nat || 0_NN VertexSelector 1 || 0.664656821904
nibble || P_t || 0.647466830359
size_size || #slash# || 0.588145060767
zero_zero || -0 || 0.539926018142
size_nibble || Moebius || 0.539453894811
nat || NAT || 0.502302538666
zero_zero || {..}1 || 0.467306426767
nibble || GCD-Algorithm || 0.465053937997
size_size || . || 0.458198120152
nat || op0 {} || 0.435079233921
zero_zero || arccot0 || 0.399869546083
nil || 0. || 0.388687790523
nat || EdgeSelector 2 || 0.335369796565
zero_zero || elementary_tree || 0.320485647662
trans || c= || 0.295634788058
nat || omega || 0.293687007889
wf || <= || 0.293537438251
int || NAT || 0.287078125196
wf || are_equipotent || 0.285171952778
int || 0_NN VertexSelector 1 || 0.2810670196
one2 || op0 {} || 0.270338679627
nibble || sec || 0.262361716978
zero_zero || arctan0 || 0.242372614421
wf || c= || 0.237375895054
size_nibble || !5 || 0.2352634142
zero_zero || arcsin1 || 0.234118164755
size_nibble || tree0 || 0.223645832463
zero_zero || arccos || 0.220709473318
nibble || sin1 || 0.219537058511
size_nibble || elementary_tree || 0.217900403415
size_nibble || cos || 0.21365460041
size_nibble || ConwayDay || 0.209699983409
size_nibble || Mycielskian0 || 0.196032458266
nat || <i> || 0.186140569683
zero_zero || Arg || 0.175293780828
zero_zero || goto0 || 0.17097574389
nat || ConwayZero || 0.170500921765
id || {..}1 || 0.168679897396
int || op0 {} || 0.163549972744
size_nibble || carrier || 0.161754377551
distinct || <= || 0.158516430154
nat || REAL || 0.156036687334
zero_zero || return || 0.154682215272
zero_zero || EvenFibs || 0.153988894671
linorder_sorted || <= || 0.152422813394
zero_zero || halt || 0.152326602845
size_size || <*..*> || 0.151235770606
nat || SBP || 0.148768407541
int || omega || 0.145024364009
one_one || elementary_tree || 0.141877121255
nat || SCMPDS || 0.139622946469
nibble || the_arity_of || 0.137549955378
one2 || 0_NN VertexSelector 1 || 0.136213226704
zero_zero || Bin1 || 0.13585417331
code_nat_of_natural || code || 0.135040519924
ord_max || {..}1 || 0.129845652261
code_pcr_natural code_cr_natural || +16 || 0.129745699184
ord_min || {..}1 || 0.129642308813
real || 0_NN VertexSelector 1 || 0.127329901108
trans || are_equipotent || 0.116710495189
zero_zero || CompleteRelStr || 0.115501413381
one2 || NAT || 0.112386653302
real || op0 {} || 0.110661924924
zero_zero || Seg || 0.109383670489
code_int_of_integer || code || 0.106706876622
code_integer || 0_NN VertexSelector 1 || 0.103412935041
size_char || Top || 0.102153344402
sub || -41 || 0.101154903498
set || carrier || 0.100281719507
size_size || <*..*>5 || 0.0977793459357
code_natural || VAR || 0.0961095437895
nat2 || Top0 || 0.0950762704721
uminus_uminus || SubstPoset || 0.0930358825929
bNF_Ca1495478003natLeq || REAL || 0.0916392867567
nibble || 0_NN VertexSelector 1 || 0.0898212299366
nibble0 || EdgeSelector 2 || 0.0876010937807
product_size_unit || Moebius || 0.0853288662805
trans || c< || 0.0842326846389
size_size || <*..*>1 || 0.0826704127055
nibble1 || EdgeSelector 2 || 0.0822950506894
char2 || SubstLatt || 0.0821292207367
neg || EmptyGrammar || 0.0819917382795
nibble0 || P_t || 0.0806314452566
bNF_Ca1495478003natLeq || RAT || 0.0805580499111
nibbleA || EdgeSelector 2 || 0.0797785498061
less_than || REAL || 0.0794860733285
code_sub || -41 || 0.0790545658165
nibbleB || EdgeSelector 2 || 0.0789337417229
nibble8 || EdgeSelector 2 || 0.0781929947129
nat_of_nibble || Moebius || 0.0780962194011
nibble || omega || 0.0780905643359
nat || SourceSelector 3 || 0.0780043357887
nat || INT || 0.0771777413299
code_integer || VAR || 0.0771224304813
size_num || Moebius || 0.0767758029473
nibbleC || EdgeSelector 2 || 0.0759174488134
nibbleD || EdgeSelector 2 || 0.0754670603965
nat || TargetSelector 4 || 0.074409177645
nibbleF || EdgeSelector 2 || 0.074302092843
less_than || RAT || 0.0741984532779
map_fun || {..}8 || 0.0737823238138
num || VAR || 0.0735950402181
bNF_Ca1495478003natLeq || COMPLEX || 0.073414661658
nibble3 || EdgeSelector 2 || 0.0733447318116
nibble9 || EdgeSelector 2 || 0.0725350843769
nibble5 || EdgeSelector 2 || 0.0722911104302
nibble2 || EdgeSelector 2 || 0.0716222938712
nibble4 || EdgeSelector 2 || 0.0714176943195
code_natural || -66 || 0.0713999439934
nibbleE || EdgeSelector 2 || 0.0712211353176
nibble7 || EdgeSelector 2 || 0.0712211353176
product_unit || P_t || 0.0710647771878
nibble6 || EdgeSelector 2 || 0.071032045421
wf || c< || 0.0708330868664
bNF_Ca1495478003natLeq || DYADIC || 0.0696930717245
nibble1 || P_t || 0.0686431429183
less_than || COMPLEX || 0.0683092474544
size_size || PFBrt || 0.0676808821394
finite_psubset || xi || 0.0674422224573
one2 || EdgeSelector 2 || 0.0673642136381
uminus_uminus || #slash# || 0.06709461341
code_natural_of_nat || WeightSelector 5 || 0.0664409020682
num || P_t || 0.0663554550477
less_than || DYADIC || 0.066267753276
nibble0 || SourceSelector 3 || 0.0658385009714
less_than || REAL+ || 0.0654739958105
one_one || -0 || 0.0645498520528
code_integer_of_nat || ^25 || 0.0636190869036
code_integer || k5_ordinal1 || 0.0629486028669
code_pcr_natural code_cr_natural || *31 || 0.0622282647608
zero_zero || OddFibs || 0.0617568880414
rev || -6 || 0.0595984696774
nat2 || ELabelSelector 6 || 0.0589276791842
one2 || P_t || 0.0586499861789
trans || r3_tarski || 0.0585116164329
nibbleA || TargetSelector 4 || 0.0572585847999
inf_inf || *18 || 0.0572249929669
nibbleB || TargetSelector 4 || 0.0564814006791
code_int_of_integer || TargetSelector 4 || 0.0564355598001
nat2 || ^25 || 0.056338304425
code_nat_of_natural || ^25 || 0.0561549471141
nibble1 || SourceSelector 3 || 0.0561195813957
gcd_lcm || -SD_Sub_S || 0.055912591269
nibble8 || TargetSelector 4 || 0.0558037863145
code_natural || NAT || 0.0551851029719
nibbleA || P_t || 0.0546832564578
nibble0 || TargetSelector 4 || 0.0546687134874
zero_zero || 0. || 0.0541825939616
nibbleB || P_t || 0.053941049071
nat || RAT || 0.0539060213419
nibbleC || TargetSelector 4 || 0.0537443332889
nibbleD || TargetSelector 4 || 0.0533406327251
nibble1 || TargetSelector 4 || 0.0533406327251
nibble8 || P_t || 0.0532939310674
ratrel || ICC || 0.0532367884416
gcd_gcd || -SD_Sub_S || 0.053121244276
nibble_of_nat || TWOELEMENTSETS || 0.0528047324231
nat2 || Lang1 || 0.0523872063983
nibbleF || TargetSelector 4 || 0.0523023553057
remdups || -6 || 0.0522873876491
code_size_natural || ^25 || 0.0518448340508
product_prod || [..] || 0.0518231111364
lattic929149872er_Max || {..}1 || 0.0515554341016
nibble3 || TargetSelector 4 || 0.0514554533367
nibbleC || P_t || 0.0513271676904
nibbleD || P_t || 0.050941636816
nibble9 || TargetSelector 4 || 0.0507436468777
nibble5 || TargetSelector 4 || 0.0505299454199
one2 || SourceSelector 3 || 0.0500436648812
nibbleF || P_t || 0.0499500903333
nibble2 || TargetSelector 4 || 0.0499459808829
member || is_primitive_root_of_degree || 0.0498154874998
nibble4 || TargetSelector 4 || 0.0497678824367
nibbleE || TargetSelector 4 || 0.0495970221557
nibble7 || TargetSelector 4 || 0.0495970221557
product_Unity || EdgeSelector 2 || 0.0494823276846
bind || #slash#0 || 0.0494726379103
nibble6 || TargetSelector 4 || 0.0494328751114
finite_psubset || LowerCompoundersOf || 0.049233712167
zero_zero || +46 || 0.049207757671
code_Nat || VLabelSelector 7 || 0.0491919426427
nibble3 || P_t || 0.049141306033
code_natural || SourceSelector 3 || 0.0488231982188
wf || r3_tarski || 0.048680861642
finite_psubset || AtomicFormulaSymbolsOf || 0.0485789593505
bNF_Ca1495478003natLeq || REAL+ || 0.0484852829587
nibble9 || P_t || 0.0484615368333
nibble0 || NAT || 0.0484004712596
nibble5 || P_t || 0.0482574537237
finite_psubset || North_Arc || 0.0481205664418
finite_psubset || South_Arc || 0.0481205664418
nibble0 || op0 {} || 0.0477125394266
nibble2 || P_t || 0.0476997724163
nibble4 || P_t || 0.0475296898542
one_one || {..}1 || 0.047434317283
nibbleE || P_t || 0.0473665196713
nibble7 || P_t || 0.0473665196713
nibble6 || P_t || 0.0472097605655
sup_sup || +9 || 0.0471012437074
nibbleA || SourceSelector 3 || 0.0468335502468
antisym || c= || 0.0466500854073
code_natural_of_nat || ^25 || 0.0466245090078
pred_numeral || Moebius || 0.0465970497327
zero_zero || <*> || 0.046466437893
fun_pair_less || ICC || 0.0462699344006
nibbleB || SourceSelector 3 || 0.0462475880331
code_n1042895779nteger || VLabelSelector 7 || 0.0461044581036
nibble8 || SourceSelector 3 || 0.0457356776612
real || NAT || 0.0451486822679
at_top || {..}1 || 0.0451113740201
return_list || ^25 || 0.0450806954342
semiring_1_of_nat || {..}3 || 0.0446105853526
upt || k3_fuznum_1 || 0.0442615166593
nibbleC || SourceSelector 3 || 0.0441739725833
upt || height0 || 0.0440326484549
one_one || <*> || 0.0439338373473
nibbleD || SourceSelector 3 || 0.0438667998781
nat2 || ProperPrefixes || 0.0437381947419
int_ge_less_than2 || -CycleSet || 0.0434913882058
int_ge_less_than || -CycleSet || 0.0434913882058
one_one || +46 || 0.0434457056307
less_than || SCM+FSA-Memory || 0.0433421735847
complex || NAT || 0.0432581589768
nibble0 || Example || 0.0432067894575
finite_psubset || TermSymbolsOf || 0.0431273981766
nibbleF || SourceSelector 3 || 0.0430752023972
upt || ||....||2 || 0.0429117995064
int_ge_less_than2 || k1_integr20 || 0.0426450094958
int_ge_less_than || k1_integr20 || 0.0426450094958
suc || dl. || 0.0425794422594
less_than || S4-Taut || 0.042566342978
numeral_numeral || {..}2 || 0.0425222350859
pos || code || 0.0425182254094
nibble3 || SourceSelector 3 || 0.0424278200528
dvd_dvd || are_congruent_mod || 0.0423989634528
int_ge_less_than2 || i_e_s || 0.0422234315631
int_ge_less_than || i_e_s || 0.0422234315631
int_ge_less_than2 || i_n_w || 0.0422234315631
int_ge_less_than || i_n_w || 0.0422234315631
int_ge_less_than2 || i_n_e || 0.0422234315631
int_ge_less_than || i_n_e || 0.0422234315631
int_ge_less_than2 || i_s_w || 0.0422234315631
int_ge_less_than || i_s_w || 0.0422234315631
int_ge_less_than2 || i_w_s || 0.0422234315631
int_ge_less_than || i_w_s || 0.0422234315631
int_ge_less_than2 || i_s_e || 0.0422234315631
int_ge_less_than || i_s_e || 0.0422234315631
rat || op0 {} || 0.0420386888503
nibble9 || SourceSelector 3 || 0.0418825247569
nibble5 || SourceSelector 3 || 0.0417186026471
antisym || c< || 0.0414764094269
set || R_Algebra_of_BoundedLinearOperators || 0.0414738218706
pred_nat || DYADIC || 0.0412853894559
nibble2 || SourceSelector 3 || 0.0412701670495
bNF_Ca1495478003natLeq || INT || 0.0412381259705
code_pcr_integer code_cr_integer || +16 || 0.0412027294101
nibble4 || SourceSelector 3 || 0.0411332567882
set || R_Normed_Algebra_of_BoundedLinearOperators || 0.041071399858
neg || root-tree0 || 0.0410548007064
nibbleE || SourceSelector 3 || 0.0410018466592
nibble7 || SourceSelector 3 || 0.0410018466592
nibble6 || SourceSelector 3 || 0.0408755405776
nibble_of_nat || width || 0.040849193258
finite_finite2 || {..}1 || 0.0408374488953
finite_psubset || Domains_of || 0.0405108905437
typerep || 0_NN VertexSelector 1 || 0.0404432573768
int_ge_less_than2 || dyadic || 0.0400797145944
int_ge_less_than || dyadic || 0.0400797145944
neg || <*..*>4 || 0.0400048538502
product_Unity || P_t || 0.0393996872107
finite_psubset || sup5 || 0.0392797153524
nibble1 || NAT || 0.0389859252163
num_of_nat || TWOELEMENTSETS || 0.0389214835385
complex || op0 {} || 0.0387834528153
pred_nat || REAL+ || 0.0387289093913
nat_of_num || code || 0.0387075625974
nibble_of_nat || arccos || 0.0386632831938
pred_nat || REAL || 0.0382991761069
finite_psubset || Trees || 0.0382149764314
pred_nat || RAT || 0.0379947424443
bNF_Ca829732799finite || c< || 0.0379502353259
intrel || ICC || 0.0377306946764
nibble1 || op0 {} || 0.0373959285726
code_integer || omega || 0.0371173859426
upt || delta1 || 0.0368396516045
upt || dist || 0.0368396516045
suc || bool0 || 0.036791615206
antisym || are_equipotent || 0.0365401824535
real_Vector_of_real || U+ || 0.0363776044338
int_ge_less_than2 || i_w_n || 0.0362544739356
int_ge_less_than || i_w_n || 0.0362544739356
int_ge_less_than2 || width || 0.0362544739356
int_ge_less_than || width || 0.0362544739356
int_ge_less_than2 || i_e_n || 0.0362544739356
int_ge_less_than || i_e_n || 0.0362544739356
less_than || INT || 0.0360296429381
size_nibble || dom0 || 0.0357578616632
code_integer_of_int || ^25 || 0.0357444822727
list_update || to_power2 || 0.0356253000143
less_than || continuum || 0.0354414283218
numeral_numeral || {..}3 || 0.0354297953117
finite_3 || op0 {} || 0.0353667626945
one2 || <i>0 || 0.0350928191599
set || Ring_of_BoundedLinearOperators || 0.0350588072536
finite_psubset || dom0 || 0.0349184009469
one2 || *63 || 0.0348665179915
one2 || <j> || 0.0348665179915
finite_psubset || Toler_on_subsets || 0.0346165685995
bNF_Ca1495478003natLeq || SCM+FSA-Memory || 0.0345781555808
set || RRing || 0.0345747608995
code_natural || 0_NN VertexSelector 1 || 0.0344592179925
upto || k3_fuznum_1 || 0.0344506648794
code_natural || sqrreal || 0.0343742076356
one_one || Col || 0.0343202687639
product_Unity || TargetSelector 4 || 0.0341438295243
semilattice || are_equipotent || 0.0337571379189
int_ge_less_than2 || QC-symbols || 0.033412871751
int_ge_less_than || QC-symbols || 0.033412871751
lattic35693393ce_set || are_equipotent || 0.0332728033173
sin_coeff || ^25 || 0.0330634144845
order_under || EqTh || 0.0329139046332
pred_nat || COMPLEX || 0.032807112265
nibble1 || Example || 0.0327600476117
int || REAL || 0.0326832219176
upt || .cost()0 || 0.0326618559109
bNF_Ca829732799finite || c= || 0.0324347812381
abs_abs || {..}1 || 0.0321486729431
code_integer || NAT || 0.0320580338844
rotate1 || -6 || 0.0318878270942
upt || len3 || 0.0317135026868
int_ge_less_than2 || len || 0.0316921265666
int_ge_less_than || len || 0.0316921265666
tl || #slash#2 || 0.031533894872
fract || |8 || 0.0314970359864
sup_sup || *18 || 0.0314575139976
product_unit || GCD-Algorithm || 0.0313840367599
sublist || *18 || 0.0313642428455
upto || ||....||2 || 0.0312066707295
code_pcr_integer code_cr_integer || *31 || 0.0310628881688
code_int_of_integer || ^25 || 0.0310310947578
nat_of_num || Moebius || 0.0308556283428
finite_psubset || CnS4 || 0.0308536687296
bind || RightModule || 0.0307588550484
append || *158 || 0.0305522950504
int_ge_less_than2 || Entropy || 0.0305333956804
int_ge_less_than || Entropy || 0.0305333956804
int_ge_less_than2 || ApproxIndex || 0.0302273086032
int_ge_less_than || ApproxIndex || 0.0302273086032
int_ge_less_than2 || -SD_Sub || 0.0301078663443
int_ge_less_than || -SD_Sub || 0.0301078663443
int_ge_less_than2 || -SD_Sub_S || 0.0301078663443
int_ge_less_than || -SD_Sub_S || 0.0301078663443
pred_list || are_orthogonal1 || 0.0300037683204
finite_psubset || LConSet || 0.029984147751
finite_psubset || RConSet || 0.029984147751
code_natural || *31 || 0.0299345262327
upt || the_set_of_l2ComplexSequences || 0.0297879003234
finite_psubset || Toler0 || 0.0297637019233
listsp || are_orthogonal1 || 0.0296307193199
rcis || [:..:] || 0.0295712841489
product_Unity || SourceSelector 3 || 0.0292661068712
finite_psubset || Aut || 0.0292594175016
finite_psubset || .103 || 0.0292221313237
finite_psubset || Scott-Convergence || 0.0291656736099
antisym || r3_tarski || 0.0290866795392
finite_psubset || bool || 0.0288481534842
nibble0 || 0_NN VertexSelector 1 || 0.0286078245793
upt || ||....||3 || 0.0285564393104
int_ge_less_than2 || symplexes || 0.0285533871669
int_ge_less_than || symplexes || 0.0285533871669
finite_psubset || *64 || 0.0284815353844
ratreal || ^25 || 0.0283298803001
int_ge_less_than2 || -SD0 || 0.0283171351325
int_ge_less_than || -SD0 || 0.0283171351325
num || GCD-Algorithm || 0.0282306501205
num_of_nat || width || 0.0282243622434
pred_list || are_orthogonal0 || 0.0282123194097
int_ge_less_than2 || k5_moebius2 || 0.0280284088142
int_ge_less_than || k5_moebius2 || 0.0280284088142
inf_inf || #bslash##slash# || 0.0279907726884
upto || delta1 || 0.0279905926693
upto || dist || 0.0279905926693
listsp || are_orthogonal0 || 0.0278806246217
one2 || Example || 0.0278641475295
one2 || TargetSelector 4 || 0.0278308089227
zero_zero || 1.REAL || 0.0278138355272
filter2 || *18 || 0.0277954778212
set_ord_atMost || L~ || 0.0277765128132
bit0 || {..}1 || 0.0275134443183
return_list || <NAT,*,1> || 0.0274511390956
return_list || <NAT,+,0> || 0.0274483350782
bNF_Ca1495478003natLeq || INT- || 0.0273609122541
less_than || 1[01] || 0.0272996635482
less_than || 0[01] || 0.0272996635482
return_list || SourceSelector 3 || 0.0272719139543
suc || {..}1 || 0.0272179383971
inf_inf || +9 || 0.0270802686584
int || Trivial-addLoopStr || 0.0270619743613
bNF_Ca829732799finite || are_equipotent || 0.0269043983078
nat || *63 || 0.0267098205357
nat || <j> || 0.0267093045193
upto || height0 || 0.026617040806
finite_psubset || Seg || 0.0265398416571
cos_coeff || Leaves || 0.0265026584135
pred_nat || SCM+FSA-Memory || 0.0263982650126
transitive_trancl || .13 || 0.0263556414041
upt || frac0 || 0.0263466825386
size_num || tree0 || 0.0263441317285
upt || prob || 0.0262665159479
nat2 || proj1 || 0.0262155621874
bNF_Ca1495478003natLeq || S4-Taut || 0.0261159824755
zero_zero || idseq || 0.0260293475433
real || EdgeSelector 2 || 0.0259057258904
fract || tree || 0.0258570107783
finite_psubset || S-most || 0.0257998488577
int_ge_less_than2 || Normal_forms_on || 0.0257076140984
int_ge_less_than || Normal_forms_on || 0.0257076140984
remdups_adj || -6 || 0.0256471797321
nibble1 || 0_NN VertexSelector 1 || 0.0254609277378
nibbleA || Example || 0.0254427014526
finite_psubset || W-most || 0.0254292274493
finite_psubset || E-most || 0.0254060885256
bNF_Ca829732799finite || r3_tarski || 0.0253188045002
finite_psubset || N-most || 0.0252975988894
id || 0_Rmatrix0 || 0.0251598924133
upt || SubstitutionSet || 0.0251516841439
num_of_nat || arccos || 0.0251375512383
nat_of_nibble || tree0 || 0.0250237845989
nibbleB || Example || 0.0247500620102
bNF_Ca1495478003natLeq || TrivialInfiniteTree || 0.0247327018162
splice || *110 || 0.0246356705924
bit1 || RN_Base || 0.0245500897198
less_than || INT- || 0.0245038776227
upto || .cost()0 || 0.0244707131396
nat || SCM || 0.0243037953833
nibble8 || Example || 0.0241596688608
removeAll || *18 || 0.024061926818
gen_length || +10 || 0.0240179231466
product_size_unit || !5 || 0.0238960010723
less_than || SCM-Memory || 0.0238919364916
code_integer_of_int || code || 0.0238021656452
int_ge_less_than2 || Toler_on_subsets || 0.0237713319721
int_ge_less_than || Toler_on_subsets || 0.0237713319721
minus_minus || +9 || 0.0237366181786
ord_less_eq || c=1 || 0.0236974413182
upto || len3 || 0.0236840806931
pred_nat || *30 || 0.0236818503586
nat || IPC-Taut || 0.0235322353036
finite_psubset || Family_open_set0 || 0.0234631740719
int_ge_less_than2 || MidOpGroupObjects || 0.0234285622942
int_ge_less_than || MidOpGroupObjects || 0.0234285622942
int_ge_less_than2 || AbGroupObjects || 0.0234285622942
int_ge_less_than || AbGroupObjects || 0.0234285622942
finite_psubset || the_proper_Tree_of || 0.0233814900517
bit1 || denominator0 || 0.0232647103066
set || {..}1 || 0.0231200850051
nat_of_nibble || cos || 0.0230673237402
plus_plus || #bslash# || 0.0230627242116
code_Pos || code || 0.023034409098
finite_psubset || ConSet || 0.0230172226055
map || {..}4 || 0.0229109043199
finite_psubset || OwnSymbolsOf0 || 0.0228883675366
sub || |^|^ || 0.0227923404155
pred_nat || +20 || 0.0227105802643
nibbleC || Example || 0.0224402915423
product_size_unit || tree0 || 0.0223113312017
complex2 || tree || 0.0222776996436
pred_nat || S4-Taut || 0.0222660247822
int_ge_less_than2 || Catalan || 0.0221924792262
int_ge_less_than || Catalan || 0.0221924792262
plus_plus || #bslash##slash# || 0.0221248478648
nibbleD || Example || 0.0221161085674
upto || the_set_of_l2ComplexSequences || 0.0221012136373
nat_of_nibble || !5 || 0.0220836549582
size_num || !5 || 0.0219939837684
bNF_Ca1495478003natLeq || continuum || 0.0218991137021
bNF_Ca1495478003natLeq || SCM-Memory || 0.021826102954
nat || <i>0 || 0.0217857384802
int_ge_less_than2 || vol || 0.0217734002191
int_ge_less_than || vol || 0.0217734002191
less_than || TrivialInfiniteTree || 0.0216976962657
nibbleA || 14 || 0.0216877243386
nat_of_nibble || elementary_tree || 0.0215083507789
drop || *18 || 0.0214656718166
nibble0 || k5_ordinal1 || 0.0214083839964
binomial || |14 || 0.021403713594
finite_psubset || -SD_Sub || 0.021330777749
nibbleF || Example || 0.0213010457833
binomial || |21 || 0.0212944647479
size_num || elementary_tree || 0.0212414431
product_size_unit || ConwayDay || 0.0211926889412
nibbleB || 14 || 0.0211849506834
upto || ||....||3 || 0.0210991042784
size_num || Mycielskian0 || 0.0210882147974
upt || * || 0.0210838370272
sup_sup || NOT1 || 0.0210648682001
one2 || <i> || 0.0210613678583
splice || +10 || 0.0210609322044
product_size_unit || elementary_tree || 0.0210242893457
code_integer || -66 || 0.0210175495318
int || k5_ordinal1 || 0.0209073846263
inf_inf || NOT1 || 0.0208334587151
nibble8 || 14 || 0.0207539007925
semiring_1_of_nat || -tuples_on || 0.0207062835562
re || ^25 || 0.0206651285589
nibble3 || Example || 0.0206556933012
sgn_sgn || {..}1 || 0.0205633240968
less_than || CPC-Taut || 0.020553487748
finite_psubset || bool3 || 0.020405707332
int_ge_less_than2 || *57 || 0.0203600066793
int_ge_less_than || *57 || 0.0203600066793
int_ge_less_than2 || HFuncs || 0.0203600066793
int_ge_less_than || HFuncs || 0.0203600066793
finite_psubset || Subgroups || 0.0202832093424
int_ge_less_than2 || frac || 0.0201685252238
int_ge_less_than || frac || 0.0201685252238
trans || is_quadratic_residue_mod || 0.0201366820127
nibble9 || Example || 0.0201264484772
sup_sup || #bslash##slash# || 0.0201074147947
product_size_unit || Mycielskian0 || 0.0200960156926
int_ge_less_than2 || GroupObjects || 0.020053397729
int_ge_less_than || GroupObjects || 0.020053397729
nibble0 || 14 || 0.0200468227181
re || Moebius || 0.0199784661942
equiv_equivp || in || 0.0199728202741
nibble5 || Example || 0.0199698571298
pred_nat || 0_NN VertexSelector 1 || 0.0199626536715
neg || x#quote#. || 0.0198972720191
dup || \not\11 || 0.0198879437537
replicate || |-> || 0.0198473582893
sup_sup || permutations || 0.019838665636
map || multLoopStr0 || 0.0197856721348
inf_inf || permutations || 0.0196323190265
dropWhile || *18 || 0.0196151246734
less_than || 0 || 0.0196031297327
nibble2 || Example || 0.0195472792197
remove1 || *18 || 0.0195318192386
nibbleC || 14 || 0.019484563325
bNF_Ca1495478003natLeq || 0 || 0.019467588694
int_ge_less_than2 || k4_rvsum_3 || 0.0194402968894
int_ge_less_than || k4_rvsum_3 || 0.0194402968894
bit0 || RN_Base || 0.0194203813695
nibble4 || Example || 0.0194199353489
upto || frac0 || 0.0193208893812
arg || ^25 || 0.0193045732927
nibbleE || Example || 0.0192984337836
nibble7 || Example || 0.0192984337836
upto || prob || 0.0192568616047
nibbleD || 14 || 0.0192427588664
nibble1 || 14 || 0.0192427588664
finite_psubset || Family_open_set || 0.0192341587251
nat_of_nibble || Mycielskian0 || 0.0192164981852
inv_image || #quote#**#quote# || 0.0192150227817
nibble6 || Example || 0.0191823174765
product_size_unit || cos || 0.0191584221236
takeWhile || *18 || 0.019100472596
size_num || ConwayDay || 0.0190320647596
transitive_trancl || -root || 0.0189947573665
cofinite || NOT1 || 0.018903355312
int_ge_less_than2 || RingObjects || 0.0188846515333
int_ge_less_than || RingObjects || 0.0188846515333
sup_sup || -SD0 || 0.0188468730181
nat_of_num || {..}1 || 0.0187720906947
num_of_nat || InsCode || 0.0187466488813
inf_inf || -SD0 || 0.0186678216301
nat || SCM+FSA || 0.0186615406603
nibbleF || 14 || 0.0186311306746
nil || elementary_tree || 0.0186217237869
bit0 || denominator0 || 0.0186048595663
ord_less_eq || are_congruent_mod || 0.0185266347648
size_num || cos || 0.0182800020455
times_times || #bslash# || 0.0182565222884
nat || COMPLEX || 0.018158799465
nibble3 || 14 || 0.0181429807268
less_than || 4096 || 0.0181103729908
pred_nat || INT || 0.0180857095395
suc || Leaves || 0.0180763300655
left_unique || is_a_unity_wrt || 0.018060825313
sup_sup || derangements || 0.018041657235
wf || is_quadratic_residue_mod || 0.0180358515976
finite_card || UBD || 0.0179802226283
splice || +9 || 0.0179054225842
wf || in || 0.0179042214802
finite_psubset || lambda0 || 0.0178946381481
code_int_of_integer || product || 0.0178838658845
left_total || is_a_unity_wrt || 0.0178713919604
inf_inf || derangements || 0.0178695587536
bNF_Ca1495478003natLeq || EdgeSelector 2 || 0.0178491549412
code_pcr_natural code_cr_natural || +51 || 0.0178336297398
take || *18 || 0.0178313529491
field2 || {..}2 || 0.0178038226817
int_ge_less_than2 || .order() || 0.0177844521864
int_ge_less_than || .order() || 0.0177844521864
right_unique || is_a_unity_wrt || 0.0177824507554
nibble9 || 14 || 0.0177400001527
sublist || |^14 || 0.017735519687
times_times || #bslash##slash# || 0.017643822802
bNF_Ca1495478003natLeq || 0_NN VertexSelector 1 || 0.0176278911568
nibble5 || 14 || 0.0176202970951
nat2 || EdgeSelector 2 || 0.0175221153293
top_top || bool0 || 0.0175061123757
finite_psubset || the_Tree_of || 0.0174091513578
normal1132893779malize || NOT1 || 0.0173907666956
product_unit || sec || 0.0173821282069
less_than || EdgeSelector 2 || 0.0173764445385
nibble2 || 14 || 0.01729617198
int_ge_less_than2 || |....|2 || 0.0172702674649
int_ge_less_than || |....|2 || 0.0172702674649
finite_card || BDD || 0.0172564428495
pred_numeral || tree0 || 0.0172549832122
normal1132893779malize || -SD0 || 0.0172327556083
nibble4 || 14 || 0.0171981797922
int_ge_less_than2 || k1_numpoly1 || 0.0171693506808
int_ge_less_than || k1_numpoly1 || 0.0171693506808
nibbleE || 14 || 0.0171045447632
nibble7 || 14 || 0.0171045447632
int_ge_less_than2 || denominator || 0.0170946048976
int_ge_less_than || denominator || 0.0170946048976
ord_max || 0_Rmatrix0 || 0.0170853084589
ord_min || 0_Rmatrix0 || 0.0170491490715
pow2 || 1.0 || 0.0170242028392
less_than || <NAT,+> || 0.0170229446006
nibble6 || 14 || 0.0170149326291
one_one || Seg || 0.01700575037
int_ge_less_than2 || nextcard || 0.016914500074
int_ge_less_than || nextcard || 0.016914500074
concat || Sum5 || 0.0168842881206
top_top || 1. || 0.0168796472892
right_total || is_a_unity_wrt || 0.0168755298391
code_integer_of_nat || <*> || 0.016786058561
nat || REAL+ || 0.0167499201053
dup || Leaves || 0.0167461927179
code_integer || 1r || 0.0166098746586
code_integer || op0 {} || 0.0165488080546
int_ge_less_than2 || Center || 0.0165448410566
int_ge_less_than || Center || 0.0165448410566
sup_sup || CompleteSGraph || 0.0165421886171
cofinite || permutations || 0.016540685619
bot_bot || 1. || 0.0165195548659
bi_total || is_a_unity_wrt || 0.0165160925424
nat_of_nibble || ConwayDay || 0.0164396616634
csqrt || \not\11 || 0.0164137311131
pred_nat || continuum || 0.0164094388787
inf_inf || CompleteSGraph || 0.0163963669116
int_ge_less_than2 || card0 || 0.0163847145404
int_ge_less_than || card0 || 0.0163847145404
nat || CPC-Taut || 0.0163481490014
left_unique || is_distributive_wrt0 || 0.0163354595677
int_ge_less_than2 || Arg || 0.0163283856871
int_ge_less_than || Arg || 0.0163283856871
int_ge_less_than2 || cf || 0.0162478541047
int_ge_less_than || cf || 0.0162478541047
nibbleA || NAT || 0.0161764398044
left_total || is_distributive_wrt0 || 0.0161513408497
right_unique || is_distributive_wrt0 || 0.0160649885733
bi_unique || is_a_unity_wrt || 0.0160605136616
num || sec || 0.0160222294139
rotate1 || Half || 0.0160151754536
nibbleB || NAT || 0.0159991986033
normal1132893779malize || permutations || 0.015951446469
im || ^31 || 0.0159172710902
nibble8 || NAT || 0.0158439084646
finite_psubset || CnCPC || 0.0158422770173
append || *110 || 0.0157933202376
complex || REAL || 0.0156998652643
finite_psubset || variables_in4 || 0.0156862549415
append || +9 || 0.0156807741965
code_int_of_integer || {..}1 || 0.0155721115324
nat || RAT+ || 0.0155496858063
pred_nat || SCM-Memory || 0.0154849974411
set || OpSymbolsOf || 0.0153908713026
nibbleC || NAT || 0.0153675542003
cofinite || -SD0 || 0.0153377985462
gen_length || -1 || 0.0153037647091
nibbleD || NAT || 0.0152733944674
sup_sup || sproduct || 0.0152723607749
im || Leaves || 0.0152394680312
int_ge_less_than2 || *64 || 0.0152053119947
int_ge_less_than || *64 || 0.0152053119947
right_total || is_distributive_wrt0 || 0.0151879014199
inf_inf || sproduct || 0.0151471303845
product_unit || sin1 || 0.015133057737
suc || LeftComp || 0.0150959704118
nibbleF || NAT || 0.0150300295539
sqrt || \not\11 || 0.015028196527
nibble1 || k5_ordinal1 || 0.0150251805342
nibble || NAT || 0.015012640668
nat_of_num || tree0 || 0.0149956340599
product_Unity || Example || 0.0149843715253
set || ConSet || 0.0149654794933
int_ge_less_than2 || sproduct || 0.0149515014122
int_ge_less_than || sproduct || 0.0149515014122
suc || RightComp || 0.0149481931078
splice || +2 || 0.0149011223801
sublist || BCI-power || 0.014884851905
order_underS || InvCl || 0.0148491089565
order_underS || StabCl || 0.0148491089565
bi_total || is_distributive_wrt0 || 0.0148420287387
finite_psubset || Dir_of_Lines || 0.014839711281
nibble3 || NAT || 0.0148302354352
sup_sup || #slash##bslash# || 0.0147882733272
bNF_Ca1495478003natLeq || VAR || 0.0147268200899
nibble9 || NAT || 0.0146614090444
one2 || k5_ordinal1 || 0.0146566166916
arcsin || \not\11 || 0.0146178973971
nibble5 || NAT || 0.0146105612368
nat_of_nibble || carrier || 0.0145772565032
finite_psubset || On || 0.0145743501053
finite_psubset || ElementaryInstructions || 0.0145625405663
append || -1 || 0.0145556876395
pred_numeral || elementary_tree || 0.0145411279118
nibble2 || NAT || 0.0144712296922
cnj || \not\11 || 0.0144574281684
nibble4 || NAT || 0.0144286238593
bi_unique || is_distributive_wrt0 || 0.0144050711109
product_Unity || NAT || 0.0144017058154
nibbleE || NAT || 0.0143877000868
nibble7 || NAT || 0.0143877000868
nibble6 || NAT || 0.0143483384991
pred_nat || INT- || 0.0143186087594
code_dup || \not\11 || 0.014299545739
zero_zero || !5 || 0.0142981283384
finite_psubset || Seg0 || 0.0142963120482
rat || NAT || 0.0142868859902
less_than || I[01]0 || 0.0142847895174
less_than || 0_NN VertexSelector 1 || 0.0142618157024
ii || SourceSelector 3 || 0.0142482181786
removeAll || NF0 || 0.0141600960995
set || W-min || 0.0141081054858
pred_numeral || !5 || 0.0140858909532
order_under || TRS || 0.0140858166503
pow || hcf || 0.0140672445436
splice || -1 || 0.0140362242675
finite_psubset || sproduct || 0.014029461581
nat || SCM-Memory || 0.0139936346802
normal1132893779malize || derangements || 0.0139610718629
nibbleA || FALSE || 0.0139018456597
pred_numeral || cos || 0.0138399979762
times_times || {..}0 || 0.0138268401341
splice || +89 || 0.0138150164281
code_integer_of_nat || <*..*>4 || 0.013776833745
sup_sup || Seg || 0.013718617463
set || E-max || 0.0137080684257
zero_zero || [[0]] || 0.0136853449043
nibbleB || FALSE || 0.0136647665271
inf_inf || Seg || 0.0136336386523
pow || mod^ || 0.0136219101358
pow || $^ || 0.0136219101358
butlast || Half || 0.013616724803
set || sigma || 0.0136112708702
int_ge_less_than2 || proj1 || 0.0135685498942
int_ge_less_than || proj1 || 0.0135685498942
less_than || SCM+FSA-Instr || 0.0135670511057
ord_less_eq || in1 || 0.0135632681609
neg || cosech || 0.0135462284471
append || +10 || 0.0135149151291
csqrt || Leaves || 0.013496711971
remdups_adj || Half || 0.0134965540011
cofinite || derangements || 0.0134803987982
has_ve2132708402vative || {..}1 || 0.0134801234305
nibble8 || FALSE || 0.0134593932583
int || VAR || 0.0134476849383
num || sin1 || 0.0133922153012
code_pcr_natural code_cr_natural || *78 || 0.0133832242058
remdups || Half || 0.0133829888123
sup_sup || Fin || 0.0133361140685
arctan || \not\11 || 0.0133143709624
rat || EdgeSelector 2 || 0.0132968519246
ii || Example || 0.0132824492148
id_on || ^7 || 0.0132600923579
complex || 1q0 || 0.0132590995025
inf_inf || Fin || 0.013239316324
pos || cosech || 0.0132348055123
nibble0 || FALSE || 0.0131181300676
zero_zero || 1. || 0.0130322088983
gen_length || *110 || 0.0129375752609
set || the_Options_of || 0.0129214779973
less_than || y>=0-plane || 0.0128976564173
nibbleC || FALSE || 0.0128427412803
nat || one || 0.0128389304792
nibbleA || k5_ordinal1 || 0.0127816116701
set || CnIPC || 0.0127720215286
sup_sup || *0 || 0.0127428627083
set || !5 || 0.0127292503527
nibbleD || FALSE || 0.0127231783214
nibble1 || FALSE || 0.0127231783214
complex || <i>0 || 0.0127048035671
sqr || pr1 || 0.0126700056269
inf_inf || *0 || 0.0126540549646
sup_sup || Bags || 0.0125706470786
nibbleB || k5_ordinal1 || 0.0125531320492
sup_sup || product || 0.012550267047
im || ^25 || 0.0125495469986
union || _#bslash##slash#_0 || 0.0125399993503
dropWhile || NF0 || 0.0125193105307
pred_nat || TrivialInfiniteTree || 0.0125177446709
int_ge_less_than2 || CnPos || 0.0125154865026
int_ge_less_than || CnPos || 0.0125154865026
nat || y=0-line || 0.012501299424
inf_inf || Bags || 0.0124840951418
im || Rea || 0.012481007835
im || Im20 || 0.0124742742833
inf_inf || product || 0.0124639801668
bNF_Ca1495478003natLeq || CPC-Taut || 0.0124617397938
im || Im10 || 0.012429925758
nibble0 || TriangleGraph || 0.012423589467
remove1 || NF0 || 0.0124200290278
nibbleF || FALSE || 0.012417630976
measure || Sum0 || 0.0124146438645
normal1132893779malize || CompleteSGraph || 0.0124048206695
nat || SCM-Instr || 0.0123955885478
tl || Half || 0.0123720886295
nibble8 || k5_ordinal1 || 0.0123555010727
code_pcr_natural code_cr_natural || sin1 || 0.0123507581597
ii || P_t || 0.0123341248519
list || carrier || 0.0123317952947
int_ge_less_than2 || ^omega || 0.0123123030412
int_ge_less_than || ^omega || 0.0123123030412
complex || <j> || 0.0123095084052
complex || *63 || 0.0123087629757
trans || is_differentiable_on1 || 0.0122714856858
abs_Nat || CompleteRelStr || 0.0122480057917
nat_of_num || -0 || 0.0122338547609
code_pcr_integer code_cr_integer || +51 || 0.0122306826969
finite_psubset || BCK-part || 0.0122184124862
finite_psubset || AtomSet || 0.0122184124862
nibble3 || FALSE || 0.0121704719592
int_ge_less_than2 || the_Tree_of || 0.0121662496579
int_ge_less_than || the_Tree_of || 0.0121662496579
left_unique || is_an_inverseOp_wrt || 0.0121620737154
pow || -^ || 0.0121584357109
normal1132893779malize || 1_Rmatrix || 0.0121547752395
transitive_trancl || multMagma0 || 0.0121270123303
nat || IVERUM || 0.0121012871689
less_than || <NAT,*> || 0.0120423170931
union || _#slash##bslash#_0 || 0.0120388106487
size_size || {..}2 || 0.0120135920966
finite_psubset || sup3 || 0.012013143846
left_total || is_an_inverseOp_wrt || 0.0119978873919
nibble9 || FALSE || 0.0119641641253
transitive_trancl || #bslash##slash#0 || 0.0119607939368
pow || ^\ || 0.0119558373418
sup_sup || bool || 0.0119399938942
pos || {..}1 || 0.0119225018353
right_unique || is_an_inverseOp_wrt || 0.0119211077814
takeWhile || NF0 || 0.0119166952506
upto || * || 0.0119062555333
nibble5 || FALSE || 0.0119024779375
inf_inf || bool || 0.0118614579763
ord_max || #bslash##slash# || 0.0118584507092
pred_numeral || Mycielskian0 || 0.0118561238138
ord_min || #bslash##slash# || 0.0118491992923
complex || EdgeSelector 2 || 0.0118299140854
less_than || VAR || 0.011786242267
int_ge_less_than2 || |....| || 0.011781682783
int_ge_less_than || |....| || 0.011781682783
nibbleC || k5_ordinal1 || 0.0117637389354
nibble2 || FALSE || 0.0117345042584
one2 || omega || 0.0117160823469
neg || sech || 0.0116992330863
code_pcr_integer code_cr_integer || *78 || 0.0116954390703
pred_numeral || ConwayDay || 0.0116878083721
nibble4 || FALSE || 0.011683446988
sqr || pr2 || 0.0116768011936
sqr || firstdom || 0.0116768011936
nibbleD || k5_ordinal1 || 0.0116492884406
nibbleE || FALSE || 0.0116345398821
nibble7 || FALSE || 0.0116345398821
nibble_of_nat || InsCode || 0.0116166337798
measure || ^7 || 0.0116076526583
nibble6 || FALSE || 0.0115876235314
set2 || UAp0 || 0.0115875739648
set2 || LAp0 || 0.0115875739648
nibble_of_nat || <k>0 || 0.0115665780835
pos || sech || 0.0114639898041
cis || Leaves || 0.0114566808017
product_size_unit || carrier || 0.0114369296199
int_ge_less_than2 || diameter || 0.0114171038142
int_ge_less_than || diameter || 0.0114171038142
bot_bot || NOT1 || 0.0113923324902
finite_psubset || lim_sup || 0.0113582532132
nibbleF || k5_ordinal1 || 0.0113572308222
finite_psubset || cliquecover#hash# || 0.0113372625141
rev || Half || 0.011335859644
cofinite || CompleteSGraph || 0.0112949356333
one_one || CompleteRelStr || 0.0112878449825
neg || code || 0.0112567472313
cofinite || 1_Rmatrix || 0.0112281683699
code_integer || sqrreal || 0.0111997339823
normal1132893779malize || sproduct || 0.011157647831
right_total || is_an_inverseOp_wrt || 0.0111494113292
int_ge_less_than2 || *1 || 0.0111247434215
int_ge_less_than || *1 || 0.0111247434215
nibble3 || k5_ordinal1 || 0.0111214313365
size_num || carrier || 0.0111197189575
cnj || Leaves || 0.0111028399463
div_mod || #bslash# || 0.0110891225261
upto || SubstitutionSet || 0.0110720453043
antisym || is_quadratic_residue_mod || 0.0110651595638
normal1132893779malize || Seg || 0.0110634953939
measure || ConsecutiveSet2 || 0.0110444446187
measure || ConsecutiveSet || 0.0110444446187
nat_of_num || Col || 0.0110294358714
sub || * || 0.010993377932
code_integer_of_num || Moebius || 0.0109551191314
pred_nat || CPC-Taut || 0.0109507492869
drop || NF0 || 0.0109504835131
nibble9 || k5_ordinal1 || 0.0109249127214
code_sub || * || 0.0109066994096
lattic929149872er_Max || 0_Rmatrix0 || 0.0108964827895
append || +2 || 0.0108892222867
nibble5 || k5_ordinal1 || 0.0108662078759
bi_total || is_an_inverseOp_wrt || 0.0108492038053
bot_bot || permutations || 0.0108157500808
sqrt || *1 || 0.0108099192048
nibble || EdgeSelector 2 || 0.0107811078556
nibbleA || op0 {} || 0.0107757990423
topolo282751700pology || are_separated0 || 0.0107373779325
code_Neg || x#quote#. || 0.0107099026549
nibble2 || k5_ordinal1 || 0.0107064794661
nat || {}2 || 0.0106929463381
bot_bot || -SD0 || 0.0106877182278
pred_nat || k1_finance2 || 0.0106870427955
bitM || pr1 || 0.0106674184895
nibble4 || k5_ordinal1 || 0.0106579652546
code_Pos || idseq || 0.0106568142277
nibbleB || op0 {} || 0.010643148487
suc || sqr || 0.0106385385532
nat || WeightSelector 5 || 0.0106308931262
code_natural || sin0 || 0.0106223977491
nibbleE || k5_ordinal1 || 0.0106115102199
nibble7 || k5_ordinal1 || 0.0106115102199
equiv_part_equivp || in || 0.0105830976412
zero_zero || +45 || 0.0105789083311
nibble6 || k5_ordinal1 || 0.0105669609447
int_ge_less_than2 || topology || 0.0105550651085
int_ge_less_than || topology || 0.0105550651085
one_one || 1.REAL || 0.0105528863443
code_Pos || {..}1 || 0.0105366200701
take || NF0 || 0.0105346968266
int || 1r || 0.010533766081
nibble8 || op0 {} || 0.0105272236359
sup_sup || 1_Rmatrix || 0.0105016771911
sqr || apply || 0.010494056389
ord_max || #bslash# || 0.01048930389
ord_min || #bslash# || 0.0104804710716
bi_unique || is_an_inverseOp_wrt || 0.0104732714367
transitive_trancl || (#hash#)12 || 0.0104714960382
transitive_trancl || (#hash#)11 || 0.0104714960382
sublist || *8 || 0.0104551031881
inf_inf || 1_Rmatrix || 0.0104166688667
one_one || +45 || 0.0103811028052
sqrt || Leaves || 0.0103397417317
minus_minus || #bslash# || 0.0103366472115
gen_length || #bslash#1 || 0.0103217989368
measures || ^7 || 0.010316306477
int || COMPLEX || 0.0103067402489
times_times || {..}1 || 0.0102991745304
id || +45 || 0.0102944238741
int_ge_less_than2 || k1_matrix_0 || 0.0102781132821
int_ge_less_than || k1_matrix_0 || 0.0102781132821
less_than || 64 || 0.0102634356247
bot_bot || 0. || 0.0102398662913
filter2 || NF0 || 0.0102142831348
id_on || ConsecutiveSet2 || 0.0102019405066
id_on || ConsecutiveSet || 0.0102019405066
div_mod || #bslash##slash# || 0.0101983255201
nibbleC || op0 {} || 0.0101733445478
transp || in || 0.0101702904807
product_Unity || 14 || 0.0101597645098
nat_of_num || Mycielskian0 || 0.0101440423945
symp || in || 0.0101351740412
divide_divide || #bslash# || 0.0101351061992
ii || EdgeSelector 2 || 0.0101050946487
nibbleD || op0 {} || 0.0101037000155
bNF_Ca829732799finite || is_quadratic_residue_mod || 0.0101006428425
sqr || the_transitive-closure_of || 0.010100312705
int_ge_less_than2 || dom0 || 0.0100831941054
int_ge_less_than || dom0 || 0.0100831941054
abs_Nat || {..}1 || 0.0100572367606
neg || coth || 0.0100381157207
pow2 || OSCl || 0.0100233954824
insert3 || EqCl1 || 0.00996773358328
pow || -24 || 0.00996375038523
sublist || *3 || 0.00995599550043
bot_bot || derangements || 0.00995419747967
less_than || NAT || 0.00994221352344
divide_divide || #bslash##slash# || 0.00993288856317
bitM || pr2 || 0.00993284533167
bitM || firstdom || 0.00993284533167
nibbleF || op0 {} || 0.00992416200243
measure || FinMeetCl || 0.00990985036286
minus_minus || #bslash##slash# || 0.00990762316232
condit1810911227_above || NOT1 || 0.00989458473724
pos || coth || 0.00986481995738
nibble1 || TriangleGraph || 0.00986346973032
finite_psubset || *1 || 0.00982831217856
set || nabla || 0.00981519867247
finite_psubset || chromatic#hash# || 0.00980475158563
nat_of_num || cpx2euc || 0.00980281445965
nibble3 || op0 {} || 0.00977726686484
less_than || 32 || 0.00975340113327
pred_nat || 0 || 0.009731440324
cofinite || sproduct || 0.00968746707538
less_than || *31 || 0.00968027716516
set || proj4_4 || 0.00966800785774
nibble9 || op0 {} || 0.00965348963762
nibble5 || op0 {} || 0.00961627244653
finite_psubset || NonZero || 0.00957533479013
product_Unity || FALSE || 0.00957052079478
nat || F_Complex || 0.00956653368817
num_of_nat || <k>0 || 0.0095299051937
zero_Rep || op0 {} || 0.00952342987365
nibble2 || op0 {} || 0.00951443903572
sqr || k15_trees_3 || 0.00951432527209
nibble4 || op0 {} || 0.00948334286868
nibble_of_nat || Product2 || 0.00948187009954
complex || 0_NN VertexSelector 1 || 0.00948086333473
cnj || -0 || 0.00946739469628
transitive_rtrancl || ^7 || 0.00945620864084
nibbleE || op0 {} || 0.00945349338886
nibble7 || op0 {} || 0.00945349338886
nibble6 || op0 {} || 0.00942480092546
finite_psubset || InnerVertices || 0.00942023826437
nibble_of_nat || `1 || 0.00939810843474
minus_minus || *18 || 0.00937613522546
normal1132893779malize || Fin || 0.00937283209375
nibble_of_nat || `2 || 0.00937160104644
pow || #bslash#+#bslash# || 0.00930377813512
sqr || disjoin || 0.00928727905152
pred_nat || 12 || 0.00928622665721
transitive_trancl || ^7 || 0.00928363541043
finite_psubset || bool0 || 0.00924510003396
sqr || proj4_4 || 0.00923161762858
bot_bot || CompleteSGraph || 0.00921960107859
num_of_nat || UsedIntLoc || 0.00921175995336
splice || #bslash#1 || 0.00920460305812
code_dup || Leaves || 0.00920252583764
numeral_numeral || -tuples_on || 0.0091789510506
condit1810911227_above || -SD0 || 0.00913063000088
pred_numeral || carrier || 0.00911771946681
condit1810911227_above || permutations || 0.00910691619287
gen_length || +9 || 0.00909350866198
bitM || apply || 0.00904531544475
measures || ConsecutiveSet2 || 0.00904055712107
measures || ConsecutiveSet || 0.00904055712107
distinct || are_equipotent || 0.00900376463374
neg || cosh || 0.0090013188221
finite_psubset || union0 || 0.00899657944292
int || EdgeSelector 2 || 0.00895900764381
num_of_nat || Inv0 || 0.00893490955496
sqr || ProperPrefixes || 0.00891774952038
nat_of_num || cos || 0.00889237691792
filter2 || *8 || 0.00887152054495
pos || cosh || 0.008862954182
nat_of_num || elementary_tree || 0.0088565343685
normal1132893779malize || *0 || 0.00885256142766
sqr || proj1 || 0.00885036602458
finite_psubset || k1_rvsum_3 || 0.00883955393891
transitive_trancl || +*0 || 0.00879440299558
nat_of_num || dl. || 0.00878603490965
transitive_trancl || Closed-Interval-TSpace || 0.00875620071307
butlast || -6 || 0.00875058055817
bitM || the_transitive-closure_of || 0.00874621124516
neg || cot || 0.00874272089099
cofinite || Seg || 0.00873164612872
bitM || proj4_4 || 0.00871090963121
normal1132893779malize || Bags || 0.00870376047423
normal1132893779malize || product || 0.00868621679197
finite_psubset || k1_latticea || 0.00868575582516
finite_psubset || [#slash#..#bslash#] || 0.00866888372843
sqr || Mersenne || 0.0086549233969
sqr || .67 || 0.0086549233969
tl || -6 || 0.00865359723332
semiring_1_of_nat || NOT1 || 0.00865254518405
left_unique || is_distributive_wrt || 0.00861580925892
pos || cot || 0.00861041563041
bot_bot || sproduct || 0.00858589736733
int_ge_less_than2 || carrier || 0.00858056426688
int_ge_less_than || carrier || 0.00858056426688
inc || NOT1 || 0.00856852652293
im || P_cos || 0.00856778488098
code_integer_of_num || tree0 || 0.00856494641685
set || k1_int_8 || 0.00855911479126
sqr || varcl || 0.00855210331405
ord_max || +45 || 0.00854495931458
inv_image || #slash#. || 0.00852789480765
left_total || is_distributive_wrt || 0.00852232563338
finite_psubset || Upper_Arc || 0.00851259018317
nibbleA || TriangleGraph || 0.00849644142767
ord_min || +45 || 0.00849401191642
finite_psubset || Lower_Arc || 0.00849237389862
int || Z_3 || 0.00849179164647
right_unique || is_distributive_wrt || 0.00847845547843
set || IConSet || 0.00845712199325
append || +89 || 0.00844303108055
measures || FinMeetCl || 0.00844186220719
neg || tan || 0.00841805452652
bNF_Ca1495478003natLeq || SCM+FSA-Instr || 0.00839363971413
set || the_normal_subgroups_of || 0.00837794736335
bitM || proj1 || 0.00837385678577
nat || 1q0 || 0.0083568269925
zero_zero || first_epsilon_greater_than || 0.00832382309255
arcsin || Leaves || 0.00831701081298
sqr || doms || 0.00831566256346
int || ConwayZero0 || 0.00830575849315
bitM || k15_trees_3 || 0.00829724392311
pos || tan || 0.00829570141235
bot_bot || Seg || 0.00826351016915
nibbleB || TriangleGraph || 0.00826104329045
semiring_1_of_nat || -SD0 || 0.00825512379341
topolo282751700pology || are_separated || 0.00824611817826
order_underS || EqCl1 || 0.00823234201843
int || VERUM2 || 0.00822991638807
less_than || 16 || 0.00822280321782
sqr || Catalan || 0.00819849006463
pow || |^22 || 0.00819759005893
neg || sinh || 0.00819470457947
sqr || TWOELEMENTSETS || 0.00818902513791
code_integer || *31 || 0.00817382664101
normal1132893779malize || bool || 0.00816720368405
semiring_1_of_nat || permutations || 0.00815933816662
neg || cosh0 || 0.00815488585595
product_Unity || op0 {} || 0.00813680963869
code_Suc || dl. || 0.00813322157007
bitM || disjoin || 0.00812197129311
at_top || 0_Rmatrix0 || 0.00811286220175
product_unit || the_arity_of || 0.0080967647047
code_integer_of_num || <*> || 0.00808983832945
set || k3_rvsum_3 || 0.00808598157773
pos || sinh || 0.00808417588544
set || RelSymbolsOf || 0.00808231965646
set || omega0 || 0.00808227474782
nibble8 || TriangleGraph || 0.00806058213811
less_than || +16 || 0.0080526532732
pos || cosh0 || 0.00804323480852
bNF_Ca1495478003natLeq || y>=0-plane || 0.00804235854271
right_total || is_distributive_wrt || 0.00803191383125
ii || NAT || 0.00802405533284
order_underS || Result2 || 0.00801995429588
wf || is_differentiable_on1 || 0.00801944291036
sqrt || sgn || 0.00800982401903
condit1810911227_above || derangements || 0.00800976215025
nat || invquaternion || 0.00800777109653
finite_psubset || len || 0.0079729210626
measure || Product1 || 0.00796613828835
real || REAL || 0.00795770917074
int || SourceSelector 3 || 0.00795605715795
sqr || ..1 || 0.00794127026377
set || InnAut || 0.00793540671411
nil || (Omega). || 0.00793239449167
nibble_of_nat || Inv0 || 0.00793160117935
set || LettersOf || 0.0079272787069
nibble_of_nat || Sum4 || 0.00791363502222
inc || permutations || 0.00790301447988
finite_psubset || TAUT || 0.00788853916742
sqr || uncurry\ || 0.0078693323349
bi_total || is_distributive_wrt || 0.00785534453011
bitM || ProperPrefixes || 0.00783503201497
zero_zero || epsilon_ || 0.00783305738979
bot_bot || {..}1 || 0.00783081753332
set || LowerCompoundersOf || 0.00781399065366
set || OwnSymbolsOf0 || 0.00781399065366
id2 || succ1 || 0.00775958268265
pow || |^10 || 0.00775698610751
complete_Sup_Sup || NOT1 || 0.00775473604004
sqr || ~1 || 0.00773812323382
sqr || curry || 0.00773812323382
sqr || curry\ || 0.00773812323382
suc || MIM || 0.00773636641172
pow || #bslash#3 || 0.0077269137341
pred_nat || *137 || 0.00769069336619
product_Unity || k5_ordinal1 || 0.00768843595639
nibble_of_nat || Rea || 0.00768404151271
arctan || Leaves || 0.00764196390728
sqr || SubFuncs || 0.00763424679622
linorder_sorted || are_equipotent || 0.00763224605242
bi_unique || is_distributive_wrt || 0.00763188462191
sqr || uncurry || 0.00762112773085
cofinite || Fin || 0.00760969908971
int || 0.1 || 0.00760557749583
bot_bot || Fin || 0.00759832388405
removeAll || *8 || 0.00759599760841
code_Pos || OddFibs || 0.00757966708376
set || Irr || 0.00757403424343
sqr || Funcs1 || 0.0075671519362
bitM || Mersenne || 0.00755494260744
bitM || .67 || 0.00755494260744
bitM || varcl || 0.00754841375778
set || lambda0 || 0.00752968570473
ord_less_eq || is_exactly_partitable_wrt || 0.00752365031623
nibble_of_nat || Im20 || 0.00752324748941
nibble_of_nat || Im10 || 0.00748928356718
num || the_arity_of || 0.0074803660858
num_of_nat || Product2 || 0.00748003998618
nibbleC || TriangleGraph || 0.00747776799612
nat_of_num || !5 || 0.00747207443076
bot_bot || product || 0.0074711310861
abs_Nat || elementary_tree || 0.00746220017736
complete_Sup_Sup || -SD0 || 0.00746034901176
gen_length || +2 || 0.00745369430303
measure || max || 0.00745274839084
bit1 || |^5 || 0.0074500409932
id2 || the_transitive-closure_of || 0.00744508741984
semiring_1_of_nat || derangements || 0.00743430355983
zero_zero || TOP-REAL || 0.00742988511194
finite_psubset || proj1 || 0.00742239152825
product_Unity || 0_NN VertexSelector 1 || 0.00741650001363
one2 || FALSE || 0.00741173709224
nibble0 || ECIW-signature || 0.00740854581868
nat || R^2-unit_square || 0.00738743347363
one2 || 14 || 0.00737099848291
nibbleD || TriangleGraph || 0.00736804318437
nat || DYADIC || 0.00736530134118
zero_zero || Inv0 || 0.00732948761243
nibble_of_nat || Sum || 0.00731947452259
condit1810911227_above || 1_Rmatrix || 0.00731080518837
bot_bot || *0 || 0.00729043454054
insert3 || +89 || 0.00728743090259
im || chromatic#hash#0 || 0.00727831683026
real || ConwayZero || 0.00727267629058
id2 || [*] || 0.00726994060973
zero_zero || Stop || 0.0072693699631
arctan || #quote# || 0.00726801016633
complete_Sup_Sup || permutations || 0.00726718387111
semiring_1_of_nat || |->0 || 0.00726483377813
bitM || TWOELEMENTSETS || 0.00726267854631
code_Pos || CompleteSGraph || 0.00724642879006
set || k5_rvsum_3 || 0.00723194284915
bitM || Catalan || 0.00720165268903
set || Lim1 || 0.00720164806114
bot_bot || Bags || 0.00720058119952
less_than || IPC-Taut || 0.00719294436763
set || Open_Domains_of || 0.00717949910294
set || Closed_Domains_of || 0.00717949910294
code_Pos || NatDivisors || 0.00717355330644
bitM || doms || 0.00716677003966
code_natural || sqrcomplex || 0.00714505550731
condit1810911227_above || CompleteSGraph || 0.00714498322876
sqr || Rank || 0.00714410052854
bot_bot || bool || 0.00712505592535
times_times || *29 || 0.00712284415278
empty || (Omega). || 0.00711087641787
nat || I[01]0 || 0.00710383674916
real_V1632203528linear || is_a_unity_wrt || 0.00710354722743
cos_coeff || ^31 || 0.00709902159067
size_size || [....]5 || 0.00709575271091
nibbleF || TriangleGraph || 0.00709239969259
bitM || ..1 || 0.00706599181279
cofinite || *0 || 0.00705126039778
set || k6_rvsum_3 || 0.00704966412122
sqr || Sgm || 0.00704648497494
pow || ConsecutiveSet2 || 0.00703011586054
pow || ConsecutiveSet || 0.00703011586054
set || lim_inf-Convergence || 0.00702691219412
num || SourceSelector 3 || 0.00702509846737
ord_max || ^ || 0.00702112860603
order_underS || TRS || 0.00701789814913
ord_min || ^ || 0.00701527038853
bitM || uncurry\ || 0.0070086730935
id2 || CnPos || 0.00699470429717
set || Generators || 0.00697641557406
set || -SD_Sub_S || 0.00697423524188
re || elementary_tree || 0.00694019087713
bot_bot || {}1 || 0.00691605709242
bitM || ~1 || 0.00690388134288
bitM || curry || 0.00690388134288
bitM || curry\ || 0.00690388134288
pred_nat || SCM+FSA-Instr || 0.0069018284055
cofinite || Bags || 0.00689527738634
id2 || k5_ltlaxio3 || 0.00688331645238
set || TermSymbolsOf || 0.00687877455688
cofinite || product || 0.00687699461417
nibble3 || TriangleGraph || 0.00687438004168
cnj || Mycielskian1 || 0.00687026307591
pred_nat || EdgeSelector 2 || 0.00685795672921
semiring_1_of_nat || CompleteSGraph || 0.00682727655564
arctan || *1 || 0.00681270701749
set || FinTrees || 0.00681123007544
bitM || uncurry || 0.00681016872111
re || ConwayDay || 0.00680830499542
pos || CompleteRelStr || 0.00680699993187
transitive_trancl || ConsecutiveSet2 || 0.00679192836139
transitive_trancl || ConsecutiveSet || 0.00679192836139
pred_nat || ELabelSelector 6 || 0.00678619483454
pow || ^0 || 0.00678383211122
bitM || Funcs1 || 0.00676684668347
finite_finite2 || 0_Rmatrix0 || 0.00676675485325
drop || *8 || 0.00674601179156
re || !5 || 0.00674424855845
pred_nat || *31 || 0.00672426664799
nibble9 || TriangleGraph || 0.00669573634779
int || SCM-Data-Loc || 0.00667672484867
condit1810911227_above || Seg || 0.00667546617555
less_than || +21 || 0.00666981127491
re || cos || 0.00666675232566
size_size || |[..]| || 0.00666137040006
ii || k5_ordinal1 || 0.00665292730167
bitM || SubFuncs || 0.00665075461011
nibble5 || TriangleGraph || 0.0066429058737
code_integer_of_num || <*..*>4 || 0.00663627416005
sqr || field || 0.00663416776543
code_Neg || cosech || 0.00662535896797
antisym || is_differentiable_on1 || 0.0066235032746
set || 0. || 0.00662124239259
top_top || SmallestPartition || 0.00660587115612
dropWhile || *8 || 0.00659696593787
measures || max || 0.00659648299572
nat || *30 || 0.00658850336863
sqr || meet0 || 0.00657836505634
pow || +*0 || 0.0065688639966
remove1 || *8 || 0.00656867580152
complete_Sup_Sup || derangements || 0.00656089257501
pow || RED || 0.00655380960042
pow || quotient || 0.00655380960042
bitM || Rank || 0.00655318763057
id2 || CnIPC || 0.00654394914071
cos_coeff || {..}1 || 0.00653878700231
semiring_1_of_nat || Seg || 0.00653401710525
size_size || [....] || 0.0065334010647
pred_nat || y>=0-plane || 0.00652433402897
nat_of_num || carrier || 0.00651862134317
inc || derangements || 0.00651222621105
pred_nat || WeightSelector 5 || 0.006502587306
nibble2 || TriangleGraph || 0.00650039671379
set || NatDivisors || 0.00649671266557
nat || +20 || 0.00648646419514
id2 || CnCPC || 0.00647745666264
id2 || Subtrees0 || 0.00647745666264
one_one || Moebius || 0.00647581876777
nibble4 || TriangleGraph || 0.00645746852876
less_than || 8 || 0.00645678739942
condit1810911227_above || sproduct || 0.0064472773743
nat || G_Quaternion || 0.00642630072751
takeWhile || *8 || 0.00642223235255
transitive_rtrancl || ConsecutiveSet2 || 0.00642022474696
transitive_rtrancl || ConsecutiveSet || 0.00642022474696
nibbleE || TriangleGraph || 0.00641651712406
nibble7 || TriangleGraph || 0.00641651712406
id2 || Inv0 || 0.00641620544353
bot_bot || +14 || 0.00641511085369
id || -0 || 0.00641483000049
set || CnCPC || 0.00641278514344
pow || free_magma || 0.00640853040689
cis || NAT || 0.00639757265168
transitive_trancl || exp4 || 0.0063970371501
num_of_nat || Rea || 0.00639521415091
num_of_nat || `1 || 0.00638977163045
nibble6 || TriangleGraph || 0.00637738745952
num_of_nat || `2 || 0.00637104719088
pred_nat || omega || 0.00636739968218
pred_nat || VAR || 0.0063650823659
code_Pos || cosech || 0.00634980086999
cofinite || bool || 0.00634621363418
bitM || Sgm || 0.00634602123586
ring_1_of_int || -SD0 || 0.00634596801325
ratreal || code || 0.00634571008483
finite_psubset || N-bound || 0.00632315304259
zero_zero || {}1 || 0.00631517335223
num_of_nat || Im20 || 0.00631213338812
semiring_1_of_nat || sproduct || 0.00631175347453
set || TWOELEMENTSETS || 0.00629980074623
num_of_nat || `1_31 || 0.00629167733443
zero_zero || N-min || 0.00628689182537
num_of_nat || Im10 || 0.00628275526594
pow || div^ || 0.00628003780789
zero_zero || Col || 0.00627996570064
id2 || CnS4 || 0.00625753771728
bit0 || |^5 || 0.00624302958221
one_one || cpx2euc || 0.00622846610235
code_Neg || code || 0.00621187544189
id2 || sup4 || 0.00621141306609
bNF_Ca829732799finite || is_differentiable_on1 || 0.00620415551338
inverse_inverse || #slash# || 0.00619835133548
one2 || TriangleGraph || 0.00619205905425
append || #bslash#1 || 0.00618246816539
pred_nat || *136 || 0.00618136061076
cnj || *\10 || 0.00617262718655
im || Moebius || 0.00615696354697
nibbleA || 0_NN VertexSelector 1 || 0.00615486432604
one2 || 0c || 0.00614085245839
bot_bot || #quote# || 0.00612282494822
set || SortsWithConstants || 0.00611954596402
sqr || ~2 || 0.00609756824335
nibbleB || 0_NN VertexSelector 1 || 0.00608732740717
complete_Sup_Sup || 1_Rmatrix || 0.00607965449661
sqr || Fib || 0.00607512484596
cos_coeff || Im20 || 0.00606221283404
id2 || Mycielskian1 || 0.00605196434127
semiring_1_of_nat || #slash# || 0.00604013895845
cos_coeff || Im10 || 0.00603403857086
nibble8 || 0_NN VertexSelector 1 || 0.0060281568267
num_of_nat || Sum4 || 0.00602754733074
numeral_numeral || <*..*>1 || 0.00602715091418
plus_plus || #slash#^ || 0.00602474915046
bitM || field || 0.00600885662783
pred_nat || TargetSelector 4 || 0.00600245084609
take || *8 || 0.00599174906666
nibble_of_nat || `1_31 || 0.00598684184514
complete_Sup_Sup || CompleteSGraph || 0.00597912720827
pow || #bslash##slash#0 || 0.00596726319163
zero_Rep || EdgeSelector 2 || 0.00596318326518
bitM || meet0 || 0.00596294950798
finite_psubset || E-bound || 0.00595390347372
cos_coeff || Rea || 0.00595140545359
complete_Sup_Sup || Seg || 0.00594415450822
pred_nat || +73 || 0.00590060111983
rcis || width || 0.0058761125453
nibbleC || 0_NN VertexSelector 1 || 0.00584666190121
order_under || variables_in2 || 0.00584470616847
code_natural_of_nat || code || 0.00581223092786
nibbleD || 0_NN VertexSelector 1 || 0.00581078830135
order_underS || variables_in3 || 0.00580594487982
int || INT || 0.00579851022515
re || carrier || 0.00577856283051
semiring_1_of_nat || 1_Rmatrix || 0.00577382699846
sgn_sgn || 0_Rmatrix0 || 0.00575701617672
code_natural || -45 || 0.00574723427791
pow || **6 || 0.00573098460316
code_Neg || sech || 0.00572216348518
id2 || Rank || 0.00572155674054
nibbleF || 0_NN VertexSelector 1 || 0.00571807261724
zero_zero || 0_Rmatrix0 || 0.00571739531821
normal627294541factor || -SD0 || 0.005707738093
complex || F_Complex || 0.00569815655441
set || support0 || 0.00569261732052
pow || lcm0 || 0.00566364093719
finite_psubset || upper_bound2 || 0.00565566103475
num_of_nat || Product7 || 0.00565391670765
nibble3 || 0_NN VertexSelector 1 || 0.00564195959093
inc || CompleteSGraph || 0.00563685960774
set || Free || 0.00561547650476
real || <j> || 0.00560940165727
real || *63 || 0.00560930899036
pow || |^|^ || 0.00560096012354
sqr || id6 || 0.00558571546286
nibble9 || 0_NN VertexSelector 1 || 0.00557764626937
bitM || ~2 || 0.00556460199513
cos_coeff || 0. || 0.00556133406599
nibble5 || 0_NN VertexSelector 1 || 0.00555827654154
real || omega || 0.00553937444583
suc || abs8 || 0.00553780685475
complete_Sup_Sup || Width || 0.00553238481064
semiring_1_of_nat || Fin || 0.00552307014371
code_Pos || sech || 0.00551368766055
ring_1_of_int || NOT1 || 0.00551128525606
num_of_nat || *64 || 0.00551078653877
arccos || {..}1 || 0.00550585487572
nibble2 || 0_NN VertexSelector 1 || 0.00550520121285
nibble1 || ECIW-signature || 0.00550512786081
bitM || Fib || 0.00550449576225
nibble_of_nat || UsedIntLoc || 0.00550384521653
zero_zero || Mycielskian0 || 0.00550065276495
complete_Sup_Sup || sproduct || 0.00549187489777
nibble4 || 0_NN VertexSelector 1 || 0.0054889717324
pow || exp4 || 0.00548753986537
set || Fin || 0.00548210983336
nibbleE || 0_NN VertexSelector 1 || 0.00547338311146
nibble7 || 0_NN VertexSelector 1 || 0.00547338311146
pred_nat || IPC-Taut || 0.00547205356059
append || _#bslash##slash#_0 || 0.00546798452343
nat || sinh1 || 0.00546029202277
nibble6 || 0_NN VertexSelector 1 || 0.00545838967232
condit1810911227_above || Fin || 0.00544120269964
code_Pos || Seg || 0.0054385339296
id_on || ^0 || 0.00543768151159
one_one || idseq || 0.00543765414346
code_integer || EdgeSelector 2 || 0.00543604124726
pow || compose || 0.00543596646931
suc || Inv0 || 0.00543275927022
real || 0c || 0.00542618797106
nat2 || Product1 || 0.00541991908036
pow || ++3 || 0.00541400206678
complete_Sup_Sup || Len || 0.00538607021948
principal || still_not-bound_in1 || 0.00538498572184
abs_abs || 0_Rmatrix0 || 0.00538253844561
pow || (#hash#)0 || 0.0053806265738
measure || `2 || 0.00537914967987
num_of_nat || First*NotUsed || 0.00535224457882
one_one || Mycielskian0 || 0.00534755390234
code_integer || sqrcomplex || 0.00533640651172
arctan || sgn || 0.00532510663296
measure || `1 || 0.00530692310092
set || meet0 || 0.00528485022794
semiring_1_of_nat || *0 || 0.00528078576665
transitive_trancl || to_power1 || 0.00527904882917
product_unit || omega || 0.00527824033407
set || the_Field_of_Quotients || 0.00525884385452
cis || <*..*>4 || 0.00525039071799
append || _#slash##bslash#_0 || 0.00524779682748
set || succ1 || 0.00523910492468
nat || cosh1 || 0.00523289274411
pred_nat || +16 || 0.00522393263987
nat || RealOrd || 0.00521886612843
sqr || union0 || 0.00521831147031
sqr || |^5 || 0.00521099964244
semiring_1_of_nat || Bags || 0.00521039621376
semiring_1_of_nat || product || 0.00520206461201
pow || exp || 0.00518005684401
pow || *` || 0.00518005684401
inf_inf || *3 || 0.00515984246706
ring_1_of_int || permutations || 0.00515181751042
set2 || Free1 || 0.00514767722103
set2 || Fixed || 0.00514767722103
condit1810911227_above || *0 || 0.00514619994474
real_Vector_of_real || NOT1 || 0.00514397193897
id2 || Subspaces || 0.00513696814098
id2 || Submodules || 0.00513696814098
id2 || Subspaces2 || 0.00513696814098
bitM || id6 || 0.00513480042266
sqr || Moebius || 0.00511594512068
one2 || ECIW-signature || 0.00511526040311
nat2 || #quote# || 0.00509828346541
pow || R_EAL1 || 0.00509264746841
set || Upper_Middle_Point || 0.00508498222672
set || Lower_Middle_Point || 0.00508449397992
tan || #slash# || 0.0050829175227
set || UMP || 0.00507562415199
set || LMP || 0.00507562415199
uminus_uminus || ` || 0.00507110409571
condit1810911227_above || Bags || 0.00506168078915
bot_bot || 1_Rmatrix || 0.0050560877421
condit1810911227_above || product || 0.00505171164479
nat || sinh0 || 0.00505055511517
num_of_nat || UsedInt*Loc || 0.00502805899702
ii || op0 {} || 0.00502805554178
num_of_nat || Sum || 0.00501227626028
set2 || Up || 0.00500814925444
code_int_of_integer || #quote# || 0.00499735234524
num || omega || 0.00499383005056
pred_nat || SourceSelector 3 || 0.0049691831621
inc || sproduct || 0.00496391956016
semiring_1_of_nat || bool || 0.00495241159521
set || product || 0.00494836215517
set2 || NormPolynomial || 0.00494172238115
real || G_Quaternion || 0.00492899985205
nat || 0 || 0.00492510500574
sub || <*..*>5 || 0.00492348721859
code_Neg || coth || 0.00490985727807
pow || *^ || 0.00490734757116
id_on || #bslash##slash#0 || 0.00488458034426
pow || Rotate || 0.00485867903223
num_of_nat || Product4 || 0.00482643952786
bitM || union0 || 0.00482250675672
pow || frac0 || 0.00481282515151
bot_bot || {}. || 0.00480353088098
zero_zero || carrier || 0.00479272630768
real_Vector_of_real || permutations || 0.0047754441147
re || tree0 || 0.00477137030084
pow || *45 || 0.00477000935786
nat2 || NAT || 0.00476999894068
sqr || ^20 || 0.00476096637997
complete_Sup_Sup || Fin || 0.00475842093936
condit1810911227_above || bool || 0.00475637140072
code_Pos || coth || 0.00475597783886
code_natural || *78 || 0.00474831518408
gcd_lcm || #bslash# || 0.00472128812346
measure || ^0 || 0.00470915683918
member3 || are_separated0 || 0.0047072548449
bitM || |^5 || 0.00470094558187
num || REAL || 0.00469580180411
nat2 || 0_NN VertexSelector 1 || 0.0046865325669
transitive_acyclic || is_finer_than || 0.00465794323305
ord_less_eq || #bslash# || 0.00465582747226
ring_1_of_int || derangements || 0.00463408312054
code_Pos || bool || 0.004584998135
finite_psubset || succ0 || 0.0045795823704
pow || +` || 0.00457761728775
pow || -Root || 0.00457400065524
normal627294541factor || 1_Rmatrix || 0.00457283741788
gcd_gcd || #bslash# || 0.00456957574177
pred_nat || +21 || 0.00456871715805
cis || 0_NN VertexSelector 1 || 0.00456832451957
code_sub || <*..*>5 || 0.00454449730524
none || (Omega). || 0.00454007319563
complete_Sup_Sup || *0 || 0.00453597469188
less_than || Borel_Sets || 0.00453408837561
abs_Nat || -0 || 0.00451565834
rcis || TWOELEMENTSETS || 0.00450385369758
union || #slash##bslash#9 || 0.00449872124482
product_unit || 0_NN VertexSelector 1 || 0.00448806908584
one_one || carrier || 0.0044862647257
nat || P_sin || 0.0044843925775
complete_Sup_Sup || Bags || 0.00447159891533
nat2 || upper_bound1 || 0.00446837963772
complete_Sup_Sup || product || 0.00446398656352
field_char_0_of_rat || NOT1 || 0.00446244319881
sqr || cf || 0.00443852970228
num_of_nat || *1 || 0.00443203563699
set_of_seq || Right_Cosets || 0.00443174035103
bitM || Moebius || 0.004426876976
nat || sin0 || 0.00442080507069
set || S-min || 0.00440666663847
code_Neg || cosh || 0.00440275030296
bitM || ^20 || 0.00440247571673
measure || + || 0.00440135391654
pow || div || 0.00440103778298
union || <*..*>16 || 0.00439897951845
sqr || SD_Add_Carry || 0.00439084905286
set || N-max || 0.00438983857875
set || E-min || 0.00438497572058
set || S-max || 0.00437907058624
set || W-max || 0.00437861173622
complex || G_Quaternion || 0.00437165045677
nat_of_num || ConwayDay || 0.00437017509019
num_of_nat || ^28 || 0.004358847943
left_unique || is_integral_of || 0.00435504639881
code_natural || 0c || 0.00435297761445
num || 0_NN VertexSelector 1 || 0.0043521782582
set || VERUM || 0.00434583350421
gcd_lcm || #bslash##slash# || 0.00434420713201
real || <i>0 || 0.00434091421325
zero_zero || Moebius || 0.00433664309842
normal627294541factor || NOT1 || 0.0043279296882
top_top || 0. || 0.00431465219945
nibble_of_nat || Product7 || 0.00431163401216
left_total || is_integral_of || 0.0043041024185
sqr || Euler || 0.00430271926333
member3 || c=1 || 0.00429539056266
zero_Rep || NAT || 0.00429414392075
nat2 || *86 || 0.00429355335555
transitive_acyclic || tolerates || 0.00429152374128
set || N-min || 0.00428350706517
right_unique || is_integral_of || 0.00428022189077
code_Pos || cosh || 0.00427970430358
code_Neg || cot || 0.00427676353353
measures || ^0 || 0.00427348769747
nibbleA || ECIW-signature || 0.00426177858485
remdups_adj || Double0 || 0.00426152706966
coset || inf2 || 0.00425627986236
ord_less_eq || =3 || 0.00425545611073
real_Vector_of_real || derangements || 0.00425276072861
bot_bot || <*> || 0.00424680043669
complete_Sup_Sup || bool || 0.00423661302382
insert3 || #quote##bslash##slash##quote#14 || 0.004219456893
set || max#hash# || 0.00421766369101
gcd_gcd || #bslash##slash# || 0.00421542585858
cnj || MIM || 0.00421298706812
ring_1_of_int || CompleteSGraph || 0.00421036437019
complex || P_t || 0.0041789920031
list_ex || eval || 0.00416658031605
nibbleB || ECIW-signature || 0.0041650491471
code_Pos || cot || 0.00415907597948
member3 || are_separated || 0.00414995632859
union || <=>1 || 0.00414664262352
pow || -\1 || 0.00414275711047
pow || gcd || 0.00414275711047
insert3 || #quote##slash##bslash##quote#6 || 0.00412802452978
measure || #bslash##slash#0 || 0.00412334065312
pow || #slash#^1 || 0.00411892047629
code_natural || omega || 0.00411815507668
code_Neg || tan || 0.00411796898421
pos || -0 || 0.00410908905882
field_char_0_of_rat || permutations || 0.00410141719151
zero_Rep || 0_NN VertexSelector 1 || 0.00409336245235
measures || + || 0.0040860733327
nibble8 || ECIW-signature || 0.0040820679271
set || id1 || 0.00408003730505
nibble_of_nat || Product4 || 0.00407970511524
nat || sin1 || 0.00407370967376
suc || 0. || 0.0040690592025
zero_zero || tree0 || 0.0040617510413
inc || Fin || 0.00404585246259
transitive_trancl || ^0 || 0.00404008891567
right_total || is_integral_of || 0.00403812641623
one_one || tree0 || 0.0040300574031
code_Pos || tan || 0.00400907908333
code_Neg || sinh || 0.00400738106931
rcis || arccos || 0.00400099615668
real_V1127708846m_norm || . || 0.00399924327775
code_Neg || cosh0 || 0.00398851284355
code_Pos || -0 || 0.00397539640892
pos || elementary_tree || 0.00397079003469
set2 || ||....||2 || 0.00395157088885
set2 || uparrow0 || 0.00395097092638
normal627294541factor || permutations || 0.00394603680293
bi_total || is_integral_of || 0.00394289601365
set_of_seq || Left_Cosets || 0.00393063914112
code_integer || Example || 0.00392308183675
bit0 || +45 || 0.00391725201088
root || -56 || 0.00391592051639
code_Pos || sinh || 0.00390893237334
code_integer || -45 || 0.00390669454637
transitive_rtrancl || ^0 || 0.00390501088009
nibble_of_nat || *64 || 0.00389515931029
code_Pos || cosh0 || 0.00388907990853
bitM || cf || 0.00386173794053
pow || -root || 0.00386099683406
ring_1_of_int || sproduct || 0.00385741104507
code_natural || 1r || 0.00385411187032
pow || -51 || 0.00384476131259
nibbleC || ECIW-signature || 0.00383741179541
set2 || still_not-bound_in || 0.00383563063795
set || fixed_QC-variables || 0.00383451482564
set || free_QC-variables || 0.00383451482564
real_Vector_of_real || CompleteSGraph || 0.00383226730246
set || inf4 || 0.0038302603749
bi_unique || is_integral_of || 0.00382278639511
pred_list || eval || 0.00381621255785
ring_1_of_int || Seg || 0.00381481498083
set || lim_inf || 0.0038147066605
ring_1_of_int || 1_Rmatrix || 0.00381316602495
bitM || Euler || 0.00379848827232
code_sub || |^|^ || 0.00379378065958
nibbleD || ECIW-signature || 0.00379075196297
inc || *0 || 0.0037880998857
set || len || 0.00378611479358
measures || #bslash##slash#0 || 0.0037851462225
real_V1127708846m_norm || #slash# || 0.00378514046791
bitM || SD_Add_Carry || 0.00378122332043
coset || Right_Cosets || 0.00377716231167
id_on || FinMeetCl || 0.00374124867883
set2 || downarrow0 || 0.00373828847163
order_under || Following || 0.00373509551718
sqr || arctan0 || 0.00372759887478
bNF_Cardinal_czero || (0).3 || 0.00372695076402
trans || <= || 0.00372409686674
inc || Bags || 0.0037151853202
inc || product || 0.0037066120922
nibbleF || ECIW-signature || 0.0036726471497
bNF_Cardinal_czero || (0).4 || 0.00366992547725
real || F_Complex || 0.00365902539883
set || 1. || 0.0036582808392
pow || +56 || 0.00365364624071
sqr || Lucas || 0.00364906842269
transitive_rtrancl || #bslash##slash#0 || 0.00363794683435
transitive_trancl || sigma0 || 0.00362702302459
set || k2_rvsum_3 || 0.00360249027994
field_char_0_of_rat || derangements || 0.00360006808916
csqrt || MIM || 0.00358425519789
sqr || k1_numpoly1 || 0.00357931307223
nibble3 || ECIW-signature || 0.00357829840091
csqrt || R_Quaternion || 0.00356853682711
cis || dl. || 0.00356080870845
cnj || sqr || 0.00355748215683
union || \or\0 || 0.00355586169874
coset || OpenNeighborhoods || 0.00354924612513
code_integer_of_num || Mycielskian0 || 0.00353537200484
set || stability#hash# || 0.00352950789086
insert3 || +8 || 0.00352927373928
inc || `1 || 0.00352487517619
set || clique#hash# || 0.00352304040228
code_integer || invquaternion || 0.00352261880995
set || order0 || 0.00350538303966
nibble9 || ECIW-signature || 0.0035003501837
real_Vector_of_real || sproduct || 0.00348705315145
nibble5 || ECIW-signature || 0.00347718524718
plus_plus || +2 || 0.00347200471482
bit1 || {..}1 || 0.00346606208919
inc || bool || 0.00345520021842
union || =>1 || 0.00345133574852
id2 || Subgroups || 0.00344399214795
normal627294541factor || derangements || 0.00342394138836
plus_plus || #slash#. || 0.00341946404167
uminus_uminus || + || 0.00341623956407
nibble2 || ECIW-signature || 0.00341443506965
ord_max || -0 || 0.00339824583349
nibble4 || ECIW-signature || 0.00339545650015
ord_min || -0 || 0.00339448439141
set || Im20 || 0.00338995879385
set || Rea || 0.00338995879385
coset || Left_Cosets || 0.00338947062342
set || Im10 || 0.00338110876587
nibbleE || ECIW-signature || 0.00337731854714
nibble7 || ECIW-signature || 0.00337731854714
set || <k>0 || 0.00336841285676
union || \&\0 || 0.00336208383857
nibble6 || ECIW-signature || 0.00335995687024
bNF_Cardinal_czero || (0).0 || 0.00335315084646
id2 || bool3 || 0.00334784486718
sin || -tuples_on || 0.00333410831552
ring_1_of_int || Fin || 0.00332945232413
sqr || arcsin1 || 0.00331741108484
bNF_Ca646678531ard_of || FinJoin || 0.00331379637102
ring_1_of_int || #slash# || 0.00330536829517
cnj || *1 || 0.00330249134725
product_Unity || TriangleGraph || 0.00329957100855
lattic929149872er_Max || -0 || 0.00329268532295
cofinite || +14 || 0.00329116765038
cos || -tuples_on || 0.00328199780801
finite_3 || NAT || 0.00327916154999
bitM || Lucas || 0.00327748648124
suc || Im20 || 0.0032735949304
bitM || arctan0 || 0.00327281472892
suc || Im10 || 0.00326375422362
nil || *1 || 0.00325936485124
real_Vector_of_real || -SD0 || 0.0032586786159
nibble_of_nat || *1 || 0.00325399708716
pow || |^ || 0.00322709259215
union || #quote##bslash##slash##quote#4 || 0.00322142507725
bitM || k1_numpoly1 || 0.00322092889881
minus_minus || +2 || 0.00321870686698
bNF_Ca1495478003natLeq || IPC-Taut || 0.00321795457401
set_option || Right_Cosets || 0.00321200966691
dup || R_Quaternion || 0.0032070855778
field_char_0_of_rat || CompleteSGraph || 0.00320622657062
suc || Rea || 0.0032019742189
union || #quote##slash##bslash##quote#1 || 0.00319020705276
rat || VAR || 0.00318972998031
code_nat_of_integer || upper_bound1 || 0.00318444619287
ring_1_of_int || *0 || 0.00317012298029
one_one || halt || 0.00316143464341
code_integer || *78 || 0.00315187343901
finite_finite2 || are_isomorphic11 || 0.00314519020106
id2 || east_halfline || 0.00314443574978
id2 || west_halfline || 0.00314443574978
sqr || cosh || 0.0031388617695
code_integer || 0c || 0.00313735911618
field_char_0_of_rat || -SD0 || 0.00312744239762
int || Example || 0.0031271740563
ring_1_of_int || Bags || 0.00312408195599
rat || 0_NN VertexSelector 1 || 0.00311954752443
ring_1_of_int || product || 0.00311863970418
pow || k2_numpoly1 || 0.00311600737403
suc || ^31 || 0.00310296592504
id2 || the_Tree_of || 0.00309414758916
id2 || Big_Omega || 0.00309414758916
set || Center || 0.00309159881631
root || -32 || 0.00309030348813
num || NAT || 0.00307763007991
bNF_Ca646678531ard_of || FinMeet || 0.00307720490338
inc || -SD0 || 0.00306973760136
uminus_uminus || {..}3 || 0.00305815427871
bNF_Cardinal_czero || Top || 0.00305679171678
code_nat_of_integer || Product1 || 0.00305414658104
id2 || Subtrees || 0.00304960699099
code_integer_of_num || elementary_tree || 0.00303698036747
set || [#bslash#..#slash#] || 0.00302855005763
normal627294541factor || CompleteSGraph || 0.00302113758111
normal627294541factor || Seg || 0.0030197796828
cofinite || #quote# || 0.00300969575529
filter || bound_QC-variables || 0.00300764320731
bNF_Cardinal_czero || Bottom || 0.00300163259102
pred_nat || multextreal || 0.00298860032796
bot_bot || StandardStackSystem || 0.00298831002271
code_nat_of_integer || *86 || 0.00298728246546
real_Vector_of_real || Fin || 0.00297923206066
id2 || the_right_side_of || 0.00297373742999
ring_1_of_int || bool || 0.00295628360044
int || invquaternion || 0.00295166263891
bitM || arcsin1 || 0.00295016921966
code_dup || R_Quaternion || 0.00294486136028
cnj || Inv0 || 0.00294329673356
sup_sup || ^31 || 0.00294285856623
id2 || nextcard || 0.00294097884228
id2 || south_halfline || 0.00294097884228
id2 || Big_Theta || 0.00294097884228
id2 || north_halfline || 0.00294097884228
set || S-bound || 0.00293429488104
nat_of_nibble || dom0 || 0.00293118455
set_option || Left_Cosets || 0.00292918451089
dup || -25 || 0.00292751402712
real || COMPLEX || 0.00291730842764
sqr || tan || 0.00290499050217
inf_inf || ^31 || 0.00290241066033
field_char_0_of_rat || sproduct || 0.00288935864194
at_top || -0 || 0.00288888149755
sqr || +14 || 0.00287650015165
remdups || max || 0.00287047330478
set || Im3 || 0.00286217294975
rcis || <k>0 || 0.0028592024452
code_integer_of_num || cos || 0.00285672318042
set || Re2 || 0.00285528146651
trans || linearly_orders || 0.00285001047085
im || *31 || 0.00284751446773
set || W-bound || 0.00284746454337
cis || op0 {} || 0.00283578689211
finite_finite2 || is_DIL_of || 0.00283492687776
real_Vector_of_real || *0 || 0.00282798043972
set || bound_QC-variables || 0.0028205066172
re || *31 || 0.00281532232705
bitM || cosh || 0.00280746518893
nat || VAR || 0.00280728030313
trans || misses || 0.00278948540061
numeral_numeral || <*..*>5 || 0.00278894013524
complex || VAR || 0.00278777700357
real_Vector_of_real || Bags || 0.00278444493785
code_nat_of_integer || #quote# || 0.00278189129733
real_Vector_of_real || product || 0.00277930391206
lattic929149872er_Max || +45 || 0.00277845727006
set || lower_bound0 || 0.00277066654753
code_pcr_integer code_cr_integer || sin1 || 0.00277060175787
sqrt || *\10 || 0.00275323621747
bNF_Ca646678531ard_of || Lin2 || 0.00274326086369
measure || Product4 || 0.00274182609076
cis || Im20 || 0.0027404138339
filter2 || eval || 0.00273860878749
cis || Im10 || 0.00272842712888
minus_minus || *3 || 0.00271426524566
cis || Rea || 0.00271349298171
csqrt || -25 || 0.00270421328587
normal627294541factor || sproduct || 0.00270203051461
nil || 1_ || 0.00270054009197
pow || #slash# || 0.00269900192739
code_natural || SCM || 0.00268184552009
dup || MIM || 0.0026775870633
nil || 1. || 0.00266315064943
insert || *18 || 0.00265642613006
cnj || R_Quaternion || 0.00265461477417
cis || ^31 || 0.00265113597449
real_Vector_of_real || Seg || 0.00264840341482
finite_finite2 || -0 || 0.00263289491414
bNF_Ca646678531ard_of || k33_zmodul02 || 0.00263175514878
real_Vector_of_real || bool || 0.00262642484148
product_Unity || ECIW-signature || 0.00262428234607
id2 || Tarski-Class || 0.00262331433978
arcsin || R_Quaternion || 0.00262151300335
bitM || tan || 0.00261829089633
bNF_Ca646678531ard_of || Lin0 || 0.00261129526673
cis || choose3 || 0.00260183801094
sup_sup || #quote#31 || 0.00259927007568
bitM || +14 || 0.00259511406239
eval || is_a_condensation_point_of || 0.00258308960573
sqr || #quote# || 0.00257823232679
bNF_Cardinal_czero || 1_ || 0.00257821498859
inf_inf || #quote#31 || 0.00256654740925
finite_3 || 0_NN VertexSelector 1 || 0.00256490908506
ii || TargetSelector 4 || 0.00253629396582
product_size_unit || dom0 || 0.00253068128596
id2 || Big_Oh || 0.00251719970742
wf || misses || 0.00251480025027
transitive_ntrancl || #bslash#*#bslash# || 0.00251015813364
im || tree0 || 0.0025023492301
set2 || the_set_of_l2ComplexSequences || 0.0025006744432
top_top || {..}1 || 0.00249525667599
nibble_of_nat || Sum11 || 0.00249123401218
bit0 || -0 || 0.00248690290511
sup_sup || +46 || 0.00247401143231
cnj || sgn || 0.00246782034437
code_natural || SCMPDS || 0.00245915790492
ii || TriangleGraph || 0.00245755155186
gcd_gcd || +2 || 0.00245541986723
bNF_Wellorder_wo_rel || c< || 0.00245088012063
inf_inf || +46 || 0.00244676849084
sqr || Im3 || 0.00243805218578
normal1132893779malize || +14 || 0.00243396244037
field_char_0_of_rat || Fin || 0.00243386979145
sqrt || R_Quaternion || 0.00243260092056
one_one || 1. || 0.00242794830104
size_num || dom0 || 0.0024272556619
sqr || Re2 || 0.00242719038145
cnj || -25 || 0.00242085994079
bNF_Ca646678531ard_of || Product0 || 0.00242032340339
set2 || ||....||3 || 0.00241688843527
re || Mycielskian0 || 0.0024087589826
nibble_of_nat || ^28 || 0.00240135303412
cis || P_t || 0.00239857012688
code_integer || sin0 || 0.00239108248173
append || #slash##bslash#9 || 0.00239048869272
im || product || 0.00238654455159
set2 || inf2 || 0.00237893787278
distinct || ||....||2 || 0.00237029368854
csqrt || *\10 || 0.0023698057062
re || product || 0.00236760781342
code_nat_of_integer || k2_zmodul05 || 0.00235106102525
inf_inf || #slash##bslash# || 0.00235101978723
bitM || #quote# || 0.00234940112888
cis || <*> || 0.00234198685367
bitM || Im3 || 0.00233982854908
arctan || R_Quaternion || 0.00232048154177
at_top || +45 || 0.00231143311867
condit1810911227_above || +14 || 0.00230845057484
real_V1127708846m_norm || NOT1 || 0.00230116761773
field_char_0_of_rat || *0 || 0.00230063412369
bitM || Re2 || 0.00229348271397
transitive_trancl || FinMeetCl || 0.00228628145322
normal1132893779malize || #quote# || 0.00227875486114
sqrt || MIM || 0.00227675539184
numeral_numeral || the_Tree_of0 || 0.00227301274801
set || CQC-WFF || 0.00226361714006
field_char_0_of_rat || Bags || 0.00226248887996
nibble_of_nat || First*NotUsed || 0.00226086678887
field_char_0_of_rat || product || 0.0022579903972
normal627294541factor || Fin || 0.00225133721165
transitive_rtrancl || FinMeetCl || 0.00224616375578
sup_sup || *3 || 0.00224488812949
pow || - || 0.00223706060954
append || <*..*>16 || 0.00223698712089
less_than || *78 || 0.00222037867682
one_one || {}1 || 0.00221438735108
id_on || R_EAL1 || 0.00220916019191
sqr || sin || 0.00219553999509
code_int_of_integer || Product1 || 0.00219375211903
set2 || Right_Cosets || 0.00218922481253
one_one || cos || 0.00218241168722
cos_coeff || 1[01] || 0.00217082894021
cos_coeff || 0[01] || 0.00217082894021
condit1810911227_above || #quote# || 0.00216545084902
pow || + || 0.0021596389678
code_integer || F_Complex || 0.00215555261621
real_V1127708846m_norm || permutations || 0.00215498385205
set2 || OpenNeighborhoods || 0.00215171032005
real_V1908273582scaleR || NOT1 || 0.002143684961
has_field_derivative || NOT1 || 0.00213992462275
bNF_Ca646678531ard_of || Sum5 || 0.00213757723206
bNF_Cardinal_czero || 0. || 0.0021349571957
nibble_of_nat || UsedInt*Loc || 0.00212958052206
field_char_0_of_rat || bool || 0.00212479734855
normal627294541factor || *0 || 0.00212130876294
im || {..}1 || 0.00211870985478
nibble_of_nat || Sum19 || 0.00210913431902
pred_nat || *78 || 0.00210729554439
code_integer_of_num || !5 || 0.00210129539774
normal627294541factor || Bags || 0.00208423214884
normal627294541factor || product || 0.00207986409866
sqr || *1 || 0.00207825549621
set || F_primeSet || 0.00205968590894
set2 || Left_Cosets || 0.00205692546571
one_one || 0. || 0.00205475340716
nil || k1_numpoly1 || 0.00205468046881
inc || 1_Rmatrix || 0.00204868597352
union || ^23 || 0.00204058270977
bitM || sin || 0.00202716297529
sup_sup || +14 || 0.00202616483083
nil || Lucas || 0.00202533447631
set || ProperPrefixes || 0.00201706600166
code_integer || SourceSelector 3 || 0.00201230438487
inf_inf || +14 || 0.00201179726905
nil || |....|2 || 0.00200765207495
has_field_derivative || permutations || 0.00199539236949
im || elementary_tree || 0.0019953156756
real_V1908273582scaleR || permutations || 0.00199524458947
code_nat_of_natural || #quote# || 0.00199500107656
nil || In_Power || 0.0019915860504
finite_finite2 || +45 || 0.00197556453083
ii || ECIW-signature || 0.00196922015511
append || -23 || 0.00196512655438
sym || c= || 0.00196225774251
complete_Sup_Sup || +14 || 0.00196170308845
complex || sin1 || 0.00195847602687
im || cos || 0.00195331579463
normal627294541factor || bool || 0.00195095377306
dup || *\10 || 0.00194563279946
code_Pos || CompleteRelStr || 0.00194497456546
real_V1127708846m_norm || derangements || 0.00194356905733
one_one || !5 || 0.00194149890689
cis || {..}1 || 0.00193787176046
bitM || *1 || 0.00192673297384
sup_sup || #quote# || 0.00192327011453
im || code || 0.00192266642733
remdups || + || 0.00191932920185
rcis || Rea || 0.0019119047673
ring_1_of_int || |->0 || 0.00191058451496
inf_inf || #quote# || 0.00191031071928
bot_bot || id1 || 0.00190361769605
re || code || 0.0019008046486
rcis || Im20 || 0.0018900663474
pred_numeral || dom0 || 0.00188880253446
transpose || #quote#21 || 0.00188610829969
rcis || Im10 || 0.00188114115532
semiring_1_of_nat || +14 || 0.00186046813932
complete_Sup_Sup || #quote# || 0.00185776729387
code_Pos || elementary_tree || 0.00185601369559
code_dup || *\10 || 0.00184808540247
append || #quote##bslash##slash##quote#4 || 0.00184202343227
inc || `2 || 0.0018409782438
sqrt || -25 || 0.0018385902247
pred_nat || +infty || 0.00183791628036
ii || 0_NN VertexSelector 1 || 0.0018356638057
inc || +46 || 0.00183563528454
im || +16 || 0.00183446234662
append || #quote##slash##bslash##quote#1 || 0.00183031696573
one_one || arccot0 || 0.00182764893485
id2 || code || 0.0018243395233
diffs || -root || 0.00182310532929
complex || sec || 0.00182244973216
re || +16 || 0.00181576961322
inc || ^31 || 0.00180998921057
int || F_Complex || 0.00180856236153
wf || linearly_orders || 0.00180733949976
nat || Z_2 || 0.00180494277835
code_Nat || Psingle_e_net || 0.00179379811075
measure || R_EAL1 || 0.00179307544464
inc || Seg || 0.00179018509676
has_field_derivative || derangements || 0.00178840121466
cofinite || ^31 || 0.00178434104208
real_V1908273582scaleR || derangements || 0.00178352418325
append || <=>1 || 0.00178007000368
rev || AuxBottom || 0.001771817705
real_V1127708846m_norm || CompleteSGraph || 0.0017697466208
one2 || ConwayZero0 || 0.00176821982853
semiring_1_of_nat || #quote# || 0.00176816511188
nat || SCM+FSA-Data*-Loc || 0.00174805982671
arctan || *\10 || 0.00169519531949
normal1132893779malize || ^31 || 0.0016900374051
cnj || abs8 || 0.00168820361456
arcsin || *\10 || 0.00168046376885
insert || eval || 0.00167367120394
one2 || ConwayZero || 0.00167062011997
complex || omega || 0.00167048313107
pred_nat || +51 || 0.00166587169071
nil || <*> || 0.00166488165087
pred || carrier || 0.00166350184344
antisym || linearly_orders || 0.00166275372359
drop || #bslash#*#bslash# || 0.00166096253295
append || \or\0 || 0.00165591970303
code_integer || G_Quaternion || 0.00165228409325
field_char_0_of_rat || Seg || 0.00164360591421
concat || Product0 || 0.00164221508594
pos || LattPOSet || 0.00163998215665
append || =>1 || 0.00163205430591
real_V1127708846m_norm || sproduct || 0.00162438574431
has_field_derivative || CompleteSGraph || 0.00162005823001
sin_coeff || 0_NN VertexSelector 1 || 0.00161437291121
real_V1908273582scaleR || CompleteSGraph || 0.00161211813257
append || \&\0 || 0.00161115879274
distinct || the_set_of_l2ComplexSequences || 0.00159669715857
code_nat_of_natural || k2_zmodul05 || 0.00159109751013
real || 1q0 || 0.00157917199981
transitive_trancl || `|0 || 0.00157689362464
nat || |....|11 || 0.00156882266586
code_n1042895779nteger || Psingle_e_net || 0.00156122024305
bit0 || 0_Rmatrix0 || 0.00155667865064
distinct || ||....||3 || 0.00153387669718
rcis || Product7 || 0.00152281767394
measures || R_EAL1 || 0.0015153462712
bNF_Ca829732799finite || linearly_orders || 0.00151018864467
transitive_trancl || -41 || 0.00150982569358
im || carrier || 0.00150799008687
inc || #quote#31 || 0.00150535610536
code_dup || MIM || 0.00149349671439
rotate || *18 || 0.00148870423688
has_field_derivative || sproduct || 0.00148057205863
dup || abs8 || 0.00147232309695
real_V1908273582scaleR || sproduct || 0.00147064094177
normal1132893779malize || +46 || 0.00146026654739
cofinite || +46 || 0.00146010491004
arcsin || MIM || 0.00145573692241
normal1132893779malize || #quote#31 || 0.00144432099985
transitive_trancl || . || 0.00144370208583
num_of_nat || Sum11 || 0.00144355635011
dup || sqrt0 || 0.00143520376059
code_integer_of_num || ConwayDay || 0.00142295189345
cofinite || #quote#31 || 0.00141979610236
nat2 || k2_zmodul05 || 0.00141174103249
real_V1127708846m_norm || Fin || 0.00140595987235
nat_of_num || Top || 0.00139494221154
code_nat_of_natural || upper_bound1 || 0.00138982894017
ii || FALSE || 0.00137434651632
cis || 1_Rmatrix || 0.00137385912877
dup || doms || 0.0013618543192
real_V1632203528linear || is_distributive_wrt0 || 0.00135794324201
set2 || chi6 || 0.00135444241538
finite_2 || op0 {} || 0.00134008154097
real_V1127708846m_norm || *0 || 0.00133980557945
real_V1127708846m_norm || Seg || 0.00133362862569
pos || TotalGrammar || 0.00132835980364
code_nat_of_natural || *86 || 0.00132473171129
rcis || Sum4 || 0.00132458426678
int || G_Quaternion || 0.00132343922397
real_V1127708846m_norm || Bags || 0.00132066849132
arctan || MIM || 0.0013193340926
real_V1127708846m_norm || product || 0.00131840579036
one_one || Stop || 0.00131775641929
finite_3 || *63 || 0.00131736725379
finite_3 || <j> || 0.00131736725379
dup || sqr || 0.00129361698758
insert || *8 || 0.00129209392418
remdups || -22 || 0.00128770463299
concat || Sum9 || 0.00128486004449
re || dom0 || 0.00128141402305
has_field_derivative || Fin || 0.00127319393847
rcis || Product2 || 0.00127180488834
real_V1908273582scaleR || Fin || 0.0012612341764
diffs || (#hash#)12 || 0.00126054633011
diffs || (#hash#)11 || 0.00126054633011
rcis || Product4 || 0.00125838729042
nibble0 || 0c || 0.00125234269512
dup || -54 || 0.00125137830559
real_V1127708846m_norm || bool || 0.0012508440001
append || #quote##bslash##slash##quote#2 || 0.00125016099658
code_dup || -25 || 0.00124980486994
real_V1127708846m_norm || <*..*> || 0.00124662645316
one_one || arctan0 || 0.00124240503819
one_one || arcsin1 || 0.00123828740041
dup || SubFuncs || 0.00123310349976
pred_nat || NAT || 0.00123043970289
finite_3 || |....|11 || 0.00122536818813
cos_coeff || 4096 || 0.0012213290635
has_field_derivative || Seg || 0.00121901531999
code_integer || P_t || 0.00121880214424
code_integer_of_nat || choose3 || 0.00121567573336
ord_max || +2 || 0.00121511577785
has_field_derivative || *0 || 0.00121091015408
real_V1908273582scaleR || Seg || 0.00120818870963
code_integer || ConwayZero || 0.00120725070445
real_V1908273582scaleR || *0 || 0.00119856007267
has_field_derivative || Bags || 0.00119293800058
rat || *63 || 0.001192900915
rat || <j> || 0.001192900915
has_field_derivative || product || 0.00119081437827
cos_coeff || I[01]0 || 0.00118572315374
code_Suc || succ1 || 0.00118400438496
dup || Card0 || 0.0011838095885
im || !5 || 0.00118260299919
transitive_trancl || R_EAL1 || 0.00118078281366
real_V1908273582scaleR || Bags || 0.00118049413256
real_V1908273582scaleR || product || 0.00117835998577
normal627294541factor || #slash#2 || 0.00117706762231
has_ve2132708402vative || 0_Rmatrix0 || 0.00117388327475
ring_1_of_int || {..}3 || 0.00116492252639
nibble1 || 0c || 0.0011625319273
code_int_of_integer || QC-symbols || 0.00116231800786
one_one || ConwayDay || 0.00116060100912
real || SourceSelector 3 || 0.00115702161761
insert3 || at3 || 0.00114880366672
int || *63 || 0.00114099113401
int || <j> || 0.00114099113401
complex || SCM || 0.00114025886836
num_of_nat || Sum19 || 0.00113813743599
one_one || Bin1 || 0.00113228438791
uminus_uminus || #slash#2 || 0.00112841614281
real || TargetSelector 4 || 0.00112767798239
has_field_derivative || bool || 0.00112753572739
transitive_rtrancl || R_EAL1 || 0.00112349707526
arcsin || -25 || 0.00112284225085
real_V1908273582scaleR || bool || 0.00111482179223
pos || k3_lattad_1 || 0.00110468596637
pos || k1_lattad_1 || 0.00110468596637
set || MultiSet_over || 0.00108368897324
semiring_1_of_nat || ^31 || 0.00106965939951
real_V1127708846m_norm || -SD0 || 0.00105293224985
complex || SCMPDS || 0.00105276240357
code_integer_of_num || carrier || 0.00105144232256
int || P_t || 0.00104952173756
nibble0 || 0.1 || 0.00104780765309
transitive_trancl || ]....[1 || 0.00104774687957
condit1810911227_above || ^31 || 0.0010397449749
cis || 0* || 0.00103965284114
arctan || -25 || 0.00103942871915
arg || multreal || 0.00103669167266
semiring_1_of_nat || +46 || 0.00103668412523
pos || LattRel0 || 0.0010355047718
cnj || bool || 0.00102924022273
code_int_of_integer || upper_bound1 || 0.00102659922966
divide_divide || ^ || 0.00102654541592
uminus_uminus || exp4 || 0.00102125940267
set2 || opp+id || 0.00101966393723
pos || Seg || 0.00101700657296
diffs || .13 || 0.00101617245433
rcis || Sum19 || 0.00101304846591
code_integer || REAL || 0.00101289601311
sgn_sgn || Rev || 0.00101163317228
diffs || Closed-Interval-TSpace || 0.00100829260311
rev || -22 || 0.00100674396398
condit1810911227_above || +46 || 0.00100662665444
minus_minus || Trivial-doubleLoopStr || 0.000995661329567
suc || *\10 || 0.000991584395612
remdups || inf || 0.000988833187032
nat_of_num || dom0 || 0.000987760523026
rcis || Sum11 || 0.000984716775122
times_times || ^ || 0.000983945184342
im || card || 0.000982971436281
code_int_of_integer || *86 || 0.00098120787074
plus_plus || Trivial-doubleLoopStr || 0.000980101593753
real || -66 || 0.000978542008662
inj_on || c=3 || 0.000973306564018
bot_bot || ^31 || 0.000969775671639
complex || the_arity_of || 0.000965792093071
gcd_gcd || Trivial-doubleLoopStr || 0.000962197466933
nibble1 || 0.1 || 0.000961296846966
nat || -infty || 0.000959955357655
bot_bot || +46 || 0.000959232411448
semiring_1_of_nat || #quote#31 || 0.000959218186146
rat || |....|11 || 0.000954904778171
finite_comp_fun_idem || LE || 0.00095066425241
inc || MIM || 0.000950621601721
nat2 || id6 || 0.000946269776728
arg || lower_bound1 || 0.000945889872635
sgn_sgn || k4_matrix_0 || 0.000939200025314
rotate || eval || 0.000929852709672
real_Vector_of_real || 1_Rmatrix || 0.000929097785899
finite_card || OpenNeighborhoods || 0.000928387045323
rcis || Sum || 0.000923651535742
real || 0 || 0.000922416598157
uminus_uminus || k22_pre_poly || 0.000918321932101
code_nat_of_natural || Product1 || 0.000913189961736
condit1810911227_above || #quote#31 || 0.000898440987133
butlast || -22 || 0.000886123394376
nil || 0* || 0.000884843766273
im || ConwayDay || 0.000882828494827
bot_bot || #quote#31 || 0.000878900599677
sqrt || Inv0 || 0.000878564793623
complete_Sup_Sup || +46 || 0.000875788983654
int || |....|11 || 0.000873275780501
less_than || sinh0 || 0.000872445483224
real_V1908273582scaleR || #slash#^ || 0.000870092562412
real || |....|11 || 0.000867598382101
set || QuasiAdjs || 0.000866271659594
complete_Sup_Sup || ^31 || 0.000863435831519
sym || are_equipotent || 0.000861869920702
plus_plus || ^ || 0.00085500201359
less_than || sinh1 || 0.000848613203021
has_field_derivative || -SD0 || 0.000845428088863
sqr || new_set2 || 0.000841789284959
sqr || new_set || 0.000841789284959
code_integer || TriangleGraph || 0.000827028719303
pow || --> || 0.000826965054146
real_V1908273582scaleR || -SD0 || 0.00081836627716
bit0 || proj4_4 || 0.000815161853896
cis || 0.1 || 0.000813521447318
abs_abs || +45 || 0.000812348780671
cis || 0c || 0.000811904320489
tl || -22 || 0.000806886290852
real_V1632203528linear || is_an_inverseOp_wrt || 0.00080661442969
product_case_unit || Fdfl || 0.000802781408013
product_rec_unit || Fdfl || 0.000802781408013
product_case_unit || Finf || 0.000802781408013
product_rec_unit || Finf || 0.000802781408013
append || ^23 || 0.000790002464303
ii || i_FC || 0.000784289382064
transitive_acyclic || are_equipotent || 0.000775836187026
code_integer || INT || 0.00077302381359
inc || SymbolsOf || 0.000767157668246
complete_Sup_Sup || #quote#31 || 0.00076682528245
nat || INT- || 0.000760686306136
bit0 || proj1 || 0.000760197271849
product_case_unit || Fint || 0.000755054779321
product_rec_unit || Fint || 0.000755054779321
product_case_unit || Fcl || 0.000755054779321
product_rec_unit || Fcl || 0.000755054779321
pred_nat || <i>0 || 0.000753647184618
code_natural || INT || 0.000750902039495
im || Mycielskian0 || 0.000739100478889
product_case_unit || Shift3 || 0.000736211517974
product_rec_unit || Shift3 || 0.000736211517974
insert3 || ^^ || 0.000735841433641
re || {..}1 || 0.000734160776618
cos_coeff || 64 || 0.000733166681145
complex || sinh1 || 0.000732610558738
rotate || *8 || 0.000732581890464
transitive_trancl || .51 || 0.00072446751737
cos_coeff || continuum || 0.000718489340942
ring_1_of_int || [:..:] || 0.000716868427098
sqrt || sqr || 0.000714734815963
gcd_lcm || +2 || 0.000714677699786
hd || ||....||2 || 0.000714620873842
pred_nat || <j> || 0.000712418828852
inc || subset-closed_closure_of || 0.000710099465465
list || REAL0 || 0.000705203465924
nat_of_num || *0 || 0.000701032739638
cos_coeff || 32 || 0.000699483085118
ord_less_eq || is_differentiable_on4 || 0.000694102074655
set || ^omega0 || 0.000684737485218
product_case_unit || |^15 || 0.000680489344804
product_rec_unit || |^15 || 0.000680489344804
has_ve2132708402vative || +45 || 0.000671782980214
less_than || <i>0 || 0.000671048010641
complex || 0c || 0.000667468052302
cnj || idseq || 0.000666282601396
code_nat_of_natural || entrance || 0.000661737472906
code_nat_of_natural || escape || 0.000661737472906
real_Vector_of_real || ^31 || 0.000660804091924
minus_minus || ^ || 0.000655928375204
product_case_unit || |^24 || 0.000652628669538
product_rec_unit || |^24 || 0.000652628669538
ord_less_eq || is_distributive_wrt0 || 0.000651727407189
complex || absreal || 0.000649302887791
code_natural_of_nat || the_rank_of0 || 0.000645934290204
less_than || sin1 || 0.000641264090094
uminus_uminus || -6 || 0.000640440899198
less_than || *63 || 0.000638261971644
real_V1632203528linear || is_distributive_wrt || 0.000635107211508
code_int_of_integer || Sum || 0.000627207740841
butlast || Double0 || 0.000626421459413
set || adjectives || 0.000618813817542
pow || SubXFinS || 0.000618422972639
inc || #quote# || 0.000618080433405
size_size || {..}3 || 0.000617742134665
nat || ECIW-signature || 0.000617006668703
csqrt || #quote#31 || 0.000615892908367
replicate || #bslash#*#bslash# || 0.000610938347058
semilattice || c< || 0.000610355029503
real || sqrreal || 0.000609359675137
nat_of_num || Rank || 0.000607409138198
int || TriangleGraph || 0.000607323119759
one2 || 0.1 || 0.000607171922649
complex || GCD-Algorithm || 0.000605843647807
cis || 0. || 0.000605829344454
real_V1127708846m_norm || 1_Rmatrix || 0.0006044530907
product_case_unit || *14 || 0.000602730764105
product_rec_unit || *14 || 0.000602730764105
inc || succ1 || 0.000601244853452
cos_coeff || 16 || 0.000596640434057
inf_inf || *8 || 0.000595404233305
sup_sup || *8 || 0.000591151207418
bNF_Cardinal_cfinite || r3_tarski || 0.000591018238275
field_char_0_of_rat || ^31 || 0.000590816180309
nat2 || carrier || 0.000590684740021
product_unit || NAT || 0.000589145272508
minus_minus || -1 || 0.000588043520829
pred_nat || *63 || 0.000587476811584
real_V1632203528linear || is_integral_of || 0.000586998915693
real_V1908273582scaleR || 1_Rmatrix || 0.000586498474587
sin_coeff || 12 || 0.000583690998336
lattic35693393ce_set || c< || 0.000583319504805
bit0 || succ1 || 0.0005824146143
has_field_derivative || 1_Rmatrix || 0.000582349533502
code_integer_of_num || choose3 || 0.000581986791292
plus_plus || -1 || 0.000580076629144
bit0 || *1 || 0.000580035299687
diffs || exp4 || 0.00057984244535
real_Vector_of_real || #quote#31 || 0.000578680115918
field_char_0_of_rat || 1_Rmatrix || 0.000575547316465
product_case_unit || Reloc || 0.000572926972742
product_rec_unit || Reloc || 0.000572926972742
times_times || 0_Rmatrix0 || 0.000569241602034
fract || |(..)| || 0.000569238729422
num || EdgeSelector 2 || 0.00056766073773
bit0 || min || 0.000563896389256
pred_of_seq || Right_Cosets || 0.000556881939973
dup || -- || 0.000556716492461
code_nat_of_natural || Rank || 0.000554428000127
inc || sup4 || 0.000551291748565
one_one || EvenFibs || 0.000550019067759
one_one || arccos || 0.000544146045367
bit1 || <*..*>4 || 0.000540721054806
im || Sum || 0.000538520685912
inverse_inverse || . || 0.000537094723804
nat_of_num || ord-type || 0.000535058634892
re || Sum || 0.000534154936174
real_Vector_of_real || +46 || 0.000533578462949
dup || Carr || 0.0005331287585
rcis || `1 || 0.000532245511174
gcd_lcm || Trivial-doubleLoopStr || 0.000531781740561
rcis || `2 || 0.000530664094208
uminus_uminus || . || 0.000529676049065
inc || Subtrees0 || 0.000528908397933
finite_psubset || k6_rvsum_3 || 0.000527281818323
less_than || <j> || 0.000526177709316
finite_psubset || QuasiAdjs || 0.00052354841957
ord_max || Trivial-doubleLoopStr || 0.000523209547349
zero_Rep || ConwayZero || 0.000521141782591
bit1 || proj4_4 || 0.000518254952134
code_integer || Newton_Coeff || 0.000513273355934
field_char_0_of_rat || #quote#31 || 0.000509765817992
product_case_unit || k8_compos_0 || 0.000509048510222
product_rec_unit || k8_compos_0 || 0.000509048510222
times_times || *8 || 0.000506990959517
cnj || #quote#31 || 0.000503564786849
pos || numbering || 0.000503465085989
hd || the_set_of_l2ComplexSequences || 0.00050319863015
diffs || to_power1 || 0.000502644652617
uminus_uminus || -2 || 0.000501370781367
bNF_Cardinal_cfinite || c< || 0.000500848820626
pred_of_seq || Left_Cosets || 0.000500543979045
remove || E-max || 0.00049994564349
rotate || Ex || 0.000499638576694
real || INT || 0.000496916266106
complex2 || .13 || 0.000496256816135
inc || k19_finseq_1 || 0.00049434940224
suc_Rep || RN_Base || 0.000491337254691
complex || signum || 0.000486752305486
sqrt || #quote#31 || 0.000486178301985
pow || +^1 || 0.000484900887529
code_dup || -- || 0.000483280315665
hd || ||....||3 || 0.000481087249783
complex || COMPLEX || 0.000479662420985
ring_1_of_int || ^31 || 0.000479635797817
cos_coeff || 8 || 0.000475975169604
rcis || ^28 || 0.000474094946065
product_unit || EdgeSelector 2 || 0.000460686826746
nat2 || First*NotUsed || 0.000458519590267
nat || k5_ordinal1 || 0.000458306863759
rotate || All || 0.000457003984799
dup || -0 || 0.000456927217041
sqr || -3 || 0.000455862150938
real || <i> || 0.000455691046606
sin_coeff || ELabelSelector 6 || 0.000455287291842
int || Newton_Coeff || 0.000455220327863
filter || adjectives || 0.00045495668741
real || I[01]0 || 0.000453464658989
transitive_trancl || {..}2 || 0.000453096850821
one_one || dom0 || 0.00045126414202
suc_Rep || denominator0 || 0.000450451774728
pi || +51 || 0.000449622970415
drop || eval || 0.000449323465867
real || *31 || 0.000448119345465
sin || |^ || 0.000447335972275
cos || |^ || 0.000444170788633
pos || Psingle_e_net || 0.000441642532288
pos || Psingle_f_net || 0.000441642532288
pos || Tsingle_e_net || 0.000441642532288
real || <NAT,*> || 0.00043910956027
sin_coeff || WeightSelector 5 || 0.000438817037278
code_dup || -0 || 0.000438507761969
inc || #quote#20 || 0.000437325944122
bit0 || card || 0.000437259814612
times_times || +45 || 0.000436300939715
pos || Tsingle_f_net || 0.000432230485821
rcis || *64 || 0.000431032354513
product_case_unit || *109 || 0.000429714512788
product_rec_unit || *109 || 0.000429714512788
code_dup || Carr || 0.000428953002345
pi || +16 || 0.000428667308151
ring_1_of_int || #quote#31 || 0.000424404486873
bit0 || Inv0 || 0.000423857836731
finite_3 || <i>0 || 0.000422329395899
field_char_0_of_rat || +46 || 0.000421079611345
arcsin || #quote#31 || 0.000419800616548
complex || cosh1 || 0.000419371600476
bit0 || #quote#20 || 0.000417119054037
less_than || +20 || 0.000416589065967
diffs || -41 || 0.000415658516625
real || R^2-unit_square || 0.000415573454711
dup || #quote##quote# || 0.000414856252641
bNF_Cardinal_cone || REAL || 0.000413701495814
dup || #quote#31 || 0.000411819399612
nat_of_num || proj4_4 || 0.000405243440312
code_integer || ECIW-signature || 0.000404982973725
cnj || Seg || 0.000404704413417
bit0 || ^20 || 0.000402668959095
real || DYADIC || 0.000401956320523
real_V1127708846m_norm || [....] || 0.000400855371508
nat || NATOrd || 0.000400791855909
product_case_unit || |^14 || 0.000400294690047
product_rec_unit || |^14 || 0.000400294690047
one_one || Inv0 || 0.000399301026376
code_dup || abs8 || 0.000398441419935
append || #bslash#+#bslash#2 || 0.000398078457185
code_dup || #quote#31 || 0.000395303757994
pos || bubble-sort || 0.000393912336722
arctan || QC-symbols || 0.000393127516308
sin_coeff || TargetSelector 4 || 0.00039304210612
bit1 || Subtrees || 0.000391581606869
code_dup || doms || 0.000391362839061
one_one || goto0 || 0.000387405721963
bNF_Cardinal_cone || RAT || 0.000385102855918
arctan || #quote#31 || 0.000384887208514
nat_of_num || <*..*>4 || 0.000383697147243
null || wayabove || 0.000383433229992
pos || insert-sort0 || 0.000380013820068
rat || <i>0 || 0.000378096158403
bit1 || bool0 || 0.000377748505488
bNF_Cardinal_cfinite || c= || 0.000375128783809
real_V1127708846m_norm || [....]5 || 0.000373343553814
sin_coeff || k1_finance2 || 0.000372803556306
sqrt || abs8 || 0.000372448740075
transitive_trancl || || || 0.000368353621754
dup || #quote##quote#0 || 0.000364082722941
nat || arcsec1 || 0.000363073165932
sin_coeff || *30 || 0.000361967833758
ring_1_of_int || +46 || 0.000360415622242
real_V1127708846m_norm || |[..]| || 0.000359895703911
rotate1 || \not\5 || 0.000358970198246
neg || ppf || 0.000358712792826
antisym || misses || 0.000355722793146
complex || sinh0 || 0.000354518234121
inc || carrier || 0.000353277969351
is_empty2 || ^01 || 0.0003527803943
inc || +14 || 0.000352610190013
sin_coeff || +20 || 0.000352030788094
code_dup || sqr || 0.000351395999639
int || <i> || 0.000350246632197
sin_coeff || omega || 0.000349935536031
one_one || N-min || 0.000349054199564
int || <i>0 || 0.00034839186217
pos || ~2 || 0.000348232930942
code_dup || SubFuncs || 0.000347674294281
sin_coeff || SourceSelector 3 || 0.00034643224014
real_V1127708846m_norm || <*..*>5 || 0.000346068864767
neg || pfexp || 0.000345489042582
product_case_unit || *32 || 0.000345113602302
product_rec_unit || *32 || 0.000345113602302
rat || <i> || 0.000344937494881
cnj || *\16 || 0.000344037889643
code_dup || #quote##quote# || 0.000343078384547
dup || --0 || 0.00034285109568
code_nat_of_integer || proj4_4 || 0.000342741781087
times_times || +2 || 0.000342377980978
bit0 || -50 || 0.000341277448011
product_case_unit || *158 || 0.000335528142098
product_rec_unit || *158 || 0.000335528142098
im || carrier\ || 0.00033288646038
plus_plus || *8 || 0.000329997203665
inc || -50 || 0.000329114875672
bit1 || succ1 || 0.000328723854546
bNF_Ca829732799finite || misses || 0.000327207779806
one_one || multF || 0.000326977069711
code_integer_of_int || ~2 || 0.00032629307315
cons || +9 || 0.000325239350217
finite_3 || <i> || 0.000323454591594
uminus_uminus || {..}2 || 0.000322833912458
is_empty || are_isomorphic11 || 0.000321994757954
real || sin0 || 0.000321461486037
code_Neg || ppf || 0.000320991078159
nat2 || Leaves1 || 0.000320399853843
product_case_unit || BCI-power || 0.000317111390192
product_rec_unit || BCI-power || 0.000317111390192
uminus_uminus || <*..*>5 || 0.000316141406024
rev || \not\5 || 0.000312828313843
bit0 || #quote# || 0.000312672449312
finite_psubset || QuasiTypes || 0.000311829702008
set_option || bool2 || 0.000311697344301
cos_coeff || NAT || 0.000311314929104
product_case_unit || GenFib || 0.000311277972075
product_rec_unit || GenFib || 0.000311277972075
remdups_adj || \not\5 || 0.000309950063902
code_Neg || pfexp || 0.000309223584658
comple1193779247_chain || is_properly_applicable_to1 || 0.000308588868849
insert3 || E-max || 0.000306784491042
semiring_1_of_nat || |^ || 0.000306581701537
is_empty || c= || 0.000306257444055
rcis || *1 || 0.000305032542292
code_dup || #quote##quote#0 || 0.000302252693563
diffs || multMagma0 || 0.000300941853464
cos_coeff || 0_NN VertexSelector 1 || 0.00030010597385
one_one || 1_ || 0.000295483810661
nat || Example || 0.000294864345957
pos || <*..*>4 || 0.000293834734875
list_update || [....]2 || 0.000292800223574
complex || sin0 || 0.000290483704409
remdups || \not\5 || 0.000288525310932
cons || +2 || 0.000287905492804
int || ECIW-signature || 0.000286614705397
code_dup || --0 || 0.00028613600319
transitive_trancl || [....]5 || 0.000286049351838
inverse_inverse || -6 || 0.000284733088701
suc || Carr || 0.000282364805588
bNF_Cardinal_czero || %O || 0.000280741363596
cos_coeff || <NAT,+> || 0.000280503850622
numeral_numeral || Product3 || 0.000279931151471
bNF_Cardinal_cfinite || are_equipotent || 0.000277748275358
rcis || Inv0 || 0.000274484098568
pow || |->0 || 0.000274439757585
complex || Newton_Coeff || 0.000271327380215
rcis || InsCode || 0.000268802952403
transitive_rtrancl || Directed0 || 0.000267317872463
pos || root-tree0 || 0.000266931326186
product_case_unit || |^2 || 0.000266758916092
product_rec_unit || |^2 || 0.000266758916092
list_ex || meets3 || 0.000266332500471
bNF_Ca646678531ard_of || types0 || 0.000263727185085
nat2 || field || 0.000263374814815
zero_zero || cpx2euc || 0.000261841092717
less_than || MP-variables || 0.000260772621351
product_case_unit || |^1 || 0.000252618407469
product_rec_unit || |^1 || 0.000252618407469
suc || k4_ltlaxio2 || 0.000251931983945
diffs || sigma0 || 0.000251233695284
code_integer_of_num || dom0 || 0.000250866400061
tan || [:..:] || 0.000250760735436
one2 || Vars || 0.000250108963251
im || +51 || 0.000250070055441
splice || *18 || 0.000249789333702
suc || #quote##quote# || 0.000249742056897
bit0 || carrier || 0.000248870706591
re || union0 || 0.00024843588292
real_V1127708846m_norm || deg0 || 0.000247770069544
re || +51 || 0.000247375331558
bit1 || proj1 || 0.000245924412096
product_case_unit || |^8 || 0.000245652223568
product_rec_unit || |^8 || 0.000245652223568
basic_fsts || #bslash#+#bslash#1 || 0.000245597651099
pred_nat || P_t || 0.000245383455666
suc || #quote##quote#0 || 0.000245005923033
sin_coeff || *31 || 0.000244783179971
bNF_Ca646678531ard_of || \#slash##bslash#\0 || 0.000242316721478
bNF_Cardinal_cone || INT || 0.000240916714712
finite_finite2 || c= || 0.000240873795543
im || 0. || 0.000240475717046
real_V1127708846m_norm || <*..*>1 || 0.000237163603446
product_case_unit || *29 || 0.000236621601994
product_rec_unit || *29 || 0.000236621601994
some || union6 || 0.000235702661917
bNF_Cardinal_cfinite || is_differentiable_on1 || 0.000234943573296
suc || --0 || 0.000233404492051
re || SpStSeq || 0.00023302590399
ord_min || *8 || 0.000231944385331
sqr || card || 0.000231414555433
eventually || is_properly_applicable_to1 || 0.000231121639684
pred || product#quote# || 0.000227923381482
suc || -- || 0.000226385508342
bitM || card || 0.000224348094474
nat_of_num || Subtrees || 0.000224156431641
inc || -0 || 0.000224143277982
dup || -19 || 0.000223648869683
nat2 || proj4_4 || 0.000221073281797
plus_plus || #quote#**#quote# || 0.000220211059291
divide_divide || *8 || 0.000219611984167
real_V1127708846m_norm || {..}2 || 0.000217081669071
rcis || `1_31 || 0.00021559194543
one_one || OddFibs || 0.000214948830118
times_times || Trivial-doubleLoopStr || 0.000213939025422
bNF_Cardinal_cone || INT- || 0.000212903641735
inc || |....|12 || 0.000212603254734
bit0 || curry\ || 0.000211940616514
remdups || FinMeetCl || 0.000211077414814
rotate || #bslash#*#bslash# || 0.000210476424188
code_dup || -19 || 0.000209963596146
less_than || *30 || 0.000209840425094
cos_coeff || Borel_Sets || 0.000209195050692
cnj || NatDivisors || 0.000209060685027
nat2 || SymbolsOf || 0.000207483513748
code_nat_of_natural || <*..*>4 || 0.000204996915652
divide_divide || -1 || 0.000204813865728
has_field_derivative || ^31 || 0.000204708636514
semiring_1_of_nat || L~ || 0.000204019098295
is_empty || is_DIL_of || 0.000203993923706
sin_coeff || +16 || 0.000203405390378
cos_coeff || <NAT,*> || 0.000203401788687
sub || {..}2 || 0.000203295408955
divide_divide || +2 || 0.000203000791947
nat2 || permutations || 0.000202762842967
comple1193779247_chain || is_properly_applicable_to || 0.000199298636031
real_V1127708846m_norm || ^31 || 0.000199142055997
real_V1908273582scaleR || ^31 || 0.000199051271141
times_times || -1 || 0.000197195050524
bot_bot || +52 || 0.000196709360895
real || WeightSelector 5 || 0.000196583347221
cnj || TopUnitSpace || 0.000195564814159
re || denominator || 0.000194214849714
nat2 || subset-closed_closure_of || 0.000194011602365
has_field_derivative || +46 || 0.000193313733609
append || *18 || 0.000193268284795
bit1 || *1 || 0.000193093774303
set || PARTITIONS || 0.000193029724606
code_integer || TargetSelector 4 || 0.000192276823279
gen_length || *83 || 0.000192168662825
bit1 || -0 || 0.000191748887325
eval || is_a_cluster_point_of0 || 0.000190627485519
bNF_Cardinal_cone || COMPLEX || 0.000190561170736
bitM || -0 || 0.000190093951731
real_V1127708846m_norm || +46 || 0.000189511620838
real_V1908273582scaleR || +46 || 0.000188854629126
re || Product1 || 0.000188342347289
bNF_Cardinal_cone || TrivialInfiniteTree || 0.000188108983914
real_Vector_of_real || |->0 || 0.000186910076476
gen_length || *152 || 0.000186781629082
nil || Subspaces || 0.000186767186683
nil || Submodules || 0.000186767186683
nil || Subspaces2 || 0.000186767186683
real_Vector_of_real || L~ || 0.000184420377819
one_one || TOP-REAL || 0.00018404901509
re || len || 0.000182122684515
real || SCM+FSA || 0.000181850120431
sublist || |^1 || 0.000181309177929
code_sub || {..}2 || 0.000180685903692
has_field_derivative || #quote#31 || 0.000180510923406
comple1193779247_chain || is_applicable_to1 || 0.00017880857346
null || <= || 0.000178617510804
re || min || 0.000178576874069
numeral_numeral || . || 0.000178554457163
nat2 || carrier\ || 0.000177854202598
root || <X> || 0.000177264406903
real_V1127708846m_norm || #quote#31 || 0.000176752615339
re || #quote# || 0.000176563036387
im || dom0 || 0.00017604367232
inc || Sum0 || 0.000175719359445
bit0 || sqr || 0.00017515922487
real_V1908273582scaleR || #quote#31 || 0.000175037706657
nat2 || SpStSeq || 0.000172445208909
bNF_Cardinal_cone || REAL+ || 0.000171450197087
set || QuasiTerms || 0.000171120921254
nat || HP-WFF || 0.000170340630425
bNF_Cardinal_cone || SCM+FSA-Memory || 0.00017000312176
nat || MP-conectives || 0.000169629789811
bit1 || min || 0.000168196209777
im || *78 || 0.000167998136641
im || sin1 || 0.000167673265057
inc || Product1 || 0.000166721926331
re || sin1 || 0.000166537442788
re || *78 || 0.000166047878941
nat || sec || 0.000165710576001
splice || *83 || 0.000165538918496
sqr || -54 || 0.000165356697473
nat_of_num || succ1 || 0.000165204773192
bot_bot || 0* || 0.000165138852473
pred || union0 || 0.000162406778414
pow || (#slash#) || 0.00016161406152
bind4 || c=0 || 0.000161039258164
bit1 || -19 || 0.000160515090247
nat2 || Subtrees0 || 0.000159882723498
cnj || .:18 || 0.000158304084385
nat2 || sup4 || 0.000157828833746
code_Pos || <*..*>4 || 0.000156944003686
nat_of_num || bool0 || 0.000155835336145
code_nat_of_integer || SpStSeq || 0.000155151807533
cnj || AV || 0.000154023184569
nat2 || k19_finseq_1 || 0.000153849959313
less_than || Constructors || 0.000153819418998
take || #bslash#*#bslash# || 0.000152728746349
real || SCM || 0.000152663961282
divide_divide || NOT1 || 0.000152515778404
real || 1r || 0.000152291343708
sqr || +76 || 0.000151787790427
set || product#quote# || 0.000151429266121
product_fst || #bslash#5 || 0.000150106033282
ord_max || *8 || 0.000149315366668
re || *1 || 0.000148390053843
code_Neg || <*..*>4 || 0.000147880701737
pred_nat || MP-variables || 0.000147637889096
eventually || is_properly_applicable_to || 0.000147440573847
splice || *152 || 0.000146711451181
one_one || Arg || 0.000145758353295
divide_divide || permutations || 0.000144519635606
nil || Subgroups || 0.000142571454437
bNF_Cardinal_cone || continuum || 0.000141989830126
cnj || OddFibs || 0.000139850347867
nil || bool3 || 0.000139722532884
list_update || mid || 0.00013921403108
bNF_Ca1495478003natLeq || MP-variables || 0.000138503341158
minus_minus || *8 || 0.000137983162339
ord_max || -1 || 0.000137605452736
ord_min || -1 || 0.000137499833116
rotate1 || SepVar || 0.00013733206275
code_nat_of_natural || QC-symbols || 0.000136207828977
ord_min || +2 || 0.000136086306731
wf || is_strongly_connected_in || 0.000135608889381
eventually || is_applicable_to1 || 0.000135499003769
code_dup || -54 || 0.000135224295322
refl_on || |-5 || 0.000134706441508
bit1 || +45 || 0.000134635222788
is_empty2 || Int || 0.000134606340951
suc_Rep || |^5 || 0.00013460540161
bNF_Cardinal_cone || SCM-Memory || 0.000133844079776
nil || east_halfline || 0.000133546880912
nil || west_halfline || 0.000133546880912
bNF_Cardinal_czero || carrier || 0.000133539532202
numeral_numeral || |^ || 0.000133348490628
pow || -47 || 0.000133303758788
cnj || TopSpaceMetr || 0.000132639052994
real_Vector_of_real || #slash# || 0.000132635162341
divide_divide || derangements || 0.000132627752043
nil || the_Tree_of || 0.000131987794134
nil || Big_Omega || 0.000131987794134
one2 || |....|11 || 0.000131908070959
rcis || UsedIntLoc || 0.000131863444414
uminus_uminus || <*..*>1 || 0.000131770085128
comple1176932000PREMUM || are_equipotent || 0.000131638645527
cos_coeff || <i>0 || 0.000131581778256
nil || Subtrees || 0.000130595853755
one2 || *31 || 0.000130407211633
sin_coeff || <i>0 || 0.000130026975251
finite_psubset || RightComp || 0.000128715657426
sgn_sgn || +45 || 0.000128531549641
top_top || {}1 || 0.000128402272879
nil || the_right_side_of || 0.000128200513171
pos || Open_setLatt || 0.000127871167468
nil || -3 || 0.000127652769454
nil || -25 || 0.000127447891896
nil || nextcard || 0.000127156626425
nil || south_halfline || 0.000127156626425
nil || Big_Theta || 0.000127156626425
nil || north_halfline || 0.000127156626425
inc || min || 0.000126986671476
cnj || .:7 || 0.000126305900076
bNF_Cardinal_cone || DYADIC || 0.0001257171912
cos_coeff || *63 || 0.000125568783523
remdups_adj || SepVar || 0.000124430904728
sin_coeff || <j> || 0.00012415169196
divide_divide || CompleteSGraph || 0.000122541434982
code_Suc || min || 0.00012235952228
cnj || Rev3 || 0.000121385663468
bitM || <*..*>4 || 0.000120889749795
re || succ1 || 0.000120402066131
wf || is_antisymmetric_in || 0.000120210743746
gen_length || *18 || 0.000119197163911
sqr || Objs || 0.000119051784295
divide_divide || -SD0 || 0.000118541207618
set_of_seq || +23 || 0.000118431538294
trans || c=0 || 0.000118015558538
id || id1 || 0.000117793609063
set || union0 || 0.000117728477881
one2 || +16 || 0.000117212265273
nil || Tarski-Class || 0.000116718196045
inc || First*NotUsed || 0.000116525482352
sqr || -25 || 0.000115866137713
sin_coeff || *78 || 0.000115594415367
cnj || ~0 || 0.000115588571428
neg || {..}1 || 0.000115273992949
wf || is_transitive_in || 0.0001147893775
code_int_of_integer || SpStSeq || 0.000114618469771
divide_divide || sproduct || 0.000113879651661
nat || Vars || 0.000113259450913
bitM || -- || 0.000113110307102
nil || Big_Oh || 0.000113097374676
code_Neg || {..}1 || 0.000112768347314
gen_length || #slash#19 || 0.000112057899207
numeral_numeral || *98 || 0.000110889427994
pos || IncProjSp_of0 || 0.000110231719454
complex2 || #bslash#0 || 0.000109743392427
sup_sup || ^#bslash# || 0.000108233187217
nil || succ1 || 0.000108232353252
sublist || *158 || 0.000108206227556
zero_zero || ConwayDay || 0.000107731644425
gen_length || |^17 || 0.000106192730903
remdups || SepVar || 0.000106092583454
bitM || Carr || 0.000105661175869
coset || +23 || 0.000105042795414
set_of_seq || +30 || 0.00010446585396
finite_2 || NAT || 0.000103719503862
sin_coeff || +51 || 0.000102075475803
inc || ^28 || 0.000101693113585
nil || (Omega).3 || 0.000101649489075
append || *83 || 0.000101480186682
empty || -3 || 0.000101211928013
bNF_Cardinal_cone || VAR || 0.000101085911364
wf || is_reflexive_in || 0.000101065607381
divide_divide || Fin || 0.000100453077505
plus_plus || {..}1 || 0.000100335975749
empty || -25 || 0.00010019278905
id2 || TAUT || 9.97487859653e-05
sin_coeff || multextreal || 9.91699166408e-05
cos_coeff || <j> || 9.90268422093e-05
insert || at5 || 9.86877889169e-05
sin_coeff || *63 || 9.79085546852e-05
splice || *38 || 9.7369119416e-05
id2 || *1 || 9.68094446212e-05
trans || meets || 9.65281999535e-05
divide_divide || *0 || 9.62850240728e-05
bit0 || +46 || 9.60443788583e-05
inc || Leaves1 || 9.58831369094e-05
cnj || k4_ltlaxio2 || 9.5863437681e-05
bit1 || +46 || 9.57532010431e-05
bit1 || Col || 9.51297851377e-05
divide_divide || Bags || 9.50702277724e-05
divide_divide || product || 9.49263235108e-05
splice || #slash#19 || 9.44431184662e-05
rev || SepVar || 9.43590110871e-05
coset || +30 || 9.40586107848e-05
finite_2 || 0_NN VertexSelector 1 || 9.39352942545e-05
sqr || Mphs || 9.34275193743e-05
bit0 || abs8 || 9.33719490269e-05
bitM || -19 || 9.32548672024e-05
set_option || +23 || 9.27604773931e-05
nat || +21 || 9.26704019899e-05
sublist || [....]1 || 9.24654936907e-05
splice || *41 || 9.12133244176e-05
bNF_Cardinal_cfinite || is_quadratic_residue_mod || 9.10936324192e-05
divide_divide || bool || 9.06028682132e-05
splice || |^17 || 9.03223032889e-05
sublist || |^6 || 8.92816106813e-05
top_top || <*> || 8.91374693356e-05
wf || meets || 8.84147650543e-05
bitM || #quote##quote# || 8.80210758217e-05
complex2 || cat0 || 8.71120777004e-05
removeAll || at5 || 8.70193702465e-05
bNF_Ca1495478003natLeq || Constructors || 8.67097815694e-05
gen_length || *71 || 8.64142575114e-05
set || QuasiTypes || 8.61187168256e-05
nat2 || sqr || 8.49421252505e-05
nat || *31 || 8.48716199771e-05
inc || Im20 || 8.43279211802e-05
inc || Rea || 8.43279211802e-05
nat2 || Top || 8.41106692674e-05
inc || Im10 || 8.3929693889e-05
sym || r3_tarski || 8.38099278815e-05
set_option || +30 || 8.37520846803e-05
field_char_0_of_rat || +14 || 8.34830520677e-05
pred_nat || Constructors || 8.34615887728e-05
ring_1_of_int || L~ || 8.06246716339e-05
sin_coeff || *137 || 8.03242257496e-05
sqrt || -0 || 8.01838994411e-05
nat || +16 || 7.97402763148e-05
rcis || First*NotUsed || 7.96228359008e-05
one2 || 1r || 7.93872298029e-05
bitM || #quote##quote#0 || 7.89333429641e-05
code_num_of_integer || min || 7.88351661661e-05
sqr || Card0 || 7.87608392941e-05
field_char_0_of_rat || #quote# || 7.82635471023e-05
real_Vector_of_real || +14 || 7.79974499668e-05
nat2 || Points || 7.79454238137e-05
set2 || adjs0 || 7.77227788692e-05
divide_divide || Seg || 7.76428151869e-05
insert3 || #bslash##slash#2 || 7.76159048857e-05
coset || adjs0 || 7.60783802607e-05
gen_length || |^6 || 7.56694786107e-05
splice || *71 || 7.54506223989e-05
bitM || --0 || 7.53210200268e-05
rcis || UsedInt*Loc || 7.47254579435e-05
bit1 || ^27 || 7.4572036347e-05
inc || *1 || 7.44620293929e-05
semiring_1_of_nat || [:..:] || 7.3993713293e-05
real_Vector_of_real || #quote# || 7.34907793948e-05
code_integer_of_int || |....| || 7.28051750016e-05
neg || Im20 || 7.2593567247e-05
neg || Rea || 7.2593567247e-05
none || -3 || 7.24059627309e-05
neg || Im10 || 7.22813852921e-05
none || -25 || 7.21366971625e-05
id_on || max || 7.21007376928e-05
rotate1 || -22 || 7.20834660774e-05
bit0 || *\10 || 7.20799318065e-05
ring_1_of_int || +14 || 7.19264407028e-05
code_Neg || Im20 || 7.16905356842e-05
code_Neg || Rea || 7.16905356842e-05
pos || Im20 || 7.1551701203e-05
pos || Rea || 7.1551701203e-05
code_Neg || Im10 || 7.13837594656e-05
pos || Im10 || 7.12483621794e-05
bind4 || c< || 7.1169974318e-05
bitM || -54 || 7.06023272605e-05
bitM || Im20 || 7.05047577551e-05
bitM || Rea || 7.05047577551e-05
bitM || Im10 || 7.01751910682e-05
append || *152 || 6.99485945659e-05
code_Pos || Im20 || 6.98261194379e-05
code_Pos || Rea || 6.98261194379e-05
code_Suc || *1 || 6.97683723213e-05
code_Pos || Im10 || 6.95350025906e-05
sublist || smid || 6.91320897778e-05
real || SCMPDS || 6.91025763533e-05
num || F_Complex || 6.80555272649e-05
ring_1_of_int || #quote# || 6.80194798671e-05
splice || |^6 || 6.70863041541e-05
normal627294541factor || ^31 || 6.66463187454e-05
set2 || +23 || 6.6574742093e-05
bit0 || Seg || 6.53419868459e-05
int || Vars || 6.53192215725e-05
id2 || k1_numpoly1 || 6.53146403324e-05
top_top || +52 || 6.5060704758e-05
abs_Nat || Seg || 6.46072853367e-05
ii || 14 || 6.43355741838e-05
bitM || <k>0 || 6.41259161734e-05
rev || #quote#4 || 6.33158752541e-05
code_int_of_integer || k2_zmodul05 || 6.31514225568e-05
zero_zero || cos || 6.31068531482e-05
id2 || Lucas || 6.29647560146e-05
neg || <k>0 || 6.28574412944e-05
rotate1 || #slash#2 || 6.26588732036e-05
code_Neg || <k>0 || 6.22874102927e-05
id2 || |....|2 || 6.22416697409e-05
removeAll || [....]1 || 6.20115874883e-05
pos || <k>0 || 6.19771674659e-05
set2 || +30 || 6.17313019679e-05
id2 || In_Power || 6.1588107126e-05
real || sqrcomplex || 6.1452542455e-05
rotate1 || #quote#4 || 6.14169070832e-05
code_Pos || <k>0 || 6.070615374e-05
suc || bool || 6.06926066539e-05
transitive_trancl || max || 6.0309772691e-05
complex || HP-WFF || 6.02641206762e-05
sin_coeff || +73 || 6.02412159579e-05
sin_coeff || *136 || 5.97451356239e-05
nat || P_t || 5.95793779458e-05
set || LeftComp || 5.9267337159e-05
append || *38 || 5.91684793207e-05
complex || -infty || 5.90300355606e-05
transitive_rtrancl || max || 5.7935379946e-05
dup || nextcard || 5.7726523109e-05
distinct || Free1 || 5.76698521576e-05
distinct || Fixed || 5.76698521576e-05
dropWhile || [....]1 || 5.71650155137e-05
remove1 || [....]1 || 5.68599386506e-05
normal627294541factor || #quote#31 || 5.68227603446e-05
append || *41 || 5.68122307433e-05
butlast || #slash#2 || 5.67820143318e-05
remdups_adj || #slash#2 || 5.64699362804e-05
remdups || #slash#2 || 5.61733019066e-05
remdups_adj || #quote#4 || 5.55224193975e-05
takeWhile || [....]1 || 5.52907246613e-05
divide_divide || +19 || 5.52317506519e-05
complex || +infty || 5.50969969059e-05
sin_coeff || +21 || 5.47232776186e-05
real_Vector_of_real || {..}3 || 5.47030900268e-05
top_top || 0* || 5.46804735676e-05
append || #slash#19 || 5.46772649099e-05
suc || -0 || 5.46072484737e-05
complex2 || latt0 || 5.4480860046e-05
complex2 || latt2 || 5.4480860046e-05
remdups || #quote#4 || 5.4359357739e-05
finite_finite2 || ex_inf_of || 5.42400117972e-05
butlast || #quote#4 || 5.40145535277e-05
code_dup || nextcard || 5.38447096525e-05
bitM || -25 || 5.37848271598e-05
zero_Rep || SourceSelector 3 || 5.37287171903e-05
append || |^17 || 5.35368489797e-05
bNF_Ca1495478003natLeq || omega || 5.33918755543e-05
bit1 || Im20 || 5.3364499918e-05
bit1 || Rea || 5.3364499918e-05
bit1 || Im10 || 5.31749929887e-05
times_times || +19 || 5.28022186844e-05
product_unit || INT || 5.24410478165e-05
drop || [....]1 || 5.21664729566e-05
is_empty2 || lim_inf1 || 5.20926233109e-05
bit0 || Psingle_e_net || 5.17764575156e-05
bit0 || Psingle_f_net || 5.17764575156e-05
bit0 || Tsingle_e_net || 5.17764575156e-05
tl || #quote#4 || 5.10346738727e-05
re || lower_bound0 || 5.0987165036e-05
take || [....]1 || 5.07734396465e-05
rev || #slash#2 || 5.05137748099e-05
int_ge_less_than2 || carrier\ || 5.04257930192e-05
int_ge_less_than || carrier\ || 5.04257930192e-05
finite_finite2 || ex_sup_of || 4.9959366289e-05
diffs || . || 4.96865683463e-05
filter2 || [....]1 || 4.96787108811e-05
inc || Sum11 || 4.90555137533e-05
bit1 || <k>0 || 4.88699681961e-05
nat || TriangleGraph || 4.84956748304e-05
abs_abs || -0 || 4.84907894591e-05
re || sqr || 4.83659969201e-05
re || upper_bound2 || 4.82673108218e-05
append || *71 || 4.78758286845e-05
bit0 || Tsingle_f_net || 4.75501728283e-05
id_on || + || 4.71854712071e-05
real_V1127708846m_norm || dom || 4.65357170953e-05
code_integer_of_int || k3_lattad_1 || 4.64781715736e-05
code_integer_of_int || k1_lattad_1 || 4.64781715736e-05
removeAll || smid || 4.63470119642e-05
sqrt || k4_ltlaxio2 || 4.57793309173e-05
bit0 || bubble-sort || 4.54498879184e-05
suc || nextcard || 4.49284190676e-05
product_unit || P_sin || 4.46618341517e-05
bit0 || insert-sort0 || 4.4431772683e-05
append || |^6 || 4.4348260365e-05
bNF_Cardinal_cone || EdgeSelector 2 || 4.42410447401e-05
bitM || {..}1 || 4.41596660198e-05
product_unit || RAT || 4.39084448702e-05
rotate1 || Rev || 4.3876533769e-05
code_integer_of_int || LattRel0 || 4.38377119182e-05
takeWhile || smid || 4.35804665952e-05
one_one || return || 4.3339300286e-05
less_than || omega || 4.28528323837e-05
rotate1 || <>* || 4.26638515969e-05
re || upper_bound1 || 4.24292139686e-05
dropWhile || smid || 4.20442505055e-05
transitive_trancl || + || 4.17869029142e-05
remove1 || smid || 4.17776834457e-05
bit1 || -54 || 4.15842306428e-05
inc || carrier\ || 4.15047973607e-05
inc || <k>0 || 4.13317906727e-05
real || SBP || 4.13157087e-05
cnj || sort_d || 4.11969220587e-05
cnj || sort_a || 4.11969220587e-05
real || -45 || 4.07476666188e-05
re || *86 || 4.07002612495e-05
arctan || -0 || 4.06941526741e-05
transitive_rtrancl || + || 4.06326781018e-05
code_integer_of_int || Tempty_e_net || 4.03576683772e-05
normal627294541factor || +46 || 4.01771424627e-05
code_Pos || ppf || 4.01618541658e-05
complex2 || |2 || 3.98903765145e-05
neg || Im3 || 3.98692074335e-05
bit0 || +14 || 3.97488390565e-05
bit1 || +76 || 3.96477292579e-05
pos || ppf || 3.94981768822e-05
pos || Im3 || 3.93475999204e-05
butlast || Rev || 3.93249635016e-05
code_Neg || Im3 || 3.93223572037e-05
take || smid || 3.9158391845e-05
remdups_adj || Rev || 3.90859306091e-05
product_unit || sin0 || 3.88992437621e-05
topolo282751700pology || is_properly_applicable_to1 || 3.88615446107e-05
remdups || Rev || 3.88589762632e-05
gcd_lcm || @3 || 3.87711157633e-05
diffs || .51 || 3.8743954541e-05
code_Pos || pfexp || 3.87318484735e-05
code_Pos || Im3 || 3.83888046452e-05
pos || pfexp || 3.80649715686e-05
sqr || sqr || 3.78724698905e-05
cnj || k8_rvsum_3 || 3.77553566524e-05
drop || smid || 3.77402306954e-05
diffs || || || 3.7299246854e-05
cons || at5 || 3.68847616161e-05
topolo282751700pology || is_properly_applicable_to || 3.68156941143e-05
re || |....| || 3.68070831833e-05
tl || Rev || 3.67911655674e-05
gcd_gcd || @3 || 3.66685253237e-05
pred_nat || NATPLUS || 3.66401191814e-05
dropWhile || #slash#^ || 3.66009973169e-05
null || divides || 3.65555442673e-05
takeWhile || |3 || 3.61639196344e-05
null || are_equipotent || 3.59296599733e-05
size_size || dom || 3.59008085697e-05
neg || Re2 || 3.5721998184e-05
filter2 || smid || 3.5648230157e-05
real || signum || 3.54985494458e-05
removeAll || #slash#^ || 3.54605233945e-05
code_Neg || Re2 || 3.53824885151e-05
code_dup || sqrt0 || 3.53693273352e-05
sub || ++0 || 3.5340897214e-05
pos || Re2 || 3.52624613487e-05
member3 || is_properly_applicable_to1 || 3.52405311158e-05
null || inf || 3.52000340513e-05
bit0 || root-tree0 || 3.50434694269e-05
bit1 || -- || 3.48845529993e-05
rev || Rev || 3.45754102918e-05
code_Pos || Re2 || 3.45563051162e-05
bit1 || -25 || 3.42216637066e-05
inc || inf5 || 3.40888253141e-05
removeAll || |3 || 3.4044686604e-05
dropWhile || |3 || 3.35290074101e-05
member3 || is_properly_applicable_to || 3.33853188941e-05
real || *78 || 3.3370839597e-05
take || |3 || 3.33658759775e-05
drop || #slash#^ || 3.33407084121e-05
remove1 || #slash#^ || 3.27094326356e-05
rev || <>* || 3.25976175601e-05
code_nat_of_integer || field || 3.24093796843e-05
real || RAT || 3.22984761273e-05
topolo282751700pology || is_applicable_to1 || 3.21913655444e-05
cnj || -3 || 3.21802065957e-05
takeWhile || #slash#^ || 3.18650964094e-05
remove1 || |3 || 3.15002965383e-05
real || cosh1 || 3.14010640847e-05
code_dup || Card0 || 3.13450208028e-05
member3 || is_applicable_to1 || 3.130999534e-05
cnj || X_axis || 3.12838038518e-05
cnj || Y_axis || 3.12838038518e-05
dup || ~0 || 3.10469885535e-05
bit1 || Im3 || 3.04666381308e-05
bit1 || #quote#14 || 3.00375820357e-05
bit0 || +76 || 2.98876908069e-05
code_sub || ++0 || 2.98447697979e-05
nat_of_num || Im20 || 2.97712522039e-05
nat_of_num || Rea || 2.97712522039e-05
complex2 || CohSp || 2.96818466668e-05
nat_of_num || Im10 || 2.9638675805e-05
cnj || Rev0 || 2.95762340399e-05
take || #slash#^ || 2.94175210651e-05
list_ex || Vars0 || 2.93892741404e-05
bit1 || #quote#20 || 2.93612748037e-05
drop || |3 || 2.91426784892e-05
bNF_Cardinal_cone || S4-Taut || 2.89682882063e-05
real || ECIW-signature || 2.88969762837e-05
filter2 || #slash#^ || 2.88205131801e-05
bit1 || Re2 || 2.85604630869e-05
distinct || divides || 2.81111333983e-05
code_nat_of_integer || proj1 || 2.80716735784e-05
filter2 || |3 || 2.7877204847e-05
pos || *+^+<0> || 2.77063005998e-05
real || sinh0 || 2.76640641275e-05
nil || Top1 || 2.74319647671e-05
sublist || *29 || 2.72571094161e-05
cis || cos1 || 2.72271170648e-05
bitM || sqrt0 || 2.68342204521e-05
finite_2 || *63 || 2.67588318001e-05
finite_2 || <j> || 2.67588318001e-05
pred_list || Vars0 || 2.62095761323e-05
real || HP-WFF || 2.61135986439e-05
set || GenProbSEQ || 2.60664873365e-05
code_nat_of_natural || alef || 2.55245512577e-05
inc || <*..*>4 || 2.53193039179e-05
minus_minus || [..]7 || 2.51323132006e-05
nat_of_num || Bottom || 2.49621526104e-05
nil || Bottom || 2.49392082055e-05
finite_2 || |....|11 || 2.47241553726e-05
real || arcsec1 || 2.45453185639e-05
coset || Finseq-EQclass || 2.43506141004e-05
bitM || nextcard || 2.41444909253e-05
rotate1 || -2 || 2.38814804178e-05
bit0 || #quote#14 || 2.37979469552e-05
dup || Tarski-Class || 2.37259202238e-05
diffs || {..}2 || 2.36009865261e-05
bitM || Card0 || 2.35866133252e-05
code_nat_of_natural || UNIVERSE || 2.34827259606e-05
cos_coeff || EdgeSelector 2 || 2.33389436125e-05
cos_coeff || *30 || 2.31630616979e-05
gen_length || +19 || 2.30482598864e-05
coset || FDprobSEQ || 2.29931537702e-05
nat_of_num || -Matrices_over || 2.27865870422e-05
remove || at4 || 2.27843207088e-05
bitM || abs8 || 2.27323144238e-05
pos || .:7 || 2.25430139576e-05
code_dup || Tarski-Class || 2.23910424855e-05
less_than || hcflatplus || 2.16462395858e-05
less_than || lcmlatplus || 2.16462395858e-05
cos_coeff || +20 || 2.16139580044e-05
bit1 || limit- || 2.15983718081e-05
butlast || -2 || 2.13517944577e-05
remove || at3 || 2.13015581727e-05
remdups_adj || -2 || 2.12192656425e-05
removeAll || #bslash#*#bslash# || 2.1152800584e-05
remdups || -2 || 2.10934637521e-05
bit1 || -50 || 2.10742264377e-05
inc || proj1 || 2.08130726723e-05
splice || +19 || 2.05941265131e-05
bit1 || nextcard || 2.03964366682e-05
suc || Tarski-Class || 2.0249732948e-05
bit1 || sup5 || 2.02219178314e-05
bitM || sqr || 2.01911310025e-05
nat_of_num || *79 || 2.01600875187e-05
nat_of_num || ProjectivePoints || 2.00338451592e-05
sin_coeff || NAT || 1.99994855037e-05
im || Web || 1.99892824821e-05
tl || -2 || 1.99486261325e-05
bit0 || .:7 || 1.97462563801e-05
bit1 || #quote# || 1.96918616522e-05
nat_of_num || Topology_of || 1.968002392e-05
bit1 || carrier || 1.95932288002e-05
trans || is_strongly_connected_in || 1.95408838383e-05
inc || the_rank_of0 || 1.90264631692e-05
product_unit || REAL || 1.8767568339e-05
nat2 || Bottom0 || 1.87660065804e-05
rev || -2 || 1.87246253282e-05
code_nat_of_integer || entrance || 1.83081393517e-05
code_nat_of_integer || escape || 1.83081393517e-05
nat2 || Bottom || 1.82557893953e-05
minus_minus || NOT1 || 1.82291784061e-05
pos || MidOpGroupCat || 1.82089339049e-05
pos || AbGroupCat || 1.82089339049e-05
complex2 || GroupVect || 1.81938515999e-05
bit1 || inf7 || 1.80321873818e-05
minus_minus || permutations || 1.73042803724e-05
bit0 || carrier\ || 1.72888006418e-05
real || k5_ordinal1 || 1.72572842728e-05
dup || bool0 || 1.7123075285e-05
trans || is_antisymmetric_in || 1.70307871642e-05
nat_of_num || MidOpGroupObjects || 1.66766094709e-05
nat_of_num || AbGroupObjects || 1.66766094709e-05
nat_of_num || setvect || 1.6543097711e-05
set2 || ^7 || 1.65058186431e-05
code_int_of_integer || ppf || 1.65051875249e-05
nat_of_num || Sub0 || 1.64970974179e-05
nat_of_num || idseq || 1.64585288668e-05
nat_of_num || C_3 || 1.64466206786e-05
code_dup || bool0 || 1.64103059977e-05
trans || is_transitive_in || 1.61650841736e-05
minus_minus || derangements || 1.59227678826e-05
sub || >0_goto || 1.59177452738e-05
sub || =0_goto || 1.59160228532e-05
divide_divide || ^31 || 1.58853513034e-05
pos || the_Complex_Space || 1.57623815105e-05
ring_1_of_int || Product3 || 1.57381657969e-05
nat2 || SymGroup || 1.56944874372e-05
bitM || alef || 1.51506034003e-05
nat_of_num || alef || 1.50687938412e-05
filter2 || #bslash#*#bslash# || 1.50659912718e-05
nat_of_num || k26_zmodul02 || 1.49148269797e-05
nat_of_num || LinComb || 1.49148124076e-05
bit0 || k4_ltlaxio2 || 1.4760560245e-05
minus_minus || CompleteSGraph || 1.4745293089e-05
im || numerator || 1.46222788543e-05
code_nat_of_natural || card || 1.44541398601e-05
divide_divide || #quote#31 || 1.43646951763e-05
inc || ^20 || 1.41988808859e-05
neg || alef || 1.41630424191e-05
trans || is_reflexive_in || 1.40165772046e-05
nat_of_num || OpenClosedSet || 1.39881091062e-05
bNF_Cardinal_cone || CPC-Taut || 1.39859123024e-05
code_Neg || alef || 1.39730991997e-05
nat_of_num || StoneS || 1.39564976652e-05
append || +19 || 1.39096278885e-05
pos || alef || 1.38637949074e-05
pos || Open_Domains_Lattice || 1.38262178659e-05
pos || Closed_Domains_Lattice || 1.38262178659e-05
distinct || still_not-bound_in || 1.37718767359e-05
bitM || UNIVERSE || 1.37639330875e-05
minus_minus || sproduct || 1.3729867983e-05
num || HP-WFF || 1.35189699509e-05
nat_of_num || UNIVERSE || 1.35134131251e-05
bNF_Cardinal_cone || 0 || 1.34847625299e-05
pos || lattice || 1.34700828129e-05
code_Pos || alef || 1.34418247182e-05
pos || vectgroup || 1.33341002729e-05
set2 || Finseq-EQclass || 1.32975337295e-05
pos || Domains_Lattice || 1.325972128e-05
inc || card || 1.30950369749e-05
bit1 || base- || 1.30809026323e-05
product_unit || REAL+ || 1.30705626521e-05
pos || OpenClosedSetLatt || 1.29699597142e-05
code_nat_of_natural || {..}1 || 1.29245770337e-05
set2 || FDprobSEQ || 1.29047149103e-05
nat_of_num || Subgroups || 1.28279043366e-05
bit1 || doms || 1.27441623361e-05
nil || VERUM || 1.26041113626e-05
neg || UNIVERSE || 1.25447671431e-05
divide_divide || +46 || 1.25382748456e-05
nat_of_num || Open_Domains_of || 1.24377784283e-05
nat_of_num || Closed_Domains_of || 1.24377784283e-05
code_Neg || UNIVERSE || 1.24301942285e-05
nat_of_num || Domains_of || 1.24261229067e-05
pos || UNIVERSE || 1.22955209105e-05
coset || the_base_of || 1.224174196e-05
nat_of_num || On || 1.21967860778e-05
nat2 || Sgm || 1.21529398739e-05
minus_minus || Fin || 1.21480073684e-05
code_Pos || UNIVERSE || 1.19852501587e-05
pos || ProjectiveSpace || 1.19647432037e-05
minus_minus || *0 || 1.16549861911e-05
pos || UnSubAlLattice || 1.16545210243e-05
pos || StoneLatt || 1.16057560904e-05
pos || k31_zmodul02 || 1.1571648796e-05
pos || LC_RLSpace || 1.15710603748e-05
minus_minus || Bags || 1.15111174972e-05
minus_minus || product || 1.14940696121e-05
bit1 || SubFuncs || 1.13637548718e-05
code_nat_of_integer || Top || 1.13558073742e-05
pos || InclPoset || 1.1290911274e-05
bit1 || curry\ || 1.12565044409e-05
antisym || is_strongly_connected_in || 1.116055992e-05
one2 || +21 || 1.11339565272e-05
minus_minus || bool || 1.09813631139e-05
complex2 || TolSets || 1.09727808145e-05
complex2 || TolClasses || 1.09727808145e-05
im || sgn || 1.09048172874e-05
suc || -54 || 1.08485051918e-05
code_int_of_integer || Sum2 || 1.08360034466e-05
inc || Product4 || 1.0795732232e-05
nat_of_num || Quot. || 1.05945523889e-05
code_nat_of_integer || Points || 1.04516739436e-05
bitM || Tarski-Class || 1.03818233822e-05
product_unit || IPC-Taut || 1.03483601849e-05
bit1 || abs8 || 1.02740114888e-05
pos || the_Field_of_Quotients || 1.02618246016e-05
bit1 || alef || 1.01850036969e-05
product_unit || cosh1 || 9.92057488056e-06
pos || MPS || 9.81149489798e-06
code_integer_of_int || Open_setLatt || 9.80321849672e-06
suc || -19 || 9.78616664931e-06
bNF_Ca829732799finite || is_strongly_connected_in || 9.77342871124e-06
antisym || is_antisymmetric_in || 9.58226951524e-06
bit1 || sqrt0 || 9.55706065049e-06
insert3 || at4 || 9.45457548988e-06
bit1 || UNIVERSE || 9.45372394466e-06
product_unit || RAT+ || 9.443453533e-06
bNF_Cardinal_cone || SCM+FSA-Instr || 9.44024847277e-06
code_integer_of_num || cos1 || 9.39271010225e-06
neg || Rank || 9.38652280342e-06
code_Neg || Rank || 9.32560302519e-06
sin_coeff || P_t || 9.28113005044e-06
code_integer_of_int || IncProjSp_of0 || 9.26445327738e-06
pos || Rank || 9.24362070143e-06
bit1 || sqr || 9.17348423207e-06
bit1 || Card0 || 9.11015105757e-06
code_Pos || Rank || 9.06858654945e-06
antisym || is_transitive_in || 9.04674046864e-06
suc || -25 || 8.99213751348e-06
bNF_Cardinal_cfinite || linearly_orders || 8.96775038804e-06
bNF_Cardinal_cone || y>=0-plane || 8.96666503552e-06
suc || sqrt0 || 8.9377850731e-06
product_unit || SCM-Memory || 8.88005401864e-06
product_unit || CPC-Taut || 8.85661376448e-06
code_integer_of_num || cos0 || 8.84994775013e-06
code_sub || >0_goto || 8.81983452218e-06
code_sub || =0_goto || 8.81848238069e-06
product_fst || #slash##bslash#4 || 8.73995471464e-06
finite_2 || <i>0 || 8.68567207929e-06
has_ve2132708402vative || -0 || 8.65941317815e-06
inc || alef || 8.60085338232e-06
bNF_Ca829732799finite || is_antisymmetric_in || 8.53099160135e-06
num || INT || 8.51919341497e-06
neg || Sum11 || 8.44617702431e-06
zero_Rep || TargetSelector 4 || 8.4402834248e-06
inc || proj4_4 || 8.43976677509e-06
code_Suc || -0 || 8.43806934697e-06
sum_Plus || [:..:]6 || 8.31825633241e-06
pos || Sum11 || 8.30415316032e-06
im || Sum2 || 8.25892691445e-06
nat_of_num || Im3 || 8.25543483737e-06
set2 || the_base_of || 8.21404233152e-06
append || ^ || 8.17807758324e-06
re || Sum2 || 8.17704710414e-06
set2 || index0 || 8.14836343819e-06
suc || Card0 || 8.14164394304e-06
product_unit || sinh0 || 8.13836224037e-06
finite_psubset || NonTerminals || 8.13420331004e-06
nat_of_num || card || 8.11092773383e-06
bNF_Ca829732799finite || is_transitive_in || 8.10151905284e-06
bit0 || nextcard || 8.09160964435e-06
code_Neg || Sum11 || 8.07891716626e-06
real || sinh1 || 8.0287638764e-06
product_unit || sinh1 || 8.0212898047e-06
product_unit || one || 7.96963944474e-06
member3 || meets2 || 7.95965238172e-06
int || 8 || 7.92677232817e-06
pred_of_seq || +23 || 7.9263823893e-06
int || VLabelSelector 7 || 7.89140039683e-06
inc || UNIVERSE || 7.86782676222e-06
code_Pos || Sum11 || 7.83341415161e-06
neg || card || 7.80486533475e-06
union || Ex || 7.77407431282e-06
bitM || bool0 || 7.76124301906e-06
bit1 || Tarski-Class || 7.74667680197e-06
code_integer_of_int || .104 || 7.74260815232e-06
antisym || is_reflexive_in || 7.73907381185e-06
code_Neg || card || 7.72537979071e-06
pos || card || 7.71186985526e-06
bit1 || *79 || 7.61443172896e-06
bit0 || InclPoset || 7.59572634805e-06
bit1 || ProjectivePoints || 7.59566983459e-06
code_Pos || card || 7.55811903137e-06
bit1 || Rank || 7.53526159055e-06
semilattice_axioms || are_equipotent || 7.44954688365e-06
bit0 || ~2 || 7.40093966143e-06
pred || len || 7.31062644648e-06
product_unit || RealOrd || 7.30257928546e-06
product_unit || IVERUM || 7.25542557491e-06
bit1 || #quote##quote# || 7.21181127084e-06
hd || still_not-bound_in || 7.19390221287e-06
nat_of_num || REAL0 || 7.14821212435e-06
bNF_Ca829732799finite || is_reflexive_in || 7.03360347421e-06
splice || #slash##bslash#9 || 7.02565573623e-06
bit1 || |....|12 || 6.99016133977e-06
suc || doms || 6.93538690647e-06
union || All || 6.90171804794e-06
code_nat_of_integer || SymbolsOf || 6.8950963657e-06
divide_divide || 1_Rmatrix || 6.86915934407e-06
complex2 || Base_FinSeq || 6.83506134475e-06
cnj || Complement1 || 6.80147872073e-06
suc || SubFuncs || 6.75767075856e-06
bit1 || MidOpGroupObjects || 6.66180917381e-06
bit1 || AbGroupObjects || 6.66180917381e-06
hd || Free1 || 6.64598206242e-06
hd || Fixed || 6.64598206242e-06
bit1 || setvect || 6.64404367613e-06
bit1 || Topology_of || 6.63725369854e-06
bit1 || Sub0 || 6.63690472574e-06
bit1 || C_3 || 6.6282150444e-06
bit1 || card || 6.62224324949e-06
abel_semigroup || are_equipotent || 6.56133083837e-06
bitM || the_rank_of0 || 6.55794094589e-06
complex2 || * || 6.55426009362e-06
bit0 || bool0 || 6.44836026363e-06
code_integer_of_int || numbering || 6.41180459882e-06
pred_of_seq || +30 || 6.36703706841e-06
product_unit || y=0-line || 6.36435616737e-06
antisym || <= || 6.31819978263e-06
sym || <= || 6.2926498196e-06
product_unit || SCM-Instr || 6.26454524375e-06
times_times || -0 || 6.25303642995e-06
sum_sum || [:..:]4 || 6.22362924006e-06
bit1 || k26_zmodul02 || 6.17873175195e-06
bit1 || LinComb || 6.17873036634e-06
cnj || Op-RightShift || 6.1666049839e-06
one2 || *78 || 6.16070296574e-06
bit0 || doms || 6.14025883338e-06
bind4 || is_subformula_of0 || 6.0642734295e-06
find || +87 || 6.01897368301e-06
sgn_sgn || -0 || 6.005647642e-06
product_unit || {}2 || 6.00457496852e-06
bit1 || OpenClosedSet || 5.89524697334e-06
set || nextcard || 5.8936059143e-06
bit1 || StoneS || 5.89003590786e-06
finite_psubset || SortsWithConstants || 5.84845549899e-06
re || succ0 || 5.82712242611e-06
inc || Rank || 5.80611981741e-06
code_Suc || #quote#20 || 5.80213789042e-06
nat_of_num || proj1 || 5.74747679003e-06
real || +21 || 5.73095965547e-06
insert || Ex || 5.72738976857e-06
bit0 || MidOpGroupCat || 5.72297584826e-06
bit0 || AbGroupCat || 5.72297584826e-06
rev || \not\0 || 5.69309686486e-06
bind4 || c=7 || 5.6900357764e-06
pos || TOP-REAL || 5.67817503561e-06
pos || .104 || 5.63558037267e-06
inc || +45 || 5.56292361997e-06
inc || topology || 5.55718404584e-06
bit1 || Subgroups || 5.52535800489e-06
real || INT- || 5.49064501056e-06
bit1 || --0 || 5.47020355953e-06
bind4 || is_subformula_of1 || 5.42699972312e-06
cos_coeff || INT || 5.40402564055e-06
bit1 || Open_Domains_of || 5.39919418278e-06
bit1 || Closed_Domains_of || 5.39919418278e-06
bit1 || Domains_of || 5.39742839351e-06
code_integer || 8 || 5.39674349667e-06
code_integer || VLabelSelector 7 || 5.36800309138e-06
bit1 || Carr || 5.3490542125e-06
diffs || `|0 || 5.33672648116e-06
bit0 || the_Complex_Space || 5.33362429489e-06
cnj || Field2COMPLEX || 5.30814942771e-06
nat || lcmlat || 5.29567810427e-06
nat || hcflat || 5.29567810427e-06
dup || proj4_4 || 5.2917894266e-06
bit1 || #quote##quote#0 || 5.26590250178e-06
real_V1127708846m_norm || +14 || 5.25028815702e-06
insert || All || 5.2266752441e-06
bind4 || is_a_fixpoint_of || 5.22103948636e-06
filter3 || at3 || 5.20396012127e-06
cnj || -57 || 5.13423497891e-06
cnj || COMPLEX2Field || 5.13423497891e-06
real_V1908273582scaleR || +14 || 5.11094270399e-06
code_dup || proj4_4 || 5.08411587076e-06
code_natural_of_nat || Sum || 5.07608404122e-06
has_field_derivative || +14 || 5.04852395937e-06
inc || |....| || 4.99461309119e-06
real_V1127708846m_norm || #quote# || 4.9706416726e-06
real || +16 || 4.87570173107e-06
bNF_Cardinal_cone || IPC-Taut || 4.86027969055e-06
cnj || -54 || 4.85648283316e-06
distinct || index0 || 4.8284451542e-06
real_V1908273582scaleR || #quote# || 4.82269993197e-06
bit1 || Quot. || 4.80046014346e-06
sin || . || 4.79741439052e-06
less_than || OddNAT || 4.76858695162e-06
has_field_derivative || #quote# || 4.76845328285e-06
cos || . || 4.76732433058e-06
bit0 || vectgroup || 4.76560098054e-06
cnj || Row_Marginal || 4.74838664394e-06
diffs || #bslash##slash#0 || 4.71275581108e-06
zero_zero || dom0 || 4.68880972304e-06
bit0 || OpenClosedSetLatt || 4.68821820906e-06
normal627294541factor || +14 || 4.67539136005e-06
nat_of_num || arity || 4.67363847239e-06
bit0 || 1TopSp || 4.66563668181e-06
bit0 || *+^+<0> || 4.66036314964e-06
nat2 || arity0 || 4.6321048551e-06
num || COMPLEX || 4.58759267568e-06
cnj || Re3 || 4.57797771517e-06
cnj || Im4 || 4.57797771517e-06
cos_coeff || sin1 || 4.5555126875e-06
code_nat_of_natural || SpStSeq || 4.50458683944e-06
nat2 || dyadic || 4.48355631754e-06
bit0 || ProjectiveSpace || 4.45000717694e-06
nat2 || On || 4.43908605217e-06
bit0 || Open_Domains_Lattice || 4.42706447605e-06
bit0 || Closed_Domains_Lattice || 4.42706447605e-06
bit0 || Open_setLatt || 4.39968495266e-06
bit0 || UnSubAlLattice || 4.38088667425e-06
sin_coeff || REAL || 4.37988948524e-06
bit0 || StoneLatt || 4.37179578225e-06
bit0 || -19 || 4.37071134303e-06
normal627294541factor || #quote# || 4.36607449485e-06
bit0 || lattice || 4.36337991615e-06
bit0 || k31_zmodul02 || 4.36274033919e-06
bit0 || LC_RLSpace || 4.36266013763e-06
bit0 || Domains_Lattice || 4.31007809008e-06
set2 || ConsecutiveSet2 || 4.30766974708e-06
set2 || ConsecutiveSet || 4.30766974708e-06
bitM || Sum11 || 4.25028864832e-06
map_option || #quote#2 || 4.16390687886e-06
dropWhile || ovlldiff || 4.15795862996e-06
nat || EvenNAT || 4.1520067954e-06
code_Suc || -50 || 4.13685502235e-06
bit0 || the_Field_of_Quotients || 4.03669645582e-06
cnj || SubFuncs || 3.91762205195e-06
bit0 || MPS || 3.9126035074e-06
code_Suc || +45 || 3.91113641516e-06
pos || proj1 || 3.84821917486e-06
nat_of_num || dyadic || 3.84761268413e-06
nat_of_num || [#hash#] || 3.83924515926e-06
real || sec || 3.83815093742e-06
code_Suc || #quote# || 3.80596848513e-06
real || sin1 || 3.77253060794e-06
bit1 || *0 || 3.76121728621e-06
nat_of_num || limit- || 3.74650431383e-06
nat_of_num || ProjectiveLines || 3.72535815879e-06
nat_of_num || Proj_Inc || 3.72535815879e-06
member || is-lower-neighbour-of || 3.67385280413e-06
gen_length || #slash##bslash#9 || 3.66246910692e-06
bit0 || Tarski-Class || 3.65678849127e-06
real || P_sin || 3.6544094597e-06
set || SegM || 3.64387832306e-06
filter2 || at5 || 3.63948828002e-06
finite_psubset || weight || 3.62401746621e-06
bit1 || weight || 3.5831597783e-06
map || #quote#2 || 3.52914917639e-06
bit1 || REAL0 || 3.51744542762e-06
nat_of_num || *1 || 3.44661061042e-06
set || k32_fomodel0 || 3.41179370525e-06
inc || {..}1 || 3.31757646816e-06
set2 || ord || 3.31001857341e-06
drop || ovlldiff || 3.2954693547e-06
remdups || lcm0 || 3.29540711871e-06
ii || REAL || 3.27965387028e-06
finite_psubset || sup4 || 3.27110411182e-06
bit0 || bool || 3.21623412309e-06
inc || bool0 || 3.20312616042e-06
nat_of_num || sup5 || 3.19495461675e-06
nat_of_num || Re2 || 3.18184010065e-06
set || BOOL || 3.09482647087e-06
bit1 || Sum11 || 3.05215801809e-06
set || Subformulae || 3.03856923932e-06
pos || 1TopSp || 3.02774976752e-06
cnj || +14 || 2.99947309702e-06
nat2 || |....| || 2.99334439272e-06
product_unit || SCM+FSA-Data*-Loc || 2.98676356185e-06
int || sin0 || 2.98338012373e-06
set || bool3 || 2.98224862595e-06
int || sin1 || 2.97573320045e-06
none || carrier || 2.9648400178e-06
inc || Im3 || 2.93118426312e-06
bit0 || SubFuncs || 2.92882048706e-06
antisym || |-6 || 2.91400486924e-06
sym || |-6 || 2.883638274e-06
hd || index0 || 2.83123540193e-06
set2 || ^0 || 2.81393598843e-06
inc || Re2 || 2.81312089632e-06
complex2 || [....] || 2.79442949669e-06
bit0 || -54 || 2.79091501713e-06
set || the_right_side_of || 2.77838104668e-06
im || upper_bound2 || 2.77392544432e-06
id_on || +` || 2.75676650045e-06
code_Suc || card || 2.744704219e-06
id_on || exp4 || 2.73581911549e-06
code_Suc || +46 || 2.73033688003e-06
code_Suc || carrier || 2.72393131721e-06
bind4 || c= || 2.66865085758e-06
bit1 || topology || 2.66345176619e-06
code_Suc || ^20 || 2.64425115073e-06
sin_coeff || NATPLUS || 2.63938202931e-06
bit0 || TOP-REAL || 2.6345919638e-06
code_natural || EdgeSelector 2 || 2.62075598238e-06
set2 || #bslash##slash#0 || 2.59640317881e-06
id2 || epsilon_ || 2.58029384115e-06
pred_nat || OddNAT || 2.57639078286e-06
bind4 || <= || 2.56864478032e-06
code_Nat || min || 2.55260892881e-06
trans || |-6 || 2.52450785254e-06
bit0 || |[..]|2 || 2.51324816139e-06
bNF_Cardinal_cfinite || misses || 2.43107128477e-06
code_n1042895779nteger || min || 2.42914703113e-06
code_Suc || proj4_4 || 2.40085463428e-06
id_on || +^1 || 2.33876788358e-06
re || carrier\ || 2.33028044632e-06
bit0 || -25 || 2.32385662062e-06
re || Sum10 || 2.28749612267e-06
cnj || Subformulae0 || 2.28289463099e-06
code_Suc || proj1 || 2.28194141833e-06
set || Terminals || 2.26479935786e-06
minus_minus || -SD0 || 2.25572062414e-06
bNF_Ca1495478003natLeq || OddNAT || 2.24431937364e-06
neg || proj1 || 2.23550520172e-06
transitive_trancl || +` || 2.23318052649e-06
bit0 || -- || 2.2259514572e-06
code_Neg || proj1 || 2.22554686169e-06
ii || VERUM2 || 2.21719353365e-06
code_Pos || proj1 || 2.18470143538e-06
code_integer_of_int || {..}1 || 2.18228268984e-06
plus_plus || +45 || 2.17545511183e-06
transitive_rtrancl || +` || 2.13120735949e-06
re || proj4_4 || 2.12815580538e-06
transitive_rtrancl || exp4 || 2.11859109208e-06
distinct || ord || 2.06138558779e-06
code_Suc || -19 || 1.99496097937e-06
pos || EqRelLatt || 1.98509549271e-06
bNF_Wellorder_wo_rel || <N< || 1.95149774876e-06
transitive_trancl || +^1 || 1.94959702684e-06
nat2 || topology || 1.90318681859e-06
code_Suc || |....|12 || 1.87646074996e-06
transitive_rtrancl || +^1 || 1.8713663634e-06
pos || ConceptLattice || 1.85264150881e-06
cos_coeff || hcflatplus || 1.83258672794e-06
cos_coeff || lcmlatplus || 1.83258672794e-06
nat2 || Lines || 1.83082080657e-06
nat2 || Inc || 1.83082080657e-06
set || InputVertices || 1.78697926986e-06
numeral_numeral || ]....] || 1.78029088214e-06
list_ex1 || misses1 || 1.77675673819e-06
nat_of_num || (Omega). || 1.73984904633e-06
nat_of_num || Concept-with-all-Objects || 1.72239494177e-06
set || density || 1.69595998397e-06
bit0 || <*..*>4 || 1.66292586781e-06
re || k2_zmodul05 || 1.63073441371e-06
pos || proj4_4 || 1.62824746753e-06
code_integer_of_int || LattPOSet || 1.60632023622e-06
code_nat_of_natural || Im20 || 1.5991211022e-06
code_nat_of_natural || Rea || 1.5991211022e-06
code_nat_of_natural || Im10 || 1.59267401709e-06
code_integer_of_int || .:7 || 1.58816828757e-06
null || sup1 || 1.57281903613e-06
code_nat_of_integer || Bottom || 1.55109911626e-06
inc || SymGroup || 1.53878779687e-06
code_nat_of_integer || Top0 || 1.53614004492e-06
null || c= || 1.53461442875e-06
numeral_numeral || ]....[ || 1.49309553497e-06
nat_of_num || {}0 || 1.48377050458e-06
uminus_uminus || root-tree || 1.4546829094e-06
code_integer_of_nat || cos1 || 1.45121462603e-06
list_ex || misses1 || 1.4279641806e-06
minus_minus || Seg || 1.4225824232e-06
set || inf5 || 1.41658678908e-06
nat_of_num || nabla || 1.4085356724e-06
code_natural_of_nat || <*..*>4 || 1.40710324881e-06
distinct || c= || 1.40407848936e-06
code_integer_of_nat || cos0 || 1.36470224247e-06
list_update || .44 || 1.32161340124e-06
filter3 || at4 || 1.32124845666e-06
set2 || Net-Str || 1.31108067682e-06
plus_plus || 0_Rmatrix0 || 1.29844123666e-06
bit0 || sort_d || 1.29800486568e-06
bit0 || sort_a || 1.29800486568e-06
cis || cos0 || 1.29738048095e-06
inc || +76 || 1.27927838826e-06
code_Suc || -54 || 1.27201997997e-06
bit0 || k3_lattad_1 || 1.2405434523e-06
bit0 || k1_lattad_1 || 1.2405434523e-06
code_Suc || +76 || 1.22693133679e-06
bit0 || LattRel0 || 1.19317338235e-06
nibble || 23 || 1.07392297368e-06
inc || Sgm || 1.07137060146e-06
bit1 || -Matrices_over || 1.06286495328e-06
inc || Top || 1.04918604168e-06
minus_minus || 1_Rmatrix || 1.04304778982e-06
code_Suc || -- || 1.02601761197e-06
hd || ord || 1.0235817873e-06
pred_list || |-2 || 1.01466763313e-06
nat_of_num || Sum11 || 1.01083699278e-06
listsp || |-2 || 1.00166206578e-06
inc || field || 9.87262263095e-07
antisym || divides || 9.51753548331e-07
sym || divides || 9.46609735907e-07
minus_minus || ^31 || 9.41648206854e-07
code_Suc || -25 || 9.40712759381e-07
bit1 || sort_d || 9.36872240912e-07
bit1 || sort_a || 9.36872240912e-07
code_nat_of_natural || Sum11 || 9.36272124659e-07
neg || LattPOSet || 8.97464826897e-07
nat_of_num || <k>0 || 8.95025721072e-07
trans || divides || 8.82024733076e-07
complex || INT || 8.61588980039e-07
bitM || sort_d || 8.5670754581e-07
bitM || sort_a || 8.5670754581e-07
minus_minus || #quote#31 || 8.53965188727e-07
bit0 || euc2cpx || 8.32552703372e-07
bit1 || idseq || 8.2735034286e-07
code_nat_of_natural || <k>0 || 7.89014604597e-07
code_natural_of_nat || Im3 || 7.63795630702e-07
pred_list || |- || 7.53561909893e-07
sublist || #quote##slash##bslash##quote# || 7.48130393599e-07
listsp || |- || 7.46294484859e-07
semiring_1_of_nat || . || 7.4495781678e-07
re || abs7 || 7.39781982085e-07
bit1 || |....| || 7.30497924385e-07
basic_fsts || #bslash#5 || 7.29322792816e-07
code_natural_of_nat || Re2 || 7.2527174621e-07
code_dup || ~0 || 7.04035945289e-07
cos_coeff || sinh1 || 6.60890618534e-07
splice || #quote##bslash##slash##quote#2 || 6.4367644549e-07
re || AV || 6.40370578264e-07
inc || Bottom || 6.29135087413e-07
nat2 || 0. || 6.23702978556e-07
minus_minus || +46 || 6.13386303143e-07
zero_zero || Mersenne || 5.91807001972e-07
nat_of_num || Ball2 || 5.87269099684e-07
code_natural_of_nat || {..}1 || 5.85160153268e-07
code_nat_of_natural || carrier || 5.77157388408e-07
size_size || +1 || 5.52365195235e-07
re || proj1 || 5.44476649607e-07
nat || 11 || 5.32413283364e-07
gcd_lcm || .4 || 5.29595819498e-07
gcd_gcd || .4 || 5.08382688436e-07
real || lcmlat || 5.07357254831e-07
real || hcflat || 5.07357254831e-07
nat2 || ord-type || 4.99053709124e-07
sublist || .3 || 4.98115023486e-07
nat_of_num || (1). || 4.88106419848e-07
butlast || SepVar || 4.66946317721e-07
pos || CLatt || 4.65887254818e-07
nat_of_num || zerovect || 4.64008919599e-07
nat_of_num || q1. || 4.2014079038e-07
bit0 || Card0 || 4.18493844203e-07
bit0 || #quote##quote# || 4.13504542576e-07
nat_of_num || ProjectiveCollinearity || 4.06213936556e-07
nat_of_num || q0. || 4.0559537329e-07
nat_of_num || Concept-with-all-Attributes || 4.02904348639e-07
tl || SepVar || 3.9194684316e-07
bitM || LattPOSet || 3.91220803504e-07
suc || +45 || 3.84498781617e-07
bit0 || sqrt0 || 3.67789398656e-07
nat2 || [#hash#] || 3.63506026499e-07
bit1 || ^20 || 3.606040022e-07
code_Neg || LattPOSet || 3.59178038386e-07
code_nat_of_natural || Im3 || 3.55844941462e-07
bit0 || numbering || 3.54871639249e-07
code_Pos || LattPOSet || 3.48074254448e-07
pos || -Matrices_over || 3.41444681906e-07
nat_of_num || Bot || 3.37901246913e-07
bitM || ~0 || 3.2832994166e-07
bit0 || Carr || 3.28119653715e-07
bit0 || |....|12 || 3.26184399954e-07
code_nat_of_integer || Bottom0 || 3.25250335716e-07
inc || Points || 3.20833766353e-07
cos_coeff || sinh0 || 3.19319499761e-07
bit1 || ord-type || 3.13289909012e-07
inc || 0. || 3.06347965515e-07
bit0 || --0 || 2.85164012961e-07
inc || sqrt0 || 2.84867228415e-07
bit1 || LattPOSet || 2.82621419424e-07
bit0 || #quote##quote#0 || 2.77773536907e-07
suc || +46 || 2.75693303572e-07
code_nat_of_integer || Lines || 2.69856917033e-07
code_nat_of_integer || Inc || 2.69856917033e-07
nat_of_num || id1 || 2.63144302901e-07
bitM || bool || 2.55600276944e-07
nat2 || 1. || 2.55070193325e-07
nat2 || Collinearity || 2.54535433399e-07
nat_of_num || k19_zmodul02 || 2.50922320286e-07
code_natural_of_nat || Im20 || 2.50486939842e-07
code_natural_of_nat || Rea || 2.50486939842e-07
code_natural_of_nat || Im10 || 2.49442529996e-07
bit1 || ~0 || 2.48717728854e-07
nat_of_num || PR || 2.48110868311e-07
rotate1 || \not\0 || 2.43972902382e-07
code_integer_of_int || Open_Domains_Lattice || 2.38624882863e-07
code_integer_of_int || Closed_Domains_Lattice || 2.38624882863e-07
bit1 || Bottom || 2.35155257349e-07
bit1 || Top || 2.34276919928e-07
bit1 || Ball2 || 2.31249575692e-07
code_integer_of_int || Domains_Lattice || 2.29662105362e-07
code_integer_of_int || lattice || 2.29426074368e-07
code_integer_of_int || EqRelLatt || 2.27523547906e-07
code_nat_of_natural || Re2 || 2.26525400195e-07
re || k1_matrix_0 || 2.2501746011e-07
dup || succ1 || 2.2193785987e-07
bit0 || IncProjSp_of0 || 2.21384095647e-07
nat_of_num || ZeroLC || 2.20097309552e-07
code_integer_of_int || ConceptLattice || 2.1320326164e-07
code_dup || succ1 || 2.11230897526e-07
nat2 || 4_arg_relation || 2.06978818212e-07
nat2 || 1_ || 2.0366576194e-07
nat2 || ProjectiveLines || 1.96170741815e-07
nat2 || Proj_Inc || 1.96170741815e-07
find || +32 || 1.95795352741e-07
find || +65 || 1.91970294568e-07
finite_2 || <i> || 1.90436057317e-07
remdups_adj || \not\0 || 1.84815727009e-07
find || +81 || 1.8349884784e-07
bit1 || {}0 || 1.83051508906e-07
nat2 || Topology_of || 1.79248106324e-07
nil || (Omega).2 || 1.78165920468e-07
antisym || c=0 || 1.76394235313e-07
sym || c=0 || 1.75385109777e-07
bit1 || [#hash#] || 1.73281229086e-07
inc || Collinearity || 1.71736401728e-07
nat2 || Concept-with-all-Objects || 1.67429984943e-07
code_Suc || +14 || 1.61216977321e-07
nat2 || (Omega). || 1.53811702387e-07
inc || 4_arg_relation || 1.5038917719e-07
append || \&\ || 1.49823652253e-07
nat2 || nabla || 1.44105523569e-07
code_natural_of_nat || Sum11 || 1.43002672694e-07
wf || c=0 || 1.33408487831e-07
remdups || \not\0 || 1.3237827367e-07
pos || |[..]|2 || 1.31982483139e-07
nil || (Omega).5 || 1.29854964589e-07
inc || 1. || 1.29008297956e-07
code_nat_of_integer || carrier || 1.28244922754e-07
bit0 || ^21 || 1.26489527479e-07
nil || (Omega).1 || 1.26265449584e-07
code_natural_of_nat || <k>0 || 1.23004910144e-07
bit1 || q1. || 1.22996341027e-07
cnj || Directed || 1.22932882425e-07
bit0 || .104 || 1.22626742787e-07
bit1 || q0. || 1.21693555499e-07
nat_of_num || 0.REAL || 1.1882728084e-07
neg || the_rank_of0 || 1.17858588366e-07
is_none || ex_inf_of || 1.17543736336e-07
code_Neg || the_rank_of0 || 1.16966609556e-07
pos || the_rank_of0 || 1.15841818399e-07
bNF_Cardinal_cone || MP-variables || 1.14762477411e-07
bit1 || On || 1.14049247097e-07
code_Pos || the_rank_of0 || 1.13350652032e-07
is_none || ex_sup_of || 1.12381961899e-07
bit1 || dyadic || 1.11737868549e-07
inc || curry\ || 1.10185367046e-07
suc || +76 || 1.10086427917e-07
nibbleA || 89 || 1.08986790409e-07
bit1 || zerovect || 1.07694477785e-07
nibbleB || 89 || 1.05317086213e-07
pred_option || is_eventually_in || 1.05309893088e-07
nibble8 || 89 || 1.02214514216e-07
distinct || QuantNbr || 1.004671149e-07
bitM || succ1 || 9.90202295405e-08
inc || RelIncl || 9.87994946003e-08
bit1 || ProjectiveCollinearity || 9.81350939247e-08
nibble0 || 89 || 9.72149259215e-08
antisym || meets || 9.52451665903e-08
nibbleC || 89 || 9.3320935886e-08
inc || Lang1 || 9.22019770377e-08
bit1 || the_rank_of0 || 9.2178592388e-08
nibbleD || 89 || 9.16689469559e-08
nibble1 || 89 || 9.16689469559e-08
nat_of_num || base- || 9.10284063788e-08
set2 || QuantNbr || 9.01601691644e-08
bit1 || Family_open_set0 || 8.96025759577e-08
bit1 || +14 || 8.93727790541e-08
nibbleF || 89 || 8.75520378558e-08
nat_of_num || 0* || 8.47826799396e-08
nibble3 || 89 || 8.43303842946e-08
nibble9 || 89 || 8.17140976768e-08
bit1 || InclPoset || 8.15106700073e-08
bit0 || TopUnitSpace || 8.09604265624e-08
nibble5 || 89 || 8.09445165364e-08
bit1 || Family_open_set || 8.05226856869e-08
nat2 || inf5 || 7.99976927093e-08
nibble2 || 89 || 7.88781400177e-08
inc || -25 || 7.87980877458e-08
nibble4 || 89 || 7.82584391104e-08
nibbleE || 89 || 7.76684731727e-08
nibble7 || 89 || 7.76684731727e-08
dup || sort_d || 7.72386558747e-08
dup || sort_a || 7.72386558747e-08
nibble6 || 89 || 7.71058500942e-08
bit1 || (Omega). || 7.33475220949e-08
bit0 || 1* || 7.26064587152e-08
code_dup || sort_d || 7.12740651989e-08
code_dup || sort_a || 7.12740651989e-08
nat_of_num || ^20 || 7.06593711214e-08
bit1 || k19_zmodul02 || 7.04758607094e-08
bit1 || PR || 7.01945032091e-08
pos || 1* || 6.99265014239e-08
inc || \not\11 || 6.95048991657e-08
bNF_Cardinal_cone || Constructors || 6.86314095458e-08
bit0 || 1.REAL || 6.64239116847e-08
product_unit || MP-conectives || 6.53591471568e-08
bNF_Ca829732799finite || meets || 6.42181097162e-08
nat2 || {}0 || 6.3999277399e-08
bit1 || ZeroLC || 6.3862360022e-08
code_nat_of_integer || subset-closed_closure_of || 6.29274928184e-08
bit0 || TopSpaceMetr || 6.16053781289e-08
remdups || #bslash##slash#0 || 6.10229405528e-08
suc || proj4_4 || 6.06959634993e-08
pos || 1.REAL || 6.05782563172e-08
bit1 || (1). || 6.03419671388e-08
nat_of_num || the_rank_of0 || 5.97505392349e-08
divide_divide || +14 || 5.83366931697e-08
nat_of_num || inf7 || 5.67888840662e-08
divide_divide || #quote# || 5.56160708832e-08
bit0 || TotalGrammar || 5.52475413901e-08
bit1 || FlatCoh || 5.41124953992e-08
re || Re2 || 5.27881324023e-08
remdups || ^7 || 4.97938599493e-08
pos || TopUnitSpace || 4.87657967205e-08
im || the_value_of || 4.74586667279e-08
code_integer_of_int || euc2cpx || 4.64320121666e-08
code_nat_of_integer || Subtrees0 || 4.57177722111e-08
nil || the_transitive-closure_of || 4.54289705661e-08
code_nat_of_integer || sup4 || 4.50159595289e-08
cnj || Seq || 4.46824243851e-08
nil || [*] || 4.46558041408e-08
neg || -25 || 4.37461535435e-08
nat || maxreal || 4.3437447687e-08
nat || minreal || 4.3437447687e-08
nil || CnPos || 4.3420752468e-08
code_Neg || -25 || 4.3321580009e-08
nat_of_num || Family_open_set0 || 4.30709115903e-08
pos || -25 || 4.30697192659e-08
nil || k5_ltlaxio3 || 4.29137679649e-08
remdups_adj || +*0 || 4.28016451871e-08
product_Unity || 89 || 4.27561537379e-08
remdups || +*0 || 4.26152807631e-08
code_Pos || -25 || 4.21092543715e-08
code_nat_of_integer || k19_finseq_1 || 4.20686631598e-08
bit1 || 0.REAL || 4.15839177467e-08
nil || CnIPC || 4.1342777721e-08
nil || CnCPC || 4.1030205657e-08
nil || Subtrees0 || 4.1030205657e-08
nil || Inv0 || 4.07408585404e-08
inc || arity0 || 4.06820233759e-08
nil || CnS4 || 3.99849305854e-08
nil || sup4 || 3.97634303286e-08
remdups_adj || #bslash##slash#0 || 3.95604627259e-08
code_Suc || sqrt0 || 3.91310637158e-08
nil || Mycielskian1 || 3.8991536902e-08
remdups || ConsecutiveSet2 || 3.83700278954e-08
remdups || ConsecutiveSet || 3.83700278954e-08
suc || succ1 || 3.81895521134e-08
code_Nat || -54 || 3.78036905826e-08
code_nat_of_integer || *1 || 3.76906530754e-08
nil || Rank || 3.73606887096e-08
nat_of_num || Family_open_set || 3.71379750358e-08
bit0 || Output0 || 3.68457382017e-08
product_unit || 23 || 3.65953562574e-08
complex2 || --> || 3.63177233876e-08
product_unit || Vars || 3.51182124588e-08
pos || min || 3.50667586981e-08
code_integer_of_int || CLatt || 3.50616441661e-08
code_n1042895779nteger || -54 || 3.3846963377e-08
bit1 || InnerVertices || 3.342441525e-08
code_Suc || Card0 || 3.33302108462e-08
nat2 || ^20 || 3.32338832507e-08
code_int_of_integer || Sum0 || 3.27192082925e-08
bit1 || 0* || 3.1938436378e-08
num || 23 || 3.18260906445e-08
pos || TopSpaceMetr || 3.160037533e-08
nat2 || Subtrees || 3.04741841043e-08
suc || +14 || 2.88197869416e-08
one2 || 89 || 2.83519127517e-08
code_Suc || abs8 || 2.81287532808e-08
code_nat_of_natural || id1 || 2.78992070577e-08
suc || curry\ || 2.74839452343e-08
code_Suc || doms || 2.68421328712e-08
code_nat_of_integer || bool0 || 2.55395356454e-08
nat2 || Concept-with-all-Attributes || 2.55335580311e-08
code_Suc || sqr || 2.53931684314e-08
code_int_of_integer || carr1 || 2.53132994945e-08
code_natural_of_nat || proj1 || 2.44564522639e-08
code_Suc || SubFuncs || 2.41433567084e-08
nat2 || succ1 || 2.41074611282e-08
nat2 || bool0 || 2.38192102512e-08
int || lcmlat || 2.31420666928e-08
int || hcflat || 2.31420666928e-08
int || maxreal || 2.29832030717e-08
int || minreal || 2.29832030717e-08
nat2 || -0 || 2.20495907715e-08
nat2 || Bot || 2.12515531805e-08
remdups || ^0 || 2.12129979739e-08
nat2 || (1). || 2.11300562357e-08
nat2 || <*..*>4 || 2.10299811846e-08
bit1 || arity || 2.08781699255e-08
bit0 || EqRelLatt || 2.06136271015e-08
tl || \not\0 || 2.05562226847e-08
bit0 || ConceptLattice || 1.969760053e-08
code_integer_of_int || carrier || 1.83869591414e-08
complex2 || -->1 || 1.83366336929e-08
nat_of_num || FuncUnit0 || 1.82317235102e-08
nat2 || id1 || 1.80199531116e-08
nat_of_num || FuncUnit || 1.79880274616e-08
code_Suc || Carr || 1.62502872844e-08
nat2 || product || 1.60378679876e-08
bit1 || Concept-with-all-Objects || 1.58187367024e-08
cnj || ^21 || 1.41942329701e-08
code_Nat || product4 || 1.41607445966e-08
bit1 || nabla || 1.35672104243e-08
suc || card || 1.32241821766e-08
code_n1042895779nteger || product4 || 1.31872440662e-08
code_Suc || #quote##quote# || 1.30954664801e-08
cnj || ^29 || 1.27220870369e-08
code_Nat || carrier || 1.27202315231e-08
suc || ^20 || 1.27122971337e-08
suc || *1 || 1.24627114475e-08
nat_of_num || ComplexFuncUnit || 1.24369052808e-08
nat_of_num || RealFuncUnit || 1.2358801883e-08
code_n1042895779nteger || carrier || 1.22036793985e-08
code_int_of_integer || AutGroup || 1.21553928733e-08
code_int_of_integer || UAEndMonoid || 1.21553928733e-08
cnj || doms || 1.21427469609e-08
code_Suc || #quote##quote#0 || 1.20572318938e-08
pos || MFuncs || 1.18253699963e-08
suc || min || 1.17932250075e-08
inc || 1_ || 1.15194602419e-08
code_int_of_integer || UAAutGroup || 1.15018919628e-08
code_int_of_integer || InnAutGroup || 1.15018919628e-08
code_Suc || --0 || 1.14431120225e-08
suc || proj1 || 1.13895427175e-08
pos || GPerms || 1.06524329558e-08
bit0 || -Matrices_over || 1.06426351213e-08
bit1 || Concept-with-all-Attributes || 9.6021931637e-09
dup || bool || 9.27119292023e-09
pos || SymGroup || 9.22834748849e-09
code_Nat || Z#slash#Z* || 9.14675333496e-09
bit0 || CLatt || 9.14530993097e-09
splice || #slash##bslash#23 || 9.09135299245e-09
code_dup || bool || 8.89284011121e-09
bit1 || Bot || 8.73040386852e-09
nat_of_num || 1_. || 8.52052928731e-09
code_n1042895779nteger || Z#slash#Z* || 8.27359965021e-09
bit1 || id1 || 8.26371337213e-09
pos || C_Normed_Algebra_of_BoundedLinearOperators || 8.19390422551e-09
pos || Ring_of_BoundedLinearOperators0 || 8.19390422551e-09
pos || C_Algebra_of_BoundedLinearOperators || 8.19390422551e-09
code_int_of_integer || INT.Ring || 8.11858076064e-09
pos || CRing || 8.02016820696e-09
code_nat_of_natural || 1_ || 7.88219693954e-09
suc || #quote#20 || 7.67273408827e-09
nat_of_num || id11 || 6.93051114806e-09
suc || -50 || 6.5733401306e-09
bit1 || FuncUnit0 || 6.45864058757e-09
bit1 || FuncUnit || 6.42790694895e-09
pos || Formal-Series || 6.36169266793e-09
pos || CAlgebra || 6.10433467576e-09
pos || RAlgebra || 6.10255239147e-09
suc || #quote# || 6.03232427003e-09
inc || Lines || 5.76356031938e-09
inc || Inc || 5.76356031938e-09
append || #slash##bslash#23 || 5.63301254038e-09
nat2 || Open_Domains_of || 5.41296553429e-09
nat2 || Closed_Domains_of || 5.41296553429e-09
nat2 || Subgroups || 5.39870142149e-09
bit0 || LattPOSet || 5.30410409915e-09
nat2 || Domains_of || 5.28072456514e-09
pos || Ring_of_BoundedLinearOperators || 4.9106842018e-09
bit1 || ProjectiveLines || 4.82326097814e-09
bit1 || Proj_Inc || 4.82326097814e-09
pos || HomeoGroup || 4.80574827727e-09
gen_length || #slash##bslash#23 || 4.74478797555e-09
pos || RRing || 4.72959622589e-09
pos || R_Algebra_of_BoundedLinearOperators || 4.58134365086e-09
pos || R_Normed_Algebra_of_BoundedLinearOperators || 4.53289819753e-09
suc || carrier || 4.45874138238e-09
measure || +` || 4.3982115765e-09
bit1 || ComplexFuncUnit || 4.38623407704e-09
bit1 || RealFuncUnit || 4.37649747909e-09
measure || exp4 || 4.3522135408e-09
pos || *\13 || 4.25584394116e-09
nat2 || {..}1 || 4.1019603587e-09
bit1 || bool || 4.0841530385e-09
code_integer_of_int || Psingle_e_net || 4.05409649626e-09
inc || Top0 || 3.98266429271e-09
splice || #slash##bslash#8 || 3.96691010561e-09
measures || +` || 3.77185388017e-09
measures || exp4 || 3.73748357866e-09
inc || Bottom0 || 3.6749049738e-09
measure || +^1 || 3.5215177449e-09
hd || QuantNbr || 3.49808999855e-09
im || Im3 || 3.43089278588e-09
code_integer_of_int || MidOpGroupCat || 3.42237044385e-09
code_integer_of_int || AbGroupCat || 3.42237044385e-09
pos || carrier || 3.20494315868e-09
measures || +^1 || 3.1031547227e-09
bitM || carrier || 3.08014139866e-09
code_integer_of_int || the_Complex_Space || 2.99765290816e-09
neg || carrier || 2.97536111036e-09
code_Neg || carrier || 2.96303030873e-09
code_Pos || carrier || 2.9160185021e-09
code_natural_of_nat || 1_ || 2.72804637375e-09
code_integer_of_int || Psingle_f_net || 2.71205494596e-09
code_integer_of_int || Tsingle_e_net || 2.71205494596e-09
nat2 || *79 || 2.70035954576e-09
nat2 || ProjectivePoints || 2.68673916993e-09
append || #slash##bslash#8 || 2.61579564538e-09
plus_plus || -0 || 2.5853709495e-09
code_integer_of_int || vectgroup || 2.5845457289e-09
code_integer_of_int || OpenClosedSetLatt || 2.52587950464e-09
code_integer_of_int || *+^+<0> || 2.51067672111e-09
nat2 || MidOpGroupObjects || 2.37640870346e-09
nat2 || AbGroupObjects || 2.37640870346e-09
nat2 || setvect || 2.36128709611e-09
nat2 || Sub0 || 2.35590390922e-09
nat2 || C_3 || 2.34986488412e-09
code_integer_of_int || ProjectiveSpace || 2.33567977471e-09
re || First*NotUsed || 2.330678409e-09
code_integer_of_int || UnSubAlLattice || 2.28628637832e-09
code_integer_of_int || StoneLatt || 2.28175470063e-09
code_integer_of_int || k31_zmodul02 || 2.27438682593e-09
code_integer_of_int || LC_RLSpace || 2.27432923912e-09
re || UsedInt*Loc || 2.22102822288e-09
nat2 || k26_zmodul02 || 2.19718960358e-09
nat2 || LinComb || 2.19718863414e-09
bit0 || C_Normed_Algebra_of_BoundedLinearOperators || 2.1539388479e-09
bit0 || Ring_of_BoundedLinearOperators0 || 2.1539388479e-09
bit0 || C_Algebra_of_BoundedLinearOperators || 2.1539388479e-09
nat2 || OpenClosedSet || 2.13717148282e-09
code_integer_of_int || InclPoset || 2.13662378475e-09
bit0 || CRing || 2.12098707977e-09
nat2 || StoneS || 2.09703934725e-09
code_integer_of_int || the_Field_of_Quotients || 2.0523594598e-09
bit1 || 1_. || 1.95299746264e-09
code_integer_of_int || MPS || 1.95168930876e-09
bit0 || MFuncs || 1.86102368695e-09
bit0 || CAlgebra || 1.80845570027e-09
bit0 || RAlgebra || 1.80832369677e-09
code_Nat || id1 || 1.79676451417e-09
code_nat_of_natural || Sum || 1.72234408542e-09
nat2 || Quot. || 1.7153452648e-09
minus_minus || +14 || 1.70561260544e-09
code_n1042895779nteger || id1 || 1.68787453999e-09
code_num_of_integer || id1 || 1.63405137282e-09
minus_minus || #quote# || 1.62788979019e-09
bit0 || Ring_of_BoundedLinearOperators || 1.58056489502e-09
code_Suc || nextcard || 1.55045705309e-09
bit0 || RRing || 1.53965414678e-09
bit0 || R_Algebra_of_BoundedLinearOperators || 1.5097690987e-09
bit0 || R_Normed_Algebra_of_BoundedLinearOperators || 1.49908076272e-09
nat2 || AutGroup || 1.46748036458e-09
nat2 || UAEndMonoid || 1.46748036458e-09
code_Nat || -25 || 1.44502389841e-09
bit0 || *\13 || 1.42272938935e-09
bit1 || curry || 1.41961720186e-09
num_of_nat || 1_ || 1.41409179566e-09
nat2 || UAAutGroup || 1.39745591777e-09
nat2 || InnAutGroup || 1.39745591777e-09
nat2 || *0 || 1.35242990242e-09
code_n1042895779nteger || -25 || 1.33541427268e-09
nat2 || REAL0 || 1.26001039811e-09
bit0 || ~1 || 1.18267858967e-09
code_integer_of_int || TOP-REAL || 1.17413516697e-09
code_Suc || curry\ || 1.10493546534e-09
code_Suc || bool0 || 1.01866305168e-09
bit0 || FlatCoh || 9.60559870554e-10
re || card || 9.39633791473e-10
code_nat_of_integer || |....| || 9.17500248768e-10
code_natural_of_nat || alef || 8.39509095569e-10
code_natural_of_nat || UNIVERSE || 7.7001272647e-10
nat2 || limit- || 7.30052987446e-10
code_integer_of_int || 1* || 6.999339878e-10
code_Suc || Tarski-Class || 6.69588584813e-10
nat2 || sup5 || 6.57844835069e-10
code_nat_of_natural || the_rank_of0 || 6.41019914143e-10
code_nat_of_natural || proj1 || 6.23202342998e-10
code_integer_of_int || 1.REAL || 6.14269490459e-10
code_int_of_integer || doms || 6.05842287998e-10
code_natural_of_nat || Rank || 5.93730460244e-10
code_Nat || <:..:>1 || 5.41730453561e-10
code_nat_of_integer || 1_ || 5.25431486551e-10
code_natural_of_nat || id6 || 5.10781166848e-10
nat2 || carr1 || 5.05752248147e-10
code_Nat || IsomGroup || 4.94336074602e-10
code_n1042895779nteger || <:..:>1 || 4.92441575955e-10
code_natural_of_nat || card || 4.7203983393e-10
code_int_of_integer || RLMSpace || 4.65992290139e-10
code_integer_of_int || product4 || 4.41414333646e-10
code_integer_of_int || proj4_4 || 4.39287275411e-10
code_n1042895779nteger || IsomGroup || 4.28176620841e-10
code_integer_of_int || proj1 || 4.24864009143e-10
code_integer_of_int || 1TopSp || 4.24285056428e-10
code_nat_of_integer || topology || 4.17408939122e-10
code_nat_of_natural || proj4_4 || 4.15633175031e-10
code_natural_of_nat || product || 4.11824953033e-10
code_integer_of_int || GPerms || 3.80033830651e-10
code_integer_of_int || MFuncs || 3.76986903638e-10
code_nat_of_integer || 1. || 3.767438706e-10
code_integer || NatPlus_Lattice || 3.62087175549e-10
nat_of_num || topology || 3.51478395835e-10
code_integer_of_int || SymGroup || 3.33521868298e-10
num_of_nat || id6 || 2.74144773756e-10
bit0 || GPerms || 2.68204514969e-10
nat2 || id || 2.65409383646e-10
code_Neg || @11 || 2.65150933037e-10
nat2 || weight || 2.49649161093e-10
code_Pos || @11 || 2.49183175413e-10
bit1 || id11 || 2.47985268963e-10
code_nat_of_integer || card || 2.46012127481e-10
bit0 || SymGroup || 2.45366526957e-10
code_Nat || entrance || 2.34889337582e-10
code_Nat || escape || 2.34889337582e-10
code_num_of_integer || entrance || 2.1808858707e-10
code_num_of_integer || escape || 2.1808858707e-10
code_n1042895779nteger || entrance || 2.16157532533e-10
code_n1042895779nteger || escape || 2.16157532533e-10
bit0 || Formal-Series || 2.14213078326e-10
code_divmod_abs || lcm0 || 2.03420744806e-10
code_divmod_abs || gcd || 1.80003139323e-10
code_nat_of_integer || 0. || 1.63054536606e-10
bit0 || HomeoGroup || 1.59533011893e-10
code_nat_of_integer || First*NotUsed || 1.49554283055e-10
semiri2047295514divmod || #quote##slash##bslash##quote#0 || 1.38262020778e-10
semiri2047295514divmod || #quote##bslash##slash##quote#3 || 1.36464113802e-10
code_nat_of_integer || Leaves1 || 1.28394966391e-10
code_nat_of_integer || Collinearity || 1.04786142029e-10
code_nat_of_integer || 4_arg_relation || 8.72237718065e-11
code_integer_of_int || Tsingle_f_net || 8.51267774443e-11
code_integer_of_int || bubble-sort || 7.90090753434e-11
code_integer_of_int || insert-sort0 || 7.64597629921e-11
nat2 || Ball2 || 7.02663485406e-11
nat2 || q1. || 7.01418116008e-11
one2 || VERUM1 || 6.98614856841e-11
pos || Output0 || 6.82548262652e-11
pos || StoneSpace || 6.56055055528e-11
nat2 || q0. || 6.07769033985e-11
nat_of_num || weight || 5.84171594872e-11
nat2 || zerovect || 5.65330321045e-11
code_integer_of_int || root-tree0 || 5.52526978836e-11
code_nat_of_integer || carrier\ || 5.21596392387e-11
nat_of_num || StoneR || 5.10448200144e-11
nat_of_num || InnerVertices || 5.04854519699e-11
nat2 || ProjectiveCollinearity || 5.02136072766e-11
code_nat_of_integer || Lang1 || 3.72240259522e-11
nat2 || k19_zmodul02 || 3.59632827716e-11
nat2 || PR || 3.43236358973e-11
nat2 || ZeroLC || 3.2656489445e-11
bit1 || @8 || 3.24854087671e-11
nat2 || card || 3.15513727266e-11
code_integer_of_int || TotalGrammar || 3.09878565848e-11
cnj || FixedUltraFilters || 2.65800439055e-11
cnj || singletons || 2.65800439055e-11
bit1 || \not\9 || 2.46575232557e-11
bit0 || (#hash#)22 || 2.45170383229e-11
nat2 || rngs || 2.43333644771e-11
code_int_of_integer || SubFuncs || 2.23876578849e-11
cnj || SmallestPartition || 2.05822130551e-11
code_nat_of_integer || inf5 || 2.05680814325e-11
bit0 || \not\9 || 1.96943559722e-11
code_Nat || ..1 || 1.9338242129e-11
bit1 || (#hash#)22 || 1.88569279585e-11
nat2 || FuncUnit0 || 1.85964533513e-11
nat2 || 0.REAL || 1.85080401339e-11
nat2 || FuncUnit || 1.83979791551e-11
code_integer_of_int || <:..:>1 || 1.81716457764e-11
code_n1042895779nteger || ..1 || 1.77113333765e-11
nat2 || *1 || 1.76908703846e-11
cnj || ~2 || 1.76171012641e-11
cnj || Fin || 1.74646688367e-11
code_integer_of_int || |[..]|2 || 1.7382605272e-11
num_of_nat || product || 1.63327215441e-11
cnj || id1 || 1.57776760952e-11
bit0 || @8 || 1.51692299745e-11
nat2 || doms || 1.47357562158e-11
nat2 || 0* || 1.42847676789e-11
re || min0 || 1.41057687644e-11
code_integer_of_int || Formal-Series || 1.40918856732e-11
im || max0 || 1.40825217068e-11
cnj || proj4_4 || 1.3706644165e-11
cnj || proj1 || 1.32439018899e-11
nat2 || ComplexFuncUnit || 1.26001792365e-11
nat2 || RealFuncUnit || 1.25368038676e-11
nat2 || 1_. || 1.24068772265e-11
code_num_of_integer || carrier || 1.16890079793e-11
nat2 || id11 || 1.10372316617e-11
code_integer_of_int || HomeoGroup || 1.09934371194e-11
code_integer_of_int || C_Normed_Algebra_of_BoundedLinearOperators || 1.03583180792e-11
code_integer_of_int || Ring_of_BoundedLinearOperators0 || 1.03583180792e-11
code_integer_of_int || C_Algebra_of_BoundedLinearOperators || 1.03583180792e-11
code_integer_of_int || CRing || 1.02012081969e-11
code_integer_of_int || <*..*>4 || 9.94635493528e-12
code_integer_of_int || -Matrices_over || 9.88614803601e-12
nat2 || inf7 || 9.4617473955e-12
code_integer_of_int || TopUnitSpace || 9.45552385551e-12
code_integer_of_int || CAlgebra || 7.97853920679e-12
code_integer_of_int || RAlgebra || 7.97724047611e-12
nat2 || base- || 7.15635781018e-12
code_Nat || proj4_4 || 6.90675041116e-12
nat2 || Family_open_set0 || 6.62339396026e-12
code_n1042895779nteger || proj4_4 || 6.57559802045e-12
nat2 || idseq || 6.54442109708e-12
code_integer_of_int || Ring_of_BoundedLinearOperators || 6.51603083101e-12
code_integer_of_int || TopSpaceMetr || 6.37093140833e-12
code_integer_of_int || RRing || 6.32127000004e-12
code_integer_of_int || R_Algebra_of_BoundedLinearOperators || 6.11225535391e-12
code_integer_of_int || R_Normed_Algebra_of_BoundedLinearOperators || 6.05251553782e-12
nat2 || Family_open_set || 5.94317110135e-12
code_integer_of_int || *\13 || 5.80951031754e-12
map_le || c=8 || 5.62776100712e-12
is_none || are_equipotent || 4.71087086118e-12
map_add || #bslash##slash#8 || 4.30452362992e-12
complex2 || ]....]0 || 3.12888239967e-12
complex2 || [....[0 || 3.12702360044e-12
complex2 || [....]5 || 3.10384971717e-12
complex2 || ]....[1 || 3.09706618677e-12
code_num_of_integer || proj4_4 || 7.44096207177e-13
some || [:..:] || 6.72242301626e-13
id2 || StoneH1 || 6.53219514852e-13
divmod_nat || lim10 || 5.62674708366e-13
none || Subspaces || 5.19530361819e-13
none || Submodules || 5.19530361819e-13
none || Subspaces2 || 5.19530361819e-13
divmod_nat_rel || is_convergent_in_metrspace_to || 4.55614959225e-13
top_top || Open_setLatt || 3.81293007697e-13
set_of_seq || the_argument_of || 3.80084172664e-13
none || Subgroups || 3.70367297849e-13
none || bool3 || 3.61398859082e-13
set || HTopSpace || 3.52028395079e-13
none || east_halfline || 3.42215084378e-13
none || west_halfline || 3.42215084378e-13
cnj || varcl || 3.38246078618e-13
none || the_Tree_of || 3.37427070283e-13
none || Big_Omega || 3.37427070283e-13
none || Subtrees || 3.33170945223e-13
none || the_right_side_of || 3.25887518394e-13
none || nextcard || 3.22729464208e-13
none || south_halfline || 3.22729464208e-13
none || Big_Theta || 3.22729464208e-13
none || north_halfline || 3.22729464208e-13
re || field || 3.18403516944e-13
refl_on || preserves_implication || 3.13089472609e-13
refl_on || preserves_top || 3.13089472609e-13
refl_on || preserves_bottom || 3.13089472609e-13
pos || euc2cpx || 2.97250643533e-13
none || Tarski-Class || 2.91677762206e-13
none || Big_Oh || 2.81126770554e-13
none || succ1 || 2.76985363064e-13
code_nat_of_integer || arity0 || 2.71004521377e-13
set_of_pred || \not\5 || 2.50595008948e-13
complex || Vars || 2.49289147458e-13
code_nat_of_integer || ^20 || 2.25630583859e-13
nat_of_num || |....| || 2.10806925681e-13
code_integer_of_int || min || 1.71805999891e-13
nat2 || arity || 1.22936737522e-13
code_nat_of_integer || Sgm || 1.15206354278e-13
insert2 || Ex || 1.10700255274e-13
insert2 || =>1 || 1.01230790021e-13
product_snd || k9_msafree5 || 8.24649929165e-14
product_fst || k8_msafree5 || 8.13841348021e-14
insert3 || All || 7.71138217197e-14
code_integer_of_int || Seg || 6.8448215797e-14
insert3 || \&\0 || 6.64354379476e-14
product_Pair || k7_msafree5 || 4.31905579844e-14
real_Vector_of_real || rng || 4.22390264585e-14
semiring_char_0_fact || rng || 4.21080227073e-14
ring_1_of_int || rng || 3.99044023018e-14
semiring_1_of_nat || rng || 3.67548879321e-14
numeral_numeral || rng || 3.42792411382e-14
is_none || c= || 3.4184280973e-14
re || the_rank_of0 || 1.60751208959e-14
right || NAT || 1.59727616697e-14
rec_sumbool || -\3 || 7.37284806334e-15
case_sumbool || -\3 || 6.37325321718e-15
rec_sumbool || -. || 6.02438880802e-15
rec_sumbool || +. || 6.02438880802e-15
case_sumbool || -. || 5.29149126556e-15
rec_sumbool || +61 || 5.29149126556e-15
case_sumbool || +. || 5.29149126556e-15
image2 || k11_cat_6 || 4.9081564737e-15
case_sumbool || +61 || 4.69613212819e-15
finite_finite2 || Free1 || 4.69037891213e-15
finite_finite2 || Fixed || 4.69037891213e-15
map || k10_cat_6 || 3.67467882999e-15
fun_in_rel || the_stable_subgroup_of || 3.5466771896e-15
bNF_Gr || *131 || 3.44306477278e-15
rec_sumbool || crossover0 || 2.64994268681e-15
none || the_transitive-closure_of || 2.62255913497e-15
none || [*] || 2.56866200114e-15
none || CnPos || 2.48334799346e-15
case_sumbool || crossover0 || 2.4732938283e-15
none || k5_ltlaxio3 || 2.44860275902e-15
bNF_Grp || #quote##bslash##slash##quote#12 || 2.41509527686e-15
none || CnIPC || 2.34194650018e-15
none || CnCPC || 2.32090606958e-15
none || Subtrees0 || 2.32090606958e-15
none || Inv0 || 2.30148197318e-15
rec_sumbool || Following0 || 2.25989798677e-15
none || CnS4 || 2.25097512063e-15
none || sup4 || 2.23624095689e-15
none || Mycielskian1 || 2.18512431157e-15
code_nat_of_integer || permutations || 2.13962919373e-15
case_sumbool || Following0 || 2.12908737312e-15
none || Rank || 2.07828750112e-15
map_option || k10_cat_6 || 1.80487288828e-15
code_nat_of_integer || SymGroup || 1.78759335267e-15
set2 || k8_cat_6 || 1.51317633788e-15
set2 || k7_cat_6 || 1.51317633788e-15
induct_conj || #bslash##slash#0 || 1.38320378197e-15
nat2 || -Matrices_over || 1.08982902492e-15
set_option || k8_cat_6 || 8.64514086047e-16
set_option || k7_cat_6 || 8.64514086047e-16
principal || k9_cat_6 || 8.56115109006e-16
nat2 || Col || 8.27721275788e-16
filtermap || k10_cat_6 || 8.10409583399e-16
fun_is_measure || are_equipotent || 6.34181397275e-16
insert3 || Ex || 5.84551040136e-16
reflp || quasi_orders || 3.07157364116e-16
equiv_equivp || well_orders || 3.06067565824e-16
left || NAT || 3.03090108039e-16
symp || partially_orders || 2.75713826072e-16
induct_implies || ++1 || 2.52992029099e-16
transp || linearly_orders || 2.51204986888e-16
induct_implies || --1 || 2.36001792283e-16
induct_implies || **3 || 2.23321464363e-16
induct_implies || #slash##slash##slash# || 2.18077204175e-16
comm_monoid || r13_absred_0 || 2.12105301114e-16
comm_monoid || r12_absred_0 || 2.11786080728e-16
rec_sumbool || k12_simplex0 || 2.10104753753e-16
induct_implies || #slash##slash##slash#0 || 2.05334834622e-16
induct_implies || **4 || 2.05334834622e-16
nil || [#hash#] || 1.99961764461e-16
induct_implies || --2 || 1.95668363409e-16
induct_implies || pi0 || 1.92927459674e-16
induct_implies || ++0 || 1.85776436434e-16
comm_monoid || r7_absred_0 || 1.81709093228e-16
case_sumbool || k12_simplex0 || 1.80931011246e-16
product_snd || nat_hom1 || 1.67419213913e-16
induct_implies || #quote#10 || 1.62874685836e-16
product_fst || .#slash#.3 || 1.49913651234e-16
induct_implies || *2 || 1.4938339212e-16
product_Pair || Ker0 || 1.30445234724e-16
induct_implies || .:0 || 1.27696557024e-16
induct_implies || |1 || 1.25994488081e-16
induct_implies || [:..:] || 1.1440610658e-16
induct_implies || #slash##bslash#0 || 1.12830086086e-16
comm_monoid || r11_absred_0 || 1.11870372377e-16
right || 0_NN VertexSelector 1 || 1.10956591971e-16
rec_sumbool || to_power2 || 9.42790717873e-17
nil || Top || 9.11634290721e-17
case_sumbool || to_power2 || 8.71901382719e-17
comm_monoid || r3_absred_0 || 7.60758198037e-17
code_Pos || Subformulae0 || 7.41019092493e-17
groups387199878d_list || r5_absred_0 || 7.32321712599e-17
groups387199878d_list || r1_absred_0 || 7.18734011858e-17
semilattice_neutr || r5_absred_0 || 5.84763077836e-17
semilattice_neutr || r1_absred_0 || 5.83361483556e-17
groups387199878d_list || r6_absred_0 || 5.7159850436e-17
comm_monoid || r10_absred_0 || 5.11318862364e-17
groups_monoid_list || r12_absred_0 || 4.87003091378e-17
groups_monoid_list || r13_absred_0 || 4.85531978513e-17
groups828474808id_set || r11_absred_0 || 4.69222915658e-17
semilattice_neutr || r6_absred_0 || 4.65725169078e-17
groups387199878d_list || r2_absred_0 || 4.5932016614e-17
groups387199878d_list || r3_absred_0 || 4.50558974861e-17
groups828474808id_set || r10_absred_0 || 4.38253440863e-17
numeral_numeral || root-tree || 4.23017291742e-17
code_integer || HP-WFF || 4.0270782151e-17
groups_monoid_list || r7_absred_0 || 4.00076753539e-17
induct_conj || #slash##bslash#0 || 3.97064812603e-17
semilattice_neutr || r2_absred_0 || 3.78822895113e-17
comm_monoid_axioms || r10_absred_0 || 3.78667735783e-17
bit1 || prop || 3.77044791925e-17
one2 || VERUM2 || 3.62274988921e-17
comm_monoid_axioms || r11_absred_0 || 3.55281288301e-17
semilattice_neutr || r3_absred_0 || 3.30285181637e-17
groups828474808id_set || r5_absred_0 || 3.0779722285e-17
groups387199878d_list || r10_absred_0 || 3.02478320513e-17
groups387199878d_list || r11_absred_0 || 2.98689233038e-17
groups828474808id_set || r1_absred_0 || 2.94459724579e-17
groups_monoid_list || r11_absred_0 || 2.82680250419e-17
bit0 || prop || 2.79812899535e-17
groups828474808id_set || r6_absred_0 || 2.79013973646e-17
induct_conj || .. || 2.73226606077e-17
comm_monoid || r4_absred_0 || 2.72727333446e-17
groups828474808id_set || r3_absred_0 || 2.69825390058e-17
groups387199878d_list || r4_absred_0 || 2.58638180528e-17
groups1716206716st_set || r1_absred_0 || 2.50440064324e-17
comm_monoid_axioms || r7_absred_0 || 2.47662687974e-17
list_ex1 || is-lower-neighbour-of || 2.47220230002e-17
semilattice_neutr || r10_absred_0 || 2.41506190348e-17
groups828474808id_set || r7_absred_0 || 2.39662986396e-17
nil || {}0 || 2.3938147065e-17
groups387199878d_list || r13_absred_0 || 2.27314302646e-17
groups828474808id_set || r2_absred_0 || 2.26272240944e-17
semilattice_neutr || r11_absred_0 || 2.24422650676e-17
equiv_equivp || partially_orders || 2.17468139133e-17
induct_conj || #bslash#0 || 2.14042780085e-17
induct_conj || #bslash#3 || 2.06214033568e-17
induct_conj || ** || 2.00635037384e-17
lattic1543629303tr_set || r12_absred_0 || 2.00028392295e-17
lattic1543629303tr_set || r13_absred_0 || 1.98513312346e-17
semilattice_neutr || r4_absred_0 || 1.98140474292e-17
list_ex || is-lower-neighbour-of || 1.86271624342e-17
groups828474808id_set || r13_absred_0 || 1.75572431954e-17
groups_monoid_list || r3_absred_0 || 1.75380407758e-17
groups1716206716st_set || r4_absred_0 || 1.73708274515e-17
induct_conj || <:..:>2 || 1.64374230468e-17
rotate1 || LAp || 1.5734384069e-17
rotate1 || UAp || 1.55516068017e-17
remdups || LAp || 1.52470779023e-17
remdups || UAp || 1.50748946123e-17
groups387199878d_list || r8_absred_0 || 1.5058195005e-17
groups_monoid_list || r10_absred_0 || 1.47933509235e-17
groups387199878d_list || r12_absred_0 || 1.41510628073e-17
butlast || LAp || 1.39687362513e-17
remdups_adj || LAp || 1.3876908904e-17
butlast || UAp || 1.38241073902e-17
semilattice_neutr || r13_absred_0 || 1.37722102319e-17
groups1716206716st_set || r3_absred_0 || 1.37408298686e-17
remdups_adj || UAp || 1.37341504304e-17
groups828474808id_set || r4_absred_0 || 1.36512307202e-17
monoid || r5_absred_0 || 1.36184857727e-17
monoid || r1_absred_0 || 1.35730887476e-17
rotate1 || Int || 1.34957288911e-17
lattic1543629303tr_set || r7_absred_0 || 1.33454959542e-17
comm_monoid || r8_absred_0 || 1.32758337723e-17
partial_flat_lub || Nat_Hom || 1.32723931737e-17
tl || LAp || 1.29998892289e-17
tl || UAp || 1.28744141849e-17
pred_list || [=1 || 1.27278157449e-17
listsp || [=1 || 1.26226309872e-17
groups1716206716st_set || r5_absred_0 || 1.23458222483e-17
butlast || Int || 1.23017780442e-17
comm_monoid || r1_absred_0 || 1.22841352846e-17
remdups_adj || Int || 1.22380050341e-17
remdups || Int || 1.21773525246e-17
groups828474808id_set || r12_absred_0 || 1.21706430253e-17
rev || LAp || 1.21608407504e-17
rev || UAp || 1.20509038151e-17
monoid || r10_absred_0 || 1.20462381196e-17
semilattice_neutr || r8_absred_0 || 1.18156300667e-17
tl || Int || 1.16200931118e-17
rotate1 || Cl || 1.12386681426e-17
monoid || r11_absred_0 || 1.11197022879e-17
groups1716206716st_set || r2_absred_0 || 1.10456144323e-17
rev || Int || 1.10134244266e-17
lattic1543629303tr_set || r3_absred_0 || 1.07710293731e-17
monoid || r6_absred_0 || 1.07032346939e-17
lattic1543629303tr_set || r11_absred_0 || 1.05351587493e-17
induct_conj || +*0 || 1.03927404847e-17
butlast || Cl || 1.03049813794e-17
remdups_adj || Cl || 1.02547997482e-17
remdups || Cl || 1.02070441803e-17
tl || Cl || 9.76693256269e-18
partial_flat_ord || QuotUnivAlg || 9.68312466803e-18
gen_length || *\3 || 9.51421815129e-18
groups828474808id_set || r8_absred_0 || 9.49111268383e-18
rev || Cl || 9.2850207025e-18
monoid || r2_absred_0 || 8.6570367015e-18
monoid || r3_absred_0 || 8.6275966146e-18
splice || *\3 || 8.13910156363e-18
sublist || #quote##bslash##slash##quote#2 || 8.07793599832e-18
lattic1543629303tr_set || r4_absred_0 || 8.02064959091e-18
groups1716206716st_set || r6_absred_0 || 7.7057216682e-18
groups_monoid_list || r4_absred_0 || 7.70126953171e-18
append || *\3 || 7.6599255759e-18
comm_monoid || r5_absred_0 || 7.53260597031e-18
removeAll || +26 || 7.15444151988e-18
semilattice_neutr || r12_absred_0 || 7.05329506928e-18
splice || #quote##slash##bslash##quote# || 6.86235953268e-18
groups1716206716st_set || r13_absred_0 || 6.43199680758e-18
append || #quote##slash##bslash##quote# || 6.30907595093e-18
groups1716206716st_set || r12_absred_0 || 6.20258615174e-18
fun_is_measure || in || 6.0584522026e-18
pred_list || is_coarser_than0 || 5.89467010668e-18
listsp || is_coarser_than0 || 5.80972852009e-18
groups_monoid_list || r8_absred_0 || 5.6576038599e-18
filter2 || +26 || 5.62324166195e-18
lattic1543629303tr_set || r10_absred_0 || 5.61491571831e-18
comm_monoid || r6_absred_0 || 5.60162691803e-18
monoid_axioms || r13_absred_0 || 5.54343354889e-18
monoid_axioms || r12_absred_0 || 5.54343354889e-18
lattic1543629303tr_set || r1_absred_0 || 5.4768542707e-18
monoid_axioms || r7_absred_0 || 5.46981479219e-18
dropWhile || +26 || 5.37339541348e-18
remove1 || +26 || 5.34475257235e-18
partia17684980itions || is_epimorphism0 || 5.26516132766e-18
takeWhile || +26 || 5.19742340769e-18
monoid || r4_absred_0 || 4.98708006525e-18
drop || +26 || 4.90409066196e-18
take || +26 || 4.77329513426e-18
monoid || r7_absred_0 || 4.68418050359e-18
partia17684980itions || is_homomorphism0 || 4.65246731949e-18
comm_monoid || r2_absred_0 || 4.26701335279e-18
induct_implies || -tuples_on || 3.68426963174e-18
monoid || r13_absred_0 || 3.57545309937e-18
comm_monoid_axioms || r13_absred_0 || 3.55088171353e-18
comm_monoid_axioms || r12_absred_0 || 3.55088171353e-18
lattic1543629303tr_set || r8_absred_0 || 3.34985626522e-18
monoid_axioms || r11_absred_0 || 3.34334364785e-18
groups387199878d_list || r7_absred_0 || 3.07292980392e-18
comm_monoid_axioms || r3_absred_0 || 3.05492526732e-18
lattic1543629303tr_set || r2_absred_0 || 3.00576450125e-18
monoid || r8_absred_0 || 2.73871368915e-18
induct_implies || #bslash##slash#0 || 2.63240739988e-18
sublist || +10 || 2.51104957031e-18
groups1716206716st_set || r10_absred_0 || 2.50561329221e-18
semilattice_neutr || r7_absred_0 || 2.37349007126e-18
lattic1543629303tr_set || r5_absred_0 || 2.19639498898e-18
rotate1 || Der || 2.18028917211e-18
groups1716206716st_set || r11_absred_0 || 2.12405688098e-18
monoid || r12_absred_0 || 2.0878642537e-18
butlast || Der || 1.90553159209e-18
monoid_axioms || r3_absred_0 || 1.89655221159e-18
monoid_axioms || r10_absred_0 || 1.89390464653e-18
remdups_adj || Der || 1.89145788338e-18
remdups || Der || 1.87812785616e-18
groups_monoid_list || r1_absred_0 || 1.83314878737e-18
nil || Bottom0 || 1.76978673534e-18
tl || Der || 1.7581268409e-18
groups1716206716st_set || r8_absred_0 || 1.71851789704e-18
rev || Der || 1.63240744737e-18
equiv_part_equivp || quasi_orders || 1.62540209412e-18
set || ~0 || 1.40893780655e-18
lattic1543629303tr_set || r6_absred_0 || 1.32483519908e-18
monoid_axioms || r8_absred_0 || 8.95781255578e-19
groups_monoid_list || r5_absred_0 || 8.74074334827e-19
removeAll || delta5 || 8.67090691287e-19
groups_monoid_list || r2_absred_0 || 8.43159062688e-19
monoid_axioms || r4_absred_0 || 8.35624606861e-19
comm_monoid_axioms || r4_absred_0 || 7.57334404391e-19
bot_bot || Top0 || 6.88407892839e-19
filter2 || delta5 || 6.29267433146e-19
product_curry || Tau || 6.26419093958e-19
groups_monoid_list || r6_absred_0 || 6.24986422324e-19
set_of_seq || ~7 || 6.24743947631e-19
coset || ~7 || 5.99423857373e-19
removeAll || #quote##bslash##slash##quote#2 || 5.67304799872e-19
bot_bot || Bottom0 || 5.54149914537e-19
list_ex1 || misses2 || 5.33611099577e-19
comm_monoid_axioms || r8_absred_0 || 4.97547249357e-19
rep_filter || <- || 4.62452378291e-19
bNF_Ca646678531ard_of || ~6 || 4.59345688645e-19
filter2 || #quote##bslash##slash##quote#2 || 4.55126294187e-19
empty || Bottom0 || 4.15966139148e-19
set_option || ~7 || 4.11807051622e-19
list_ex || misses2 || 4.02749307377e-19
is_filter || is_one-to-one_at || 3.97771829443e-19
set2 || ~7 || 3.78711773053e-19
nil || Top0 || 3.42385238781e-19
empty || Top0 || 2.98365755204e-19
product_case_prod || SIGMA || 2.83581515726e-19
pow2 || ~7 || 2.74570781423e-19
pred_of_seq || ~7 || 2.5496820114e-19
bNF_Cardinal_czero || Top0 || 2.52087246685e-19
bNF_Cardinal_czero || Bottom0 || 2.44592991824e-19
sublist || #bslash#11 || 2.20583243996e-19
gen_length || #bslash#11 || 1.89599303315e-19
finite_finite2 || \not\3 || 1.89270806358e-19
top_top || Top0 || 1.84590924051e-19
abs_filter || . || 1.6609881801e-19
splice || #bslash#11 || 1.64156836564e-19
pred || ~0 || 1.57947190156e-19
none || Top0 || 1.51200050552e-19
removeAll || #quote##slash##bslash##quote#1 || 1.50629876597e-19
antisym || is_one-to-one_at || 1.46865144913e-19
append || #bslash#11 || 1.46820649596e-19
none || Bottom0 || 1.38716422755e-19
filter2 || #quote##slash##bslash##quote#1 || 1.19290229176e-19
transitive_acyclic || just_once_values || 1.19182199469e-19
transitive_rtrancl || <- || 1.17657727507e-19
dropWhile || #quote##slash##bslash##quote#1 || 1.12791689676e-19
remove1 || #quote##slash##bslash##quote#1 || 1.12213980107e-19
finite1921348288axioms || is_additive_in || 1.1108781766e-19
takeWhile || #quote##slash##bslash##quote#1 || 1.09238710083e-19
top_top || Bottom0 || 1.08804454222e-19
drop || #quote##slash##bslash##quote#1 || 1.03296193754e-19
take || #quote##slash##bslash##quote#1 || 1.0063832775e-19
nil || Top\ || 9.68558777158e-20
image2 || k10_cat_6 || 9.23867053234e-20
finite_folding_idem || is_semi_additive_in || 9.21453693476e-20
contained || << || 7.57524776021e-20
finite_folding || has_property_of_zero_in || 7.29463593312e-20
filtermap || k11_cat_6 || 5.89241281839e-20
contained || >= || 5.28003064958e-20
pred_list || >= || 5.19378950783e-20
listsp || >= || 5.15235256685e-20
map || k11_cat_6 || 4.4861100405e-20
set2 || k9_cat_6 || 4.39818691917e-20
set_option || k9_cat_6 || 2.96741855344e-20
principal || k8_cat_6 || 2.4413634417e-20
principal || k7_cat_6 || 2.4413634417e-20
map_option || k11_cat_6 || 2.35948265305e-20
pred_option || >= || 1.23396900993e-20
pred_of_set || \not\5 || 1.01877358238e-20
predicate_contains || is_proper_subformula_of1 || 9.43626435608e-21
product_curry || SIGMA || 7.54174159756e-21
eval || is_subformula_of || 6.71888854462e-21
product_case_prod || Tau || 5.3356455006e-21
dropWhile || #quote##bslash##slash##quote#2 || 5.24513448637e-21
remove1 || #quote##bslash##slash##quote#2 || 5.2194220401e-21
set || .:7 || 5.12724432683e-21
takeWhile || #quote##bslash##slash##quote#2 || 5.086822746e-21
drop || #quote##bslash##slash##quote#2 || 4.82108701459e-21
take || #quote##bslash##slash##quote#2 || 4.70184432797e-21
nil || k8_lattad_1 || 4.05322382669e-21
code_integer_of_int || -52 || 3.79963169087e-21
coset || .:15 || 3.58094342071e-21
coset || .:14 || 2.92865353835e-21
code_natural_of_nat || -36 || 2.52688507822e-21
nil || (0).3 || 1.99842516956e-21
nil || (0).4 || 1.74778552603e-21
set2 || .:15 || 1.61338487598e-21
set2 || .:14 || 1.47950973519e-21
re || `1 || 1.4602978504e-21
im || `2 || 1.45907267659e-21
uminus_uminus || (....>1 || 1.40624082875e-21
uminus_uminus || (....> || 1.40039057525e-21
pow2 || .:14 || 1.3648952581e-21
uminus_uminus || <....) || 1.36257173908e-21
nat2 || inf0 || 1.35700394835e-21
nat2 || sup || 1.33830014963e-21
uminus_uminus || <....)0 || 1.33300250609e-21
coset || (....> || 1.29482050071e-21
coset || (....>1 || 1.21997030532e-21
complex2 || |[..]| || 1.21057381817e-21
num_of_nat || -36 || 1.20113722877e-21
coset || <....)0 || 1.16972464661e-21
coset || <....) || 1.1462651735e-21
nat || <e1> || 9.93338043556e-22
splice || #quote##bslash##slash##quote#3 || 9.27663238457e-22
less_than || <e3> || 8.85998801587e-22
code_Nat || inf0 || 8.55840556994e-22
trans || are_orthogonal || 8.45841577592e-22
code_Nat || sup || 8.35590165365e-22
set2 || (....>1 || 8.30559465404e-22
set2 || (....> || 8.08923293251e-22
set2 || <....) || 8.02985916364e-22
finite_finite2 || `5 || 7.95956377072e-22
code_n1042895779nteger || inf0 || 7.80960898505e-22
set2 || <....)0 || 7.6686454902e-22
code_n1042895779nteger || sup || 7.64110012762e-22
bNF_Ca1495478003natLeq || <e3> || 6.92011467496e-22
code_num_of_integer || inf0 || 6.72381762636e-22
wf || are_orthogonal || 6.70621053729e-22
code_num_of_integer || sup || 6.57602926944e-22
finite852775215axioms || is_additive_in || 6.54635364967e-22
append || #quote##bslash##slash##quote#3 || 5.8173485983e-22
splice || +29 || 5.6877435475e-22
splice || +106 || 5.49103057655e-22
semilattice || is_strongly_quasiconvex_on || 4.40833979684e-22
gen_length || #quote##bslash##slash##quote#3 || 4.35693812029e-22
pred_nat || <e2> || 4.09754163002e-22
nat || <e2> || 4.07954036689e-22
pred_nat || <e3> || 3.95009786787e-22
finite_comp_fun_idem || is_semi_additive_in || 3.9414945573e-22
append || +29 || 3.76964100984e-22
less_than || <e2> || 3.66378592001e-22
removeAll || #quote##slash##bslash##quote#0 || 3.57131507498e-22
antisym || are_orthogonal || 3.55569273519e-22
finite100568337ommute || has_property_of_zero_in || 3.54791561589e-22
append || +106 || 3.52479373768e-22
sublist || #slash##bslash#9 || 3.41313935496e-22
bNF_Ca1495478003natLeq || <e2> || 3.34118347559e-22
dropWhile || #quote##slash##bslash##quote#0 || 3.28239544988e-22
remove1 || #quote##slash##bslash##quote#0 || 3.26426786467e-22
nil || 1_Rmatrix || 3.18195867983e-22
takeWhile || #quote##slash##bslash##quote#0 || 3.17113485818e-22
bNF_Ca829732799finite || are_orthogonal || 3.14036473232e-22
sublist || #slash##bslash#23 || 3.03119487839e-22
drop || #quote##slash##bslash##quote#0 || 2.9862509634e-22
transitive_trancl || <X> || 2.98552985067e-22
take || #quote##slash##bslash##quote#0 || 2.90404549805e-22
filter2 || #quote##slash##bslash##quote#0 || 2.83954238387e-22
gen_length || +29 || 2.66580315035e-22
gen_length || +106 || 2.57141681546e-22
is_empty2 || \xor\ || 2.50164574502e-22
pred_list || is_dependent_of || 2.32944526307e-22
listsp || is_dependent_of || 2.27108938648e-22
removeAll || #slash##bslash#9 || 2.19741819895e-22
set2 || =>2 || 2.17178768788e-22
nil || %O || 2.11692488033e-22
set || \not\2 || 2.01955145343e-22
dropWhile || #slash##bslash#9 || 1.98448685446e-22
remove1 || #slash##bslash#9 || 1.97136138097e-22
removeAll || #slash##bslash#23 || 1.95017562012e-22
takeWhile || #slash##bslash#9 || 1.90435984194e-22
groups_monoid_list || is_additive_in || 1.82428243794e-22
drop || #slash##bslash#9 || 1.77347873478e-22
dropWhile || #slash##bslash#23 || 1.75936954346e-22
remove1 || #slash##bslash#23 || 1.74761999048e-22
take || #slash##bslash#9 || 1.71618361808e-22
groups387199878d_list || is_semi_additive_in || 1.71498592568e-22
takeWhile || #slash##bslash#23 || 1.68766436731e-22
filter2 || #slash##bslash#9 || 1.67160972451e-22
produc2004651681e_prod || is_a_complement\_of || 1.64664459098e-22
nil || SmallestPartition || 1.62015156149e-22
semilattice_axioms || is_strictly_quasiconvex_on || 1.60197399687e-22
drop || #slash##bslash#23 || 1.57065544686e-22
take || #slash##bslash#23 || 1.51947890888e-22
semilattice_axioms || is_quasiconvex_on || 1.49516921993e-22
filter2 || #slash##bslash#23 || 1.47968459178e-22
null || \#bslash#\ || 1.45403503484e-22
comm_monoid || has_property_of_zero_in || 1.44014896074e-22
finite_folding_idem || r1_absred_0 || 1.37393327811e-22
splice || *53 || 1.3564687588e-22
set2 || \&\2 || 1.30667794524e-22
insert2 || @lim_sup || 1.30045341941e-22
coset || <=>0 || 1.22351249774e-22
finite_folding_idem || r5_absred_0 || 1.15183438245e-22
set_of_pred || Complement0 || 1.10106467864e-22
less_than || <e1> || 1.01657352084e-22
coset || =>2 || 1.01578496947e-22
rotate1 || Inv || 9.85194282757e-23
abel_semigroup || is_strictly_quasiconvex_on || 8.7272391521e-23
finite1921348288axioms || r13_absred_0 || 8.45113192148e-23
finite1921348288axioms || r12_absred_0 || 8.45113192148e-23
abel_semigroup || is_quasiconvex_on || 8.36188896024e-23
lattic35693393ce_set || is_strictly_quasiconvex_on || 7.99695143202e-23
null || \nand\ || 7.98653155813e-23
append || *53 || 7.96604875627e-23
lattic35693393ce_set || is_quasiconvex_on || 7.65167092512e-23
insert3 || @lim_inf || 7.55914787226e-23
butlast || Inv || 7.53670440513e-23
set_of_seq || ` || 7.46189885459e-23
remdups_adj || Inv || 7.43024972445e-23
uminus_uminus || \xor\ || 7.35160795531e-23
remdups || Inv || 7.33047401216e-23
pred_nat || <e1> || 7.27213168578e-23
pow2 || <=>0 || 6.87630043104e-23
uminus_uminus || \or\3 || 6.7988113667e-23
tl || Inv || 6.47741238564e-23
gen_length || *53 || 6.26731683341e-23
finite_folding_idem || r6_absred_0 || 6.26139137537e-23
set2 || \nor\ || 6.17007292997e-23
complete_Sup_Sup || \xor\ || 5.75988516905e-23
set2 || <=>0 || 5.74005639535e-23
coset || \&\2 || 5.69733495909e-23
rev || Inv || 5.66708211443e-23
finite_folding || r13_absred_0 || 5.5344432132e-23
finite_folding || r12_absred_0 || 5.5344432132e-23
null || =>2 || 5.49609221904e-23
finite_folding_idem || r2_absred_0 || 5.46699416699e-23
groups1716206716st_set || is_semi_additive_in || 5.42803137873e-23
lattic35693393ce_set || is_strictly_convex_on || 5.13488479076e-23
groups387199878d_list || has_property_of_zero_in || 5.10282685678e-23
uminus_uminus || \&\2 || 4.96677402547e-23
semilattice || is_convex_on || 4.6494575814e-23
finite1921348288axioms || r7_absred_0 || 4.39085372185e-23
sublist || \#bslash##slash#\ || 4.343080276e-23
rotate1 || <=>0 || 4.20360159718e-23
coset || \nor\ || 4.15467336679e-23
cons || #quote##bslash##slash##quote#5 || 4.00407601927e-23
finite1921348288axioms || r11_absred_0 || 3.93025941237e-23
groups828474808id_set || is_additive_in || 3.77713681771e-23
product_case_prod || is_a_complement_of1 || 3.61561216373e-23
remdups_adj || <=>0 || 3.51648588843e-23
transitive_rtranclp || <=3 || 3.4260803071e-23
nat || <e3> || 3.15186748737e-23
rev || <=>0 || 3.05127272645e-23
finite_folding || r7_absred_0 || 3.04046951624e-23
is_none || <= || 2.96538910353e-23
transitive_tranclp || <2 || 2.96056128628e-23
splice || \#bslash##slash#\ || 2.93959299789e-23
remdups || <=>0 || 2.85480066997e-23
is_empty2 || \&\2 || 2.83478930044e-23
set2 || sup1 || 2.8282426567e-23
splice || \#slash##bslash#\ || 2.70897908891e-23
finite_folding || r11_absred_0 || 2.67130781915e-23
set2 || \nand\ || 2.65074120293e-23
member3 || is_>=_than0 || 2.59528293703e-23
finite_folding_idem || r3_absred_0 || 2.57146274134e-23
finite1921348288axioms || r3_absred_0 || 2.44044314746e-23
sublist || \#slash##bslash#\ || 2.42228509033e-23
coset || .:19 || 2.36703317358e-23
set2 || \xor\ || 2.34493051296e-23
remdups_adj || \&\2 || 2.33087513356e-23
finite_folding_idem || r4_absred_0 || 2.09735740041e-23
produc2004651681e_prod || *32 || 1.95216953915e-23
append || \#slash##bslash#\ || 1.94062308781e-23
finite_comp_fun_idem || is_the_direct_sum_of3 || 1.93064176562e-23
finite_folding || r3_absred_0 || 1.91944864418e-23
append || \#bslash##slash#\ || 1.88813595533e-23
rotate1 || \xor\ || 1.877665267e-23
rotate1 || \&\2 || 1.84381475553e-23
is_empty2 || \nand\ || 1.6841927742e-23
remdups || \&\2 || 1.67179953198e-23
rev || \xor\ || 1.57229192575e-23
rev || \&\2 || 1.45522997885e-23
map_le || <=3 || 1.42838708016e-23
product_Pair || Monom || 1.32310861453e-23
finite1921348288axioms || r4_absred_0 || 1.28954465796e-23
set || .:18 || 1.25425847285e-23
finite_folding_idem || r10_absred_0 || 1.23048003442e-23
rotate1 || =>2 || 1.1845391654e-23
finite1921348288axioms || r8_absred_0 || 1.15813681322e-23
some || -\ || 1.11986366267e-23
rev || \or\3 || 1.11556471838e-23
map_add || max6 || 1.08361676549e-23
listMem || is_finer_than0 || 1.07037861445e-23
listMem || is_coarser_than0 || 1.07037861445e-23
finite1921348288axioms || r10_absred_0 || 1.06139413358e-23
remdups || =>2 || 1.0555096239e-23
finite_folding || r4_absred_0 || 1.05498799793e-23
remdups_adj || =>2 || 1.02335593945e-23
finite_folding_idem || r11_absred_0 || 1.01278688611e-23
finite_folding_idem || r13_absred_0 || 9.73899562595e-24
converse || #quote#19 || 9.51983530248e-24
finite_folding || r8_absred_0 || 9.3590102438e-24
rev || =>2 || 9.24688284666e-24
product_case_prod || *109 || 9.10141293174e-24
product_fst || coefficient || 8.2210485483e-24
id2 || id4 || 8.14109490771e-24
finite_folding_idem || r8_absred_0 || 7.93826655281e-24
distinct || =>2 || 7.88463876664e-24
set2 || .:19 || 7.8212622908e-24
product_snd || term || 7.6001183136e-24
size_size || \&\2 || 7.51064256506e-24
uminus_uminus || *\22 || 7.3490018701e-24
uminus_uminus || *\23 || 7.3490018701e-24
finite_folding || r10_absred_0 || 7.12443763295e-24
list || \not\2 || 6.96999674855e-24
remdups_adj || \xor\ || 6.86888665515e-24
none || *1 || 6.72718935545e-24
distinct || \&\2 || 6.68944221215e-24
coset || *\22 || 6.22352645915e-24
coset || *\23 || 6.22352645915e-24
rotate1 || \or\3 || 5.78077762589e-24
bNF_Wellorder_compat || <4 || 5.7231357752e-24
null2 || are_equipotent || 5.66005722801e-24
remdups || \xor\ || 5.52541558617e-24
finite_comp_fun_idem || is_the_direct_sum_of1 || 5.52515838697e-24
remove || (Omega).5 || 5.42925489321e-24
remove || (0).4 || 5.3098860685e-24
remdups || \or\3 || 5.06329548879e-24
remdups_adj || \or\3 || 4.86077347632e-24
set2 || *\22 || 4.77284792811e-24
set2 || *\23 || 4.77284792811e-24
set || (Omega).5 || 4.76947456873e-24
set || (0).4 || 4.73242641735e-24
none || k1_numpoly1 || 4.70014955016e-24
hd || =>2 || 4.30586073691e-24
distinct || \nor\ || 4.20748224667e-24
none || Lucas || 4.03035054149e-24
none || |....|2 || 3.98627991215e-24
none || In_Power || 3.94640663936e-24
bNF_We2082974046_image || Red || 3.70805681028e-24
left || COMPLEX || 3.37940089961e-24
hd || \&\2 || 3.19865070655e-24
partial_flat_lub || sigma_Meas || 3.06157050999e-24
set2 || \or\3 || 2.8904683333e-24
finite_comp_fun_idem || is_the_direct_sum_of0 || 2.75727916047e-24
right || INT || 2.73606647579e-24
insert3 || (Omega).5 || 2.72861646547e-24
insert3 || (0).4 || 2.69977935293e-24
left || RAT || 2.64273713784e-24
finite_folding_idem || r12_absred_0 || 2.61704350922e-24
right || RAT || 2.5535339349e-24
right || omega || 2.39921619074e-24
partia17684980itions || is_complete || 2.31557906699e-24
distinct || \or\3 || 2.27711987151e-24
remove || (Omega).1 || 1.71983520373e-24
left || REAL || 1.58254535466e-24
relcomp || *20 || 1.56349349933e-24
partial_flat_ord || sigma_Field || 1.55249757501e-24
set || (Omega).1 || 1.44957119195e-24
remove || (0).0 || 1.41533258139e-24
nat_tr1645093318rphism || is_similar_to0 || 1.39751792545e-24
set || (0).0 || 1.35196952802e-24
image || .9 || 1.21688767706e-24
empty || Subspaces || 1.17190157639e-24
empty || Submodules || 1.17190157639e-24
empty || Subspaces2 || 1.17190157639e-24
product_snd || the_reduction_of || 1.03337695797e-24
hd || \nor\ || 9.42411405955e-25
basic_sndsp || -are_isomorphic || 9.34711581258e-25
remove || (Omega).3 || 8.6876212085e-25
product_fst || the_reduction_of || 8.51138821861e-25
remove || (0).3 || 8.46806777166e-25
basic_sndsp || -are_equivalent || 8.46103868709e-25
insert3 || (Omega).1 || 8.35942325479e-25
basic_fstsp || -are_isomorphic || 7.77710872526e-25
complex2 || quotient || 7.63714622868e-25
insert3 || (0).0 || 7.60928212912e-25
abel_semigroup || is_strongly_quasiconvex_on || 7.50995503954e-25
set || (Omega).3 || 7.50292404991e-25
set || (0).3 || 7.43941963501e-25
im || denominator0 || 7.36997858783e-25
is_none || divides || 7.31081090466e-25
re || numerator0 || 7.28912821298e-25
basic_fstsp || -are_equivalent || 7.03663813503e-25
empty || Subgroups || 7.02193404602e-25
finite_comp_fun_idem || r1_absred_0 || 6.86573121921e-25
empty || bool3 || 6.78106985696e-25
empty || east_halfline || 6.28088201428e-25
empty || west_halfline || 6.28088201428e-25
empty || the_Tree_of || 6.15918258067e-25
empty || Big_Omega || 6.15918258067e-25
empty || Subtrees || 6.05203945462e-25
right || REAL || 6.00319952756e-25
empty || the_right_side_of || 5.87092990541e-25
finite852775215axioms || r13_absred_0 || 5.8104354698e-25
finite852775215axioms || r12_absred_0 || 5.8104354698e-25
empty || nextcard || 5.7932736843e-25
empty || south_halfline || 5.7932736843e-25
empty || Big_Theta || 5.7932736843e-25
empty || north_halfline || 5.7932736843e-25
finite_comp_fun_idem || r5_absred_0 || 5.60685199041e-25
partia17684980itions || are_connected1 || 5.55883099036e-25
empty || Tarski-Class || 5.0570440201e-25
left || INT || 5.0198877824e-25
empty || Big_Oh || 4.8178188086e-25
empty || succ1 || 4.78961000976e-25
hd || \or\3 || 4.77553160292e-25
partial_flat_lub || the_last_point_of || 4.64128485037e-25
id2 || id3 || 4.30380280373e-25
insert3 || (Omega).3 || 4.28006093194e-25
insert3 || (0).3 || 4.22913476332e-25
partial_flat_ord || the_first_point_of || 4.18104797525e-25
bNF_Greatest_Succ || \;\3 || 4.14406855557e-25
abel_s1917375468axioms || is_strictly_quasiconvex_on || 4.03617549721e-25
bNF_Greatest_Shift || \;\ || 3.70852136228e-25
cons || \;\6 || 3.62621704575e-25
bNF_Wellorder_compat || <=7 || 3.62021350448e-25
semilattice || is_strictly_convex_on || 3.55456162603e-25
map_le || are_equivalence_wrt || 3.52280385693e-25
finite_comp_fun_idem || r6_absred_0 || 3.3956752048e-25
adjunct || *34 || 3.38888101956e-25
abel_s1917375468axioms || is_quasiconvex_on || 3.2719512311e-25
finite852775215axioms || r7_absred_0 || 3.21535979845e-25
finite_comp_fun_idem || r2_absred_0 || 2.9367544676e-25
bNF_Greatest_Shift || |^17 || 2.83555992493e-25
finite100568337ommute || r13_absred_0 || 2.74007611076e-25
finite100568337ommute || r12_absred_0 || 2.74007611076e-25
bNF_Greatest_Succ || |^16 || 2.69009041267e-25
finite852775215axioms || r11_absred_0 || 2.67926178369e-25
bNF_We2082974046_image || HM || 2.62786479997e-25
zero_Rep || VERUM1 || 2.56611508951e-25
set_of_seq || {..}27 || 2.48569935246e-25
transitive_trancl || bounded_metric || 2.33646101696e-25
can_select || -82 || 2.24369511753e-25
nil || 1._ || 2.23213372976e-25
nil || 0._ || 2.23213372976e-25
is_empty2 || Sum20 || 2.20980618843e-25
is_empty2 || Sum14 || 2.20980618843e-25
lexordp_eq || is_Lipschitzian_on || 2.19894170949e-25
semigroup || is_strictly_quasiconvex_on || 2.19050396042e-25
semigroup || is_quasiconvex_on || 1.88399543152e-25
set_of_pred || {..}27 || 1.87591414382e-25
single || <*..*>23 || 1.80159758401e-25
sym || is_metric_of || 1.78780747479e-25
singleton || block_diagonal || 1.78048594888e-25
nil || carrier || 1.726057927e-25
finite100568337ommute || r7_absred_0 || 1.62717645832e-25
nat2 || Sum0 || 1.60516540159e-25
list_ex1 || +94 || 1.58105584461e-25
code_Nat || -52 || 1.56886860228e-25
finite852775215axioms || r3_absred_0 || 1.53255600151e-25
lexordp_eq || <=3 || 1.45397007824e-25
finite_comp_fun_idem || r3_absred_0 || 1.45233632112e-25
join || *36 || 1.41182221672e-25
abel_semigroup || is_convex_on || 1.4019243685e-25
left || 0 || 1.3758120823e-25
remdups || NF || 1.37226041197e-25
code_integer_of_int || -54 || 1.35674158691e-25
finite100568337ommute || r11_absred_0 || 1.35217905599e-25
nat2 || -36 || 1.3486758745e-25
member3 || <=1 || 1.3400251718e-25
code_n1042895779nteger || -52 || 1.3339577153e-25
lexordp_eq || is_epimorphism || 1.32220608315e-25
member2 || with-replacement || 1.26872128443e-25
cons || *38 || 1.26482774322e-25
member3 || tree1 || 1.24852732038e-25
rotate1 || NF || 1.22495231717e-25
code_integer_of_int || IsomGroup || 1.18373365384e-25
finite_comp_fun_idem || r4_absred_0 || 1.12916616343e-25
nil || Trivial_Algebra || 1.12286859403e-25
append || \;\3 || 1.11257813447e-25
im || max-1 || 1.01747454121e-25
join || *37 || 1.01734323059e-25
finite100568337ommute || r3_absred_0 || 1.0092554329e-25
butlast || NF || 9.84271240045e-26
member2 || is_a_cluster_point_of1 || 9.78996190697e-26
remdups_adj || NF || 9.72941571658e-26
suc_Rep || @8 || 9.69262160925e-26
nat2 || RLMSpace || 9.62107229097e-26
code_natural_of_nat || -0 || 9.44070959532e-26
semilattice_axioms || is_strongly_quasiconvex_on || 9.35960240044e-26
lattic35693393ce_set || is_strongly_quasiconvex_on || 9.21311335135e-26
suc_Rep || (#hash#)22 || 9.18795914406e-26
suc_Rep || \not\9 || 9.18795914406e-26
null2 || c= || 9.16476347777e-26
wf || is_metric_of || 9.13175944671e-26
code_integer_of_int || -25 || 8.8783944356e-26
concat || FlattenSeq0 || 8.85679198241e-26
tl || NF || 8.69954207776e-26
re || max+1 || 8.59602729309e-26
nil || <%>0 || 7.90190918655e-26
set_of_seq || lim_inf1 || 7.88871909458e-26
rev || NF || 7.79590445034e-26
null || exp2 || 7.7531078222e-26
null || exp3 || 7.7531078222e-26
nil || EmptyBag || 7.6800035034e-26
set2 || -81 || 7.6797678412e-26
finite852775215axioms || r4_absred_0 || 7.57127235654e-26
finite852775215axioms || r10_absred_0 || 7.55861163695e-26
transitive_rtrancl || bounded_metric || 7.42998046022e-26
code_nat_of_natural || inf0 || 7.41348201822e-26
code_nat_of_natural || sup || 7.29265560015e-26
code_int_of_integer || inf0 || 7.03471792382e-26
code_int_of_integer || sup || 6.93128127669e-26
set_option || inf || 6.92278534548e-26
some || wayabove || 6.717750733e-26
finite_comp_fun_idem || r10_absred_0 || 6.66259695447e-26
insert || =>4 || 6.63096464582e-26
finite852775215axioms || r8_absred_0 || 6.63066458275e-26
append || \;\ || 6.60588163118e-26
pred_list || is_eventually_in || 6.55400253063e-26
eval || with-replacement || 6.51194899135e-26
complex2 || 1-Alg || 6.50126800274e-26
listsp || is_eventually_in || 6.47014200294e-26
code_Nat || Sum11 || 6.40536596369e-26
set_of_pred || lim_inf1 || 6.2314893928e-26
coset || `5 || 6.08960640975e-26
set2 || `5 || 5.94569878521e-26
removeAll || =>4 || 5.92331526555e-26
code_n1042895779nteger || Sum11 || 5.79128465165e-26
finite_comp_fun_idem || r11_absred_0 || 5.74535994712e-26
finite100568337ommute || r4_absred_0 || 5.37818746172e-26
semilattice_axioms || is_convex_on || 5.33941618799e-26
code_natural_of_nat || id || 5.32747484208e-26
remove || #quote##slash##bslash##quote# || 5.28369703063e-26
code_num_of_integer || Sum11 || 5.27216132992e-26
finite_comp_fun_idem || r13_absred_0 || 5.08279873438e-26
eval || is_a_cluster_point_of1 || 4.91825708932e-26
im || MSAlg0 || 4.7877342371e-26
finite_comp_fun_idem || r8_absred_0 || 4.74445598419e-26
complex2 || - || 4.68690949013e-26
re || MSSign || 4.67372402796e-26
finite100568337ommute || r8_absred_0 || 4.61637680865e-26
lattic35693393ce_set || is_convex_on || 4.58768248154e-26
list || ^omega || 4.57139838173e-26
num_of_nat || -0 || 4.40296904458e-26
insert3 || #quote##bslash##slash##quote#4 || 4.24817822599e-26
insert3 || #quote##slash##bslash##quote# || 4.19864193305e-26
finite_psubset || Pitag_dist || 4.09435734424e-26
code_Nat || Sum || 3.91217464695e-26
finite100568337ommute || r10_absred_0 || 3.78663206919e-26
set2 || rExpSeq0 || 3.74720751494e-26
set2 || ExpSeq0 || 3.74720751494e-26
code_Nat || 1_ || 3.65718989683e-26
code_n1042895779nteger || Sum || 3.63962154501e-26
divmod_nat_rel || is_a_normal_form_of || 3.5105167476e-26
code_n1042895779nteger || 1_ || 3.40734638778e-26
is_none || is_SetOfSimpleGraphs_of || 3.3389359601e-26
nil || Stop || 3.32376394414e-26
list_ex1 || -61 || 3.2442595328e-26
code_num_of_integer || Sum || 3.20665993772e-26
code_num_of_integer || 1_ || 3.16080361763e-26
semilattice || is_strictly_quasiconvex_on || 3.07823457819e-26
map_tailrec || sup7 || 2.76421286734e-26
num_of_nat || id || 2.71425638687e-26
can_select || is_simple_func_in1 || 2.61465859239e-26
code_integer_of_int || Z#slash#Z* || 2.61318217846e-26
bij_betw || are_isomorphic_under || 2.5417721088e-26
list_ex1 || is_simple_func_in || 2.35640278315e-26
can_select || +3 || 2.32097226427e-26
id || id4 || 2.23653771028e-26
semilattice || is_quasiconvex_on || 2.10265575262e-26
null || ex_inf_of || 1.99475272692e-26
null || ex_sup_of || 1.89043230325e-26
right_unique || is_additive_in || 1.88806885001e-26
rev || -27 || 1.79346615188e-26
none || SIMPLEGRAPHS || 1.790079277e-26
left_unique || has_property_of_zero_in || 1.76185173738e-26
distinct || ex_inf_of || 1.74957028582e-26
nat2 || INT.Ring || 1.74680353744e-26
distinct || ex_sup_of || 1.66901867231e-26
tl || the_consequent_of0 || 1.56114367535e-26
fun_is_measure || is_a_retract_of || 1.55120639244e-26
replicate || 0.0 || 1.54743418997e-26
bi_unique || is_semi_additive_in || 1.51232641806e-26
splice || \;\3 || 1.47049916509e-26
bind3 || FinUnion0 || 1.46799405369e-26
set2 || R_EAL0 || 1.45855948983e-26
single || singleton || 1.43887442986e-26
finite_comp_fun_idem || r12_absred_0 || 1.43052348259e-26
rev || Non || 1.42978850078e-26
rotate1 || Non || 1.40458695527e-26
fract || <X> || 1.37491644675e-26
transitive_acyclic || is_a_pseudometric_of || 1.34243969389e-26
filter3 || #quote##slash##bslash##quote# || 1.32450169233e-26
product_Abs_prod || the_stable_subgroup_of || 1.31010280991e-26
product_Rep_prod || carr4 || 1.31010280991e-26
cons || =>4 || 1.29267936357e-26
code_natural_of_nat || 1. || 1.28762678964e-26
filter2 || =>4 || 1.17677212934e-26
set2 || Neg2 || 1.11702448422e-26
empty || the_transitive-closure_of || 1.09930942646e-26
inverse_inverse || -2 || 1.0823606638e-26
empty || [*] || 1.06751927535e-26
filter2 || at1 || 1.04698935244e-26
remdups || Non || 1.02162071835e-26
empty || CnPos || 1.01820859483e-26
empty || k5_ltlaxio3 || 9.98476485646e-27
cons || \;\3 || 9.84371843755e-27
divmod_nat || nf || 9.48031165908e-27
empty || CnIPC || 9.39149498967e-27
empty || CnCPC || 9.27664476524e-27
empty || Subtrees0 || 9.27664476524e-27
empty || Inv0 || 9.17124863803e-27
empty || CnS4 || 8.9000089363e-27
empty || sup4 || 8.82164076798e-27
none || 0. || 8.76187109003e-27
right_total || is_additive_in || 8.69029594369e-27
left_total || has_property_of_zero_in || 8.61130998225e-27
empty || Mycielskian1 || 8.55239098206e-27
map || lim_inf1 || 8.31629401075e-27
nat_tr1645093318rphism || LIN || 8.11702834802e-27
set || REAL0 || 8.0304307995e-27
bind2 || #slash#0 || 8.00763656324e-27
empty || Rank || 8.00259927333e-27
bi_total || is_semi_additive_in || 7.77001265426e-27
cons || \or\0 || 7.4940982885e-27
rat || SourceSelector 3 || 7.48083630405e-27
cons || =>1 || 7.27619141769e-27
rotate || at1 || 7.04466144223e-27
insert || at1 || 6.88649598373e-27
is_empty2 || max- || 6.81890344207e-27
is_empty2 || max+ || 6.6437077459e-27
gen_length || \;\3 || 6.56798932172e-27
num_of_nat || 1. || 6.29655673716e-27
hd || the_left_disjunct_of || 5.71980555083e-27
hd || the_antecedent_of0 || 5.55349059181e-27
trans || is_metric_of || 5.45442717242e-27
sym || is_expressible_by || 5.26574349232e-27
complex2 || SubgraphInducedBy || 5.23693841521e-27
null || max-0 || 5.0406584661e-27
null || max+0 || 4.85709480632e-27
listMem || is_proper_subformula_of1 || 4.72827679776e-27
set2 || vars0 || 4.66524936778e-27
set2 || variables_in || 4.58728086399e-27
transitive_trancl || ChangeVal_2 || 4.53858172097e-27
sum_Rep_sum || carr4 || 4.37222147827e-27
sum_Abs_sum || the_stable_subgroup_of || 4.10055262477e-27
nil || +52 || 4.00594845699e-27
re || Mycielskian1 || 3.80123954831e-27
bind2 || RightModule || 3.50903620445e-27
distinct || vars0 || 3.38807121676e-27
distinct || variables_in || 3.32919785129e-27
im || union0 || 2.92314332602e-27
pred_option || are_orthogonal1 || 2.91044778074e-27
nil || Bottom2 || 2.78522261081e-27
id_on || NEG_MOD || 2.70856203084e-27
pred_option || are_orthogonal0 || 2.64464651401e-27
set_option || closed_attribute_subset || 2.60652037312e-27
some || deps_encl_by || 2.15543797578e-27
rotate1 || uparrow || 2.1331650965e-27
remdups_adj || Non || 2.12429445966e-27
rotate1 || downarrow || 2.09210824846e-27
splice || abs4 || 2.06859669995e-27
splice || delta5 || 2.04889518851e-27
transitive_rtrancl || ChangeVal_2 || 1.88058372168e-27
wf || is_expressible_by || 1.86424794102e-27
remdups || uparrow0 || 1.79774260027e-27
remdups || downarrow0 || 1.69702830079e-27
rev || uparrow || 1.61164851541e-27
append || qadd || 1.59561221515e-27
list_ex1 || in2 || 1.59031626881e-27
member3 || is_generator-set_of || 1.57002251673e-27
rev || downarrow || 1.56989163662e-27
member2 || is-lower-neighbour-of || 1.46565609044e-27
map_tailrec || +^4 || 1.32148812045e-27
nil || [[0]] || 1.30666819474e-27
append || delta5 || 1.18839574769e-27
nil || q0. || 1.13088196753e-27
append || abs4 || 1.08326682279e-27
empty || Bottom || 1.00428030404e-27
measure || NEG_MOD || 1.00167126559e-27
list_ex || in2 || 9.38519677328e-28
gen_length || abs4 || 8.94093723191e-28
gen_length || 0c1 || 8.83648435123e-28
gen_length || delta5 || 8.52308438199e-28
splice || qadd || 8.18296467206e-28
splice || 0c1 || 7.46737859681e-28
measures || NEG_MOD || 7.08537291268e-28
list_ex1 || overlapsoverlap || 7.06764347952e-28
empty || Constants || 6.91020695108e-28
nil || VERUM0 || 6.50475770208e-28
set || UnSubAlLattice || 5.95397163987e-28
bot_bot || Bottom || 5.77838479003e-28
append || 0c1 || 5.52485795209e-28
set_of_seq || GenUnivAlg || 5.42405055818e-28
list_ex || overlapsoverlap || 5.29488613807e-28
removeAll || qmult || 5.0757423018e-28
trans || is_expressible_by || 4.89327966648e-28
nat2 || succ0 || 3.91066139045e-28
antisym || is_expressible_by || 3.87636764475e-28
pred_of_seq || GenUnivAlg || 3.69739907424e-28
code_integer_of_int || k19_finseq_1 || 3.69481699841e-28
filter2 || qmult || 3.52980112684e-28
rotate1 || .reverse() || 3.50894557256e-28
gen_length || qadd || 3.39958826862e-28
list_ex1 || is_immediate_constituent_of1 || 3.30773515916e-28
image || .12 || 3.21133424241e-28
set2 || ex_inf_of || 3.03734561116e-28
list_ex1 || is_proper_subformula_of1 || 2.97247700105e-28
nil || Constants || 2.96374044196e-28
set2 || ex_sup_of || 2.86287904462e-28
map_tailrec || monotoneclass || 2.76236198582e-28
set_option || GenUnivAlg || 2.72342406752e-28
contained || [=1 || 2.69001792219e-28
hd || vars0 || 2.6602985423e-28
hd || variables_in || 2.61207408072e-28
id2 || SIMPLEGRAPHS || 2.60657618552e-28
bNF_Greatest_Succ || <=0 || 2.57444281575e-28
pred || UnSubAlLattice || 2.55668206483e-28
list_ex || is_immediate_constituent_of1 || 2.5276543368e-28
coset || GenUnivAlg || 2.46375096377e-28
nil || FuncUnit0 || 2.35681939162e-28
nil || FuncUnit || 2.35681939162e-28
sum_Sumr || Tau || 2.3348949361e-28
sum_Suml || Tau || 2.3348949361e-28
list_ex || is_proper_subformula_of1 || 2.32475772397e-28
bNF_Greatest_Shift || #bslash#1 || 2.30765997795e-28
nat || Sum_Tran || 2.30274800657e-28
bNF_Ca1495478003natLeq || [+] || 2.28110929685e-28
relcomp || *24 || 2.21280306563e-28
tan || Product3 || 2.13725875779e-28
splice || *112 || 2.07161920559e-28
splice || *140 || 2.07161920559e-28
arctan || ppf || 2.04288584912e-28
map || +84 || 2.02506241465e-28
none || Constants || 1.94413508088e-28
less_than || [+] || 1.86745477719e-28
set2 || GenUnivAlg || 1.79929494094e-28
bind2 || FinUnion0 || 1.71000717331e-28
cons || *110 || 1.69432812359e-28
code_natural_of_nat || Seg || 1.49582799242e-28
member2 || hom1 || 1.45252339373e-28
some || singleton || 1.36703032133e-28
remdups_adj || .reverse() || 1.34339561119e-28
trans || computes0 || 1.31699003676e-28
id2 || id5 || 1.26630774393e-28
rev || .reverse() || 1.24216004844e-28
real || Newton_Coeff || 1.21506823542e-28
map || + || 1.19879860717e-28
append || *112 || 1.1746089876e-28
append || *140 || 1.1746089876e-28
antisym || is_SetOfSimpleGraphs_of || 1.17228984213e-28
distinct || is_metric_of || 1.15963667243e-28
sym || is_SetOfSimpleGraphs_of || 1.15609300212e-28
butlast || bounded_metric || 1.15513967748e-28
produc2004651681e_prod || DecSD2 || 1.14951274099e-28
code_integer_of_int || CompleteSGraph || 1.10225730593e-28
semilattice || commutes_with0 || 1.09932836001e-28
semilattice || OrthoComplement_on || 1.09932836001e-28
transitive_rtranclp || are_equivalence_wrt || 1.08973467613e-28
minus_minus || +50 || 1.05962336587e-28
code_nat_of_integer || chromatic#hash#0 || 1.03583016304e-28
code_Pos || @22 || 1.03317500766e-28
pos || @22 || 1.0033551667e-28
trans || is_SetOfSimpleGraphs_of || 9.72933700749e-29
top_top || Bottom || 9.72904671081e-29
cons || abs4 || 9.42661269519e-29
code_nat_of_integer || clique#hash#0 || 9.30075777136e-29
wf || computes0 || 9.30018402677e-29
code_Nat || dom0 || 9.20037083041e-29
tl || bounded_metric || 9.1393007721e-29
set2 || .cost()0 || 8.94408589125e-29
code_n1042895779nteger || dom0 || 8.71074955703e-29
transitive_trancl || NEG_MOD || 8.5887548592e-29
pred_nat || [+] || 8.57449184705e-29
set2 || .edges() || 8.40949013166e-29
set_of_seq || id2 || 8.36757142753e-29
member3 || hom2 || 8.28045657537e-29
gen_length || *112 || 8.27462789183e-29
gen_length || *140 || 8.27462789183e-29
code_num_of_integer || dom0 || 8.19229541211e-29
code_sub || +30 || 8.11448225925e-29
code_nat_of_integer || len || 8.01714889254e-29
transitive_rtrancl || NEG_MOD || 7.94329191588e-29
sub || +30 || 7.9218697457e-29
can_select || \;\6 || 7.90896869618e-29
num_of_nat || Seg || 7.49284082222e-29
pow2 || radix || 7.36300396527e-29
set2 || .vertices() || 7.26425397363e-29
antisym || computes0 || 6.97035093399e-29
semilattice_axioms || QuasiOrthoComplement_on || 6.89327718722e-29
semilattice_axioms || commutes-weakly_with || 6.89327718722e-29
distinct || .cost()0 || 6.56457938638e-29
uminus_uminus || dim || 6.39940803132e-29
intrel || are_equipotent0 || 6.27706636751e-29
concat || FlattenSeq || 6.26411971432e-29
code_integer || F_Real || 6.18851159588e-29
distinct || .edges() || 6.16783804698e-29
bNF_Ca829732799finite || computes0 || 6.05860387416e-29
map || sigma0 || 5.51086988597e-29
distinct || .vertices() || 5.31925927749e-29
abs_Integ || card || 5.30519296358e-29
eval || hom1 || 5.01874655472e-29
code_integer || k11_gaussint || 4.90316929685e-29
code_integer_of_int || Complement1 || 4.89190289221e-29
int || F_Real || 4.88804629256e-29
nil || <*>0 || 4.8848528548e-29
set_of_pred || id2 || 4.87957309086e-29
map_tailrec || `111 || 4.86064512975e-29
map_tailrec || `121 || 4.86064512975e-29
remdups || .reverse() || 4.66305945966e-29
pos || ProperPrefixes || 4.61826317346e-29
list_ex1 || \;\7 || 4.61272346428e-29
listMem || <=0 || 4.44812051871e-29
set || @--> || 4.13454582827e-29
nat_of_num || In_Power || 4.09854517103e-29
code_integer_of_int || Seq || 4.046348959e-29
code_integer_of_int || Sgm00 || 4.04279688555e-29
code_nat_of_integer || len1 || 3.98313549361e-29
pos || Col || 3.89352591007e-29
is_empty2 || sqr1 || 3.86179516359e-29
code_Neg || k5_zmodul04 || 3.71074549768e-29
code_Pos || k5_zmodul04 || 3.54419432918e-29
list || *0 || 3.53630833133e-29
abel_semigroup || QuasiOrthoComplement_on || 3.52149556232e-29
abel_semigroup || commutes-weakly_with || 3.52149556232e-29
remdups || uparrow || 3.42845197619e-29
int || k11_gaussint || 3.40909162581e-29
equiv_equivp || is_strongly_quasiconvex_on || 3.40588328243e-29
member3 || reduces || 3.33367516936e-29
remdups || downarrow || 3.31772075768e-29
neg || k5_zmodul04 || 3.26604853567e-29
nil || q1. || 3.26509821429e-29
remdups_adj || uparrow || 3.2014317044e-29
lattic35693393ce_set || QuasiOrthoComplement_on || 3.19261819003e-29
lattic35693393ce_set || commutes-weakly_with || 3.19261819003e-29
pos || k5_zmodul04 || 3.18408104945e-29
remdups_adj || downarrow || 3.09143068759e-29
splice || qmult || 3.00010457088e-29
c_Predicate_Oeq || are_isomorphic8 || 2.93594208642e-29
product_case_prod || DecSD || 2.64097494974e-29
nil || Concept-with-all-Objects || 2.63373253611e-29
code_Neg || k1_zmodul03 || 2.56804526857e-29
null || sqr0 || 2.56572117012e-29
product_snd || #quote##bslash##slash##quote#2 || 2.55956691388e-29
product_fst || #quote##slash##bslash##quote# || 2.53782775852e-29
nat_of_num || len || 2.52609902219e-29
set2 || Macro || 2.52583794691e-29
code_Pos || k1_zmodul03 || 2.5128675283e-29
pred_list || is-SuperConcept-of || 2.39557549125e-29
listsp || is-SuperConcept-of || 2.3396716493e-29
comm_monoid || are_weakly-unifiable || 2.2852547352e-29
neg || k1_zmodul03 || 2.26148028485e-29
nil || Bot\ || 2.23824878528e-29
pos || k1_zmodul03 || 2.23496356368e-29
listMem || |- || 2.22582400104e-29
groups387199878d_list || are_unifiable || 2.16671753475e-29
nat2 || cliquecover#hash#0 || 2.06389245883e-29
induct_implies || *\29 || 2.03442225771e-29
nat2 || stability#hash#0 || 1.93155213784e-29
hd || .cost()0 || 1.91771613957e-29
semiring_1_of_nat || <*..*>1 || 1.82590867942e-29
hd || .edges() || 1.79858679734e-29
append || qmult || 1.74348038265e-29
hd || .vertices() || 1.5449124828e-29
pos || Complement1 || 1.54102073671e-29
basic_fsts || COM1 || 1.52497879389e-29
groups_monoid_list || are_weakly-unifiable || 1.5213936538e-29
equiv_part_equivp || is_strictly_quasiconvex_on || 1.48598321272e-29
re || k1_xfamily || 1.48102855907e-29
im || k2_xfamily || 1.4700731576e-29
code_nat_of_integer || Product7 || 1.44321903378e-29
code_integer || 0 || 1.34267173805e-29
rotate1 || +75 || 1.33226218209e-29
lattic2109816131tr_set || has_a_Standard_Representation_of || 1.30398978074e-29
set2 || abs6 || 1.27529243089e-29
product_snd || DataPart || 1.2528738854e-29
code_nat_of_integer || cliquecover#hash#0 || 1.23315894996e-29
equiv_part_equivp || is_quasiconvex_on || 1.2236575249e-29
code_nat_of_integer || stability#hash#0 || 1.22014670158e-29
semilattice_neutr || are_unifiable || 1.20574915667e-29
induct_conj || 0q || 1.20557868724e-29
induct_conj || -42 || 1.18435159644e-29
gen_length || qmult || 1.17552824433e-29
reflp || is_strictly_quasiconvex_on || 1.1574428753e-29
product_fst || IC || 1.15393215493e-29
semila478527537_order || is_top_reducible_wrt || 1.08604097751e-29
complex2 || [..] || 1.07986506272e-29
induct_implies || 1q || 1.0397517811e-29
reflp || is_quasiconvex_on || 9.75136086595e-30
list || <%> || 9.60078151793e-30
nat2 || chromatic#hash#0 || 9.31237304494e-30
code_nat_of_integer || Sum19 || 8.96271490083e-30
nat2 || clique#hash#0 || 8.6982367398e-30
rev || +75 || 8.61665913358e-30
monoid || are_unifiable || 8.60494609796e-30
product_fst || COM0 || 8.37647289153e-30
trans || is_proper_subformula_of0 || 8.34689196813e-30
size_size || are_equipotent || 7.40714659105e-30
product_Abs_prod || coefficient || 7.09725013802e-30
map || cod || 6.88142042254e-30
map || dom1 || 6.88142042254e-30
distinct || is_a_normal_form_wrt || 6.8809376862e-30
code_nat_of_natural || Product7 || 6.79977627863e-30
code_natural || 0 || 6.54615882426e-30
member3 || is_complete || 6.38162617016e-30
cons || All1 || 6.22711025155e-30
product_Rep_prod || |16 || 6.17764065084e-30
transitive_rtranclp || ==>* || 5.74306544381e-30
nat_tr1645093318rphism || is_finer_than2 || 5.65891679647e-30
im || frac || 5.64910431719e-30
cons || =>0 || 5.4831254445e-30
remdups || nf || 5.31187308001e-30
set2 || *49 || 5.21791732409e-30
code_nat_of_natural || Sum19 || 4.93291575378e-30
re || [#bslash#..#slash#] || 4.90836840287e-30
nat2 || Product7 || 4.81953870028e-30
int || 0 || 4.79119395508e-30
equiv_equivp || is_convex_on || 4.64402527104e-30
nat_of_num || chromatic#hash#0 || 4.54951454128e-30
groups828474808id_set || are_unifiable || 4.5173614163e-30
monoid_axioms || are_weakly-unifiable || 4.43185403526e-30
code_int_of_integer || Product7 || 4.40238573935e-30
distinct || is_expressible_by || 4.37157769392e-30
finite_comp_fun_idem || do_not_constitute_a_decomposition || 4.27238726894e-30
ring_1_of_int || <*..*>1 || 4.17881973769e-30
im || denominator || 4.16734209847e-30
re || numerator || 4.1307810115e-30
nat_of_num || clique#hash#0 || 4.06486642759e-30
nat_of_num || cliquecover#hash#0 || 4.0591605485e-30
complex2 || WFF || 4.01259261973e-30
nat_of_num || stability#hash#0 || 3.95832834789e-30
nat2 || Sum19 || 3.7353213595e-30
complex2 || + || 3.61751132917e-30
lattic1543629303tr_set || are_weakly-unifiable || 3.57772633306e-30
code_integer_of_int || ..1 || 3.46950216134e-30
remdups_adj || nf || 3.32231522731e-30
distinct || *49 || 3.32023711657e-30
code_int_of_integer || Sum19 || 3.27054539812e-30
removeAll || #quote##slash##bslash##quote# || 3.17840322957e-30
butlast || ChangeVal_2 || 3.11190051156e-30
re || the_argument_of0 || 3.06587623691e-30
code_natural_of_nat || rngs || 3.03658016065e-30
transitive_tranclp || -->. || 2.99401123796e-30
complex2 || #slash# || 2.96242454359e-30
dropWhile || #quote##slash##bslash##quote# || 2.93408278102e-30
im || the_left_argument_of0 || 2.92158480284e-30
remove1 || #quote##slash##bslash##quote# || 2.91868569597e-30
takeWhile || #quote##slash##bslash##quote# || 2.8394523321e-30
id_on || MSSign0 || 2.83470715654e-30
nat2 || SubFuncs || 2.83454316434e-30
im || the_antecedent_of || 2.83126608939e-30
pos || CompleteSGraph || 2.81715055506e-30
hd || ex_inf_of || 2.78297351803e-30
drop || #quote##slash##bslash##quote# || 2.68151452928e-30
can_select || *36 || 2.64577362249e-30
tl || ChangeVal_2 || 2.639913445e-30
map_tailrec || ContMaps || 2.61724521979e-30
take || #quote##slash##bslash##quote# || 2.61100961975e-30
hd || ex_sup_of || 2.58245919867e-30
filter2 || #quote##slash##bslash##quote# || 2.55556493468e-30
comm_monoid || |-|0 || 2.49472134532e-30
predicate_contains || is_formal_provable_from || 2.36681326263e-30
sum_Abs_sum || coefficient || 2.35812544407e-30
nat_of_num || succ0 || 2.27358896205e-30
can_select || 0c1 || 2.25858225318e-30
id_on || WFF || 2.23133870479e-30
sum_Rep_sum || |16 || 2.17277639035e-30
produc2004651681e_prod || is_a_cluster_point_of || 1.9879615844e-30
cons || +89 || 1.95789870734e-30
list_ex1 || abs4 || 1.94306571662e-30
list_ex1 || *35 || 1.90872449324e-30
id_on || \or\4 || 1.90225169915e-30
predicate_contains || is_Lipschitzian_on6 || 1.86428120337e-30
predicate_contains || is_Lipschitzian_on5 || 1.86428120337e-30
trans || can_be_characterized_by || 1.85778446078e-30
complex2 || \not\6 || 1.82326194469e-30
set || {}0 || 1.74762329536e-30
single || *\27 || 1.7051034263e-30
transitive_rtrancl || *49 || 1.67758287424e-30
induct_conj || max || 1.66123462695e-30
filter2 || *34 || 1.61674284866e-30
bNF_Wellorder_wo_rel || is_immediate_constituent_of0 || 1.59801788949e-30
bNF_Greatest_Succ || [=1 || 1.57283380025e-30
finite_folding_idem || are_unifiable || 1.57201093463e-30
remove || [#hash#] || 1.52139127328e-30
transitive_tranclp || ==>. || 1.52120544141e-30
produc2004651681e_prod || |35 || 1.51915419758e-30
num_of_nat || rngs || 1.47743696936e-30
cons || -r> || 1.44895088255e-30
bNF_Greatest_Shift || *18 || 1.43311782052e-30
rotate1 || ?0 || 1.35185226549e-30
hd || the_left_side_of0 || 1.28749858705e-30
append || +8 || 1.27940083705e-30
antisym || is_proper_subformula_of0 || 1.2736710144e-30
product_Unity || 1r || 1.26654573392e-30
remdups || NEG_MOD || 1.24059667847e-30
comm_monoid || is_homomorphism1 || 1.18290749434e-30
tl || the_right_side_of0 || 1.09111478257e-30
transitive_trancl || WFF || 1.06021737224e-30
set2 || 0c0 || 1.03625783276e-30
remove1 || *36 || 1.0293325027e-30
cons || <=>1 || 1.02513784781e-30
rev || ?0 || 1.02036559565e-30
transitive_rtrancl || WFF || 1.01029746722e-30
code_Nat || proj1 || 9.99738271357e-31
groups387199878d_list || is_an_universal_closure_of || 9.96935886288e-31
transitive_trancl || \or\4 || 9.61721913688e-31
code_n1042895779nteger || proj1 || 9.49859939923e-31
set2 || carr || 9.47374955296e-31
transitive_rtrancl || \or\4 || 9.20451630638e-31
induct_implies || + || 9.1776392337e-31
arctan || P_cos || 9.11855924976e-31
finite1921348288axioms || are_weakly-unifiable || 9.06429114812e-31
re || Ex4 || 8.93975703806e-31
insert3 || [#hash#] || 8.81849936368e-31
antisym || can_be_characterized_by || 8.6853690203e-31
sym || can_be_characterized_by || 8.56104532109e-31
complex2 || \or\4 || 8.52161669363e-31
im || Var1 || 8.48158320427e-31
tan || to_power0 || 8.25593679896e-31
remdups || +75 || 8.15194524704e-31
groups387199878d_list || is_succ_homomorphism || 8.10761595415e-31
code_num_of_integer || proj1 || 8.09469124659e-31
remdups || ?0 || 8.00286177023e-31
contained || c=1 || 7.97353323967e-31
hd || Ex-bound_in || 7.87217567928e-31
transitive_trancl || +75 || 7.83955241826e-31
transitive_trancl || ?0 || 7.70888321013e-31
basic_BNF_xtor || -20 || 7.70452238711e-31
sym || is_proper_subformula_of0 || 7.67099188356e-31
groups_monoid_list || |-|0 || 7.64835131891e-31
empty || [[0]] || 7.63784882617e-31
set2 || Union0 || 7.61358050186e-31
remdups_adj || +75 || 7.57377680176e-31
set || ConceptLattice || 7.49438732803e-31
product_case_unit || *144 || 7.48732092637e-31
product_rec_unit || *144 || 7.48732092637e-31
remdups_adj || ?0 || 7.44923696179e-31
bNF_Cardinal_czero || Concept-with-all-Attributes || 7.44626299937e-31
bNF_Cardinal_czero || Concept-with-all-Objects || 7.44626299937e-31
transitive_rtranclp || ==>. || 7.38766016093e-31
semilattice_neutr || is_an_universal_closure_of || 7.36526811533e-31
bot_bot || {}0 || 7.34980268471e-31
map || SCMaps || 7.29607065096e-31
remove1 || *37 || 7.23664201847e-31
groups387199878d_list || <==>1 || 7.21053071313e-31
product_case_unit || -46 || 7.07315726758e-31
product_rec_unit || -46 || 7.07315726758e-31
semila1450535954axioms || ==>* || 7.06808370619e-31
complex2 || \=\ || 6.95430548867e-31
groups_monoid_list || is_homomorphism1 || 6.70960565546e-31
tl || Ex-the_scope_of || 6.65292965833e-31
member3 || |=7 || 6.58477163119e-31
is_none || are_isomorphic1 || 6.52822263496e-31
complex2 || <*..*>21 || 6.46771829879e-31
eval || [=1 || 6.35683187506e-31
product_case_prod || is_a_convergence_point_of || 6.23718064123e-31
real || to_power || 6.18831165769e-31
bNF_Ca646678531ard_of || #quote##bslash##slash##quote#10 || 6.16800089216e-31
bNF_Ca646678531ard_of || #quote##slash##bslash##quote#9 || 6.16800089216e-31
cons || Ex1 || 6.06934601414e-31
product_unit || NATOrd || 6.04636107498e-31
induct_implies || min3 || 5.80172847852e-31
sum_projl || the_stable_subgroup_of || 5.63027243863e-31
semilattice_neutr || <==>1 || 5.5009233941e-31
is_empty2 || chi6 || 5.48666765292e-31
finite_folding || are_weakly-unifiable || 5.4284114173e-31
append || (o) || 5.3410368186e-31
map || oContMaps || 5.16931418768e-31
append || (O) || 5.1508174295e-31
member3 || is_continuous_on7 || 5.02485514341e-31
member3 || is_continuous_on9 || 5.02485514341e-31
semilattice_neutr || is_succ_homomorphism || 4.96054045785e-31
nil || TAUT || 4.94658817974e-31
null || chi5 || 4.92140534681e-31
induct_conj || min3 || 4.90095588698e-31
lattic1693879045er_set || -->. || 4.74454216421e-31
append || (-)0 || 4.70893778409e-31
product_case_prod || WHERE || 4.61357529677e-31
semilattice_order || -->. || 4.58662236617e-31
semilattice_order || ==>. || 4.57648374217e-31
member2 || *35 || 4.51340039947e-31
transitive_trancl || MSSign0 || 4.20243086185e-31
set_of_seq || carr || 4.18990281543e-31
is_none || is_embedded_in || 4.12459061268e-31
pred_list || |-5 || 4.00472718941e-31
listsp || |-5 || 3.92916771488e-31
transitive_rtrancl || MSSign0 || 3.87405611239e-31
sum_Inl || carr4 || 3.84590105545e-31
groups828474808id_set || is_an_universal_closure_of || 3.79975411964e-31
member3 || *34 || 3.77686159953e-31
nil || EmptyIns || 3.76161229232e-31
hd || bound_in || 3.68346433507e-31
bNF_Cardinal_cone || omega || 3.42600247003e-31
nat_tr1645093318rphism || -are_isomorphic || 3.32414856488e-31
re || the_scope_of0 || 3.23519146895e-31
re || the_right_argument_of0 || 3.18532034941e-31
groups828474808id_set || <==>1 || 3.17822020948e-31
tl || the_scope_of || 3.09881595871e-31
set_of_pred || carr || 3.03477795995e-31
monoid || is_succ_homomorphism || 3.02704586139e-31
im || bound_in0 || 3.01561963924e-31
bNF_Cardinal_cfinite || is_strongly_connected_in || 2.7444546113e-31
nat2 || len || 2.73725336351e-31
none || StoneBLattice || 2.73712904309e-31
cons || All || 2.69896426744e-31
rotate1 || Partial_Diff_Union || 2.54986125814e-31
pos || k19_finseq_1 || 2.50343420829e-31
pos || Sgm00 || 2.4904859686e-31
lattic1543629303tr_set || |-|0 || 2.4871540692e-31
splice || #bslash#; || 2.4034122959e-31
pos || Seq || 2.36622923224e-31
monoid || is_an_universal_closure_of || 2.29863726198e-31
complex2 || <=>2 || 2.28026772893e-31
eval || *35 || 2.22783707782e-31
rotate1 || Partial_Union || 2.18120948679e-31
complex2 || \&\4 || 2.17655417139e-31
bNF_Cardinal_cfinite || is_antisymmetric_in || 2.16639542409e-31
member2 || is_primitive_root_of_degree || 2.15542964964e-31
groups828474808id_set || is_succ_homomorphism || 2.15331519029e-31
semila1450535954axioms || ==>. || 2.13779336826e-31
none || StoneLatt || 2.07884576561e-31
null || |-6 || 2.04150158189e-31
bNF_Cardinal_cfinite || is_transitive_in || 1.98806946255e-31
none || the_Field_of_Quotients || 1.98144075825e-31
semilattice_order || ==>* || 1.98000232611e-31
distinct || Union0 || 1.96738223587e-31
nat_tr1645093318rphism || is_representatives_FS || 1.86830049235e-31
nat_tr1645093318rphism || is_min_depend || 1.86830049235e-31
hd || *49 || 1.83540475888e-31
remdups_adj || Partial_Diff_Union || 1.79756552896e-31
lexordp_eq || ==>* || 1.78695110528e-31
monoid_axioms || is_homomorphism1 || 1.78273041171e-31
bNF_Wellorder_compat || is_top_reducible_wrt || 1.76704340782e-31
bNF_Wellorder_wo_rel || is_strongly_quasiconvex_on || 1.75575440189e-31
append || #bslash#; || 1.72904624898e-31
monoid || <==>1 || 1.72685569059e-31
rev || Partial_Diff_Union || 1.70019023893e-31
basic_fsts || COM2 || 1.67698745642e-31
lattic1543629303tr_set || is_homomorphism1 || 1.64877341823e-31
nat2 || len1 || 1.62133610212e-31
bNF_Cardinal_cfinite || is_reflexive_in || 1.58825410485e-31
remdups_adj || Partial_Union || 1.57881314651e-31
induct_implies || max || 1.56914720533e-31
single || NeighborhoodSystem || 1.53505508329e-31
rev || Partial_Union || 1.52655484658e-31
can_select || is_proper_subformula_of1 || 1.39987241465e-31
remdups || Partial_Diff_Union || 1.34590471188e-31
set2 || <*..*>1 || 1.31838527695e-31
bNF_Wellorder_embed || has_a_Standard_Representation_of || 1.30879803846e-31
is_none || is_ringisomorph_to || 1.28012650346e-31
map_tailrec || NormRatF || 1.25668343479e-31
transitive_tranclp || bounded_metric || 1.23755112572e-31
remdups || Partial_Union || 1.20929696368e-31
lexordp2 || -->. || 1.15373429917e-31
monoid_axioms || |-|0 || 1.12770491443e-31
partial_flat_ord || inf2 || 1.12454205137e-31
list_ex1 || is_subformula_of || 1.11724708235e-31
eval || is_a_convergence_point_of || 1.05363001927e-31
product_fst || COM || 1.02162311241e-31
partial_flat_lub || lim_inf1 || 9.93536464999e-32
gen_length || #bslash#; || 9.73344983314e-32
wfP || is_metric_of || 9.56945862253e-32
member3 || is_complete0 || 9.09653059865e-32
antisym || is_strictly_quasiconvex_on || 9.07442436547e-32
distinct || |-6 || 8.83120714146e-32
empty || 0. || 8.6046089652e-32
partia17684980itions || <=1 || 8.1403698007e-32
map_tailrec || *^1 || 7.87266924265e-32
contained || is_minimal_in0 || 7.46068844754e-32
null || least_fix_point || 6.98820283047e-32
antisym || is_quasiconvex_on || 6.94567935006e-32
trans || is_strictly_quasiconvex_on || 6.93395008043e-32
hd || Union0 || 6.75123354486e-32
lattic1693879045er_set || ==>. || 6.70975393447e-32
map_tailrec || SCMaps || 6.70327037465e-32
contained || is_maximal_in0 || 6.6873917781e-32
set2 || \not\5 || 6.31016035231e-32
empty || [#hash#] || 6.00129283769e-32
abel_semigroup || commutes_with0 || 5.88703526625e-32
abel_semigroup || OrthoComplement_on || 5.88703526625e-32
id || id3 || 5.85577828428e-32
contained || <=\ || 5.66986779059e-32
trans || is_quasiconvex_on || 5.48555799485e-32
abel_s1917375468axioms || QuasiOrthoComplement_on || 5.29439265206e-32
abel_s1917375468axioms || commutes-weakly_with || 5.29439265206e-32
lexordp2 || ==>. || 5.2239027552e-32
empty || EmptyBag || 4.99181138799e-32
semiri1062155398ct_rel semiri882458588ct_rel || 0_NN VertexSelector 1 || 4.58191167935e-32
groups1716206716st_set || are_unifiable || 4.36586599528e-32
re || AllIso || 4.32285340396e-32
lexordp_eq || ==>. || 3.66283403067e-32
id2 || the_Field_of_Quotients || 3.48531580766e-32
is_empty2 || sup7 || 3.36427410361e-32
map || NF || 3.15763061248e-32
is_empty2 || sup1 || 3.09768905112e-32
code_integer_of_int || ProperPrefixes || 3.02395882099e-32
bNF_Wellorder_wo_rel || is_convex_on || 2.86017726174e-32
produc2004651681e_prod || #quote##bslash##slash##quote#7 || 2.83833003686e-32
contained || divides1 || 2.8356341327e-32
semilattice || are_anti-isomorphic || 2.74157888299e-32
map_option || .9 || 2.69816408011e-32
semigroup || QuasiOrthoComplement_on || 2.68121146117e-32
semigroup || commutes-weakly_with || 2.68121146117e-32
map_tailrec || sum || 2.61100909782e-32
set2 || iter_min || 2.49046497933e-32
code_nat_of_integer || succ0 || 2.44838819794e-32
re || `12 || 2.31882131333e-32
im || `4_4 || 2.27048756841e-32
semilattice || |=8 || 2.09493660277e-32
map || .9 || 2.04999051555e-32
groups387199878d_list || are_weakly-unifiable || 2.03820483714e-32
groups828474808id_set || are_weakly-unifiable || 1.94109217367e-32
null || lim_inf1 || 1.75594948777e-32
cnj || AllRetr || 1.72687050868e-32
cnj || AllCoretr || 1.72687050868e-32
partial_flat_lub || bool2 || 1.72031978366e-32
map || *\18 || 1.71767454673e-32
product_case_prod || |_| || 1.71651682788e-32
distinct || emp || 1.67927882078e-32
comm_monoid || are_unifiable || 1.58709525819e-32
map || UPS || 1.53525130661e-32
cnj || AllEpi || 1.40164433017e-32
cnj || AllMono || 1.40164433017e-32
partial_flat_ord || {..}21 || 1.39178147013e-32
antisym || is_embedded_in || 1.37151047649e-32
drop || at1 || 1.35917533557e-32
sym || is_embedded_in || 1.34739268204e-32
remdups_adj || core || 1.26950874849e-32
remdups || core || 1.25198396219e-32
partia17684980itions || c=1 || 1.25099849042e-32
semilattice_axioms || are_dual || 1.21210565046e-32
set2 || inf_net || 1.18654146145e-32
hd || the_left_argument_of || 1.17352203895e-32
right || GBP || 1.16445247034e-32
left || SBP || 1.1237379062e-32
comm_monoid_axioms || are_weakly-unifiable || 1.08700031383e-32
trans || is_embedded_in || 1.08353156254e-32
cons || \&\0 || 1.02612811796e-32
tl || the_right_argument_of || 1.01403762957e-32
map || * || 9.69617688068e-33
produc2004651681e_prod || #quote##slash##bslash##quote#3 || 8.77891131134e-33
nat_tr1645093318rphism || Mid0 || 8.05518983668e-33
lattic35693393ce_set || |-3 || 7.96453758157e-33
antisym || is_ringisomorph_to || 7.53268147491e-33
abel_semigroup || are_dual || 7.51075645032e-33
sym || is_ringisomorph_to || 7.45388811806e-33
lattic35693393ce_set || are_dual || 6.99184779813e-33
trans || is_ringisomorph_to || 6.52604794835e-33
abel_semigroup || |-3 || 6.20321349129e-33
nil || [#hash#]0 || 5.98696906278e-33
product_case_prod || |^| || 5.59375836021e-33
finite_folding_idem || is_succ_homomorphism || 5.53315374148e-33
lattic35693393ce_set || are_opposite || 5.41058684731e-33
append || *37 || 5.1629108155e-33
map || product2 || 5.12862075899e-33
rev || #quote#15 || 5.05107773869e-33
butlast || Non || 4.9838707202e-33
can_select || -28 || 4.61583392628e-33
semilattice_axioms || |-3 || 4.60787749591e-33
tl || Non || 4.47522121182e-33
finite1921348288axioms || is_homomorphism1 || 4.12755518007e-33
list_ex1 || +5 || 3.69021487646e-33
c_Predicate_Oeq || is_compared_to || 3.66684228667e-33
c_Predicate_Oeq || are_os_isomorphic || 3.66684228667e-33
insert3 || Plane3 || 3.52092726307e-33
abel_semigroup || is_strictly_convex_on || 3.40033297135e-33
contained || is-SuperConcept-of || 3.05381100438e-33
is_empty || r2_cat_6 || 3.04264132441e-33
transitive_trancl || MaxADSet || 2.80602846155e-33
re || arity || 2.76656602292e-33
pred_maxchain || -->. || 2.61375364872e-33
empty || +14 || 2.49014174927e-33
bot_bot || k19_cat_6 || 2.43471391526e-33
induct_implies || ^+ || 2.4310033977e-33
induct_implies || +^ || 2.4310033977e-33
null || is_SetOfSimpleGraphs_of || 2.3832797242e-33
finite_folding || is_homomorphism1 || 2.36979194533e-33
bot_bot || min || 2.36853996077e-33
member3 || #slash##slash#4 || 2.28952550585e-33
is_empty2 || .first() || 2.27977928479e-33
sum_projl || coefficient || 2.27721955438e-33
abel_s1917375468axioms || |=8 || 2.23706703023e-33
pred || k18_cat_6 || 2.22812120616e-33
code_integer_of_int || Col || 2.21412434788e-33
set2 || -27 || 2.20730558055e-33
set2 || .reverse() || 2.15473265764e-33
cons || ast4 || 2.13516129943e-33
set || *1 || 2.12812481793e-33
is_empty2 || .last() || 2.101259405e-33
bit1 || fsloc || 2.07189613117e-33
empty || Concept-with-all-Attributes || 1.97831396731e-33
bNF_Cardinal_cfinite || are_orthogonal || 1.97577467719e-33
nat2 || In_Power || 1.93997266809e-33
abel_s1917375468axioms || is_strongly_quasiconvex_on || 1.86474699045e-33
null || .first() || 1.83442522021e-33
null || .last() || 1.77540848964e-33
induct_conj || ^0 || 1.75334760782e-33
hd || adjs0 || 1.71386506341e-33
finite_psubset || %O || 1.56540250849e-33
pred_chain || ==>* || 1.55972919443e-33
semigroup || |=8 || 1.54656783109e-33
tl || the_base_of || 1.53270792039e-33
sum_Inl || |16 || 1.47217236108e-33
cons || *36 || 1.45894653511e-33
complex2 || const0 || 1.43002655475e-33
complex2 || succ3 || 1.43002655475e-33
nil || SIMPLEGRAPHS || 1.42625368748e-33
append || #slash##bslash#4 || 1.41208537282e-33
bit0 || intloc || 1.35402331964e-33
id || id5 || 1.34735702947e-33
induct_implies || (#hash#)18 || 1.33247198504e-33
nil || +14 || 1.29907526906e-33
complex2 || proj5 || 1.28398828123e-33
upto || pi_1 || 1.27790387593e-33
transitive_rtrancl || Cl || 1.2370338164e-33
adjunct || +8 || 1.20405703845e-33
bNF_Cardinal_cone || <e3> || 1.16138727072e-33
semigroup || is_strongly_quasiconvex_on || 1.15006066731e-33
join || +89 || 1.13990010036e-33
linorder_sorted || are_isomorphic3 || 1.10514538726e-33
predicate_contains || |=7 || 1.08539056935e-33
distinct || are_isomorphic3 || 1.01583433449e-33
set_of_seq || * || 9.96708289637e-34
upt || pi_1 || 9.91888988802e-34
pred_list || in1 || 9.8384541486e-34
listsp || in1 || 9.70259462791e-34
abel_s1917375468axioms || is_convex_on || 9.69789787778e-34
int || INT.Group1 || 9.36796650835e-34
listrel1 || .:14 || 8.99201595016e-34
removeAll || #bslash##slash# || 8.91535845093e-34
pred_chain || ==>. || 8.84195543063e-34
set || SmallestPartition || 8.54274868544e-34
dropWhile || #bslash##slash# || 8.33653414546e-34
remove1 || #bslash##slash# || 8.29956076679e-34
product_unit || <e1> || 8.29344910277e-34
null || *49 || 8.23191961245e-34
finite_finite2 || r2_cat_6 || 8.21401482273e-34
none || +14 || 8.15123435755e-34
takeWhile || #bslash##slash# || 8.10834650453e-34
trans || is_finer_than || 8.01547533432e-34
semilattice || |-3 || 7.84817965202e-34
drop || #bslash##slash# || 7.72237784829e-34
take || #bslash##slash# || 7.54796788045e-34
semilattice || is_elementary_subsystem_of || 7.51848312982e-34
pred_of_seq || * || 7.45189516678e-34
transitive_rtrancl || Int || 7.44405455623e-34
can_select || in1 || 7.42677499281e-34
filter2 || #bslash##slash# || 7.40988231307e-34
pred || *1 || 7.37891779307e-34
distinct || is_SetOfSimpleGraphs_of || 7.22838439133e-34
semigroup || is_convex_on || 7.2187486835e-34
set || k18_cat_6 || 7.1659450487e-34
nat || INT.Group1 || 7.11298986509e-34
map_option || .12 || 6.90253605525e-34
diffs || <X> || 6.8978959934e-34
set_option || * || 6.51405644331e-34
pred_maxchain || ==>. || 6.43744271182e-34
wf || `5 || 6.33406541814e-34
listrel1 || ~7 || 6.25684362762e-34
induct_conj || +23 || 6.25631329018e-34
abel_semigroup || |=8 || 5.96737015806e-34
induct_conj || +100 || 5.91447222759e-34
induct_conj || -5 || 5.73961976148e-34
set2 || * || 5.58432939061e-34
wf || is_finer_than || 5.5770102003e-34
abel_semigroup || are_anti-isomorphic || 5.54507899458e-34
list_ex1 || c=1 || 5.51074925263e-34
rev || -20 || 5.4870205498e-34
is_empty2 || +75 || 5.45450419991e-34
wf || \not\3 || 5.35093233368e-34
is_empty2 || ?0 || 5.29645282678e-34
induct_implies || *147 || 5.27271170747e-34
map || .12 || 5.242184676e-34
lattic35693393ce_set || |=8 || 5.23476403489e-34
is_empty || ~= || 5.21969980474e-34
coset || * || 5.14524585897e-34
bNF_Cardinal_cone || <e2> || 5.13423876986e-34
divmod_nat || k5_msafree4 || 5.10973056166e-34
list || .:7 || 5.08851861488e-34
member3 || is_formal_provable_from || 4.80197732506e-34
bot_bot || k18_cat_6 || 4.77455427965e-34
pred || k19_cat_6 || 4.58607960081e-34
empty || {$} || 4.46231804355e-34
finite_psubset || {..}1 || 4.35891402287e-34
equiv_equivp || commutes_with0 || 4.35047458833e-34
equiv_equivp || OrthoComplement_on || 4.35047458833e-34
contained || c=5 || 4.30629507239e-34
monoid || Top\ || 4.2551448996e-34
set2 || bool2 || 4.08419509028e-34
product_unit || <e2> || 4.03021688262e-34
top_top || min || 3.96533042065e-34
is_empty2 || .edgesBetween || 3.95081533533e-34
semilattice || are_opposite || 3.848782355e-34
list || ~0 || 3.75387212326e-34
induct_implies || .|. || 3.62748402022e-34
semilattice_neutr || Top\ || 3.52680019145e-34
semilattice_axioms || <==>0 || 3.4994114074e-34
null || the_Edges_of0 || 3.20732580895e-34
semilattice_axioms || |=8 || 3.18896479559e-34
monoid || Bot\ || 3.17843968454e-34
fcomp || *20 || 3.14162263207e-34
equiv_equivp || is_strictly_convex_on || 3.06225748723e-34
groups1716206716st_set || is_succ_homomorphism || 2.95936458538e-34
divmod_nat_rel || |=4 || 2.94233907894e-34
null2 || is_SetOfSimpleGraphs_of || 2.90914377984e-34
abel_s1917375468axioms || are_dual || 2.88154180111e-34
map_tailrec || TolSets || 2.73410171492e-34
semilattice_neutr || Bot\ || 2.69235109341e-34
semiri1062155398ct_rel semiri882458588ct_rel || VLabelSelector 7 || 2.66981599333e-34
groups_monoid_list || Top || 2.64852863681e-34
set2 || ?0 || 2.55950192459e-34
set2 || +75 || 2.5586407378e-34
equiv_part_equivp || QuasiOrthoComplement_on || 2.44767020438e-34
equiv_part_equivp || commutes-weakly_with || 2.44767020438e-34
semilattice || is_definable_in || 2.33348343399e-34
abel_semigroup || <==>0 || 2.19953331873e-34
cos_coeff || <e1> || 2.12836889276e-34
cos_coeff || <e2> || 2.12836889276e-34
cos_coeff || <e3> || 2.12836889276e-34
sin_coeff || <e1> || 2.10390726604e-34
sin_coeff || <e2> || 2.10390726604e-34
sin_coeff || <e3> || 2.10390726604e-34
pcr_literal cr_literal || 0_NN VertexSelector 1 || 2.079435744e-34
lattic1543629303tr_set || Top || 2.07010416381e-34
lattic35693393ce_set || <==>0 || 2.05169628617e-34
sum_Sumr || SIGMA || 1.98348725532e-34
sum_Suml || SIGMA || 1.98348725532e-34
empty || SIMPLEGRAPHS || 1.94484223097e-34
groups_monoid_list || Bottom || 1.93545761521e-34
reflp || QuasiOrthoComplement_on || 1.8930394844e-34
reflp || commutes-weakly_with || 1.8930394844e-34
semigroup || are_dual || 1.83649818964e-34
groups828474808id_set || is_homomorphism1 || 1.82236955797e-34
id2 || StoneBLattice || 1.79313342121e-34
groups387199878d_list || is_homomorphism1 || 1.69852351127e-34
semilattice_axioms || are_anti-isomorphic || 1.68893411293e-34
map_tailrec || -LeftIdeal || 1.67536893562e-34
map_tailrec || -RightIdeal || 1.67536893562e-34
predicate_contains || is_continuous_on7 || 1.66153153973e-34
predicate_contains || is_continuous_on9 || 1.66153153973e-34
set2 || the_Vertices_of0 || 1.62367328216e-34
finite_finite2 || ~= || 1.57436600944e-34
lattic35693393ce_set || are_anti-isomorphic || 1.55034172535e-34
lattic1543629303tr_set || Bottom || 1.54741840963e-34
set || k19_cat_6 || 1.52262029626e-34
abel_s1917375468axioms || |-3 || 1.45975010415e-34
comm_monoid || is_succ_homomorphism || 1.45483412945e-34
induct_conj || - || 1.29638680184e-34
comm_monoid_axioms || is_homomorphism1 || 1.26821825356e-34
semilattice_axioms || is_parametrically_definable_in || 1.25429744011e-34
induct_conj || + || 1.22743133086e-34
real || <e1> || 1.18914928736e-34
real || <e2> || 1.18914928736e-34
real || <e3> || 1.18914928736e-34
induct_implies || * || 1.13842871796e-34
equiv_part_equivp || is_strongly_quasiconvex_on || 1.13646253091e-34
semigroup || |-3 || 1.13573380013e-34
nat_tr1645093318rphism || is_the_direct_sum_of || 1.12596736087e-34
distinct || -20 || 1.10849667934e-34
bNF_Wellorder_wo_rel || c= || 1.07576896398e-34
predicate_contains || is_Lipschitzian_on4 || 1.0604422352e-34
map || -Ideal || 1.03816214589e-34
fun_is_measure || <= || 1.03181670454e-34
comm_monoid || is_an_accumulation_point_of || 9.78058671745e-35
map || CohSp || 9.77661019931e-35
id_on || lcm || 9.71432121253e-35
id2 || StoneLatt || 9.71311701362e-35
finite_finite2 || c=0 || 9.59558021927e-35
reflp || is_strongly_quasiconvex_on || 9.45839882827e-35
find || |^1 || 9.42356169722e-35
groups387199878d_list || is_a_condensation_point_of || 9.03947959417e-35
antisym || are_isomorphic1 || 8.9412406642e-35
sym || are_isomorphic1 || 8.82055993855e-35
predicate_contains || is_Lipschitzian_on0 || 8.68057745104e-35
set2 || +^1 || 8.63150121242e-35
trans || divides0 || 8.10261210215e-35
member3 || is_Lipschitzian_on6 || 7.92771622057e-35
member3 || is_Lipschitzian_on5 || 7.92771622057e-35
rotate || +26 || 7.66944373102e-35
sup_sup || .4 || 7.59384376022e-35
abel_semigroup || is_parametrically_definable_in || 7.58143220759e-35
inf_inf || .4 || 7.47338665946e-35
trans || are_isomorphic1 || 7.45409489311e-35
equiv_part_equivp || is_convex_on || 7.06869473862e-35
lattic35693393ce_set || is_parametrically_definable_in || 7.0381971244e-35
finite_comp_fun_idem || are_unifiable || 6.81505080198e-35
semila478527537_order || congr || 6.81305689402e-35
groups387199878d_list || is_immediate_constituent_of1 || 6.7325214629e-35
comm_monoid || is_an_UPS_retraction_of || 6.65352806387e-35
lattic2109816131tr_set || parallelogram || 6.55048842284e-35
pcr_real cr_real || 0_NN VertexSelector 1 || 6.43405809905e-35
union || +26 || 6.35252347951e-35
finite852775215axioms || are_weakly-unifiable || 6.34744654343e-35
reflp || is_convex_on || 6.26426225651e-35
nil || card0 || 6.19726330646e-35
semilattice || is_right_differentiable_in || 6.17767236374e-35
semilattice || is_left_differentiable_in || 6.17767236374e-35
suc_Rep || prop || 6.04753293877e-35
none || 1_ || 5.93284176774e-35
im || CutLastLoc || 5.82573104024e-35
map_tailrec || ConstantNet || 5.7920476096e-35
groups_monoid_list || is_an_accumulation_point_of || 5.67085501288e-35
pcr_rat cr_rat || 0_NN VertexSelector 1 || 5.62879009632e-35
nil || k2_nbvectsp || 5.61667990612e-35
semilattice_neutr || is_a_condensation_point_of || 5.54649465472e-35
sum_Sumr || |--2 || 5.4254581202e-35
sum_Suml || |--2 || 5.4254581202e-35
complex2 || stop || 5.35584945003e-35
groups387199878d_list || are_divergent<=1_wrt || 5.3324342021e-35
nat_tr1645093318rphism || is_epimorphism || 5.31923888105e-35
append || +26 || 5.12522595231e-35
semilattice_axioms || is_Lcontinuous_in || 5.05373418005e-35
semilattice_axioms || is_Rcontinuous_in || 5.05373418005e-35
re || E-bound || 4.98789211685e-35
re || W-bound || 4.98789211685e-35
pcr_int cr_int || 0_NN VertexSelector 1 || 4.95470964933e-35
gen_length || .75 || 4.94295734404e-35
semilattice || are_dual || 4.75985501835e-35
set || B-meet || 4.73785456094e-35
set || B-join || 4.73785456094e-35
insert || +26 || 4.68691183247e-35
groups387199878d_list || is_a_retraction_of || 4.63659850139e-35
measure || MSSign0 || 4.57419093869e-35
pred_option || is_dependent_of || 4.55077171146e-35
finite_psubset || -SUP_category || 4.28005488854e-35
complex2 || =>5 || 4.20213811077e-35
semiri1062155398ct_rel semiri882458588ct_rel || ELabelSelector 6 || 4.18848963049e-35
cnj || North_Arc || 4.18720764143e-35
cnj || South_Arc || 4.18720764143e-35
induct_conj || mod || 4.09481895353e-35
antisym || divides0 || 4.03114968738e-35
comm_monoid || are_divergent_wrt || 4.01379361343e-35
id2 || abs || 3.9980531132e-35
sym || divides0 || 3.99175732219e-35
semilattice_neutr || is_immediate_constituent_of1 || 3.91084407888e-35
zero_Rep || VERUM2 || 3.83908921571e-35
set || minfuncreal || 3.78839316884e-35
set || maxfuncreal || 3.78839316884e-35
member3 || is_continuous_on8 || 3.70771149306e-35
code_Suc || sort_d || 3.54329220128e-35
code_Suc || sort_a || 3.54329220128e-35
splice || .75 || 3.49651657004e-35
transitive_tranclp || ChangeVal_2 || 3.41302265814e-35
groups_monoid_list || is_an_UPS_retraction_of || 3.41144637398e-35
append || +93 || 3.38790879004e-35
append || +74 || 3.38790879004e-35
monoid || is_a_condensation_point_of || 3.3614655433e-35
wf || can_be_characterized_by || 3.24923642563e-35
pos || ComplRelStr || 3.23157000337e-35
comm_monoid || is_proper_subformula_of1 || 3.22768694594e-35
re || the_consequent_of || 3.18787822698e-35
groups828474808id_set || |-|0 || 3.16286434562e-35
code_pcr_natural code_cr_natural || 0_NN VertexSelector 1 || 3.1332665563e-35
im || the_left_side_of || 3.07276334085e-35
semilattice_neutr || is_a_retraction_of || 3.03120687462e-35
semilattice_neutr || are_divergent<=1_wrt || 3.02802347179e-35
member3 || is_continuous_on3 || 2.96824747783e-35
map_tailrec || |^ || 2.95979112963e-35
groups1716206716st_set || is_an_universal_closure_of || 2.94077274126e-35
comm_monoid || is_subformula_of || 2.92825926959e-35
monoid || is_immediate_constituent_of1 || 2.89851174541e-35
code_integer_of_int || ComplRelStr || 2.8863123408e-35
wfP || is_expressible_by || 2.86500059232e-35
map || Lim0 || 2.85865687379e-35
measures || MSSign0 || 2.7756415602e-35
c_Predicate_Oeq || are_not_conjugated0 || 2.75305500352e-35
c_Predicate_Oeq || are_not_conjugated1 || 2.75305500352e-35
c_Predicate_Oeq || is_parallel_to || 2.75305500352e-35
groups_monoid_list || k3_prefer_1 || 2.75280858111e-35
groups387199878d_list || are_convergent<=1_wrt || 2.68195539243e-35
suc || sort_d || 2.67700681241e-35
suc || sort_a || 2.67700681241e-35
abel_semigroup || is_Lcontinuous_in || 2.63685670364e-35
abel_semigroup || is_Rcontinuous_in || 2.63685670364e-35
groups_monoid_list || are_divergent_wrt || 2.61652056226e-35
semilattice || are_isomorphic6 || 2.57903309279e-35
monoid || k2_prefer_1 || 2.56416258883e-35
cnj || Upper_Arc || 2.50617415826e-35
append || .75 || 2.50187693568e-35
cnj || Lower_Arc || 2.50022605134e-35
cons || #quote##slash##bslash##quote#2 || 2.49186557991e-35
removeAll || *\3 || 2.48315503894e-35
finite100568337ommute || are_weakly-unifiable || 2.47111735752e-35
set2 || inf || 2.46768145524e-35
lattic35693393ce_set || is_Lcontinuous_in || 2.40602721452e-35
lattic35693393ce_set || is_Rcontinuous_in || 2.40602721452e-35
groups_monoid_list || is_proper_subformula_of1 || 2.33725446174e-35
code_natural_of_nat || -25 || 2.32005677156e-35
nat_tr1645093318rphism || represents || 2.31870751643e-35
nat_tr1645093318rphism || r5_gtarski1 || 2.31870751643e-35
nat_tr1645093318rphism || represents0 || 2.31870751643e-35
nat_tr1645093318rphism || represents1 || 2.31870751643e-35
removeAll || *112 || 2.30828137719e-35
removeAll || *140 || 2.30828137719e-35
finite_psubset || denominator0 || 2.2422555416e-35
code_nat_of_natural || -25 || 2.21059358875e-35
groups828474808id_set || is_a_condensation_point_of || 2.20344508309e-35
groups_monoid_list || is_subformula_of || 2.14322994966e-35
id2 || -0 || 2.13762269121e-35
member3 || is_>=_than || 2.12643459768e-35
neg2 || are_equivalence_wrt || 2.09554628178e-35
listrel1 || opp || 2.05241020459e-35
monoid || are_divergent<=1_wrt || 2.02207117272e-35
trans || are_anti-isomorphic || 2.01986801928e-35
listMem || [=0 || 1.98168904191e-35
nat || VLabelSelector 7 || 1.96810073162e-35
antisym || is_finer_than || 1.93193138938e-35
comm_monoid || are_convergent_wrt || 1.90689389169e-35
groups1716206716st_set || <==>1 || 1.89726739867e-35
nil || Bot || 1.8724667533e-35
comm_monoid || is_an_universal_closure_of || 1.80465912847e-35
transitive_trancl || lcm || 1.78194408952e-35
lattic2109816131tr_set || parallelogram0 || 1.77905282156e-35
implode str || 0_NN VertexSelector 1 || 1.7736846309e-35
antisym || tolerates || 1.76486528215e-35
filter2 || *\3 || 1.75665849681e-35
groups387199878d_list || |-|0 || 1.72579700924e-35
set2 || -20 || 1.71469141396e-35
semila478527537_order || congr0 || 1.6841767253e-35
transitive_rtrancl || lcm || 1.67722151844e-35
wf || are_anti-isomorphic || 1.66098687605e-35
monoid || is_a_retraction_of || 1.63853163309e-35
bNF_Ca1495478003natLeq || 10 || 1.6290826751e-35
trans || tolerates || 1.60058310987e-35
trans || are_relative_prime || 1.59505020644e-35
lattic1543629303tr_set || is_an_accumulation_point_of || 1.5918017487e-35
nat_of_num || -25 || 1.58798606512e-35
nat2 || cliquecover#hash# || 1.55328686816e-35
wf || id2 || 1.55096500156e-35
set || -INF_category || 1.54102152467e-35
re || signature || 1.54053132947e-35
comm_monoid || is_derivable_from || 1.51473029436e-35
semilattice_neutr || are_convergent<=1_wrt || 1.51029143422e-35
finite_psubset || denominator || 1.49897267281e-35
comm_monoid_axioms || |-|0 || 1.48712375934e-35
finite_folding_idem || is_an_universal_closure_of || 1.48699600466e-35
filter2 || *112 || 1.46681370347e-35
filter2 || *140 || 1.46681370347e-35
set2 || +` || 1.46453949819e-35
monoid_axioms || is_an_accumulation_point_of || 1.45654931211e-35
set2 || exp4 || 1.4562176168e-35
nat2 || chromatic#hash# || 1.4515977056e-35
finite_folding_idem || is_immediate_constituent_of1 || 1.43243489014e-35
order_well_order_on || r7_absred_0 || 1.41506073348e-35
semilattice || Top\ || 1.39830376326e-35
groups828474808id_set || is_a_retraction_of || 1.35843171678e-35
nat2 || clique#hash# || 1.32378422503e-35
comm_monoid || <==>1 || 1.32366134852e-35
nat2 || stability#hash# || 1.31018881145e-35
less_than || 10 || 1.30672168447e-35
code_nat_of_integer || cliquecover#hash# || 1.29755503379e-35
list || opp0 || 1.29118200469e-35
code_pcr_integer code_cr_integer || 0_NN VertexSelector 1 || 1.28542883968e-35
semilattice_axioms || are_equivalent1 || 1.28000526299e-35
complex2 || FreeUnivAlgZAO || 1.26111014355e-35
groups_monoid_list || are_convergent_wrt || 1.25676169059e-35
none || %O || 1.25623623727e-35
wf || are_relative_prime || 1.24601552383e-35
inc || sort_d || 1.18679887973e-35
inc || sort_a || 1.18679887973e-35
finite1921348288axioms || |-|0 || 1.17570462167e-35
groups828474808id_set || is_immediate_constituent_of1 || 1.15609959152e-35
order_well_order_on || r13_absred_0 || 1.15341450245e-35
order_well_order_on || r12_absred_0 || 1.15341450245e-35
groups387199878d_list || ==>1 || 1.15145521062e-35
code_nat_of_integer || chromatic#hash# || 1.1445892549e-35
bNF_Ca646678531ard_of || k5_msafree4 || 1.1304646163e-35
nat_of_num || cliquecover#hash# || 1.105802254e-35
none || SmallestPartition || 1.08076437772e-35
semilattice || Bot\ || 1.07988878804e-35
groups_monoid_list || D-Meet || 1.055953539e-35
groups_monoid_list || D-Union || 1.055953539e-35
code_nat_of_integer || clique#hash# || 1.03068388343e-35
groups828474808id_set || are_divergent<=1_wrt || 1.02574508524e-35
monoid || are_convergent<=1_wrt || 1.01482654065e-35
cons || #quote##bslash##slash##quote#3 || 1.01434696199e-35
code_nat_of_integer || stability#hash# || 1.01291380158e-35
comm_monoid || are_coplane || 1.00924738737e-35
nat_of_num || chromatic#hash# || 1.0011259354e-35
lattic1543629303tr_set || is_an_UPS_retraction_of || 9.68541464948e-36
map || -root || 9.57689179412e-36
bNF_Ca1811156065der_on || r5_absred_0 || 9.57383593152e-36
contained || is_finer_than0 || 9.53115680057e-36
code_int_of_integer || sqr || 9.31150499173e-36
nat_of_num || clique#hash# || 9.1300936134e-36
nat_of_num || stability#hash# || 9.00231817091e-36
finite_folding_idem || <==>1 || 8.89253229667e-36
semiri1062155398ct_rel semiri882458588ct_rel || WeightSelector 5 || 8.5964143342e-36
bNF_Ca1811156065der_on || r1_absred_0 || 8.57507871119e-36
nat2 || Sum || 8.51048715716e-36
lattic35693393ce_set || Top || 8.5000229698e-36
finite_folding_idem || are_divergent<=1_wrt || 8.24369340088e-36
monoid_axioms || is_an_UPS_retraction_of || 8.23361137561e-36
abel_semigroup || are_equivalent1 || 8.11260997011e-36
groups_monoid_list || is_derivable_from || 7.94780087048e-36
finite_folding || |-|0 || 7.80767482354e-36
bNF_Wellorder_compat || congr || 7.75803265859e-36
map || exp || 7.73801042999e-36
semilattice_neutr || k2_prefer_1 || 7.70889375139e-36
set || numerator0 || 7.68080554584e-36
lattic35693393ce_set || are_equivalent1 || 7.57652866606e-36
semilattice_neutr || ==>1 || 7.46918283926e-36
lattic1543629303tr_set || k3_prefer_1 || 7.39475530013e-36
lattic1543629303tr_set || are_divergent_wrt || 7.37153895748e-36
lattic1543629303tr_set || is_proper_subformula_of1 || 7.21238769844e-36
complex2 || FreeUnivAlgNSG || 7.20794943136e-36
bNF_Ca1811156065der_on || r6_absred_0 || 7.14217059782e-36
induct_implies || \&\2 || 7.13204481279e-36
map || -Root || 7.09862333065e-36
comm_monoid || Top\ || 7.03461561168e-36
lattic2109816131tr_set || congr || 7.01813159669e-36
monoid_axioms || are_divergent_wrt || 6.92136725907e-36
monoid_axioms || is_proper_subformula_of1 || 6.8872168196e-36
semilattice || is_metric_of || 6.88635403286e-36
lattic1543629303tr_set || is_subformula_of || 6.74754335144e-36
sum_Sumr || .88 || 6.72440963873e-36
sum_Suml || .88 || 6.72440963873e-36
code_nat_of_natural || min || 6.54628116249e-36
set || numerator || 6.49724398612e-36
lattic35693393ce_set || Bottom || 6.43648420069e-36
cons || NextLoc || 6.39894547738e-36
single || wayabove || 6.39648059971e-36
nil || I_el || 6.36785517193e-36
pos2 || are_equivalence_wrt || 6.36218949307e-36
monoid_axioms || is_subformula_of || 6.3300737454e-36
cons || .pathBetween || 6.24497425598e-36
transitive_acyclic || are_dual || 6.22435359234e-36
trans || are_relative_prime0 || 6.19004231185e-36
monoid || the_value_of || 6.17769912481e-36
monoid || CLD-Union || 6.1083161972e-36
monoid || OPD-Union || 6.1083161972e-36
monoid || CLD-Meet || 6.1083161972e-36
monoid || OPD-Meet || 6.1083161972e-36
bNF_Wellorder_wo_rel || are_opposite || 6.05781000324e-36
gen_length || +26 || 6.04713859476e-36
lexordp_eq || are_equivalence_wrt || 5.94423358473e-36
map_tailrec || -Root || 5.93015754077e-36
pred_nat || 10 || 5.77969111282e-36
comm_monoid || Bot\ || 5.6457979991e-36
groups387199878d_list || #slash##slash#8 || 5.57487368737e-36
rep_filter || id$0 || 5.52623136827e-36
rep_filter || id$1 || 5.52623136827e-36
complex2 || :-> || 5.44422594881e-36
wf || are_relative_prime0 || 5.41646708667e-36
finite_folding_idem || are_convergent<=1_wrt || 5.38184059689e-36
semila478527537_order || \||\3 || 5.36032952324e-36
order_well_order_on || r11_absred_0 || 5.33208638268e-36
bNF_Wellorder_embed || parallelogram || 5.2478557737e-36
splice || +26 || 5.19807706941e-36
rep_filter || ID0 || 5.09545442474e-36
empty || {}0 || 5.09171845733e-36
groups_monoid_list || k1_rvsum_3 || 5.06912703362e-36
groups828474808id_set || are_convergent<=1_wrt || 4.99654342803e-36
antisym || are_relative_prime || 4.94899021956e-36
code_Nat || |....| || 4.89636561384e-36
bNF_Ca1811156065der_on || r2_absred_0 || 4.89615305636e-36
eval || is_>=_than || 4.87157858514e-36
splice || \xor\3 || 4.72836093716e-36
code_n1042895779nteger || |....| || 4.58063465996e-36
bNF_Ca829732799finite || are_relative_prime || 4.54977975413e-36
groups_monoid_list || are_coplane || 4.52788215666e-36
pred_list || \<\ || 4.41713935377e-36
groups1716206716st_set || is_immediate_constituent_of1 || 4.38139121891e-36
listsp || \<\ || 4.36416400909e-36
trans || ex_inf_of || 4.3476065639e-36
order_well_order_on || |=4 || 4.33454935742e-36
hd || .first() || 4.24382022643e-36
is_none || |-6 || 4.23240587835e-36
groups387199878d_list || |=7 || 4.20113837232e-36
induct_conj || \xor\ || 4.17331326602e-36
monoid || ==>1 || 4.10874936756e-36
bNF_Ca1811156065der_on || |=4 || 4.07097082536e-36
produc2004651681e_prod || #quote##bslash##slash##quote#4 || 4.04297153071e-36
bNF_Ca1811156065der_on || r3_absred_0 || 3.93416761286e-36
semilattice_neutr || #slash##slash#8 || 3.86697808909e-36
groups828474808id_set || Top || 3.82049282854e-36
product_case_prod || max11 || 3.73309234639e-36
tl || .last() || 3.63948519873e-36
comm_monoid || |-2 || 3.63816173602e-36
semilattice_neutr || the_value_of || 3.59007844364e-36
finite1921348288axioms || is_proper_subformula_of1 || 3.56809824412e-36
lattic1543629303tr_set || are_convergent_wrt || 3.56735159892e-36
bNF_Wellorder_wo_rel || is_strictly_convex_on || 3.48462506923e-36
nil || ZERO || 3.46470292655e-36
produc2004651681e_prod || #quote##slash##bslash##quote#1 || 3.44777524027e-36
induct_conj || \or\3 || 3.43934219224e-36
sum_isl || [=0 || 3.42617070955e-36
id_on || uparrow0 || 3.41735983654e-36
semilattice_axioms || is_a_pseudometric_of || 3.39629611912e-36
monoid_axioms || are_convergent_wrt || 3.31204038411e-36
lattic1543629303tr_set || D-Meet || 3.27997031568e-36
lattic1543629303tr_set || D-Union || 3.27997031568e-36
finite1921348288axioms || is_subformula_of || 3.27699904808e-36
trans || ex_sup_of || 3.24781558661e-36
groups828474808id_set || ==>1 || 3.24732405578e-36
product_case_prod || min15 || 3.2101740307e-36
append || \xor\3 || 3.08766627289e-36
finite1921348288axioms || are_divergent_wrt || 3.0184712162e-36
groups387199878d_list || are_critical_wrt || 3.01746349717e-36
groups828474808id_set || Bottom || 3.01157718831e-36
order_well_order_on || r3_absred_0 || 3.00267893833e-36
set2 || charact_set || 2.96867850962e-36
pos || Column_Marginal || 2.88368450606e-36
divmod_nat || GPart || 2.87500966415e-36
finite_folding || is_proper_subformula_of1 || 2.83808964161e-36
ii || ConwayZero0 || 2.7732781254e-36
single || waybelow || 2.77129409688e-36
id2 || carrier || 2.74142664248e-36
rotate1 || Dependency-closure || 2.73525492355e-36
groups_monoid_list || k2_rvsum_3 || 2.71107605158e-36
lattic1543629303tr_set || k1_rvsum_3 || 2.6832811033e-36
finite_folding || is_subformula_of || 2.64944847973e-36
pred3 || .:13 || 2.63124629808e-36
id_on || downarrow0 || 2.59805003911e-36
comm_monoid || [= || 2.58641938553e-36
semilattice || ~= || 2.55201182789e-36
im || Product5 || 2.54103406419e-36
sum_Inl || #quote##bslash##slash##quote#3 || 2.53962509045e-36
abs_filter || dom10 || 2.5350873843e-36
abs_filter || cod6 || 2.5350873843e-36
abs_filter || dom9 || 2.5350873843e-36
abs_filter || cod7 || 2.5350873843e-36
bNF_Ca1811156065der_on || r10_absred_0 || 2.53178575786e-36
product_Unity || the_empty_category || 2.52357048945e-36
semilattice_neutr || |=7 || 2.51170606955e-36
uminus_uminus || the_Tree_of0 || 2.45606050396e-36
contained || is_automorphism_of || 2.3680595173e-36
im || Sum21 || 2.35487413095e-36
lattic1543629303tr_set || is_derivable_from || 2.29982500533e-36
nat_of_num || SumAll || 2.2914917351e-36
bNF_Ca1811156065der_on || r11_absred_0 || 2.28921394911e-36
remdups || `5 || 2.28528935291e-36
transitive_tranclp || -are_isomorphic || 2.28419461163e-36
is_empty2 || Lim_K || 2.26064418804e-36
filter2 || <=>3 || 2.2496946302e-36
groups_monoid_list || |-2 || 2.2186643548e-36
finite_folding || are_divergent_wrt || 2.21137932635e-36
eval || is_>=_than0 || 2.19801989976e-36
abel_semigroup || is_a_pseudometric_of || 2.18250080388e-36
is_filter || c= || 2.12472419662e-36
none || TAUT || 2.12028194681e-36
monoid || k2_rvsum_3 || 2.08452030299e-36
semilattice_neutr || CLD-Union || 2.05256499049e-36
semilattice_neutr || OPD-Union || 2.05256499049e-36
semilattice_neutr || CLD-Meet || 2.05256499049e-36
semilattice_neutr || OPD-Meet || 2.05256499049e-36
eval || .:14 || 2.0462382477e-36
lattic35693393ce_set || is_a_pseudometric_of || 2.04190738359e-36
transitive_rtrancl || uparrow0 || 2.03243977229e-36
bNF_Ca1811156065der_on || r8_absred_0 || 1.99781155669e-36
divmod_nat_rel || is_dependent_of || 1.99280267918e-36
transitive_rtranclp || -are_equivalent || 1.96474963993e-36
divmod_nat || *\28 || 1.94245658013e-36
semilattice_axioms || are_equivalent || 1.93716563898e-36
monoid_axioms || is_derivable_from || 1.92616364803e-36
abs_filter || cod0 || 1.9172774783e-36
abs_filter || dom3 || 1.9172774783e-36
groups828474808id_set || #slash##slash#8 || 1.91374599064e-36
basic_fsts || \or\2 || 1.8975889127e-36
bNF_Ca1811156065der_on || r4_absred_0 || 1.89266290843e-36
null || lim_inf2 || 1.88653913146e-36
order_well_order_on || r10_absred_0 || 1.87365247942e-36
member3 || \<\ || 1.86848876923e-36
finite1921348288axioms || are_convergent_wrt || 1.85804408082e-36
antisym || are_anti-isomorphic || 1.84204821112e-36
pred3 || .:14 || 1.83781971369e-36
monoid || #slash##slash#8 || 1.82996113887e-36
comm_monoid || are_convertible_wrt || 1.76533559236e-36
map_le || is_naturally_transformable_to || 1.75899109621e-36
comm_monoid || is_immediate_constituent_of1 || 1.72628311404e-36
im || Union || 1.71226970924e-36
comm_monoid || << || 1.66471941434e-36
antisym || ex_inf_of || 1.6626103061e-36
complex || k5_ordinal1 || 1.65284546352e-36
sym || ex_inf_of || 1.64671543686e-36
semilattice_neutr || are_critical_wrt || 1.64586453548e-36
monoid || |=7 || 1.5743787328e-36
remdups_adj || Dependency-closure || 1.56513011274e-36
eval || .:13 || 1.56088280182e-36
finite852775215axioms || is_homomorphism1 || 1.55124594662e-36
finite_folding_idem || is_a_condensation_point_of || 1.54916871499e-36
transitive_rtrancl || downarrow0 || 1.52655366822e-36
rev || Dependency-closure || 1.49508172599e-36
insert || <=>3 || 1.4941416481e-36
product_fst || \&\1 || 1.48607215448e-36
lattic1543629303tr_set || k2_rvsum_3 || 1.483312646e-36
cnj || {..}1 || 1.46724104462e-36
append || +102 || 1.4483067488e-36
finite_folding_idem || are_critical_wrt || 1.44436807693e-36
order_well_order_on || r8_absred_0 || 1.41374340569e-36
antisym || is_strongly_quasiconvex_on || 1.41236248433e-36
distinct || charact_set || 1.41175224102e-36
finite_folding || are_convergent_wrt || 1.38451176587e-36
antisym || ex_sup_of || 1.34980192851e-36
finite_comp_fun_idem || is_succ_homomorphism || 1.33923901092e-36
sym || ex_sup_of || 1.33761527818e-36
pred_option || |-5 || 1.33429062291e-36
lattic1543629303tr_set || are_coplane || 1.32874218555e-36
rev || `5 || 1.3171239366e-36
transitive_trancl || uparrow || 1.31158706888e-36
rep_filter || ^7 || 1.2949306054e-36
order_well_order_on || r4_absred_0 || 1.21053931406e-36
groups_monoid_list || are_convertible_wrt || 1.20738172198e-36
bNF_Wellorder_compat || congr0 || 1.20050726222e-36
groups828474808id_set || is_proper_subformula_of1 || 1.19401891184e-36
trans || is_strongly_quasiconvex_on || 1.16660300928e-36
semilattice_neutr || k2_rvsum_3 || 1.1516184122e-36
monoid || are_critical_wrt || 1.12955048722e-36
groups828474808id_set || is_subformula_of || 1.11815144701e-36
map_le || LE0 || 1.11542251761e-36
transitive_acyclic || is_strictly_quasiconvex_on || 1.07681396159e-36
abel_semigroup || are_equivalent || 1.07419533641e-36
set2 || inferior_setsequence || 1.06419307765e-36
c_Predicate_Oeq || <==> || 1.05264403069e-36
c_Predicate_Oeq || |-4 || 1.05264403069e-36
c_Predicate_Oeq || is_derivable_from || 1.05264403069e-36
removeAll || *\25 || 1.04862743139e-36
groups_monoid_list || Domains_of || 1.02609887572e-36
transitive_trancl || downarrow || 1.02430822179e-36
monoid_axioms || are_coplane || 9.99393111742e-37
lattic35693393ce_set || are_equivalent || 9.87533151807e-37
empty || id1 || 9.79283669764e-37
groups387199878d_list || is_proper_subformula_of1 || 9.74349144084e-37
rep_filter || ConsecutiveSet2 || 9.73990962456e-37
rep_filter || ConsecutiveSet || 9.73990962456e-37
remdups || Dependency-closure || 9.17340855665e-37
groups828474808id_set || |=7 || 9.14903936113e-37
groups387199878d_list || is_subformula_of || 9.04842774161e-37
bNF_Ca1811156065der_on || r13_absred_0 || 8.99763105033e-37
bNF_Wellorder_embed || parallelogram0 || 8.96901887431e-37
antisym || is_convex_on || 8.89126523522e-37
rep_filter || id$ || 8.6680212991e-37
transitive_trancl || uparrow0 || 8.59844526652e-37
semila1450535954axioms || joins || 8.26481821701e-37
groups1716206716st_set || are_divergent<=1_wrt || 8.06458009252e-37
semilattice || is_weight>=0of || 8.04968497195e-37
finite1921348288axioms || is_an_accumulation_point_of || 7.93980722025e-37
bNF_Wellorder_wo_rel || commutes_with0 || 7.8750079362e-37
bNF_Wellorder_wo_rel || OrthoComplement_on || 7.8750079362e-37
trans || is_convex_on || 7.83320601519e-37
set2 || -48 || 7.27786962535e-37
groups_monoid_list || [= || 7.15006986663e-37
induct_implies || *\5 || 6.84288382336e-37
filter2 || *\25 || 6.72259462057e-37
divmod_nat_rel || [=1 || 6.67619391624e-37
fun_is_measure || is_symmetric_in || 6.64677131573e-37
predicate_contains || is_continuous_on8 || 6.62788242214e-37
semilattice || is_differentiable_in0 || 6.59066803749e-37
groups387199878d_list || c=1 || 6.52042967131e-37
lattic1543629303tr_set || |-2 || 6.47198117518e-37
wf || is_strongly_quasiconvex_on || 6.44658467926e-37
map_le || are_congruent_mod0 || 6.42677452004e-37
transitive_trancl || downarrow0 || 6.37055740004e-37
set2 || Rnk || 6.3145854446e-37
divmod_nat_rel || is_S-limit_of || 6.25080323666e-37
is_none || are_isomorphic6 || 5.83208769377e-37
insert3 || B_SUP0 || 5.76846691384e-37
monoid_axioms || |-2 || 5.68344042775e-37
rotate1 || Span || 5.64617232444e-37
finite100568337ommute || is_homomorphism1 || 5.63483999336e-37
groups387199878d_list || is_unif_conv_on || 5.51328682808e-37
induct_conj || +40 || 5.46770603623e-37
groups387199878d_list || > || 5.45260937526e-37
divmod_nat || ConstantNet || 5.38874127732e-37
finite_folding || is_an_accumulation_point_of || 5.38529069872e-37
semilattice || partially_orders || 5.37967496237e-37
groups1716206716st_set || are_convergent<=1_wrt || 5.35580403058e-37
remove1 || +89 || 5.31998842544e-37
semilattice_neutr || c=1 || 5.20826237424e-37
antisym || QuasiOrthoComplement_on || 5.190000302e-37
antisym || commutes-weakly_with || 5.190000302e-37
bNF_Ca646678531ard_of || *\28 || 5.16144224565e-37
fun_is_measure || ex_sup_of || 5.08656774161e-37
comm_monoid || is_point_conv_on || 5.0813894776e-37
rotate1 || 0c0 || 5.03989379852e-37
groups828474808id_set || are_critical_wrt || 5.01247133664e-37
semilattice_axioms || is_weight_of || 5.00968327439e-37
transitive_acyclic || is_quasiconvex_on || 4.96412637538e-37
monoid || Open_Domains_of || 4.89061435233e-37
monoid || Closed_Domains_of || 4.89061435233e-37
bit0 || Complement1 || 4.83149589841e-37
hd || charact_set || 4.805290352e-37
semilattice_neutr || > || 4.68066428878e-37
comm_monoid_axioms || is_proper_subformula_of1 || 4.51118156269e-37
remdups || Span || 4.50602720334e-37
inc || chromatic#hash#0 || 4.32628488789e-37
comm_monoid || is_a_cluster_point_of0 || 4.14765093396e-37
comm_monoid_axioms || is_subformula_of || 4.13982853649e-37
semilattice || is_immediate_constituent_of || 4.13296713691e-37
rep_filter || ^0 || 4.10656368427e-37
finite1921348288axioms || are_convertible_wrt || 4.09977147499e-37
filter2 || +8 || 4.00148590555e-37
trans || QuasiOrthoComplement_on || 3.94250344937e-37
trans || commutes-weakly_with || 3.94250344937e-37
abs_filter || dom6 || 3.86119617439e-37
abs_filter || cod3 || 3.86119617439e-37
inc || clique#hash#0 || 3.7868750934e-37
semilattice_order || orientedly_joins || 3.73627636092e-37
insert3 || \or\2 || 3.71861920503e-37
insert3 || #quote##bslash##slash##quote#3 || 3.68455001917e-37
none || Concretized || 3.66919545473e-37
rep_filter || #bslash##slash#0 || 3.60005550583e-37
lattic1543629303tr_set || are_convertible_wrt || 3.49346850983e-37
semilattice_axioms || is_continuous_in5 || 3.40353520578e-37
semilattice_neutr || is_unif_conv_on || 3.39205549977e-37
groups828474808id_set || c=1 || 3.37575315409e-37
remdups_adj || Span || 3.35619931177e-37
member3 || is_Lipschitzian_on4 || 3.27006829576e-37
bNF_Ca646678531ard_of || GPart || 3.2503471425e-37
comm_monoid_axioms || <=1 || 3.21747843888e-37
finite_folding || are_convertible_wrt || 3.21651993266e-37
nil || ID || 3.21273874493e-37
remdups_adj || 0c0 || 3.16143618933e-37
bNF_Ca1811156065der_on || r12_absred_0 || 3.1613639729e-37
monoid_axioms || are_convertible_wrt || 3.13882875601e-37
rev || Span || 3.1171375538e-37
distinct || -48 || 3.11698642931e-37
rev || 0c0 || 3.10678889205e-37
abel_semigroup || is_weight_of || 3.02836237043e-37
pow2 || opp || 3.02612906841e-37
groups_monoid_list || is_point_conv_on || 2.97920472532e-37
groups828474808id_set || are_divergent_wrt || 2.97702407178e-37
semilattice_axioms || quasi_orders || 2.95280730433e-37
set || center0 || 2.8592997723e-37
lattic35693393ce_set || is_weight_of || 2.81258183608e-37
comm_monoid || are_divergent<=1_wrt || 2.76438308448e-37
groups828474808id_set || > || 2.73703271233e-37
lattic1543629303tr_set || Domains_of || 2.73487040113e-37
groups828474808id_set || <=1 || 2.73478815153e-37
gen_length || +38 || 2.72917618093e-37
code_Nat || k19_finseq_1 || 2.72252799709e-37
take || EqClass0 || 2.72174555885e-37
bit1 || succ0 || 2.67625328223e-37
groups387199878d_list || are_divergent_wrt || 2.59867042777e-37
distinct || Rnk || 2.56312704607e-37
groups387199878d_list || is_convergent_to || 2.51787888001e-37
trans || is_a_normal_form_wrt || 2.47828099135e-37
groups_monoid_list || << || 2.46566115713e-37
code_n1042895779nteger || k19_finseq_1 || 2.42813313616e-37
cnj || +46 || 2.40593337533e-37
code_nat_of_natural || dom0 || 2.378593721e-37
finite_psubset || 1_ || 2.36165169308e-37
code_int_of_integer || succ0 || 2.32890086412e-37
inc || cliquecover#hash#0 || 2.3053618911e-37
inc || stability#hash#0 || 2.27638193685e-37
wf || is_convex_on || 2.21551051114e-37
abel_semigroup || is_continuous_in5 || 2.1991187091e-37
nat2 || Seg || 2.19396820537e-37
lattic1543629303tr_set || [= || 2.18703725022e-37
groups1716206716st_set || is_a_condensation_point_of || 2.16987600269e-37
transitive_rtrancl || ex_inf_of || 2.14100250266e-37
id_on || k5_msafree4 || 2.10767531057e-37
finite_folding_idem || |=7 || 2.0929943262e-37
groups387199878d_list || _|_2 || 2.08514697868e-37
predicate_contains || is_continuous_on3 || 2.06289170039e-37
lattic35693393ce_set || is_continuous_in5 || 2.05904452797e-37
bit0 || CompleteSGraph || 2.04881317401e-37
monoid || is_unif_conv_on || 2.04332169097e-37
rotate1 || Sub_not || 2.01519936256e-37
splice || +38 || 2.00899069259e-37
semilattice_axioms || is_proper_subformula_of || 2.00336252512e-37
transitive_trancl || nf || 2.00138435448e-37
remdups || 0c0 || 1.97903808342e-37
member3 || [=0 || 1.9479297701e-37
bit1 || cliquecover#hash#0 || 1.94687590426e-37
finite_finite2 || id2 || 1.9134838868e-37
groups828474808id_set || are_convergent_wrt || 1.89036991306e-37
groups_monoid_list || is_a_cluster_point_of0 || 1.88583596955e-37
abel_semigroup || quasi_orders || 1.87255015176e-37
divmod_nat || ++ || 1.84603507053e-37
bit1 || stability#hash#0 || 1.83220053478e-37
comm_monoid || are_ldependent2 || 1.78337191967e-37
comm_monoid || are_convergent<=1_wrt || 1.78292258917e-37
semilattice_neutr || is_convergent_to || 1.74975467093e-37
lattic35693393ce_set || quasi_orders || 1.74925812482e-37
nat_tr1645093318rphism || ProperBodyWhile=0 || 1.736230459e-37
set || opp0 || 1.71046028742e-37
finite_psubset || 0. || 1.69903737543e-37
append || +38 || 1.64724211976e-37
groups387199878d_list || are_convergent_wrt || 1.64468578632e-37
contained || is_a_root_of || 1.6247089184e-37
transitive_rtrancl || ex_sup_of || 1.61564298464e-37
set2 || `23 || 1.60213401149e-37
trans || in0 || 1.56694856084e-37
rotate1 || k24_zmodul02 || 1.55651685747e-37
null || is_embedded_in || 1.53554914695e-37
monoid || c=1 || 1.51293113653e-37
groups1716206716st_set || are_critical_wrt || 1.46629652827e-37
id_on || +84 || 1.46562058117e-37
wf || is_proper_subformula_of0 || 1.45744000771e-37
semilattice || the_value_of || 1.45456740537e-37
wf || in0 || 1.42493459024e-37
semilattice_neutr || Open_Domains_of || 1.40634204897e-37
semilattice_neutr || Closed_Domains_of || 1.40634204897e-37
divmod_nat_rel || < || 1.3963035049e-37
order_well_order_on || is_dependent_of || 1.39076861141e-37
order_well_order_on || [=1 || 1.34765500754e-37
abel_semigroup || is_proper_subformula_of || 1.32680210594e-37
bNF_Ca1811156065der_on || is_dependent_of || 1.30525421616e-37
bNF_Ca1811156065der_on || [=1 || 1.29524485246e-37
is_empty || are_isomorphic || 1.28519010424e-37
groups828474808id_set || is_unif_conv_on || 1.27980654987e-37
semilattice_neutr || _|_2 || 1.27085749293e-37
is_empty || are_equipotent || 1.26307710038e-37
lattic35693393ce_set || is_proper_subformula_of || 1.24614725237e-37
lattic1543629303tr_set || << || 1.24579687952e-37
bit1 || chromatic#hash#0 || 1.24002750536e-37
bNF_Wellorder_compat || \||\3 || 1.23538978142e-37
set2 || k18_zmodul02 || 1.21137807079e-37
abel_semigroup || is_elementary_subsystem_of || 1.20734953899e-37
refl_on || |=4 || 1.20375254354e-37
groups_monoid_list || Domains_Lattice || 1.18034101365e-37
bit1 || clique#hash#0 || 1.16370379516e-37
induct_implies || *\18 || 1.15267645924e-37
transitive_trancl || Cl || 1.14693505531e-37
bNF_Wellorder_embed || congr || 1.13874731176e-37
bot_bot || RelIncl || 1.12510455205e-37
finite_folding_idem || is_a_retraction_of || 1.11913376522e-37
comm_monoid_axioms || are_divergent_wrt || 1.11464173296e-37
groups828474808id_set || is_an_accumulation_point_of || 1.10562502137e-37
lattic35693393ce_set || k1_rvsum_3 || 1.10322114196e-37
empty || 0_. || 1.09725724439e-37
pred_nat || args || 1.09586365163e-37
monoid_axioms || [= || 1.09498660717e-37
hd || -48 || 1.08790438251e-37
bot_bot || Vertical_Line || 1.07181137863e-37
member3 || is_Lipschitzian_on0 || 1.06819922344e-37
remdups_adj || Sub_not || 1.06584538297e-37
groups_monoid_list || are_ldependent2 || 1.06495469064e-37
pred || Ids || 1.04754223127e-37
semilattice || is_differentiable_on6 || 1.0244952024e-37
transitive_rtrancl || ^00 || 1.01399224793e-37
semila1450535954axioms || is_orientedpath_of || 1.00395164947e-37
list_ex1 || #bslash# || 9.99774467361e-38
trans || <1 || 9.97385723862e-38
rev || Sub_not || 9.94915187661e-38
induct_conj || +84 || 9.84885003563e-38
can_select || #slash##bslash# || 9.69723570831e-38
comm_monoid || is_a_condensation_point_of || 9.58660360114e-38
c_Predicate_Oeq || are_not_conjugated || 9.46177453671e-38
c_Predicate_Oeq || |-0 || 9.46177453671e-38
semilattice_order || is_acyclicpath_of || 9.27558415438e-38
groups387199878d_list || is_an_accumulation_point_of || 9.17813166834e-38
hd || Rnk || 9.05339288729e-38
lattic2109816131tr_set || congr0 || 9.00344807013e-38
lattic1543629303tr_set || is_point_conv_on || 8.926601207e-38
groups1716206716st_set || << || 8.83725813683e-38
lattic35693393ce_set || D-Meet || 8.74670641945e-38
lattic35693393ce_set || D-Union || 8.74670641945e-38
finite1921348288axioms || |-2 || 8.4691412112e-38
groups828474808id_set || is_convergent_to || 8.44661589116e-38
monoid || is_convergent_to || 8.32432106507e-38
remdups_adj || k24_zmodul02 || 8.19051995632e-38
abel_s1917375468axioms || <==>0 || 8.17528773539e-38
member3 || |- || 8.13873632257e-38
nil || the_Field_of_Quotients || 8.10778641607e-38
distinct || `23 || 8.06740848771e-38
abel_s1917375468axioms || is_Lcontinuous_in || 7.80564281053e-38
abel_s1917375468axioms || is_Rcontinuous_in || 7.80564281053e-38
inc || len || 7.76343181197e-38
monoid || _|_2 || 7.75691799709e-38
rev || k24_zmodul02 || 7.63525340671e-38
single || [:..:] || 7.53109673459e-38
re || *64 || 7.44799639383e-38
monoid_axioms || is_point_conv_on || 7.44541678242e-38
transitive_rtrancl || Lim_inf || 7.37075536413e-38
finite1921348288axioms || is_an_UPS_retraction_of || 7.36788925026e-38
monoid || > || 6.79944658479e-38
comm_monoid_axioms || are_convergent_wrt || 6.76352925582e-38
id2 || Concretized || 6.64884943245e-38
abel_semigroup || is_right_differentiable_in || 6.61177824642e-38
abel_semigroup || is_left_differentiable_in || 6.61177824642e-38
corec_complex || -0 || 6.47854573298e-38
pred || `1 || 6.46914098173e-38
semila478527537_order || #slash##slash#0 || 6.34102085717e-38
measure || WFF || 6.32750125746e-38
finite_folding || |-2 || 6.20215892193e-38
is_none || divides0 || 6.1891101708e-38
distinct || k18_zmodul02 || 6.12013331503e-38
set2 || ` || 5.99949593773e-38
lattic35693393ce_set || k2_rvsum_3 || 5.98620059083e-38
monoid || Open_Domains_Lattice || 5.90170506827e-38
monoid || Closed_Domains_Lattice || 5.90170506827e-38
abel_semigroup || is_definable_in || 5.87644701791e-38
lattic1543629303tr_set || is_a_cluster_point_of0 || 5.76915864655e-38
remdups || Sub_not || 5.7622160383e-38
pred3 || opp1 || 5.72025942261e-38
semilattice || CLD-Union || 5.4050751006e-38
semilattice || OPD-Union || 5.4050751006e-38
semilattice || CLD-Meet || 5.4050751006e-38
semilattice || OPD-Meet || 5.4050751006e-38
comm_monoid_axioms || is_an_accumulation_point_of || 5.37988694094e-38
re || <k>0 || 5.36023862935e-38
measures || WFF || 5.2398021028e-38
measure || \or\4 || 5.22234776318e-38
semilattice || k2_prefer_1 || 5.21074063783e-38
semigroup || <==>0 || 5.12427095558e-38
inc || len1 || 5.03127624543e-38
lattic35693393ce_set || k3_prefer_1 || 4.96968724232e-38
rotate1 || -77 || 4.8233354879e-38
insert3 || All1 || 4.78264568929e-38
semilattice || k2_rvsum_3 || 4.74306369363e-38
bNF_Ca646678531ard_of || ++ || 4.73872894278e-38
finite_folding || is_an_UPS_retraction_of || 4.73322436056e-38
groups828474808id_set || _|_2 || 4.65319963873e-38
abel_s1917375468axioms || is_parametrically_definable_in || 4.59182707918e-38
transitive_trancl || adjs0 || 4.57218474292e-38
semilattice_axioms || is_continuous_on0 || 4.48525351141e-38
measures || \or\4 || 4.45422605175e-38
finite_finite2 || are_isomorphic || 4.44251158474e-38
groups828474808id_set || are_convertible_wrt || 4.43308635487e-38
null || is_ringisomorph_to || 4.41736348104e-38
comm_monoid || are_critical_wrt || 4.41379800075e-38
remdups || k24_zmodul02 || 4.40158509346e-38
eval || opp || 4.2303548531e-38
finite_folding_idem || ==>1 || 4.21503263547e-38
bit0 || k19_finseq_1 || 4.19117290086e-38
comm_monoid || the_value_of || 4.18823113632e-38
antisym || <1 || 4.17965743467e-38
sym || <1 || 4.14313820581e-38
monoid_axioms || is_a_cluster_point_of0 || 4.13019662551e-38
insert3 || =>0 || 4.09984010735e-38
set || Ids || 4.04403526428e-38
bit0 || Seq || 4.02767311145e-38
semigroup || is_Lcontinuous_in || 3.97424020766e-38
semigroup || is_Rcontinuous_in || 3.97424020766e-38
monoid || <=1 || 3.96803405386e-38
bit0 || Sgm00 || 3.96752916452e-38
semiri1062155398ct_rel semiri882458588ct_rel || TargetSelector 4 || 3.89910955613e-38
set2 || Carrier1 || 3.87894795405e-38
groups387199878d_list || are_convertible_wrt || 3.82787772496e-38
nil || (0).0 || 3.75096669358e-38
pcr_literal cr_literal || VLabelSelector 7 || 3.75017420643e-38
lattic1543629303tr_set || Domains_Lattice || 3.54003423231e-38
finite852775215axioms || |-|0 || 3.49035277869e-38
distinct || is_embedded_in || 3.32158265604e-38
comm_monoid || is_applicable_to1 || 3.31385086918e-38
groups1716206716st_set || |=7 || 3.3040927306e-38
comm_monoid || is_often_in || 3.29908723527e-38
typerep3 || U+ || 3.23763875059e-38
lattic1543629303tr_set || are_ldependent2 || 3.22271477059e-38
map_tailrec || Right_Cosets || 3.17543725247e-38
abel_semigroup || is_continuous_on0 || 3.10121488777e-38
groups387199878d_list || is_properly_applicable_to || 3.06350717577e-38
lattic35693393ce_set || is_continuous_on0 || 2.92881232016e-38
finite_comp_fun_idem || is_an_universal_closure_of || 2.87156753142e-38
less_than || op0 {} || 2.84844747592e-38
semigroup || is_parametrically_definable_in || 2.75446224426e-38
none || abs || 2.72969013297e-38
finite_finite2 || are_equipotent || 2.6957051197e-38
monoid_axioms || are_ldependent2 || 2.66434680222e-38
groups828474808id_set || k1_rvsum_3 || 2.65402358171e-38
hd || `23 || 2.63644483552e-38
bNF_Ca646678531ard_of || ConstantNet || 2.60065634639e-38
remdups_adj || -77 || 2.59405522616e-38
set || `1 || 2.58701482556e-38
nat || MaxConstrSign || 2.57561334861e-38
groups1716206716st_set || is_a_retraction_of || 2.5403497143e-38
finite1921348288axioms || is_derivable_from || 2.52041842641e-38
antisym || are_isomorphic6 || 2.513310462e-38
transitive_trancl || +84 || 2.49903614528e-38
sym || are_isomorphic6 || 2.48165688505e-38
set || -25 || 2.451104731e-38
rev || -77 || 2.43339736844e-38
pred3 || opp || 2.41073144438e-38
transitive_rtrancl || +84 || 2.35869621026e-38
map_tailrec || latt2 || 2.32436763408e-38
sublist || #slash##bslash#8 || 2.30019397441e-38
eval || opp1 || 2.24704537297e-38
fun_is_measure || is_Ulam_Matrix_of || 2.23087172725e-38
rep_filter || .walkOf0 || 2.16255745347e-38
bind4 || +30 || 2.1463416699e-38
order_well_order_on || < || 2.13499164014e-38
bind4 || -32 || 2.12465259655e-38
trans || are_isomorphic6 || 2.11852490335e-38
is_empty2 || k22_pre_poly || 2.11818334991e-38
comm_monoid || <=\ || 2.0717292149e-38
real_Vector_of_real || <*..*>1 || 2.06693366995e-38
distinct || is_ringisomorph_to || 2.05159812868e-38
semilattice_neutr || <=1 || 2.02614040201e-38
complex || 0 || 2.01103688355e-38
bNF_Ca1811156065der_on || < || 2.00389404622e-38
finite_comp_fun_idem || <==>1 || 2.00332838462e-38
hd || k18_zmodul02 || 1.99411307274e-38
cnj || +45 || 1.98954888372e-38
semilattice_neutr || is_properly_applicable_to || 1.98918764946e-38
distinct || Carrier1 || 1.92297079074e-38
splice || +33 || 1.9195674377e-38
semilattice_neutr || Open_Domains_Lattice || 1.90134190777e-38
semilattice_neutr || Closed_Domains_Lattice || 1.90134190777e-38
re || Product7 || 1.89561973881e-38
butlast || \&\2 || 1.83915943082e-38
tl || \or\3 || 1.82380747409e-38
groups_monoid_list || is_applicable_to1 || 1.78253937054e-38
monoid_axioms || << || 1.77781771562e-38
append || +33 || 1.72819660174e-38
groups387199878d_list || is_eventually_in || 1.71484366184e-38
groups828474808id_set || is_an_UPS_retraction_of || 1.68936029445e-38
finite_folding || is_derivable_from || 1.67899649428e-38
none || -0 || 1.67166946374e-38
groups_monoid_list || IRR || 1.67029087696e-38
finite100568337ommute || |-|0 || 1.64465771837e-38
finite_comp_fun_idem || is_immediate_constituent_of1 || 1.57035459287e-38
monoid || .103 || 1.57022031578e-38
order_well_order_on || is_S-limit_of || 1.56338462337e-38
null2 || <= || 1.53739951751e-38
groups828474808id_set || k2_rvsum_3 || 1.53126158896e-38
groups387199878d_list || <=1 || 1.51584282865e-38
comple1176932000PREMUM || +30 || 1.4728179827e-38
finite_folding_idem || is_unif_conv_on || 1.47227273569e-38
comple1176932000PREMUM || -32 || 1.4704129743e-38
lattic1693879045er_set || is_acyclicpath_of || 1.45985481803e-38
bNF_Ca1811156065der_on || is_S-limit_of || 1.4399468285e-38
c_Predicate_Oeq || is_terminated_by || 1.43005042986e-38
c_Predicate_Oeq || #slash##slash#3 || 1.43005042986e-38
groups828474808id_set || |-2 || 1.41377495502e-38
remdups || -77 || 1.4016847126e-38
re || Sum19 || 1.38652142847e-38
comm_monoid || is_a_retraction_of || 1.38096831693e-38
comm_monoid_axioms || are_convertible_wrt || 1.36943000647e-38
groups_monoid_list || is_often_in || 1.34797743149e-38
char2 || U+ || 1.30919246631e-38
comm_monoid || |=7 || 1.30808915439e-38
groups387199878d_list || is_an_UPS_retraction_of || 1.30454672335e-38
semilattice_neutr || is_eventually_in || 1.24462160082e-38
comm_monoid || k2_rvsum_3 || 1.23471877045e-38
map || Left_Cosets || 1.18226311237e-38
null || {..}3 || 1.17430450006e-38
set2 || UnitBag || 1.17378398765e-38
semilattice || is_immediate_constituent_of0 || 1.16484259974e-38
groups387199878d_list || |-2 || 1.15705682456e-38
sum_isl || is_proper_subformula_of1 || 1.12765101828e-38
rep_filter || FS2XFS || 1.11022662508e-38
drop || <=>3 || 1.10824406566e-38
monoid || is_properly_applicable_to || 1.10162743394e-38
transitive_trancl || core || 1.07537809595e-38
groups1716206716st_set || ==>1 || 1.04476926243e-38
groups387199878d_list || divides1 || 1.01138116346e-38
comm_monoid_axioms || is_an_UPS_retraction_of || 9.79944445167e-39
map || latt0 || 9.40274809157e-39
trans || emp || 9.28973364348e-39
lattic35693393ce_set || Domains_of || 9.06228811288e-39
pred3 || ID0 || 8.89511907947e-39
pred_maxchain || is_acyclicpath_of || 8.68861301184e-39
pcr_literal cr_literal || ELabelSelector 6 || 8.68837001024e-39
semilattice_order || is_orientedpath_of || 8.62856326433e-39
sum_Inl || #quote##bslash##slash##quote#5 || 8.62226027341e-39
bind4 || . || 8.54722571174e-39
comm_monoid || is_continuous_in2 || 8.51983032965e-39
null || are_isomorphic1 || 8.15508079685e-39
groups_monoid_list || <=\ || 8.14046701434e-39
groups828474808id_set || is_properly_applicable_to || 8.13637727702e-39
finite_folding_idem || _|_2 || 8.00910075739e-39
abs_filter || .first() || 7.74692732931e-39
groups387199878d_list || is_differentiable_in5 || 7.50037457222e-39
semilattice_neutr || divides1 || 7.44038028475e-39
groups828474808id_set || D-Meet || 7.34052590618e-39
groups828474808id_set || D-Union || 7.34052590618e-39
abs_filter || .last() || 7.31169575058e-39
pred3 || id$0 || 7.17800823525e-39
pred3 || id$1 || 7.17800823525e-39
sin_coeff || args || 7.13338694888e-39
sum_isl || is_finer_than0 || 7.00894980962e-39
sum_isl || is_coarser_than0 || 7.00894980962e-39
empty || *1 || 6.5523044401e-39
groups828474808id_set || is_derivable_from || 6.49182549496e-39
groups828474808id_set || is_eventually_in || 6.43698245827e-39
hd || Carrier1 || 6.30911735757e-39
abs_filter || XFS2FS || 6.21089480325e-39
finite1921348288axioms || is_point_conv_on || 6.17005094337e-39
comple1176932000PREMUM || @12 || 6.1625418372e-39
partial_flat_ord || LE0 || 6.12639358666e-39
pcr_real cr_real || VLabelSelector 7 || 6.02842610226e-39
single || div0 || 5.87474770985e-39
comple1176932000PREMUM || SetVal || 5.79819703229e-39
comm_monoid_axioms || |-2 || 5.73056146432e-39
empty || k1_numpoly1 || 5.69115705067e-39
diffs || adjs0 || 5.64178114795e-39
eval || are_congruent_mod || 5.61260880404e-39
lattic1543629303tr_set || is_applicable_to1 || 5.55506151591e-39
semilattice_neutr || .103 || 5.52294158037e-39
comm_monoid || ==>1 || 5.44147909654e-39
set2 || FinMeetCl || 5.32745479082e-39
lattic1543629303tr_set || IRR || 5.32691263729e-39
butlast || `5 || 5.31161213419e-39
monoid || is_eventually_in || 5.30735021529e-39
comm_monoid || CLD-Union || 5.26606305241e-39
comm_monoid || OPD-Union || 5.26606305241e-39
comm_monoid || CLD-Meet || 5.26606305241e-39
comm_monoid || OPD-Meet || 5.26606305241e-39
pred_chain || is_orientedpath_of || 5.17650471405e-39
rep_filter || CastSeq || 5.13187367975e-39
set || root-tree2 || 5.12517731696e-39
map_le || ==>* || 5.05753804137e-39
finite852775215axioms || is_proper_subformula_of1 || 4.98564522396e-39
groups387199878d_list || is_derivable_from || 4.97978484456e-39
semilattice_neutr || is_differentiable_in5 || 4.96393751407e-39
sum_Inl || \or\0 || 4.9341254534e-39
set2 || Intersection || 4.90765771416e-39
pcr_rat cr_rat || VLabelSelector 7 || 4.90460121603e-39
sum_Inl || =>1 || 4.82619284915e-39
tl || `5 || 4.82366558444e-39
abel_semigroup || are_isomorphic6 || 4.81418713411e-39
set2 || +40 || 4.78784077127e-39
equiv_equivp || is_elementary_subsystem_of || 4.70924355961e-39
semilattice_axioms || is_proper_subformula_of0 || 4.70650251725e-39
semilattice || Open_Domains_of || 4.67926711749e-39
semilattice || Closed_Domains_of || 4.67926711749e-39
abs_filter || CastSeq0 || 4.62498677913e-39
comm_monoid || k2_prefer_1 || 4.60943429068e-39
rotate1 || Partial_Intersection || 4.59930664466e-39
finite_folding || is_point_conv_on || 4.55898835718e-39
finite852775215axioms || is_subformula_of || 4.55853414779e-39
set || prop || 4.5449137583e-39
groups_monoid_list || is_continuous_in2 || 4.43765321516e-39
lattic1543629303tr_set || is_often_in || 4.28343263803e-39
finite_finite2 || <0 || 4.26023353719e-39
monoid_axioms || is_applicable_to1 || 4.23477254345e-39
abs_filter || Sub_the_argument_of || 4.22060960104e-39
bNF_Cardinal_cone || [+] || 4.07119799658e-39
pcr_int cr_int || VLabelSelector 7 || 4.0298846082e-39
null2 || is_embedded_in || 4.01877242424e-39
empty || Lucas || 3.98891027184e-39
null2 || are_isomorphic1 || 3.95912885255e-39
groups828474808id_set || divides1 || 3.94541718179e-39
empty || |....|2 || 3.92701916037e-39
bNF_Cardinal_cfinite || computes0 || 3.89990777065e-39
empty || In_Power || 3.8715049409e-39
induct_implies || *` || 3.86981498828e-39
induct_conj || +` || 3.78509712929e-39
nil || StoneBLattice || 3.67645866327e-39
is_empty2 || #bslash#+#bslash# || 3.58392077408e-39
groups828474808id_set || k3_prefer_1 || 3.55547103769e-39
semilattice || c= || 3.52128098717e-39
comm_monoid_axioms || is_derivable_from || 3.48392037066e-39
abel_s1917375468axioms || are_equivalent1 || 3.48227664308e-39
rotate1 || Leading-Monomial || 3.43895309765e-39
abel_semigroup || is_proper_subformula_of0 || 3.38659324457e-39
finite100568337ommute || is_proper_subformula_of1 || 3.34537312251e-39
groups1716206716st_set || is_unif_conv_on || 3.28995102188e-39
product_unit || Sum_Tran || 3.28077860496e-39
lattic35693393ce_set || is_proper_subformula_of0 || 3.2151674473e-39
finite100568337ommute || is_subformula_of || 3.14560982542e-39
finite1921348288axioms || are_ldependent2 || 3.1099926756e-39
fun_is_measure || is_cofinal_with || 3.05146919966e-39
monoid || divides1 || 3.05046786777e-39
eval || cod0 || 3.02939283086e-39
eval || dom3 || 3.02939283086e-39
rep_filter || Sub_not || 3.01730796465e-39
eval || dom10 || 2.86713467943e-39
eval || cod6 || 2.86713467943e-39
eval || dom9 || 2.86713467943e-39
eval || cod7 || 2.86713467943e-39
nil || StoneLatt || 2.79003158636e-39
remdups_adj || Partial_Intersection || 2.7528557486e-39
monoid_axioms || is_often_in || 2.71970296586e-39
set2 || len0 || 2.70078163361e-39
rev || Partial_Intersection || 2.66652701953e-39
monoid || is_differentiable_in5 || 2.66075710582e-39
lattic1543629303tr_set || <=\ || 2.60724683412e-39
null || #bslash#3 || 2.51272180025e-39
real || MaxConstrSign || 2.50440408029e-39
cos_coeff || op0 {} || 2.47180027229e-39
pcr_literal cr_literal || WeightSelector 5 || 2.4614376334e-39
map_tailrec || LAp || 2.43405257311e-39
empty || StoneBLattice || 2.361886298e-39
finite_folding || are_ldependent2 || 2.3494852428e-39
distinct || are_isomorphic1 || 2.34602508816e-39
id_on || GPart || 2.31752213155e-39
bind4 || +36 || 2.3028912363e-39
equiv_part_equivp || <==>0 || 2.28601536969e-39
empty || the_Field_of_Quotients || 2.28293535004e-39
distinct || Intersection || 2.19818963568e-39
semigroup || are_equivalent1 || 2.19551576285e-39
abel_s1917375468axioms || are_equivalent || 2.18698713422e-39
finite_folding_idem || #slash##slash#8 || 2.09392497524e-39
groups828474808id_set || is_differentiable_in5 || 2.08415863863e-39
groups387199878d_list || << || 2.02156314754e-39
code_pcr_natural code_cr_natural || VLabelSelector 7 || 1.99577120665e-39
abel_semigroup || ~= || 1.98716803957e-39
insert3 || ^17 || 1.91733170776e-39
reflp || <==>0 || 1.91081590144e-39
map || k2_roughs_2 || 1.8787095662e-39
remdups_adj || Leading-Monomial || 1.87788489334e-39
inf_inf || #bslash##slash#4 || 1.84365804902e-39
transitive_trancl || sqr0 || 1.81060678551e-39
groups1716206716st_set || _|_2 || 1.80892761943e-39
map_tailrec || UAp || 1.78502864981e-39
rep_filter || ProjFinSeq || 1.77173465789e-39
rev || Leading-Monomial || 1.7710053146e-39
id_on || *\28 || 1.7529564269e-39
transitive_rtrancl || Base_FinSeq0 || 1.67217622997e-39
finite1921348288axioms || are_coplane || 1.66353232045e-39
equiv_equivp || is_definable_in || 1.6419578876e-39
monoid_axioms || <=\ || 1.59527571858e-39
remdups || Partial_Intersection || 1.59256599509e-39
set || DISJOINT_PAIRS || 1.57497532728e-39
comple1176932000PREMUM || -30 || 1.56859503015e-39
refl_on || is_dependent_of || 1.55745402303e-39
pred3 || id$ || 1.55477571756e-39
empty || StoneLatt || 1.5535220125e-39
groups828474808id_set || is_point_conv_on || 1.51630607314e-39
pcr_real cr_real || ELabelSelector 6 || 1.49868992476e-39
listMem || [=1 || 1.47491844099e-39
lattic1543629303tr_set || is_continuous_in2 || 1.40815287075e-39
comm_monoid || is_unif_conv_on || 1.40678911915e-39
map || k1_roughs_2 || 1.39863537517e-39
lattic35693393ce_set || Domains_Lattice || 1.39098250535e-39
set2 || #slash##bslash#0 || 1.38479951462e-39
semilattice_axioms || is_finer_than || 1.35529414729e-39
bNF_Wellorder_embed || congr0 || 1.35278385503e-39
semila1450535954axioms || -are_equivalent || 1.34345608008e-39
null2 || divides || 1.32452216214e-39
distinct || len0 || 1.31962066263e-39
bNF_Wellorder_compat || #slash##slash#0 || 1.31123013646e-39
one2 || 1q0 || 1.30622893354e-39
set || -31 || 1.2879142716e-39
null2 || is_ringisomorph_to || 1.2640974564e-39
groups1716206716st_set || > || 1.25618060342e-39
abel_semigroup || is_metric_of || 1.23287303194e-39
pcr_rat cr_rat || ELabelSelector 6 || 1.22879563792e-39
comm_monoid || <=1 || 1.21382245725e-39
lexordp_eq || is_collinear0 || 1.21366718442e-39
semilattice_axioms || tolerates || 1.18764844901e-39
semigroup || are_equivalent || 1.1866231983e-39
groups387199878d_list || is_point_conv_on || 1.18555623641e-39
complex2 || U+ || 1.16997420802e-39
bind4 || #slash#20 || 1.09516589658e-39
comm_monoid || is_vertex_seq_of || 1.06121154006e-39
rotate1 || XFS2FS || 1.04986914404e-39
finite_folding || are_coplane || 1.03820584498e-39
monoid_axioms || is_continuous_in2 || 1.03118125212e-39
pcr_int cr_int || ELabelSelector 6 || 1.01708922148e-39
remdups || Leading-Monomial || 1.00182602268e-39
abel_semigroup || is_finer_than || 9.96738348911e-40
groups828474808id_set || << || 9.89150232048e-40
bNF_Ca646678531ard_of || nf || 9.76934058277e-40
lattic35693393ce_set || is_finer_than || 9.49067082243e-40
groups1716206716st_set || #slash##slash#8 || 9.48602035068e-40
semilattice_order || -are_isomorphic || 9.4087377386e-40
groups387199878d_list || is_oriented_vertex_seq_of || 9.22247938858e-40
cons || #quote##bslash##slash##quote#2 || 9.19189579703e-40
code_nat_of_natural || ppf || 9.10270070686e-40
abel_semigroup || tolerates || 9.02505920576e-40
equiv_part_equivp || is_parametrically_definable_in || 8.97497257315e-40
semilattice_neutr || << || 8.93435600222e-40
fun_is_measure || are_c=-comparable || 8.93206866108e-40
abel_s1917375468axioms || is_a_pseudometric_of || 8.87060575135e-40
lattic35693393ce_set || tolerates || 8.63210143992e-40
pos || Tempty_e_net || 8.54350545214e-40
abs_filter || Sum9 || 8.49881855982e-40
implode str || VLabelSelector 7 || 8.39397848442e-40
c_Predicate_Oeq || are_divergent_wrt || 8.34663958574e-40
pow || 1q || 8.20627859178e-40
groups828474808id_set || are_coplane || 7.98385424654e-40
groups828474808id_set || are_ldependent2 || 7.85582777417e-40
hd || Intersection || 7.47547680399e-40
semilattice || Open_Domains_Lattice || 7.47374886786e-40
semilattice || Closed_Domains_Lattice || 7.47374886786e-40
comm_monoid || _|_2 || 7.47203275483e-40
sqr || #quote#31 || 7.41483909263e-40
semilattice || <N< || 7.40872461495e-40
reflp || is_parametrically_definable_in || 7.39304536471e-40
semiring_1_of_nat || Product3 || 7.347857942e-40
set2 || Lin0 || 7.15835341688e-40
transitive_trancl || \&\2 || 7.14387068795e-40
code_natural || Newton_Coeff || 6.97049938798e-40
set2 || dim || 6.86711265507e-40
transitive_rtrancl || \#bslash#\ || 6.741587073e-40
transitive_rtranclp || is_naturally_transformable_to || 6.61042014948e-40
groups_monoid_list || <=1 || 6.57558093076e-40
comple1176932000PREMUM || (#hash#)18 || 6.51987516486e-40
refl_on || [=1 || 6.48692836152e-40
sum_Inr || locnum || 6.30523666882e-40
comm_monoid_axioms || is_point_conv_on || 6.29603343631e-40
lexordp2 || Mid || 6.25821130184e-40
semilattice_neutr || is_oriented_vertex_seq_of || 6.20069386347e-40
bitM || #quote#31 || 6.1901817405e-40
groups387199878d_list || are_ldependent2 || 6.13019568889e-40
comm_monoid || #slash##slash#8 || 6.12837229608e-40
eval || dom6 || 6.09931857097e-40
eval || cod3 || 6.09931857097e-40
rotate1 || (Omega).0 || 6.0052157488e-40
nat_tr1645093318rphism || is_a_record_of || 5.95170433408e-40
set2 || Lim_K || 5.94901751593e-40
set2 || rng || 5.94259066274e-40
groups828474808id_set || Domains_of || 5.8456652182e-40
semigroup || is_a_pseudometric_of || 5.67090043806e-40
groups387199878d_list || are_coplane || 5.58647568418e-40
set || ^29 || 5.48258016271e-40
rotate1 || Z_Lin || 5.47561267559e-40
groups_monoid_list || is_vertex_seq_of || 5.40288269713e-40
order_well_order_on || is_a_normal_form_of || 5.29792255327e-40
rep_filter || id2 || 5.19339982673e-40
code_pcr_natural code_cr_natural || ELabelSelector 6 || 5.16963962086e-40
code_pcr_integer code_cr_integer || VLabelSelector 7 || 5.15793372923e-40
remdups_adj || XFS2FS || 5.14835625165e-40
equiv_equivp || is_right_differentiable_in || 5.12592330515e-40
equiv_equivp || is_left_differentiable_in || 5.12592330515e-40
comm_monoid_axioms || are_coplane || 5.08356633992e-40
bNF_Ca1811156065der_on || is_a_normal_form_of || 4.94779048127e-40
rotate1 || superior_setsequence || 4.94735793233e-40
monoid || << || 4.86415129221e-40
finite_comp_fun_idem || are_divergent<=1_wrt || 4.84006064833e-40
rev || XFS2FS || 4.72673716014e-40
remdups || Z_Lin || 4.72380526524e-40
nat_of_num || id6 || 4.69905584702e-40
map_tailrec || frac0 || 4.64266803178e-40
transitive_rtrancl || =>2 || 4.58096189636e-40
pcr_real cr_real || WeightSelector 5 || 4.5028087481e-40
abs_filter || cod || 4.43047864972e-40
abs_filter || dom1 || 4.43047864972e-40
semiri1062155398ct_rel semiri882458588ct_rel || SourceSelector 3 || 4.37222847846e-40
hd || len0 || 4.33431244264e-40
eval || id$0 || 4.29130926476e-40
eval || id$1 || 4.29130926476e-40
basic_BNF_xtor || #quote#23 || 3.92427971108e-40
equiv_part_equivp || is_Lcontinuous_in || 3.89093985982e-40
equiv_part_equivp || is_Rcontinuous_in || 3.89093985982e-40
map || idiv_prg || 3.88748278891e-40
rep_filter || term4 || 3.87471054311e-40
rep_filter || init0 || 3.87471054311e-40
lexordp2 || is_acyclicpath_of || 3.81362229402e-40
pred_option || |-2 || 3.78386189746e-40
remdups_adj || (Omega).0 || 3.71761141993e-40
pcr_rat cr_rat || WeightSelector 5 || 3.71589184208e-40
rev || (Omega).0 || 3.64187455629e-40
remdups_adj || Z_Lin || 3.56528230419e-40
comm_monoid || > || 3.55523622344e-40
comm_monoid || Open_Domains_of || 3.49241051011e-40
comm_monoid || Closed_Domains_of || 3.49241051011e-40
groups_monoid_list || elem_in_rel_1 || 3.47827882802e-40
rev || Z_Lin || 3.43197641956e-40
refl_on || is_S-limit_of || 3.36613348427e-40
none || VERUM || 3.33248271149e-40
monoid || elem_in_rel_2 || 3.2862477581e-40
finite_comp_fun_idem || is_a_condensation_point_of || 3.27594894387e-40
set2 || Affin || 3.25325784556e-40
id_on || ConstantNet || 3.24898712078e-40
monoid || is_oriented_vertex_seq_of || 3.24013327053e-40
distinct || rng || 3.14485220891e-40
bNF_Ca646678531ard_of || radix || 3.11126673233e-40
remdups_adj || superior_setsequence || 3.10721680176e-40
pcr_int cr_int || WeightSelector 5 || 3.09461557135e-40
comm_monoid_axioms || are_ldependent2 || 3.09301275987e-40
rev || superior_setsequence || 3.05771543578e-40
abel_semigroup || is_weight>=0of || 3.05354437984e-40
reflp || is_Lcontinuous_in || 3.03402815941e-40
reflp || is_Rcontinuous_in || 3.03402815941e-40
lexordp_eq || is_orientedpath_of || 2.97135622032e-40
distinct || dim || 2.95870939095e-40
transitive_rtranclp || are_congruent_mod0 || 2.90732161041e-40
finite_comp_fun_idem || are_convergent<=1_wrt || 2.8779156191e-40
cons || pr11 || 2.77920079861e-40
abel_s1917375468axioms || is_weight_of || 2.76844417218e-40
code_nat_of_integer || .Lifespan() || 2.69677484487e-40
pred3 || dom10 || 2.68587428622e-40
pred3 || cod6 || 2.68587428622e-40
pred3 || dom9 || 2.68587428622e-40
pred3 || cod7 || 2.68587428622e-40
groups828474808id_set || is_oriented_vertex_seq_of || 2.63758186812e-40
distinct || Lin0 || 2.62150530078e-40
finite852775215axioms || are_divergent_wrt || 2.61650664586e-40
distinct || Lim_K || 2.51762634891e-40
remdups || XFS2FS || 2.50679682692e-40
rotate1 || conv || 2.46364667128e-40
finite852775215axioms || is_an_accumulation_point_of || 2.44960232587e-40
rep_filter || MSSign0 || 2.4246656347e-40
hd || cod || 2.36754809462e-40
transitive_trancl || =>2 || 2.32954869474e-40
nat2 || entrance || 2.3207590398e-40
nat2 || escape || 2.3207590398e-40
lattic1543629303tr_set || > || 2.26778985658e-40
implode str || ELabelSelector 6 || 2.24360748607e-40
bNF_Ca646678531ard_of || Rotate || 2.20282909455e-40
remdups || (Omega).0 || 2.18317596777e-40
equiv_equivp || are_anti-isomorphic || 2.16255235622e-40
id_on || ++ || 2.13176042851e-40
is_filter || can_be_characterized_by || 2.11836024477e-40
pred_option || |- || 2.11456906164e-40
semiri1062155398ct_rel semiri882458588ct_rel || op0 {} || 2.10591032233e-40
finite_folding_idem || is_properly_applicable_to || 2.07052762178e-40
transitive_trancl || <=>0 || 2.06090251754e-40
transitive_rtrancl || \&\2 || 2.05862812534e-40
finite_finite2 || <= || 2.01691475871e-40
set2 || + || 1.94694225976e-40
equiv_equivp || are_isomorphic6 || 1.9426631959e-40
map_tailrec || FreeMSA || 1.92041524067e-40
partial_flat_ord || c=8 || 1.87525948759e-40
bNF_Cardinal_czero || *1 || 1.86478495924e-40
remdups || superior_setsequence || 1.84826949784e-40
eval || ID0 || 1.84310945561e-40
transitive_tranclp || are_equivalence_wrt || 1.80937947825e-40
lattic1543629303tr_set || <=1 || 1.77236171398e-40
lattic1543629303tr_set || is_vertex_seq_of || 1.75687522048e-40
semilattice_axioms || meets || 1.74304998725e-40
sin_coeff || +infty || 1.71726301941e-40
semigroup || is_weight_of || 1.65094636867e-40
nat2 || .order() || 1.62632759658e-40
code_pcr_natural code_cr_natural || WeightSelector 5 || 1.60744706978e-40
transitive_rtrancl || \nand\ || 1.59491059628e-40
remdups_adj || conv || 1.59108258952e-40
rev || conv || 1.57974745849e-40
relcompp || *20 || 1.56230083013e-40
refl_on || < || 1.54708937209e-40
finite100568337ommute || are_divergent_wrt || 1.496663196e-40
transitive_tranclp || is_acyclicpath_of || 1.48508006523e-40
finite852775215axioms || are_convergent_wrt || 1.46225809013e-40
set || Arg || 1.44763198582e-40
abel_semigroup || meets || 1.43905638724e-40
code_pcr_integer code_cr_integer || ELabelSelector 6 || 1.40276671616e-40
bit0 || ComplRelStr || 1.39553118465e-40
lattic35693393ce_set || meets || 1.39306673647e-40
order_well_order_on || <=1 || 1.38299908847e-40
distinct || Affin || 1.32644586668e-40
abel_semigroup || is_differentiable_in0 || 1.32342790739e-40
abel_semigroup || partially_orders || 1.32004758833e-40
groups_monoid_list || > || 1.31018513793e-40
equiv_part_equivp || are_dual || 1.29015015509e-40
semilattice_neutr || elem_in_rel_2 || 1.2582698993e-40
transitive_rtranclp || is_collinear0 || 1.24180892537e-40
monoid_axioms || is_vertex_seq_of || 1.23016351644e-40
finite_folding_idem || is_convergent_to || 1.22858798959e-40
finite100568337ommute || is_an_accumulation_point_of || 1.22206772389e-40
lattic1543629303tr_set || elem_in_rel_1 || 1.21715335084e-40
bot_bot || -0 || 1.20901692241e-40
comm_monoid_axioms || << || 1.18255275005e-40
monoid_axioms || <=1 || 1.17921099787e-40
code_integer_of_int || MCS:CSeq || 1.11900552401e-40
groups828474808id_set || Domains_Lattice || 1.10186321617e-40
abel_semigroup || are_opposite || 1.09956986365e-40
real || -infty || 1.09622307997e-40
abel_s1917375468axioms || quasi_orders || 1.05766138966e-40
reflp || are_dual || 1.05672876451e-40
produc2004651681e_prod || >= || 1.03531454845e-40
c_Predicate_Oeq || are_convergent_wrt || 1.0323750946e-40
bNF_Ca1811156065der_on || <=1 || 1.02848798341e-40
equiv_part_equivp || are_equivalent1 || 1.01514600926e-40
transitive_rtranclp || is_orientedpath_of || 1.01394847418e-40
hd || dim || 1.0126931188e-40
abel_s1917375468axioms || is_continuous_in5 || 9.98197658899e-41
code_integer_of_int || LexBFS:CSeq || 9.90665478096e-41
hd || rng || 9.80971016324e-41
finite1921348288axioms || is_applicable_to1 || 9.7226341265e-41
remdups || conv || 9.68788453975e-41
pred3 || cod0 || 9.68183947331e-41
pred3 || dom3 || 9.68183947331e-41
abel_s1917375468axioms || are_anti-isomorphic || 9.5736197055e-41
cos_coeff || 0 || 9.45646161281e-41
hd || Lin0 || 9.36329538452e-41
diffs || [....]5 || 9.07573095845e-41
nat_tr1645093318rphism || ProperBodyWhile>0 || 8.98857520931e-41
cons || in10 || 8.87636603381e-41
groups1716206716st_set || is_properly_applicable_to || 8.77284469907e-41
pred3 || .walkOf0 || 8.72127572584e-41
eval || id$ || 8.65599187571e-41
hd || Lim_K || 8.64854831957e-41
finite100568337ommute || are_convergent_wrt || 8.62224475904e-41
finite1921348288axioms || is_a_cluster_point_of0 || 8.61945671154e-41
reflp || are_equivalent1 || 8.50141993754e-41
groups_monoid_list || are_unifiable || 8.36898679741e-41
comm_monoid || is_continuous_in0 || 8.36262975836e-41
diffs || ]....[1 || 8.25231039612e-41
hd || dom1 || 8.01510942806e-41
groups1716206716st_set || is_convergent_to || 7.90626048538e-41
finite_comp_fun_idem || is_a_retraction_of || 7.81175956322e-41
inc || cliquecover#hash# || 7.80405734599e-41
monoid || are_weakly-unifiable || 7.79547223138e-41
semilattice_order || joins || 7.67125012569e-41
finite852775215axioms || is_an_UPS_retraction_of || 7.34710400618e-41
transitive_tranclp || Mid || 7.2551439831e-41
semilattice || .103 || 7.23671856309e-41
finite_folding || is_applicable_to1 || 7.18551587589e-41
semilattice || QuasiOrthoComplement_on || 7.17441207882e-41
semilattice || commutes-weakly_with || 7.17441207882e-41
implode str || WeightSelector 5 || 7.16187936137e-41
lattic35693393ce_set || IRR || 6.945828798e-41
product_case_prod || [=0 || 6.84484901608e-41
lattic35693393ce_set || commutes_with0 || 6.84251753396e-41
lattic35693393ce_set || OrthoComplement_on || 6.84251753396e-41
inc || chromatic#hash# || 6.8116014758e-41
comm_monoid || Open_Domains_Lattice || 6.7969254302e-41
comm_monoid || Closed_Domains_Lattice || 6.7969254302e-41
map || Free0 || 6.73763346328e-41
abel_semigroup || is_immediate_constituent_of || 6.69652417148e-41
semigroup || quasi_orders || 6.64757454364e-41
lattic1693879045er_set || orientedly_joins || 6.60769936463e-41
listMem || \<\ || 6.480017218e-41
is_none || r3_tarski || 6.40963667905e-41
semigroup || is_continuous_in5 || 6.40558578646e-41
groups387199878d_list || is_differentiable_in3 || 6.32541700975e-41
cons || pr21 || 6.31842172806e-41
groups828474808id_set || is_a_cluster_point_of0 || 6.2579623444e-41
inc || clique#hash# || 6.2294222831e-41
set2 || Cl || 6.14871721741e-41
cos_coeff || REAL || 6.14437556103e-41
rotate1 || MaxADSet || 6.13625731719e-41
inc || stability#hash# || 6.11414540315e-41
semigroup || are_anti-isomorphic || 5.85115855409e-41
finite_comp_fun_idem || are_critical_wrt || 5.76273127726e-41
finite_folding || is_a_cluster_point_of0 || 5.7219579278e-41
remdups || MaxADSet || 5.71101847471e-41
map_tailrec || Fr || 5.62249986129e-41
equiv_equivp || is_metric_of || 5.49346328482e-41
sum_Inr || NextLoc || 5.40849259479e-41
tl || cod || 5.26831743695e-41
pred3 || dom6 || 5.21603944428e-41
pred3 || cod3 || 5.21603944428e-41
bit1 || cliquecover#hash# || 5.09104671963e-41
pred_chain || joins || 5.04624937653e-41
none || code || 5.03453815765e-41
comm_monoid || is_convergent_to || 4.94970293293e-41
distinct || c=0 || 4.94781676724e-41
bit1 || chromatic#hash# || 4.86831599187e-41
groups828474808id_set || is_applicable_to1 || 4.79995584652e-41
tl || deg0 || 4.78684832831e-41
abel_s1917375468axioms || is_proper_subformula_of || 4.74533143126e-41
lexordp_eq || joins || 4.70560754728e-41
hd || Affin || 4.58290031638e-41
code_pcr_integer code_cr_integer || WeightSelector 5 || 4.54331850049e-41
semilattice_neutr || is_differentiable_in3 || 4.43408008744e-41
comm_monoid || is_properly_applicable_to || 4.35996536464e-41
bit1 || clique#hash# || 4.35436395448e-41
c_Predicate_Oeq || <=2 || 4.3524073426e-41
pred_maxchain || orientedly_joins || 4.34611923526e-41
bit1 || stability#hash# || 4.32195430599e-41
splice || il. || 4.32138755651e-41
groups387199878d_list || is_a_cluster_point_of0 || 4.2342309498e-41
set2 || max || 4.06600716139e-41
groups_monoid_list || is_continuous_in0 || 3.91551136219e-41
remdups_adj || MaxADSet || 3.80182975315e-41
map_tailrec || lim_inf1 || 3.61858746862e-41
rev || MaxADSet || 3.56396210715e-41
comm_monoid_axioms || is_a_cluster_point_of0 || 3.55699893088e-41
nil || STC || 3.53956005795e-41
map || BndAp || 3.52711243692e-41
cons || rpoly || 3.47879351998e-41
groups387199878d_list || is_applicable_to1 || 3.45793808258e-41
empty || O_el || 3.34376832816e-41
finite100568337ommute || is_an_UPS_retraction_of || 3.33988464794e-41
pos || Rev1 || 3.28996622435e-41
contained || \<\ || 3.23348021155e-41
lexordp2 || orientedly_joins || 3.23162487457e-41
semigroup || is_proper_subformula_of || 3.12750127868e-41
finite_folding_idem || is_differentiable_in5 || 3.11843819877e-41
pcr_literal cr_literal || TargetSelector 4 || 3.10494103104e-41
cons || B_SUP0 || 3.05033243759e-41
finite_comp_fun_idem || |=7 || 3.0231426898e-41
eval || .first() || 2.88639901356e-41
equiv_part_equivp || is_a_pseudometric_of || 2.88396509924e-41
bNF_Ca646678531ard_of || Cn || 2.88032049292e-41
bNF_Wellorder_wo_rel || is_elementary_subsystem_of || 2.8150628748e-41
code_integer_of_int || Rev1 || 2.79515349744e-41
eval || .last() || 2.75609467718e-41
bNF_Ca1811156065der_on || << || 2.612171302e-41
equiv_equivp || ~= || 2.54503996781e-41
pred_option || is-SuperConcept-of || 2.53668445374e-41
finite_comp_fun_idem || ==>1 || 2.50740098753e-41
divmod_nat_rel || |-| || 2.48014630641e-41
reflp || is_a_pseudometric_of || 2.42624541196e-41
finite852775215axioms || are_convertible_wrt || 2.38487296371e-41
semilattice_neutr || are_weakly-unifiable || 2.34036650749e-41
distinct || Cl || 2.31902297491e-41
lattic1543629303tr_set || are_unifiable || 2.24499625934e-41
sum_Inr || +38 || 2.21509139104e-41
complex2 || DTConUA || 2.21234119961e-41
monoid || is_differentiable_in3 || 2.13147977085e-41
comm_monoid_axioms || is_applicable_to1 || 2.13134749343e-41
finite852775215axioms || is_derivable_from || 2.1273388624e-41
sum_isl || \<\ || 2.12500934904e-41
divmod_nat || Cn || 2.11853448836e-41
map || ConstantNet || 2.11043271922e-41
groups828474808id_set || is_differentiable_in3 || 2.01854538394e-41
c_Predicate_Oeq || |-5 || 2.00745950183e-41
cons || in20 || 1.99607186567e-41
map_tailrec || gcd0 || 1.94396408779e-41
remdups || +` || 1.94154897017e-41
remdups || exp4 || 1.92287786278e-41
map || ALGO_GCD || 1.91888143073e-41
cons || \or\2 || 1.87377723269e-41
equiv_part_equivp || are_equivalent || 1.87003550533e-41
is_filter || c=0 || 1.85729246003e-41
nil || epsilon_ || 1.82533665033e-41
nat2 || LeftComp || 1.82449140681e-41
nat2 || RightComp || 1.80748906197e-41
tl || dom1 || 1.76414739414e-41
finite852775215axioms || |-2 || 1.75866281294e-41
groups1716206716st_set || is_differentiable_in5 || 1.74083146844e-41
order_well_order_on || |-| || 1.72834435837e-41
nat_of_num || .order() || 1.682452669e-41
groups_monoid_list || len- || 1.67001788253e-41
append || il. || 1.6382596376e-41
bNF_Ca1811156065der_on || |-| || 1.61364618437e-41
im || Terminals || 1.59377097881e-41
remdups || +^1 || 1.58286637197e-41
sum_Inl || B_SUP0 || 1.55877954035e-41
antisym || <==>0 || 1.55837989656e-41
finite100568337ommute || are_convertible_wrt || 1.54180683819e-41
code_nat_of_natural || P_cos || 1.51987546261e-41
finite1921348288axioms || is_continuous_in2 || 1.50807934644e-41
some || id$0 || 1.49027318372e-41
some || id$1 || 1.49027318372e-41
reflp || are_equivalent || 1.49007858196e-41
map_tailrec || Width || 1.42322804103e-41
nat2 || .Lifespan() || 1.3903594592e-41
code_int_of_integer || P_cos || 1.33488352912e-41
bNF_Wellorder_wo_rel || is_definable_in || 1.32965891775e-41
code_natural || to_power || 1.32697140912e-41
lattic1543629303tr_set || is_continuous_in0 || 1.31679173039e-41
trans || <==>0 || 1.28781824672e-41
lattic1693879045er_set || -are_isomorphic || 1.27687090033e-41
code_nat_of_integer || LeftComp || 1.27101039839e-41
none || Concept-with-all-Objects || 1.26102930071e-41
code_nat_of_integer || RightComp || 1.25502969187e-41
code_nat_of_integer || \not\11 || 1.24179579765e-41
nat_of_num || LeftComp || 1.20129130632e-41
nat_of_num || RightComp || 1.1885534772e-41
code_integer || to_power || 1.18193832618e-41
abel_semigroup || is_differentiable_on6 || 1.17464233193e-41
contained || is_sequence_on || 1.14872302304e-41
ring_1_of_int || to_power0 || 1.13258741823e-41
semiring_1_of_nat || to_power0 || 1.12398739681e-41
finite_folding || is_continuous_in2 || 1.12049109759e-41
groups_monoid_list || limit- || 1.08268416423e-41
semilattice_order || -are_equivalent || 1.04612900997e-41
sum_Inr || il. || 1.03987325208e-41
finite100568337ommute || is_derivable_from || 1.0315215463e-41
one2 || 0q0 || 1.03150430072e-41
groups828474808id_set || is_continuous_in2 || 1.00825630902e-41
finite100568337ommute || |-2 || 1.0063359023e-41
monoid || proj1 || 9.80732794933e-42
empty || <*> || 9.78998406209e-42
pos || MCS:CSeq || 9.74556557509e-42
inc || .Lifespan() || 9.6017888831e-42
fun_is_measure || meets || 9.52937726921e-42
the2 || dom10 || 9.3658164352e-42
the2 || cod6 || 9.3658164352e-42
the2 || dom9 || 9.3658164352e-42
the2 || cod7 || 9.3658164352e-42
rep_filter || +` || 9.29899143917e-42
rep_filter || exp4 || 9.18838530894e-42
comm_monoid || is_differentiable_in5 || 9.09911781825e-42
comm_monoid || .103 || 8.50994392059e-42
append || *113 || 8.49445312184e-42
append || *141 || 8.49445312184e-42
pos || LexBFS:CSeq || 8.494171092e-42
pred_maxchain || -are_isomorphic || 8.45129470133e-42
monoid_axioms || is_continuous_in0 || 8.41668478859e-42
pow || 0q || 8.41487922573e-42
pow || -42 || 8.27152889992e-42
hd || Cl || 8.21269524385e-42
antisym || is_parametrically_definable_in || 8.19038267405e-42
divmod_nat || radix || 8.07283313901e-42
equiv_equivp || is_weight>=0of || 8.05202497443e-42
sum_Inl || \or\2 || 7.99080384751e-42
listMem || <=2 || 7.79689842098e-42
abel_s1917375468axioms || is_continuous_on0 || 7.53078997027e-42
transitive_trancl || \not\5 || 7.41373953549e-42
bNF_Wellorder_wo_rel || is_right_differentiable_in || 7.38454778557e-42
bNF_Wellorder_wo_rel || is_left_differentiable_in || 7.38454778557e-42
rep_filter || +^1 || 7.25692376789e-42
groups387199878d_list || is_continuous_in2 || 7.01662739375e-42
pred_chain || -are_equivalent || 6.95011080152e-42
pcr_real cr_real || TargetSelector 4 || 6.86622696171e-42
groups828474808id_set || IRR || 6.793350571e-42
trans || is_parametrically_definable_in || 6.66753755689e-42
some || ID0 || 6.6632858199e-42
bit1 || .order() || 6.40388157246e-42
map || Len || 6.37105528062e-42
fun_is_measure || are_equivalent2 || 6.34711375893e-42
cons || *112 || 6.26267723976e-42
cons || *140 || 6.26267723976e-42
antisym || is_Lcontinuous_in || 6.14175132464e-42
antisym || is_Rcontinuous_in || 6.14175132464e-42
transitive_trancl || SepVar || 6.08434616463e-42
equiv_equivp || is_differentiable_in0 || 6.03018915187e-42
set || Tunit_ball || 5.97044564855e-42
pcr_rat cr_rat || TargetSelector 4 || 5.78632011689e-42
null || c=0 || 5.5802967605e-42
code_integer_of_int || FlatCoh || 5.41542578436e-42
sum_Inr || vect || 5.40502534177e-42
finite_psubset || TOP-REAL || 5.33476487542e-42
nat_tr1645093318rphism || r1_huffman1 || 5.24074644638e-42
semigroup || is_continuous_on0 || 5.19622602652e-42
equiv_part_equivp || is_weight_of || 5.13351499893e-42
transitive_acyclic || QuasiOrthoComplement_on || 5.02843896292e-42
transitive_acyclic || commutes-weakly_with || 5.02843896292e-42
finite852775215axioms || are_coplane || 4.99054114896e-42
pcr_int cr_int || TargetSelector 4 || 4.91562792034e-42
pred3 || Sub_the_argument_of || 4.82872998946e-42
trans || is_Lcontinuous_in || 4.72678403336e-42
trans || is_Rcontinuous_in || 4.72678403336e-42
divmod_nat_rel || <=1 || 4.61314061003e-42
cons || +31 || 4.59980932289e-42
sum_isl || <=2 || 4.59421926532e-42
finite_comp_fun_idem || #slash##slash#8 || 4.53937826768e-42
comm_monoid_axioms || is_continuous_in2 || 4.52772422939e-42
sum_Inl || +31 || 4.49800882873e-42
transitive_rtrancl || still_not-bound_in || 4.38032614442e-42
nat2 || FlatCoh || 4.29534865688e-42
transitive_trancl || .reverse() || 4.28364868806e-42
reflp || is_weight_of || 4.22003406266e-42
transitive_rtranclp || joins || 4.1331152698e-42
pos || ~0 || 4.04860140306e-42
nat2 || Filt || 3.94256183456e-42
code_integer_of_int || ~0 || 3.93406474045e-42
transitive_rtrancl || index0 || 3.92064978084e-42
trans || are_homeomorphic || 3.84545112693e-42
equiv_equivp || is_immediate_constituent_of || 3.70513147038e-42
nat2 || Ids || 3.69106372745e-42
lattic1543629303tr_set || len- || 3.67676265138e-42
finite_comp_fun_idem || is_unif_conv_on || 3.65046685834e-42
transitive_trancl || -6 || 3.57038461318e-42
the2 || cod0 || 3.56434464038e-42
the2 || dom3 || 3.56434464038e-42
equiv_equivp || are_opposite || 3.48254004375e-42
groups828474808id_set || [= || 3.43295560524e-42
some || id$ || 3.42507315519e-42
pred3 || FS2XFS || 3.33883231459e-42
equiv_part_equivp || is_continuous_in5 || 3.33587564098e-42
wf || are_homeomorphic || 3.32426862208e-42
transitive_tranclp || orientedly_joins || 3.29356525132e-42
wf || commutes_with0 || 3.22992727016e-42
wf || OrthoComplement_on || 3.22992727016e-42
code_nat_of_integer || Filt || 3.17656897056e-42
sum_Inr || +65 || 3.12977913466e-42
sum_Inl || +65 || 3.12977913466e-42
bit0 || MCS:CSeq || 3.05950379882e-42
id_on || nf || 2.98175839237e-42
comm_monoid_axioms || [= || 2.91242437462e-42
code_integer_of_int || bool || 2.8519237965e-42
code_nat_of_integer || Ids || 2.83986260417e-42
monoid || topology || 2.8335283795e-42
bit0 || LexBFS:CSeq || 2.81359151554e-42
reflp || is_continuous_in5 || 2.80960973779e-42
finite_folding_idem || is_oriented_vertex_seq_of || 2.79030522323e-42
refl_on || is_a_normal_form_of || 2.77304599451e-42
pred3 || id2 || 2.7680889589e-42
code_pcr_natural code_cr_natural || TargetSelector 4 || 2.73971198389e-42
nat2 || bool || 2.68971572684e-42
groups1716206716st_set || is_eventually_in || 2.63187445605e-42
nat_of_num || Filt || 2.59029101887e-42
eval || Sub_not || 2.58841071779e-42
bNF_Wellorder_wo_rel || are_anti-isomorphic || 2.49570980512e-42
lattic1543629303tr_set || limit- || 2.48800474529e-42
fun_is_measure || are_fiberwise_equipotent || 2.46600956021e-42
groups828474808id_set || is_often_in || 2.45854008051e-42
transitive_rtrancl || Free1 || 2.45327337614e-42
transitive_rtrancl || Fixed || 2.45327337614e-42
semilattice || is_differentiable_in || 2.42453512934e-42
semilattice_neutr || proj1 || 2.38724530691e-42
nat_of_num || Ids || 2.37569293579e-42
semilattice || elem_in_rel_2 || 2.32866372928e-42
semiri1062155398ct_rel semiri882458588ct_rel || EdgeSelector 2 || 2.30909176051e-42
groups_monoid_list || lambda0 || 2.28479796499e-42
lattic35693393ce_set || elem_in_rel_1 || 2.24229913865e-42
finite100568337ommute || are_coplane || 2.17165493401e-42
equiv_part_equivp || are_anti-isomorphic || 2.16441155429e-42
product_Unity || k11_gaussint || 2.15755134161e-42
finite852775215axioms || is_point_conv_on || 2.15688809065e-42
groups1716206716st_set || is_oriented_vertex_seq_of || 2.10696031268e-42
monoid || is_homomorphism1 || 2.09546425412e-42
eval || cod || 2.08716032093e-42
eval || dom1 || 2.08716032093e-42
the2 || dom6 || 2.07812871577e-42
the2 || cod3 || 2.07812871577e-42
finite_folding_idem || is_eventually_in || 2.0284610192e-42
groups_monoid_list || sigma || 1.9860947656e-42
equiv_part_equivp || is_proper_subformula_of || 1.9576901772e-42
groups1716206716st_set || c=1 || 1.91413566658e-42
transitive_rtrancl || ||....||2 || 1.89968614932e-42
comm_monoid || c=1 || 1.89331821267e-42
bNF_Wellorder_wo_rel || are_isomorphic6 || 1.88566255189e-42
code_nat_of_integer || OpenClosedSet || 1.83679649762e-42
comm_monoid || is_eventually_in || 1.83367799366e-42
groups_monoid_list || is_succ_homomorphism || 1.82219808943e-42
sum_Inr || <=>3 || 1.81968801348e-42
groups387199878d_list || [= || 1.81860254825e-42
pred3 || term4 || 1.81378346284e-42
pred3 || init0 || 1.81378346284e-42
eval || .walkOf0 || 1.81256882676e-42
lexordp_eq || -are_equivalent || 1.80456098878e-42
map_add || #slash##bslash#16 || 1.79793741127e-42
map_add || @25 || 1.79793741127e-42
reflp || are_anti-isomorphic || 1.79365611638e-42
finite_comp_fun_idem || _|_2 || 1.7859790146e-42
lexordp2 || -are_isomorphic || 1.75563382486e-42
eval || XFS2FS || 1.73593695551e-42
code_integer_of_int || StoneSpace || 1.6909879506e-42
reflp || is_proper_subformula_of || 1.66354827396e-42
antisym || are_dual || 1.65734887277e-42
finite1921348288axioms || is_often_in || 1.5877098827e-42
pred3 || cod || 1.5812406818e-42
pred3 || dom1 || 1.5812406818e-42
finite1921348288axioms || [= || 1.5811230001e-42
eval || id2 || 1.55581356821e-42
nat_of_num || d#quote#. || 1.54785841001e-42
groups387199878d_list || is_often_in || 1.52083014726e-42
semilattice_neutr || topology || 1.51757725831e-42
sum_Inr || +81 || 1.49839726281e-42
sum_Inl || +81 || 1.49839726281e-42
induct_implies || \or\3 || 1.49838974487e-42
transitive_rtrancl || .cost()0 || 1.47366904859e-42
comm_monoid_axioms || is_often_in || 1.41825162892e-42
transitive_rtrancl || .edges() || 1.38199630728e-42
transitive_trancl || \not\0 || 1.37526734668e-42
trans || are_dual || 1.34177032999e-42
finite1921348288axioms || is_vertex_seq_of || 1.33787612078e-42
cnj || opp10 || 1.33703035655e-42
implode str || TargetSelector 4 || 1.32951472581e-42
induct_conj || \&\2 || 1.28769067183e-42
null || tolerates || 1.28433690402e-42
groups828474808id_set || is_vertex_seq_of || 1.25678289082e-42
finite100568337ommute || is_point_conv_on || 1.25503506565e-42
transitive_rtrancl || .vertices() || 1.18709662742e-42
semilattice_axioms || is_continuous_in || 1.18658986128e-42
equiv_equivp || |=8 || 1.16475655712e-42
comm_monoid || is_oriented_vertex_seq_of || 1.14241097707e-42
lattic1543629303tr_set || lambda0 || 1.14122732831e-42
groups1716206716st_set || divides1 || 1.13999579853e-42
groups828474808id_set || <=\ || 1.13313033234e-42
antisym || are_equivalent1 || 1.10704984584e-42
transitive_rtrancl || the_set_of_l2ComplexSequences || 1.10503085265e-42
complex2 || OSSubAlLattice || 1.07008946121e-42
induct_conj || gcd || 1.06496579536e-42
finite_folding || is_often_in || 1.05249149789e-42
transitive_rtrancl || ||....||3 || 1.05149650026e-42
nat2 || StoneR || 1.0472378045e-42
finite_folding || is_vertex_seq_of || 1.01188496839e-42
pos || root-tree2 || 1.01025808307e-42
abel_semigroup || is_immediate_constituent_of0 || 1.00948218558e-42
lattic1543629303tr_set || sigma || 1.00265165704e-42
finite852775215axioms || are_ldependent2 || 9.73753377243e-43
finite_folding_idem || c=1 || 9.71375791121e-43
eval || term4 || 9.38729269516e-43
eval || init0 || 9.38729269516e-43
semilattice_neutr || is_homomorphism1 || 9.26360260446e-43
trans || are_equivalent1 || 9.1702354715e-43
equiv_equivp || is_differentiable_on6 || 9.01442892539e-43
code_pcr_integer code_cr_integer || TargetSelector 4 || 8.84307900151e-43
pred3 || .first() || 8.82145878743e-43
abel_semigroup || is_continuous_in || 8.63300745455e-43
single || -\ || 8.58648216952e-43
groups387199878d_list || is_vertex_seq_of || 8.42559113303e-43
pred3 || ProjFinSeq || 8.37751223862e-43
is_none || are_isomorphic || 8.30627033467e-43
pred3 || .last() || 8.30286691525e-43
is_empty2 || c= || 8.27888728912e-43
induct_implies || +1 || 8.27845898691e-43
comm_monoid || divides1 || 8.22609598168e-43
lattic35693393ce_set || is_continuous_in || 8.20861588532e-43
bNF_Ca646678531ard_of || \not\0 || 8.08574343791e-43
finite_folding || [= || 8.03028410587e-43
rotate || <=>3 || 7.73992872012e-43
semila1450535954axioms || is_continuous_in1 || 7.64735157252e-43
sum_Inr || -95 || 7.530895496e-43
pcr_literal cr_literal || SourceSelector 3 || 7.47967035971e-43
nat2 || max_Data-Loc_in || 7.35060429474e-43
pred3 || CastSeq || 7.34794840799e-43
pred3 || CastSeq0 || 7.34794840799e-43
lattic1543629303tr_set || is_succ_homomorphism || 7.28347539315e-43
finite_folding_idem || divides1 || 7.20852062258e-43
sum_Inr || +87 || 7.16761266673e-43
sum_Inl || +87 || 7.16761266673e-43
abs_filter || Half || 7.12031455795e-43
re || 1. || 7.11717668622e-43
order_well_order_on || is_subformula_of || 6.99392486305e-43
is_empty || <= || 6.98685983271e-43
transitive_trancl || #quote#15 || 6.88745213364e-43
rep_filter || Double0 || 6.82732936968e-43
groups387199878d_list || <=\ || 6.82543992361e-43
rotate1 || `5 || 6.81641081924e-43
comm_monoid_axioms || <=\ || 6.62189151227e-43
nat_tr1645093318rphism || -are_equivalent || 6.47751078978e-43
set2 || +*0 || 6.31666180808e-43
bNF_Wellorder_wo_rel || is_metric_of || 6.189178513e-43
im || Top || 6.18087035058e-43
abel_s1917375468axioms || is_proper_subformula_of0 || 5.98370583914e-43
transitive_rtrancl || carr || 5.97370364779e-43
finite1921348288axioms || <=\ || 5.93720745595e-43
finite100568337ommute || are_ldependent2 || 5.89275790139e-43
eval || CastSeq || 5.62688025926e-43
eval || CastSeq0 || 5.62688025926e-43
none || ~0 || 5.57218579825e-43
comm_monoid_axioms || is_vertex_seq_of || 5.56273668726e-43
basic_BNF_xtor || -81 || 5.49959429629e-43
cnj || .:10 || 5.31616566758e-43
semilattice_order || is_differentiable_in4 || 5.29885058429e-43
monoid || |-|0 || 5.02216867978e-43
bNF_Wellorder_wo_rel || ~= || 4.79835228765e-43
none || epsilon_ || 4.78962589168e-43
rep_filter || NEG_MOD || 4.69031034305e-43
bNF_Ca646678531ard_of || {..}21 || 4.66379752064e-43
equiv_part_equivp || |-3 || 4.58050018481e-43
equiv_part_equivp || is_continuous_on0 || 4.4385982099e-43
is_none || c=0 || 4.39228398327e-43
semigroup || is_proper_subformula_of0 || 4.30452351804e-43
reflp || |-3 || 4.06073656908e-43
pcr_literal cr_literal || op0 {} || 4.05075713701e-43
bNF_Ca1811156065der_on || is_subformula_of || 4.03516586594e-43
transitive_rtrancl || QuantNbr || 3.96079830431e-43
finite_folding || <=\ || 3.90554888897e-43
eval || Sum9 || 3.86215968883e-43
antisym || are_equivalent || 3.84301373267e-43
reflp || is_continuous_on0 || 3.83016626505e-43
cnj || center0 || 3.70837243705e-43
antisym || is_a_pseudometric_of || 3.6360334729e-43
sum_Inr || Pcom || 3.5961307804e-43
append || -82 || 3.42017797046e-43
groups_monoid_list || is_an_universal_closure_of || 3.41633168075e-43
re || 0. || 3.21425801731e-43
comm_monoid || elem_in_rel_2 || 3.16547945013e-43
semilattice_neutr || |-|0 || 3.06212637687e-43
trans || is_a_pseudometric_of || 3.02662322015e-43
trans || are_equivalent || 3.02608284149e-43
rep_filter || uparrow0 || 2.98638720796e-43
cons || +94 || 2.86418580863e-43
semila1450535954axioms || is_collinear0 || 2.81172884639e-43
nat_tr1645093318rphism || is_dst || 2.73009463725e-43
listMem || c=5 || 2.72007064421e-43
finite_comp_fun_idem || is_convergent_to || 2.68522331083e-43
is_filter || is_expressible_by || 2.65904121747e-43
image || #quote#2 || 2.63017518832e-43
pred_option || is_coarser_than0 || 2.59681499272e-43
groups828474808id_set || elem_in_rel_1 || 2.57101347293e-43
id2 || id1 || 2.57088352188e-43
finite852775215axioms || is_a_cluster_point_of0 || 2.55711519501e-43
code_nat_of_integer || max_Data-Loc_in || 2.52920291137e-43
bNF_Ca1811156065der_on || is_immediate_constituent_of1 || 2.48740998534e-43
groups_monoid_list || <==>1 || 2.47001567291e-43
order_well_order_on || in1 || 2.35201503374e-43
nat_of_num || CONGRD || 2.32215241991e-43
bNF_Ca1811156065der_on || in1 || 2.23309106689e-43
semilattice_order || Mid || 2.11188195791e-43
nat2 || d#quote#. || 1.9460249827e-43
pcr_real cr_real || SourceSelector 3 || 1.91288285637e-43
lattic1543629303tr_set || is_an_universal_closure_of || 1.90532081926e-43
code_integer_of_int || root-tree2 || 1.83445995541e-43
abel_semigroup || c= || 1.75275302642e-43
is_filter || is_proper_subformula_of0 || 1.7412688648e-43
map_add || #slash##bslash#17 || 1.66170180288e-43
measure || +84 || 1.65872620555e-43
eval || Sub_the_argument_of || 1.64963795205e-43
pcr_rat cr_rat || SourceSelector 3 || 1.63826784559e-43
wf || <1 || 1.63610113659e-43
lattic35693393ce_set || len- || 1.62078838835e-43
pred3 || Sub_not || 1.50484401456e-43
the2 || cod || 1.44500064157e-43
the2 || dom1 || 1.44500064157e-43
bNF_Wellorder_wo_rel || is_weight>=0of || 1.43850596971e-43
cons || +54 || 1.43379270662e-43
sum_Inr || @4 || 1.43235033049e-43
some || id2 || 1.42105677982e-43
set2 || #bslash#3 || 1.4163819469e-43
lattic1543629303tr_set || <==>1 || 1.41377811306e-43
pcr_int cr_int || SourceSelector 3 || 1.41324169203e-43
finite_comp_fun_idem || is_properly_applicable_to || 1.39328915309e-43
abs_filter || inf || 1.37065822161e-43
pos || AV || 1.35927904598e-43
is_filter || ex_inf_of || 1.27938253383e-43
nat_tr1645093318rphism || |=3 || 1.25889089973e-43
measures || +84 || 1.24689464938e-43
finite100568337ommute || is_a_cluster_point_of0 || 1.24050506128e-43
semilattice || topology || 1.21442835544e-43
semilattice || proj1 || 1.15515978081e-43
lattic35693393ce_set || limit- || 1.15250954736e-43
none || {}0 || 1.13580157336e-43
rep_filter || downarrow0 || 1.13149033262e-43
wf || is_strictly_convex_on || 1.10180924641e-43
transitive_acyclic || is_strongly_quasiconvex_on || 1.09808650876e-43
sum_Inr || #hash#7 || 1.09499043443e-43
bit0 || Tempty_e_net || 1.09468880928e-43
pcr_real cr_real || op0 {} || 1.05962523401e-43
measure || lcm || 1.04640020762e-43
equiv_equivp || is_immediate_constituent_of0 || 1.03629938205e-43
abel_s1917375468axioms || is_finer_than || 1.00781020237e-43
antisym || is_weight_of || 1.00711065744e-43
pow || *\18 || 1.00454448867e-43
nat2 || CONGR || 9.98179170394e-44
id2 || ~0 || 9.68936572044e-44
c_Predicate_Oeq || are_convertible_wrt || 9.30152913017e-44
bNF_Wellorder_wo_rel || is_differentiable_in0 || 9.27041667802e-44
rep_filter || WFF || 9.25883557841e-44
some || .walkOf0 || 9.24405974436e-44
bNF_Ca646678531ard_of || id$0 || 9.15797302882e-44
bNF_Ca646678531ard_of || id$1 || 9.15797302882e-44
pcr_rat cr_rat || op0 {} || 9.09789642209e-44
finite852775215axioms || is_applicable_to1 || 8.93908134199e-44
bNF_Ca646678531ard_of || ID0 || 8.89245200677e-44
eval || FS2XFS || 8.86469861487e-44
lattic35693393ce_set || lambda0 || 8.82534155144e-44
abel_s1917375468axioms || tolerates || 8.68402074384e-44
fun_is_measure || embeds0 || 8.58986724011e-44
bNF_Wellorder_wo_rel || partially_orders || 8.57921955282e-44
code_pcr_natural code_cr_natural || SourceSelector 3 || 8.31719502784e-44
bit1 || id6 || 8.24605153568e-44
trans || is_weight_of || 8.188507726e-44
some || term4 || 8.15833066864e-44
some || init0 || 8.15833066864e-44
basic_BNF_xtor || -22 || 8.03631786136e-44
basic_BNF_xtor || !6 || 8.03631786136e-44
pcr_int cr_int || op0 {} || 7.86700713271e-44
groups1716206716st_set || is_differentiable_in3 || 7.86619263722e-44
rotate1 || #slash##bslash#0 || 7.8513374202e-44
rep_filter || \or\4 || 7.85088982588e-44
lattic35693393ce_set || sigma || 7.84515216366e-44
pred3 || XFS2FS || 7.78795068173e-44
the2 || Sub_the_argument_of || 7.70699297266e-44
wf || divides0 || 7.53874062724e-44
pos || SetMajorant || 7.43071102948e-44
semigroup || is_finer_than || 7.40482222218e-44
pos || SetMinorant || 7.38777861202e-44
measures || lcm || 7.27912748416e-44
nat2 || min0 || 7.16445597859e-44
nat2 || max0 || 7.05949850368e-44
finite852775215axioms || [= || 6.91634387116e-44
inc || entrance || 6.90754006975e-44
inc || escape || 6.90754006975e-44
map_add || concur || 6.71811800213e-44
semigroup || tolerates || 6.61977271374e-44
code_integer_of_int || SetMinorant || 6.51673436878e-44
code_integer_of_int || SetMajorant || 6.49519716587e-44
refl_on || |-| || 6.38206338272e-44
order_well_order_on || is_proper_subformula_of1 || 6.10315566244e-44
id_on || Cn || 5.98312635886e-44
rev || #slash##bslash#0 || 5.8299476289e-44
transitive_acyclic || is_convex_on || 5.78800289145e-44
antisym || is_continuous_in5 || 5.68346684727e-44
remdups_adj || #slash##bslash#0 || 5.65648204577e-44
sum_isl || c=5 || 5.64736212777e-44
bNF_Wellorder_wo_rel || is_immediate_constituent_of || 5.64733593203e-44
finite_folding_idem || is_differentiable_in3 || 5.56200050258e-44
antisym || quasi_orders || 5.50071874288e-44
groups828474808id_set || is_continuous_in0 || 5.4443360042e-44
code_nat_of_integer || min0 || 5.26978469698e-44
finite100568337ommute || is_applicable_to1 || 5.21299118363e-44
code_nat_of_integer || max0 || 5.20826918135e-44
one2 || one || 5.07100072282e-44
null || are_isomorphic6 || 4.88607579101e-44
equiv_part_equivp || is_proper_subformula_of0 || 4.85251533702e-44
distinct || #bslash#3 || 4.82161808874e-44
is_filter || ex_sup_of || 4.76373342472e-44
comm_monoid || is_differentiable_in3 || 4.76011987651e-44
abs_filter || sup1 || 4.75102004163e-44
trans || is_continuous_in5 || 4.73770965672e-44
code_pcr_natural code_cr_natural || op0 {} || 4.66935416943e-44
sum_Inl || +54 || 4.66428985035e-44
nat_of_num || min0 || 4.65934686444e-44
nat_of_num || max0 || 4.62509536521e-44
the2 || .first() || 4.59891753832e-44
distinct || divides0 || 4.57758909417e-44
trans || quasi_orders || 4.55297538672e-44
the2 || .last() || 4.34333614129e-44
implode str || SourceSelector 3 || 4.31245865392e-44
some || Sub_not || 4.25948977143e-44
reflp || is_proper_subformula_of0 || 4.24719252273e-44
id_on || radix || 4.18137313491e-44
field2 || dom10 || 4.04168897066e-44
field2 || cod6 || 4.04168897066e-44
field2 || dom9 || 4.04168897066e-44
field2 || cod7 || 4.04168897066e-44
antisym || are_isomorphic || 3.80109936027e-44
sym || are_isomorphic || 3.76627569336e-44
remdups || #slash##bslash#0 || 3.70696409711e-44
rep_filter || .:13 || 3.52610849954e-44
nil || Concretized || 3.52508100093e-44
sum_Inr || +32 || 3.50839323286e-44
field2 || cod0 || 3.46963000429e-44
field2 || dom3 || 3.46963000429e-44
groups387199878d_list || is_continuous_in0 || 3.38096770242e-44
suc_Rep || carrier || 3.35375773924e-44
trans || are_isomorphic || 3.35021556072e-44
antisym || is_proper_subformula_of || 3.31287160337e-44
finite_comp_fun_idem || c=1 || 3.28045711333e-44
comm_monoid || topology || 3.23211143448e-44
null || divides0 || 3.21748195013e-44
bit0 || ~0 || 3.12519564274e-44
abs_filter || .:14 || 3.09156568333e-44
finite_comp_fun_idem || is_differentiable_in5 || 3.03958457488e-44
map_tailrec || div || 3.00851278814e-44
code_pcr_integer code_cr_integer || SourceSelector 3 || 2.97595617097e-44
finite1921348288axioms || is_continuous_in0 || 2.93731346277e-44
rep_filter || .:14 || 2.90700696205e-44
equiv_equivp || c= || 2.89932800737e-44
equiv_equivp || |-3 || 2.87569688116e-44
bNF_Ca646678531ard_of || id$ || 2.87533593195e-44
abs_filter || .:13 || 2.83269115924e-44
trans || is_proper_subformula_of || 2.78712276849e-44
remdups || lcm || 2.77607921075e-44
append || |^7 || 2.64353083949e-44
nil || abs || 2.60686692213e-44
comm_monoid_axioms || is_continuous_in0 || 2.48314187326e-44
implode str || op0 {} || 2.44624281838e-44
refl_on || <=1 || 2.4067820213e-44
finite_folding || is_continuous_in0 || 2.22664988193e-44
finite100568337ommute || [= || 2.20796328296e-44
rep_filter || Net-Str2 || 2.20163834004e-44
nat2 || \not\11 || 2.1273606815e-44
equiv_part_equivp || |=8 || 2.11242552218e-44
cons || |^3 || 2.09971113524e-44
inc || LattPOSet || 2.0713164217e-44
groups828474808id_set || lambda0 || 2.04834416405e-44
inc || Filt || 2.00812224906e-44
finite852775215axioms || is_continuous_in2 || 1.98139584597e-44
groups828474808id_set || sigma || 1.85334928168e-44
nat_of_num || FlatCoh || 1.77951619468e-44
basic_BNF_xtor || Bottom1 || 1.77820078647e-44
inc || Ids || 1.7732089882e-44
divmod_nat || {..}21 || 1.7678093014e-44
reflp || |=8 || 1.7392194176e-44
code_pcr_integer code_cr_integer || op0 {} || 1.69786950612e-44
hd || #bslash#3 || 1.67679568945e-44
distinct || are_isomorphic6 || 1.66366834976e-44
divmod_nat_rel || in1 || 1.64680801691e-44
groups_monoid_list || upper_bound1 || 1.63804436672e-44
map || frac0 || 1.63392206449e-44
nil || -0 || 1.58160784774e-44
pos || FlatCoh || 1.58017382552e-44
abs_filter || the_argument_of || 1.56420712697e-44
neg2 || is_similar_to || 1.49792464624e-44
monoid || *86 || 1.47955140088e-44
bNF_Wellorder_wo_rel || is_differentiable_on6 || 1.45399051306e-44
code_nat_of_integer || sqrt0 || 1.44453262621e-44
sum_Inr || with-replacement || 1.43136172799e-44
abel_semigroup || <N< || 1.42769409952e-44
the2 || CastSeq0 || 1.42397383599e-44
bit1 || Filt || 1.38106272506e-44
abs_filter || lim_inf1 || 1.35724142341e-44
bNF_Wellorder_wo_rel || |=8 || 1.34864513937e-44
bit1 || .:7 || 1.34382532292e-44
remdups || MSSign0 || 1.34314316969e-44
bit1 || Ids || 1.32495206465e-44
equiv_part_equivp || is_finer_than || 1.31860337689e-44
field2 || dom6 || 1.24778687418e-44
field2 || cod3 || 1.24778687418e-44
rep_filter || \not\5 || 1.18267029778e-44
equiv_part_equivp || tolerates || 1.17597331764e-44
finite100568337ommute || is_continuous_in2 || 1.16725245517e-44
reflp || is_finer_than || 1.16314773048e-44
some || CastSeq || 1.08820268084e-44
null2 || are_isomorphic6 || 1.08590833395e-44
distinct || can_be_characterized_by || 1.05830639053e-44
reflp || tolerates || 1.05062836635e-44
cnj || \in\ || 1.0462193342e-44
finite852775215axioms || is_often_in || 1.03488444845e-44
finite_comp_fun_idem || is_eventually_in || 1.00305615476e-44
groups828474808id_set || len- || 9.47944221819e-45
lattic1693879045er_set || is_differentiable_in4 || 9.45963417294e-45
code_nat_of_integer || CONGR || 8.93900581122e-45
empty || Concretized || 8.89806142514e-45
eval || ProjFinSeq || 8.89456744739e-45
pcr_literal cr_literal || EdgeSelector 2 || 8.78450136354e-45
pos || bool || 8.71195303467e-45
nat_of_num || bool || 8.68364716636e-45
semilattice_order || is_continuous_in1 || 8.57994042497e-45
map_add || before || 8.42392119058e-45
comm_monoid || proj1 || 8.1793950534e-45
code_integer_of_int || ^21 || 8.11174443927e-45
nat2 || CONGRD || 8.07768347141e-45
antisym || is_continuous_on0 || 7.95511598304e-45
listMem || divides1 || 7.70290659156e-45
groups828474808id_set || limit- || 7.20693415127e-45
lattic1693879045er_set || Mid || 7.15273082725e-45
code_integer_of_int || AV || 6.89338963467e-45
trans || is_continuous_on0 || 6.80076622961e-45
pred_maxchain || is_differentiable_in4 || 6.75768128397e-45
pred3 || Sum9 || 6.75026505686e-45
lattic1543629303tr_set || upper_bound1 || 6.72112718402e-45
semilattice_neutr || *86 || 6.5219564884e-45
finite_folding_idem || > || 6.47240492417e-45
nat2 || abs8 || 6.37467188632e-45
sum_isl || divides1 || 6.35716810508e-45
code_nat_of_integer || ^28 || 6.34008153607e-45
sum_Inl || lcm2 || 6.21572708361e-45
pred_chain || is_continuous_in1 || 6.1430827215e-45
semilattice_order || is_collinear0 || 6.06763659301e-45
antisym || |-3 || 5.9796570314e-45
bit0 || fsloc || 5.81150435211e-45
re || variables_in4 || 5.65403776304e-45
insert3 || #quote##bslash##slash##quote#5 || 5.58867460418e-45
bit1 || intloc || 5.40531786941e-45
trans || |-3 || 5.25737320177e-45
pred_maxchain || Mid || 5.10809775365e-45
c_Predicate_Oeq || [=0 || 5.04004037289e-45
finite100568337ommute || is_often_in || 5.0323468396e-45
cnj || -14 || 5.00526885049e-45
abel_s1917375468axioms || meets || 4.9424268492e-45
finite852775215axioms || <=\ || 4.93922187498e-45
one2 || Rea0 || 4.92537023693e-45
cons || lcm2 || 4.9186210428e-45
map_add || #slash##bslash#15 || 4.87015348278e-45
insert3 || #quote##bslash##slash##quote#2 || 4.75015458606e-45
re || Free || 4.72045076874e-45
finite_comp_fun_idem || divides1 || 4.58260338236e-45
nO_MATCH || are_relative_prime || 4.38131143349e-45
pred_chain || is_collinear0 || 4.34546618429e-45
divmod_nat_rel || is_subformula_of || 4.32906071231e-45
semigroup || meets || 4.10766820558e-45
pos2 || is_similar_to || 4.0876150709e-45
member3 || [=1 || 4.06848416953e-45
nat2 || ^27 || 4.05292372692e-45
suc_Rep || idsym || 3.99214328321e-45
finite_comp_fun_idem || is_oriented_vertex_seq_of || 3.83442074751e-45
divmod_nat || \not\0 || 3.78656559156e-45
equiv_equivp || <N< || 3.78428945339e-45
finite1921348288axioms || << || 3.51670182396e-45
sqr || +46 || 3.43044476156e-45
code_integer_of_int || +45 || 3.03379245995e-45
pow || +84 || 2.97675012981e-45
map_add || mlt5 || 2.96253796221e-45
wf || ex_inf_of || 2.9421280455e-45
bitM || +46 || 2.9244730401e-45
nat_of_num || Map2Rel || 2.83838555909e-45
member3 || is_finer_than0 || 2.78402182882e-45
member3 || is_coarser_than0 || 2.78402182882e-45
distinct || r3_tarski || 2.76795207125e-45
measure || uparrow0 || 2.68490407709e-45
finite_folding || << || 2.68466711804e-45
pcr_real cr_real || EdgeSelector 2 || 2.62494375341e-45
pos || Rel2Map || 2.62031723576e-45
bNF_Ca646678531ard_of || .walkOf0 || 2.6008379195e-45
lexordp_eq || is_continuous_in1 || 2.57808050122e-45
finite852775215axioms || is_vertex_seq_of || 2.43765298751e-45
finite100568337ommute || <=\ || 2.37413485034e-45
lexordp2 || is_differentiable_in4 || 2.36017185503e-45
pcr_rat cr_rat || EdgeSelector 2 || 2.2874788856e-45
nil || code || 2.24967045926e-45
inc || max_Data-Loc_in || 2.23308375929e-45
measures || uparrow0 || 2.11589700189e-45
dropWhile || #quote##bslash##slash##quote#3 || 2.07047097554e-45
pcr_int cr_int || EdgeSelector 2 || 2.00609399652e-45
bit1 || d#quote#. || 1.9682799024e-45
remdups || R_EAL1 || 1.81387219769e-45
some || FS2XFS || 1.78495331846e-45
nat_of_num || ^27 || 1.77744063104e-45
neg2 || ~=0 || 1.74433437967e-45
inc || OpenClosedSet || 1.66173953223e-45
null || r3_tarski || 1.65199811872e-45
the2 || XFS2FS || 1.62929791509e-45
finite100568337ommute || is_vertex_seq_of || 1.48254573631e-45
transitive_trancl || \xor\ || 1.4359040714e-45
member3 || EqClass0 || 1.4206837679e-45
nat2 || #quote#0 || 1.30906820857e-45
one2 || {}2 || 1.28972672918e-45
code_pcr_natural code_cr_natural || EdgeSelector 2 || 1.25198345506e-45
wf || ex_sup_of || 1.25114576184e-45
bit0 || root-tree2 || 1.219745145e-45
transitive_rtrancl || \or\3 || 1.1927645215e-45
measure || downarrow0 || 1.16393520756e-45
equiv_part_equivp || meets || 1.14294790026e-45
bit1 || StoneR || 1.08365196053e-45
reflp || meets || 1.05452209731e-45
nat2 || ^28 || 1.05423875043e-45
bit0 || StoneSpace || 1.04680297283e-45
bNF_Wellorder_wo_rel || |-3 || 1.02624637217e-45
transitive_rtrancl || \nor\ || 1.01326467834e-45
field2 || .first() || 9.8155974272e-46
semilattice || is_Lcontinuous_in || 9.57220494629e-46
semilattice || is_Rcontinuous_in || 9.57220494629e-46
pos || +45 || 9.48451353944e-46
field2 || .last() || 9.43445534059e-46
quotient_of || carrier || 9.4049314778e-46
transitive_trancl || Non || 9.32500361395e-46
cnj || *\17 || 9.28306557147e-46
bNF_Ca646678531ard_of || id2 || 9.18831543133e-46
measures || downarrow0 || 9.179620026e-46
pred3 || Half || 8.42337584743e-46
antisym || |=8 || 8.0942135564e-46
groups_monoid_list || is_immediate_constituent_of1 || 7.41467607179e-46
ii || 89 || 7.1492910608e-46
field2 || cod || 7.11582597895e-46
field2 || dom1 || 7.11582597895e-46
map_tailrec || mod || 6.98452159646e-46
implode str || EdgeSelector 2 || 6.97373167756e-46
lattic35693393ce_set || is_right_differentiable_in || 6.85389996414e-46
lattic35693393ce_set || is_left_differentiable_in || 6.85389996414e-46
takeWhile || #quote##bslash##slash##quote#3 || 6.84469145271e-46
finite_folding_idem || << || 6.65807001525e-46
trans || |=8 || 6.59742802745e-46
transitive_tranclp || is_differentiable_in4 || 6.51967094281e-46
transitive_rtranclp || is_continuous_in1 || 6.3941816108e-46
eval || Double0 || 6.06722802006e-46
member3 || is_proper_subformula_of1 || 6.03072572057e-46
map_add || gcd1 || 5.86741867076e-46
map_tailrec || divides0 || 5.37985239402e-46
pos2 || ~=0 || 5.04805188435e-46
code_pcr_integer code_cr_integer || EdgeSelector 2 || 5.00863906095e-46
bNF_Ca646678531ard_of || term4 || 4.88726945938e-46
bNF_Ca646678531ard_of || init0 || 4.88726945938e-46
complex2 || Shift0 || 4.73836167677e-46
re || Seq || 4.71004746911e-46
complex || 23 || 4.50867563706e-46
transitive_rtrancl || vars0 || 4.44401848617e-46
lattic35693393ce_set || is_elementary_subsystem_of || 4.43901626644e-46
transitive_rtrancl || variables_in || 4.3541568421e-46
sum_isl || <=0 || 4.26961451368e-46
map_add || +72 || 4.19272840027e-46
suc || ~0 || 4.17373983619e-46
semilattice || <==>0 || 4.12247370231e-46
transitive_acyclic || is_Lcontinuous_in || 3.95590239488e-46
transitive_acyclic || is_Rcontinuous_in || 3.95590239488e-46
nat_of_num || LattPOSet || 3.8446221438e-46
insert3 || \or\0 || 3.75802879483e-46
insert3 || =>1 || 3.68408412804e-46
map || div0 || 3.67656957833e-46
sum_Inl || *110 || 3.65951533561e-46
inc || .:7 || 3.61684852838e-46
transitive_trancl || \or\3 || 3.58372646126e-46
one_one || Mersenne || 3.52917988178e-46
abel_semigroup || is_differentiable_in || 3.46065242557e-46
rev || #quote#23 || 3.42585988648e-46
basic_BNF_xtor || Non || 3.42585988648e-46
monoid || is_proper_subformula_of1 || 3.4087164227e-46
pred3 || Double0 || 3.39695885961e-46
rep_filter || opp1 || 3.33181795823e-46
groups_monoid_list || is_a_condensation_point_of || 3.28574821086e-46
semilattice || is_parametrically_definable_in || 3.27823823841e-46
neg2 || <=6 || 3.23626946821e-46
real_V1127708846m_norm || +1 || 3.17323568997e-46
groups_monoid_list || are_divergent<=1_wrt || 3.17265322638e-46
lattic35693393ce_set || is_definable_in || 3.16321234804e-46
real || 11 || 3.15634911429e-46
monoid || is_subformula_of || 3.13940282873e-46
code_Suc || .:7 || 3.10877229303e-46
nat_tr1645093318rphism || is_continuous_in1 || 3.06969047427e-46
code_nat_of_natural || LattPOSet || 3.02764111587e-46
eval || Half || 3.02049469813e-46
map_tailrec || Int || 2.99830068054e-46
monoid || is_an_accumulation_point_of || 2.89600267427e-46
lattic35693393ce_set || upper_bound1 || 2.84810413435e-46
semilattice || *86 || 2.7870640711e-46
map || divides || 2.77083979071e-46
finite1921348288axioms || <=1 || 2.76796688165e-46
abs_filter || opp || 2.71130702703e-46
abel_s1917375468axioms || is_continuous_in || 2.49313528688e-46
distinct || is_proper_subformula_of0 || 2.3872495001e-46
lattic1543629303tr_set || is_immediate_constituent_of1 || 2.35867088787e-46
finite_folding || <=1 || 2.26236050053e-46
abs_filter || opp1 || 2.24238022387e-46
monoid || are_divergent_wrt || 2.15169966929e-46
map || LAp || 2.13080756113e-46
wf || is_right_differentiable_in || 2.12663967923e-46
wf || is_left_differentiable_in || 2.12663967923e-46
re || Radical || 2.12062104409e-46
rep_filter || opp || 2.09690964216e-46
null2 || |-6 || 2.08262095911e-46
map_tailrec || Cl || 2.0679002498e-46
some || ProjFinSeq || 2.02294649143e-46
semigroup || is_continuous_in || 1.80434496353e-46
map_add || ^5 || 1.71936772642e-46
nat_tr1645093318rphism || Mid || 1.71516714048e-46
groups_monoid_list || are_convergent<=1_wrt || 1.70001451547e-46
finite_comp_fun_idem || is_differentiable_in3 || 1.68340959509e-46
cnj || ComplRelStr || 1.62261796904e-46
id_on || {..}21 || 1.61571330647e-46
the2 || Sum9 || 1.61281984592e-46
complex2 || |^ || 1.49935780311e-46
bind4 || * || 1.49697526958e-46
transitive_rtrancl || Union0 || 1.48849868922e-46
map || UAp || 1.47697556353e-46
bit1 || CONGRD || 1.47679209346e-46
inc || CONGR || 1.44586157824e-46
refl_on || in1 || 1.430271035e-46
listMem || is_subformula_of || 1.40083283134e-46
remdups || WFF || 1.37063320616e-46
one2 || +infty0 || 1.36216449575e-46
cnj || k15_gaussint || 1.35377563105e-46
nat_tr1645093318rphism || r1_gtarski1 || 1.30658199989e-46
bNF_Cardinal_cone || OddNAT || 1.30209431755e-46
sqr || |....|2 || 1.28453900759e-46
set || #quote# || 1.24768408361e-46
fun_is_measure || r2_cat_6 || 1.19992421605e-46
comple1176932000PREMUM || #slash# || 1.18033836227e-46
remdups || \or\4 || 1.17992004726e-46
re || k16_gaussint || 1.16112335208e-46
semilattice_neutr || is_proper_subformula_of1 || 1.15495081772e-46
finite852775215axioms || is_continuous_in0 || 1.14805243514e-46
monoid || are_convergent_wrt || 1.10249664268e-46
monoid || is_an_UPS_retraction_of || 1.09658759384e-46
code_integer_of_int || Rel2Map || 1.07900625271e-46
lattic1543629303tr_set || is_a_condensation_point_of || 1.06968500269e-46
semilattice_neutr || is_subformula_of || 1.06102397355e-46
bitM || |....|2 || 1.05953612221e-46
semilattice_neutr || is_an_accumulation_point_of || 1.03058516724e-46
groups_monoid_list || is_a_retraction_of || 1.02299166943e-46
pos2 || <=6 || 9.80475975896e-47
pos || ^21 || 9.34317192915e-47
nat_of_num || abs8 || 9.01245154994e-47
product_unit || EvenNAT || 8.95591545611e-47
nat2 || Map2Rel || 8.89593243279e-47
code_nat_of_integer || #quote#0 || 8.65735956889e-47
bit0 || AV || 8.54156744512e-47
empty || TAUT || 8.44459912595e-47
nat2 || sqrt0 || 8.41609939973e-47
neg2 || are_naturally_equivalent || 8.17741964638e-47
neg2 || is_naturally_transformable_to || 8.17741964638e-47
transitive_trancl || Partial_Diff_Union || 8.08885207137e-47
nat_tr1645093318rphism || is_collinear2 || 7.83755951381e-47
cons || \&\ || 7.34322806757e-47
pred3 || the_argument_of || 7.33957199061e-47
transitive_trancl || Partial_Union || 7.16895715253e-47
lattic1543629303tr_set || are_divergent<=1_wrt || 7.16351621996e-47
finite100568337ommute || is_continuous_in0 || 7.02169533661e-47
rep_filter || Absval || 6.78218465974e-47
bNF_Cardinal_cfinite || meets || 6.46358233476e-47
code_int_of_integer || carrier || 6.30257156029e-47
nat_tr1645093318rphism || is_differentiable_in4 || 6.16168952426e-47
abs_filter || -BinarySequence || 5.90073414111e-47
groups_monoid_list || BCK-part || 5.71081956381e-47
suc_Rep || FixedSubtrees || 5.39354596699e-47
semilattice_neutr || are_divergent_wrt || 5.33363225607e-47
semilattice_neutr || is_an_UPS_retraction_of || 5.19989510757e-47
comm_monoid || *86 || 4.81802281682e-47
lattic1543629303tr_set || is_a_retraction_of || 4.46531491103e-47
eval || \not\5 || 4.43543927213e-47
pred3 || Net-Str2 || 4.38104878584e-47
monoid || carrier || 4.37898688723e-47
groups828474808id_set || upper_bound1 || 4.28501460616e-47
semilattice || are_equivalent || 4.17888630793e-47
pos || StoneR || 4.09331036722e-47
nat_of_num || ultraset || 4.05280842805e-47
lattic1543629303tr_set || are_convergent<=1_wrt || 3.67439078572e-47
equiv_equivp || is_differentiable_in || 3.67345306985e-47
refl_on || is_subformula_of || 3.63012074327e-47
transitive_acyclic || is_parametrically_definable_in || 3.5894935e-47
null2 || divides0 || 3.4373972304e-47
id_on || \not\0 || 3.41752291412e-47
bit0 || Rev1 || 3.26728909161e-47
fun_is_measure || well_orders || 3.14666413251e-47
fun_is_measure || have_the_same_composition || 3.14666413251e-47
fun_is_measure || quasi_orders || 3.14666413251e-47
lexordp_eq || is_naturally_transformable_to || 3.10655186446e-47
lattic35693393ce_set || ~= || 3.06690515305e-47
lattic35693393ce_set || are_isomorphic6 || 3.06071108717e-47
semilattice || are_equivalent1 || 3.05131376103e-47
groups_monoid_list || ==>1 || 2.97560486822e-47
monoid || is_derivable_from || 2.97560486822e-47
c_Predicate_Oeq || reduces || 2.97456781813e-47
the2 || Half || 2.97413970668e-47
groups_monoid_list || InputVertices || 2.89318776259e-47
sum_isl || is_subformula_of || 2.81137306893e-47
finite_comp_fun_idem || > || 2.78240944807e-47
transitive_acyclic || <==>0 || 2.63231559405e-47
semilattice_neutr || are_convergent_wrt || 2.61454374178e-47
groups_monoid_list || Bot || 2.60098265878e-47
map_le || is_similar_to || 2.57115508723e-47
neg2 || -are_isomorphic || 2.57115508723e-47
pos2 || are_naturally_equivalent || 2.57115508723e-47
pos2 || is_naturally_transformable_to || 2.57115508723e-47
neg2 || are_congruent_mod0 || 2.57115508723e-47
wf || is_definable_in || 2.56227256626e-47
nat_tr1645093318rphism || is_naturally_transformable_to0 || 2.56160554779e-47
eval || lim_inf1 || 2.54461348682e-47
lattic1543629303tr_set || BCK-part || 2.49798283209e-47
sum_Rep_sum || +65 || 2.41644761375e-47
product_Rep_prod || +65 || 2.41644761375e-47
groups_monoid_list || are_critical_wrt || 2.30644490355e-47
some || Double0 || 2.15215696766e-47
sum_Inl || \&\ || 2.12129285944e-47
equiv_part_equivp || is_continuous_in || 2.11434011772e-47
groups_monoid_list || |=7 || 2.11338865718e-47
wf || is_elementary_subsystem_of || 2.07752905199e-47
semilattice_neutr || carrier || 2.05926442209e-47
inc || LeftComp || 2.0053376876e-47
inc || RightComp || 1.97519778325e-47
finite852775215axioms || << || 1.92597673178e-47
monoid || Bottom || 1.90821206466e-47
empty || abs || 1.90147187988e-47
reflp || is_continuous_in || 1.85326352398e-47
nat2 || union0 || 1.8428442638e-47
groups_monoid_list || exp1 || 1.70112898354e-47
bind4 || + || 1.69812679857e-47
map_add || #slash##bslash#1 || 1.67101084818e-47
transitive_acyclic || are_equivalent || 1.63673923968e-47
monoid || |-2 || 1.56253315722e-47
bit1 || LeftComp || 1.50679243002e-47
bit1 || RightComp || 1.49786233703e-47
monoid || P_cos || 1.41861978005e-47
comple1176932000PREMUM || - || 1.35128992366e-47
lattic1543629303tr_set || InputVertices || 1.32356614344e-47
semilattice_neutr || is_derivable_from || 1.31684432753e-47
monoid || are_convertible_wrt || 1.28469873671e-47
lexordp_eq || are_congruent_mod0 || 1.24716902162e-47
lattic1543629303tr_set || ==>1 || 1.21336782438e-47
finite100568337ommute || << || 1.19333495987e-47
set || -0 || 1.16199125796e-47
rep_filter || -VectSp_over || 1.02882720083e-47
empty || -0 || 1.01264466912e-47
lattic1543629303tr_set || Bot || 9.78519636296e-48
monoid || are_coplane || 9.35324346444e-48
semilattice || is_a_pseudometric_of || 9.22252371421e-48
lattic35693393ce_set || is_metric_of || 9.19931704519e-48
wf || ~= || 9.19419424875e-48
abs_filter || dim || 8.74024197618e-48
sum_Rep_sum || +81 || 8.4641694589e-48
product_Rep_prod || +81 || 8.4641694589e-48
pos2 || -are_isomorphic || 8.33819755445e-48
pos2 || are_congruent_mod0 || 8.33819755445e-48
semilattice_neutr || Bottom || 7.65219867408e-48
groups_monoid_list || #slash##slash#8 || 7.49608870517e-48
lattic1543629303tr_set || exp1 || 7.38886866737e-48
eval || the_argument_of || 7.30969134306e-48
pred3 || \not\5 || 6.6518730487e-48
semilattice_neutr || P_cos || 6.55088216698e-48
lattic1543629303tr_set || |=7 || 5.78958514202e-48
semilattice_neutr || are_coplane || 5.58477997371e-48
rep_filter || R_EAL1 || 5.28650489326e-48
semilattice || is_weight_of || 5.2698306927e-48
pow || \or\3 || 4.88066020924e-48
semilattice_neutr || |-2 || 4.66794084857e-48
lattic35693393ce_set || is_weight>=0of || 4.39093478802e-48
is_filter || r3_tarski || 4.33889944797e-48
lattic1543629303tr_set || are_critical_wrt || 4.32882818229e-48
code_integer_of_int || Column_Marginal || 4.30945069118e-48
append || -15 || 4.2576103518e-48
pow || min3 || 4.16554215885e-48
lattic1543629303tr_set || #slash##slash#8 || 4.15399829147e-48
neg2 || -are_equivalent || 3.98248525803e-48
map_le || ~=0 || 3.98248525803e-48
cons || +19 || 3.8977100765e-48
bNF_Ca646678531ard_of || FS2XFS || 3.64153534147e-48
eval || Net-Str2 || 3.37537836854e-48
code_nat_of_integer || Sum || 3.17705320949e-48
the2 || the_argument_of || 3.09201088472e-48
transitive_acyclic || are_equivalent1 || 3.07650474444e-48
lattic35693393ce_set || BCK-part || 2.99328638357e-48
sum_Rep_sum || +87 || 2.98412738346e-48
product_Rep_prod || +87 || 2.98412738346e-48
pred3 || lim_inf1 || 2.93066798322e-48
nat_tr1645093318rphism || is_homomorphism || 2.85261521541e-48
rev || -81 || 2.84505002434e-48
nat2 || SumAll || 2.83733376531e-48
map_add || +34 || 2.80707533924e-48
sum_Inr || IC || 2.71771198794e-48
semilattice_neutr || are_convertible_wrt || 2.64066530165e-48
semilattice || carrier || 2.61803998483e-48
groups_monoid_list || is_unif_conv_on || 2.5485775445e-48
bNF_Ca646678531ard_of || CastSeq || 2.50226176294e-48
one2 || BOOLEAN || 2.46104684774e-48
field2 || XFS2FS || 2.37565083824e-48
wf || are_isomorphic6 || 2.3157045815e-48
finite_comp_fun_idem || << || 2.21839497427e-48
field2 || CastSeq0 || 2.16852686869e-48
monoid || is_point_conv_on || 1.94804729169e-48
some || \not\5 || 1.90337687867e-48
one2 || +infty || 1.89175959156e-48
neg2 || is_transformable_to0 || 1.84101874406e-48
the2 || .:13 || 1.82893075504e-48
semilattice || quasi_orders || 1.82088153894e-48
bNF_Wellorder_wo_rel || is_differentiable_in || 1.80503509217e-48
abel_semigroup || c< || 1.74648013225e-48
lattic35693393ce_set || InputVertices || 1.67197539295e-48
fun_is_measure || is_Finseq_for || 1.66025875347e-48
fun_is_measure || partially_orders || 1.66025875347e-48
lattic35693393ce_set || partially_orders || 1.65133273843e-48
append || padd || 1.55434196194e-48
append || pmult || 1.55434196194e-48
semilattice || is_continuous_in5 || 1.52896739843e-48
sum_Inr || *8 || 1.52791317569e-48
lattic35693393ce_set || is_differentiable_in0 || 1.45004063024e-48
code_integer_of_int || StoneR || 1.4254404092e-48
some || .:14 || 1.42030923701e-48
pos2 || -are_equivalent || 1.35657198877e-48
the2 || .:14 || 1.30148247326e-48
transitive_acyclic || is_weight_of || 1.27300420556e-48
field2 || Sub_the_argument_of || 1.21903954342e-48
finite852775215axioms || <=1 || 1.1618346319e-48
antisym || is_continuous_in || 1.11725704266e-48
nat2 || ultraset || 1.11528737066e-48
some || .:13 || 1.09611211367e-48
bNF_Ca646678531ard_of || Sub_not || 1.08387101058e-48
groups_monoid_list || _|_2 || 1.07011199204e-48
order_well_order_on || |-|0 || 1.06650813544e-48
pow || max || 1.05639022657e-48
rep_filter || +84 || 1.03691500309e-48
bNF_Ca646678531ard_of || ProjFinSeq || 1.00047890971e-48
trans || is_continuous_in || 9.7143208094e-49
code_nat_of_integer || union0 || 9.60455710194e-49
map_le || <=6 || 9.21718319531e-49
is_filter || <1 || 8.9469371143e-49
append || *17 || 8.92839174536e-49
wf || is_weight>=0of || 8.15694435164e-49
finite100568337ommute || <=1 || 8.10274098495e-49
domainp || are_relative_prime || 7.73821983932e-49
lattic1543629303tr_set || is_unif_conv_on || 7.71873696308e-49
monoid || are_ldependent2 || 7.71675815954e-49
cons || *18 || 7.18141747333e-49
semilattice || is_proper_subformula_of || 6.98817471238e-49
lattic35693393ce_set || is_immediate_constituent_of || 6.90995894574e-49
rev || !6 || 6.86191688907e-49
listMem || c=1 || 6.47856370359e-49
lattic35693393ce_set || Bot || 6.43697877722e-49
semilattice_neutr || is_point_conv_on || 6.40391386871e-49
pos2 || is_transformable_to0 || 6.39807053155e-49
abel_s1917375468axioms || are_equipotent || 6.08245366451e-49
bNF_Ca1811156065der_on || is_an_universal_closure_of || 6.04894130697e-49
equiv_equivp || c< || 6.04105374458e-49
field2 || Sum9 || 5.92735675031e-49
comm_monoid || carrier || 5.65615358677e-49
empty || code || 5.6388344611e-49
null2 || r3_tarski || 5.62701701551e-49
groups828474808id_set || BCK-part || 5.60520187562e-49
semigroup || are_equipotent || 5.24721242641e-49
code_nat_of_integer || ~1 || 5.18441074514e-49
semilattice || Bottom || 5.14647573982e-49
lattic35693393ce_set || exp1 || 5.13009004321e-49
one2 || -infty || 5.10569669453e-49
code_nat_of_integer || curry\ || 4.96306319931e-49
bNF_Ca1811156065der_on || <==>1 || 4.92868788592e-49
bit1 || Map2Rel || 4.8677389334e-49
monoid || is_a_cluster_point_of0 || 4.65207506972e-49
semilattice || P_cos || 4.60967447691e-49
transitive_acyclic || are_anti-isomorphic || 4.44468237946e-49
rep_filter || lcm || 4.35732279179e-49
sum_isl || c=1 || 4.33080608954e-49
inc || #quote#0 || 4.31443955183e-49
cons || #bslash##slash#2 || 4.16414723642e-49
groups_monoid_list || is_convergent_to || 4.05483627514e-49
code_integer_of_int || uncurry\ || 3.98513980702e-49
suc_Rep || alef || 3.87244531507e-49
suc_Rep || Field2COMPLEX || 3.87244531507e-49
suc_Rep || |[..]|2 || 3.87244531507e-49
sum_Inl || #bslash##slash#2 || 3.86187368895e-49
bit0 || Rel2Map || 3.83378208785e-49
code_integer_of_int || ~1 || 3.76826862275e-49
code_nat_of_integer || MultGroup || 3.74906484811e-49
groups828474808id_set || InputVertices || 3.38461461387e-49
nat2 || uncurry || 3.38407772589e-49
insert3 || +31 || 3.35472856447e-49
nat2 || curry || 3.27132028676e-49
transitive_acyclic || quasi_orders || 3.1825895694e-49
lattic1543629303tr_set || _|_2 || 3.07664794143e-49
wf || are_opposite || 2.92623884671e-49
is_filter || divides0 || 2.80118002853e-49
map_le || are_naturally_equivalent || 2.78401376948e-49
semilattice_neutr || [= || 2.76696836979e-49
nat_of_num || k2_orders_1 || 2.73654529181e-49
product_Unity || -infty || 2.72618287035e-49
nat2 || Z#slash#Z* || 2.66471929943e-49
map_le || LIN0 || 2.64887830273e-49
semilattice_neutr || is_a_cluster_point_of0 || 2.61830131333e-49
monoid || [= || 2.58221528399e-49
semilattice_neutr || are_ldependent2 || 2.40640063959e-49
member3 || <=2 || 2.38030496364e-49
code_integer_of_int || INT.Ring || 2.35347212567e-49
rev || Bottom1 || 2.23174001693e-49
transitive_acyclic || is_continuous_in5 || 2.22558661064e-49
wf || partially_orders || 2.22249320809e-49
product_Unity || +infty || 2.1940711095e-49
fun_is_measure || are_homeomorphic || 2.16812093962e-49
lattic1543629303tr_set || is_convergent_to || 2.12564578961e-49
pred_option || [=1 || 2.08313360374e-49
pred3 || Absval || 2.02915000348e-49
equiv_part_equivp || are_equipotent || 1.88749221353e-49
reflp || are_equipotent || 1.76725465661e-49
pos || RelIncl || 1.76345913171e-49
order_well_order_on || are_weakly-unifiable || 1.66939921462e-49
map_le || Mid || 1.66173127259e-49
some || Net-Str2 || 1.62977553922e-49
nat_of_num || Z#slash#Z* || 1.62614516265e-49
wf || is_differentiable_in0 || 1.62243284252e-49
eval || -BinarySequence || 1.59385513547e-49
bNF_Ca1811156065der_on || are_unifiable || 1.56698365367e-49
none || Top || 1.56131195579e-49
cnj || (Omega).5 || 1.53716673437e-49
re || dim3 || 1.50749800359e-49
the2 || lim_inf1 || 1.46007359128e-49
nat_of_num || curry || 1.39790399141e-49
nat_of_num || uncurry || 1.38010366986e-49
groups_monoid_list || SumAll || 1.37039411047e-49
nat2 || InternalRel || 1.34585028276e-49
pos || uncurry\ || 1.33994731881e-49
map_le || r1_gtarski1 || 1.33581382275e-49
pos || ~1 || 1.32240462152e-49
pred3 || -BinarySequence || 1.29523112879e-49
null || are_isomorphic || 1.26134371231e-49
basic_BNF_xtor || \xor\ || 1.25711979644e-49
fun_is_measure || tolerates3 || 1.2426404052e-49
lattic1543629303tr_set || c=1 || 1.20100001299e-49
groups_monoid_list || c=1 || 1.18556135017e-49
cnj || (Omega).3 || 1.17809628632e-49
lattic35693393ce_set || is_differentiable_on6 || 1.1579434909e-49
eval || Absval || 1.15071672334e-49
nil || ~0 || 1.14461767001e-49
pos || INT.Ring || 1.12828656372e-49
nat2 || MultGroup || 1.10311325129e-49
groups_monoid_list || is_properly_applicable_to || 1.10218228295e-49
re || dim0 || 1.09984410876e-49
semilattice || is_continuous_on0 || 1.09856910779e-49
nat2 || curry\ || 1.06549685782e-49
nat2 || ~1 || 1.0654005436e-49
basic_BNF_xtor || `5 || 1.05217265239e-49
map_le || -are_isomorphic || 1.01532196348e-49
neg2 || ==>* || 1.01532196348e-49
monoid || is_applicable_to1 || 9.29266203638e-50
code_natural_of_nat || LattPOSet || 8.90726079687e-50
inc || succ0 || 8.85047919631e-50
transitive_acyclic || is_proper_subformula_of || 8.78543233488e-50
comm_monoid || P_cos || 8.64529958331e-50
groups828474808id_set || exp1 || 8.52259781926e-50
code_Suc || ~0 || 8.42478275427e-50
groups828474808id_set || Bot || 8.31401225489e-50
comm_monoid || Bottom || 7.54334583363e-50
suc_Rep || COMPLEX2Field || 7.51769012474e-50
basic_BNF_xtor || -27 || 7.50118925833e-50
sum_Inr || -1 || 7.41251476846e-50
monoid || len || 6.7448279991e-50
wf || is_immediate_constituent_of || 6.69405042033e-50
c_Predicate_Oeq || >= || 6.62958897808e-50
cnj || Rev1 || 6.06909009601e-50
distinct || are_isomorphic || 5.99073916061e-50
suc || .:7 || 5.70150495174e-50
the2 || opp1 || 5.2970854412e-50
quotient_of || idsym || 5.25184846758e-50
sum_Inr || +2 || 5.05572445862e-50
bit1 || In_Power || 4.92757319703e-50
inc || min0 || 4.82489018763e-50
transitive_tranclp || is_similar_to || 4.78709031548e-50
inc || max0 || 4.36945868891e-50
map_le || is_collinear0 || 4.25393219271e-50
bit0 || ProperPrefixes || 4.23882205127e-50
pred3 || -VectSp_over || 4.15114709124e-50
bit0 || SetMajorant || 4.15063934939e-50
bit0 || Col || 4.14840003912e-50
lattic1543629303tr_set || is_properly_applicable_to || 4.08421368996e-50
lattic1543629303tr_set || SumAll || 4.0202162529e-50
some || opp || 3.92790190552e-50
bNF_Cardinal_cfinite || are_relative_prime || 3.86787170528e-50
bNF_Cardinal_cone || 10 || 3.86077434399e-50
bit0 || SetMinorant || 3.81190043104e-50
pos2 || ==>* || 3.79742035838e-50
semilattice_neutr || is_applicable_to1 || 3.70927801231e-50
re || GoB || 3.66332983847e-50
bit1 || max0 || 3.51822072413e-50
bit1 || min0 || 3.26481604438e-50
pred_option || \<\ || 3.21645768583e-50
eval || dim || 3.20955810216e-50
bit1 || len || 3.01227065375e-50
cnj || (Omega).1 || 2.97435772159e-50
product_unit || VLabelSelector 7 || 2.96167397992e-50
transitive_acyclic || |=8 || 2.54191979814e-50
groups_monoid_list || is_differentiable_in5 || 2.47450303824e-50
re || k1_zmodul03 || 2.45154172411e-50
monoid || is_often_in || 2.39469061434e-50
the2 || opp || 2.31555964916e-50
pred3 || dim || 2.27990420427e-50
none || I_el || 2.24662383806e-50
monoid || is_continuous_in2 || 2.14404794678e-50
some || opp1 || 2.12792950191e-50
nat2 || k2_orders_1 || 2.12546061899e-50
semilattice_neutr || len || 2.10227648646e-50
eval || -VectSp_over || 2.0905438989e-50
code_nat_of_integer || InternalRel || 2.03843061721e-50
neg2 || is_transformable_to || 1.98964467013e-50
neg2 || c=8 || 1.98964467013e-50
map_le || -are_equivalent || 1.98964467013e-50
order_well_order_on || is_homomorphism1 || 1.97979238259e-50
suc_Rep || UNIVERSE || 1.97064654167e-50
groups_monoid_list || is_eventually_in || 1.8962302876e-50
code_integer_of_int || RelIncl || 1.79358841067e-50
bNF_Ca1811156065der_on || is_succ_homomorphism || 1.63126259937e-50
monoid || |....|2 || 1.5864988158e-50
semilattice_neutr || is_often_in || 1.55841297919e-50
wf || |-3 || 1.47414651566e-50
fun_is_measure || is_reflexive_in || 1.35820803479e-50
fun_is_measure || emp || 1.35820803479e-50
inc || MultGroup || 1.34089708462e-50
finite_finite2 || is_proper_subformula_of0 || 1.33285647439e-50
monoid || <=\ || 1.25942409539e-50
semilattice_neutr || |....|2 || 1.22573323477e-50
groups_monoid_list || *1 || 1.1814946733e-50
lattic1543629303tr_set || is_eventually_in || 1.15763663875e-50
transitive_acyclic || is_continuous_on0 || 1.14524704845e-50
lexordp_eq || LIN0 || 1.13673018894e-50
empty || epsilon_ || 1.10625228098e-50
bit1 || Z#slash#Z* || 1.05453123692e-50
lattic35693393ce_set || is_immediate_constituent_of0 || 1.04956898732e-50
map_le || is_transformable_to0 || 1.01219551e-50
bNF_Ca646678531ard_of || Double0 || 1.01010816898e-50
lattic1543629303tr_set || is_differentiable_in5 || 9.80309328994e-51
transitive_tranclp || ~=0 || 9.67202010675e-51
field2 || Half || 9.65919243267e-51
sum_Inl || locnum || 9.58339223245e-51
groups_monoid_list || divides1 || 9.56179481562e-51
semilattice || is_proper_subformula_of0 || 9.51978765625e-51
wf || is_differentiable_on6 || 9.3767774818e-51
inc || Sum || 9.22631286505e-51
semilattice_neutr || is_continuous_in2 || 9.1205028964e-51
bit1 || SumAll || 8.95373535865e-51
bit0 || Column_Marginal || 8.87569086235e-51
the2 || -BinarySequence || 8.86466860345e-51
lattic1543629303tr_set || *1 || 8.734785816e-51
semilattice_neutr || <=\ || 8.62286552065e-51
inc || ~1 || 8.09931691452e-51
insert3 || +26 || 7.88060172845e-51
some || Absval || 7.79445407639e-51
pos2 || is_transformable_to || 7.74444575549e-51
pos2 || c=8 || 7.74444575549e-51
transitive_trancl || Dependency-closure || 7.73269222151e-51
null2 || c=0 || 7.72075668795e-51
nO_MATCH || - || 7.71377011043e-51
insert3 || +54 || 7.65076490108e-51
transitive_rtrancl || charact_set || 7.53304734279e-51
lexordp_eq || Mid || 7.40613865746e-51
finite_finite2 || -20 || 7.23784339033e-51
member3 || |3 || 7.11113373311e-51
set2 || WFF || 7.08943652514e-51
bit0 || INT.Ring || 7.00214671326e-51
set2 || \or\4 || 6.36322871237e-51
bit1 || ultraset || 6.2873166238e-51
member3 || c=5 || 6.25200105059e-51
lattic1543629303tr_set || divides1 || 6.15313424152e-51
lexordp_eq || r1_gtarski1 || 6.05921544178e-51
bit1 || uncurry || 5.82615930888e-51
insert3 || |3 || 5.79860411978e-51
rep_filter || max || 5.38279224844e-51
is_filter || <= || 5.32969510294e-51
bit0 || StoneR || 5.32454328054e-51
inc || union0 || 5.01089206991e-51
bit0 || uncurry\ || 4.94693127773e-51
null2 || ex_inf_of || 4.09574422397e-51
empty || carrier || 4.01678994822e-51
transitive_rtranclp || is_similar_to || 4.00429325465e-51
insert3 || lcm2 || 3.90702085577e-51
null2 || ex_sup_of || 3.7423140801e-51
fun_is_measure || c= || 3.50767606502e-51
lattic35693393ce_set || SumAll || 3.15351733027e-51
nO_MATCH || * || 3.08245214797e-51
groups_monoid_list || is_oriented_vertex_seq_of || 2.9601492363e-51
member3 || divides1 || 2.88976009588e-51
transitive_tranclp || <=6 || 2.74575059973e-51
fun_is_measure || != || 2.71019683197e-51
monoid || is_vertex_seq_of || 2.56163760288e-51
rep_filter || + || 2.55507239315e-51
lattic35693393ce_set || c= || 2.49237097456e-51
neg2 || <=3 || 2.4633020748e-51
nO_MATCH || + || 2.42317247193e-51
semilattice || is_finer_than || 2.20669138797e-51
set2 || MSSign0 || 1.95929781273e-51
remdups || +84 || 1.92876652053e-51
semilattice || tolerates || 1.91669146381e-51
transitive_rtrancl || -48 || 1.91587467221e-51
transitive_rtranclp || NF || 1.91573797795e-51
cnj || -50 || 1.79737514215e-51
finite_finite2 || can_be_characterized_by || 1.76988111318e-51
code_nat_of_integer || RelIncl || 1.76514412441e-51
the2 || dim || 1.74976914898e-51
quotient_of || FixedSubtrees || 1.7424039415e-51
bNF_Ca646678531ard_of || .:13 || 1.72928350928e-51
semilattice || len || 1.72069795063e-51
null2 || are_isomorphic || 1.69558882265e-51
transitive_trancl || 0c0 || 1.67815346984e-51
re || |....|2 || 1.64471423086e-51
some || -VectSp_over || 1.58521691177e-51
distinct || <1 || 1.56242770817e-51
wf || |=8 || 1.49609216633e-51
transitive_acyclic || |-3 || 1.48727476315e-51
field2 || .:14 || 1.4870984663e-51
bNF_Ca646678531ard_of || .:14 || 1.45504264017e-51
empty || ~0 || 1.36278650942e-51
field2 || .:13 || 1.33842628887e-51
nat2 || InclPoset || 1.3363791041e-51
semilattice || |....|2 || 1.27598889763e-51
lattic1543629303tr_set || is_oriented_vertex_seq_of || 1.22669575572e-51
code_integer_of_int || bool0 || 1.18760496196e-51
semilattice_neutr || is_vertex_seq_of || 1.13561529765e-51
bNF_Ca646678531ard_of || Net-Str2 || 1.13139138727e-51
pred3 || uparrow0 || 1.02686156744e-51
bit1 || k2_orders_1 || 1.01606348948e-51
pos2 || <=3 || 1.00748457952e-51
nat_of_num || InclPoset || 1.00317991661e-51
transitive_tranclp || are_naturally_equivalent || 9.77169268539e-52
transitive_tranclp || is_naturally_transformable_to || 9.77169268539e-52
transitive_acyclic || is_proper_subformula_of0 || 9.28730029743e-52
lattic35693393ce_set || *1 || 9.23662161422e-52
inc || InternalRel || 8.96458603411e-52
transitive_rtranclp || ~=0 || 8.92464300258e-52
eval || inf || 8.24094515662e-52
sum_Inl || NextLoc || 8.19537463043e-52
wf || is_immediate_constituent_of0 || 8.05481997599e-52
field2 || lim_inf1 || 7.75290117964e-52
transitive_rtranclp || Span || 7.24339652037e-52
pos || bool0 || 7.235339207e-52
nat2 || RelIncl || 7.05817855016e-52
pred3 || inf || 6.77609657772e-52
bit0 || RelIncl || 6.37404919639e-52
field2 || the_argument_of || 6.34407690751e-52
transitive_trancl || Span || 6.2053846016e-52
eval || uparrow0 || 6.18153148451e-52
comm_monoid || |....|2 || 6.03764620704e-52
bNF_Ca646678531ard_of || \not\5 || 5.6618158366e-52
transitive_rtrancl || Rnk || 5.49445684819e-52
suc_Rep || ^25 || 4.89894434227e-52
code_nat_of_natural || idsym || 4.89894434227e-52
rep_filter || FinMeetCl || 4.82119787971e-52
transitive_trancl || Sub_not || 4.70911292739e-52
cnj || MultGroup || 4.56853702042e-52
transitive_rtranclp || LIN0 || 4.42524033941e-52
neg2 || is_naturally_transformable_to0 || 4.41701108512e-52
transitive_tranclp || are_congruent_mod0 || 4.08266040273e-52
groups828474808id_set || *1 || 4.00229272933e-52
re || nextcard || 3.61509509196e-52
transitive_trancl || k24_zmodul02 || 3.61508416759e-52
transitive_rtrancl || `23 || 3.6039245467e-52
append || +39 || 3.36173827184e-52
sum_Inl || +38 || 3.35295143935e-52
insert3 || *110 || 3.20732326044e-52
re || 1_ || 3.20580789273e-52
transitive_rtranclp || Mid || 2.98937321003e-52
cnj || card || 2.80382280329e-52
transitive_rtranclp || <=6 || 2.73180962397e-52
transitive_rtrancl || k18_zmodul02 || 2.71859141749e-52
pred3 || downarrow0 || 2.68002020574e-52
member3 || <=0 || 2.64122382046e-52
groups828474808id_set || SumAll || 2.56374423958e-52
suc_Rep || fsloc || 2.49632655572e-52
suc_Rep || #quote##quote#0 || 2.49632655572e-52
suc_Rep || cpx2euc || 2.49632655572e-52
transitive_rtranclp || r1_gtarski1 || 2.48720910793e-52
is_filter || are_equipotent || 2.1699488613e-52
eval || sup1 || 2.01603670213e-52
map_le || is_transformable_to || 1.878945123e-52
pos2 || is_naturally_transformable_to0 || 1.878945123e-52
suc || |....|12 || 1.67782698901e-52
comm_monoid || len || 1.58094593006e-52
sum_Inl || il. || 1.57267423052e-52
transitive_rtranclp || nf || 1.56330869206e-52
groups_monoid_list || is_differentiable_in3 || 1.54203357259e-52
groups_monoid_list || InnerVertices || 1.46282210597e-52
monoid || is_continuous_in0 || 1.45329093314e-52
code_Suc || bool || 1.38161506113e-52
suc_Rep || x.0 || 1.35599949135e-52
monoid || carrier\ || 1.32257330911e-52
transitive_trancl || -77 || 1.23108009866e-52
pred3 || sup1 || 1.14912379323e-52
eval || downarrow0 || 1.13303775629e-52
transitive_rtranclp || are_naturally_equivalent || 1.03283470969e-52
append || ADD_MOD || 1.01753742723e-52
transitive_tranclp || -are_equivalent || 9.92046186916e-53
code_natural_of_nat || carrier || 9.54844875301e-53
transitive_rtrancl || Carrier1 || 9.2791029316e-53
converse || +65 || 8.72102550874e-53
lattic1543629303tr_set || InnerVertices || 8.40738113331e-53
bNF_Ca646678531ard_of || opp1 || 8.40431398182e-53
sum_Inl || vect || 8.16839531862e-53
remdups || UniCl || 8.15216265086e-53
semilattice_neutr || carrier\ || 7.94171638641e-53
code_integer_of_int || Output0 || 7.5882711787e-53
conversep || +65 || 7.55103217141e-53
semilattice_neutr || is_continuous_in0 || 7.45229462162e-53
lattic1543629303tr_set || is_differentiable_in3 || 7.43859648029e-53
field2 || opp || 6.8948864842e-53
the2 || inf || 6.54712506859e-53
some || uparrow0 || 5.90934687097e-53
transitive_tranclp || is_transformable_to0 || 5.50827270725e-53
code_nat_of_integer || {..}1 || 5.48100764969e-53
bNF_Ca646678531ard_of || opp || 5.447268246e-53
field2 || opp1 || 5.35546703145e-53
nat2 || InnerVertices || 4.93301109092e-53
transitive_rtranclp || -are_isomorphic || 4.53719649878e-53
set2 || NEG_MOD || 4.3891862483e-53
order_well_order_on || is_an_accumulation_point_of || 4.12161275838e-53
converse || +81 || 4.12036792219e-53
bNF_Ca1811156065der_on || is_a_condensation_point_of || 4.10811299928e-53
lattic35693393ce_set || <N< || 3.69798886679e-53
conversep || +81 || 3.5780987686e-53
quotient_of || alef || 3.45416912436e-53
quotient_of || Field2COMPLEX || 3.45416912436e-53
quotient_of || |[..]|2 || 3.45416912436e-53
finite_finite2 || is_expressible_by || 3.10494688168e-53
suc_Rep || --0 || 2.90567095498e-53
suc_Rep || euc2cpx || 2.90567095498e-53
code_int_of_integer || idsym || 2.90567095498e-53
bNF_Ca646678531ard_of || Absval || 2.8920700479e-53
sum_Inl || <=>3 || 2.74674798177e-53
order_well_order_on || is_an_UPS_retraction_of || 2.65786325743e-53
transitive_rtrancl || NF || 2.56120551058e-53
bNF_Ca1811156065der_on || are_divergent<=1_wrt || 2.51488607976e-53
field2 || -BinarySequence || 2.48141161871e-53
insert3 || \&\ || 2.47643683995e-53
bNF_Ca1811156065der_on || is_a_retraction_of || 2.32604830163e-53
code_nat_of_natural || FixedSubtrees || 2.32436152354e-53
member3 || is_subformula_of || 2.2735968734e-53
semilattice || meets || 2.21818863436e-53
order_well_order_on || are_divergent_wrt || 2.11098376988e-53
converse || +87 || 1.94556535852e-53
fun_is_measure || ex_inf_of || 1.81750618591e-53
append || +101 || 1.80177434268e-53
conversep || +87 || 1.6943996927e-53
semilattice || is_continuous_in || 1.61794971228e-53
domainp || - || 1.56448837911e-53
transitive_trancl || Partial_Intersection || 1.49971082174e-53
bNF_Ca1811156065der_on || are_convergent<=1_wrt || 1.49808393965e-53
lattic35693393ce_set || is_differentiable_in || 1.46079704698e-53
transitive_rtrancl || Intersection || 1.30673079072e-53
suc_Rep || Web || 1.24497492962e-53
suc_Rep || tree0 || 1.24497492962e-53
the2 || sup1 || 1.21750849569e-53
order_well_order_on || are_convergent_wrt || 1.21696632639e-53
some || downarrow0 || 1.1827337635e-53
lattic35693393ce_set || InnerVertices || 1.18226081906e-53
sum_Inl || -95 || 1.1356958321e-53
semilattice || carrier\ || 1.12437926038e-53
transitive_rtrancl || Span || 1.07613098442e-53
order_well_order_on || is_derivable_from || 1.02821393638e-53
transitive_trancl || Leading-Monomial || 1.00992259488e-53
bNF_Ca1811156065der_on || ==>1 || 9.44920702225e-54
quotient_of || COMPLEX2Field || 9.32058574634e-54
append || +94 || 9.2672438296e-54
append || (+)0 || 9.2672438296e-54
remdups || Cn || 9.04873553104e-54
bNF_Ca646678531ard_of || -VectSp_over || 8.11322173194e-54
domainp || * || 7.21654846272e-54
transitive_rtrancl || len0 || 7.20589149449e-54
field2 || dim || 6.85377084945e-54
transitive_rtranclp || is_transformable_to0 || 6.84562362009e-54
map_le || is_naturally_transformable_to0 || 6.37474522842e-54
transitive_tranclp || ==>* || 5.94220800457e-54
suc_Rep || -- || 5.92369046602e-54
domainp || + || 5.88775077148e-54
sum_Inl || Pcom || 5.41899521386e-54
order_well_order_on || are_coplane || 5.36406130109e-54
bNF_Ca1811156065der_on || |=7 || 4.81278483892e-54
order_well_order_on || |-2 || 4.25512273787e-54
bNF_Ca1811156065der_on || #slash##slash#8 || 4.24446635035e-54
transitive_rtranclp || FinMeetCl || 4.19425541551e-54
transitive_rtranclp || UniCl || 4.19425541551e-54
transitive_acyclic || is_continuous_in || 4.12336649819e-54
comm_monoid || carrier\ || 3.41111381384e-54
groups828474808id_set || InnerVertices || 3.27913022254e-54
quotient_of || UNIVERSE || 3.18461699291e-54
quotient_of || @8 || 3.18461699291e-54
wf || is_differentiable_in || 3.06825598625e-54
transitive_rtrancl || nf || 2.73126497331e-54
bNF_Ca1811156065der_on || are_critical_wrt || 2.66578359378e-54
transitive_trancl || XFS2FS || 2.66018198627e-54
transitive_rtranclp || MaxADSet || 2.30702248573e-54
sum_Inl || @4 || 2.15640018397e-54
transitive_trancl || (Omega).0 || 2.09261478041e-54
order_well_order_on || are_convertible_wrt || 1.93287087671e-54
transitive_rtrancl || dim || 1.85245195284e-54
transitive_trancl || superior_setsequence || 1.7202036581e-54
code_int_of_integer || FixedSubtrees || 1.69329221153e-54
transitive_tranclp || is_transformable_to || 1.67698821445e-54
transitive_tranclp || c=8 || 1.67698821445e-54
sum_Inl || #hash#7 || 1.64806728503e-54
transitive_rtrancl || Lim_K || 1.56935916185e-54
transitive_rtrancl || rng || 1.52068061132e-54
basic_BNF_xtor || -6 || 1.35343454961e-54
quotient_of || (#hash#)22 || 1.28637276438e-54
quotient_of || prop || 1.28637276438e-54
quotient_of || \not\9 || 1.28637276438e-54
suc_Rep || Seg0 || 1.28637276438e-54
bNF_Ca1811156065der_on || is_unif_conv_on || 1.20552651878e-54
order_well_order_on || is_point_conv_on || 1.0846684247e-54
append || +65 || 8.97884490591e-55
wf || <N< || 8.91892929657e-55
transitive_trancl || conv || 8.45660525405e-55
transitive_rtrancl || Affin || 8.12736000081e-55
transitive_trancl || Z_Lin || 7.68593487462e-55
transitive_rtrancl || Lin0 || 6.84586238989e-55
code_nat_of_natural || Field2COMPLEX || 6.82327320478e-55
code_nat_of_natural || |[..]|2 || 6.82327320478e-55
transitive_acyclic || meets || 6.70289979833e-55
remdups || clf || 6.45861018691e-55
order_well_order_on || is_a_cluster_point_of0 || 6.44929407962e-55
bNF_Ca1811156065der_on || _|_2 || 5.93674025774e-55
transitive_rtranclp || Z_Lin || 5.49664371691e-55
transitive_rtranclp || Cn || 5.49664371691e-55
bNF_Ca1811156065der_on || is_convergent_to || 5.42056216283e-55
sum_Inl || +32 || 5.27465254675e-55
order_well_order_on || are_ldependent2 || 5.115420267e-55
append || +81 || 4.63365135435e-55
bNF_Ca646678531ard_of || uparrow0 || 4.38263682466e-55
suc_Rep || Rev0 || 3.85975438594e-55
field2 || inf || 3.79061053746e-55
append || ^17 || 3.52814541513e-55
transitive_tranclp || <=3 || 3.26764636273e-55
order_well_order_on || [= || 3.13445563398e-55
transitive_rtranclp || is_transformable_to || 2.50432409902e-55
transitive_rtranclp || c=8 || 2.50432409902e-55
append || +87 || 2.38630034683e-55
transitive_rtranclp || LAp || 2.18464349687e-55
sum_Inl || with-replacement || 2.15015245595e-55
code_nat_of_natural || COMPLEX2Field || 2.08808443428e-55
suc_Rep || ^2 || 1.72609918594e-55
suc_Rep || dl. || 1.72609918594e-55
suc_Rep || elementary_tree || 1.72609918594e-55
bNF_Ca1811156065der_on || c=1 || 1.66796566375e-55
quotient_of || ^25 || 1.60986822622e-55
bNF_Ca1811156065der_on || is_properly_applicable_to || 1.5997510994e-55
transitive_rtranclp || UAp || 1.58464797615e-55
order_well_order_on || is_applicable_to1 || 1.53037917489e-55
remdups || |` || 1.46762667547e-55
bNF_Ca646678531ard_of || downarrow0 || 1.37262171783e-55
transitive_rtranclp || downarrow || 1.17504234666e-55
field2 || sup1 || 1.12329222873e-55
transitive_rtrancl || UniCl || 1.05239516042e-55
suc_Rep || -50 || 1.01186487424e-55
quotient_of || fsloc || 9.30261273299e-56
quotient_of || #quote##quote#0 || 9.30261273299e-56
quotient_of || cpx2euc || 9.30261273299e-56
set2 || R_EAL1 || 8.67726183214e-56
transitive_tranclp || is_naturally_transformable_to0 || 8.40641261714e-56
order_well_order_on || is_often_in || 8.1665655729e-56
code_nat_of_natural || @8 || 7.89306136902e-56
finite_finite2 || r3_tarski || 7.50987698164e-56
suc_Rep || -3 || 7.2840356712e-56
transitive_rtrancl || ord || 6.69815448492e-56
bNF_Ca1811156065der_on || is_eventually_in || 6.42736826279e-56
code_int_of_integer || alef || 6.22535036205e-56
code_int_of_integer || Field2COMPLEX || 6.22535036205e-56
code_int_of_integer || |[..]|2 || 6.22535036205e-56
transitive_rtrancl || MaxADSet || 6.1283832637e-56
transitive_rtranclp || uparrow || 6.02569597317e-56
bNF_Ca1811156065der_on || is_differentiable_in5 || 5.80405176944e-56
transitive_trancl || #quote#4 || 5.80030227222e-56
quotient_of || x.0 || 5.65633839554e-56
order_well_order_on || is_continuous_in2 || 5.64294023562e-56
order_well_order_on || <=\ || 5.17305464988e-56
transitive_rtranclp || clf || 4.73801350499e-56
bNF_Ca1811156065der_on || divides1 || 3.95148267154e-56
code_nat_of_natural || (#hash#)22 || 3.46684098985e-56
code_nat_of_natural || prop || 3.46684098985e-56
code_nat_of_natural || \not\9 || 3.46684098985e-56
set2 || +84 || 3.2388985072e-56
suc_Rep || goto || 3.02389873289e-56
finite_finite2 || <1 || 2.88851355407e-56
code_int_of_integer || COMPLEX2Field || 2.0477558565e-56
transitive_rtranclp || +75 || 1.68988415293e-56
transitive_rtrancl || Z_Lin || 1.66900296404e-56
transitive_rtrancl || Cn || 1.66900296404e-56
suc_Rep || root-tree0 || 1.60364715388e-56
quotient_of || --0 || 1.60364715388e-56
quotient_of || euc2cpx || 1.60364715388e-56
append || union1 || 1.55009896675e-56
transitive_rtranclp || is_naturally_transformable_to0 || 1.4528228713e-56
set2 || lcm || 1.44687805124e-56
remdups || *49 || 1.32172922919e-56
bNF_Ca1811156065der_on || is_oriented_vertex_seq_of || 1.27435929122e-56
order_well_order_on || is_vertex_seq_of || 1.23240754036e-56
transitive_rtranclp || |` || 1.19089354599e-56
transitive_rtranclp || ?0 || 1.09602537315e-56
append || #quote##bslash##slash##quote#5 || 1.08358043903e-56
finite_finite2 || divides0 || 1.0697452716e-56
code_int_of_integer || UNIVERSE || 8.20315075557e-57
code_int_of_integer || @8 || 8.20315075557e-57
quotient_of || Web || 7.99180532406e-57
quotient_of || tree0 || 7.99180532406e-57
transitive_rtrancl || LAp || 7.21231571495e-57
transitive_rtranclp || \or\3 || 6.88185786898e-57
suc_Rep || #quote#0 || 6.68179772946e-57
transitive_rtrancl || UAp || 5.38376853891e-57
transitive_rtranclp || =>2 || 4.53416293757e-57
quotient_of || -- || 4.33332813965e-57
suc_Rep || <%..%> || 4.13900515852e-57
transitive_rtrancl || downarrow || 4.09945623524e-57
code_int_of_integer || (#hash#)22 || 3.78083326624e-57
code_int_of_integer || prop || 3.78083326624e-57
code_int_of_integer || \not\9 || 3.78083326624e-57
code_nat_of_natural || fsloc || 3.16998766087e-57
code_nat_of_natural || #quote##quote#0 || 3.16998766087e-57
code_nat_of_natural || cpx2euc || 3.16998766087e-57
append || #quote##slash##bslash##quote#2 || 2.30005614608e-57
transitive_rtrancl || uparrow || 2.22899422243e-57
code_nat_of_natural || x.0 || 2.01226774761e-57
transitive_rtrancl || clf || 1.78958579458e-57
order_well_order_on || is_continuous_in0 || 1.6956225386e-57
bNF_Ca1811156065der_on || is_differentiable_in3 || 1.65670106333e-57
transitive_rtranclp || *49 || 1.25391727777e-57
quotient_of || Seg0 || 1.22457782417e-57
transitive_rtranclp || \&\2 || 1.19594189685e-57
suc_Rep || succ1 || 8.19660878747e-58
basic_BNF_xtor || - || 7.29877767128e-58
transitive_rtrancl || +75 || 6.97026810093e-58
code_nat_of_natural || --0 || 6.34988874893e-58
code_nat_of_natural || euc2cpx || 6.34988874893e-58
suc_Rep || #quote# || 5.96970218616e-58
transitive_rtrancl || |` || 5.05857619078e-58
order_well_order_on || << || 4.89068251081e-58
bNF_Ca1811156065der_on || > || 4.69407076608e-58
transitive_rtrancl || ?0 || 4.68799852132e-58
quotient_of || Rev0 || 4.49933312109e-58
fun_is_measure || in0 || 4.29291125645e-58
code_int_of_integer || cpx2euc || 3.95773405558e-58
code_int_of_integer || fsloc || 3.95773405558e-58
code_int_of_integer || #quote##quote#0 || 3.95773405558e-58
code_nat_of_natural || Web || 3.35323940948e-58
code_nat_of_natural || tree0 || 3.35323940948e-58
code_int_of_integer || x.0 || 2.57562379559e-58
quotient_of || ^2 || 2.29806784578e-58
quotient_of || dl. || 2.29806784578e-58
quotient_of || elementary_tree || 2.29806784578e-58
transitive_rtrancl || #bslash#3 || 2.28949992503e-58
transitive_trancl || #slash##bslash#0 || 2.12585387387e-58
code_nat_of_natural || -- || 1.91179562467e-58
append || ^^ || 1.73133271115e-58
quotient_of || -50 || 1.46970032801e-58
suc_Rep || intloc || 1.3812605738e-58
quotient_of || -3 || 1.11571509744e-58
code_int_of_integer || --0 || 8.64748127876e-59
code_int_of_integer || euc2cpx || 8.64748127876e-59
code_nat_of_natural || Seg0 || 5.97981765263e-59
suc || idsym || 5.40332536128e-59
quotient_of || goto || 5.33008093949e-59
code_int_of_integer || Web || 4.72264752192e-59
code_int_of_integer || tree0 || 4.72264752192e-59
sum_Inl || IC || 4.05402956729e-59
quotient_of || root-tree0 || 3.12328156108e-59
code_int_of_integer || -- || 2.77221502102e-59
code_nat_of_natural || Rev0 || 2.37623747813e-59
sum_Inl || *8 || 2.27826816775e-59
suc_Rep || product || 2.04748608236e-59
quotient_of || #quote#0 || 1.49038241272e-59
code_nat_of_natural || ^2 || 1.277937177e-59
code_nat_of_natural || dl. || 1.277937177e-59
code_nat_of_natural || elementary_tree || 1.277937177e-59
quotient_of || <%..%> || 9.93285260745e-60
code_int_of_integer || Seg0 || 9.19887356218e-60
code_nat_of_natural || -50 || 8.4545180884e-60
suc || FixedSubtrees || 7.19685137892e-60
code_nat_of_natural || -3 || 6.55249802047e-60
code_int_of_integer || Rev0 || 3.82651704687e-60
rev || - || 3.65040735905e-60
code_nat_of_natural || goto || 3.30681190321e-60
suc_Rep || card || 2.81927240175e-60
quotient_of || succ1 || 2.50550365092e-60
code_int_of_integer || ^2 || 2.12092589363e-60
code_int_of_integer || dl. || 2.12092589363e-60
code_int_of_integer || elementary_tree || 2.12092589363e-60
code_nat_of_natural || root-tree0 || 2.01494550095e-60
quotient_of || #quote# || 1.91145098452e-60
code_int_of_integer || -50 || 1.43126695223e-60
code_int_of_integer || -3 || 1.12281879835e-60
sum_Inl || -1 || 1.10303307569e-60
code_nat_of_natural || #quote#0 || 1.01412728846e-60
suc_Rep || <*..*>4 || 9.4443647181e-61
sum_Inl || +2 || 7.52142680434e-61
code_nat_of_natural || <%..%> || 6.95643036315e-61
suc || alef || 6.59320169205e-61
suc || Field2COMPLEX || 6.59320169205e-61
suc || |[..]|2 || 6.59320169205e-61
code_int_of_integer || goto || 5.85182591321e-61
quotient_of || intloc || 5.45671842457e-61
code_int_of_integer || root-tree0 || 3.64857184445e-61
suc || COMPLEX2Field || 2.91462716402e-61
transitive_rtranclp || #bslash##slash#0 || 2.27459020889e-61
code_nat_of_natural || succ1 || 1.93101000967e-61
code_int_of_integer || #quote#0 || 1.89485238474e-61
suc || UNIVERSE || 1.48239301751e-61
suc || @8 || 1.48239301751e-61
code_int_of_integer || <%..%> || 1.32205258383e-61
quotient_of || product || 1.0531933386e-61
suc || (#hash#)22 || 8.33647367498e-62
suc || prop || 8.33647367498e-62
suc || \not\9 || 8.33647367498e-62
code_nat_of_natural || intloc || 4.65814306088e-62
code_int_of_integer || succ1 || 3.88339954669e-62
suc || ^25 || 2.18983334435e-62
quotient_of || card || 1.88509186854e-62
suc || fsloc || 1.53267326183e-62
suc || cpx2euc || 1.53267326183e-62
suc || x.0 || 1.10723302405e-62
code_nat_of_natural || product || 9.99625115396e-63
code_int_of_integer || intloc || 9.9532571746e-63
quotient_of || <*..*>4 || 7.26099126379e-63
suc || euc2cpx || 4.82777767383e-63
suc || Web || 3.04009135877e-63
suc || tree0 || 3.04009135877e-63
suc_Rep || -0 || 1.60479500359e-63
suc || Seg0 || 8.62808761283e-64
code_int_of_integer || card || 4.82586113118e-64
suc || Rev0 || 4.36907986335e-64
suc || ^2 || 2.75864417763e-64
suc || elementary_tree || 2.75864417763e-64
code_int_of_integer || <*..*>4 || 2.0361310554e-64
suc || -3 || 1.67758021576e-64
suc || goto || 1.00580699699e-64
suc || root-tree0 || 6.9331727465e-65
suc || #quote#0 || 4.13149315312e-65
suc || <%..%> || 3.1062325511e-65
quotient_of || -0 || 2.60024701941e-65
code_nat_of_natural || -0 || 3.95740605605e-66
suc || intloc || 3.93378604459e-66
code_int_of_integer || -0 || 1.19711185374e-66
suc || product || 1.19419894331e-66
suc || <*..*>4 || 1.66656760173e-67
