e-09
nat_of_num || ZeroLC || 4.16312837915e-09
inc || Points || 3.97189006147e-09
nat2 || 4_arg_relation || 3.92849547529e-09
code_integer_of_int || Open_Domains_Lattice || 3.83239064283e-09
code_integer_of_int || Closed_Domains_Lattice || 3.83239064283e-09
nat2 || ProjectiveLines || 3.72502120434e-09
nat2 || Proj_Inc || 3.72502120434e-09
code_integer_of_int || Domains_Lattice || 3.68807822463e-09
code_integer_of_int || lattice || 3.68368369594e-09
code_integer_of_int || EqRelLatt || 3.63566979464e-09
code_Nat || -25 || 3.61863360456e-09
nil || VERUM || 3.50700272028e-09
nat2 || carrier\ || 3.48070019295e-09
right || NAT || 3.41126026711e-09
code_integer_of_int || ConceptLattice || 3.40590965802e-09
nat2 || Topology_of || 3.4011260426e-09
code_n1042895779nteger || -25 || 3.34414016708e-09
inc || Collinearity || 3.11479488224e-09
size_size || {..}3 || 3.10582724391e-09
bit1 || {}0 || 3.09745069504e-09
nat2 || Concept-with-all-Objects || 3.02460948403e-09
real_Vector_of_real || rng || 2.95827003957e-09
semiring_char_0_fact || rng || 2.94909803244e-09
bit1 || [#hash#] || 2.89144197521e-09
ring_1_of_int || rng || 2.79481243774e-09
nat2 || (Omega). || 2.77844087402e-09
bit0 || IncProjSp_of0 || 2.74392232041e-09
inc || 4_arg_relation || 2.7261216081e-09
code_nat_of_integer || carrier || 2.70461892786e-09
bit1 || ^20 || 2.62914576117e-09
nat2 || nabla || 2.60277900664e-09
semiring_1_of_nat || rng || 2.57429121186e-09
numeral_numeral || rng || 2.40094489325e-09
inc || 1. || 2.36884136745e-09
bit1 || q1. || 2.23500766128e-09
bit1 || q0. || 2.19745332708e-09
im || Im3 || 2.17611556203e-09
divide_divide || +14 || 2.06570455932e-09
divide_divide || #quote# || 1.96936711341e-09
bit1 || zerovect || 1.94232521668e-09
bit0 || 1* || 1.87095258351e-09
bit1 || ProjectiveCollinearity || 1.77988279223e-09
id || id1 || 1.75806065574e-09
bit0 || 1.REAL || 1.71154383772e-09
bit1 || On || 1.69406603361e-09
splice || #slash##bslash#23 || 1.67173906978e-09
inc || Lang1 || 1.66922108935e-09
inc || \not\11 || 1.66701638534e-09
nat_of_num || 0* || 1.58231023109e-09
rec_sumbool || -\3 || 1.57459957334e-09
complex2 || -->1 || 1.42302346036e-09
im || the_value_of || 1.41761465309e-09
case_sumbool || -\3 || 1.3611187579e-09
re || the_rank_of0 || 1.31049755738e-09
bit1 || FlatCoh || 1.29767334235e-09
rec_sumbool || -. || 1.28661271289e-09
rec_sumbool || +. || 1.28661271289e-09
bit1 || PR || 1.27242359109e-09
bit1 || k19_zmodul02 || 1.27003859442e-09
code_nat_of_integer || |....| || 1.24895332454e-09
bit1 || (Omega). || 1.22223406334e-09
list_update || .44 || 1.17416764999e-09
bit1 || ZeroLC || 1.15076832283e-09
case_sumbool || -. || 1.13008973185e-09
rec_sumbool || +61 || 1.13008973185e-09
case_sumbool || +. || 1.13008973185e-09
cnj || ^21 || 1.10524237805e-09
inc || arity0 || 1.10320706549e-09
complex2 || --> || 1.05631473387e-09
bit1 || (1). || 1.0193695762e-09
case_sumbool || +61 || 1.00294046255e-09
append || #slash##bslash#23 || 1.00064600081e-09
bit0 || TotalGrammar || 1.00019935406e-09
cnj || ^29 || 9.90152710032e-10
code_int_of_integer || doms || 9.59630264443e-10
code_integer_of_int || 1* || 9.51441639587e-10
cnj || doms || 9.44890306975e-10
inc || curry\ || 9.26286664099e-10
code_Suc || curry\ || 8.95221019364e-10
gen_length || #slash##bslash#23 || 8.62572699467e-10
code_Nat || <:..:>1 || 8.58081812627e-10
code_integer_of_int || 1.REAL || 8.34885592705e-10
produc2004651681e_prod || DecSD2 || 8.04587862932e-10
comm_monoid || r13_absred_0 || 7.85917216363e-10
comm_monoid || r12_absred_0 || 7.83031435075e-10
code_n1042895779nteger || <:..:>1 || 7.80006042479e-10
is_none || c= || 7.77761683241e-10
is_empty2 || lim_inf1 || 7.74729569889e-10
splice || #slash##bslash#8 || 7.29038388194e-10
comm_monoid || r7_absred_0 || 6.91886436327e-10
pred_list || |-2 || 6.86295309674e-10
listsp || |-2 || 6.77233198582e-10
code_nat_of_natural || proj4_4 || 6.58346539375e-10
pos || MFuncs || 6.27220853374e-10
insert3 || Ex || 5.99199197806e-10
code_integer || RealOrd || 5.74450655722e-10
bit1 || 0* || 5.69414280576e-10
bit1 || arity || 5.66170072706e-10
rec_sumbool || crossover0 || 5.65941219548e-10
nat2 || 1_ || 5.29929440231e-10
nat_of_num || proj1 || 5.2864366552e-10
case_sumbool || crossover0 || 5.28214792131e-10
pos || GPerms || 5.18103213636e-10
pred_list || |- || 5.05709017818e-10
code_nat_of_natural || proj1 || 5.04939620184e-10
listsp || |- || 5.00723022154e-10
null || inf || 4.84998591601e-10
rec_sumbool || Following0 || 4.82640409173e-10
comm_monoid || r11_absred_0 || 4.67431954436e-10
append || #slash##bslash#8 || 4.66594961469e-10
case_sumbool || Following0 || 4.54703533936e-10
pos || SymGroup || 4.48767801947e-10
code_nat_of_integer || Bottom || 4.10408601531e-10
nat_of_num || FuncUnit0 || 3.84813679997e-10
code_integer_of_int || 1TopSp || 3.81355999406e-10
butlast || SepVar || 3.79486933908e-10
nat_of_num || FuncUnit || 3.79381824572e-10
numeral_numeral || field || 3.76914894251e-10
code_integer_of_num || 38 || 3.76898936311e-10
remdups_adj || SepVar || 3.7643128577e-10
sublist || .3 || 3.65126071749e-10
rotate1 || SepVar || 3.54087157879e-10
code_integer_of_int || InclPoset || 3.41376473934e-10
code_nat_of_integer || topology || 3.35827381195e-10
comm_monoid || r3_absred_0 || 2.9562877848e-10
remdups || SepVar || 2.94683659913e-10
set || adjectives || 2.92632773032e-10
groups387199878d_list || r1_absred_0 || 2.75364336159e-10
groups387199878d_list || r5_absred_0 || 2.74089096727e-10
tl || SepVar || 2.72052832634e-10
nat_of_num || ComplexFuncUnit || 2.62137682126e-10
nat_of_num || RealFuncUnit || 2.60401348396e-10
nil || [#hash#] || 2.57494042832e-10
rev || SepVar || 2.48942802408e-10
semilattice_neutr || r1_absred_0 || 2.22398984242e-10
comm_monoid || r10_absred_0 || 2.20141854033e-10
bit0 || .104 || 2.1954617363e-10
semilattice_neutr || r5_absred_0 || 2.17648865789e-10
groups387199878d_list || r6_absred_0 || 2.13907895843e-10
code_integer_of_num || 12 || 2.10186774769e-10
bit0 || EqRelLatt || 2.08293728743e-10
bit1 || dyadic || 2.00051152509e-10
bit0 || ConceptLattice || 1.9889916945e-10
code_integer || while<>0 || 1.88843001895e-10
groups_monoid_list || r12_absred_0 || 1.8510391524e-10
product_case_prod || DecSD || 1.84851921724e-10
groups_monoid_list || r13_absred_0 || 1.84539654855e-10
code_Nat || Z#slash#Z* || 1.83513923848e-10
groups387199878d_list || r3_absred_0 || 1.82911375641e-10
nil || Top || 1.8203657565e-10
code_integer || Partition || 1.7919801504e-10
groups828474808id_set || r11_absred_0 || 1.78478551193e-10
semilattice_neutr || r6_absred_0 || 1.73369513992e-10
pos || C_Normed_Algebra_of_BoundedLinearOperators || 1.72947248011e-10
pos || Ring_of_BoundedLinearOperators0 || 1.72947248011e-10
pos || C_Algebra_of_BoundedLinearOperators || 1.72947248011e-10
top_top || <*> || 1.72832245967e-10
groups387199878d_list || r2_absred_0 || 1.71732674703e-10
bit1 || Concept-with-all-Objects || 1.71612457601e-10
pos || CRing || 1.69074964644e-10
code_n1042895779nteger || Z#slash#Z* || 1.65993556063e-10
groups828474808id_set || r10_absred_0 || 1.65463058911e-10
code_int_of_integer || INT.Ring || 1.62884406405e-10
code_nat_of_natural || 1_ || 1.58170803386e-10
nat2 || {}0 || 1.57954263007e-10
groups_monoid_list || r7_absred_0 || 1.551389456e-10
bit1 || nabla || 1.47169446921e-10
comm_monoid_axioms || r10_absred_0 || 1.41849801885e-10
semilattice_neutr || r2_absred_0 || 1.40955035555e-10
code_integer_of_int || Psingle_e_net || 1.33993603313e-10
comm_monoid_axioms || r11_absred_0 || 1.33687723373e-10
semilattice_neutr || r3_absred_0 || 1.33218949952e-10
map_option || #quote#2 || 1.31355706223e-10
pos || CAlgebra || 1.28640048205e-10
pos || RAlgebra || 1.28598161614e-10
bit1 || FuncUnit0 || 1.25447366071e-10
bit1 || FuncUnit || 1.24814192969e-10
groups387199878d_list || r10_absred_0 || 1.15950786714e-10
groups387199878d_list || r11_absred_0 || 1.15487188279e-10
groups_monoid_list || r11_absred_0 || 1.15444228029e-10
groups828474808id_set || r5_absred_0 || 1.14666794567e-10
nat2 || {..}1 || 1.13221573345e-10
groups828474808id_set || r1_absred_0 || 1.12266335946e-10
map || #quote#2 || 1.10687974477e-10
nat_of_num || 1_. || 1.10093068211e-10
groups828474808id_set || r3_absred_0 || 1.08905790785e-10
groups387199878d_list || r4_absred_0 || 1.07683097575e-10
one2 || VERUM1 || 1.06528603863e-10
bit1 || @8 || 1.04731058125e-10
comm_monoid || r4_absred_0 || 1.04167819968e-10
groups828474808id_set || r6_absred_0 || 1.03888392634e-10
pos || Ring_of_BoundedLinearOperators || 1.03574778226e-10
groups1716206716st_set || r1_absred_0 || 1.03395716509e-10
comm_monoid_axioms || r7_absred_0 || 1.03054741946e-10
nat2 || Open_Domains_of || 1.01684250981e-10
nat2 || Closed_Domains_of || 1.01684250981e-10
nat2 || Subgroups || 1.01669287719e-10
groups828474808id_set || r7_absred_0 || 1.00276013412e-10
pos || RRing || 9.96401198627e-11
nat2 || Domains_of || 9.94484695584e-11
pos || R_Algebra_of_BoundedLinearOperators || 9.66225001184e-11
groups387199878d_list || r13_absred_0 || 9.65224321879e-11
pos || R_Normed_Algebra_of_BoundedLinearOperators || 9.55999034115e-11
semilattice_neutr || r10_absred_0 || 9.18112968161e-11
plus_plus || -0 || 9.15599428358e-11
pos || *\13 || 8.84328384797e-11
semilattice_neutr || r11_absred_0 || 8.54878574914e-11
bit1 || id1 || 8.5447960377e-11
bit1 || ComplexFuncUnit || 8.51094262184e-11
bit1 || Concept-with-all-Attributes || 8.50787976671e-11
bit1 || RealFuncUnit || 8.49092354954e-11
groups828474808id_set || r2_absred_0 || 8.41760312831e-11
top_top || {}1 || 8.40925179458e-11
semilattice_neutr || r4_absred_0 || 8.21814376872e-11
code_nat_of_natural || id1 || 8.09740249576e-11
bit0 || (#hash#)22 || 7.74676817092e-11
code_integer_of_int || MidOpGroupCat || 7.67372655122e-11
code_integer_of_int || AbGroupCat || 7.67372655122e-11
code_integer_of_int || the_Complex_Space || 7.53766792998e-11
inc || Lines || 7.50622757731e-11
inc || Inc || 7.50622757731e-11
lattic1543629303tr_set || r12_absred_0 || 7.48861179761e-11
groups828474808id_set || r13_absred_0 || 7.48141155899e-11
lattic1543629303tr_set || r13_absred_0 || 7.4328450313e-11
code_natural_of_nat || 1_ || 7.21490798242e-11
topolo282751700pology || is_properly_applicable_to || 7.20876740788e-11
code_integer_of_int || carrier || 6.9719891284e-11
groups_monoid_list || r3_absred_0 || 6.85670220966e-11
groups1716206716st_set || r4_absred_0 || 6.78428879159e-11
member3 || is_properly_applicable_to || 6.47804686144e-11
bit1 || \not\9 || 6.32428422302e-11
bit1 || ProjectiveLines || 6.28161978479e-11
bit1 || Proj_Inc || 6.28161978479e-11
groups_monoid_list || r10_absred_0 || 6.25919441529e-11
code_integer_of_int || Psingle_f_net || 6.23148200345e-11
code_integer_of_int || Tsingle_e_net || 6.23148200345e-11
topolo282751700pology || is_applicable_to1 || 6.22680339859e-11
groups387199878d_list || r12_absred_0 || 6.15192277111e-11
nat2 || *79 || 6.07239137692e-11
member3 || is_applicable_to1 || 6.04234446582e-11
minus_minus || +14 || 6.04036329896e-11
none || the_transitive-closure_of || 6.03138693304e-11
nat2 || ProjectivePoints || 6.02153020997e-11
none || [*] || 5.90728704433e-11
set_of_seq || {..}27 || 5.85963684987e-11
topolo282751700pology || is_properly_applicable_to1 || 5.83443501214e-11
semilattice_neutr || r13_absred_0 || 5.81319288791e-11
code_integer_of_int || vectgroup || 5.80402876899e-11
null || sup1 || 5.80202384899e-11
nat2 || Concept-with-all-Attributes || 5.79716522527e-11
groups387199878d_list || r8_absred_0 || 5.79550631929e-11
minus_minus || #quote# || 5.76511045027e-11
none || CnPos || 5.71086187589e-11
groups828474808id_set || r4_absred_0 || 5.66818850353e-11
code_integer_of_int || OpenClosedSetLatt || 5.657511568e-11
none || k5_ltlaxio3 || 5.63086976568e-11
code_integer_of_int || *+^+<0> || 5.6222784802e-11
none || CnIPC || 5.38533722913e-11
none || CnCPC || 5.33690315281e-11
none || Subtrees0 || 5.33690315281e-11
groups1716206716st_set || r3_absred_0 || 5.33431414724e-11
nat2 || MidOpGroupObjects || 5.32844437644e-11
nat2 || AbGroupObjects || 5.32844437644e-11
monoid || r1_absred_0 || 5.31991760018e-11
bit0 || \not\9 || 5.30142330351e-11
none || Inv0 || 5.29219065763e-11
nat2 || setvect || 5.29196152121e-11
nat2 || Sub0 || 5.27832048411e-11
groups828474808id_set || r12_absred_0 || 5.26892454122e-11
nat2 || C_3 || 5.26384597026e-11
groups1716206716st_set || r5_absred_0 || 5.25717194727e-11
monoid || r5_absred_0 || 5.25367587734e-11
code_integer_of_int || ProjectiveSpace || 5.24432182807e-11
member3 || is_properly_applicable_to1 || 5.2430243752e-11
none || CnS4 || 5.17593234001e-11
none || sup4 || 5.1420178065e-11
code_integer_of_int || UnSubAlLattice || 5.12234483552e-11
code_integer_of_int || StoneLatt || 5.11128779838e-11
code_integer_of_int || k31_zmodul02 || 5.10450524884e-11
code_integer_of_int || LC_RLSpace || 5.10433489907e-11
nat2 || (1). || 5.10133249525e-11
comm_monoid || r8_absred_0 || 5.09595722931e-11
lattic1543629303tr_set || r7_absred_0 || 5.06608549279e-11
none || Mycielskian1 || 5.02436312106e-11
comm_monoid || r1_absred_0 || 4.92337663612e-11
nat2 || k26_zmodul02 || 4.92251744667e-11
nat2 || LinComb || 4.92251328245e-11
list_ex1 || is-lower-neighbour-of || 4.89221839083e-11
set2 || Net-Str || 4.83648734482e-11
none || Rank || 4.77847612257e-11
code_Nat || id1 || 4.77701283388e-11
rev || \not\0 || 4.73811893422e-11
nat2 || OpenClosedSet || 4.70705472045e-11
nat2 || StoneS || 4.69751267453e-11
monoid || r10_absred_0 || 4.67357267485e-11
partial_flat_lub || Nat_Hom || 4.67146332847e-11
groups1716206716st_set || r2_absred_0 || 4.66960955491e-11
bot_bot || <*> || 4.63011888801e-11
code_integer_of_int || the_Field_of_Quotients || 4.61515935037e-11
semilattice_neutr || r8_absred_0 || 4.50038294166e-11
code_n1042895779nteger || id1 || 4.4402820593e-11
set_of_pred || {..}27 || 4.42310485378e-11
nil || {}0 || 4.41786073131e-11
code_integer_of_int || MPS || 4.37847913279e-11
monoid || r11_absred_0 || 4.32072355855e-11
nat2 || id1 || 4.31243813137e-11
tl || \not\0 || 4.24120428797e-11
lattic1543629303tr_set || r11_absred_0 || 4.20745603768e-11
bit0 || C_Normed_Algebra_of_BoundedLinearOperators || 4.18363509077e-11
bit0 || Ring_of_BoundedLinearOperators0 || 4.18363509077e-11
bit0 || C_Algebra_of_BoundedLinearOperators || 4.18363509077e-11
lattic1543629303tr_set || r3_absred_0 || 4.130634775e-11
monoid || r6_absred_0 || 4.124944893e-11
bit0 || CRing || 4.11578500492e-11
comple1193779247_chain || is_properly_applicable_to || 4.05435346565e-11
nat2 || Quot. || 3.84192218426e-11
comple1193779247_chain || is_properly_applicable_to1 || 3.75681231144e-11
code_Nat || carrier || 3.71409319525e-11
list_ex || is-lower-neighbour-of || 3.68785316387e-11
groups828474808id_set || r8_absred_0 || 3.66006348214e-11
nat2 || AutGroup || 3.65851600455e-11
nat2 || UAEndMonoid || 3.65851600455e-11
comple1193779247_chain || is_applicable_to1 || 3.60940575462e-11
code_n1042895779nteger || carrier || 3.56033915927e-11
code_int_of_integer || AutGroup || 3.52930800998e-11
code_int_of_integer || UAEndMonoid || 3.52930800998e-11
monoid || r3_absred_0 || 3.51484259284e-11
bit0 || MFuncs || 3.50926314747e-11
bit0 || CAlgebra || 3.50885048245e-11
bit0 || RAlgebra || 3.50856213552e-11
code_num_of_integer || id1 || 3.50515205903e-11
bit1 || (#hash#)22 || 3.49148386458e-11
bit1 || 1_. || 3.4797774062e-11
nat2 || UAAutGroup || 3.46081514917e-11
nat2 || InnAutGroup || 3.46081514917e-11
partial_flat_ord || QuotUnivAlg || 3.40815414374e-11
groups1716206716st_set || r6_absred_0 || 3.34297566639e-11
code_int_of_integer || UAAutGroup || 3.33699804402e-11
code_int_of_integer || InnAutGroup || 3.33699804402e-11
monoid || r2_absred_0 || 3.3300054947e-11
comm_monoid || r5_absred_0 || 3.20455642271e-11
lattic1543629303tr_set || r4_absred_0 || 3.10309447639e-11
semilattice_neutr || r12_absred_0 || 3.07022485776e-11
bit0 || Ring_of_BoundedLinearOperators || 3.06913471118e-11
num_of_nat || 1_ || 3.03332370731e-11
nat2 || *0 || 3.03158076455e-11
groups_monoid_list || r4_absred_0 || 2.99540257329e-11
member2 || with-replacement || 2.99080658461e-11
bit0 || RRing || 2.98694083503e-11
member3 || tree1 || 2.94347125362e-11
bit0 || R_Algebra_of_BoundedLinearOperators || 2.93157680096e-11
bit0 || R_Normed_Algebra_of_BoundedLinearOperators || 2.9108098201e-11
bit0 || @8 || 2.84584682476e-11
nat2 || REAL0 || 2.81866283711e-11
bit0 || *\13 || 2.75351746408e-11
code_natural_of_nat || id6 || 2.69144155523e-11
code_integer_of_int || TOP-REAL || 2.60225847201e-11
nat2 || *1 || 2.54166952795e-11
pred_list || [=1 || 2.52103805401e-11
listsp || [=1 || 2.50022417237e-11
code_integer_of_int || |[..]|2 || 2.49524947165e-11
groups1716206716st_set || r13_absred_0 || 2.46438872036e-11
comm_monoid || r6_absred_0 || 2.39906037067e-11
groups1716206716st_set || r12_absred_0 || 2.35586400717e-11
lattic1543629303tr_set || r10_absred_0 || 2.32951299485e-11
bit0 || FlatCoh || 2.31727746144e-11
lattic1543629303tr_set || r1_absred_0 || 2.23932930292e-11
monoid_axioms || r13_absred_0 || 2.16696930385e-11
monoid_axioms || r12_absred_0 || 2.16696930385e-11
monoid_axioms || r7_absred_0 || 2.1580550597e-11
bot_bot || {}1 || 2.14274823686e-11
groups_monoid_list || r8_absred_0 || 2.13845465749e-11
pos || Formal-Series || 2.09314226351e-11
monoid || r4_absred_0 || 2.06345524314e-11
rotate1 || LAp || 2.02433590729e-11
rotate1 || UAp || 2.00082207553e-11
nat2 || rngs || 1.97455533543e-11
remdups || LAp || 1.9721500391e-11
remdups || UAp || 1.9497625468e-11
monoid || r7_absred_0 || 1.92146161566e-11
gen_length || *\3 || 1.88498045448e-11
partia17684980itions || is_epimorphism0 || 1.85317054275e-11
rotate1 || Int || 1.82793536608e-11
code_int_of_integer || SubFuncs || 1.81666901698e-11
comm_monoid || r2_absred_0 || 1.80057493146e-11
butlast || LAp || 1.79718809776e-11
remdups_adj || LAp || 1.78537455077e-11
butlast || UAp || 1.7785816551e-11
remdups_adj || UAp || 1.76700871697e-11
bit1 || bool || 1.74777370871e-11
refl_on || |-5 || 1.71492162808e-11
tl || LAp || 1.6725458489e-11
sublist || #quote##bslash##slash##quote#2 || 1.66892258137e-11
butlast || Int || 1.66612495504e-11
remdups_adj || Int || 1.65748263311e-11
tl || UAp || 1.65640339111e-11
remdups || Int || 1.64926324132e-11
partia17684980itions || is_homomorphism0 || 1.63752159736e-11
splice || *\3 || 1.61271094058e-11
tl || Int || 1.57374787461e-11
code_Nat || ..1 || 1.56922479383e-11
rev || LAp || 1.56460127578e-11
rev || UAp || 1.55045769678e-11
eval || with-replacement || 1.53541318973e-11
comm_monoid_axioms || r13_absred_0 || 1.49649251049e-11
comm_monoid_axioms || r12_absred_0 || 1.49649251049e-11
rev || Int || 1.49154157935e-11
monoid || r13_absred_0 || 1.49083459598e-11
rotate1 || Cl || 1.44596170489e-11
code_n1042895779nteger || ..1 || 1.43720057777e-11
code_integer_of_int || <*..*>4 || 1.42806352456e-11
removeAll || +26 || 1.42227592419e-11
num_of_nat || id6 || 1.38691514126e-11
id2 || TAUT || 1.38432832189e-11
splice || #quote##slash##bslash##quote# || 1.3829311568e-11
append || *\3 || 1.36823498983e-11
monoid_axioms || r11_absred_0 || 1.36763587133e-11
butlast || Cl || 1.32583976744e-11
remdups_adj || Cl || 1.31938370233e-11
remdups || Cl || 1.31323975704e-11
groups387199878d_list || r7_absred_0 || 1.29100539389e-11
append || #quote##slash##bslash##quote# || 1.27742491451e-11
tl || Cl || 1.25661750365e-11
lattic1543629303tr_set || r2_absred_0 || 1.25099260518e-11
lattic1543629303tr_set || r8_absred_0 || 1.2468398461e-11
code_Nat || entrance || 1.23934557262e-11
code_Nat || escape || 1.23934557262e-11
comm_monoid_axioms || r3_absred_0 || 1.19960414122e-11
rev || Cl || 1.19461720202e-11
filter || adjectives || 1.15516706083e-11
code_n1042895779nteger || entrance || 1.13746859847e-11
code_n1042895779nteger || escape || 1.13746859847e-11
pred_list || is_coarser_than0 || 1.13407226788e-11
listsp || is_coarser_than0 || 1.11758340736e-11
filter2 || +26 || 1.11752529168e-11
code_num_of_integer || entrance || 1.10332347169e-11
code_num_of_integer || escape || 1.10332347169e-11
can_select || -82 || 1.08580617888e-11
dropWhile || +26 || 1.07816039489e-11
induct_conj || #bslash##slash#0 || 1.07615361813e-11
remove1 || +26 || 1.07241172978e-11
monoid || r8_absred_0 || 1.07222907197e-11
groups1716206716st_set || r10_absred_0 || 1.06168302518e-11
takeWhile || +26 || 1.04284278605e-11
code_Nat || IsomGroup || 9.97632731082e-12
drop || +26 || 9.83972243448e-12
take || +26 || 9.5772273638e-12
semilattice_neutr || r7_absred_0 || 9.45937289057e-12
code_int_of_integer || RLMSpace || 9.4038586244e-12
lattic1543629303tr_set || r5_absred_0 || 9.0714309442e-12
monoid || r12_absred_0 || 9.01225629674e-12
groups1716206716st_set || r11_absred_0 || 8.99715177878e-12
nat2 || Ball2 || 8.94411846174e-12
code_n1042895779nteger || IsomGroup || 8.64030614904e-12
set || CQC-WFF || 8.21931057157e-12
code_integer_of_int || TopUnitSpace || 8.00106891066e-12
monoid_axioms || r10_absred_0 || 7.95839844575e-12
list_ex1 || +94 || 7.65130784401e-12
monoid_axioms || r3_absred_0 || 7.53497904806e-12
groups_monoid_list || r1_absred_0 || 7.51793365676e-12
groups1716206716st_set || r8_absred_0 || 7.27684483652e-12
code_nat_of_integer || First*NotUsed || 6.4979315452e-12
rep_filter || <- || 5.98713764939e-12
lattic1543629303tr_set || r6_absred_0 || 5.6839328484e-12
nat2 || Family_open_set0 || 5.60457911251e-12
code_nat_of_integer || Leaves1 || 5.51061970779e-12
code_integer_of_int || TopSpaceMetr || 5.38841551661e-12
nat2 || id || 5.35603780088e-12
eventually || is_properly_applicable_to || 5.20587370995e-12
is_filter || is_one-to-one_at || 5.14975121271e-12
nat2 || Family_open_set || 5.02662378982e-12
sublist || +10 || 5.01540097698e-12
eventually || is_applicable_to1 || 4.76225622177e-12
rotate1 || Der || 4.17090565402e-12
set2 || -81 || 3.71652071139e-12
code_nat_of_integer || 0. || 3.65912937133e-12
groups_monoid_list || r5_absred_0 || 3.65454983229e-12
butlast || Der || 3.64378481068e-12
remdups_adj || Der || 3.61679628658e-12
code_integer_of_int || Tsingle_f_net || 3.60809047472e-12
remdups || Der || 3.59123494682e-12
groups_monoid_list || r2_absred_0 || 3.53942118289e-12
monoid_axioms || r8_absred_0 || 3.47498638166e-12
code_integer_of_int || bubble-sort || 3.43394749016e-12
tl || Der || 3.36117026027e-12
code_integer_of_int || insert-sort0 || 3.3209986705e-12
monoid_axioms || r4_absred_0 || 3.3000528868e-12
rev || Der || 3.12023179745e-12
comm_monoid_axioms || r4_absred_0 || 3.05430831117e-12
eventually || is_properly_applicable_to1 || 2.96762009028e-12
induct_implies || ++1 || 2.95375123902e-12
inc || 1_ || 2.89070132608e-12
code_nat_of_integer || 1. || 2.88830799284e-12
antisym || is_one-to-one_at || 2.83884119821e-12
induct_implies || --1 || 2.74113515507e-12
groups_monoid_list || r6_absred_0 || 2.64751030785e-12
induct_implies || **3 || 2.5838809997e-12
code_nat_of_integer || Collinearity || 2.58291144913e-12
induct_implies || #slash##slash##slash# || 2.51919762133e-12
distinct || index0 || 2.49040038635e-12
code_integer_of_int || root-tree0 || 2.37140609482e-12
induct_implies || #slash##slash##slash#0 || 2.36288414749e-12
induct_implies || **4 || 2.36288414749e-12
transitive_acyclic || just_once_values || 2.30374155927e-12
transitive_rtrancl || <- || 2.27427416037e-12
induct_implies || --2 || 2.24510246142e-12
induct_implies || pi0 || 2.21183025962e-12
code_nat_of_integer || carrier\ || 2.21078141503e-12
set2 || index0 || 2.18073863787e-12
nat2 || carr1 || 2.15835849305e-12
abs_filter || . || 2.15039760527e-12
code_nat_of_integer || 4_arg_relation || 2.1445699038e-12
comm_monoid_axioms || r8_absred_0 || 2.14344694284e-12
distinct || QuantNbr || 2.13792815762e-12
induct_implies || ++0 || 2.12528046974e-12
nil || 0* || 2.09128236907e-12
set2 || QuantNbr || 1.90710909192e-12
code_integer_of_int || product4 || 1.88378871159e-12
concat || Sum9 || 1.84663725718e-12
removeAll || delta5 || 1.7791681432e-12
code_natural_of_nat || product || 1.77200449342e-12
nat2 || q1. || 1.58951230373e-12
nat2 || q0. || 1.51319085883e-12
nat2 || zerovect || 1.39125224915e-12
replicate || |-> || 1.32884923407e-12
induct_implies || #slash##bslash#0 || 1.30458771927e-12
code_nat_of_integer || 1_ || 1.29065055297e-12
filter2 || delta5 || 1.2906094354e-12
list || REAL0 || 1.28082777086e-12
bit0 || GPerms || 1.26583888796e-12
nat2 || ProjectiveCollinearity || 1.2377333359e-12
removeAll || #quote##bslash##slash##quote#2 || 1.16389206597e-12
bit0 || SymGroup || 1.15797072827e-12
antisym || |-6 || 1.15340748935e-12
sym || |-6 || 1.14076321102e-12
code_integer_of_int || MFuncs || 1.01715250134e-12
trans || |-6 || 9.92268746065e-13
code_integer_of_int || GPerms || 9.58367687303e-13
filter2 || #quote##bslash##slash##quote#2 || 9.33497626715e-13
code_nat_of_integer || Lang1 || 9.11697549282e-13
nat2 || k19_zmodul02 || 8.83817399956e-13
nat2 || PR || 8.43914852636e-13
code_integer_of_int || SymGroup || 8.4094914364e-13
nat2 || ZeroLC || 8.02338829932e-13
code_integer_of_int || TotalGrammar || 7.58960165727e-13
bit0 || Formal-Series || 6.33915644109e-13
rec_sumbool || k12_simplex0 || 6.3297739608e-13
is_empty2 || \xor\ || 5.90012494688e-13
pred_of_set || \not\5 || 5.63918080529e-13
left || NAT || 5.28158647377e-13
case_sumbool || k12_simplex0 || 5.23400119764e-13
predicate_contains || is_proper_subformula_of1 || 5.22322150386e-13
rotate1 || \not\0 || 4.55698735722e-13
pos || euc2cpx || 4.50904985642e-13
nil || k8_lattad_1 || 4.42627614986e-13
set2 || =>2 || 4.26080932532e-13
code_nat_of_integer || arity0 || 4.11062541352e-13
bit0 || |....|12 || 3.73564853395e-13
eval || is_subformula_of || 3.71908223467e-13
set || \not\2 || 3.71649924591e-13
code_integer_of_int || -52 || 3.65426089372e-13
rotate1 || <>* || 3.58138404973e-13
null || \#bslash#\ || 3.53554157117e-13
nat2 || 0* || 3.48317108487e-13
code_nat_of_integer || ^20 || 3.42141854282e-13
nat_of_num || |....| || 3.19776915091e-13
complex2 || quotient || 3.14020788928e-13
im || denominator0 || 3.03035508453e-13
re || numerator0 || 2.99711138625e-13
size_size || dom || 2.95907071638e-13
nil || (0).3 || 2.88967003483e-13
set2 || \&\2 || 2.72930194387e-13
nil || (0).4 || 2.63826442926e-13
rev || <>* || 2.63660350004e-13
code_integer_of_int || min || 2.60523295973e-13
rec_sumbool || to_power2 || 2.43909159417e-13
code_natural_of_nat || -36 || 2.43020852427e-13
bitM || carrier || 2.31339312381e-13
coset || <=>0 || 2.31180065025e-13
nat2 || FuncUnit0 || 2.24702370582e-13
case_sumbool || to_power2 || 2.23635894942e-13
nat2 || FuncUnit || 2.18775430427e-13
rotate1 || -2 || 2.05216586849e-13
nil || Top\ || 2.00255161741e-13
gen_length || +19 || 1.97578921235e-13
code_integer_of_int || <:..:>1 || 1.95812811738e-13
coset || =>2 || 1.94622180268e-13
remdups_adj || \not\0 || 1.9109192292e-13
nat2 || arity || 1.86471751447e-13
butlast || -2 || 1.8214168933e-13
remdups_adj || -2 || 1.80942075507e-13
null || \nand\ || 1.80570661275e-13
remdups || -2 || 1.79804198668e-13
splice || +19 || 1.75295813728e-13
remdups || \not\0 || 1.73028547401e-13
tl || -2 || 1.69486902369e-13
nat2 || doms || 1.58788581573e-13
rev || -2 || 1.58530889745e-13
induct_conj || #bslash#3 || 1.56285169409e-13
num_of_nat || product || 1.52503879382e-13
nat2 || ComplexFuncUnit || 1.48297231556e-13
nat2 || RealFuncUnit || 1.4654312429e-13
uminus_uminus || \xor\ || 1.41956557612e-13
coset || .:19 || 1.40677328019e-13
transitive_trancl || bounded_metric || 1.40075610233e-13
null || =>2 || 1.37734213328e-13
nat2 || inf0 || 1.30508608847e-13
uminus_uminus || \or\3 || 1.29167567639e-13
nat2 || sup || 1.28709788178e-13
code_integer_of_int || C_Normed_Algebra_of_BoundedLinearOperators || 1.25160350936e-13
code_integer_of_int || Ring_of_BoundedLinearOperators0 || 1.25160350936e-13
code_integer_of_int || C_Algebra_of_BoundedLinearOperators || 1.25160350936e-13
code_integer_of_int || CRing || 1.20465553845e-13
append || +19 || 1.16165920102e-13
num_of_nat || -36 || 1.15518270196e-13
pow2 || <=>0 || 1.09967676846e-13
set2 || \nor\ || 1.09457511479e-13
sym || is_metric_of || 1.09408447718e-13
coset || \&\2 || 1.09364475106e-13
set2 || <=>0 || 1.07592769785e-13
splice || #quote##bslash##slash##quote#3 || 1.01174647525e-13
code_num_of_integer || carrier || 9.80279029605e-14
code_integer_of_int || CAlgebra || 9.35861719496e-14
code_integer_of_int || RAlgebra || 9.34743065336e-14
uminus_uminus || \&\2 || 9.24240258526e-14
complete_Sup_Sup || \xor\ || 9.21136586876e-14
nil || 1_Rmatrix || 8.33724225523e-14
splice || +106 || 8.2764876923e-14
code_Nat || inf0 || 8.2309679809e-14
splice || +29 || 8.20846767266e-14
code_Nat || sup || 8.03621169863e-14
rotate1 || <=>0 || 7.91979044082e-14
nat2 || 1_. || 7.854472174e-14
code_integer_of_int || Ring_of_BoundedLinearOperators || 7.75503279354e-14
coset || \nor\ || 7.74066115412e-14
code_n1042895779nteger || inf0 || 7.51081974019e-14
set || .:18 || 7.45429965055e-14
code_integer_of_int || RRing || 7.37080542835e-14
code_n1042895779nteger || sup || 7.34875789366e-14
code_integer_of_int || R_Algebra_of_BoundedLinearOperators || 7.26577467272e-14
is_empty2 || \&\2 || 7.21626141871e-14
code_integer_of_int || R_Normed_Algebra_of_BoundedLinearOperators || 7.19348913266e-14
code_Nat || proj4_4 || 6.79233660179e-14
list_ex || meets3 || 6.78072635192e-14
remdups_adj || <=>0 || 6.65649886975e-14
set2 || \nand\ || 6.55105880646e-14
pred_list || is_dependent_of || 6.54689950669e-14
code_integer_of_int || *\13 || 6.51546715928e-14
code_num_of_integer || inf0 || 6.46656986984e-14
code_n1042895779nteger || proj4_4 || 6.45870001964e-14
listsp || is_dependent_of || 6.38383329614e-14
append || #quote##bslash##slash##quote#3 || 6.34519646565e-14
code_num_of_integer || sup || 6.32443577444e-14
set2 || \xor\ || 6.03114753365e-14
nil || %O || 6.02534902609e-14
rev || <=>0 || 5.77810800032e-14
remdups || <=>0 || 5.46727684508e-14
minus_minus || +50 || 5.41969047453e-14
code_Pos || @22 || 5.28435769783e-14
pos || @22 || 5.13195146335e-14
sublist || #slash##bslash#9 || 5.10294906331e-14
wf || is_metric_of || 4.9796182973e-14
append || +29 || 4.76245880299e-14
sublist || #slash##bslash#23 || 4.73348800154e-14
gen_length || #quote##bslash##slash##quote#3 || 4.70850559023e-14
set2 || .:19 || 4.64832736416e-14
append || +106 || 4.61099806531e-14
nil || SmallestPartition || 4.59044259303e-14
transitive_rtrancl || bounded_metric || 4.5869084354e-14
is_empty2 || \nand\ || 4.42373971494e-14
uminus_uminus || *\22 || 4.36765333923e-14
uminus_uminus || *\23 || 4.36765333923e-14
code_sub || +30 || 4.15029655894e-14
remdups_adj || \&\2 || 4.14051719692e-14
sub || +30 || 4.05187040275e-14
code_integer_of_int || Formal-Series || 3.99567471124e-14
removeAll || #quote##slash##bslash##quote#0 || 3.90945779398e-14
gen_length || +106 || 3.83943810437e-14
gen_length || +29 || 3.81171663904e-14
coset || *\22 || 3.69876207523e-14
coset || *\23 || 3.69876207523e-14
dropWhile || #quote##slash##bslash##quote#0 || 3.5931253987e-14
splice || *53 || 3.57438831352e-14
remove1 || #quote##slash##bslash##quote#0 || 3.57327819804e-14
takeWhile || #quote##slash##bslash##quote#0 || 3.47131104939e-14
rotate1 || \&\2 || 3.437634337e-14
drop || #quote##slash##bslash##quote#0 || 3.26889306125e-14
removeAll || #slash##bslash#9 || 3.1836322754e-14
take || #quote##slash##bslash##quote#0 || 3.1788926807e-14
code_integer || F_Real || 3.16522454061e-14
remdups || \&\2 || 3.12136293865e-14
filter2 || #quote##slash##bslash##quote#0 || 3.10827379867e-14
cons || #quote##bslash##slash##quote#5 || 3.04818477929e-14
removeAll || #slash##bslash#23 || 2.95080704309e-14
dropWhile || #slash##bslash#9 || 2.87508204597e-14
remove1 || #slash##bslash#9 || 2.85606283098e-14
append || #quote##bslash##slash##quote#2 || 2.84212032859e-14
set2 || *\22 || 2.83659519886e-14
set2 || *\23 || 2.83659519886e-14
takeWhile || #slash##bslash#9 || 2.75897622608e-14
rev || \&\2 || 2.7169106149e-14
rotate1 || \xor\ || 2.69222756284e-14
re || min0 || 2.66681642849e-14
im || max0 || 2.66242137309e-14
dropWhile || #slash##bslash#23 || 2.66203623355e-14
remove1 || #slash##bslash#23 || 2.64425460191e-14
drop || #slash##bslash#9 || 2.56933012987e-14
rotate1 || Inv || 2.56648316517e-14
takeWhile || #slash##bslash#23 || 2.55351928613e-14
int || F_Real || 2.50013326852e-14
take || #slash##bslash#9 || 2.48631116017e-14
filter2 || #slash##bslash#9 || 2.4217254564e-14
drop || #slash##bslash#23 || 2.37644481622e-14
rotate1 || =>2 || 2.34046254358e-14
take || #slash##bslash#23 || 2.29899883362e-14
filter2 || #slash##bslash#23 || 2.23877835724e-14
rev || \xor\ || 2.23631341731e-14
append || *53 || 2.16459220606e-14
nat || <e1> || 2.13531668256e-14
remdups || =>2 || 2.09519833601e-14
trans || are_orthogonal || 2.08253578161e-14
code_num_of_integer || proj4_4 || 2.07533866839e-14
set2 || sup1 || 2.06641913145e-14
remdups_adj || =>2 || 2.03073529048e-14
butlast || Inv || 1.96398048206e-14
remdups_adj || Inv || 1.93626811817e-14
remdups || Inv || 1.91029368702e-14
member3 || is_>=_than0 || 1.89621010768e-14
bNF_Ca1495478003natLeq || <e3> || 1.83773540718e-14
rev || =>2 || 1.82987179851e-14
is_none || <= || 1.80594359716e-14
rev || \or\3 || 1.799963024e-14
member || is-lower-neighbour-of || 1.69993811913e-14
tl || Inv || 1.68818840083e-14
gen_length || *53 || 1.63347933985e-14
nil || Bottom || 1.51801197735e-14
finite_comp_fun_idem || is_the_direct_sum_of3 || 1.50756627976e-14
rev || Inv || 1.47716017215e-14
less_than || <e3> || 1.47532992722e-14
wf || are_orthogonal || 1.46474559608e-14
finite_psubset || Pitag_dist || 1.42157001966e-14
distinct || =>2 || 1.40588588512e-14
sublist || \#bslash##slash#\ || 1.28740109761e-14
distinct || \&\2 || 1.21021964765e-14
remdups_adj || \xor\ || 1.14384212566e-14
hd || index0 || 1.10204787964e-14
dropWhile || #quote##bslash##slash##quote#2 || 1.08973963202e-14
remove1 || #quote##bslash##slash##quote#2 || 1.08439621529e-14
takeWhile || #quote##bslash##slash##quote#2 || 1.056840383e-14
drop || #quote##bslash##slash##quote#2 || 1.00161815779e-14
can_select || 0c1 || 1.00153304239e-14
take || #quote##bslash##slash##quote#2 || 9.76838938997e-15
rotate1 || \or\3 || 9.69339435043e-15
size_size || \&\2 || 9.45960784834e-15
listMem || is_finer_than0 || 9.38221477431e-15
listMem || is_coarser_than0 || 9.38221477431e-15
antisym || are_orthogonal || 9.33408245292e-15
hd || QuantNbr || 9.32232318053e-15
remdups || \xor\ || 9.29899817617e-15
list || \not\2 || 8.77866778699e-15
nat || <e2> || 8.72083374433e-15
list_ex1 || abs4 || 8.61622159652e-15
remdups || \or\3 || 8.57221104316e-15
bNF_Ca1495478003natLeq || <e2> || 8.47567754535e-15
splice || \#bslash##slash#\ || 8.43672734741e-15
remdups_adj || \or\3 || 8.23809462402e-15
bNF_Ca829732799finite || are_orthogonal || 8.22066692196e-15
converse || #quote#19 || 7.93621137833e-15
splice || \#slash##bslash#\ || 7.80566683016e-15
code_Nat || Psingle_e_net || 7.751735988e-15
hd || =>2 || 7.58415164898e-15
less_than || <e2> || 7.18181019642e-15
sublist || \#slash##bslash#\ || 7.13409637526e-15
finite_comp_fun_idem || is_the_direct_sum_of1 || 7.04026806917e-15
some || -\ || 6.82005140193e-15
id2 || id4 || 6.78682434998e-15
null2 || are_equipotent || 6.76277832451e-15
code_n1042895779nteger || Psingle_e_net || 6.28469552922e-15
pred_nat || <e3> || 6.23922242372e-15
transitive_acyclic || is_a_pseudometric_of || 6.19796149471e-15
distinct || \nor\ || 6.05954184927e-15
complex2 || ]....]0 || 5.91542022667e-15
complex2 || [....[0 || 5.91190600748e-15
complex2 || [....]5 || 5.86809379586e-15
complex2 || ]....[1 || 5.85526895049e-15
hd || \&\2 || 5.83740908469e-15
append || \#slash##bslash#\ || 5.71015505208e-15
list_ex1 || misses1 || 5.70536761477e-15
append || \#bslash##slash#\ || 5.56469781846e-15
left || COMPLEX || 4.63826772332e-15
set2 || 0c0 || 4.59512359351e-15
finite_comp_fun_idem || is_the_direct_sum_of0 || 4.58813498203e-15
nat2 || id6 || 4.42519854048e-15
list_ex || misses1 || 4.34189291634e-15
partial_flat_lub || sigma_Meas || 4.29704598669e-15
remove || (Omega).5 || 4.23950302278e-15
set2 || \or\3 || 4.16772372188e-15
remove || (0).4 || 4.14629235149e-15
none || *1 || 4.09690739365e-15
right || INT || 3.75531349457e-15
set || (Omega).5 || 3.72430513006e-15
set || (0).4 || 3.6953756079e-15
left || RAT || 3.62724520187e-15
right || RAT || 3.50473982525e-15
code_int_of_integer || {..}1 || 3.47548848751e-15
pred_nat || <e2> || 3.42359816306e-15
fun_is_measure || is_a_retract_of || 3.31348890819e-15
right || omega || 3.29298846836e-15
partia17684980itions || is_complete || 3.25001488753e-15
bNF_Greatest_Succ || <=0 || 3.21281647692e-15
distinct || \or\3 || 3.16249667264e-15
bNF_Greatest_Shift || #bslash#1 || 2.87988063084e-15
none || k1_numpoly1 || 2.86242536473e-15
set || REAL0 || 2.78818351934e-15
code_nat_of_natural || entrance || 2.75951471409e-15
code_nat_of_natural || escape || 2.75951471409e-15
none || Lucas || 2.45451288197e-15
none || |....|2 || 2.42767354721e-15
none || In_Power || 2.40339043319e-15
remove || (Omega).1 || 2.19144864654e-15
partial_flat_ord || sigma_Field || 2.17899716903e-15
left || REAL || 2.17207171327e-15
sublist || #quote##slash##bslash##quote# || 2.15368816231e-15
insert3 || (Omega).5 || 2.13067501543e-15
insert3 || (0).4 || 2.10815718781e-15
cons || *110 || 2.06218343627e-15
set || (Omega).1 || 1.84707280079e-15
remove || (0).0 || 1.80344527381e-15
splice || #quote##bslash##slash##quote#2 || 1.77940674859e-15
set || (0).0 || 1.72270679535e-15
hd || \nor\ || 1.51447872038e-15
cons || at5 || 1.50486496556e-15
trans || is_metric_of || 1.46763975679e-15
partia17684980itions || are_connected1 || 1.45115844037e-15
remove || (Omega).3 || 1.44562724547e-15
distinct || is_metric_of || 1.44047311774e-15
butlast || bounded_metric || 1.43488704488e-15
remove || (0).3 || 1.40909337474e-15
empty || Subspaces || 1.40018903057e-15
empty || Submodules || 1.40018903057e-15
empty || Subspaces2 || 1.40018903057e-15
set || (Omega).3 || 1.2484926733e-15
set || (0).3 || 1.23792548693e-15
lexordp_eq || <=3 || 1.21326925472e-15
partial_flat_lub || the_last_point_of || 1.21162879326e-15
code_integer_of_int || Tempty_e_net || 1.1355653171e-15
tl || bounded_metric || 1.13526223507e-15
partial_flat_ord || the_first_point_of || 1.09148183663e-15
insert3 || (Omega).1 || 1.06517454334e-15
tl || the_consequent_of0 || 1.02233423678e-15
insert3 || (0).0 || 9.69590050653e-16
insert3 || at4 || 9.64677217041e-16
nil || 1._ || 9.00060411147e-16
nil || 0._ || 9.00060411147e-16
lexordp_eq || is_Lipschitzian_on || 8.63909701029e-16
empty || Subgroups || 8.38982896498e-16
right || REAL || 8.2394281194e-16
empty || bool3 || 8.10204444172e-16
set2 || the_base_of || 7.75701535361e-16
hd || \or\3 || 7.64611789922e-16
nat2 || Sum0 || 7.62969642395e-16
empty || east_halfline || 7.50441984653e-16
empty || west_halfline || 7.50441984653e-16
empty || the_Tree_of || 7.35901328734e-16
empty || Big_Omega || 7.35901328734e-16
code_Nat || -52 || 7.35222200681e-16
empty || Subtrees || 7.23099860162e-16
insert3 || (Omega).3 || 7.12205625335e-16
insert3 || (0).3 || 7.03731469395e-16
empty || the_right_side_of || 7.01460875396e-16
single || <*..*>23 || 6.9236850997e-16
empty || nextcard || 6.92182502344e-16
empty || south_halfline || 6.92182502344e-16
empty || Big_Theta || 6.92182502344e-16
empty || north_halfline || 6.92182502344e-16
left || INT || 6.88995581232e-16
set2 || adjs0 || 6.84937895138e-16
singleton || block_diagonal || 6.84255137991e-16
code_integer_of_int || IsomGroup || 6.82812411708e-16
nil || carrier || 6.7690673199e-16
insert3 || at3 || 6.75719778177e-16
code_integer_of_int || -54 || 6.44888459494e-16
nat2 || -36 || 6.32032818442e-16
code_n1042895779nteger || -52 || 6.25135416475e-16
nil || EmptyBag || 6.14463442932e-16
empty || Tarski-Class || 6.04217679828e-16
lexordp_eq || is_epimorphism || 5.89851600239e-16
empty || Big_Oh || 5.75635007221e-16
empty || succ1 || 5.74164958327e-16
set || .:7 || 5.73275674962e-16
remdups || NF || 5.64496796289e-16
nat2 || RLMSpace || 5.54971766911e-16
code_nat_of_integer || entrance || 5.1513455768e-16
code_nat_of_integer || escape || 5.1513455768e-16
cons || \or\0 || 5.05987778528e-16
nil || Trivial_Algebra || 5.00924814588e-16
rotate1 || NF || 4.93139919189e-16
cons || =>1 || 4.911571145e-16
concat || FlattenSeq0 || 4.86514012508e-16
listMem || <=0 || 4.64624167741e-16
code_natural_of_nat || -0 || 4.48737233983e-16
is_none || divides || 4.4523371759e-16
lattic2109816131tr_set || has_a_Standard_Representation_of || 4.43132371886e-16
nil || <%>0 || 4.34061176153e-16
code_integer_of_int || -25 || 4.22009185061e-16
butlast || NF || 3.96291266605e-16
remdups_adj || NF || 3.917317389e-16
hd || the_left_disjunct_of || 3.85494767921e-16
hd || the_antecedent_of0 || 3.74200593791e-16
semila478527537_order || is_top_reducible_wrt || 3.69067243806e-16
tl || NF || 3.5028315001e-16
code_nat_of_natural || inf0 || 3.47419570783e-16
listMem || is_proper_subformula_of1 || 3.4694754095e-16
code_nat_of_natural || sup || 3.4175725688e-16
code_int_of_integer || inf0 || 3.29669469174e-16
code_int_of_integer || sup || 3.24822095772e-16
pow2 || .:14 || 3.15989059381e-16
rev || NF || 3.13911813016e-16
coset || .:15 || 3.13735524977e-16
code_natural_of_nat || id || 3.07304519209e-16
code_Nat || Sum11 || 3.0446082207e-16
fun_is_measure || are_equipotent || 2.88531003878e-16
code_n1042895779nteger || Sum11 || 2.75272216435e-16
is_none || is_SetOfSimpleGraphs_of || 2.73042223672e-16
coset || .:14 || 2.6485147369e-16
uminus_uminus || (....> || 2.63568804601e-16
pred_list || is_eventually_in || 2.57308344716e-16
listsp || is_eventually_in || 2.54015026968e-16
list || ^omega || 2.51112295952e-16
uminus_uminus || <....) || 2.51112288686e-16
code_num_of_integer || Sum11 || 2.50597168311e-16
coset || (....>1 || 2.37582374637e-16
can_select || -28 || 2.36643529995e-16
coset || <....)0 || 2.30013972873e-16
map_tailrec || +^4 || 2.20991379195e-16
bij_betw || are_isomorphic_under || 2.14940565656e-16
code_Nat || 1_ || 2.10987254893e-16
num_of_nat || -0 || 2.09282589448e-16
code_n1042895779nteger || 1_ || 1.965733656e-16
list_ex1 || +5 || 1.89189101851e-16
id || id4 || 1.89128946255e-16
left || 0 || 1.88830006495e-16
code_Nat || Sum || 1.85954076104e-16
finite_finite2 || `5 || 1.84273119426e-16
code_num_of_integer || 1_ || 1.82349493752e-16
code_n1042895779nteger || Sum || 1.72999040903e-16
bNF_Greatest_Succ || [=1 || 1.57664051064e-16
set2 || .:15 || 1.57352295297e-16
num_of_nat || id || 1.56566195104e-16
code_num_of_integer || Sum || 1.52419444409e-16
bind3 || FinUnion0 || 1.50843540908e-16
code_integer_of_int || Z#slash#Z* || 1.5082698278e-16
single || singleton || 1.47851357692e-16
none || SIMPLEGRAPHS || 1.46384127214e-16
set2 || (....>1 || 1.45642277153e-16
cons || -r> || 1.45245776064e-16
set2 || .:14 || 1.4500902901e-16
bNF_Greatest_Shift || *18 || 1.43658637804e-16
set2 || <....)0 || 1.38530278274e-16
null2 || c= || 1.25931320372e-16
none || 0. || 1.16808968124e-16
set2 || -27 || 1.13163643385e-16
bind2 || #slash#0 || 1.06753883319e-16
nat2 || INT.Ring || 1.00821561249e-16
tan || Product3 || 8.84931029464e-17
arctan || ppf || 8.45855968985e-17
null || ex_inf_of || 7.82970835325e-17
nil || Bottom2 || 7.69546980048e-17
code_natural_of_nat || 1. || 7.43190227894e-17
null || ex_sup_of || 7.42019932404e-17
is_empty2 || sqr1 || 6.93560709101e-17
append || #slash##bslash#4 || 5.92241619257e-17
set_option || closed_attribute_subset || 5.68528845698e-17
splice || delta5 || 5.63450345909e-17
induct_implies || *\29 || 5.63045060336e-17
distinct || ex_inf_of || 5.58649860776e-17
semilattice || commutes_with0 || 5.54394339972e-17
semilattice || OrthoComplement_on || 5.54394339972e-17
distinct || ex_sup_of || 5.37306931016e-17
real || Newton_Coeff || 5.03098457553e-17
some || deps_encl_by || 4.70139683918e-17
bind2 || RightModule || 4.67807496811e-17
null || sqr0 || 4.60791761014e-17
list_ex1 || in2 || 4.381899774e-17
bit0 || sort_d || 4.17289157206e-17
bit0 || sort_a || 4.17289157206e-17
member2 || is-lower-neighbour-of || 4.13421612923e-17
pred_list || in1 || 4.12633834184e-17
map || + || 4.12440397249e-17
listsp || in1 || 4.06935760698e-17
dup || sort_d || 3.92486939021e-17
dup || sort_a || 3.92486939021e-17
pred_option || are_orthogonal1 || 3.88006623905e-17
num_of_nat || 1. || 3.63421866782e-17
nil || [[0]] || 3.60034647919e-17
pred_option || are_orthogonal0 || 3.52571302638e-17
semilattice_axioms || QuasiOrthoComplement_on || 3.47629879792e-17
semilattice_axioms || commutes-weakly_with || 3.47629879792e-17
append || delta5 || 3.44338952955e-17
member3 || is_generator-set_of || 3.4245007189e-17
code_dup || sort_d || 3.38654366663e-17
code_dup || sort_a || 3.38654366663e-17
induct_conj || 0q || 3.33655105254e-17
induct_conj || -42 || 3.27780309778e-17
induct_implies || 1q || 2.8776111887e-17
empty || Bottom || 2.83280085849e-17
list_ex || in2 || 2.58596348156e-17
re || `1 || 2.5500002258e-17
nil || VERUM0 || 2.5452970013e-17
im || `2 || 2.47612013231e-17
complex2 || |[..]| || 2.33270678379e-17
gen_length || delta5 || 2.32105871522e-17
transitive_tranclp || bounded_metric || 2.31476166441e-17
set2 || abs6 || 2.2903667471e-17
neg || -25 || 2.22699601109e-17
pos || -25 || 2.18459851926e-17
re || succ1 || 2.14115579728e-17
code_Neg || -25 || 2.06511693278e-17
code_Pos || -25 || 1.9942592627e-17
complex2 || #bslash#0 || 1.95158773958e-17
list_ex1 || overlapsoverlap || 1.94739309516e-17
wfP || is_metric_of || 1.78990714066e-17
abel_semigroup || QuasiOrthoComplement_on || 1.77589997586e-17
abel_semigroup || commutes-weakly_with || 1.77589997586e-17
im || {..}1 || 1.66205782065e-17
lattic35693393ce_set || QuasiOrthoComplement_on || 1.61004620516e-17
lattic35693393ce_set || commutes-weakly_with || 1.61004620516e-17
empty || the_transitive-closure_of || 1.5828123224e-17
empty || [*] || 1.53674368356e-17
empty || CnPos || 1.46532139132e-17
id2 || SIMPLEGRAPHS || 1.46153444883e-17
list_ex || overlapsoverlap || 1.45893389001e-17
empty || k5_ltlaxio3 || 1.43675340767e-17
empty || CnIPC || 1.35090239057e-17
empty || CnCPC || 1.33428989757e-17
empty || Subtrees0 || 1.33428989757e-17
nat || Sum_Tran || 1.32528430903e-17
empty || Inv0 || 1.31904696201e-17
bNF_Ca1495478003natLeq || [+] || 1.3128307157e-17
list_ex1 || is_immediate_constituent_of1 || 1.29430929902e-17
empty || CnS4 || 1.2798279655e-17
empty || sup4 || 1.26849901883e-17
empty || Mycielskian1 || 1.22958442211e-17
list_ex1 || is_proper_subformula_of1 || 1.16312353876e-17
empty || Rank || 1.15016300669e-17
bit1 || -25 || 1.11731412057e-17
less_than || [+] || 1.07476308615e-17
code_integer_of_int || k19_finseq_1 || 1.05830786799e-17
nat2 || succ0 || 1.04555882899e-17
bitM || sort_d || 1.04368599972e-17
bitM || sort_a || 1.04368599972e-17
bind2 || FinUnion0 || 1.04088707019e-17
append || \;\3 || 1.03811712761e-17
list_ex || is_immediate_constituent_of1 || 9.89065434635e-18
nil || FuncUnit0 || 9.55162556683e-18
nil || FuncUnit || 9.55162556683e-18
list_ex || is_proper_subformula_of1 || 9.09672448165e-18
splice || *112 || 8.76123629753e-18
splice || *140 || 8.76123629753e-18
comm_monoid || are_weakly-unifiable || 8.60066338032e-18
some || singleton || 8.32115916375e-18
groups387199878d_list || are_unifiable || 8.17295078086e-18
nil || q0. || 7.90649686675e-18
contained || [=1 || 7.58780695862e-18
trans || computes0 || 7.57957981696e-18
append || qadd || 7.28676020224e-18
complex2 || WFF || 7.25043698105e-18
pow2 || radix || 6.94382921483e-18
splice || qadd || 6.60637002319e-18
antisym || is_SetOfSimpleGraphs_of || 6.57315139223e-18
sym || is_SetOfSimpleGraphs_of || 6.48233402132e-18
re || the_argument_of0 || 6.30963895019e-18
concat || FlattenSeq || 5.95388696116e-18
remdups || uparrow0 || 5.80305244266e-18
groups_monoid_list || are_weakly-unifiable || 5.75594474262e-18
nil || Stop || 5.72969655652e-18
remdups || downarrow0 || 5.52288994954e-18
trans || is_SetOfSimpleGraphs_of || 5.45534071849e-18
wf || computes0 || 5.35246938018e-18
is_empty2 || chi6 || 5.05952479836e-18
im || the_left_argument_of0 || 5.0341641335e-18
pred_nat || [+] || 4.9348168652e-18
im || the_antecedent_of || 4.66390198369e-18
nil || <*>0 || 4.64292878261e-18
predicate_contains || is_formal_provable_from || 4.53982669393e-18
null || chi5 || 4.53826875803e-18
semilattice_neutr || are_unifiable || 4.53229261154e-18
nil || Bot\ || 4.51676764003e-18
cons || \;\6 || 4.3496216905e-18
code_natural_of_nat || Seg || 4.28531717106e-18
re || Ex4 || 4.01976982521e-18
antisym || computes0 || 4.01159681221e-18
predicate_contains || is_Lipschitzian_on6 || 3.9338494577e-18
predicate_contains || is_Lipschitzian_on5 || 3.9338494577e-18
set || @--> || 3.89916673247e-18
splice || \;\3 || 3.62286695811e-18
append || *112 || 3.5659370463e-18
append || *140 || 3.5659370463e-18
complex2 || \not\6 || 3.53080948756e-18
bNF_Ca829732799finite || computes0 || 3.48686547179e-18
rotate1 || +75 || 3.44103635356e-18
c_Predicate_Oeq || are_isomorphic8 || 3.41798216942e-18
gen_length || *112 || 3.41796938931e-18
gen_length || *140 || 3.41796938931e-18
list || *0 || 3.36117140552e-18
monoid || are_unifiable || 3.26691816246e-18
nil || Concept-with-all-Objects || 3.26412958583e-18
arctan || P_cos || 3.17634860469e-18
member3 || reduces || 3.14388952429e-18
im || Var1 || 3.12931143714e-18
code_integer_of_int || CompleteSGraph || 3.10900455925e-18
semiring_1_of_nat || <*..*>1 || 3.08839925719e-18
pred_list || is-SuperConcept-of || 2.96896845853e-18
listsp || is-SuperConcept-of || 2.89968375868e-18
tan || to_power0 || 2.87586367687e-18
complex2 || \=\ || 2.85539768623e-18
nil || q1. || 2.7388916503e-18
complex2 || <*..*>21 || 2.65614884655e-18
splice || qmult || 2.63786738712e-18
code_Nat || dom0 || 2.63595542597e-18
hd || the_left_side_of0 || 2.62921375616e-18
removeAll || qmult || 2.61942692765e-18
gen_length || qadd || 2.61478458032e-18
comm_monoid || |-|0 || 2.49750044172e-18
code_n1042895779nteger || dom0 || 2.49531438972e-18
code_nat_of_integer || Product7 || 2.44111663737e-18
list || <%> || 2.39802878575e-18
code_num_of_integer || dom0 || 2.34010047212e-18
code_integer || 0 || 2.27105500209e-18
code_nat_of_integer || chromatic#hash#0 || 2.26563064816e-18
rev || +75 || 2.21663976512e-18
tl || the_right_side_of0 || 2.18617618356e-18
real || to_power || 2.1556294762e-18
semila1450535954axioms || ==>* || 2.14570664075e-18
num_of_nat || Seg || 2.14030371997e-18
cons || <=>1 || 2.07490074052e-18
code_nat_of_integer || clique#hash#0 || 2.06878288074e-18
transitive_rtrancl || *49 || 1.93829352692e-18
product_snd || term || 1.87788404599e-18
size_size || are_equipotent || 1.85011508828e-18
filter2 || qmult || 1.80436561848e-18
groups828474808id_set || are_unifiable || 1.69936836501e-18
monoid_axioms || are_weakly-unifiable || 1.68653876821e-18
product_Pair || Monom || 1.61060491908e-18
re || AllIso || 1.5995183522e-18
set2 || *49 || 1.53273947478e-18
code_nat_of_integer || Sum19 || 1.51598801093e-18
lexordp_eq || ==>* || 1.51552630315e-18
gen_length || \;\3 || 1.49238642703e-18
comm_monoid || is_homomorphism1 || 1.4917340542e-18
lattic1693879045er_set || -->. || 1.45505682635e-18
code_nat_of_integer || len || 1.43199165511e-18
rev || Non || 1.40586571543e-18
semilattice_order || ==>. || 1.39572009605e-18
semilattice_order || -->. || 1.38890621555e-18
complex2 || \or\4 || 1.38543737315e-18
pos || ProperPrefixes || 1.34581786774e-18
lattic1543629303tr_set || are_weakly-unifiable || 1.3437294996e-18
set2 || Union0 || 1.33662968502e-18
finite_comp_fun_idem || do_not_constitute_a_decomposition || 1.30018353715e-18
member3 || |=7 || 1.26303678016e-18
hd || bound_in || 1.24681078915e-18
rotate1 || Non || 1.24658610232e-18
diffs || <X> || 1.21930750573e-18
set2 || <*..*>1 || 1.2157475948e-18
nat_of_num || In_Power || 1.19633825298e-18
id_on || MSSign0 || 1.18631099523e-18
code_integer_of_int || Sgm00 || 1.18014354956e-18
code_nat_of_integer || len1 || 1.16272763458e-18
code_nat_of_natural || Product7 || 1.15013122006e-18
pos || Col || 1.13649448544e-18
code_natural || 0 || 1.10723388158e-18
append || qmult || 1.07769201745e-18
member3 || is_continuous_on7 || 1.06030268638e-18
member3 || is_continuous_on9 || 1.06030268638e-18
code_integer_of_int || ..1 || 1.05666288049e-18
tl || the_scope_of || 1.02828654179e-18
groups387199878d_list || is_succ_homomorphism || 1.02600818425e-18
set || BOOL || 1.02370520493e-18
set_option || inf || 1.0120024076e-18
gen_length || qmult || 1.00763655291e-18
groups387199878d_list || is_an_universal_closure_of || 1.00126629762e-18
some || wayabove || 9.82029569915e-19
is_empty2 || sup7 || 9.77492854837e-19
member3 || <=1 || 9.75074309755e-19
code_natural_of_nat || rngs || 9.2481324126e-19
distinct || *49 || 9.20345607917e-19
lexordp2 || -->. || 9.17694739896e-19
transitive_trancl || +75 || 9.05622006384e-19
cons || All || 9.05158942846e-19
transitive_trancl || ?0 || 8.90528020175e-19
bind4 || c= || 8.82734665246e-19
nat2 || SubFuncs || 8.63281360155e-19
groups_monoid_list || is_homomorphism1 || 8.53496445519e-19
code_nat_of_natural || Sum19 || 8.34365986507e-19
nat2 || Product7 || 8.15189611999e-19
int || 0 || 8.10395365544e-19
map_tailrec || *^1 || 8.05409119805e-19
trans || can_be_characterized_by || 7.77487767761e-19
groups_monoid_list || |-|0 || 7.73948728629e-19
code_int_of_integer || Product7 || 7.44644832889e-19
semilattice_neutr || is_an_universal_closure_of || 7.36824082217e-19
nat_of_num || len || 7.36135874477e-19
groups387199878d_list || <==>1 || 7.24110293787e-19
ring_1_of_int || <*..*>1 || 7.0682941535e-19
suc || succ1 || 6.95798313863e-19
single || *\27 || 6.91945880439e-19
comple1176932000PREMUM || are_equipotent || 6.73351287676e-19
semila1450535954axioms || ==>. || 6.46395541416e-19
removeAll || #quote##slash##bslash##quote# || 6.41399157621e-19
cnj || AllRetr || 6.38967092426e-19
cnj || AllCoretr || 6.38967092426e-19
nat2 || Sum19 || 6.31802297544e-19
semilattice_neutr || is_succ_homomorphism || 6.24687740068e-19
set2 || vars0 || 6.10428186304e-19
semilattice_order || ==>* || 6.09499874483e-19
set2 || variables_in || 5.98538561939e-19
dropWhile || #quote##slash##bslash##quote# || 5.92095492048e-19
remove1 || #quote##slash##bslash##quote# || 5.88988372947e-19
takeWhile || #quote##slash##bslash##quote# || 5.72999145286e-19
re || the_scope_of0 || 5.65274927438e-19
basic_BNF_xtor || -20 || 5.60936023091e-19
code_int_of_integer || Sum19 || 5.53198563328e-19
semilattice_neutr || <==>1 || 5.50354200697e-19
remdups_adj || Non || 5.49055054651e-19
drop || #quote##slash##bslash##quote# || 5.41127426573e-19
abel_semigroup || commutes_with0 || 5.33207333536e-19
abel_semigroup || OrthoComplement_on || 5.33207333536e-19
set || {}0 || 5.31841074962e-19
take || #quote##slash##bslash##quote# || 5.26899593819e-19
cnj || AllEpi || 5.18628697264e-19
cnj || AllMono || 5.18628697264e-19
filter2 || #quote##slash##bslash##quote# || 5.15710901972e-19
null || lim_inf1 || 5.10192696818e-19
listMem || |- || 4.83781474703e-19
abel_s1917375468axioms || QuasiOrthoComplement_on || 4.79529824491e-19
abel_s1917375468axioms || commutes-weakly_with || 4.79529824491e-19
remove || [#hash#] || 4.62993582407e-19
insert3 || #quote##bslash##slash##quote#4 || 4.59855825637e-19
distinct || vars0 || 4.50613481259e-19
num_of_nat || rngs || 4.4996449957e-19
rotate1 || Partial_Diff_Union || 4.47664575724e-19
distinct || variables_in || 4.42159002289e-19
lexordp2 || ==>. || 4.29703644934e-19
rotate1 || ?0 || 4.07446707286e-19
transitive_rtranclp || ==>* || 3.91559788797e-19
monoid || is_succ_homomorphism || 3.87106748897e-19
is_none || are_isomorphic1 || 3.85737898026e-19
contained || c=1 || 3.83186122882e-19
rotate1 || Partial_Union || 3.82941928845e-19
groups828474808id_set || is_an_universal_closure_of || 3.80264755315e-19
product_unit || NATOrd || 3.78818687756e-19
cos_coeff || <e1> || 3.76221411339e-19
cos_coeff || <e2> || 3.76221411339e-19
cos_coeff || <e3> || 3.76221411339e-19
sin_coeff || <e1> || 3.71897448628e-19
sin_coeff || <e2> || 3.71897448628e-19
sin_coeff || <e3> || 3.71897448628e-19
semilattice || are_anti-isomorphic || 3.67237678997e-19
empty || [[0]] || 3.67054051308e-19
insert3 || ^^ || 3.64373325116e-19
antisym || can_be_characterized_by || 3.63476531394e-19
sym || can_be_characterized_by || 3.58273684858e-19
nil || EmptyIns || 3.48285858475e-19
distinct || Union0 || 3.45421792298e-19
set2 || inf_net || 3.44750684641e-19
set || ^omega0 || 3.39050376533e-19
default_default || -3 || 3.33080185015e-19
filter2 || <=>3 || 3.26130990938e-19
groups828474808id_set || <==>1 || 3.18067190179e-19
remdups_adj || Partial_Diff_Union || 3.15574103302e-19
inf_inf || #bslash##slash# || 3.11805596926e-19
distinct || emp || 3.08491246997e-19
rev || ?0 || 3.06646078053e-19
is_none || is_embedded_in || 3.05505391672e-19
code_Nat || proj1 || 3.04477781659e-19
nil || TAUT || 3.01650848752e-19
product_Unity || c[100] || 2.98545829151e-19
rev || Partial_Diff_Union || 2.98491751007e-19
product_unit || c[100] || 2.97303282104e-19
transitive_tranclp || -->. || 2.89357655416e-19
code_n1042895779nteger || proj1 || 2.89286962078e-19
is_empty2 || max- || 2.86062477501e-19
product_Unity || -4 || 2.82588495388e-19
lexordp_eq || ==>. || 2.82409500228e-19
product_unit || -4 || 2.81812839013e-19
remdups_adj || Partial_Union || 2.77170930448e-19
is_empty2 || max+ || 2.7253892171e-19
groups828474808id_set || is_succ_homomorphism || 2.71389779841e-19
insert3 || [#hash#] || 2.6836676952e-19
rev || Partial_Union || 2.68007525826e-19
cons || All1 || 2.67156730849e-19
semila478527537_order || congr || 2.65462406585e-19
remdups || Non || 2.63377181895e-19
set || GenProbSEQ || 2.6209972306e-19
eval || [=1 || 2.57965796136e-19
lattic2109816131tr_set || parallelogram || 2.5523174811e-19
remdups || +75 || 2.52503538651e-19
lattic1543629303tr_set || |-|0 || 2.48643544805e-19
remdups || ?0 || 2.47808703237e-19
coset || Finseq-EQclass || 2.47428207906e-19
code_num_of_integer || proj1 || 2.46529887331e-19
pred_list || |-5 || 2.44214660997e-19
semigroup || QuasiOrthoComplement_on || 2.42845770352e-19
semigroup || commutes-weakly_with || 2.42845770352e-19
listsp || |-5 || 2.39606923662e-19
remdups || Partial_Diff_Union || 2.36283962038e-19
monoid || is_an_universal_closure_of || 2.34252010892e-19
remdups_adj || +75 || 2.33921115207e-19
remdups_adj || core || 2.33214599041e-19
remdups_adj || ?0 || 2.30034673233e-19
remdups || core || 2.29995215186e-19
set2 || R_EAL0 || 2.29113065105e-19
monoid_axioms || is_homomorphism1 || 2.28934699126e-19
coset || FDprobSEQ || 2.28754386873e-19
splice || #bslash#; || 2.21237760908e-19
bNF_Cardinal_cone || omega || 2.14647081749e-19
induct_implies || ^+ || 2.1237141146e-19
induct_implies || +^ || 2.1237141146e-19
remdups || Partial_Union || 2.12301445759e-19
null || max-0 || 2.11462629043e-19
real || <e1> || 2.10200132461e-19
real || <e2> || 2.10200132461e-19
real || <e3> || 2.10200132461e-19
lattic1543629303tr_set || is_homomorphism1 || 2.07408539934e-19
lattic1693879045er_set || ==>. || 2.0712973591e-19
map || * || 2.06784406432e-19
groups1716206716st_set || are_unifiable || 2.00989510523e-19
null || max+0 || 1.99248286015e-19
rev || `5 || 1.98569551297e-19
member2 || is_primitive_root_of_degree || 1.95135219117e-19
trans || is_proper_subformula_of0 || 1.7632231075e-19
transitive_trancl || MSSign0 || 1.75874703481e-19
monoid || <==>1 || 1.75872939786e-19
listrel1 || .:14 || 1.74643768535e-19
bNF_Cardinal_cfinite || is_strongly_connected_in || 1.71946511557e-19
append || #bslash#; || 1.68285409603e-19
nat_of_num || the_rank_of0 || 1.64500260074e-19
semilattice_axioms || are_dual || 1.62362961189e-19
transitive_rtrancl || MSSign0 || 1.62131943535e-19
none || StoneBLattice || 1.61730759312e-19
remdups || `5 || 1.54300809831e-19
code_Suc || nextcard || 1.53716147013e-19
induct_conj || ^0 || 1.53171693056e-19
single || NeighborhoodSystem || 1.48609856701e-19
hd || the_left_argument_of || 1.47451748084e-19
none || the_Field_of_Quotients || 1.46763873735e-19
code_nat_of_natural || the_rank_of0 || 1.41893991566e-19
uminus_uminus || . || 1.37986145224e-19
listrel1 || ~7 || 1.35941078676e-19
bNF_Cardinal_cfinite || is_antisymmetric_in || 1.35729749107e-19
set2 || Finseq-EQclass || 1.32293277922e-19
set2 || FDprobSEQ || 1.31124164816e-19
cons || \&\0 || 1.27829906714e-19
tl || the_right_argument_of || 1.25111812916e-19
bNF_Cardinal_cfinite || is_transitive_in || 1.24557209805e-19
null || |-6 || 1.24494027507e-19
transitive_tranclp || ==>. || 1.23145161514e-19
wf || `5 || 1.23020806558e-19
none || StoneLatt || 1.22834290554e-19
partial_flat_ord || inf2 || 1.2159820232e-19
inc || bool0 || 1.19001966225e-19
hd || Union0 || 1.18519947923e-19
lattic2109816131tr_set || parallelogram0 || 1.17583787983e-19
wf || \not\3 || 1.16258541312e-19
monoid_axioms || |-|0 || 1.15776374006e-19
code_Suc || bool0 || 1.12810834643e-19
semila478527537_order || congr0 || 1.11313096831e-19
partial_flat_lub || lim_inf1 || 1.07432396979e-19
eval || is_a_convergence_point_of || 1.02002728035e-19
abel_semigroup || are_dual || 1.00607455924e-19
null || *49 || 1.00342441148e-19
bNF_Cardinal_cfinite || is_reflexive_in || 9.95078408914e-20
list || .:7 || 9.8829680918e-20
is_none || is_ringisomorph_to || 9.4818055578e-20
contained || is_minimal_in0 || 9.4407380218e-20
hd || vars0 || 9.4174691556e-20
code_natural_of_nat || card || 9.40260621062e-20
groups387199878d_list || are_weakly-unifiable || 9.37598917441e-20
lattic35693393ce_set || are_dual || 9.36566141949e-20
hd || variables_in || 9.23985455881e-20
groups828474808id_set || are_weakly-unifiable || 8.96554729779e-20
top_top || -3 || 8.87998730665e-20
gen_length || #bslash#; || 8.87778139377e-20
id || id3 || 8.80329306364e-20
partia17684980itions || <=1 || 8.80228829838e-20
induct_conj || +100 || 8.66628650556e-20
bot_bot || -3 || 8.52068698645e-20
contained || is_maximal_in0 || 8.46221162139e-20
transitive_rtranclp || ==>. || 8.45473301319e-20
list || ~0 || 8.15595619802e-20
contained || <=\ || 8.13767275207e-20
empty || 0. || 7.78991908234e-20
induct_implies || *147 || 7.7259353937e-20
empty || [#hash#] || 7.59402279187e-20
comm_monoid || are_unifiable || 7.38592721636e-20
lattic35693393ce_set || are_opposite || 7.24754399062e-20
empty || EmptyBag || 7.1644929261e-20
pred_maxchain || -->. || 7.05083685781e-20
lattic2109816131tr_set || congr || 6.93008509914e-20
semiri1062155398ct_rel semiri882458588ct_rel || 0_NN VertexSelector 1 || 6.66606317425e-20
is_empty2 || +75 || 6.64873190455e-20
id2 || the_Field_of_Quotients || 6.59724943288e-20
is_empty2 || ?0 || 6.45607625081e-20
hd || *49 || 5.93345153364e-20
id_on || WFF || 5.92466806543e-20
distinct || |-6 || 5.38541118229e-20
semila478527537_order || \||\3 || 5.29308110623e-20
induct_implies || .|. || 5.13321689516e-20
comm_monoid_axioms || are_weakly-unifiable || 5.07904571432e-20
id_on || \or\4 || 4.98499460726e-20
pred_chain || ==>* || 4.20751510542e-20
transitive_trancl || MaxADSet || 4.07477842831e-20
contained || divides1 || 4.06984142952e-20
semilattice || is_elementary_subsystem_of || 4.06571522425e-20
nil || +52 || 4.06476444019e-20
predicate_contains || |=7 || 4.06038320506e-20
map_option || .9 || 4.05628901537e-20
partial_flat_lub || bool2 || 3.91481452547e-20
abel_semigroup || are_anti-isomorphic || 3.43904686105e-20
partial_flat_ord || {..}21 || 3.16718226884e-20
set2 || ?0 || 3.11988798287e-20
set2 || +75 || 3.11883825683e-20
empty || +14 || 3.08921243569e-20
map || .9 || 3.08185631525e-20
nil || [#hash#]0 || 3.02122143072e-20
right || GBP || 2.91257298121e-20
partia17684980itions || c=1 || 2.84681203353e-20
equiv_equivp || commutes_with0 || 2.81303220635e-20
equiv_equivp || OrthoComplement_on || 2.81303220635e-20
left || SBP || 2.81073615877e-20
bit0 || .:7 || 2.80686014297e-20
bot_bot || min || 2.75225979564e-20
antisym || is_embedded_in || 2.59609091759e-20
transitive_trancl || WFF || 2.5669906961e-20
sym || is_embedded_in || 2.55043907009e-20
transitive_rtrancl || WFF || 2.44422918012e-20
antisym || is_proper_subformula_of0 || 2.42029237278e-20
sym || is_proper_subformula_of0 || 2.39643711927e-20
semilattice || are_opposite || 2.38808209553e-20
pred_chain || ==>. || 2.38519619496e-20
transitive_trancl || \or\4 || 2.32495618217e-20
transitive_rtrancl || \or\4 || 2.22376178713e-20
rev || #quote#15 || 2.21452202953e-20
dup || ~0 || 2.05223589195e-20
trans || is_embedded_in || 2.05098429553e-20
set || *1 || 1.96269395344e-20
semilattice_axioms || <==>0 || 1.89235115505e-20
code_dup || ~0 || 1.87154427793e-20
member3 || is_formal_provable_from || 1.79639188255e-20
transitive_rtrancl || Cl || 1.79609482825e-20
abel_s1917375468axioms || are_dual || 1.78690561193e-20
pred_maxchain || ==>. || 1.73656237059e-20
map_tailrec || div || 1.72379563892e-20
induct_conj || - || 1.70436812063e-20
append || *37 || 1.67129635505e-20
induct_conj || + || 1.61282944538e-20
equiv_part_equivp || QuasiOrthoComplement_on || 1.58267218337e-20
equiv_part_equivp || commutes-weakly_with || 1.58267218337e-20
insert3 || Plane3 || 1.50106950485e-20
is_empty || r2_cat_6 || 1.45817498839e-20
c_Predicate_Oeq || is_compared_to || 1.4302707738e-20
c_Predicate_Oeq || are_os_isomorphic || 1.4302707738e-20
antisym || is_ringisomorph_to || 1.42583861351e-20
gen_length || abs4 || 1.4169052648e-20
sym || is_ringisomorph_to || 1.41092405605e-20
gen_length || 0c1 || 1.39867716435e-20
contained || is-SuperConcept-of || 1.3770846846e-20
predicate_contains || is_continuous_on7 || 1.28394864171e-20
predicate_contains || is_continuous_on9 || 1.28394864171e-20
null || is_SetOfSimpleGraphs_of || 1.28080007697e-20
trans || is_ringisomorph_to || 1.23529598183e-20
reflp || QuasiOrthoComplement_on || 1.2240460045e-20
reflp || commutes-weakly_with || 1.2240460045e-20
set_of_seq || * || 1.19058891497e-20
abel_semigroup || <==>0 || 1.18942557239e-20
splice || abs4 || 1.1764544769e-20
upto || pi_1 || 1.1745688616e-20
bot_bot || k19_cat_6 || 1.16682804767e-20
splice || 0c1 || 1.16372366634e-20
finite_psubset || %O || 1.16306018648e-20
semigroup || are_dual || 1.13887924722e-20
lattic35693393ce_set || <==>0 || 1.10948081976e-20
bit1 || fsloc || 1.08572443701e-20
transitive_rtrancl || Int || 1.08125723252e-20
re || signature || 1.07865796727e-20
pred || k18_cat_6 || 1.06781913066e-20
listMem || [=0 || 1.06255927429e-20
semilattice_axioms || are_anti-isomorphic || 1.04813498221e-20
linorder_sorted || are_isomorphic3 || 1.01578840004e-20
predicate_contains || is_Lipschitzian_on4 || 1.00648352499e-20
neg || LattPOSet || 1.00157414455e-20
pos || LattPOSet || 9.81325806016e-21
member3 || #slash##slash#4 || 9.76088587076e-21
pred_of_seq || * || 9.67670246292e-21
lattic35693393ce_set || are_anti-isomorphic || 9.62350301982e-21
pred || *1 || 9.58193726345e-21
code_Neg || LattPOSet || 9.57510769674e-21
induct_implies || * || 9.54817737265e-21
map || frac0 || 9.36192706312e-21
distinct || are_isomorphic3 || 9.33698604441e-21
none || +14 || 9.2432388032e-21
code_Pos || LattPOSet || 9.22665124741e-21
groups1716206716st_set || is_succ_homomorphism || 9.16314153694e-21
upt || pi_1 || 9.11698169449e-21
empty || Concept-with-all-Attributes || 8.92100349962e-21
complex2 || FreeUnivAlgZAO || 8.83011255744e-21
id || id5 || 8.74554786827e-21
int || INT.Group1 || 8.61044556203e-21
semilattice || is_right_differentiable_in || 8.42474408852e-21
semilattice || is_left_differentiable_in || 8.42474408852e-21
complex2 || =>5 || 8.20631583879e-21
code_Suc || succ1 || 7.86311616526e-21
nil || +14 || 7.8063562222e-21
nil || SIMPLEGRAPHS || 7.6648403094e-21
inc || succ1 || 7.56887385633e-21
set_option || * || 7.386731462e-21
bit0 || intloc || 7.09541460258e-21
semilattice_axioms || is_Lcontinuous_in || 6.89198368497e-21
semilattice_axioms || is_Rcontinuous_in || 6.89198368497e-21
rev || -20 || 6.77657591032e-21
re || the_consequent_of || 6.6808822185e-21
append || abs4 || 6.63368887033e-21
append || 0c1 || 6.59259004793e-21
nat || INT.Group1 || 6.53792905509e-21
set || SmallestPartition || 6.35284776811e-21
induct_implies || \&\2 || 6.3454515541e-21
bitM || ~0 || 6.32418342018e-21
member3 || is_Lipschitzian_on6 || 6.12614339838e-21
member3 || is_Lipschitzian_on5 || 6.12614339838e-21
trans || is_finer_than || 6.10496235127e-21
groups828474808id_set || is_homomorphism1 || 5.65924589219e-21
set2 || * || 5.64680106163e-21
code_nat_of_natural || alef || 5.58829947866e-21
im || the_left_side_of || 5.53844007902e-21
bit1 || LattPOSet || 5.44376063962e-21
cons || #quote##bslash##slash##quote#3 || 5.43881380487e-21
groups387199878d_list || is_homomorphism1 || 5.2545198361e-21
semilattice || are_isomorphic6 || 5.18187823184e-21
complex2 || FreeUnivAlgNSG || 5.04690293179e-21
lattic2109816131tr_set || congr0 || 4.94676062262e-21
is_empty || ~= || 4.78579491702e-21
divmod_nat || k5_msafree4 || 4.7071382797e-21
code_nat_of_natural || UNIVERSE || 4.68812939053e-21
suc || nextcard || 4.65157299038e-21
comm_monoid || is_an_accumulation_point_of || 4.65008108784e-21
comm_monoid || is_succ_homomorphism || 4.54234325087e-21
removeAll || #bslash##slash# || 4.49898299658e-21
map_option || .12 || 4.48036104486e-21
bot_bot || k18_cat_6 || 4.37765398689e-21
groups387199878d_list || is_a_condensation_point_of || 4.30850204415e-21
nat_of_num || alef || 4.29187832168e-21
dropWhile || #bslash##slash# || 4.20688922126e-21
pred || k19_cat_6 || 4.20484649762e-21
remove1 || #bslash##slash# || 4.18823123876e-21
monoid || Top\ || 4.16579097757e-21
wf || is_finer_than || 4.12933781515e-21
takeWhile || #bslash##slash# || 4.09173823521e-21
empty || {$} || 3.98826396835e-21
comm_monoid_axioms || is_homomorphism1 || 3.9709894781e-21
finite_finite2 || r2_cat_6 || 3.93653825041e-21
suc || Tarski-Class || 3.92456745763e-21
drop || #bslash##slash# || 3.89696576127e-21
distinct || is_SetOfSimpleGraphs_of || 3.88461137473e-21
contained || c=5 || 3.84881608766e-21
comm_monoid || is_an_UPS_retraction_of || 3.83926654491e-21
take || #bslash##slash# || 3.80895275718e-21
semilattice_neutr || Top\ || 3.74537566149e-21
cons || =>4 || 3.74077020957e-21
filter2 || #bslash##slash# || 3.73927023985e-21
induct_conj || \xor\ || 3.71303852465e-21
nat_of_num || UNIVERSE || 3.68384960127e-21
set2 || `5 || 3.65684704295e-21
abel_semigroup || is_Lcontinuous_in || 3.59598917266e-21
abel_semigroup || is_Rcontinuous_in || 3.59598917266e-21
member3 || is_continuous_on8 || 3.51905121213e-21
monoid || Bot\ || 3.49773743541e-21
semila478527537_order || #slash##slash#0 || 3.48394437766e-21
im || CutLastLoc || 3.46212030002e-21
set || k18_cat_6 || 3.43425442897e-21
map || .12 || 3.40264503139e-21
groups387199878d_list || are_divergent<=1_wrt || 3.3534684199e-21
lattic35693393ce_set || is_Lcontinuous_in || 3.2811975714e-21
lattic35693393ce_set || is_Rcontinuous_in || 3.2811975714e-21
null2 || is_SetOfSimpleGraphs_of || 3.26990943773e-21
finite_psubset || {..}1 || 3.24615573862e-21
semilattice_neutr || Bot\ || 3.18593481613e-21
complex2 || stop || 3.18287867681e-21
insert3 || #quote##slash##bslash##quote# || 3.12806206788e-21
induct_conj || \or\3 || 3.06001712439e-21
semilattice || are_dual || 2.95574869652e-21
append || +26 || 2.91293755009e-21
semiri1062155398ct_rel semiri882458588ct_rel || VLabelSelector 7 || 2.89599146079e-21
groups_monoid_list || is_an_accumulation_point_of || 2.71259019996e-21
divmod_nat_rel || |=4 || 2.71051413439e-21
id2 || StoneBLattice || 2.69380400591e-21
groups387199878d_list || is_a_retraction_of || 2.68410518297e-21
semilattice_neutr || is_a_condensation_point_of || 2.63340961856e-21
groups_monoid_list || Top || 2.59291210038e-21
semilattice_axioms || are_equivalent1 || 2.57182873204e-21
suc || bool0 || 2.5517175844e-21
comm_monoid || are_divergent_wrt || 2.51980469035e-21
pcr_literal cr_literal || 0_NN VertexSelector 1 || 2.48671167205e-21
insert3 || #quote##bslash##slash##quote#3 || 2.43901651224e-21
semilattice || is_metric_of || 2.31793127889e-21
groups828474808id_set || |-|0 || 2.29664820141e-21
nat_of_num || Rank || 2.25815912236e-21
groups387199878d_list || are_convergent<=1_wrt || 2.22750688191e-21
lattic1543629303tr_set || Top || 2.19840005983e-21
empty || SIMPLEGRAPHS || 2.18602394629e-21
id_on || lcm || 2.17905268224e-21
groups1716206716st_set || is_an_universal_closure_of || 2.13442496032e-21
groups_monoid_list || Bottom || 2.12988863319e-21
code_nat_of_natural || Rank || 2.04609310842e-21
re || card || 1.99857353021e-21
groups_monoid_list || is_an_UPS_retraction_of || 1.98492845146e-21
distinct || -20 || 1.90824557951e-21
semilattice_neutr || are_divergent<=1_wrt || 1.89849993223e-21
lattic1543629303tr_set || Bottom || 1.83110375107e-21
trans || divides0 || 1.80521197905e-21
map_tailrec || mod || 1.75425927266e-21
semilattice_neutr || is_a_retraction_of || 1.74672724523e-21
find || |^1 || 1.70291871894e-21
groups_monoid_list || are_divergent_wrt || 1.64934302395e-21
abel_semigroup || are_equivalent1 || 1.6300123145e-21
monoid || is_a_condensation_point_of || 1.61498104621e-21
comm_monoid || are_convergent_wrt || 1.58115072078e-21
comm_monoid || is_derivable_from || 1.53886440237e-21
cons || .pathBetween || 1.53384248122e-21
lattic35693393ce_set || are_equivalent1 || 1.52230109328e-21
order_well_order_on || r7_absred_0 || 1.51617060904e-21
finite_psubset || -SUP_category || 1.51194788694e-21
id2 || StoneLatt || 1.45920255914e-21
finite_finite2 || ~= || 1.4434919752e-21
induct_implies || *\5 || 1.43562043631e-21
nil || k2_nbvectsp || 1.41540848154e-21
set || k19_cat_6 || 1.39604778416e-21
fun_is_measure || ex_sup_of || 1.38274615077e-21
groups1716206716st_set || <==>1 || 1.37713914652e-21
removeAll || *\3 || 1.36838865928e-21
append || +93 || 1.35999366465e-21
append || +74 || 1.35999366465e-21
antisym || are_isomorphic1 || 1.34323699007e-21
measure || MSSign0 || 1.3332082326e-21
sym || are_isomorphic1 || 1.32510718993e-21
rotate || +26 || 1.32027623084e-21
comm_monoid || is_an_universal_closure_of || 1.31123383441e-21
monoid || are_divergent<=1_wrt || 1.27895291316e-21
groups387199878d_list || |-|0 || 1.25230882811e-21
comm_monoid || are_coplane || 1.25080142117e-21
semilattice_neutr || are_convergent<=1_wrt || 1.25069889638e-21
one2 || VERUM2 || 1.24777897665e-21
order_well_order_on || r13_absred_0 || 1.2445294579e-21
order_well_order_on || r12_absred_0 || 1.2445294579e-21
gen_length || .75 || 1.2294097195e-21
semilattice || ~= || 1.21662473635e-21
pcr_real cr_real || 0_NN VertexSelector 1 || 1.21619336227e-21
member3 || [=0 || 1.20460684802e-21
groups387199878d_list || ==>1 || 1.17329276203e-21
pred_option || is_dependent_of || 1.16402095222e-21
induct_conj || +40 || 1.14711147054e-21
semilattice_axioms || is_a_pseudometric_of || 1.14318563486e-21
pcr_rat cr_rat || 0_NN VertexSelector 1 || 1.12097310096e-21
nil || card0 || 1.11989882699e-21
trans || are_isomorphic1 || 1.11982391593e-21
union || +26 || 1.09356791357e-21
comm_monoid_axioms || |-|0 || 1.08105083169e-21
none || 1_ || 1.07211557874e-21
hd || .first() || 1.04949994978e-21
groups828474808id_set || is_a_condensation_point_of || 1.04711169633e-21
groups_monoid_list || are_convergent_wrt || 1.0461488446e-21
pcr_int cr_int || 0_NN VertexSelector 1 || 1.0370920855e-21
bNF_Ca1811156065der_on || r5_absred_0 || 1.02960136125e-21
complex2 || GroupVect || 1.00966568673e-21
sin_coeff || args || 1.00903921922e-21
rotate || <=>3 || 9.76508416986e-22
filter2 || *\3 || 9.708587538e-22
nil || Bot || 9.63314640763e-22
comm_monoid || <==>1 || 9.61702570784e-22
monoid || is_a_retraction_of || 9.58692020153e-22
wf || can_be_characterized_by || 9.47032888773e-22
bNF_Wellorder_wo_rel || c= || 9.45502585833e-22
semiri1062155398ct_rel semiri882458588ct_rel || ELabelSelector 6 || 9.36115631161e-22
bNF_Ca1811156065der_on || r1_absred_0 || 9.29172211337e-22
removeAll || *112 || 9.2660347243e-22
removeAll || *140 || 9.2660347243e-22
semilattice_axioms || are_equivalent || 9.23508115673e-22
map || div0 || 9.23421337495e-22
antisym || divides0 || 8.96129939352e-22
sym || divides0 || 8.87391915005e-22
tl || .last() || 8.87171451724e-22
id2 || abs || 8.80133785821e-22
splice || .75 || 8.71205846227e-22
rotate1 || `5 || 8.59992744032e-22
bit1 || prop || 8.51650863661e-22
monoid || are_convergent<=1_wrt || 8.47582541721e-22
groups_monoid_list || is_derivable_from || 8.13568897409e-22
measures || MSSign0 || 8.08997530325e-22
insert || +26 || 8.0683802235e-22
finite_psubset || denominator0 || 8.05260573637e-22
diffs || adjs0 || 7.98047054692e-22
code_pcr_natural code_cr_natural || 0_NN VertexSelector 1 || 7.84265523804e-22
groups828474808id_set || is_a_retraction_of || 7.83431845637e-22
cnj || FixedUltraFilters || 7.76660621233e-22
cnj || singletons || 7.76660621233e-22
bNF_Ca1811156065der_on || r6_absred_0 || 7.68279113934e-22
semilattice_neutr || ==>1 || 7.5778568793e-22
lattic1543629303tr_set || is_an_accumulation_point_of || 7.55105071193e-22
trans || are_anti-isomorphic || 7.46729270879e-22
groups_monoid_list || k3_prefer_1 || 7.34629699526e-22
abel_semigroup || is_a_pseudometric_of || 7.34624861776e-22
c_Predicate_Oeq || are_not_conjugated0 || 7.24777705803e-22
c_Predicate_Oeq || are_not_conjugated1 || 7.24777705803e-22
c_Predicate_Oeq || is_parallel_to || 7.24777705803e-22
append || .75 || 7.05760350786e-22
monoid_axioms || is_an_accumulation_point_of || 7.01775644041e-22
cons || #quote##slash##bslash##quote#2 || 6.96295929022e-22
groups387199878d_list || |=7 || 6.94557375379e-22
groups387199878d_list || #slash##slash#8 || 6.93517345278e-22
set2 || inf || 6.89538217974e-22
lattic35693393ce_set || is_a_pseudometric_of || 6.87301432723e-22
monoid || k2_prefer_1 || 6.84286588285e-22
nat || VLabelSelector 7 || 6.67906518546e-22
fun_is_measure || <= || 6.53471199485e-22
groups828474808id_set || are_divergent<=1_wrt || 6.43709008738e-22
bit0 || prop || 6.12570246127e-22
wf || are_anti-isomorphic || 6.0813880099e-22
groups387199878d_list || are_critical_wrt || 6.06378741811e-22
comm_monoid || |-2 || 6.0022927972e-22
member3 || is_>=_than || 5.94184439816e-22
filter2 || *112 || 5.88816720761e-22
filter2 || *140 || 5.88816720761e-22
bNF_Wellorder_wo_rel || commutes_with0 || 5.88802802948e-22
bNF_Wellorder_wo_rel || OrthoComplement_on || 5.88802802948e-22
order_well_order_on || r11_absred_0 || 5.80376398879e-22
comm_monoid || [= || 5.7304227328e-22
groups_monoid_list || are_coplane || 5.66991008133e-22
lattic1543629303tr_set || is_an_UPS_retraction_of || 5.57560874862e-22
cnj || SmallestPartition || 5.5733761133e-22
im || 0. || 5.55357902113e-22
implode str || 0_NN VertexSelector 1 || 5.54337489062e-22
bNF_Ca1495478003natLeq || 10 || 5.52850046188e-22
semilattice || is_differentiable_in0 || 5.52292773754e-22
set || -INF_category || 5.44372513588e-22
trans || are_relative_prime || 5.41318641764e-22
splice || \xor\3 || 5.375406263e-22
bNF_Ca1811156065der_on || r2_absred_0 || 5.28914041359e-22
semilattice || Top\ || 5.20942702953e-22
abel_semigroup || are_equivalent || 5.12102884409e-22
finite_psubset || denominator || 5.08739220275e-22
rep_filter || id$0 || 4.93466766625e-22
rep_filter || id$1 || 4.93466766625e-22
semilattice || partially_orders || 4.8552780355e-22
bNF_Ca646678531ard_of || k5_msafree4 || 4.84047585408e-22
monoid_axioms || is_an_UPS_retraction_of || 4.83766920031e-22
induct_implies || *\18 || 4.79269422455e-22
rep_filter || ID0 || 4.79151463675e-22
semilattice_neutr || #slash##slash#8 || 4.78652921812e-22
id2 || -0 || 4.71590836103e-22
lattic35693393ce_set || are_equivalent || 4.7078828062e-22
lattic1543629303tr_set || are_divergent_wrt || 4.61871082628e-22
cnj || Fin || 4.55567661893e-22
code_pcr_integer code_cr_integer || 0_NN VertexSelector 1 || 4.55519971354e-22
semilattice || Bot\ || 4.46209991277e-22
less_than || 10 || 4.43460894744e-22
groups_monoid_list || D-Meet || 4.41936148528e-22
groups_monoid_list || D-Union || 4.41936148528e-22
predicate_contains || is_continuous_on8 || 4.41465394808e-22
monoid_axioms || are_divergent_wrt || 4.38568107284e-22
comm_monoid || << || 4.31133829734e-22
bNF_Ca1811156065der_on || r3_absred_0 || 4.23964221108e-22
wf || are_relative_prime || 4.22869277351e-22
monoid || ==>1 || 4.22795984962e-22
append || \xor\3 || 4.2173984533e-22
contained || is_finer_than0 || 4.19469362769e-22
groups828474808id_set || are_convergent<=1_wrt || 4.14152094409e-22
semilattice_neutr || |=7 || 4.13808712718e-22
nil || ZERO || 4.1099173725e-22
induct_conj || +84 || 4.09503692955e-22
cnj || id1 || 4.03550279965e-22
transitive_trancl || lcm || 3.98367080147e-22
antisym || QuasiOrthoComplement_on || 3.88048716874e-22
antisym || commutes-weakly_with || 3.88048716874e-22
transitive_rtrancl || lcm || 3.74941940407e-22
groups_monoid_list || |-2 || 3.67857623458e-22
semiri1062155398ct_rel semiri882458588ct_rel || WeightSelector 5 || 3.56413942651e-22
comm_monoid || are_convertible_wrt || 3.54264798321e-22
real || MaxConstrSign || 3.54255552922e-22
cos_coeff || op0 {} || 3.49643645395e-22
comm_monoid || Top\ || 3.47830507269e-22
semilattice_neutr || k2_prefer_1 || 3.3618307337e-22
semilattice_neutr || are_critical_wrt || 3.29901849431e-22
groups828474808id_set || ==>1 || 3.29737011418e-22
order_well_order_on || r3_absred_0 || 3.25954357179e-22
monoid || the_value_of || 3.23191423621e-22
lattic1543629303tr_set || k3_prefer_1 || 3.22483568174e-22
none || %O || 3.213268856e-22
lattic35693393ce_set || Top || 3.16671173846e-22
nil || I_el || 3.16603665642e-22
single || wayabove || 3.12518434914e-22
trans || ex_inf_of || 3.10422223199e-22
comm_monoid || Bot\ || 3.04868890838e-22
cnj || +46 || 2.98601556625e-22
gen_length || +26 || 2.95286937594e-22
lattic1543629303tr_set || are_convergent_wrt || 2.95232099354e-22
set2 || -20 || 2.9518061456e-22
trans || QuasiOrthoComplement_on || 2.94775205372e-22
trans || commutes-weakly_with || 2.94775205372e-22
pred3 || .:13 || 2.91962728968e-22
semilattice_axioms || is_continuous_in5 || 2.85213560852e-22
monoid_axioms || are_convergent_wrt || 2.77100026774e-22
none || SmallestPartition || 2.76443746214e-22
set || numerator0 || 2.75840543823e-22
is_none || |-6 || 2.72353182424e-22
bNF_Ca1811156065der_on || r10_absred_0 || 2.70999879521e-22
groups1716206716st_set || are_divergent<=1_wrt || 2.6975770955e-22
set2 || -48 || 2.68865990178e-22
semilattice_axioms || quasi_orders || 2.66497521654e-22
lattic35693393ce_set || Bottom || 2.6595549383e-22
groups_monoid_list || k1_rvsum_3 || 2.65195922554e-22
monoid || |=7 || 2.62059636964e-22
bNF_Wellorder_wo_rel || are_opposite || 2.5817859003e-22
monoid || CLD-Union || 2.55644366392e-22
monoid || OPD-Union || 2.55644366392e-22
monoid || CLD-Meet || 2.55644366392e-22
monoid || OPD-Meet || 2.55644366392e-22
splice || +26 || 2.5426941834e-22
transitive_acyclic || are_dual || 2.53201791662e-22
id_on || uparrow0 || 2.47314148009e-22
bNF_Ca1811156065der_on || r11_absred_0 || 2.45039396e-22
groups_monoid_list || are_convertible_wrt || 2.43113382182e-22
trans || ex_sup_of || 2.38495817989e-22
eval || is_>=_than || 2.38014966396e-22
groups828474808id_set || #slash##slash#8 || 2.37048246499e-22
set2 || Rnk || 2.35742918359e-22
semilattice_neutr || the_value_of || 2.35636321414e-22
lattic1543629303tr_set || is_derivable_from || 2.33104338361e-22
pred3 || .:14 || 2.3106884365e-22
monoid || #slash##slash#8 || 2.30684354105e-22
monoid || are_critical_wrt || 2.2819459136e-22
eval || .:14 || 2.27050315796e-22
abs_filter || dom10 || 2.2637151637e-22
abs_filter || cod6 || 2.2637151637e-22
abs_filter || dom9 || 2.2637151637e-22
abs_filter || cod7 || 2.2637151637e-22
empty || {}0 || 2.2408821315e-22
trans || are_relative_prime0 || 2.22302807615e-22
set || numerator || 2.20511214073e-22
pred_list || \<\ || 2.19615941831e-22
member3 || is_Lipschitzian_on4 || 2.17810440694e-22
listsp || \<\ || 2.16982058395e-22
lattic1543629303tr_set || D-Meet || 2.14298876435e-22
lattic1543629303tr_set || D-Union || 2.14298876435e-22
bNF_Ca1811156065der_on || r8_absred_0 || 2.13851780623e-22
groups1716206716st_set || are_convergent<=1_wrt || 2.11081393933e-22
rotate1 || Span || 2.10714077452e-22
is_filter || c= || 2.09250909656e-22
bNF_Ca1811156065der_on || r4_absred_0 || 2.06568622218e-22
fun_is_measure || is_Ulam_Matrix_of || 2.05628202526e-22
order_well_order_on || r10_absred_0 || 2.03595605198e-22
monoid_axioms || is_derivable_from || 1.98948376871e-22
groups387199878d_list || is_unif_conv_on || 1.98942909937e-22
append || +102 || 1.97280611037e-22
id2 || carrier || 1.96910838034e-22
eval || .:13 || 1.96249600221e-22
pred_nat || 10 || 1.96145315257e-22
divmod_nat || GPart || 1.94788212947e-22
wf || are_relative_prime0 || 1.94521423289e-22
id_on || downarrow0 || 1.93679822187e-22
groups828474808id_set || Top || 1.88906406821e-22
abel_semigroup || is_elementary_subsystem_of || 1.88653042477e-22
antisym || is_finer_than || 1.8726121115e-22
single || waybelow || 1.86389478135e-22
rotate1 || 0c0 || 1.86188757598e-22
order_well_order_on || |=4 || 1.85598745864e-22
contained || is_automorphism_of || 1.84735606666e-22
abel_semigroup || is_continuous_in5 || 1.84284410132e-22
comm_monoid || is_point_conv_on || 1.82945700884e-22
abs_filter || cod0 || 1.80291340756e-22
abs_filter || dom3 || 1.80291340756e-22
comm_monoid || is_a_cluster_point_of0 || 1.76790139423e-22
lattic1543629303tr_set || k1_rvsum_3 || 1.76118584117e-22
bNF_Ca1811156065der_on || |=4 || 1.74312717963e-22
lattic35693393ce_set || is_continuous_in5 || 1.72546304437e-22
antisym || tolerates || 1.70836247854e-22
abel_semigroup || quasi_orders || 1.69001876244e-22
product_Unity || the_empty_category || 1.68784932488e-22
remdups || Span || 1.68528669387e-22
antisym || are_relative_prime || 1.67949359105e-22
divmod_nat || *\28 || 1.66578130199e-22
lattic1543629303tr_set || are_coplane || 1.64301033097e-22
groups828474808id_set || Bottom || 1.62622927214e-22
groups_monoid_list || [= || 1.61414411733e-22
rep_filter || id$ || 1.60017373377e-22
lattic35693393ce_set || quasi_orders || 1.57874492627e-22
is_empty2 || k22_pre_poly || 1.56869794772e-22
trans || tolerates || 1.54728245038e-22
bNF_Ca829732799finite || are_relative_prime || 1.54401743783e-22
order_well_order_on || r8_absred_0 || 1.51969685053e-22
groups828474808id_set || |=7 || 1.50878835848e-22
eval || is_>=_than0 || 1.47832661466e-22
code_int_of_integer || sqr || 1.47580483506e-22
groups387199878d_list || c=1 || 1.45192713119e-22
removeAll || *\25 || 1.42838428789e-22
abel_s1917375468axioms || is_Lcontinuous_in || 1.42287822583e-22
abel_s1917375468axioms || is_Rcontinuous_in || 1.42287822583e-22
groups_monoid_list || k2_rvsum_3 || 1.41832062097e-22
groups387199878d_list || > || 1.41337044787e-22
transitive_rtrancl || uparrow0 || 1.37445653022e-22
none || TAUT || 1.36439076662e-22
divmod_nat_rel || is_dependent_of || 1.35016754021e-22
semilattice_neutr || CLD-Union || 1.34105595154e-22
semilattice_neutr || OPD-Union || 1.34105595154e-22
semilattice_neutr || CLD-Meet || 1.34105595154e-22
semilattice_neutr || OPD-Meet || 1.34105595154e-22
order_well_order_on || r4_absred_0 || 1.31330707966e-22
abel_s1917375468axioms || <==>0 || 1.27742037792e-22
rep_filter || ^7 || 1.27529684817e-22
monoid_axioms || are_coplane || 1.2669865334e-22
remdups_adj || Span || 1.25266474732e-22
rotate1 || Sub_not || 1.22940987444e-22
semilattice_neutr || is_unif_conv_on || 1.21949936558e-22
semilattice_neutr || > || 1.2120570148e-22
abel_semigroup || is_right_differentiable_in || 1.20525055925e-22
abel_semigroup || is_left_differentiable_in || 1.20525055925e-22
antisym || ex_inf_of || 1.19993853719e-22
semilattice || is_strictly_convex_on || 1.19714303086e-22
sym || ex_inf_of || 1.18846833e-22
remdups_adj || 0c0 || 1.16792702227e-22
groups1716206716st_set || is_a_condensation_point_of || 1.16785210101e-22
rev || Span || 1.16336818061e-22
semilattice_neutr || c=1 || 1.15310048326e-22
distinct || -48 || 1.15150912184e-22
rev || 0c0 || 1.14774055045e-22
nat2 || Sum || 1.13370079242e-22
groups387199878d_list || _|_2 || 1.11562518698e-22
groups_monoid_list || Domains_of || 1.09249661562e-22
monoid || k2_rvsum_3 || 1.09053669562e-22
groups_monoid_list || is_point_conv_on || 1.07843079902e-22
groups387199878d_list || is_convergent_to || 1.07685619836e-22
transitive_rtrancl || downarrow0 || 1.06673844463e-22
lattic1543629303tr_set || |-2 || 1.0654487732e-22
rotate1 || k24_zmodul02 || 1.05485006475e-22
code_nat_of_natural || min || 1.03753726169e-22
re || *64 || 1.02576273605e-22
groups828474808id_set || are_critical_wrt || 1.00556911786e-22
groups828474808id_set || are_divergent_wrt || 9.98032750126e-23
antisym || ex_sup_of || 9.90980347583e-23
c_Predicate_Oeq || <==> || 9.90238469614e-23
c_Predicate_Oeq || |-4 || 9.90238469614e-23
c_Predicate_Oeq || is_derivable_from || 9.90238469614e-23
bNF_Ca1811156065der_on || r13_absred_0 || 9.82175587166e-23
sym || ex_sup_of || 9.82025392298e-23
set2 || `23 || 9.77505887491e-23
lattic1543629303tr_set || k2_rvsum_3 || 9.7357764583e-23
groups1716206716st_set || are_critical_wrt || 9.70345465604e-23
rep_filter || ConsecutiveSet2 || 9.59223296925e-23
rep_filter || ConsecutiveSet || 9.59223296925e-23
distinct || Rnk || 9.56434105297e-23
comm_monoid || are_ldependent2 || 9.52118730513e-23
monoid_axioms || |-2 || 9.48133139423e-23
comm_monoid || are_divergent<=1_wrt || 9.31558602594e-23
filter2 || *\25 || 9.15715939097e-23
null || {..}3 || 8.69674034271e-23
set2 || UnitBag || 8.69288549819e-23
groups387199878d_list || are_divergent_wrt || 8.68846942387e-23
antisym || are_anti-isomorphic || 8.67367460179e-23
pred_option || |-5 || 8.58609357754e-23
comm_monoid_axioms || <=1 || 8.33220793805e-23
set2 || k18_zmodul02 || 8.21035093671e-23
groups_monoid_list || is_a_cluster_point_of0 || 8.11229279791e-23
semigroup || <==>0 || 8.0068718714e-23
code_Nat || |....| || 7.76284764345e-23
empty || id1 || 7.63952770232e-23
bNF_Ca646678531ard_of || *\28 || 7.59249759693e-23
semilattice_neutr || k2_rvsum_3 || 7.5587199343e-23
groups828474808id_set || c=1 || 7.47603721572e-23
is_none || are_isomorphic6 || 7.46919856665e-23
groups828474808id_set || are_convergent_wrt || 7.4668885961e-23
semilattice_neutr || is_convergent_to || 7.44887933815e-23
monoid || is_unif_conv_on || 7.42795449159e-23
divmod_nat_rel || is_S-limit_of || 7.40813367193e-23
remdups || 0c0 || 7.31114866241e-23
code_n1042895779nteger || |....| || 7.25763255744e-23
semigroup || is_Lcontinuous_in || 7.24457944181e-23
semigroup || is_Rcontinuous_in || 7.24457944181e-23
id2 || id3 || 7.16850914513e-23
abs_filter || dom6 || 7.12802205486e-23
abs_filter || cod3 || 7.12802205486e-23
re || <k>0 || 7.127401584e-23
groups828474808id_set || > || 7.08802722089e-23
groups828474808id_set || <=1 || 7.0819746586e-23
comm_monoid || are_convergent<=1_wrt || 7.0798188262e-23
transitive_trancl || uparrow || 6.99943316524e-23
lattic1543629303tr_set || are_convertible_wrt || 6.99891984826e-23
semilattice_neutr || _|_2 || 6.77511909411e-23
remdups_adj || Sub_not || 6.50392118468e-23
groups387199878d_list || are_convergent_wrt || 6.47912136387e-23
groups_monoid_list || << || 6.41357721362e-23
divmod_nat || ConstantNet || 6.3864617385e-23
monoid_axioms || are_convertible_wrt || 6.35089336e-23
nil || ID || 6.31794425606e-23
transitive_trancl || uparrow0 || 6.16725728934e-23
fun_is_measure || is_cofinal_with || 6.11495407124e-23
rev || Sub_not || 6.06988605346e-23
groups828474808id_set || is_an_accumulation_point_of || 5.96338110933e-23
induct_implies || *` || 5.90450877344e-23
induct_conj || +` || 5.77524746685e-23
divmod_nat_rel || [=1 || 5.72526516574e-23
groups_monoid_list || are_ldependent2 || 5.71489618458e-23
transitive_trancl || downarrow || 5.63486039049e-23
remdups_adj || k24_zmodul02 || 5.55212588814e-23
bNF_Ca646678531ard_of || GPart || 5.50187708141e-23
gen_length || +38 || 5.27745780698e-23
im || max-1 || 5.27001484613e-23
monoid || Open_Domains_of || 5.20708067676e-23
monoid || Closed_Domains_of || 5.20708067676e-23
comm_monoid || is_a_condensation_point_of || 5.19187989418e-23
semilattice_axioms || is_convex_on || 5.18769826151e-23
rev || k24_zmodul02 || 5.17461158941e-23
image || .9 || 5.17120272265e-23
rotate1 || -77 || 5.12551363964e-23
transitive_trancl || core || 5.06575203444e-23
set || center0 || 4.99950691698e-23
groups387199878d_list || is_an_accumulation_point_of || 4.93693327859e-23
distinct || `23 || 4.92150822082e-23
lattic1543629303tr_set || [= || 4.83793297385e-23
lattic1543629303tr_set || Domains_of || 4.83403354058e-23
transitive_trancl || downarrow0 || 4.7159492512e-23
none || Concretized || 4.69916621119e-23
groups828474808id_set || is_unif_conv_on || 4.6056712264e-23
code_Nat || k19_finseq_1 || 4.58113467372e-23
insert3 || All1 || 4.53371859483e-23
re || max+1 || 4.45231694921e-23
trans || emp || 4.37608756224e-23
take || EqClass0 || 4.33958653316e-23
id_on || +84 || 4.29869996841e-23
monoid || _|_2 || 4.1798743923e-23
wf || is_proper_subformula_of0 || 4.1633514989e-23
distinct || k18_zmodul02 || 4.1474653537e-23
finite_psubset || 1_ || 4.12936554935e-23
set2 || Carrier1 || 4.12233468694e-23
code_n1042895779nteger || k19_finseq_1 || 4.08576327384e-23
id_on || k5_msafree4 || 4.06900369379e-23
rep_filter || ^0 || 4.04429990426e-23
hd || -48 || 4.01903474792e-23
code_nat_of_natural || dom0 || 4.00240444971e-23
member3 || |- || 3.96225459018e-23
drop || <=>3 || 3.94192525657e-23
code_int_of_integer || succ0 || 3.91878743276e-23
complex2 || 1-Alg || 3.9042510509e-23
null || is_embedded_in || 3.90161624629e-23
splice || +38 || 3.89269486922e-23
comm_monoid || is_often_in || 3.83953932985e-23
groups1716206716st_set || |=7 || 3.79365564858e-23
comm_monoid_axioms || are_divergent_wrt || 3.76589101422e-23
butlast || `5 || 3.72235386237e-23
nat2 || Seg || 3.69173937951e-23
append || +38 || 3.67601845028e-23
abel_semigroup || is_convex_on || 3.61707695795e-23
monoid || is_convergent_to || 3.60316550244e-23
divmod_nat || ++ || 3.60015331537e-23
groups828474808id_set || is_convergent_to || 3.59843783623e-23
comm_monoid || is_applicable_to1 || 3.56298183775e-23
rep_filter || #bslash##slash#0 || 3.54547141039e-23
remdups || Sub_not || 3.51575382602e-23
monoid || c=1 || 3.45097410095e-23
bNF_Ca1811156065der_on || r12_absred_0 || 3.44591021219e-23
lattic35693393ce_set || is_convex_on || 3.41974242742e-23
contained || is_a_root_of || 3.39015047522e-23
hd || Rnk || 3.37864673953e-23
semilattice || the_value_of || 3.32857509281e-23
groups387199878d_list || is_properly_applicable_to || 3.30231938274e-23
lattic1543629303tr_set || << || 3.22534118059e-23
lattic1543629303tr_set || is_point_conv_on || 3.2066402107e-23
is_empty || are_equipotent || 3.12456857226e-23
is_empty || are_isomorphic || 3.0548592032e-23
groups1716206716st_set || is_a_retraction_of || 3.02796443793e-23
remdups || k24_zmodul02 || 2.98332193955e-23
finite_psubset || 0. || 2.97077948699e-23
comm_monoid || are_critical_wrt || 2.94477363766e-23
cnj || +45 || 2.94324226674e-23
groups828474808id_set || are_convertible_wrt || 2.94033194548e-23
trans || <1 || 2.92541190167e-23
comm_monoid_axioms || is_an_accumulation_point_of || 2.91983999531e-23
comm_monoid || <=\ || 2.90821962429e-23
groups_monoid_list || Domains_Lattice || 2.90551793222e-23
fun_is_measure || are_c=-comparable || 2.89126289718e-23
im || MSAlg0 || 2.87521086944e-23
pred3 || opp1 || 2.85014453592e-23
re || MSSign || 2.80674353681e-23
remdups_adj || -77 || 2.75718081592e-23
trans || in0 || 2.7398212123e-23
divmod_nat_rel || < || 2.72308298616e-23
monoid_axioms || is_point_conv_on || 2.71326341556e-23
comm_monoid_axioms || are_convergent_wrt || 2.69273084562e-23
equiv_equivp || is_elementary_subsystem_of || 2.68313925701e-23
bot_bot || RelIncl || 2.67434122217e-23
product_unit || -infty0 || 2.67404229931e-23
bot_bot || Vertical_Line || 2.65206459227e-23
abel_semigroup || are_isomorphic6 || 2.62147514331e-23
rev || -77 || 2.58593589517e-23
groups387199878d_list || are_convertible_wrt || 2.53216184602e-23
monoid_axioms || [= || 2.53123362531e-23
lattic35693393ce_set || k1_rvsum_3 || 2.52457202e-23
wf || in0 || 2.49150872852e-23
pred || Ids || 2.48997717565e-23
semilattice_neutr || Open_Domains_of || 2.48578676029e-23
semilattice_neutr || Closed_Domains_of || 2.48578676029e-23
product_Unity || +infty0 || 2.48538428212e-23
groups828474808id_set || _|_2 || 2.48321963283e-23
lattic1543629303tr_set || is_a_cluster_point_of0 || 2.45358160759e-23
complex2 || - || 2.42758728548e-23
order_well_order_on || is_dependent_of || 2.35416022141e-23
lattic35693393ce_set || D-Meet || 2.35409066476e-23
lattic35693393ce_set || D-Union || 2.35409066476e-23
semilattice || c= || 2.33138768966e-23
refl_on || |=4 || 2.32392224813e-23
empty || 0_. || 2.28955914895e-23
groups1716206716st_set || << || 2.28802702824e-23
c_Predicate_Oeq || are_not_conjugated || 2.27797295876e-23
c_Predicate_Oeq || |-0 || 2.27797295876e-23
lexordp_eq || is_collinear0 || 2.21944466146e-23
bNF_Ca1811156065der_on || is_dependent_of || 2.20940962379e-23
semilattice_neutr || is_properly_applicable_to || 2.13567501542e-23
id2 || Concretized || 2.12074153163e-23
eval || opp || 2.10779300007e-23
nil || the_Field_of_Quotients || 2.06007616034e-23
distinct || Carrier1 || 2.04337887199e-23
default_default || |....|2 || 2.0292849409e-23
is_none || divides0 || 2.0274954189e-23
groups828474808id_set || is_an_UPS_retraction_of || 2.01716890929e-23
groups387199878d_list || is_eventually_in || 2.00277352485e-23
order_well_order_on || [=1 || 1.98240470769e-23
groups_monoid_list || is_applicable_to1 || 1.92886087341e-23
bNF_Ca1811156065der_on || [=1 || 1.90530920655e-23
abel_s1917375468axioms || are_equivalent1 || 1.89620831248e-23
single || [:..:] || 1.86290157848e-23
corec_complex || -0 || 1.80803754133e-23
measure || WFF || 1.80752632733e-23
monoid_axioms || is_a_cluster_point_of0 || 1.79664255551e-23
groups1716206716st_set || ==>1 || 1.78391331132e-23
monoid || > || 1.77526290152e-23
rep_filter || .walkOf0 || 1.72673624012e-23
lattic1543629303tr_set || are_ldependent2 || 1.71672354506e-23
bNF_Ca646678531ard_of || ++ || 1.69106639485e-23
comm_monoid || is_a_retraction_of || 1.65370892839e-23
groups828474808id_set || |-2 || 1.62671087167e-23
pred3 || opp || 1.6162508619e-23
hd || `23 || 1.60894795421e-23
pred || `1 || 1.60043457497e-23
comm_monoid || the_value_of || 1.59893023863e-23
semilattice || k2_prefer_1 || 1.59760683061e-23
groups_monoid_list || is_often_in || 1.5846658802e-23
abel_s1917375468axioms || are_equivalent || 1.58190604327e-23
comm_monoid || is_continuous_in2 || 1.56877263213e-23
groups387199878d_list || is_an_UPS_retraction_of || 1.55404503134e-23
lattic35693393ce_set || k3_prefer_1 || 1.52370014863e-23
comm_monoid || |=7 || 1.51171561723e-23
eval || opp1 || 1.50650916727e-23
measures || WFF || 1.49681206932e-23
measure || \or\4 || 1.49182602869e-23
remdups || -77 || 1.48966087205e-23
nil || (0).0 || 1.48211320297e-23
re || `12 || 1.46995280521e-23
semilattice || CLD-Union || 1.45472320968e-23
semilattice || OPD-Union || 1.45472320968e-23
semilattice || CLD-Meet || 1.45472320968e-23
semilattice || OPD-Meet || 1.45472320968e-23
monoid || Open_Domains_Lattice || 1.45275896611e-23
monoid || Closed_Domains_Lattice || 1.45275896611e-23
semilattice_neutr || is_eventually_in || 1.44690031211e-23
im || `4_4 || 1.43931296094e-23
monoid_axioms || are_ldependent2 || 1.43900947076e-23
abel_semigroup || ~= || 1.43737157604e-23
groups387199878d_list || divides1 || 1.42480331618e-23
groups387199878d_list || is_differentiable_in5 || 1.38474425238e-23
lattic1543629303tr_set || Domains_Lattice || 1.38162940412e-23
lattic35693393ce_set || k2_rvsum_3 || 1.3698574854e-23
hd || k18_zmodul02 || 1.35189473006e-23
groups387199878d_list || |-2 || 1.32783673727e-23
semiri1062155398ct_rel semiri882458588ct_rel || TargetSelector 4 || 1.32645615075e-23
equiv_part_equivp || <==>0 || 1.30248043086e-23
pcr_literal cr_literal || VLabelSelector 7 || 1.29531393562e-23
measures || \or\4 || 1.27240288525e-23
antisym || <1 || 1.22589660434e-23
set2 || Intersection || 1.22275723717e-23
sym || <1 || 1.21518551227e-23
monoid || is_properly_applicable_to || 1.19786756327e-23
semigroup || are_equivalent1 || 1.19552685407e-23
typerep3 || U+ || 1.18424499841e-23
comm_monoid_axioms || is_an_UPS_retraction_of || 1.1753188183e-23
groups_monoid_list || <=\ || 1.15473175078e-23
rotate1 || Partial_Intersection || 1.14590173567e-23
abel_semigroup || is_metric_of || 1.14250846572e-23
bNF_Ca646678531ard_of || ConstantNet || 1.13381995044e-23
null || is_ringisomorph_to || 1.12239118258e-23
groups828474808id_set || is_derivable_from || 1.11041163576e-23
rep_filter || FS2XFS || 1.0920889968e-23
reflp || <==>0 || 1.08870673032e-23
semilattice || k2_rvsum_3 || 1.08538732885e-23
lexordp2 || Mid || 1.07573589342e-23
finite_finite2 || are_isomorphic || 1.05597272365e-23
semilattice_neutr || divides1 || 1.0433447239e-23
code_nat_of_natural || ppf || 1.04311451763e-23
monoid || <=1 || 1.03410500396e-23
rotate1 || Leading-Monomial || 1.02780978558e-23
groups828474808id_set || k1_rvsum_3 || 1.01322172307e-23
pred3 || ID0 || 1.00648266505e-23
sublist || #slash##bslash#8 || 9.64768256927e-24
set || Ids || 9.61256003748e-24
semila1450535954axioms || -are_equivalent || 9.46100880798e-24
comm_monoid || ==>1 || 9.33512208327e-24
real_Vector_of_real || <*..*>1 || 9.28372392446e-24
semilattice || <N< || 9.22947984257e-24
groups1716206716st_set || is_unif_conv_on || 9.21881615092e-24
comm_monoid_axioms || are_convertible_wrt || 9.16172231492e-24
semilattice_neutr || is_differentiable_in5 || 9.12723759079e-24
complex || 0 || 9.03266103806e-24
semilattice_axioms || is_finer_than || 8.97320066863e-24
none || abs || 8.94221315647e-24
null2 || <= || 8.85521112387e-24
groups828474808id_set || is_properly_applicable_to || 8.74393538185e-24
pred3 || id$0 || 8.7008415102e-24
pred3 || id$1 || 8.7008415102e-24
complex2 || SubgraphInducedBy || 8.59147513101e-24
semigroup || are_equivalent || 8.58316172612e-24
re || Product7 || 8.51425983172e-24
groups387199878d_list || is_derivable_from || 8.4981128449e-24
distinct || is_embedded_in || 8.43968303791e-24
semiring_1_of_nat || Product3 || 8.42020136614e-24
butlast || \&\2 || 8.40078299228e-24
tl || \or\3 || 8.33065940491e-24
groups_monoid_list || is_continuous_in2 || 8.22613775489e-24
abel_s1917375468axioms || is_a_pseudometric_of || 8.22042651912e-24
set2 || len0 || 8.0726833041e-24
antisym || are_isomorphic6 || 8.01654772424e-24
groups_monoid_list || IRR || 8.00262676221e-24
code_natural || Newton_Coeff || 7.98777125697e-24
sym || are_isomorphic6 || 7.91558430804e-24
semilattice_axioms || tolerates || 7.86324347233e-24
splice || +33 || 7.74591743279e-24
order_well_order_on || < || 7.61894731587e-24
monoid || .103 || 7.52317293651e-24
groups828474808id_set || is_eventually_in || 7.48779941868e-24
semilattice_neutr || Open_Domains_Lattice || 7.42069063368e-24
semilattice_neutr || Closed_Domains_Lattice || 7.42069063368e-24
transitive_trancl || +84 || 7.32995023156e-24
c_Predicate_Oeq || is_terminated_by || 7.1937115853e-24
c_Predicate_Oeq || #slash##slash#3 || 7.1937115853e-24
bNF_Ca1811156065der_on || < || 7.1511114506e-24
groups387199878d_list || << || 7.08293818196e-24
id2 || id5 || 6.96104325962e-24
transitive_rtrancl || +84 || 6.91831613252e-24
remdups_adj || Partial_Intersection || 6.85904024562e-24
char2 || U+ || 6.81645854357e-24
order_well_order_on || is_S-limit_of || 6.8159588968e-24
trans || are_isomorphic6 || 6.75732514924e-24
hd || Carrier1 || 6.70647166648e-24
finite_finite2 || are_equipotent || 6.68153631185e-24
rev || Partial_Intersection || 6.64360892608e-24
comm_monoid_axioms || |-2 || 6.63709720888e-24
semilattice_order || -are_isomorphic || 6.62590701228e-24
abel_semigroup || is_finer_than || 6.59925613698e-24
equiv_equivp || is_right_differentiable_in || 6.5726067369e-24
equiv_equivp || is_left_differentiable_in || 6.5726067369e-24
groups1716206716st_set || _|_2 || 6.44814202687e-24
set || `1 || 6.40329205016e-24
rep_filter || CastSeq || 6.32961791349e-24
null || are_isomorphic1 || 6.28434958719e-24
lattic35693393ce_set || is_finer_than || 6.28363178134e-24
monoid || is_eventually_in || 6.28138985603e-24
bNF_Ca1811156065der_on || is_S-limit_of || 6.2778015404e-24
re || Mycielskian1 || 6.23613501954e-24
re || Sum19 || 6.22762227178e-24
abs_filter || .first() || 6.18568544741e-24
abs_filter || XFS2FS || 6.10942822096e-24
lattic35693393ce_set || Domains_of || 6.04750314402e-24
comm_monoid_axioms || is_derivable_from || 5.98630130152e-24
abel_semigroup || tolerates || 5.97535726555e-24
lattic1543629303tr_set || is_applicable_to1 || 5.95886385467e-24
top_top || |....|2 || 5.88078706789e-24
groups828474808id_set || k2_rvsum_3 || 5.84585248771e-24
abs_filter || Sub_the_argument_of || 5.84387818178e-24
abs_filter || .last() || 5.83816629196e-24
lattic35693393ce_set || tolerates || 5.71518578217e-24
abs_filter || CastSeq0 || 5.7044270755e-24
image || .12 || 5.70310233315e-24
bot_bot || |....|2 || 5.65002633064e-24
remdups_adj || Leading-Monomial || 5.61382225951e-24
groups828474808id_set || divides1 || 5.53577085076e-24
distinct || Intersection || 5.47664125497e-24
none || -0 || 5.47623500976e-24
pcr_literal cr_literal || ELabelSelector 6 || 5.30796637835e-24
rev || Leading-Monomial || 5.29325276539e-24
semigroup || is_a_pseudometric_of || 5.25524655923e-24
semilattice_neutr || <=1 || 5.24456657685e-24
transitive_rtranclp || is_collinear0 || 5.23607099241e-24
distinct || is_ringisomorph_to || 5.21282732605e-24
groups828474808id_set || D-Meet || 5.07798249206e-24
groups828474808id_set || D-Union || 5.07798249206e-24
nat_of_num || succ0 || 5.04876515414e-24
pos || CompleteSGraph || 5.04378740886e-24
equiv_part_equivp || is_Lcontinuous_in || 4.98907533476e-24
equiv_part_equivp || is_Rcontinuous_in || 4.98907533476e-24
lattic1543629303tr_set || is_often_in || 4.97489203021e-24
listMem || \<\ || 4.96763648932e-24
monoid || is_differentiable_in5 || 4.9573819709e-24
im || union0 || 4.7955716105e-24
comm_monoid || k2_rvsum_3 || 4.71377272548e-24
monoid_axioms || << || 4.66038049774e-24
monoid_axioms || is_applicable_to1 || 4.61880120156e-24
comm_monoid || is_vertex_seq_of || 4.41181511988e-24
groups1716206716st_set || > || 4.39584565508e-24
monoid || divides1 || 4.35719236104e-24
groups828474808id_set || is_point_conv_on || 4.25736064745e-24
comm_monoid || <=1 || 4.25004772266e-24
pcr_real cr_real || VLabelSelector 7 || 4.24706143802e-24
pos || Tempty_e_net || 4.23866357706e-24
single || div0 || 4.21755195645e-24
append || +33 || 4.20990067434e-24
rep_filter || Sub_not || 4.17778042727e-24
semilattice_neutr || .103 || 4.05427139492e-24
eval || are_congruent_mod || 4.0293592868e-24
equiv_equivp || are_anti-isomorphic || 4.00501189766e-24
remdups || Partial_Intersection || 3.96794435666e-24
comm_monoid || is_unif_conv_on || 3.96514177856e-24
distinct || len0 || 3.94386449796e-24
groups387199878d_list || <=1 || 3.9238875228e-24
lattic1543629303tr_set || IRR || 3.91037080771e-24
groups1716206716st_set || #slash##slash#8 || 3.89917095854e-24
null2 || is_embedded_in || 3.89259558711e-24
reflp || is_Lcontinuous_in || 3.89031843406e-24
reflp || is_Rcontinuous_in || 3.89031843406e-24
groups387199878d_list || is_oriented_vertex_seq_of || 3.84443840491e-24
set2 || Lin0 || 3.84046716608e-24
groups828474808id_set || is_differentiable_in5 || 3.8357721215e-24
equiv_equivp || are_isomorphic6 || 3.8084522817e-24
comm_monoid || k2_prefer_1 || 3.77844291197e-24
empty || *1 || 3.77403769163e-24
pcr_rat cr_rat || VLabelSelector 7 || 3.74476878056e-24
transitive_trancl || \&\2 || 3.69670747122e-24
null2 || are_isomorphic1 || 3.66128899757e-24
lattic1543629303tr_set || <=\ || 3.6526831734e-24
comm_monoid || CLD-Union || 3.64292372563e-24
comm_monoid || OPD-Union || 3.64292372563e-24
comm_monoid || CLD-Meet || 3.64292372563e-24
comm_monoid || OPD-Meet || 3.64292372563e-24
cons || pr11 || 3.5547357503e-24
transitive_rtrancl || \#bslash#\ || 3.47756393125e-24
eval || dom10 || 3.47540482214e-24
eval || cod6 || 3.47540482214e-24
eval || dom9 || 3.47540482214e-24
eval || cod7 || 3.47540482214e-24
groups828474808id_set || << || 3.45862307127e-24
bNF_Cardinal_cone || [+] || 3.45030152061e-24
pred3 || id$ || 3.42899895436e-24
eval || cod0 || 3.4277577879e-24
eval || dom3 || 3.4277577879e-24
pcr_int cr_int || VLabelSelector 7 || 3.32183202547e-24
groups387199878d_list || is_point_conv_on || 3.32041350924e-24
bNF_Cardinal_cfinite || computes0 || 3.30513468581e-24
groups828474808id_set || are_coplane || 3.28545020953e-24
empty || k1_numpoly1 || 3.27802955193e-24
monoid_axioms || is_often_in || 3.23766089521e-24
semilattice_neutr || << || 3.1313832423e-24
semilattice || Open_Domains_of || 3.12259798544e-24
semilattice || Closed_Domains_of || 3.12259798544e-24
hd || cod || 3.028211512e-24
remdups || Leading-Monomial || 2.99453105695e-24
rotate1 || Z_Lin || 2.93679173289e-24
groups828474808id_set || k3_prefer_1 || 2.91448874067e-24
abel_semigroup || is_differentiable_in0 || 2.90926665443e-24
abel_semigroup || partially_orders || 2.8815241283e-24
transitive_tranclp || Mid || 2.87732279712e-24
nil || StoneBLattice || 2.83309998755e-24
groups828474808id_set || are_ldependent2 || 2.80605015805e-24
product_unit || Sum_Tran || 2.7804286156e-24
comm_monoid || _|_2 || 2.67983314963e-24
lattic1543629303tr_set || is_continuous_in2 || 2.58685706716e-24
semilattice_neutr || is_oriented_vertex_seq_of || 2.57417823064e-24
abel_semigroup || are_opposite || 2.54771005938e-24
id_on || GPart || 2.53867252248e-24
remdups || Z_Lin || 2.53859564071e-24
comm_monoid || #slash##slash#8 || 2.52611401649e-24
pcr_literal cr_literal || WeightSelector 5 || 2.45896906644e-24
transitive_rtrancl || =>2 || 2.42960164856e-24
set2 || Affin || 2.40434299846e-24
equiv_part_equivp || are_dual || 2.38933716726e-24
cons || B_SUP0 || 2.33841087327e-24
nat_of_num || id6 || 2.3313283964e-24
groups_monoid_list || <=1 || 2.31493919322e-24
abel_s1917375468axioms || quasi_orders || 2.30876283572e-24
id_on || *\28 || 2.3018619559e-24
empty || Lucas || 2.29755775364e-24
groups387199878d_list || are_coplane || 2.29523514879e-24
monoid_axioms || <=\ || 2.29283275972e-24
empty || |....|2 || 2.26190932046e-24
groups_monoid_list || is_vertex_seq_of || 2.26156789245e-24
empty || In_Power || 2.22993388978e-24
abel_s1917375468axioms || are_anti-isomorphic || 2.21821350545e-24
empty || the_Field_of_Quotients || 2.21125839069e-24
abel_s1917375468axioms || is_continuous_in5 || 2.19431912165e-24
empty || StoneBLattice || 2.18420481838e-24
groups387199878d_list || are_ldependent2 || 2.18412414104e-24
semilattice_axioms || meets || 2.1714189092e-24
code_pcr_natural code_cr_natural || VLabelSelector 7 || 2.16364193475e-24
nil || StoneLatt || 2.15001413275e-24
comm_monoid_axioms || are_coplane || 2.09742808863e-24
nat2 || chromatic#hash#0 || 2.07701895445e-24
code_nat_of_integer || .Lifespan() || 2.03167993589e-24
equiv_part_equivp || are_equivalent1 || 1.99012116119e-24
one2 || 1q0 || 1.97853725162e-24
reflp || are_dual || 1.9570445369e-24
nat2 || clique#hash#0 || 1.95650157633e-24
divmod_nat_rel || is_a_normal_form_of || 1.93783761547e-24
monoid_axioms || is_continuous_in2 || 1.92750641467e-24
divmod_nat || nf || 1.92517669116e-24
code_natural_of_nat || -25 || 1.92279163384e-24
lattic35693393ce_set || Domains_Lattice || 1.91818878583e-24
remdups_adj || Z_Lin || 1.91233614194e-24
semilattice || QuasiOrthoComplement_on || 1.87001557111e-24
semilattice || commutes-weakly_with || 1.87001557111e-24
hd || Intersection || 1.8626454619e-24
rev || Z_Lin || 1.84076803359e-24
rotate1 || conv || 1.82076859832e-24
pcr_real cr_real || ELabelSelector 6 || 1.81671735338e-24
distinct || are_isomorphic1 || 1.80786142411e-24
abel_semigroup || meets || 1.79271637274e-24
lattic35693393ce_set || commutes_with0 || 1.78350702378e-24
lattic35693393ce_set || OrthoComplement_on || 1.78350702378e-24
comm_monoid_axioms || is_point_conv_on || 1.77799353532e-24
equiv_equivp || is_metric_of || 1.76144915675e-24
cons || in10 || 1.75345894488e-24
monoid || << || 1.73618441761e-24
lattic35693393ce_set || meets || 1.73542438569e-24
refl_on || is_dependent_of || 1.70607463871e-24
transitive_trancl || =>2 || 1.70401051514e-24
reflp || are_equivalent1 || 1.66664258772e-24
rep_filter || id2 || 1.62150652998e-24
pcr_rat cr_rat || ELabelSelector 6 || 1.60944068854e-24
hd || dom1 || 1.58332421931e-24
complex2 || U+ || 1.56198613342e-24
bNF_Ca646678531ard_of || nf || 1.55091829634e-24
eval || id$0 || 1.47823548568e-24
eval || id$1 || 1.47823548568e-24
code_Suc || sort_d || 1.47775607617e-24
code_Suc || sort_a || 1.47775607617e-24
semigroup || quasi_orders || 1.45109514351e-24
empty || StoneLatt || 1.43665267378e-24
cons || \or\2 || 1.43645361437e-24
pcr_int cr_int || ELabelSelector 6 || 1.43407099603e-24
pos || Sgm00 || 1.43287742873e-24
fun_is_measure || are_equivalent2 || 1.41566998673e-24
semigroup || is_continuous_in5 || 1.40812786466e-24
distinct || Lin0 || 1.4058536298e-24
transitive_rtrancl || \&\2 || 1.38705964121e-24
abs_filter || cod || 1.38330391748e-24
abs_filter || dom1 || 1.38330391748e-24
monoid || is_oriented_vertex_seq_of || 1.36337328416e-24
semigroup || are_anti-isomorphic || 1.35571699519e-24
pos || k19_finseq_1 || 1.34529064026e-24
eval || dom6 || 1.34518160825e-24
eval || cod3 || 1.34518160825e-24
set2 || FinMeetCl || 1.33486768518e-24
hd || len0 || 1.29583904074e-24
implode str || VLabelSelector 7 || 1.27552985564e-24
c_Predicate_Oeq || are_divergent_wrt || 1.27113597237e-24
pow || 1q || 1.25321732359e-24
comm_monoid || > || 1.24169034521e-24
nat2 || .order() || 1.22523285674e-24
null2 || is_ringisomorph_to || 1.22440883154e-24
rep_filter || term4 || 1.20977955776e-24
rep_filter || init0 || 1.20977955776e-24
cons || pr21 || 1.19061409926e-24
transitive_trancl || <=>0 || 1.19051036494e-24
transitive_rtrancl || \nand\ || 1.18460451814e-24
remdups_adj || conv || 1.17590582537e-24
rev || conv || 1.16752002672e-24
bNF_Wellorder_wo_rel || is_elementary_subsystem_of || 1.16523368637e-24
nat2 || entrance || 1.15139117874e-24
nat2 || escape || 1.15139117874e-24
sqr || #quote#31 || 1.11702751827e-24
induct_implies || min3 || 1.1166283903e-24
groups828474808id_set || Domains_of || 1.11443687778e-24
comm_monoid_axioms || are_ldependent2 || 1.1115032321e-24
groups828474808id_set || is_oriented_vertex_seq_of || 1.09600985504e-24
equiv_equivp || ~= || 1.05660385029e-24
semilattice || Open_Domains_Lattice || 1.03064281623e-24
semilattice || Closed_Domains_Lattice || 1.03064281623e-24
tl || deg0 || 1.02843699988e-24
tl || cod || 9.92737314752e-25
groups1716206716st_set || is_properly_applicable_to || 9.88503126915e-25
distinct || Affin || 9.80312943303e-25
induct_conj || max || 9.68514834471e-25
comm_monoid || is_continuous_in0 || 9.56449423088e-25
code_pcr_natural code_cr_natural || ELabelSelector 6 || 9.48964896423e-25
code_pcr_integer code_cr_integer || VLabelSelector 7 || 9.4765322375e-25
induct_implies || max || 9.46224797531e-25
bitM || #quote#31 || 9.32838559426e-25
nat2 || len1 || 9.32820314758e-25
induct_conj || min3 || 9.30547114995e-25
pred3 || dom10 || 9.25208237161e-25
pred3 || cod6 || 9.25208237161e-25
pred3 || dom9 || 9.25208237161e-25
pred3 || cod7 || 9.25208237161e-25
equiv_part_equivp || is_a_pseudometric_of || 9.24727740731e-25
eval || ID0 || 9.03776361315e-25
pcr_real cr_real || WeightSelector 5 || 8.72278127206e-25
groups1716206716st_set || is_convergent_to || 8.69628686496e-25
semiri1062155398ct_rel semiri882458588ct_rel || SourceSelector 3 || 8.56755229257e-25
code_nat_of_natural || P_cos || 8.54363145663e-25
refl_on || [=1 || 8.51818868795e-25
bNF_Ca646678531ard_of || radix || 8.49120987853e-25
suc || sort_d || 8.45015270005e-25
suc || sort_a || 8.45015270005e-25
code_integer_of_int || MCS:CSeq || 8.43029619473e-25
order_well_order_on || is_a_normal_form_of || 8.41064445527e-25
pred_option || |-2 || 8.37415740379e-25
nat2 || len || 8.22501736797e-25
groups_monoid_list || are_unifiable || 8.17393314918e-25
fun_is_measure || are_fiberwise_equipotent || 7.95305587696e-25
lattic1543629303tr_set || > || 7.95228672073e-25
bNF_Ca1811156065der_on || is_a_normal_form_of || 7.85479707544e-25
reflp || is_a_pseudometric_of || 7.77962409759e-25
equiv_part_equivp || are_equivalent || 7.76367656225e-25
pcr_rat cr_rat || WeightSelector 5 || 7.75809568143e-25
code_int_of_integer || P_cos || 7.75739667074e-25
null2 || divides || 7.62907173738e-25
monoid || are_weakly-unifiable || 7.61378532767e-25
groups_monoid_list || elem_in_rel_1 || 7.53309147565e-25
rep_filter || MSSign0 || 7.47904715973e-25
cons || rpoly || 7.47406169051e-25
code_integer_of_int || LexBFS:CSeq || 7.4634157125e-25
code_natural || to_power || 7.45926554633e-25
none || VERUM || 7.37519912791e-25
refl_on || is_S-limit_of || 7.35406835974e-25
lattic1543629303tr_set || is_vertex_seq_of || 7.28699156153e-25
groups387199878d_list || is_differentiable_in3 || 7.25511255708e-25
remdups || conv || 7.15990384831e-25
monoid || elem_in_rel_2 || 7.11719968336e-25
id_on || ConstantNet || 7.09813603585e-25
pcr_int cr_int || WeightSelector 5 || 6.93862754221e-25
groups828474808id_set || is_a_cluster_point_of0 || 6.89076916438e-25
code_integer || to_power || 6.86858758577e-25
comm_monoid || Open_Domains_of || 6.65804646612e-25
comm_monoid || Closed_Domains_of || 6.65804646612e-25
ring_1_of_int || to_power0 || 6.58179509733e-25
is_filter || can_be_characterized_by || 6.53422721268e-25
antisym || <==>0 || 6.45057262442e-25
semiring_1_of_nat || to_power0 || 6.31823745855e-25
lattic1543629303tr_set || <=1 || 6.21479288784e-25
reflp || are_equivalent || 6.18623985137e-25
pred3 || .walkOf0 || 6.02163855025e-25
id_on || ++ || 5.85007273843e-25
cons || in20 || 5.83425671238e-25
implode str || ELabelSelector 6 || 5.70238996571e-25
eval || id$ || 5.59627426733e-25
semiri1062155398ct_rel semiri882458588ct_rel || op0 {} || 5.486213812e-25
comm_monoid || is_convergent_to || 5.4589463528e-25
groups828474808id_set || is_applicable_to1 || 5.41735270288e-25
lattic1693879045er_set || -are_isomorphic || 5.38737044428e-25
trans || <==>0 || 5.33064187103e-25
monoid_axioms || is_vertex_seq_of || 5.19359440034e-25
tl || dom1 || 5.15637184857e-25
semilattice_neutr || is_differentiable_in3 || 5.06461106347e-25
hd || Lin0 || 5.021612645e-25
induct_implies || \or\3 || 5.02062034952e-25
comm_monoid || is_properly_applicable_to || 4.93460208157e-25
bNF_Wellorder_wo_rel || is_right_differentiable_in || 4.88238968852e-25
bNF_Wellorder_wo_rel || is_left_differentiable_in || 4.88238968852e-25
pred3 || cod0 || 4.7475301173e-25
pred3 || dom3 || 4.7475301173e-25
groups_monoid_list || > || 4.70162074293e-25
pred_option || |- || 4.67980463569e-25
groups387199878d_list || is_a_cluster_point_of0 || 4.65536659674e-25
code_pcr_natural code_cr_natural || WeightSelector 5 || 4.65260615688e-25
equiv_equivp || is_differentiable_in0 || 4.54850061725e-25
groups_monoid_list || is_continuous_in0 || 4.51197127657e-25
semilattice_order || -are_equivalent || 4.41382484932e-25
abel_semigroup || is_strictly_convex_on || 4.39542016534e-25
complex2 || DTConUA || 4.38533228521e-25
induct_conj || \&\2 || 4.31463577017e-25
code_pcr_integer code_cr_integer || ELabelSelector 6 || 4.28156821487e-25
refl_on || < || 4.24559215871e-25
monoid_axioms || <=1 || 4.23099512389e-25
rotate1 || MaxADSet || 4.22679863135e-25
pred_maxchain || -are_isomorphic || 4.1855875916e-25
comm_monoid_axioms || << || 4.12637704333e-25
equiv_equivp || partially_orders || 4.11049691894e-25
antisym || is_Lcontinuous_in || 4.06069866242e-25
antisym || is_Rcontinuous_in || 4.06069866242e-25
semilattice_neutr || elem_in_rel_2 || 4.03255302327e-25
groups828474808id_set || Domains_Lattice || 4.00804822873e-25
transitive_acyclic || QuasiOrthoComplement_on || 3.94835607156e-25
transitive_acyclic || commutes-weakly_with || 3.94835607156e-25
comm_monoid_axioms || is_a_cluster_point_of0 || 3.92649295946e-25
lattic1543629303tr_set || elem_in_rel_1 || 3.90078108634e-25
groups387199878d_list || is_applicable_to1 || 3.89448280598e-25
order_well_order_on || <=1 || 3.82118824017e-25
semilattice_neutr || are_weakly-unifiable || 3.73589347981e-25
groups1716206716st_set || is_differentiable_in5 || 3.65544007427e-25
set2 || Cl || 3.64325694644e-25
lattic1543629303tr_set || are_unifiable || 3.58365532092e-25
c_Predicate_Oeq || are_convergent_wrt || 3.55104892513e-25
nat_of_num || .order() || 3.5062428015e-25
pred_chain || -are_equivalent || 3.4421113639e-25
hd || Affin || 3.38705301378e-25
pred3 || dom6 || 3.37227526765e-25
pred3 || cod3 || 3.37227526765e-25
code_nat_of_integer || \not\11 || 3.35060932832e-25
equiv_equivp || are_opposite || 3.20856541675e-25
im || Terminals || 3.15919412875e-25
trans || is_Lcontinuous_in || 3.12517466376e-25
trans || is_Rcontinuous_in || 3.12517466376e-25
distinct || c=0 || 3.09320148528e-25
nat2 || .Lifespan() || 2.89751856628e-25
semilattice || .103 || 2.88161883605e-25
implode str || WeightSelector 5 || 2.84085972826e-25
bNF_Ca1811156065der_on || <=1 || 2.80054859403e-25
abel_s1917375468axioms || is_convex_on || 2.79059038235e-25
is_none || r3_tarski || 2.77380087105e-25
lattic35693393ce_set || IRR || 2.76578823976e-25
semilattice || is_differentiable_in || 2.6822440624e-25
inc || .Lifespan() || 2.6642133868e-25
append || +65 || 2.65862357803e-25
bNF_Wellorder_wo_rel || are_anti-isomorphic || 2.59816230526e-25
wf || commutes_with0 || 2.53615546333e-25
wf || OrthoComplement_on || 2.53615546333e-25
equiv_part_equivp || is_continuous_in5 || 2.51621168588e-25
code_integer_of_int || ProperPrefixes || 2.50785794707e-25
remdups_adj || MaxADSet || 2.48079689803e-25
comm_monoid || Open_Domains_Lattice || 2.47239444348e-25
comm_monoid || Closed_Domains_Lattice || 2.47239444348e-25
monoid || is_differentiable_in3 || 2.47009618204e-25
comm_monoid_axioms || is_applicable_to1 || 2.41569217562e-25
rev || MaxADSet || 2.39719912913e-25
append || *17 || 2.38733579151e-25
equiv_part_equivp || quasi_orders || 2.38704996921e-25
code_nat_of_integer || succ0 || 2.34783156383e-25
groups828474808id_set || is_differentiable_in3 || 2.3075542935e-25
bNF_Wellorder_wo_rel || are_isomorphic6 || 2.22347467324e-25
re || k1_xfamily || 2.20883084868e-25
im || k2_xfamily || 2.19249177907e-25
none || code || 2.1787204215e-25
code_pcr_integer code_cr_integer || WeightSelector 5 || 2.15198066711e-25
groups828474808id_set || is_continuous_in2 || 2.1203064169e-25
reflp || is_continuous_in5 || 2.11925551666e-25
c_Predicate_Oeq || <=2 || 2.09633939811e-25
pos || MCS:CSeq || 2.03098249204e-25
reflp || quasi_orders || 1.99661418468e-25
equiv_part_equivp || are_anti-isomorphic || 1.99413530737e-25
eval || .first() || 1.99292536068e-25
bit1 || succ0 || 1.96925890544e-25
semigroup || is_convex_on || 1.94212628374e-25
cons || *18 || 1.92021759986e-25
comm_monoid || is_differentiable_in5 || 1.91816896712e-25
eval || .last() || 1.90295622773e-25
some || id$0 || 1.90164977511e-25
some || id$1 || 1.90164977511e-25
empty || O_el || 1.79641336558e-25
bNF_Ca646678531ard_of || Cn || 1.78269735299e-25
bit1 || .order() || 1.77688837159e-25
pos || LexBFS:CSeq || 1.77019103091e-25
contained || \<\ || 1.73716193805e-25
antisym || are_dual || 1.725385443e-25
is_filter || c=0 || 1.71092354303e-25
pcr_literal cr_literal || TargetSelector 4 || 1.70590870861e-25
listMem || c=5 || 1.70524137603e-25
pred_option || is-SuperConcept-of || 1.68297618129e-25
distinct || Cl || 1.67298622435e-25
reflp || are_anti-isomorphic || 1.6525475407e-25
complex2 || [..] || 1.61052887761e-25
lexordp_eq || -are_equivalent || 1.58247962098e-25
bit0 || CompleteSGraph || 1.56464886205e-25
lexordp2 || -are_isomorphic || 1.53957376172e-25
divmod_nat_rel || |-| || 1.53162187171e-25
lattic1543629303tr_set || is_continuous_in0 || 1.50268191421e-25
transitive_trancl || -6 || 1.4954670813e-25
groups387199878d_list || is_continuous_in2 || 1.47270689522e-25
code_integer_of_int || FlatCoh || 1.46118840018e-25
inc || chromatic#hash#0 || 1.45987077299e-25
trans || are_dual || 1.39685194436e-25
remdups || MaxADSet || 1.34039835091e-25
groups_monoid_list || len- || 1.32920641526e-25
dropWhile || #quote##bslash##slash##quote#3 || 1.32845451275e-25
inc || clique#hash#0 || 1.32032259678e-25
semilattice_axioms || is_continuous_in || 1.31271499077e-25
groups828474808id_set || [= || 1.30943117521e-25
divmod_nat || Cn || 1.30830739701e-25
c_Predicate_Oeq || |-5 || 1.30729254698e-25
antisym || are_equivalent1 || 1.30537528666e-25
im || frac || 1.26401543175e-25
remdups || +` || 1.21758491264e-25
remdups || exp4 || 1.20586565921e-25
the2 || dom10 || 1.19511663447e-25
the2 || cod6 || 1.19511663447e-25
the2 || dom9 || 1.19511663447e-25
the2 || cod7 || 1.19511663447e-25
some || ID0 || 1.18949954393e-25
append || +87 || 1.18564511265e-25
nat2 || FlatCoh || 1.15896955892e-25
bNF_Wellorder_wo_rel || is_metric_of || 1.12646607455e-25
nil || epsilon_ || 1.12575706655e-25
comm_monoid_axioms || [= || 1.10950698551e-25
re || [#bslash#..#slash#] || 1.09827205475e-25
one2 || 0q0 || 1.09052203703e-25
trans || are_equivalent1 || 1.08130621241e-25
order_well_order_on || |-| || 1.06971252688e-25
groups1716206716st_set || is_eventually_in || 1.05601051162e-25
im || denominator || 1.01943355244e-25
re || numerator || 1.01048981854e-25
groups1716206716st_set || is_oriented_vertex_seq_of || 1.00370759255e-25
bNF_Ca1811156065der_on || |-| || 9.98723158984e-26
semila1450535954axioms || is_continuous_in1 || 9.93883485685e-26
remdups || +^1 || 9.92486130636e-26
groups828474808id_set || is_often_in || 9.87138988437e-26
monoid_axioms || is_continuous_in0 || 9.7918059567e-26
pred3 || Sub_the_argument_of || 9.77040490127e-26
equiv_equivp || is_strictly_convex_on || 9.72453646336e-26
contained || is_sequence_on || 9.57956031177e-26
comm_monoid_axioms || is_continuous_in2 || 9.55672094641e-26
abel_semigroup || is_continuous_in || 9.55062795562e-26
bNF_Wellorder_wo_rel || ~= || 9.25426224585e-26
lattic35693393ce_set || is_continuous_in || 9.08112691481e-26
cons || +54 || 8.98859981145e-26
pow || 0q || 8.89633831524e-26
pow || -42 || 8.74478617363e-26
monoid || is_homomorphism1 || 8.72594882124e-26
groups_monoid_list || limit- || 8.61735566984e-26
rep_filter || +` || 8.56615946173e-26
nat_of_num || d#quote#. || 8.51878915009e-26
bit0 || MCS:CSeq || 8.48922120348e-26
rep_filter || exp4 || 8.46426994445e-26
none || Concept-with-all-Objects || 8.36636292651e-26
divmod_nat || radix || 8.2207310732e-26
empty || <*> || 8.16417368618e-26
complex2 || + || 8.09436308461e-26
comm_monoid || .103 || 8.06806016812e-26
transitive_rtrancl || ||....||2 || 7.95689655007e-26
pred3 || FS2XFS || 7.83113202134e-26
bit0 || LexBFS:CSeq || 7.80688710401e-26
monoid || proj1 || 7.80588970676e-26
some || id$ || 7.7920001069e-26
code_integer_of_int || bool || 7.69505138822e-26
groups_monoid_list || is_succ_homomorphism || 7.58801169682e-26
bNF_Ca1811156065der_on || << || 7.58441573912e-26
antisym || are_equivalent || 7.41176444492e-26
comm_monoid || is_eventually_in || 7.36940272142e-26
groups1716206716st_set || c=1 || 7.30523613774e-26
nat2 || bool || 7.25738210872e-26
complex2 || #slash# || 7.24681320835e-26
comm_monoid || c=1 || 7.21634238803e-26
code_nat_of_integer || permutations || 7.15325198504e-26
complex2 || OSSubAlLattice || 7.13699508185e-26
groups387199878d_list || [= || 6.94345993436e-26
semilattice_order || is_differentiable_in4 || 6.88661955567e-26
pred3 || id2 || 6.86253408975e-26
pcr_real cr_real || TargetSelector 4 || 6.79260709583e-26
transitive_tranclp || -are_isomorphic || 6.78876075422e-26
takeWhile || #quote##bslash##slash##quote#3 || 6.76302772047e-26
set || Tunit_ball || 6.69459264082e-26
rep_filter || +^1 || 6.68502241389e-26
antisym || is_a_pseudometric_of || 6.61778997733e-26
groups828474808id_set || IRR || 6.44060191952e-26
the2 || cod0 || 6.36290628788e-26
the2 || dom3 || 6.36290628788e-26
code_integer_of_int || Seg || 6.26348691483e-26
groups1716206716st_set || divides1 || 6.25505950267e-26
groups828474808id_set || <=\ || 6.22096749455e-26
transitive_rtranclp || -are_equivalent || 6.15366446803e-26
pcr_rat cr_rat || TargetSelector 4 || 6.11904472888e-26
groups387199878d_list || is_often_in || 6.10028604159e-26
groups828474808id_set || is_vertex_seq_of || 5.99515228339e-26
finite_psubset || TOP-REAL || 5.98181103686e-26
trans || are_equivalent || 5.83620429027e-26
transitive_trancl || \not\5 || 5.78306496335e-26
inc || len1 || 5.74097468867e-26
code_nat_of_integer || SymGroup || 5.72036155727e-26
comm_monoid_axioms || is_often_in || 5.70302765733e-26
hd || Cl || 5.60590444518e-26
pos || root-tree2 || 5.56005351727e-26
pcr_int cr_int || TargetSelector 4 || 5.53938673009e-26
trans || is_a_pseudometric_of || 5.5086282789e-26
comm_monoid || is_oriented_vertex_seq_of || 5.4613649614e-26
eval || .walkOf0 || 5.45724636603e-26
code_integer_of_int || Col || 5.41207825888e-26
semilattice_neutr || is_homomorphism1 || 5.39634124161e-26
semila1450535954axioms || is_collinear0 || 5.32892571517e-26
abel_semigroup || c= || 5.30379957568e-26
eval || Sub_not || 5.23736485966e-26
lattic1543629303tr_set || len- || 5.1804330044e-26
eval || cod || 5.17440380975e-26
eval || dom1 || 5.17440380975e-26
transitive_trancl || #quote#15 || 5.05969240609e-26
equiv_part_equivp || is_convex_on || 4.77025498431e-26
nat2 || In_Power || 4.74195765467e-26
the2 || dom6 || 4.72771775718e-26
the2 || cod3 || 4.72771775718e-26
divmod_nat_rel || <=1 || 4.69765542095e-26
pred3 || cod || 4.6460513151e-26
pred3 || dom1 || 4.6460513151e-26
transitive_rtrancl || the_set_of_l2ComplexSequences || 4.62845727559e-26
cos_coeff || 0 || 4.57376002405e-26
eval || id2 || 4.57134055809e-26
bit0 || Sgm00 || 4.52717827425e-26
comm_monoid || divides1 || 4.51967848283e-26
pred3 || term4 || 4.49665938258e-26
pred3 || init0 || 4.49665938258e-26
transitive_rtrancl || ||....||3 || 4.40422691838e-26
diffs || [....]5 || 4.38961391125e-26
transitive_rtrancl || carr || 4.38843020562e-26
sin_coeff || +infty || 4.3454411134e-26
trans || are_homeomorphic || 4.31186050931e-26
lattic1543629303tr_set || is_succ_homomorphism || 4.24285457015e-26
monoid || topology || 4.16216045134e-26
id_on || nf || 4.13980164098e-26
reflp || is_convex_on || 4.12826118442e-26
im || Top || 4.12235078399e-26
eval || XFS2FS || 4.07158856704e-26
bit0 || k19_finseq_1 || 4.05654453621e-26
nat2 || max_Data-Loc_in || 4.04547649239e-26
groups387199878d_list || is_vertex_seq_of || 4.01206657102e-26
semilattice_order || Mid || 4.00254174131e-26
monoid || |-|0 || 3.87887210527e-26
complex2 || [....] || 3.87815321702e-26
code_pcr_natural code_cr_natural || TargetSelector 4 || 3.87726734073e-26
refl_on || is_a_normal_form_of || 3.85003036731e-26
im || upper_bound2 || 3.84969729164e-26
re || lower_bound0 || 3.81467115239e-26
inc || len || 3.76497754426e-26
groups387199878d_list || <=\ || 3.744043113e-26
wf || are_homeomorphic || 3.72746450827e-26
comm_monoid_axioms || <=\ || 3.63999079742e-26
semilattice || elem_in_rel_2 || 3.53674677248e-26
bNF_Wellorder_wo_rel || is_differentiable_in0 || 3.51725142021e-26
lattic1543629303tr_set || limit- || 3.50551705345e-26
semiri1062155398ct_rel semiri882458588ct_rel || EdgeSelector 2 || 3.49303477497e-26
nat2 || -Matrices_over || 3.48749118408e-26
null || c=0 || 3.4111151543e-26
lattic35693393ce_set || elem_in_rel_1 || 3.40557725954e-26
semilattice_neutr || proj1 || 3.36354853454e-26
groups_monoid_list || lambda0 || 3.356132161e-26
product_Unity || k11_gaussint || 3.35128428513e-26
bNF_Wellorder_wo_rel || partially_orders || 3.33585372013e-26
cnj || \in\ || 3.18262706589e-26
abel_s1917375468axioms || is_finer_than || 3.04961580044e-26
pred3 || CastSeq || 2.93911839463e-26
pred3 || CastSeq0 || 2.93911839463e-26
groups_monoid_list || sigma || 2.91736802462e-26
semilattice_neutr || |-|0 || 2.899176228e-26
semilattice_neutr || topology || 2.87324905782e-26
real || -infty || 2.77393316416e-26
abs_filter || Half || 2.77017630185e-26
code_nat_of_integer || Sgm || 2.76916582815e-26
nat2 || Col || 2.76725466097e-26
eval || term4 || 2.75820399624e-26
eval || init0 || 2.75820399624e-26
nat_of_num || CONGRD || 2.732100387e-26
comm_monoid_axioms || is_vertex_seq_of || 2.66222774635e-26
rep_filter || Double0 || 2.65618967686e-26
code_nat_of_integer || max_Data-Loc_in || 2.65599907193e-26
pred3 || .first() || 2.65594736046e-26
groups_monoid_list || is_an_universal_closure_of || 2.63860385885e-26
abel_s1917375468axioms || tolerates || 2.62776927739e-26
pred3 || .last() || 2.4998107455e-26
implode str || TargetSelector 4 || 2.49392606363e-26
eval || CastSeq || 2.25070541546e-26
eval || CastSeq0 || 2.25070541546e-26
semigroup || is_finer_than || 2.24068607318e-26
set2 || #bslash#3 || 2.21434450299e-26
basic_BNF_xtor || -81 || 2.19743211018e-26
lattic1543629303tr_set || lambda0 || 2.16070076637e-26
antisym || is_continuous_in5 || 2.15634124488e-26
antisym || quasi_orders || 2.13884176391e-26
transitive_rtrancl || Free1 || 2.08705961712e-26
transitive_rtrancl || Fixed || 2.08705961712e-26
nat2 || d#quote#. || 2.04358476925e-26
is_none || are_isomorphic || 2.00547573979e-26
semigroup || tolerates || 2.00313148408e-26
single || -\ || 1.98349511036e-26
code_pcr_integer code_cr_integer || TargetSelector 4 || 1.94447742588e-26
nat2 || idseq || 1.9292567024e-26
code_integer_of_int || root-tree2 || 1.92642666872e-26
groups_monoid_list || <==>1 || 1.90771666675e-26
lattic1543629303tr_set || sigma || 1.89833361951e-26
listMem || divides1 || 1.88865441799e-26
lattic1543629303tr_set || is_an_universal_closure_of || 1.80392973574e-26
equiv_equivp || c= || 1.79849826055e-26
trans || is_continuous_in5 || 1.79751532188e-26
trans || quasi_orders || 1.77033118087e-26
pcr_literal cr_literal || SourceSelector 3 || 1.75557578516e-26
re || variables_in4 || 1.71997333905e-26
bit0 || Tempty_e_net || 1.620926414e-26
is_empty || <= || 1.61397904769e-26
insert3 || #quote##bslash##slash##quote#5 || 1.60508942722e-26
rep_filter || uparrow0 || 1.60395951535e-26
pos || AV || 1.5992433467e-26
transitive_rtrancl || still_not-bound_in || 1.53577861259e-26
bNF_Ca646678531ard_of || {..}21 || 1.47098507629e-26
transitive_rtrancl || Lim_inf || 1.46737779374e-26
re || Free || 1.4359736901e-26
cnj || .:10 || 1.42533712546e-26
none || epsilon_ || 1.35962981042e-26
none || ~0 || 1.34535513362e-26
lattic1543629303tr_set || <==>1 || 1.33854432922e-26
groups1716206716st_set || is_differentiable_in3 || 1.31756949744e-26
is_none || c=0 || 1.24683647001e-26
rotate1 || #slash##bslash#0 || 1.22747264452e-26
bit1 || id6 || 1.2210084393e-26
pcr_literal cr_literal || op0 {} || 1.20742431576e-26
cons || lcm2 || 1.205983125e-26
abel_semigroup || <N< || 1.19458005549e-26
nat2 || CONGR || 1.17439564877e-26
eval || Sub_the_argument_of || 1.14540878283e-26
the2 || cod || 1.08131278051e-26
the2 || dom1 || 1.08131278051e-26
comm_monoid || elem_in_rel_2 || 1.07911458612e-26
transitive_trancl || Cl || 1.06350675874e-26
some || id2 || 1.06339527571e-26
pred3 || Sub_not || 1.04487263337e-26
pred_option || is_coarser_than0 || 1.04304789979e-26
inc || entrance || 1.0228125162e-26
inc || escape || 1.0228125162e-26
is_filter || is_proper_subformula_of0 || 9.83268199105e-27
image || #quote#2 || 9.3176371117e-27
groups828474808id_set || is_continuous_in0 || 9.12813550283e-27
rev || #slash##bslash#0 || 9.114490184e-27
id2 || id1 || 9.10759093907e-27
rep_filter || downarrow0 || 8.89953396349e-27
bNF_Ca646678531ard_of || id$0 || 8.89664370514e-27
bNF_Ca646678531ard_of || id$1 || 8.89664370514e-27
some || .walkOf0 || 8.85323189871e-27
bNF_Ca646678531ard_of || ID0 || 8.85303673162e-27
remdups_adj || #slash##bslash#0 || 8.84317549833e-27
measure || +84 || 8.76505249072e-27
groups828474808id_set || elem_in_rel_1 || 8.76460638416e-27
wf || <1 || 8.64549700712e-27
equiv_part_equivp || is_finer_than || 8.17950184887e-27
bNF_Wellorder_wo_rel || is_strictly_convex_on || 8.05101494529e-27
member3 || is_finer_than0 || 7.99582068932e-27
member3 || is_coarser_than0 || 7.99582068932e-27
comm_monoid || is_differentiable_in3 || 7.99248545172e-27
eval || FS2XFS || 7.89455982429e-27
the2 || Sub_the_argument_of || 7.79172096432e-27
pcr_real cr_real || SourceSelector 3 || 7.6379957876e-27
lattic35693393ce_set || len- || 7.56228312131e-27
distinct || #bslash#3 || 7.53814384562e-27
abs_filter || inf || 7.42619242534e-27
order_well_order_on || in1 || 7.41837311444e-27
equiv_part_equivp || tolerates || 7.29474540597e-27
reflp || is_finer_than || 7.2151862939e-27
measure || lcm || 7.06035322102e-27
bNF_Ca1811156065der_on || in1 || 7.04328097189e-27
pcr_rat cr_rat || SourceSelector 3 || 6.94864623338e-27
pred3 || XFS2FS || 6.93564950559e-27
pow || *\18 || 6.92089731377e-27
is_filter || ex_inf_of || 6.80541337271e-27
basic_BNF_xtor || -22 || 6.79416234031e-27
basic_BNF_xtor || !6 || 6.79416234031e-27
measures || +84 || 6.58884943426e-27
reflp || tolerates || 6.51721117635e-27
lattic1693879045er_set || is_differentiable_in4 || 6.50874466062e-27
pcr_int cr_int || SourceSelector 3 || 6.34942275812e-27
semilattice || topology || 6.17951289647e-27
nat2 || \not\11 || 6.14343625893e-27
some || term4 || 6.1049849958e-27
some || init0 || 6.1049849958e-27
semilattice_order || is_continuous_in1 || 5.90346734436e-27
id2 || ~0 || 5.8059630633e-27
remdups || #slash##bslash#0 || 5.79538758237e-27
groups387199878d_list || is_continuous_in0 || 5.66106695168e-27
lattic1693879045er_set || Mid || 5.55458319887e-27
semilattice || proj1 || 5.38975175752e-27
lattic35693393ce_set || limit- || 5.37738757883e-27
equiv_equivp || <N< || 5.35254848684e-27
pcr_real cr_real || op0 {} || 5.32597721161e-27
pred_maxchain || is_differentiable_in4 || 5.29870707022e-27
rep_filter || WFF || 5.22832445294e-27
nat_of_num || FlatCoh || 5.13892340248e-27
wf || divides0 || 5.08659881551e-27
code_nat_of_integer || sqrt0 || 5.02936645046e-27
c_Predicate_Oeq || are_convertible_wrt || 4.91873659775e-27
measures || lcm || 4.91143157572e-27
pcr_rat cr_rat || op0 {} || 4.85272670433e-27
pred_chain || is_continuous_in1 || 4.8167995029e-27
semilattice_order || is_collinear0 || 4.71193353844e-27
code_pcr_natural code_cr_natural || SourceSelector 3 || 4.59412877952e-27
pos || FlatCoh || 4.5632590322e-27
none || {}0 || 4.56210954184e-27
pred_maxchain || Mid || 4.52067426111e-27
rep_filter || .:13 || 4.49910509434e-27
lattic35693393ce_set || lambda0 || 4.49069816925e-27
bNF_Ca646678531ard_of || \not\0 || 4.45397161188e-27
pcr_int cr_int || op0 {} || 4.4407059223e-27
rep_filter || \or\4 || 4.43327877534e-27
the2 || .first() || 4.40448077746e-27
bNF_Ca646678531ard_of || id$ || 4.39552787728e-27
antisym || is_convex_on || 4.38177170054e-27
some || Sub_not || 4.30631711578e-27
comm_monoid_axioms || is_continuous_in0 || 4.17250967023e-27
the2 || .last() || 4.15970505777e-27
abel_s1917375468axioms || meets || 4.13542686894e-27
member3 || is_proper_subformula_of1 || 4.01120634408e-27
lattic35693393ce_set || sigma || 3.99193733913e-27
refl_on || |-| || 3.95696828498e-27
abs_filter || .:14 || 3.9446542604e-27
field2 || dom10 || 3.9263564793e-27
field2 || cod6 || 3.9263564793e-27
field2 || dom9 || 3.9263564793e-27
field2 || cod7 || 3.9263564793e-27
rep_filter || .:14 || 3.92108671441e-27
distinct || divides0 || 3.88977212736e-27
lexordp_eq || are_equivalence_wrt || 3.85592698343e-27
pred_chain || is_collinear0 || 3.8457441653e-27
abs_filter || .:13 || 3.82084660117e-27
abs_filter || sup1 || 3.76944929035e-27
trans || is_convex_on || 3.75735754209e-27
null || are_isomorphic6 || 3.74071086827e-27
is_filter || ex_sup_of || 3.71174984999e-27
id_on || Cn || 3.70962176764e-27
one2 || one || 3.49371040075e-27
field2 || cod0 || 3.45425107155e-27
field2 || dom3 || 3.45425107155e-27
append || +8 || 3.45263816328e-27
semigroup || meets || 3.43696770521e-27
code_nat_of_integer || CONGR || 3.36195743551e-27
id_on || radix || 3.30783327624e-27
code_pcr_natural code_cr_natural || op0 {} || 3.22974603062e-27
code_integer_of_num || c[100] || 3.20239367439e-27
implode str || SourceSelector 3 || 3.07673807235e-27
nat2 || CONGRD || 3.03801435886e-27
lexordp_eq || is_continuous_in1 || 2.93898231061e-27
code_integer_of_int || ^21 || 2.82423079945e-27
abs_filter || the_argument_of || 2.81036279727e-27
comm_monoid || topology || 2.80774247088e-27
code_integer_of_num || -4 || 2.73778789608e-27
basic_BNF_xtor || Bottom1 || 2.70587200194e-27
nil || Concretized || 2.69875241622e-27
lexordp2 || is_differentiable_in4 || 2.69056894408e-27
null || divides0 || 2.68449760246e-27
the2 || CastSeq0 || 2.64910097097e-27
hd || #bslash#3 || 2.62143297152e-27
order_well_order_on || is_subformula_of || 2.61327671016e-27
code_integer_of_int || AV || 2.59260179796e-27
re || Radical || 2.54637791564e-27
pos || bool || 2.51585568398e-27
nat_of_num || bool || 2.50768179579e-27
insert3 || \or\0 || 2.49957130226e-27
bNF_Ca1811156065der_on || is_subformula_of || 2.46815917862e-27
code_pcr_integer code_cr_integer || SourceSelector 3 || 2.45333681989e-27
insert3 || =>1 || 2.45038861181e-27
remdups || lcm || 2.38300743857e-27
antisym || are_isomorphic || 2.27765605328e-27
sym || are_isomorphic || 2.2567893702e-27
nat2 || abs8 || 2.21944179979e-27
nil || abs || 2.18884781489e-27
implode str || op0 {} || 2.17668586127e-27
rep_filter || \not\5 || 2.12486732032e-27
semilattice || is_Lcontinuous_in || 2.08513779808e-27
semilattice || is_Rcontinuous_in || 2.08513779808e-27
cnj || k15_gaussint || 2.06820051229e-27
some || CastSeq || 2.02444645088e-27
trans || are_isomorphic || 2.00748205412e-27
lexordp_eq || is_naturally_transformable_to || 1.99334871427e-27
numeral_numeral || -3 || 1.9732775294e-27
remdups || MSSign0 || 1.92312447642e-27
field2 || dom6 || 1.90749259222e-27
field2 || cod3 || 1.90749259222e-27
refl_on || <=1 || 1.90397589544e-27
suc_Rep || idsym || 1.89632831686e-27
fun_is_measure || r2_cat_6 || 1.85876039622e-27
divmod_nat || {..}21 || 1.80954442351e-27
complex2 || |^ || 1.80038371689e-27
groups828474808id_set || lambda0 || 1.77940118119e-27
re || k16_gaussint || 1.77388029192e-27
nat_of_num || Map2Rel || 1.74235591369e-27
code_pcr_integer code_cr_integer || op0 {} || 1.74176045034e-27
groups_monoid_list || upper_bound1 || 1.73717701927e-27
divmod_nat_rel || in1 || 1.68568649415e-27
listMem || is_subformula_of || 1.68244435756e-27
code_integer || -4 || 1.63693738059e-27
equiv_part_equivp || meets || 1.61660045549e-27
groups828474808id_set || sigma || 1.61000868848e-27
pos || Rel2Map || 1.6084936794e-27
code_integer || c[100] || 1.58058687973e-27
monoid || *86 || 1.56909223258e-27
distinct || can_be_characterized_by || 1.51529261297e-27
inc || max_Data-Loc_in || 1.49578198001e-27
lattic35693393ce_set || is_right_differentiable_in || 1.49300249626e-27
lattic35693393ce_set || is_left_differentiable_in || 1.49300249626e-27
reflp || meets || 1.49152984354e-27
null2 || are_isomorphic6 || 1.37536198628e-27
nil || -0 || 1.32891461393e-27
bit1 || d#quote#. || 1.31840894788e-27
groups828474808id_set || len- || 1.28507191507e-27
distinct || are_isomorphic6 || 1.27368108617e-27
transitive_acyclic || is_Lcontinuous_in || 1.26714434951e-27
transitive_acyclic || is_Rcontinuous_in || 1.26714434951e-27
transitive_tranclp || is_differentiable_in4 || 1.25354948739e-27
lattic35693393ce_set || is_elementary_subsystem_of || 1.24729444685e-27
transitive_rtranclp || is_continuous_in1 || 1.22942141571e-27
transitive_trancl || \xor\ || 1.22039500224e-27
pcr_literal cr_literal || EdgeSelector 2 || 1.16491783498e-27
semilattice || <==>0 || 1.15835091551e-27
abel_semigroup || is_differentiable_in || 1.14329281318e-27
lexordp_eq || are_congruent_mod0 || 1.14214084517e-27
empty || Concretized || 1.12698789144e-27
comm_monoid || proj1 || 1.10883224701e-27
bNF_Ca646678531ard_of || .walkOf0 || 1.03107314492e-27
transitive_rtrancl || \or\3 || 1.01538904021e-27
lattic1543629303tr_set || upper_bound1 || 9.95042320645e-28
groups828474808id_set || limit- || 9.77001507087e-28
semilattice_neutr || *86 || 9.65555708393e-28
transitive_trancl || Non || 9.63128324797e-28
bit0 || fsloc || 9.17853274828e-28
cons || \&\ || 8.81944822545e-28
one2 || Rea0 || 8.81751031187e-28
transitive_rtrancl || \nor\ || 8.60620830063e-28
bit1 || intloc || 8.53701280654e-28
c_Predicate_Oeq || [=0 || 8.29868592899e-28
cnj || -14 || 8.26368959008e-28
abel_s1917375468axioms || is_continuous_in || 8.23654994786e-28
pow || +84 || 8.22663936811e-28
fun_is_measure || have_the_same_composition || 8.21242173192e-28
bit0 || root-tree2 || 8.17019424596e-28
nat2 || #quote#0 || 8.03577486971e-28
divmod_nat_rel || is_subformula_of || 7.75534937471e-28
induct_implies || *2 || 7.67076170455e-28
wf || ex_inf_of || 7.55760755206e-28
induct_conj || +*0 || 7.36261949863e-28
some || FS2XFS || 7.22899484146e-28
measure || uparrow0 || 6.8968620563e-28
wf || is_right_differentiable_in || 6.81199681892e-28
wf || is_left_differentiable_in || 6.81199681892e-28
divmod_nat || \not\0 || 6.78348977857e-28
distinct || r3_tarski || 6.72126442336e-28
the2 || XFS2FS || 6.59859622187e-28
sqr || +46 || 6.14126057569e-28
semigroup || is_continuous_in || 5.96099918691e-28
pcr_real cr_real || EdgeSelector 2 || 5.57266690368e-28
measures || uparrow0 || 5.43522204183e-28
nil || code || 5.38514280849e-28
bitM || +46 || 5.23545844268e-28
bNF_Ca646678531ard_of || id2 || 5.19647062256e-28
pcr_rat cr_rat || EdgeSelector 2 || 5.12366752561e-28
pred3 || Half || 4.76113826754e-28
pcr_int cr_int || EdgeSelector 2 || 4.72913495699e-28
member3 || \<\ || 4.72385404692e-28
transitive_rtrancl || vars0 || 4.58998222108e-28
transitive_rtrancl || variables_in || 4.49716907236e-28
wf || ex_sup_of || 4.46902694689e-28
remdups || R_EAL1 || 4.44606432625e-28
insert3 || B_SUP0 || 4.31108834839e-28
groups_monoid_list || are_divergent<=1_wrt || 4.2411213203e-28
measure || downarrow0 || 4.15751541527e-28
groups_monoid_list || is_a_condensation_point_of || 4.14712789652e-28
field2 || cod || 4.02437005342e-28
field2 || dom1 || 4.02437005342e-28
null || r3_tarski || 3.93139207439e-28
field2 || .first() || 3.89128397147e-28
member3 || EqClass0 || 3.83091608697e-28
field2 || .last() || 3.74018444814e-28
monoid || is_an_accumulation_point_of || 3.65520810121e-28
one2 || {}2 || 3.56432895666e-28
code_pcr_natural code_cr_natural || EdgeSelector 2 || 3.54641139229e-28
eval || Double0 || 3.42937463879e-28
measures || downarrow0 || 3.27891206967e-28
transitive_rtranclp || are_equivalence_wrt || 3.18632700323e-28
induct_conj || #slash##bslash#0 || 3.12682105807e-28
transitive_rtrancl || Union0 || 3.11069450861e-28
semilattice || are_equivalent || 3.07184360018e-28
transitive_trancl || \or\3 || 3.04301957062e-28
induct_implies || #bslash##slash#0 || 2.977471945e-28
equiv_equivp || is_differentiable_in || 2.96848613239e-28
cnj || *\17 || 2.95451012463e-28
groups_monoid_list || are_convergent<=1_wrt || 2.91754062569e-28
monoid || are_divergent_wrt || 2.87633683582e-28
bit1 || CONGRD || 2.79332039843e-28
bNF_Ca646678531ard_of || term4 || 2.76400540114e-28
bNF_Ca646678531ard_of || init0 || 2.76400540114e-28
inc || CONGR || 2.7348159959e-28
rep_filter || opp1 || 2.64863771287e-28
pred3 || Double0 || 2.63833201077e-28
fun_is_measure || meets || 2.49814483098e-28
implode str || EdgeSelector 2 || 2.48112815531e-28
basic_BNF_xtor || Non || 2.42839908147e-28
lattic35693393ce_set || are_isomorphic6 || 2.40542389318e-28
semilattice || are_equivalent1 || 2.39803850064e-28
insert3 || \or\2 || 2.38761750975e-28
eval || Half || 2.34594182026e-28
transitive_acyclic || <==>0 || 2.28909742458e-28
code_integer_of_int || Rel2Map || 2.28453428552e-28
lattic35693393ce_set || ~= || 2.25444108131e-28
inc || sqrt0 || 2.22418592701e-28
abs_filter || opp || 2.15536086695e-28
monoid || is_an_UPS_retraction_of || 2.1003090135e-28
lattic1543629303tr_set || is_a_condensation_point_of || 2.05613781859e-28
abs_filter || opp1 || 2.02848213256e-28
code_pcr_integer code_cr_integer || EdgeSelector 2 || 2.02719782858e-28
pos || ^21 || 2.02301163081e-28
semilattice_neutr || is_an_accumulation_point_of || 1.98098050577e-28
groups_monoid_list || is_a_retraction_of || 1.95934974652e-28
nat_of_num || abs8 || 1.9514030616e-28
rep_filter || opp || 1.89688782367e-28
monoid || are_convergent_wrt || 1.89208898831e-28
nat2 || Map2Rel || 1.88349813481e-28
code_nat_of_integer || #quote#0 || 1.83298611176e-28
nat2 || sqrt0 || 1.82227910401e-28
wf || is_elementary_subsystem_of || 1.80664750578e-28
transitive_acyclic || are_equivalent || 1.80333683579e-28
transitive_rtranclp || is_naturally_transformable_to || 1.7602131489e-28
distinct || is_proper_subformula_of0 || 1.7405798505e-28
equiv_part_equivp || is_continuous_in || 1.70858023751e-28
transitive_trancl || Partial_Diff_Union || 1.69042458025e-28
lattic1543629303tr_set || are_divergent<=1_wrt || 1.68483746318e-28
code_natural_of_nat || LattPOSet || 1.64876665304e-28
bit0 || AV || 1.61561906275e-28
code_Suc || ~0 || 1.55945819721e-28
transitive_trancl || Partial_Union || 1.49818308934e-28
reflp || is_continuous_in || 1.49760646618e-28
lattic35693393ce_set || upper_bound1 || 1.44227841962e-28
semilattice || *86 || 1.41136776404e-28
suc_Rep || FixedSubtrees || 1.37047374697e-28
fun_is_measure || is_Finseq_for || 1.36357261753e-28
null2 || |-6 || 1.35632237521e-28
semilattice_neutr || is_an_UPS_retraction_of || 1.35221802538e-28
pos || StoneR || 1.29854054838e-28
nat_of_num || ultraset || 1.28569192328e-28
semilattice_neutr || are_divergent_wrt || 1.25445426016e-28
lattic1543629303tr_set || is_a_retraction_of || 1.16119252153e-28
semilattice || is_a_pseudometric_of || 1.15649401355e-28
lattic35693393ce_set || is_metric_of || 1.15358392358e-28
lattic1543629303tr_set || are_convergent<=1_wrt || 1.12910317972e-28
bit1 || abs8 || 1.1257637158e-28
pred3 || the_argument_of || 1.10219061907e-28
transitive_rtranclp || are_congruent_mod0 || 1.06560426503e-28
suc || .:7 || 1.05536948462e-28
id_on || {..}21 || 1.03966739299e-28
cnj || ComplRelStr || 1.01873163804e-28
wf || ~= || 1.01300370653e-28
bNF_Cardinal_cone || OddNAT || 1.00624896485e-28
remdups || WFF || 9.99349477695e-29
rep_filter || Absval || 9.90573177262e-29
bit0 || ^21 || 9.87604590185e-29
one2 || +infty0 || 9.40839490516e-29
groups_monoid_list || ==>1 || 9.34806162073e-29
monoid || is_derivable_from || 9.34806162073e-29
refl_on || in1 || 9.20340355109e-29
sqr || |....|2 || 8.87223991399e-29
groups_monoid_list || are_critical_wrt || 8.80667307211e-29
abs_filter || -BinarySequence || 8.61832766223e-29
remdups || \or\4 || 8.60297618408e-29
semilattice_neutr || are_convergent_wrt || 8.03422886819e-29
groups_monoid_list || |=7 || 8.00625238673e-29
bitM || |....|2 || 7.31815748134e-29
product_unit || EvenNAT || 6.92106595933e-29
eval || \not\5 || 6.6607420207e-29
transitive_acyclic || are_equivalent1 || 6.22340218542e-29
the2 || Half || 6.17928807217e-29
listMem || c=1 || 6.14907022552e-29
groups_monoid_list || BCK-part || 5.93025651583e-29
monoid || |-2 || 5.91941987424e-29
nat2 || union0 || 5.8461435518e-29
im || Union || 5.81135953866e-29
semilattice_neutr || is_derivable_from || 5.77241025251e-29
complex2 || :-> || 5.76411332444e-29
empty || TAUT || 5.49960793113e-29
lattic1543629303tr_set || ==>1 || 5.3188191824e-29
bNF_Cardinal_cfinite || meets || 4.99500915252e-29
comm_monoid || *86 || 4.96255636971e-29
monoid || are_convertible_wrt || 4.90535098104e-29
abel_semigroup || c< || 4.88706651439e-29
monoid || are_coplane || 4.80255089515e-29
wf || are_isomorphic6 || 4.68439419094e-29
bNF_Wellorder_wo_rel || is_differentiable_in || 4.67497963454e-29
monoid || carrier || 4.5472485526e-29
null2 || divides0 || 4.47964458145e-29
some || Double0 || 4.47147719719e-29
groups828474808id_set || upper_bound1 || 4.41355870168e-29
semilattice || quasi_orders || 4.37406879258e-29
refl_on || is_subformula_of || 4.13110319615e-29
lattic35693393ce_set || partially_orders || 3.96678358414e-29
cons || #bslash##slash#2 || 3.95236273928e-29
fun_is_measure || are_homeomorphic || 3.93593060454e-29
semilattice || is_continuous_in5 || 3.89885141048e-29
id_on || \not\0 || 3.88916535617e-29
groups_monoid_list || #slash##slash#8 || 3.84896936106e-29
lattic35693393ce_set || is_differentiable_in0 || 3.69758894944e-29
c_Predicate_Oeq || reduces || 3.61607725585e-29
lattic1543629303tr_set || |=7 || 3.57975433741e-29
semilattice_neutr || are_coplane || 3.54951927237e-29
lattic1543629303tr_set || BCK-part || 3.52403813955e-29
groups_monoid_list || Bot || 3.52072894381e-29
cnj || Rev0 || 3.47433345491e-29
lattic1543629303tr_set || are_critical_wrt || 3.13192314627e-29
groups_monoid_list || InputVertices || 3.00435798017e-29
semilattice_neutr || carrier || 2.90511461742e-29
antisym || is_continuous_in || 2.89365782613e-29
semilattice_neutr || |-2 || 2.88623123929e-29
fun_is_measure || tolerates3 || 2.80213505129e-29
groups_monoid_list || exp1 || 2.65867483429e-29
lattic1543629303tr_set || #slash##slash#8 || 2.64015718835e-29
monoid || Bottom || 2.58298432875e-29
equiv_equivp || c< || 2.57208793979e-29
eval || the_argument_of || 2.52169300011e-29
trans || is_continuous_in || 2.51597612396e-29
empty || abs || 2.47801392523e-29
finite_finite2 || c=0 || 2.40705022936e-29
pred3 || \not\5 || 2.29475923364e-29
monoid || P_cos || 2.21714446414e-29
groups_monoid_list || is_unif_conv_on || 2.18887212134e-29
cnj || Rev1 || 1.97822331959e-29
transitive_acyclic || are_anti-isomorphic || 1.95110274067e-29
lattic1543629303tr_set || Bot || 1.91794363682e-29
semilattice_neutr || are_convertible_wrt || 1.91053107943e-29
cnj || .:7 || 1.88963583257e-29
lattic1543629303tr_set || InputVertices || 1.86722567727e-29
bNF_Ca646678531ard_of || FS2XFS || 1.74221766763e-29
abel_s1917375468axioms || are_equipotent || 1.70201510342e-29
monoid || is_point_conv_on || 1.67310051721e-29
code_integer_of_int || StoneR || 1.67069020789e-29
pow || \or\3 || 1.61164676997e-29
rep_filter || R_EAL1 || 1.5935013935e-29
lexordp_eq || LIN0 || 1.59288313922e-29
the2 || the_argument_of || 1.59015006153e-29
lattic1543629303tr_set || exp1 || 1.58051906553e-29
transitive_acyclic || quasi_orders || 1.57687040875e-29
semilattice_neutr || Bottom || 1.49986624798e-29
pow || min3 || 1.48161731181e-29
semigroup || are_equipotent || 1.46829475295e-29
semilattice_neutr || P_cos || 1.40126921009e-29
order_well_order_on || |-|0 || 1.36188555975e-29
bNF_Ca646678531ard_of || CastSeq || 1.32224980366e-29
empty || -0 || 1.31968693197e-29
is_filter || r3_tarski || 1.30786643656e-29
nat2 || ultraset || 1.30717473499e-29
rev || -81 || 1.30337841703e-29
groups_monoid_list || _|_2 || 1.30097234439e-29
wf || are_opposite || 1.284544574e-29
transitive_acyclic || is_continuous_in5 || 1.25893340308e-29
lexordp_eq || Mid || 1.2263341568e-29
re || GoB || 1.19406441479e-29
field2 || CastSeq0 || 1.1458969916e-29
field2 || XFS2FS || 1.13658126982e-29
code_nat_of_integer || union0 || 1.12570398578e-29
the2 || .:13 || 1.11294637929e-29
fun_is_measure || in || 1.10216020382e-29
wf || partially_orders || 1.10117365028e-29
set2 || +` || 1.06635071879e-29
set2 || exp4 || 1.05877575768e-29
lattic1543629303tr_set || is_unif_conv_on || 1.04099298749e-29
some || \not\5 || 9.78862938576e-30
lattic35693393ce_set || BCK-part || 9.51465263557e-30
monoid || are_ldependent2 || 9.38153111877e-30
wf || is_differentiable_in0 || 9.17751252603e-30
set2 || +^1 || 9.13931752866e-30
the2 || .:14 || 8.91649398988e-30
some || .:14 || 8.64290798577e-30
semilattice_neutr || is_point_conv_on || 8.63668429395e-30
field2 || Sub_the_argument_of || 8.48436858996e-30
bit1 || Map2Rel || 8.39074364879e-30
semilattice || carrier || 8.32187035581e-30
one2 || BOOLEAN || 8.12664277549e-30
equiv_part_equivp || are_equipotent || 8.03633962571e-30
bNF_Ca1811156065der_on || is_an_universal_closure_of || 7.72424095414e-30
transitive_trancl || \not\0 || 7.65928551979e-30
monoid || is_a_cluster_point_of0 || 7.57513439754e-30
bNF_Ca646678531ard_of || Sub_not || 7.54361186013e-30
reflp || are_equipotent || 7.52440647113e-30
some || .:13 || 7.50949572858e-30
inc || #quote#0 || 7.4369962652e-30
fun_is_measure || emp || 7.25488104333e-30
suc_Rep || alef || 6.7304448336e-30
suc_Rep || Field2COMPLEX || 6.7304448336e-30
suc_Rep || |[..]|2 || 6.7304448336e-30
one2 || +infty || 6.72868897673e-30
bit0 || Rel2Map || 6.6084650686e-30
groups_monoid_list || is_convergent_to || 6.60262985525e-30
pos || Rev1 || 6.46926214379e-30
nat_of_num || k2_orders_1 || 6.43318050357e-30
pow || max || 6.36449007908e-30
bNF_Ca1811156065der_on || <==>1 || 6.29372494903e-30
code_integer_of_int || Rev1 || 6.12999485044e-30
semilattice_neutr || [= || 6.10179042481e-30
lattic1543629303tr_set || _|_2 || 5.99735087068e-30
rep_filter || +84 || 5.84249579311e-30
monoid || [= || 5.8123363384e-30
code_nat_of_integer || RightComp || 5.50428203732e-30
rev || -22 || 5.46974234993e-30
rev || !6 || 5.46974234993e-30
lattic35693393ce_set || is_strictly_convex_on || 5.41026019185e-30
semilattice_neutr || is_a_cluster_point_of0 || 5.40038884164e-30
lattic35693393ce_set || InputVertices || 5.31464861902e-30
transitive_rtrancl || index0 || 5.25466165536e-30
semilattice || is_convex_on || 5.11790449946e-30
is_filter || <1 || 5.041150171e-30
nat_of_num || LeftComp || 4.72594467374e-30
semilattice_neutr || are_ldependent2 || 4.69082886497e-30
lattic1543629303tr_set || is_convergent_to || 4.38426003343e-30
re || SpStSeq || 4.35526040783e-30
transitive_rtrancl || QuantNbr || 4.21568227441e-30
pos || RelIncl || 4.14561050348e-30
order_well_order_on || are_weakly-unifiable || 3.99691030618e-30
insert3 || +54 || 3.93834207899e-30
nat2 || LeftComp || 3.8601801764e-30
bNF_Ca1811156065der_on || are_unifiable || 3.75170484095e-30
nat2 || RightComp || 3.67954309785e-30
lattic35693393ce_set || Bot || 3.62730509999e-30
rep_filter || lcm || 3.61110913549e-30
real_Vector_of_real || L~ || 3.446654252e-30
inc || succ0 || 3.35669571205e-30
comm_monoid || carrier || 3.33942772988e-30
groups828474808id_set || BCK-part || 3.30934552073e-30
member3 || c=5 || 3.21830812131e-30
empty || code || 3.21281097339e-30
null2 || r3_tarski || 3.20607780555e-30
nat2 || InternalRel || 3.16387886057e-30
groups_monoid_list || is_properly_applicable_to || 3.16326409152e-30
lattic35693393ce_set || exp1 || 3.09325898316e-30
one2 || -infty || 3.07605609574e-30
pred3 || Absval || 2.90155722686e-30
semilattice || Bottom || 2.90009309399e-30
semilattice || P_cos || 2.77946719551e-30
rev || Bottom1 || 2.75504564587e-30
fun_is_measure || != || 2.7121981758e-30
complex || EdgeSelector 2 || 2.70870853364e-30
groups_monoid_list || c=1 || 2.66859287826e-30
monoid || is_applicable_to1 || 2.6669947965e-30
insert3 || lcm2 || 2.65709727702e-30
lattic1543629303tr_set || c=1 || 2.64847638285e-30
suc_Rep || COMPLEX2Field || 2.47396270916e-30
is_filter || divides0 || 2.32146372314e-30
eval || -BinarySequence || 2.2791128694e-30
cnj || center0 || 2.20711456797e-30
transitive_rtranclp || LIN0 || 2.19606491799e-30
pred3 || -BinarySequence || 2.15869162097e-30
groups828474808id_set || InputVertices || 1.99829720883e-30
quotient_of || idsym || 1.98739403986e-30
member3 || divides1 || 1.96527583687e-30
basic_BNF_xtor || \xor\ || 1.94057366203e-30
eval || Absval || 1.91783728291e-30
bit1 || In_Power || 1.86886645393e-30
pred_option || [=1 || 1.84129155224e-30
basic_BNF_xtor || `5 || 1.74075551398e-30
transitive_rtranclp || <=3 || 1.72841442496e-30
transitive_rtranclp || Mid || 1.72841442496e-30
lattic1543629303tr_set || is_properly_applicable_to || 1.70240391414e-30
bit0 || ProperPrefixes || 1.60764582705e-30
bit0 || Col || 1.57335170085e-30
semilattice_neutr || is_applicable_to1 || 1.54612120867e-30
groups_monoid_list || SumAll || 1.51460176494e-30
re || 1. || 1.46444858953e-30
basic_BNF_xtor || -27 || 1.4158155638e-30
none || Top || 1.38005095278e-30
null || are_isomorphic || 1.37468078691e-30
transitive_acyclic || is_convex_on || 1.36338336792e-30
the2 || opp1 || 1.29018491343e-30
groups_monoid_list || is_differentiable_in5 || 1.26446859502e-30
monoid || is_often_in || 1.25907132294e-30
nil || ~0 || 1.24746641755e-30
nat2 || k2_orders_1 || 1.21784393903e-30
code_nat_of_integer || InternalRel || 1.16797759042e-30
bit1 || len || 1.14245521229e-30
wf || is_strictly_convex_on || 1.12402043886e-30
order_well_order_on || is_homomorphism1 || 1.113335266e-30
monoid || is_continuous_in2 || 1.09560637147e-30
suc_Rep || UNIVERSE || 1.09234446025e-30
suc_Rep || @8 || 1.09234446025e-30
append || +39 || 1.05352083323e-30
code_integer_of_int || RelIncl || 1.02768818934e-30
comm_monoid || P_cos || 1.02477427e-30
groups828474808id_set || Bot || 1.01641440099e-30
groups828474808id_set || exp1 || 1.01022976411e-30
groups_monoid_list || is_eventually_in || 9.96992748253e-31
semilattice_neutr || is_often_in || 9.78961105656e-31
some || opp || 9.56699648546e-31
comm_monoid || Bottom || 9.22197983581e-31
bNF_Ca1811156065der_on || is_succ_homomorphism || 9.1733971499e-31
c_Predicate_Oeq || >= || 8.69007500593e-31
monoid || <=\ || 8.56484899758e-31
re || nextcard || 8.34014813172e-31
lattic35693393ce_set || c= || 7.93585299589e-31
the2 || opp || 7.49810115243e-31
monoid || len || 7.45459157594e-31
lattic1543629303tr_set || is_eventually_in || 7.27202133807e-31
lattic1543629303tr_set || SumAll || 7.10854102563e-31
lattic1543629303tr_set || is_differentiable_in5 || 7.09103602034e-31
semilattice || is_finer_than || 7.02623269535e-31
some || opp1 || 6.89052888634e-31
semilattice_neutr || <=\ || 6.86504032017e-31
semilattice_neutr || is_continuous_in2 || 6.59728645328e-31
distinct || are_isomorphic || 6.52903247362e-31
groups_monoid_list || divides1 || 6.50260139069e-31
cnj || card || 6.4685151897e-31
semilattice || tolerates || 6.10285622805e-31
pred_option || \<\ || 5.95164924529e-31
bit1 || ultraset || 5.92167089548e-31
insert3 || *110 || 5.67172471703e-31
suc_Rep || (#hash#)22 || 5.49114729272e-31
suc_Rep || \not\9 || 5.49114729272e-31
bit0 || StoneR || 5.01488868189e-31
lattic1543629303tr_set || divides1 || 4.89877924714e-31
inc || union0 || 4.71947819814e-31
member3 || <=0 || 4.67065313013e-31
bNF_Ca646678531ard_of || Double0 || 4.48444238495e-31
finite_finite2 || is_proper_subformula_of0 || 4.43940242933e-31
field2 || Half || 4.28826271082e-31
the2 || -BinarySequence || 4.20577866043e-31
none || I_el || 4.15709403832e-31
monoid || |....|2 || 3.82593932744e-31
semilattice_neutr || len || 3.71724248427e-31
some || Absval || 3.69802302721e-31
groups_monoid_list || is_oriented_vertex_seq_of || 3.45883010407e-31
semilattice_neutr || |....|2 || 3.29166027432e-31
empty || epsilon_ || 3.10206034783e-31
transitive_rtranclp || NF || 3.0004220062e-31
monoid || is_vertex_seq_of || 2.99318329897e-31
transitive_rtrancl || -48 || 2.96333261362e-31
groups_monoid_list || *1 || 2.84924696489e-31
transitive_trancl || 0c0 || 2.59564311797e-31
quotient_of || FixedSubtrees || 2.48379020439e-31
insert3 || +26 || 2.40577748046e-31
rep_filter || max || 2.39991799201e-31
is_filter || <= || 2.37624463047e-31
set2 || WFF || 2.36130913845e-31
lattic1543629303tr_set || *1 || 2.34569371699e-31
member3 || |3 || 2.22320458439e-31
finite_finite2 || -20 || 2.20955724392e-31
inc || RightComp || 2.18577429874e-31
null2 || c=0 || 2.16499017346e-31
set2 || \or\4 || 2.11942797644e-31
lattic1543629303tr_set || is_oriented_vertex_seq_of || 1.995079136e-31
bit1 || k2_orders_1 || 1.98498240448e-31
semilattice_neutr || is_vertex_seq_of || 1.84694727792e-31
bit0 || Rev1 || 1.80497186416e-31
inc || InternalRel || 1.75132220826e-31
bit1 || LeftComp || 1.6674320896e-31
transitive_rtranclp || Span || 1.65676550667e-31
null2 || ex_inf_of || 1.60670854357e-31
empty || carrier || 1.57573579487e-31
bNF_Ca646678531ard_of || .:13 || 1.55652882422e-31
lattic35693393ce_set || SumAll || 1.4939935748e-31
transitive_trancl || Span || 1.48583656693e-31
null2 || ex_sup_of || 1.46806240259e-31
bNF_Ca646678531ard_of || .:14 || 1.38366358675e-31
field2 || .:14 || 1.33853796374e-31
transitive_rtrancl || Rnk || 1.31560981706e-31
transitive_trancl || Sub_not || 1.28776241476e-31
fun_is_measure || ex_inf_of || 1.27737718394e-31
field2 || .:13 || 1.27276800578e-31
remdups || +84 || 1.27103623302e-31
set2 || MSSign0 || 1.25858658921e-31
bit0 || RelIncl || 1.24523473495e-31
append || +94 || 1.17610234057e-31
append || (+)0 || 1.17610234057e-31
insert3 || \&\ || 1.16435144063e-31
pred3 || uparrow0 || 1.146025376e-31
suc_Rep || ^25 || 1.14453793683e-31
code_nat_of_natural || idsym || 1.14453793683e-31
rep_filter || + || 1.13917906042e-31
finite_finite2 || can_be_characterized_by || 1.1369117135e-31
transitive_trancl || k24_zmodul02 || 1.09896836483e-31
member3 || is_subformula_of || 1.06898175324e-31
distinct || <1 || 1.02962292606e-31
transitive_rtrancl || `23 || 9.85535630262e-32
null2 || are_isomorphic || 9.64182070814e-32
eval || inf || 9.19727894319e-32
pred3 || inf || 8.69010212073e-32
field2 || the_argument_of || 8.38118971571e-32
transitive_rtrancl || k18_zmodul02 || 8.26438839653e-32
semilattice || |....|2 || 8.24756930315e-32
semilattice || len || 8.15188696679e-32
eval || uparrow0 || 7.92759360006e-32
empty || ~0 || 7.74936883976e-32
suc_Rep || #quote##quote#0 || 7.58286791193e-32
suc_Rep || cpx2euc || 7.58286791193e-32
bNF_Ca646678531ard_of || \not\5 || 7.47985141949e-32
lattic35693393ce_set || <N< || 6.38721192207e-32
lattic35693393ce_set || *1 || 5.97024606025e-32
rep_filter || FinMeetCl || 5.93095503028e-32
transitive_trancl || -77 || 5.69043148983e-32
groups_monoid_list || is_differentiable_in3 || 5.60448159821e-32
comm_monoid || |....|2 || 5.29499113674e-32
monoid || is_continuous_in0 || 5.28194874376e-32
suc_Rep || x.0 || 5.22378693832e-32
pred3 || downarrow0 || 5.1013521058e-32
remdups || UniCl || 4.36481134912e-32
transitive_rtrancl || Carrier1 || 4.28908724761e-32
code_integer_of_num || +infty0 || 3.96723646832e-32
eval || sup1 || 3.83747594656e-32
semilattice || meets || 3.83128273263e-32
semilattice || is_continuous_in || 3.60727256923e-32
semilattice_neutr || is_continuous_in0 || 3.55558763927e-32
lattic1543629303tr_set || is_differentiable_in3 || 3.54905207613e-32
groups828474808id_set || *1 || 3.50999442527e-32
lattic35693393ce_set || is_differentiable_in || 3.2568954874e-32
groups828474808id_set || SumAll || 3.17229847569e-32
pred3 || sup1 || 2.89767158853e-32
eval || downarrow0 || 2.8571084634e-32
code_integer || -infty0 || 2.82902947214e-32
is_filter || are_equipotent || 2.66943391154e-32
order_well_order_on || is_an_accumulation_point_of || 2.47716766118e-32
bNF_Ca646678531ard_of || opp1 || 2.47594140972e-32
bNF_Ca1811156065der_on || is_a_condensation_point_of || 2.46905404919e-32
numeral_numeral || |....|2 || 2.28170505814e-32
quotient_of || alef || 2.26622221395e-32
quotient_of || Field2COMPLEX || 2.26622221395e-32
quotient_of || |[..]|2 || 2.26622221395e-32
transitive_rtrancl || NF || 2.15232111232e-32
groups_monoid_list || InnerVertices || 2.11450247377e-32
the2 || inf || 2.08971901779e-32
suc_Rep || --0 || 2.03911926531e-32
suc_Rep || euc2cpx || 2.03911926531e-32
code_int_of_integer || idsym || 2.03911926531e-32
field2 || opp || 2.03125858916e-32
comm_monoid || len || 1.95621399618e-32
order_well_order_on || is_an_UPS_retraction_of || 1.94175282292e-32
monoid || carrier\ || 1.91177349757e-32
bNF_Ca1811156065der_on || are_divergent<=1_wrt || 1.89131864586e-32
some || uparrow0 || 1.88615222859e-32
bNF_Ca646678531ard_of || opp || 1.83787016851e-32
field2 || opp1 || 1.80689708144e-32
code_nat_of_natural || FixedSubtrees || 1.77927056533e-32
bNF_Ca1811156065der_on || is_a_retraction_of || 1.69933906242e-32
transitive_acyclic || is_continuous_in || 1.61896219732e-32
order_well_order_on || are_divergent_wrt || 1.58756414345e-32
transitive_trancl || Partial_Intersection || 1.53445377796e-32
lattic1543629303tr_set || InnerVertices || 1.49543471808e-32
semilattice_neutr || carrier\ || 1.41260616321e-32
bNF_Ca1811156065der_on || are_convergent<=1_wrt || 1.3863034545e-32
transitive_rtrancl || Intersection || 1.33700308722e-32
bNF_Ca646678531ard_of || Absval || 1.28049476093e-32
transitive_rtrancl || Span || 1.26747487355e-32
transitive_trancl || Leading-Monomial || 1.24692566269e-32
suc_Rep || Web || 1.21523406765e-32
suc_Rep || tree0 || 1.21523406765e-32
wf || is_differentiable_in || 1.20469292643e-32
remdups || Cn || 1.14016816069e-32
order_well_order_on || are_convergent_wrt || 1.12616161059e-32
field2 || -BinarySequence || 1.09867137547e-32
order_well_order_on || is_derivable_from || 1.0775266227e-32
quotient_of || COMPLEX2Field || 1.01832389769e-32
bNF_Ca1811156065der_on || ==>1 || 9.90238681818e-33
transitive_rtrancl || len0 || 8.89693039104e-33
rev || -27 || 8.19738436747e-33
suc_Rep || -- || 7.72095038242e-33
order_well_order_on || are_coplane || 7.43747897221e-33
the2 || sup1 || 7.37782619885e-33
some || downarrow0 || 7.16709918455e-33
transitive_rtranclp || UniCl || 7.12918879541e-33
bNF_Ca1811156065der_on || |=7 || 6.82618826574e-33
wf || <N< || 6.34565953866e-33
order_well_order_on || |-2 || 6.0352311343e-33
bNF_Ca1811156065der_on || #slash##slash#8 || 5.88511716348e-33
quotient_of || UNIVERSE || 5.28525749834e-33
quotient_of || @8 || 5.28525749834e-33
bNF_Ca1811156065der_on || are_critical_wrt || 4.92350305433e-33
transitive_acyclic || meets || 4.76899397087e-33
lattic35693393ce_set || InnerVertices || 4.50721690463e-33
semilattice || carrier\ || 4.28655092677e-33
inc || *1 || 4.1976486302e-33
remdups || downarrow || 4.12942626852e-33
bit0 || euc2cpx || 3.95364442486e-33
code_int_of_integer || FixedSubtrees || 3.59363675041e-33
order_well_order_on || are_convertible_wrt || 3.56986804454e-33
bit1 || |....| || 3.4690041119e-33
quotient_of || (#hash#)22 || 3.03834185029e-33
quotient_of || \not\9 || 3.03834185029e-33
suc_Rep || Seg0 || 3.03834185029e-33
bNF_Ca1811156065der_on || is_unif_conv_on || 2.92159750298e-33
remdups || uparrow || 2.66293916013e-33
order_well_order_on || is_point_conv_on || 2.62869751251e-33
transitive_trancl || conv || 2.6026537822e-33
transitive_rtrancl || Affin || 2.5013233573e-33
transitive_trancl || Z_Lin || 2.49019277173e-33
append || union1 || 2.37150862089e-33
transitive_rtrancl || Lin0 || 2.21801476563e-33
comm_monoid || carrier\ || 2.10540431816e-33
code_nat_of_natural || Field2COMPLEX || 2.06281974072e-33
code_nat_of_natural || |[..]|2 || 2.06281974072e-33
transitive_rtranclp || Z_Lin || 2.06090728079e-33
transitive_rtranclp || Cn || 2.06090728079e-33
groups828474808id_set || InnerVertices || 2.02394153555e-33
order_well_order_on || is_a_cluster_point_of0 || 2.01855556221e-33
bNF_Ca1811156065der_on || _|_2 || 1.91053445791e-33
append || #quote##bslash##slash##quote#5 || 1.90576012099e-33
basic_BNF_xtor || -6 || 1.79544507958e-33
bNF_Ca1811156065der_on || is_convergent_to || 1.69657419386e-33
order_well_order_on || are_ldependent2 || 1.64622103419e-33
suc_Rep || Rev0 || 1.45662663321e-33
order_well_order_on || [= || 1.39377889299e-33
transitive_rtranclp || LAp || 1.17309173422e-33
code_nat_of_natural || COMPLEX2Field || 1.00091813161e-33
bNF_Ca646678531ard_of || uparrow0 || 9.89832661012e-34
transitive_rtranclp || UAp || 9.64200292278e-34
remdups || |` || 9.20066935796e-34
suc_Rep || ^2 || 8.91049186838e-34
suc_Rep || elementary_tree || 8.91049186838e-34
field2 || inf || 8.56121614741e-34
quotient_of || ^25 || 8.53908653235e-34
bNF_Ca1811156065der_on || is_properly_applicable_to || 8.41323631251e-34
order_well_order_on || is_applicable_to1 || 8.04840306152e-34
transitive_rtranclp || downarrow || 8.03240969876e-34
transitive_rtrancl || UniCl || 7.50943320098e-34
bNF_Ca1811156065der_on || c=1 || 7.41683918301e-34
append || #quote##slash##bslash##quote#2 || 7.3962453067e-34
suc_Rep || -50 || 6.43050688808e-34
quotient_of || #quote##quote#0 || 6.10861037558e-34
quotient_of || cpx2euc || 6.10861037558e-34
order_well_order_on || is_often_in || 5.7792722045e-34
transitive_rtrancl || ord || 5.6394566356e-34
code_nat_of_natural || @8 || 5.52535494687e-34
transitive_rtranclp || uparrow || 5.34199939001e-34
suc_Rep || -3 || 5.26091719712e-34
bNF_Ca646678531ard_of || downarrow0 || 4.91903778327e-34
transitive_trancl || #quote#4 || 4.88351727497e-34
code_int_of_integer || alef || 4.77973279419e-34
code_int_of_integer || Field2COMPLEX || 4.77973279419e-34
code_int_of_integer || |[..]|2 || 4.77973279419e-34
bNF_Ca1811156065der_on || is_eventually_in || 4.54848619259e-34
bNF_Ca1811156065der_on || is_differentiable_in5 || 4.51542986533e-34
quotient_of || x.0 || 4.5079513716e-34
order_well_order_on || <=\ || 4.39495624912e-34
order_well_order_on || is_continuous_in2 || 4.39008848997e-34
field2 || sup1 || 4.02552053707e-34
bNF_Ca1811156065der_on || divides1 || 3.35712545797e-34
code_nat_of_natural || (#hash#)22 || 3.34297431538e-34
code_nat_of_natural || \not\9 || 3.34297431538e-34
suc_Rep || goto || 3.07520939005e-34
set2 || R_EAL1 || 2.78205304265e-34
transitive_rtranclp || +75 || 2.45742084072e-34
transitive_rtrancl || Z_Lin || 2.43883024505e-34
transitive_rtrancl || Cn || 2.43883024505e-34
code_int_of_integer || COMPLEX2Field || 2.42370922167e-34
finite_finite2 || r3_tarski || 2.40777292548e-34
finite_finite2 || <= || 2.3127153908e-34
remdups || *49 || 2.11496479003e-34
suc_Rep || root-tree0 || 2.08754903185e-34
quotient_of || --0 || 2.08754903185e-34
quotient_of || euc2cpx || 2.08754903185e-34
transitive_rtranclp || |` || 1.98451528142e-34
set2 || max || 1.92959336015e-34
fun_is_measure || in0 || 1.90996007988e-34
transitive_rtranclp || ?0 || 1.8864061333e-34
bNF_Ca1811156065der_on || is_oriented_vertex_seq_of || 1.79059111185e-34
order_well_order_on || is_vertex_seq_of || 1.73164507307e-34
append || ^^ || 1.52398259473e-34
set2 || +84 || 1.51565253519e-34
transitive_rtrancl || LAp || 1.46093874488e-34
transitive_rtranclp || \or\3 || 1.4196829326e-34
code_int_of_integer || UNIVERSE || 1.3862015861e-34
code_int_of_integer || @8 || 1.3862015861e-34
quotient_of || Web || 1.36427797089e-34
quotient_of || tree0 || 1.36427797089e-34
finite_finite2 || <1 || 1.35168881687e-34
suc_Rep || #quote#0 || 1.22296698591e-34
transitive_rtrancl || UAp || 1.22200250082e-34
set2 || + || 1.15864397095e-34
transitive_rtranclp || =>2 || 1.10031108775e-34
transitive_rtrancl || downarrow || 1.03462188069e-34
set2 || lcm || 9.57102835336e-35
quotient_of || -- || 9.38741585313e-35
suc_Rep || <%..%> || 9.12800850521e-35
code_int_of_integer || (#hash#)22 || 8.63709072017e-35
code_int_of_integer || \not\9 || 8.63709072017e-35
code_nat_of_natural || #quote##quote#0 || 7.75576988269e-35
code_nat_of_natural || cpx2euc || 7.75576988269e-35
transitive_rtrancl || uparrow || 7.13117418581e-35
finite_finite2 || divides0 || 7.07631325016e-35
code_nat_of_natural || x.0 || 5.87590269101e-35
order_well_order_on || is_continuous_in0 || 5.21349303753e-35
bNF_Ca1811156065der_on || is_differentiable_in3 || 5.09382204019e-35
transitive_rtranclp || *49 || 5.01839128766e-35
transitive_rtranclp || \&\2 || 4.87537040306e-35
quotient_of || Seg0 || 4.33839637178e-35
transitive_rtrancl || +75 || 3.50592936907e-35
suc_Rep || succ1 || 3.3949803345e-35
code_nat_of_natural || --0 || 2.90482644237e-35
code_nat_of_natural || euc2cpx || 2.90482644237e-35
transitive_rtrancl || |` || 2.88249606293e-35
suc_Rep || #quote# || 2.79732401754e-35
transitive_rtrancl || ?0 || 2.75161561348e-35
order_well_order_on || << || 2.44797788079e-35
quotient_of || Rev0 || 2.35361099125e-35
bNF_Ca1811156065der_on || > || 2.34956601269e-35
code_int_of_integer || cpx2euc || 2.17626857236e-35
code_int_of_integer || #quote##quote#0 || 2.17626857236e-35
code_nat_of_natural || Web || 1.96673641396e-35
code_nat_of_natural || tree0 || 1.96673641396e-35
basic_BNF_xtor || - || 1.81153728404e-35
transitive_rtrancl || #bslash#3 || 1.73537520201e-35
code_int_of_integer || x.0 || 1.67401618188e-35
transitive_trancl || #slash##bslash#0 || 1.61133619419e-35
quotient_of || ^2 || 1.56139620438e-35
quotient_of || elementary_tree || 1.56139620438e-35
code_nat_of_natural || -- || 1.39539473102e-35
quotient_of || -50 || 1.18832618525e-35
quotient_of || -3 || 1.00423943994e-35
code_int_of_integer || --0 || 8.59494454219e-36
code_int_of_integer || euc2cpx || 8.59494454219e-36
code_nat_of_natural || Seg0 || 6.86104501634e-36
suc || idsym || 6.44908576747e-36
quotient_of || goto || 6.39554668963e-36
code_int_of_integer || Web || 5.93991864921e-36
code_int_of_integer || tree0 || 5.93991864921e-36
quotient_of || root-tree0 || 4.61417096869e-36
code_int_of_integer || -- || 4.29005600511e-36
code_nat_of_natural || Rev0 || 3.90459989392e-36
suc_Rep || product || 3.56513093739e-36
quotient_of || #quote#0 || 2.93649273825e-36
code_nat_of_natural || ^2 || 2.67321008212e-36
code_nat_of_natural || elementary_tree || 2.67321008212e-36
quotient_of || <%..%> || 2.29185466881e-36
code_int_of_integer || Seg0 || 2.18686767949e-36
code_nat_of_natural || -50 || 2.07700835933e-36
suc || FixedSubtrees || 1.88240483375e-36
code_nat_of_natural || -3 || 1.77758548789e-36
code_int_of_integer || Rev0 || 1.27978826236e-36
code_nat_of_natural || goto || 1.1706168191e-36
quotient_of || succ1 || 9.88098250861e-37
code_int_of_integer || ^2 || 8.92470856832e-37
code_int_of_integer || elementary_tree || 8.92470856832e-37
code_nat_of_natural || root-tree0 || 8.6495881106e-37
quotient_of || #quote# || 8.37543008993e-37
fun_is_measure || c= || 7.75046462436e-37
rev || - || 7.12165105423e-37
code_int_of_integer || -50 || 7.01874615562e-37
code_int_of_integer || -3 || 6.05159697805e-37
code_nat_of_natural || #quote#0 || 5.68669812081e-37
suc_Rep || <*..*>4 || 5.44468831803e-37
code_nat_of_natural || <%..%> || 4.51711350191e-37
suc || alef || 4.37153855479e-37
suc || Field2COMPLEX || 4.37153855479e-37
suc || |[..]|2 || 4.37153855479e-37
code_int_of_integer || goto || 4.0643335366e-37
code_int_of_integer || root-tree0 || 3.04552430077e-37
suc || COMPLEX2Field || 2.6550917167e-37
transitive_rtranclp || #bslash##slash#0 || 2.60179857917e-37
code_nat_of_natural || succ1 || 2.06471215384e-37
code_int_of_integer || #quote#0 || 2.04100891978e-37
suc || UNIVERSE || 1.75679104152e-37
suc || @8 || 1.75679104152e-37
code_int_of_integer || <%..%> || 1.63814171284e-37
quotient_of || product || 1.4257216044e-37
suc || (#hash#)22 || 1.23599445299e-37
suc || \not\9 || 1.23599445299e-37
code_int_of_integer || succ1 || 7.75085248422e-38
suc || ^25 || 5.46215921454e-38
suc || #quote##quote#0 || 4.3924064124e-38
suc || cpx2euc || 4.3924064124e-38
suc || x.0 || 3.60114354565e-38
code_nat_of_natural || product || 3.38311179164e-38
quotient_of || <*..*>4 || 2.78292321831e-38
suc || --0 || 2.16881954371e-38
suc || euc2cpx || 2.16881954371e-38
suc || Web || 1.63501198658e-38
suc || tree0 || 1.63501198658e-38
suc || -- || 1.27372871033e-38
suc_Rep || -0 || 1.10667438891e-38
suc || Seg0 || 7.57498236896e-39
code_nat_of_natural || <*..*>4 || 7.29567796884e-39
suc || Rev0 || 4.99858514761e-39
suc || ^2 || 3.7744538437e-39
suc || elementary_tree || 3.7744538437e-39
code_int_of_integer || <*..*>4 || 3.13532394894e-39
suc || -3 || 2.7854272704e-39
suc || goto || 2.03783024123e-39
suc || root-tree0 || 1.62351398285e-39
suc || #quote#0 || 1.18333658167e-39
suc || <%..%> || 9.94106146312e-40
quotient_of || -0 || 8.91781449103e-40
code_nat_of_natural || -0 || 2.82337613504e-40
code_int_of_integer || -0 || 1.35996913739e-40
suc || product || 1.35794649654e-40
suc || <*..*>4 || 4.07735120747e-41
