TSTP Solution File: REL036+1 by Bliksem---1.12
View Problem
- Process Solution
%------------------------------------------------------------------------------
% File : Bliksem---1.12
% Problem : REL036+1 : TPTP v8.1.0. Released v4.0.0.
% Transfm : none
% Format : tptp:raw
% Command : bliksem %s
% Computer : n004.cluster.edu
% Model : x86_64 x86_64
% CPU : Intel(R) Xeon(R) CPU E5-2620 v4 2.10GHz
% Memory : 8042.1875MB
% OS : Linux 3.10.0-693.el7.x86_64
% CPULimit : 300s
% WCLimit : 0s
% DateTime : Mon Jul 18 19:01:07 EDT 2022
% Result : Theorem 67.16s 67.63s
% Output : Refutation 67.16s
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.07/0.12 % Problem : REL036+1 : TPTP v8.1.0. Released v4.0.0.
% 0.07/0.13 % Command : bliksem %s
% 0.13/0.34 % Computer : n004.cluster.edu
% 0.13/0.34 % Model : x86_64 x86_64
% 0.13/0.34 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.13/0.34 % Memory : 8042.1875MB
% 0.13/0.34 % OS : Linux 3.10.0-693.el7.x86_64
% 0.13/0.34 % CPULimit : 300
% 0.13/0.34 % DateTime : Fri Jul 8 10:41:52 EDT 2022
% 0.13/0.34 % CPUTime :
% 8.22/8.63 *** allocated 10000 integers for termspace/termends
% 8.22/8.63 *** allocated 10000 integers for clauses
% 8.22/8.63 *** allocated 10000 integers for justifications
% 8.22/8.63 Bliksem 1.12
% 8.22/8.63
% 8.22/8.63
% 8.22/8.63 Automatic Strategy Selection
% 8.22/8.63
% 8.22/8.63
% 8.22/8.63 Clauses:
% 8.22/8.63
% 8.22/8.63 { join( X, Y ) = join( Y, X ) }.
% 8.22/8.63 { join( X, join( Y, Z ) ) = join( join( X, Y ), Z ) }.
% 8.22/8.63 { X = join( complement( join( complement( X ), complement( Y ) ) ),
% 8.22/8.63 complement( join( complement( X ), Y ) ) ) }.
% 8.22/8.63 { meet( X, Y ) = complement( join( complement( X ), complement( Y ) ) ) }.
% 8.22/8.63 { composition( X, composition( Y, Z ) ) = composition( composition( X, Y )
% 8.22/8.63 , Z ) }.
% 8.22/8.63 { composition( X, one ) = X }.
% 8.22/8.63 { composition( join( X, Y ), Z ) = join( composition( X, Z ), composition(
% 8.22/8.63 Y, Z ) ) }.
% 8.22/8.63 { converse( converse( X ) ) = X }.
% 8.22/8.63 { converse( join( X, Y ) ) = join( converse( X ), converse( Y ) ) }.
% 8.22/8.63 { converse( composition( X, Y ) ) = composition( converse( Y ), converse( X
% 8.22/8.63 ) ) }.
% 8.22/8.63 { join( composition( converse( X ), complement( composition( X, Y ) ) ),
% 8.22/8.63 complement( Y ) ) = complement( Y ) }.
% 8.22/8.63 { top = join( X, complement( X ) ) }.
% 8.22/8.63 { zero = meet( X, complement( X ) ) }.
% 8.22/8.63 { composition( skol1, top ) = skol1 }.
% 8.22/8.63 { ! join( composition( meet( skol2, converse( skol1 ) ), skol3 ),
% 8.22/8.63 composition( meet( skol2, converse( skol1 ) ), meet( skol1, skol3 ) ) ) =
% 8.22/8.63 composition( meet( skol2, converse( skol1 ) ), meet( skol1, skol3 ) ) }
% 8.22/8.63 .
% 8.22/8.63
% 8.22/8.63 percentage equality = 1.000000, percentage horn = 1.000000
% 8.22/8.63 This is a pure equality problem
% 8.22/8.63
% 8.22/8.63
% 8.22/8.63
% 8.22/8.63 Options Used:
% 8.22/8.63
% 8.22/8.63 useres = 1
% 8.22/8.63 useparamod = 1
% 8.22/8.63 useeqrefl = 1
% 8.22/8.63 useeqfact = 1
% 8.22/8.63 usefactor = 1
% 8.22/8.63 usesimpsplitting = 0
% 8.22/8.63 usesimpdemod = 5
% 8.22/8.63 usesimpres = 3
% 8.22/8.63
% 8.22/8.63 resimpinuse = 1000
% 8.22/8.63 resimpclauses = 20000
% 8.22/8.63 substype = eqrewr
% 8.22/8.63 backwardsubs = 1
% 8.22/8.63 selectoldest = 5
% 8.22/8.63
% 8.22/8.63 litorderings [0] = split
% 8.22/8.63 litorderings [1] = extend the termordering, first sorting on arguments
% 8.22/8.63
% 8.22/8.63 termordering = kbo
% 8.22/8.63
% 8.22/8.63 litapriori = 0
% 8.22/8.63 termapriori = 1
% 8.22/8.63 litaposteriori = 0
% 8.22/8.63 termaposteriori = 0
% 8.22/8.63 demodaposteriori = 0
% 8.22/8.63 ordereqreflfact = 0
% 8.22/8.63
% 8.22/8.63 litselect = negord
% 8.22/8.63
% 8.22/8.63 maxweight = 15
% 8.22/8.63 maxdepth = 30000
% 8.22/8.63 maxlength = 115
% 8.22/8.63 maxnrvars = 195
% 8.22/8.63 excuselevel = 1
% 8.22/8.63 increasemaxweight = 1
% 8.22/8.63
% 8.22/8.63 maxselected = 10000000
% 8.22/8.63 maxnrclauses = 10000000
% 8.22/8.63
% 8.22/8.63 showgenerated = 0
% 8.22/8.63 showkept = 0
% 8.22/8.63 showselected = 0
% 8.22/8.63 showdeleted = 0
% 8.22/8.63 showresimp = 1
% 8.22/8.63 showstatus = 2000
% 8.22/8.63
% 8.22/8.63 prologoutput = 0
% 8.22/8.63 nrgoals = 5000000
% 8.22/8.63 totalproof = 1
% 8.22/8.63
% 8.22/8.63 Symbols occurring in the translation:
% 8.22/8.63
% 8.22/8.63 {} [0, 0] (w:1, o:2, a:1, s:1, b:0),
% 8.22/8.63 . [1, 2] (w:1, o:22, a:1, s:1, b:0),
% 8.22/8.63 ! [4, 1] (w:0, o:15, a:1, s:1, b:0),
% 8.22/8.63 = [13, 2] (w:1, o:0, a:0, s:1, b:0),
% 8.22/8.63 ==> [14, 2] (w:1, o:0, a:0, s:1, b:0),
% 8.22/8.63 join [37, 2] (w:1, o:46, a:1, s:1, b:0),
% 8.22/8.63 complement [39, 1] (w:1, o:20, a:1, s:1, b:0),
% 8.22/8.63 meet [40, 2] (w:1, o:47, a:1, s:1, b:0),
% 8.22/8.63 composition [41, 2] (w:1, o:48, a:1, s:1, b:0),
% 8.22/8.63 one [42, 0] (w:1, o:9, a:1, s:1, b:0),
% 8.22/8.63 converse [43, 1] (w:1, o:21, a:1, s:1, b:0),
% 8.22/8.63 top [44, 0] (w:1, o:13, a:1, s:1, b:0),
% 8.22/8.63 zero [45, 0] (w:1, o:14, a:1, s:1, b:0),
% 8.22/8.63 skol1 [46, 0] (w:1, o:10, a:1, s:1, b:1),
% 8.22/8.63 skol2 [47, 0] (w:1, o:11, a:1, s:1, b:1),
% 8.22/8.63 skol3 [48, 0] (w:1, o:12, a:1, s:1, b:1).
% 8.22/8.63
% 8.22/8.63
% 8.22/8.63 Starting Search:
% 8.22/8.63
% 8.22/8.63 *** allocated 15000 integers for clauses
% 8.22/8.63 *** allocated 22500 integers for clauses
% 8.22/8.63 *** allocated 33750 integers for clauses
% 8.22/8.63 *** allocated 50625 integers for clauses
% 8.22/8.63 *** allocated 75937 integers for clauses
% 8.22/8.63 *** allocated 113905 integers for clauses
% 8.22/8.63 *** allocated 15000 integers for termspace/termends
% 8.22/8.63 Resimplifying inuse:
% 8.22/8.63 Done
% 8.22/8.63
% 8.22/8.63 *** allocated 170857 integers for clauses
% 8.22/8.63 *** allocated 22500 integers for termspace/termends
% 8.22/8.63 *** allocated 256285 integers for clauses
% 8.22/8.63 *** allocated 33750 integers for termspace/termends
% 8.22/8.63
% 8.22/8.63 Intermediate Status:
% 8.22/8.63 Generated: 24895
% 8.22/8.63 Kept: 2008
% 8.22/8.63 Inuse: 315
% 8.22/8.63 Deleted: 203
% 8.22/8.63 Deletedinuse: 85
% 8.22/8.63
% 8.22/8.63 Resimplifying inuse:
% 8.22/8.63 Done
% 8.22/8.63
% 8.22/8.63 *** allocated 384427 integers for clauses
% 8.22/8.63 *** allocated 50625 integers for termspace/termends
% 8.22/8.63 Resimplifying inuse:
% 8.22/8.63 Done
% 8.22/8.63
% 8.22/8.63 *** allocated 576640 integers for clauses
% 8.22/8.63
% 8.22/8.63 Intermediate Status:
% 8.22/8.63 Generated: 55677
% 31.32/31.69 Kept: 4052
% 31.32/31.69 Inuse: 471
% 31.32/31.69 Deleted: 364
% 31.32/31.69 Deletedinuse: 151
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 *** allocated 75937 integers for termspace/termends
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 *** allocated 864960 integers for clauses
% 31.32/31.69 *** allocated 113905 integers for termspace/termends
% 31.32/31.69
% 31.32/31.69 Intermediate Status:
% 31.32/31.69 Generated: 99421
% 31.32/31.69 Kept: 6078
% 31.32/31.69 Inuse: 646
% 31.32/31.69 Deleted: 393
% 31.32/31.69 Deletedinuse: 152
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 *** allocated 1297440 integers for clauses
% 31.32/31.69
% 31.32/31.69 Intermediate Status:
% 31.32/31.69 Generated: 161228
% 31.32/31.69 Kept: 8081
% 31.32/31.69 Inuse: 794
% 31.32/31.69 Deleted: 502
% 31.32/31.69 Deletedinuse: 156
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 *** allocated 170857 integers for termspace/termends
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69
% 31.32/31.69 Intermediate Status:
% 31.32/31.69 Generated: 222209
% 31.32/31.69 Kept: 10101
% 31.32/31.69 Inuse: 881
% 31.32/31.69 Deleted: 521
% 31.32/31.69 Deletedinuse: 160
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 *** allocated 1946160 integers for clauses
% 31.32/31.69
% 31.32/31.69 Intermediate Status:
% 31.32/31.69 Generated: 292145
% 31.32/31.69 Kept: 12106
% 31.32/31.69 Inuse: 1066
% 31.32/31.69 Deleted: 658
% 31.32/31.69 Deletedinuse: 189
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 *** allocated 256285 integers for termspace/termends
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69
% 31.32/31.69 Intermediate Status:
% 31.32/31.69 Generated: 371573
% 31.32/31.69 Kept: 14128
% 31.32/31.69 Inuse: 1193
% 31.32/31.69 Deleted: 735
% 31.32/31.69 Deletedinuse: 216
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69
% 31.32/31.69 Intermediate Status:
% 31.32/31.69 Generated: 459958
% 31.32/31.69 Kept: 16136
% 31.32/31.69 Inuse: 1349
% 31.32/31.69 Deleted: 827
% 31.32/31.69 Deletedinuse: 216
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 *** allocated 2919240 integers for clauses
% 31.32/31.69
% 31.32/31.69 Intermediate Status:
% 31.32/31.69 Generated: 531157
% 31.32/31.69 Kept: 18169
% 31.32/31.69 Inuse: 1468
% 31.32/31.69 Deleted: 957
% 31.32/31.69 Deletedinuse: 228
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 *** allocated 384427 integers for termspace/termends
% 31.32/31.69 Resimplifying clauses:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69
% 31.32/31.69 Intermediate Status:
% 31.32/31.69 Generated: 582409
% 31.32/31.69 Kept: 20171
% 31.32/31.69 Inuse: 1606
% 31.32/31.69 Deleted: 4515
% 31.32/31.69 Deletedinuse: 229
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69
% 31.32/31.69 Intermediate Status:
% 31.32/31.69 Generated: 671799
% 31.32/31.69 Kept: 22172
% 31.32/31.69 Inuse: 1762
% 31.32/31.69 Deleted: 4536
% 31.32/31.69 Deletedinuse: 240
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69
% 31.32/31.69 Intermediate Status:
% 31.32/31.69 Generated: 774961
% 31.32/31.69 Kept: 24177
% 31.32/31.69 Inuse: 1922
% 31.32/31.69 Deleted: 4548
% 31.32/31.69 Deletedinuse: 245
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69
% 31.32/31.69 Intermediate Status:
% 31.32/31.69 Generated: 923972
% 31.32/31.69 Kept: 26257
% 31.32/31.69 Inuse: 2127
% 31.32/31.69 Deleted: 4616
% 31.32/31.69 Deletedinuse: 295
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 *** allocated 4378860 integers for clauses
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69
% 31.32/31.69 Intermediate Status:
% 31.32/31.69 Generated: 1001351
% 31.32/31.69 Kept: 28262
% 31.32/31.69 Inuse: 2206
% 31.32/31.69 Deleted: 4624
% 31.32/31.69 Deletedinuse: 299
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 *** allocated 576640 integers for termspace/termends
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69
% 31.32/31.69 Intermediate Status:
% 31.32/31.69 Generated: 1061234
% 31.32/31.69 Kept: 30295
% 31.32/31.69 Inuse: 2262
% 31.32/31.69 Deleted: 4627
% 31.32/31.69 Deletedinuse: 301
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69
% 31.32/31.69 Intermediate Status:
% 31.32/31.69 Generated: 1199971
% 31.32/31.69 Kept: 32301
% 31.32/31.69 Inuse: 2401
% 31.32/31.69 Deleted: 4637
% 31.32/31.69 Deletedinuse: 301
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69
% 31.32/31.69 Intermediate Status:
% 31.32/31.69 Generated: 1383946
% 31.32/31.69 Kept: 34339
% 31.32/31.69 Inuse: 2580
% 31.32/31.69 Deleted: 4675
% 31.32/31.69 Deletedinuse: 321
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69
% 31.32/31.69 Intermediate Status:
% 31.32/31.69 Generated: 1543236
% 31.32/31.69 Kept: 36390
% 31.32/31.69 Inuse: 2773
% 31.32/31.69 Deleted: 4732
% 31.32/31.69 Deletedinuse: 345
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69
% 31.32/31.69 Intermediate Status:
% 31.32/31.69 Generated: 1650654
% 31.32/31.69 Kept: 38390
% 31.32/31.69 Inuse: 2852
% 31.32/31.69 Deleted: 4784
% 31.32/31.69 Deletedinuse: 369
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 Resimplifying clauses:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 *** allocated 6568290 integers for clauses
% 31.32/31.69
% 31.32/31.69 Intermediate Status:
% 31.32/31.69 Generated: 1730634
% 31.32/31.69 Kept: 40392
% 31.32/31.69 Inuse: 2957
% 31.32/31.69 Deleted: 9308
% 31.32/31.69 Deletedinuse: 378
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 31.32/31.69
% 31.32/31.69
% 31.32/31.69 Intermediate Status:
% 31.32/31.69 Generated: 1863679
% 31.32/31.69 Kept: 42443
% 31.32/31.69 Inuse: 3069
% 31.32/31.69 Deleted: 9317
% 31.32/31.69 Deletedinuse: 387
% 31.32/31.69
% 31.32/31.69 *** allocated 864960 integers for termspace/termends
% 31.32/31.69 Resimplifying inuse:
% 31.32/31.69 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 2023453
% 58.38/58.81 Kept: 44445
% 58.38/58.81 Inuse: 3151
% 58.38/58.81 Deleted: 9317
% 58.38/58.81 Deletedinuse: 387
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 2238023
% 58.38/58.81 Kept: 46456
% 58.38/58.81 Inuse: 3261
% 58.38/58.81 Deleted: 9321
% 58.38/58.81 Deletedinuse: 387
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 2394529
% 58.38/58.81 Kept: 48467
% 58.38/58.81 Inuse: 3334
% 58.38/58.81 Deleted: 9333
% 58.38/58.81 Deletedinuse: 399
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 2575087
% 58.38/58.81 Kept: 50477
% 58.38/58.81 Inuse: 3453
% 58.38/58.81 Deleted: 9370
% 58.38/58.81 Deletedinuse: 405
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 2814738
% 58.38/58.81 Kept: 52524
% 58.38/58.81 Inuse: 3642
% 58.38/58.81 Deleted: 9384
% 58.38/58.81 Deletedinuse: 405
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 3005326
% 58.38/58.81 Kept: 54530
% 58.38/58.81 Inuse: 3750
% 58.38/58.81 Deleted: 9544
% 58.38/58.81 Deletedinuse: 562
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 3077593
% 58.38/58.81 Kept: 56569
% 58.38/58.81 Inuse: 3812
% 58.38/58.81 Deleted: 9550
% 58.38/58.81 Deletedinuse: 565
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 3145408
% 58.38/58.81 Kept: 58610
% 58.38/58.81 Inuse: 3869
% 58.38/58.81 Deleted: 9569
% 58.38/58.81 Deletedinuse: 578
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying clauses:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 3211498
% 58.38/58.81 Kept: 60617
% 58.38/58.81 Inuse: 3913
% 58.38/58.81 Deleted: 16775
% 58.38/58.81 Deletedinuse: 578
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 *** allocated 9852435 integers for clauses
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 3300442
% 58.38/58.81 Kept: 62624
% 58.38/58.81 Inuse: 3989
% 58.38/58.81 Deleted: 16910
% 58.38/58.81 Deletedinuse: 695
% 58.38/58.81
% 58.38/58.81 *** allocated 1297440 integers for termspace/termends
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 3414230
% 58.38/58.81 Kept: 64708
% 58.38/58.81 Inuse: 4069
% 58.38/58.81 Deleted: 16920
% 58.38/58.81 Deletedinuse: 703
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 3506454
% 58.38/58.81 Kept: 66716
% 58.38/58.81 Inuse: 4140
% 58.38/58.81 Deleted: 17382
% 58.38/58.81 Deletedinuse: 1158
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 3674569
% 58.38/58.81 Kept: 68729
% 58.38/58.81 Inuse: 4274
% 58.38/58.81 Deleted: 17476
% 58.38/58.81 Deletedinuse: 1167
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 3799413
% 58.38/58.81 Kept: 70735
% 58.38/58.81 Inuse: 4381
% 58.38/58.81 Deleted: 17515
% 58.38/58.81 Deletedinuse: 1168
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 4040323
% 58.38/58.81 Kept: 72813
% 58.38/58.81 Inuse: 4581
% 58.38/58.81 Deleted: 17558
% 58.38/58.81 Deletedinuse: 1171
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 4208119
% 58.38/58.81 Kept: 74817
% 58.38/58.81 Inuse: 4683
% 58.38/58.81 Deleted: 17623
% 58.38/58.81 Deletedinuse: 1200
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 4331539
% 58.38/58.81 Kept: 76855
% 58.38/58.81 Inuse: 4787
% 58.38/58.81 Deleted: 17688
% 58.38/58.81 Deletedinuse: 1231
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 4505845
% 58.38/58.81 Kept: 78865
% 58.38/58.81 Inuse: 4901
% 58.38/58.81 Deleted: 17737
% 58.38/58.81 Deletedinuse: 1241
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying clauses:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 4651246
% 58.38/58.81 Kept: 81161
% 58.38/58.81 Inuse: 4979
% 58.38/58.81 Deleted: 32009
% 58.38/58.81 Deletedinuse: 1323
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 4908636
% 58.38/58.81 Kept: 83245
% 58.38/58.81 Inuse: 5106
% 58.38/58.81 Deleted: 32012
% 58.38/58.81 Deletedinuse: 1326
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 5329197
% 58.38/58.81 Kept: 85255
% 58.38/58.81 Inuse: 5269
% 58.38/58.81 Deleted: 32016
% 58.38/58.81 Deletedinuse: 1330
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 5803873
% 58.38/58.81 Kept: 87280
% 58.38/58.81 Inuse: 5415
% 58.38/58.81 Deleted: 32020
% 58.38/58.81 Deletedinuse: 1334
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81 Resimplifying inuse:
% 58.38/58.81 Done
% 58.38/58.81
% 58.38/58.81
% 58.38/58.81 Intermediate Status:
% 58.38/58.81 Generated: 6143780
% 58.38/58.81 Kept: 89282
% 67.16/67.62 Inuse: 5553
% 67.16/67.62 Deleted: 32034
% 67.16/67.62 Deletedinuse: 1344
% 67.16/67.62
% 67.16/67.62 Resimplifying inuse:
% 67.16/67.62 Done
% 67.16/67.62
% 67.16/67.62 Resimplifying inuse:
% 67.16/67.62 Done
% 67.16/67.62
% 67.16/67.62
% 67.16/67.62 Intermediate Status:
% 67.16/67.62 Generated: 6334240
% 67.16/67.62 Kept: 91291
% 67.16/67.62 Inuse: 5669
% 67.16/67.62 Deleted: 32086
% 67.16/67.62 Deletedinuse: 1370
% 67.16/67.62
% 67.16/67.62 Resimplifying inuse:
% 67.16/67.62 Done
% 67.16/67.62
% 67.16/67.62 *** allocated 14778652 integers for clauses
% 67.16/67.62 Resimplifying inuse:
% 67.16/67.62 Done
% 67.16/67.62
% 67.16/67.62
% 67.16/67.62 Intermediate Status:
% 67.16/67.62 Generated: 6482471
% 67.16/67.62 Kept: 93291
% 67.16/67.62 Inuse: 5742
% 67.16/67.62 Deleted: 32118
% 67.16/67.62 Deletedinuse: 1400
% 67.16/67.62
% 67.16/67.62 *** allocated 1946160 integers for termspace/termends
% 67.16/67.62 Resimplifying inuse:
% 67.16/67.62 Done
% 67.16/67.62
% 67.16/67.62 Resimplifying inuse:
% 67.16/67.62 Done
% 67.16/67.62
% 67.16/67.62
% 67.16/67.62 Intermediate Status:
% 67.16/67.62 Generated: 6633781
% 67.16/67.62 Kept: 95296
% 67.16/67.62 Inuse: 5821
% 67.16/67.62 Deleted: 32120
% 67.16/67.62 Deletedinuse: 1402
% 67.16/67.62
% 67.16/67.62 Resimplifying inuse:
% 67.16/67.62 Done
% 67.16/67.62
% 67.16/67.62 Resimplifying inuse:
% 67.16/67.62 Done
% 67.16/67.62
% 67.16/67.62
% 67.16/67.62 Intermediate Status:
% 67.16/67.62 Generated: 6796813
% 67.16/67.62 Kept: 97324
% 67.16/67.62 Inuse: 5881
% 67.16/67.62 Deleted: 32120
% 67.16/67.62 Deletedinuse: 1402
% 67.16/67.62
% 67.16/67.62 Resimplifying inuse:
% 67.16/67.62 Done
% 67.16/67.62
% 67.16/67.62 Resimplifying inuse:
% 67.16/67.62 Done
% 67.16/67.62
% 67.16/67.62
% 67.16/67.62 Intermediate Status:
% 67.16/67.62 Generated: 7048111
% 67.16/67.62 Kept: 99473
% 67.16/67.62 Inuse: 6025
% 67.16/67.62 Deleted: 32137
% 67.16/67.63 Deletedinuse: 1419
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying clauses:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 7287543
% 67.16/67.63 Kept: 101603
% 67.16/67.63 Inuse: 6134
% 67.16/67.63 Deleted: 36715
% 67.16/67.63 Deletedinuse: 1419
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 7538566
% 67.16/67.63 Kept: 103605
% 67.16/67.63 Inuse: 6269
% 67.16/67.63 Deleted: 36730
% 67.16/67.63 Deletedinuse: 1431
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 8014510
% 67.16/67.63 Kept: 105616
% 67.16/67.63 Inuse: 6487
% 67.16/67.63 Deleted: 36737
% 67.16/67.63 Deletedinuse: 1436
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 8422299
% 67.16/67.63 Kept: 107627
% 67.16/67.63 Inuse: 6646
% 67.16/67.63 Deleted: 36746
% 67.16/67.63 Deletedinuse: 1441
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 8730410
% 67.16/67.63 Kept: 109639
% 67.16/67.63 Inuse: 6800
% 67.16/67.63 Deleted: 36763
% 67.16/67.63 Deletedinuse: 1447
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 8923681
% 67.16/67.63 Kept: 111642
% 67.16/67.63 Inuse: 6894
% 67.16/67.63 Deleted: 36775
% 67.16/67.63 Deletedinuse: 1448
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 9173352
% 67.16/67.63 Kept: 113649
% 67.16/67.63 Inuse: 7012
% 67.16/67.63 Deleted: 36779
% 67.16/67.63 Deletedinuse: 1448
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 9392795
% 67.16/67.63 Kept: 115649
% 67.16/67.63 Inuse: 7132
% 67.16/67.63 Deleted: 36779
% 67.16/67.63 Deletedinuse: 1448
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 9491530
% 67.16/67.63 Kept: 117707
% 67.16/67.63 Inuse: 7181
% 67.16/67.63 Deleted: 36782
% 67.16/67.63 Deletedinuse: 1448
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 9561466
% 67.16/67.63 Kept: 119717
% 67.16/67.63 Inuse: 7204
% 67.16/67.63 Deleted: 36853
% 67.16/67.63 Deletedinuse: 1519
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying clauses:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 9742832
% 67.16/67.63 Kept: 121760
% 67.16/67.63 Inuse: 7281
% 67.16/67.63 Deleted: 40625
% 67.16/67.63 Deletedinuse: 1548
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 9977271
% 67.16/67.63 Kept: 123830
% 67.16/67.63 Inuse: 7362
% 67.16/67.63 Deleted: 40638
% 67.16/67.63 Deletedinuse: 1559
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 10320846
% 67.16/67.63 Kept: 125833
% 67.16/67.63 Inuse: 7467
% 67.16/67.63 Deleted: 40685
% 67.16/67.63 Deletedinuse: 1606
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 10513906
% 67.16/67.63 Kept: 127856
% 67.16/67.63 Inuse: 7549
% 67.16/67.63 Deleted: 40689
% 67.16/67.63 Deletedinuse: 1608
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 10735870
% 67.16/67.63 Kept: 129870
% 67.16/67.63 Inuse: 7651
% 67.16/67.63 Deleted: 40700
% 67.16/67.63 Deletedinuse: 1608
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 10840568
% 67.16/67.63 Kept: 131962
% 67.16/67.63 Inuse: 7693
% 67.16/67.63 Deleted: 41080
% 67.16/67.63 Deletedinuse: 1962
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 11051091
% 67.16/67.63 Kept: 134004
% 67.16/67.63 Inuse: 7779
% 67.16/67.63 Deleted: 41373
% 67.16/67.63 Deletedinuse: 2225
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 11316133
% 67.16/67.63 Kept: 136102
% 67.16/67.63 Inuse: 7879
% 67.16/67.63 Deleted: 41429
% 67.16/67.63 Deletedinuse: 2247
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 11595680
% 67.16/67.63 Kept: 138143
% 67.16/67.63 Inuse: 7987
% 67.16/67.63 Deleted: 41493
% 67.16/67.63 Deletedinuse: 2277
% 67.16/67.63
% 67.16/67.63 *** allocated 22167978 integers for clauses
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 *** allocated 2919240 integers for termspace/termends
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 11832668
% 67.16/67.63 Kept: 140177
% 67.16/67.63 Inuse: 8087
% 67.16/67.63 Deleted: 41538
% 67.16/67.63 Deletedinuse: 2308
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying clauses:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 12089672
% 67.16/67.63 Kept: 142481
% 67.16/67.63 Inuse: 8161
% 67.16/67.63 Deleted: 60435
% 67.16/67.63 Deletedinuse: 2315
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63 Done
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Intermediate Status:
% 67.16/67.63 Generated: 12252921
% 67.16/67.63 Kept: 144616
% 67.16/67.63 Inuse: 8214
% 67.16/67.63 Deleted: 60746
% 67.16/67.63 Deletedinuse: 2616
% 67.16/67.63
% 67.16/67.63 Resimplifying inuse:
% 67.16/67.63
% 67.16/67.63 Bliksems!, er is een bewijs:
% 67.16/67.63 % SZS status Theorem
% 67.16/67.63 % SZS output start Refutation
% 67.16/67.63
% 67.16/67.63 (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.16/67.63 (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( join( X, Y )
% 67.16/67.63 , Z ) }.
% 67.16/67.63 (2) {G0,W14,D6,L1,V2,M1} I { join( complement( join( complement( X ),
% 67.16/67.63 complement( Y ) ) ), complement( join( complement( X ), Y ) ) ) ==> X }.
% 67.16/67.63 (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X ), complement
% 67.16/67.63 ( Y ) ) ) ==> meet( X, Y ) }.
% 67.16/67.63 (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z ) ) ==>
% 67.16/67.63 composition( composition( X, Y ), Z ) }.
% 67.16/67.63 (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 67.16/67.63 (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ), composition( Y, Z )
% 67.16/67.63 ) ==> composition( join( X, Y ), Z ) }.
% 67.16/67.63 (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.16/67.63 (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y ) ) ==>
% 67.16/67.63 converse( join( X, Y ) ) }.
% 67.16/67.63 (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ), converse( X ) )
% 67.16/67.63 ==> converse( composition( X, Y ) ) }.
% 67.16/67.63 (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X ), complement
% 67.16/67.63 ( composition( X, Y ) ) ), complement( Y ) ) ==> complement( Y ) }.
% 67.16/67.63 (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top }.
% 67.16/67.63 (12) {G0,W6,D4,L1,V1,M1} I { meet( X, complement( X ) ) ==> zero }.
% 67.16/67.63 (13) {G0,W5,D3,L1,V0,M1} I { composition( skol1, top ) ==> skol1 }.
% 67.16/67.63 (14) {G0,W24,D6,L1,V0,M1} I { ! join( composition( meet( skol2, converse(
% 67.16/67.63 skol1 ) ), skol3 ), composition( meet( skol2, converse( skol1 ) ), meet(
% 67.16/67.63 skol1, skol3 ) ) ) ==> composition( meet( skol2, converse( skol1 ) ),
% 67.16/67.63 meet( skol1, skol3 ) ) }.
% 67.16/67.63 (15) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X ) ==> top }.
% 67.16/67.63 (16) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y, converse( X )
% 67.16/67.63 ) ) ==> composition( X, converse( Y ) ) }.
% 67.16/67.63 (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( converse( X ), Y
% 67.16/67.63 ) ) ==> composition( converse( Y ), X ) }.
% 67.16/67.63 (18) {G1,W9,D4,L1,V2,M1} P(8,0);d(8) { converse( join( X, Y ) ) = converse
% 67.16/67.63 ( join( Y, X ) ) }.
% 67.16/67.63 (19) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X ), Y ) ) ==>
% 67.16/67.63 join( X, converse( Y ) ) }.
% 67.16/67.63 (20) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse( X ) ) ) ==>
% 67.16/67.63 join( converse( Y ), X ) }.
% 67.16/67.63 (21) {G2,W13,D5,L1,V3,M1} P(18,8);d(8) { converse( join( join( Y, X ), Z )
% 67.16/67.63 ) = converse( join( join( X, Y ), Z ) ) }.
% 67.16/67.63 (22) {G2,W13,D5,L1,V3,M1} P(18,8);d(8);d(1);d(1) { converse( join( join( Z
% 67.16/67.63 , Y ), X ) ) = converse( join( join( Z, X ), Y ) ) }.
% 67.16/67.63 (23) {G2,W13,D5,L1,V3,M1} P(18,9);d(9) { converse( composition( Z, join( Y
% 67.16/67.63 , X ) ) ) = converse( composition( Z, join( X, Y ) ) ) }.
% 67.16/67.63 (26) {G1,W14,D5,L1,V3,M1} P(8,1) { join( join( Z, converse( X ) ), converse
% 67.16/67.63 ( Y ) ) ==> join( Z, converse( join( X, Y ) ) ) }.
% 67.16/67.63 (27) {G2,W10,D6,L1,V2,M1} P(1,15) { join( join( complement( join( X, Y ) )
% 67.16/67.63 , X ), Y ) ==> top }.
% 67.16/67.63 (28) {G2,W10,D5,L1,V2,M1} P(15,1) { join( join( Y, complement( X ) ), X )
% 67.16/67.63 ==> join( Y, top ) }.
% 67.16/67.63 (29) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) = join( join( Y
% 67.16/67.63 , Z ), X ) }.
% 67.16/67.63 (30) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X ) = join(
% 67.16/67.63 join( Z, X ), Y ) }.
% 67.16/67.63 (31) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ), complement( X ) )
% 67.16/67.63 ==> join( Y, top ) }.
% 67.16/67.63 (36) {G2,W10,D5,L1,V2,M1} P(31,0);d(1) { join( join( complement( Y ), X ),
% 67.16/67.63 Y ) ==> join( X, top ) }.
% 67.16/67.63 (37) {G2,W10,D4,L1,V2,M1} P(0,31) { join( join( Y, X ), complement( Y ) )
% 67.16/67.63 ==> join( X, top ) }.
% 67.16/67.63 (38) {G2,W9,D5,L1,V1,M1} P(11,31) { join( top, complement( complement( X )
% 67.16/67.63 ) ) ==> join( X, top ) }.
% 67.16/67.63 (46) {G3,W14,D5,L1,V3,M1} P(1,37) { join( join( join( X, Y ), Z ),
% 67.16/67.63 complement( X ) ) ==> join( join( Y, Z ), top ) }.
% 67.16/67.63 (48) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ), complement( join
% 67.16/67.63 ( complement( X ), Y ) ) ) ==> X }.
% 67.16/67.63 (55) {G2,W14,D6,L1,V3,M1} P(1,19) { converse( join( join( converse( X ), Y
% 67.16/67.63 ), Z ) ) ==> join( X, converse( join( Y, Z ) ) ) }.
% 67.16/67.63 (59) {G2,W9,D6,L1,V1,M1} P(11,19) { join( X, converse( complement( converse
% 67.16/67.63 ( X ) ) ) ) ==> converse( top ) }.
% 67.16/67.63 (74) {G2,W7,D4,L1,V1,M1} P(15,3) { meet( complement( X ), X ) ==>
% 67.16/67.63 complement( top ) }.
% 67.16/67.63 (75) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X, Y ) }.
% 67.16/67.63 (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==> zero }.
% 67.16/67.63 (78) {G2,W9,D5,L1,V1,M1} P(77,3) { complement( join( zero, complement( X )
% 67.16/67.63 ) ) ==> meet( top, X ) }.
% 67.16/67.63 (79) {G2,W9,D5,L1,V1,M1} P(77,3) { complement( join( complement( X ), zero
% 67.16/67.63 ) ) ==> meet( X, top ) }.
% 67.16/67.63 (80) {G3,W9,D4,L1,V1,M1} P(77,28) { join( join( X, zero ), top ) ==> join(
% 67.16/67.63 X, top ) }.
% 67.16/67.63 (90) {G1,W9,D4,L1,V1,M1} P(13,4) { composition( composition( X, skol1 ),
% 67.16/67.63 top ) ==> composition( X, skol1 ) }.
% 67.16/67.63 (92) {G3,W6,D4,L1,V1,M1} S(74);d(77) { meet( complement( X ), X ) ==> zero
% 67.16/67.63 }.
% 67.16/67.63 (93) {G1,W17,D5,L1,V4,M1} P(6,1) { join( join( T, composition( X, Y ) ),
% 67.16/67.63 composition( Z, Y ) ) ==> join( T, composition( join( X, Z ), Y ) ) }.
% 67.16/67.63 (95) {G1,W11,D4,L1,V3,M1} P(6,0);d(6) { composition( join( X, Z ), Y ) =
% 67.16/67.63 composition( join( Z, X ), Y ) }.
% 67.16/67.63 (97) {G1,W11,D4,L1,V1,M1} P(13,6) { composition( join( X, skol1 ), top )
% 67.16/67.63 ==> join( composition( X, top ), skol1 ) }.
% 67.16/67.63 (103) {G2,W13,D6,L1,V1,M1} P(90,10);d(77) { join( composition( converse(
% 67.16/67.63 composition( X, skol1 ) ), complement( composition( X, skol1 ) ) ), zero
% 67.16/67.63 ) ==> zero }.
% 67.16/67.63 (104) {G1,W19,D7,L1,V3,M1} P(4,10) { join( composition( converse( X ),
% 67.16/67.63 complement( composition( composition( X, Y ), Z ) ) ), complement(
% 67.16/67.63 composition( Y, Z ) ) ) ==> complement( composition( Y, Z ) ) }.
% 67.16/67.63 (105) {G2,W11,D6,L1,V1,M1} P(77,10) { join( composition( converse( X ),
% 67.16/67.63 complement( composition( X, top ) ) ), zero ) ==> zero }.
% 67.16/67.63 (108) {G1,W17,D7,L1,V3,M1} P(10,1) { join( join( Z, composition( converse(
% 67.16/67.63 X ), complement( composition( X, Y ) ) ) ), complement( Y ) ) ==> join( Z
% 67.16/67.63 , complement( Y ) ) }.
% 67.16/67.63 (110) {G1,W15,D7,L1,V2,M1} P(9,10);d(7) { join( composition( X, complement
% 67.16/67.63 ( converse( composition( Y, X ) ) ) ), complement( converse( Y ) ) ) ==>
% 67.16/67.63 complement( converse( Y ) ) }.
% 67.16/67.63 (111) {G1,W13,D6,L1,V2,M1} P(10,0) { join( complement( Y ), composition(
% 67.16/67.63 converse( X ), complement( composition( X, Y ) ) ) ) ==> complement( Y )
% 67.16/67.63 }.
% 67.16/67.63 (112) {G1,W13,D7,L1,V2,M1} P(7,10) { join( composition( X, complement(
% 67.16/67.63 composition( converse( X ), Y ) ) ), complement( Y ) ) ==> complement( Y
% 67.16/67.63 ) }.
% 67.16/67.63 (113) {G2,W9,D5,L1,V0,M1} P(13,10);d(77) { join( composition( converse(
% 67.16/67.63 skol1 ), complement( skol1 ) ), zero ) ==> zero }.
% 67.16/67.63 (114) {G1,W11,D5,L1,V1,M1} P(5,10) { join( composition( converse( X ),
% 67.16/67.63 complement( X ) ), complement( one ) ) ==> complement( one ) }.
% 67.16/67.63 (121) {G4,W10,D5,L1,V1,M1} P(78,92) { meet( meet( top, X ), join( zero,
% 67.16/67.63 complement( X ) ) ) ==> zero }.
% 67.16/67.63 (122) {G3,W8,D4,L1,V0,M1} P(77,78) { complement( join( zero, zero ) ) ==>
% 67.16/67.63 meet( top, top ) }.
% 67.16/67.63 (131) {G3,W10,D5,L1,V1,M1} P(78,15);d(1) { join( join( meet( top, X ), zero
% 67.16/67.63 ), complement( X ) ) ==> top }.
% 67.16/67.63 (134) {G1,W24,D6,L1,V0,M1} P(0,14) { ! join( composition( meet( skol2,
% 67.16/67.63 converse( skol1 ) ), meet( skol1, skol3 ) ), composition( meet( skol2,
% 67.16/67.63 converse( skol1 ) ), skol3 ) ) ==> composition( meet( skol2, converse(
% 67.16/67.63 skol1 ) ), meet( skol1, skol3 ) ) }.
% 67.16/67.63 (141) {G4,W9,D5,L1,V0,M1} P(122,15);d(1) { join( join( meet( top, top ),
% 67.16/67.63 zero ), zero ) ==> top }.
% 67.16/67.63 (165) {G5,W9,D4,L1,V0,M1} P(141,80);d(80) { join( meet( top, top ), top )
% 67.16/67.63 ==> join( top, top ) }.
% 67.16/67.63 (180) {G2,W6,D4,L1,V1,M1} P(5,17);d(7) { composition( converse( one ), X )
% 67.16/67.63 ==> X }.
% 67.16/67.63 (186) {G3,W4,D3,L1,V0,M1} P(180,5) { converse( one ) ==> one }.
% 67.16/67.63 (187) {G4,W5,D3,L1,V1,M1} P(186,180) { composition( one, X ) ==> X }.
% 67.16/67.63 (189) {G4,W9,D4,L1,V1,M1} P(186,19) { join( one, converse( X ) ) ==>
% 67.16/67.63 converse( join( one, X ) ) }.
% 67.16/67.63 (190) {G4,W9,D4,L1,V1,M1} P(186,8) { join( converse( X ), one ) ==>
% 67.16/67.63 converse( join( X, one ) ) }.
% 67.16/67.63 (191) {G5,W8,D4,L1,V1,M1} P(187,10);d(180) { join( complement( X ),
% 67.16/67.63 complement( X ) ) ==> complement( X ) }.
% 67.16/67.63 (192) {G5,W11,D4,L1,V2,M1} P(187,6) { join( X, composition( Y, X ) ) =
% 67.16/67.63 composition( join( one, Y ), X ) }.
% 67.16/67.63 (193) {G5,W11,D4,L1,V2,M1} P(187,6) { join( composition( Y, X ), X ) =
% 67.16/67.63 composition( join( Y, one ), X ) }.
% 67.16/67.63 (196) {G6,W5,D3,L1,V0,M1} P(77,191) { join( zero, zero ) ==> zero }.
% 67.16/67.63 (197) {G6,W7,D4,L1,V1,M1} P(191,3) { complement( complement( X ) ) = meet(
% 67.16/67.63 X, X ) }.
% 67.16/67.63 (199) {G6,W6,D4,L1,V1,M1} P(191,28);d(15) { join( complement( X ), top )
% 67.16/67.63 ==> top }.
% 67.16/67.63 (207) {G7,W6,D3,L1,V0,M1} P(196,122) { meet( top, top ) ==> complement(
% 67.16/67.63 zero ) }.
% 67.16/67.63 (208) {G7,W9,D4,L1,V1,M1} P(196,1) { join( join( X, zero ), zero ) ==> join
% 67.16/67.63 ( X, zero ) }.
% 67.16/67.63 (209) {G8,W5,D3,L1,V0,M1} P(207,165);d(199) { join( top, top ) ==> top }.
% 67.16/67.63 (214) {G9,W5,D3,L1,V1,M1} P(199,36);d(209) { join( top, X ) ==> top }.
% 67.16/67.63 (215) {G9,W5,D3,L1,V1,M1} P(199,37);d(38);d(209) { join( X, top ) ==> top
% 67.16/67.63 }.
% 67.16/67.63 (221) {G3,W11,D4,L1,V3,M1} P(21,7);d(7) { join( join( Y, X ), Z ) = join(
% 67.16/67.63 join( X, Y ), Z ) }.
% 67.16/67.63 (223) {G10,W4,D3,L1,V0,M1} P(214,59) { converse( top ) ==> top }.
% 67.16/67.63 (224) {G11,W9,D4,L1,V1,M1} P(223,17) { composition( converse( X ), top )
% 67.16/67.63 ==> converse( composition( top, X ) ) }.
% 67.16/67.63 (225) {G11,W9,D4,L1,V1,M1} P(223,16) { composition( top, converse( X ) )
% 67.16/67.63 ==> converse( composition( X, top ) ) }.
% 67.16/67.63 (231) {G7,W10,D4,L1,V1,M1} P(197,197) { meet( complement( X ), complement(
% 67.16/67.63 X ) ) ==> complement( meet( X, X ) ) }.
% 67.16/67.63 (236) {G7,W8,D4,L1,V1,M1} P(197,92) { meet( meet( X, X ), complement( X ) )
% 67.16/67.63 ==> zero }.
% 67.16/67.63 (247) {G3,W11,D4,L1,V3,M1} P(23,7);d(7) { composition( X, join( Z, Y ) ) =
% 67.16/67.63 composition( X, join( Y, Z ) ) }.
% 67.16/67.63 (267) {G12,W13,D5,L1,V2,M1} P(225,4) { composition( Y, converse(
% 67.16/67.63 composition( X, top ) ) ) ==> composition( composition( Y, top ),
% 67.16/67.63 converse( X ) ) }.
% 67.16/67.63 (308) {G3,W10,D6,L1,V2,M1} P(27,0);d(1) { join( join( Y, complement( join(
% 67.16/67.63 X, Y ) ) ), X ) ==> top }.
% 67.16/67.63 (309) {G3,W10,D6,L1,V2,M1} P(0,27) { join( join( X, complement( join( X, Y
% 67.16/67.63 ) ) ), Y ) ==> top }.
% 67.16/67.63 (310) {G3,W10,D6,L1,V2,M1} P(0,27) { join( join( complement( join( Y, X ) )
% 67.16/67.63 , X ), Y ) ==> top }.
% 67.16/67.63 (384) {G8,W10,D5,L1,V1,M1} P(231,236) { meet( complement( meet( X, X ) ),
% 67.16/67.63 complement( complement( X ) ) ) ==> zero }.
% 67.16/67.63 (385) {G8,W9,D5,L1,V1,M1} P(231,197) { complement( complement( complement(
% 67.16/67.63 X ) ) ) = complement( meet( X, X ) ) }.
% 67.16/67.63 (599) {G10,W10,D5,L1,V3,M1} S(46);d(215) { join( join( join( X, Y ), Z ),
% 67.16/67.63 complement( X ) ) ==> top }.
% 67.16/67.63 (626) {G4,W10,D5,L1,V2,M1} P(308,30) { join( join( X, Y ), complement( join
% 67.16/67.63 ( Y, X ) ) ) ==> top }.
% 67.16/67.63 (692) {G11,W10,D5,L1,V3,M1} P(48,599) { join( join( X, Z ), complement(
% 67.16/67.63 meet( X, Y ) ) ) ==> top }.
% 67.16/67.63 (715) {G10,W7,D4,L1,V1,M1} P(215,48);d(77) { join( meet( X, top ), zero )
% 67.16/67.63 ==> X }.
% 67.16/67.63 (722) {G2,W10,D5,L1,V2,M1} P(3,48) { join( meet( X, complement( Y ) ), meet
% 67.16/67.63 ( X, Y ) ) ==> X }.
% 67.16/67.63 (724) {G10,W8,D5,L1,V2,M1} P(48,37);d(215) { join( X, complement( meet( X,
% 67.16/67.63 Y ) ) ) ==> top }.
% 67.16/67.63 (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X }.
% 67.16/67.63 (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) { complement( zero ) ==>
% 67.16/67.63 top }.
% 67.16/67.63 (747) {G12,W5,D3,L1,V1,M1} P(75,715);d(740) { meet( top, X ) ==> X }.
% 67.16/67.63 (748) {G12,W9,D4,L1,V2,M1} P(715,1);d(740) { join( Y, meet( X, top ) ) ==>
% 67.16/67.63 join( Y, X ) }.
% 67.16/67.63 (749) {G13,W5,D3,L1,V1,M1} P(715,0);d(748) { join( zero, X ) ==> X }.
% 67.16/67.63 (750) {G13,W5,D3,L1,V1,M1} P(744,48);d(214);d(77);d(740) { meet( zero, X )
% 67.16/67.63 ==> zero }.
% 67.16/67.63 (751) {G13,W5,D3,L1,V1,M1} P(744,3);d(215);d(77) { meet( X, zero ) ==> zero
% 67.16/67.63 }.
% 67.16/67.63 (752) {G14,W5,D3,L1,V1,M1} P(751,48);d(749);d(79) { meet( X, top ) ==> X
% 67.16/67.63 }.
% 67.16/67.63 (755) {G12,W7,D4,L1,V0,M1} P(740,113) { composition( converse( skol1 ),
% 67.16/67.63 complement( skol1 ) ) ==> zero }.
% 67.16/67.63 (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement( complement( X ) )
% 67.16/67.63 ==> X }.
% 67.16/67.63 (758) {G14,W6,D4,L1,V1,M1} P(749,20);d(7) { join( converse( zero ), X ) ==>
% 67.16/67.63 X }.
% 67.16/67.63 (768) {G16,W5,D3,L1,V1,M1} P(385,756);d(756);d(756) { meet( X, X ) ==> X
% 67.16/67.63 }.
% 67.16/67.63 (769) {G16,W5,D3,L1,V1,M1} P(756,191) { join( X, X ) ==> X }.
% 67.16/67.63 (771) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( X, complement( Y )
% 67.16/67.63 ) ) ==> meet( complement( X ), Y ) }.
% 67.16/67.63 (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( complement( Y ), X
% 67.16/67.63 ) ) ==> meet( Y, complement( X ) ) }.
% 67.16/67.63 (773) {G16,W10,D4,L1,V2,M1} P(3,756) { join( complement( X ), complement( Y
% 67.16/67.63 ) ) ==> complement( meet( X, Y ) ) }.
% 67.16/67.63 (774) {G17,W9,D4,L1,V2,M1} P(769,30);d(1);d(769) { join( join( X, Y ), Y )
% 67.16/67.63 ==> join( X, Y ) }.
% 67.16/67.63 (775) {G17,W9,D4,L1,V2,M1} P(769,30) { join( join( X, Y ), X ) ==> join( X
% 67.16/67.63 , Y ) }.
% 67.16/67.63 (776) {G15,W4,D3,L1,V0,M1} P(758,740) { converse( zero ) ==> zero }.
% 67.16/67.63 (778) {G16,W8,D4,L1,V0,M1} P(776,225) { converse( composition( zero, top )
% 67.16/67.63 ) ==> composition( top, zero ) }.
% 67.16/67.63 (783) {G16,W7,D5,L1,V0,M1} P(755,17);d(776) { composition( converse(
% 67.16/67.63 complement( skol1 ) ), skol1 ) ==> zero }.
% 67.16/67.63 (784) {G14,W12,D5,L1,V1,M1} P(755,6);d(749) { composition( join( converse(
% 67.16/67.63 skol1 ), X ), complement( skol1 ) ) ==> composition( X, complement( skol1
% 67.16/67.63 ) ) }.
% 67.16/67.63 (785) {G13,W12,D5,L1,V1,M1} P(755,6);d(740) { composition( join( X,
% 67.16/67.63 converse( skol1 ) ), complement( skol1 ) ) ==> composition( X, complement
% 67.16/67.63 ( skol1 ) ) }.
% 67.16/67.63 (789) {G17,W5,D3,L1,V0,M1} P(783,90) { composition( zero, top ) ==> zero
% 67.16/67.63 }.
% 67.16/67.63 (795) {G18,W5,D3,L1,V0,M1} S(778);d(789);d(776) { composition( top, zero )
% 67.16/67.63 ==> zero }.
% 67.16/67.63 (796) {G19,W5,D3,L1,V1,M1} P(795,6);d(749);d(214);d(795) { composition( X,
% 67.16/67.63 zero ) ==> zero }.
% 67.16/67.63 (797) {G20,W5,D3,L1,V1,M1} P(796,17);d(776) { composition( zero, X ) ==>
% 67.16/67.63 zero }.
% 67.16/67.63 (803) {G12,W9,D6,L1,V2,M1} P(724,48);d(77);d(740) { meet( X, complement(
% 67.16/67.63 meet( complement( X ), Y ) ) ) ==> X }.
% 67.16/67.63 (804) {G17,W8,D5,L1,V2,M1} P(724,310);d(773);d(747) { join( complement(
% 67.16/67.63 meet( X, Y ) ), X ) ==> top }.
% 67.16/67.63 (811) {G11,W8,D5,L1,V2,M1} P(75,724) { join( X, complement( meet( Y, X ) )
% 67.16/67.63 ) ==> top }.
% 67.16/67.63 (814) {G18,W9,D4,L1,V2,M1} P(804,48);d(77);d(740) { meet( meet( X, Y ), X )
% 67.16/67.63 ==> meet( X, Y ) }.
% 67.16/67.63 (818) {G18,W8,D5,L1,V2,M1} P(75,804) { join( complement( meet( Y, X ) ), X
% 67.16/67.63 ) ==> top }.
% 67.16/67.63 (820) {G19,W9,D4,L1,V2,M1} P(818,48);d(77);d(740) { meet( meet( X, Y ), Y )
% 67.16/67.63 ==> meet( X, Y ) }.
% 67.16/67.63 (826) {G19,W8,D5,L1,V2,M1} P(818,3);d(77) { meet( meet( X, complement( Y )
% 67.16/67.63 ), Y ) ==> zero }.
% 67.16/67.63 (828) {G20,W8,D4,L1,V2,M1} P(756,826) { meet( meet( Y, X ), complement( X )
% 67.16/67.63 ) ==> zero }.
% 67.16/67.63 (829) {G20,W8,D5,L1,V2,M1} P(826,75) { meet( Y, meet( X, complement( Y ) )
% 67.16/67.63 ) ==> zero }.
% 67.16/67.63 (830) {G21,W8,D4,L1,V2,M1} P(828,75) { meet( complement( Y ), meet( X, Y )
% 67.16/67.63 ) ==> zero }.
% 67.16/67.63 (831) {G21,W8,D4,L1,V2,M1} P(75,828) { meet( meet( Y, X ), complement( Y )
% 67.16/67.63 ) ==> zero }.
% 67.16/67.63 (832) {G22,W10,D5,L1,V2,M1} P(830,48);d(749);d(772) { meet( complement( X )
% 67.16/67.63 , complement( meet( Y, X ) ) ) ==> complement( X ) }.
% 67.16/67.63 (835) {G21,W9,D6,L1,V2,M1} P(829,48);d(749);d(772) { meet( X, complement(
% 67.16/67.63 meet( Y, complement( X ) ) ) ) ==> X }.
% 67.16/67.63 (840) {G12,W10,D5,L1,V3,M1} P(811,29);d(214) { join( join( Z, X ),
% 67.16/67.63 complement( meet( Y, X ) ) ) ==> top }.
% 67.16/67.63 (843) {G20,W9,D4,L1,V2,M1} P(820,75) { meet( Y, meet( X, Y ) ) ==> meet( X
% 67.16/67.63 , Y ) }.
% 67.16/67.63 (847) {G18,W8,D5,L1,V2,M1} P(48,774);d(772) { join( X, meet( X, complement
% 67.16/67.63 ( Y ) ) ) ==> X }.
% 67.16/67.63 (848) {G18,W13,D5,L1,V3,M1} P(774,30) { join( join( join( X, Y ), Z ), Y )
% 67.16/67.63 ==> join( join( X, Y ), Z ) }.
% 67.16/67.63 (851) {G19,W7,D4,L1,V2,M1} P(756,847) { join( Y, meet( Y, X ) ) ==> Y }.
% 67.16/67.63 (866) {G21,W7,D4,L1,V2,M1} P(843,851) { join( X, meet( Y, X ) ) ==> X }.
% 67.16/67.63 (870) {G20,W11,D4,L1,V3,M1} P(851,30) { join( join( X, Z ), meet( X, Y ) )
% 67.16/67.63 ==> join( X, Z ) }.
% 67.16/67.63 (879) {G20,W9,D6,L1,V2,M1} P(851,19);d(7) { join( X, converse( meet(
% 67.16/67.63 converse( X ), Y ) ) ) ==> X }.
% 67.16/67.63 (881) {G20,W7,D4,L1,V2,M1} P(851,0) { join( meet( X, Y ), X ) ==> X }.
% 67.16/67.63 (887) {G22,W11,D4,L1,V3,M1} P(866,30) { join( join( X, Z ), meet( Y, X ) )
% 67.16/67.63 ==> join( X, Z ) }.
% 67.16/67.63 (889) {G22,W11,D5,L1,V3,M1} P(866,29) { join( join( meet( Y, X ), Z ), X )
% 67.16/67.63 ==> join( X, Z ) }.
% 67.16/67.63 (898) {G22,W7,D4,L1,V2,M1} P(866,0) { join( meet( Y, X ), X ) ==> X }.
% 67.16/67.63 (902) {G23,W11,D5,L1,V3,M1} P(898,29) { join( join( Z, meet( X, Y ) ), Y )
% 67.16/67.63 ==> join( Y, Z ) }.
% 67.16/67.63 (904) {G23,W9,D6,L1,V2,M1} P(898,20);d(7) { join( converse( meet( X,
% 67.16/67.63 converse( Y ) ) ), Y ) ==> Y }.
% 67.16/67.63 (908) {G21,W11,D5,L1,V3,M1} P(881,29) { join( join( Z, meet( X, Y ) ), X )
% 67.16/67.63 ==> join( X, Z ) }.
% 67.16/67.63 (910) {G21,W9,D6,L1,V2,M1} P(881,20);d(7) { join( converse( meet( converse
% 67.16/67.63 ( X ), Y ) ), X ) ==> X }.
% 67.16/67.63 (928) {G24,W14,D5,L1,V3,M1} P(904,22);d(55) { join( meet( X, converse( Y )
% 67.16/67.63 ), converse( join( Z, Y ) ) ) ==> converse( join( Y, Z ) ) }.
% 67.16/67.63 (943) {G22,W9,D6,L1,V2,M1} P(835,843) { meet( complement( meet( Y,
% 67.16/67.63 complement( X ) ) ), X ) ==> X }.
% 67.16/67.63 (944) {G23,W9,D6,L1,V2,M1} P(814,943) { meet( complement( meet( complement
% 67.16/67.63 ( X ), Y ) ), X ) ==> X }.
% 67.16/67.63 (945) {G23,W10,D5,L1,V2,M1} P(756,943) { meet( complement( meet( Y, X ) ),
% 67.16/67.63 complement( X ) ) ==> complement( X ) }.
% 67.16/67.63 (949) {G24,W10,D5,L1,V2,M1} P(756,944) { meet( complement( meet( X, Y ) ),
% 67.16/67.63 complement( X ) ) ==> complement( X ) }.
% 67.16/67.63 (950) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet( complement( X )
% 67.16/67.63 , Y ) ) ==> join( X, complement( Y ) ) }.
% 67.16/67.63 (951) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet( Y, complement( X
% 67.16/67.63 ) ) ) ==> join( complement( Y ), X ) }.
% 67.16/67.63 (964) {G17,W14,D5,L1,V3,M1} P(773,30) { join( join( complement( X ), Z ),
% 67.16/67.63 complement( Y ) ) ==> join( complement( meet( X, Y ) ), Z ) }.
% 67.16/67.63 (966) {G17,W14,D5,L1,V3,M1} P(773,29) { join( join( Z, complement( X ) ),
% 67.16/67.63 complement( Y ) ) ==> join( complement( meet( X, Y ) ), Z ) }.
% 67.16/67.63 (972) {G17,W9,D4,L1,V2,M1} P(773,0);d(773) { complement( meet( X, Y ) ) =
% 67.16/67.63 complement( meet( Y, X ) ) }.
% 67.16/67.63 (987) {G18,W14,D6,L1,V4,M1} P(972,599) { join( join( join( meet( X, Y ), Z
% 67.16/67.63 ), T ), complement( meet( Y, X ) ) ) ==> top }.
% 67.16/67.63 (988) {G18,W10,D5,L1,V2,M1} P(972,131);d(740);d(747) { join( meet( X, Y ),
% 67.16/67.63 complement( meet( Y, X ) ) ) ==> top }.
% 67.16/67.63 (990) {G18,W10,D5,L1,V2,M1} P(972,121);d(747);d(749) { meet( meet( X, Y ),
% 67.16/67.63 complement( meet( Y, X ) ) ) ==> zero }.
% 67.16/67.63 (991) {G18,W10,D5,L1,V2,M1} P(972,384);d(768);d(756) { meet( complement(
% 67.16/67.63 meet( X, Y ) ), meet( Y, X ) ) ==> zero }.
% 67.16/67.63 (996) {G18,W11,D4,L1,V3,M1} P(972,3);d(3) { meet( meet( Y, X ), Z ) = meet
% 67.16/67.63 ( meet( X, Y ), Z ) }.
% 67.16/67.63 (1001) {G22,W10,D6,L1,V3,M1} P(866,840) { join( X, complement( meet( Z,
% 67.16/67.63 meet( Y, X ) ) ) ) ==> top }.
% 67.16/67.63 (1012) {G18,W8,D5,L1,V2,M1} S(803);d(950) { meet( X, join( X, complement( Y
% 67.16/67.63 ) ) ) ==> X }.
% 67.16/67.63 (1016) {G17,W10,D5,L1,V2,M1} S(48);d(772) { join( meet( X, Y ), meet( X,
% 67.16/67.63 complement( Y ) ) ) ==> X }.
% 67.16/67.63 (1017) {G11,W8,D6,L1,V1,M1} S(59);d(223) { join( X, converse( complement(
% 67.16/67.63 converse( X ) ) ) ) ==> top }.
% 67.16/67.63 (1021) {G10,W8,D4,L1,V2,M1} S(31);d(215) { join( join( Y, X ), complement(
% 67.16/67.63 X ) ) ==> top }.
% 67.16/67.63 (1025) {G19,W7,D4,L1,V2,M1} P(756,1012) { meet( Y, join( Y, X ) ) ==> Y }.
% 67.16/67.63 (1030) {G24,W13,D6,L1,V2,M1} P(904,1025) { meet( converse( meet( X,
% 67.16/67.63 converse( Y ) ) ), Y ) ==> converse( meet( X, converse( Y ) ) ) }.
% 67.16/67.63 (1031) {G22,W13,D6,L1,V2,M1} P(910,1025) { meet( converse( meet( converse(
% 67.16/67.63 X ), Y ) ), X ) ==> converse( meet( converse( X ), Y ) ) }.
% 67.16/67.63 (1032) {G21,W7,D4,L1,V2,M1} P(1025,843) { meet( join( X, Y ), X ) ==> X }.
% 67.16/67.63 (1033) {G22,W8,D5,L1,V2,M1} P(1025,830) { meet( complement( join( X, Y ) )
% 67.16/67.63 , X ) ==> zero }.
% 67.16/67.63 (1034) {G21,W8,D5,L1,V2,M1} P(1025,828) { meet( X, complement( join( X, Y )
% 67.16/67.63 ) ) ==> zero }.
% 67.16/67.63 (1041) {G20,W9,D5,L1,V3,M1} P(1,1025) { meet( X, join( join( X, Y ), Z ) )
% 67.16/67.63 ==> X }.
% 67.16/67.63 (1043) {G20,W7,D4,L1,V2,M1} P(0,1025) { meet( X, join( Y, X ) ) ==> X }.
% 67.16/67.63 (1052) {G22,W9,D5,L1,V3,M1} P(1,1032) { meet( join( join( X, Y ), Z ), X )
% 67.16/67.63 ==> X }.
% 67.16/67.63 (1054) {G22,W7,D4,L1,V2,M1} P(0,1032) { meet( join( Y, X ), X ) ==> X }.
% 67.16/67.63 (1055) {G23,W8,D5,L1,V2,M1} P(1054,831) { meet( Y, complement( join( X, Y )
% 67.16/67.63 ) ) ==> zero }.
% 67.16/67.63 (1057) {G23,W9,D5,L1,V3,M1} P(30,1054) { meet( join( join( X, Z ), Y ), Z )
% 67.16/67.63 ==> Z }.
% 67.16/67.63 (1061) {G23,W13,D5,L1,V3,M1} P(6,1054) { meet( composition( join( X, Z ), Y
% 67.16/67.63 ), composition( Z, Y ) ) ==> composition( Z, Y ) }.
% 67.16/67.63 (1076) {G24,W12,D6,L1,V3,M1} P(6,1055) { meet( composition( Z, Y ),
% 67.16/67.63 complement( composition( join( X, Z ), Y ) ) ) ==> zero }.
% 67.16/67.63 (1096) {G23,W10,D6,L1,V2,M1} P(8,1033) { meet( complement( converse( join(
% 67.16/67.63 X, Y ) ) ), converse( X ) ) ==> zero }.
% 67.16/67.63 (1104) {G22,W10,D6,L1,V2,M1} P(8,1034) { meet( converse( X ), complement(
% 67.16/67.63 converse( join( X, Y ) ) ) ) ==> zero }.
% 67.16/67.63 (1256) {G23,W9,D5,L1,V1,M1} P(898,97);d(13) { join( composition( meet( X,
% 67.16/67.63 skol1 ), top ), skol1 ) ==> skol1 }.
% 67.16/67.63 (1268) {G2,W10,D5,L1,V0,M1} P(15,97) { join( composition( complement( skol1
% 67.16/67.63 ), top ), skol1 ) ==> composition( top, top ) }.
% 67.16/67.63 (1369) {G18,W14,D5,L1,V3,M1} P(1016,30) { join( join( meet( X, Y ), Z ),
% 67.16/67.63 meet( X, complement( Y ) ) ) ==> join( X, Z ) }.
% 67.16/67.63 (1371) {G18,W14,D5,L1,V3,M1} P(1016,29) { join( join( Z, meet( X, Y ) ),
% 67.16/67.63 meet( X, complement( Y ) ) ) ==> join( X, Z ) }.
% 67.16/67.63 (1372) {G18,W10,D5,L1,V2,M1} P(75,1016) { join( meet( Y, X ), meet( X,
% 67.16/67.63 complement( Y ) ) ) ==> X }.
% 67.16/67.63 (1373) {G18,W10,D5,L1,V2,M1} P(75,1016) { join( meet( X, Y ), meet(
% 67.16/67.63 complement( Y ), X ) ) ==> X }.
% 67.16/67.63 (1387) {G19,W10,D5,L1,V2,M1} P(75,1372) { join( meet( Y, X ), meet(
% 67.16/67.63 complement( Y ), X ) ) ==> X }.
% 67.16/67.63 (1389) {G19,W10,D5,L1,V2,M1} P(1372,0) { join( meet( Y, complement( X ) ),
% 67.16/67.63 meet( X, Y ) ) ==> Y }.
% 67.16/67.63 (1414) {G12,W11,D5,L1,V1,M1} S(103);d(740) { composition( converse(
% 67.16/67.63 composition( X, skol1 ) ), complement( composition( X, skol1 ) ) ) ==>
% 67.16/67.63 zero }.
% 67.16/67.63 (1430) {G20,W14,D6,L1,V3,M1} P(972,1387) { join( meet( meet( X, Y ), Z ),
% 67.16/67.63 meet( complement( meet( Y, X ) ), Z ) ) ==> Z }.
% 67.16/67.63 (1445) {G19,W14,D5,L1,V3,M1} P(1373,29) { join( join( Z, meet( X, Y ) ),
% 67.16/67.63 meet( complement( Y ), X ) ) ==> join( X, Z ) }.
% 67.16/67.63 (1446) {G22,W15,D7,L1,V3,M1} P(104,1034);d(756) { meet( composition(
% 67.16/67.63 converse( X ), complement( composition( composition( X, Y ), Z ) ) ),
% 67.16/67.63 composition( Y, Z ) ) ==> zero }.
% 67.16/67.63 (1452) {G18,W15,D6,L1,V3,M1} P(950,950) { join( meet( complement( X ), Y )
% 67.16/67.63 , complement( Z ) ) ==> complement( meet( join( X, complement( Y ) ), Z )
% 67.16/67.63 ) }.
% 67.16/67.63 (1470) {G18,W14,D6,L1,V3,M1} P(950,773);d(966) { complement( meet( meet(
% 67.16/67.63 complement( X ), Y ), Z ) ) ==> join( complement( meet( Y, Z ) ), X ) }.
% 67.16/67.63 (1486) {G12,W9,D5,L1,V1,M1} S(105);d(740) { composition( converse( X ),
% 67.16/67.63 complement( composition( X, top ) ) ) ==> zero }.
% 67.16/67.63 (1489) {G13,W9,D6,L1,V1,M1} P(224,1486);d(7) { composition( X, complement(
% 67.16/67.63 converse( composition( top, X ) ) ) ) ==> zero }.
% 67.16/67.63 (1490) {G13,W8,D5,L1,V0,M1} P(223,1486) { composition( top, complement(
% 67.16/67.63 composition( top, top ) ) ) ==> zero }.
% 67.16/67.63 (1492) {G16,W9,D6,L1,V1,M1} P(1486,17);d(776) { composition( converse(
% 67.16/67.63 complement( composition( X, top ) ) ), X ) ==> zero }.
% 67.16/67.63 (1495) {G20,W11,D5,L1,V2,M1} P(1486,4);d(796) { composition( composition( Y
% 67.16/67.63 , converse( X ) ), complement( composition( X, top ) ) ) ==> zero }.
% 67.16/67.63 (1496) {G13,W14,D7,L1,V2,M1} P(19,1486) { composition( join( X, converse( Y
% 67.16/67.63 ) ), complement( composition( join( converse( X ), Y ), top ) ) ) ==>
% 67.16/67.63 zero }.
% 67.16/67.63 (1498) {G14,W8,D5,L1,V1,M1} P(1490,6);d(740);d(215);d(1490) { composition(
% 67.16/67.63 X, complement( composition( top, top ) ) ) ==> zero }.
% 67.16/67.63 (1499) {G15,W6,D4,L1,V0,M1} P(1498,187) { complement( composition( top, top
% 67.16/67.63 ) ) ==> zero }.
% 67.16/67.63 (1507) {G16,W5,D3,L1,V0,M1} P(1499,756);d(744) { composition( top, top )
% 67.16/67.63 ==> top }.
% 67.16/67.63 (1508) {G17,W9,D4,L1,V1,M1} P(1507,4) { composition( composition( X, top )
% 67.16/67.63 , top ) ==> composition( X, top ) }.
% 67.16/67.63 (1564) {G18,W11,D5,L1,V2,M1} P(951,12) { meet( meet( X, complement( Y ) ),
% 67.16/67.63 join( complement( X ), Y ) ) ==> zero }.
% 67.16/67.63 (1582) {G22,W12,D7,L1,V2,M1} P(110,1034);d(756) { meet( composition( X,
% 67.16/67.63 complement( converse( composition( Y, X ) ) ) ), converse( Y ) ) ==> zero
% 67.16/67.63 }.
% 67.16/67.63 (1583) {G23,W12,D7,L1,V2,M1} P(110,1033);d(756) { meet( converse( Y ),
% 67.16/67.63 composition( X, complement( converse( composition( Y, X ) ) ) ) ) ==>
% 67.16/67.63 zero }.
% 67.16/67.63 (1589) {G18,W15,D6,L1,V3,M1} P(951,771);d(1) { meet( complement( Z ), meet
% 67.16/67.63 ( X, complement( Y ) ) ) ==> complement( join( join( Z, complement( X ) )
% 67.16/67.63 , Y ) ) }.
% 67.16/67.63 (1598) {G17,W10,D4,L1,V2,M1} P(756,771) { meet( complement( Y ), complement
% 67.16/67.63 ( X ) ) ==> complement( join( Y, X ) ) }.
% 67.16/67.63 (1602) {G17,W10,D5,L1,V2,M1} P(626,771);d(77) { meet( complement( join( X,
% 67.16/67.63 Y ) ), join( Y, X ) ) ==> zero }.
% 67.16/67.63 (1607) {G17,W14,D6,L1,V3,M1} P(30,771) { complement( join( join( X,
% 67.16/67.63 complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 67.16/67.63 (1609) {G17,W14,D6,L1,V3,M1} P(29,771) { complement( join( join( complement
% 67.16/67.63 ( Z ), X ), Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 67.16/67.63 (1612) {G18,W14,D5,L1,V3,M1} P(771,1598);d(1607) { meet( meet( complement(
% 67.16/67.63 X ), Y ), complement( Z ) ) ==> meet( complement( join( X, Z ) ), Y ) }.
% 67.16/67.63 (1613) {G18,W15,D6,L1,V3,M1} P(951,1598) { meet( join( complement( X ), Y )
% 67.16/67.63 , complement( Z ) ) ==> complement( join( meet( X, complement( Y ) ), Z )
% 67.16/67.63 ) }.
% 67.16/67.63 (1614) {G18,W15,D6,L1,V3,M1} P(951,1598) { meet( complement( Z ), join(
% 67.16/67.63 complement( X ), Y ) ) ==> complement( join( Z, meet( X, complement( Y )
% 67.16/67.63 ) ) ) }.
% 67.16/67.63 (1615) {G18,W15,D6,L1,V3,M1} P(950,1598) { meet( join( X, complement( Y ) )
% 67.16/67.63 , complement( Z ) ) ==> complement( join( meet( complement( X ), Y ), Z )
% 67.16/67.63 ) }.
% 67.16/67.63 (1625) {G18,W9,D4,L1,V2,M1} P(1598,75);d(1598) { complement( join( X, Y ) )
% 67.16/67.63 = complement( join( Y, X ) ) }.
% 67.16/67.63 (1641) {G19,W10,D5,L1,V3,M1} P(692,1625);d(77);d(772) { meet( meet( X, Z )
% 67.16/67.63 , complement( join( X, Y ) ) ) ==> zero }.
% 67.16/67.63 (1655) {G19,W10,D5,L1,V2,M1} P(626,1625);d(77);d(772) { meet( join( Y, X )
% 67.16/67.63 , complement( join( X, Y ) ) ) ==> zero }.
% 67.16/67.63 (1664) {G20,W10,D5,L1,V3,M1} P(771,1641) { meet( meet( X, Z ), meet(
% 67.16/67.63 complement( X ), Y ) ) ==> zero }.
% 67.16/67.63 (1667) {G20,W10,D5,L1,V3,M1} P(1387,1641) { meet( meet( meet( X, Y ), Z ),
% 67.16/67.63 complement( Y ) ) ==> zero }.
% 67.16/67.63 (1688) {G17,W10,D5,L1,V0,M1} P(783,111);d(7);d(744) { join( complement(
% 67.16/67.63 skol1 ), composition( complement( skol1 ), top ) ) ==> complement( skol1
% 67.16/67.63 ) }.
% 67.16/67.63 (1698) {G21,W10,D5,L1,V3,M1} P(1664,991);d(744);d(747) { meet( meet(
% 67.16/67.63 complement( X ), Z ), meet( X, Y ) ) ==> zero }.
% 67.16/67.63 (1708) {G21,W10,D5,L1,V3,M1} P(843,1664) { meet( meet( Y, X ), meet(
% 67.16/67.63 complement( X ), Z ) ) ==> zero }.
% 67.16/67.63 (1711) {G24,W10,D5,L1,V3,M1} P(945,1698) { meet( complement( Y ), meet(
% 67.16/67.63 meet( X, Y ), Z ) ) ==> zero }.
% 67.16/67.63 (1712) {G25,W10,D5,L1,V3,M1} P(949,1698) { meet( complement( X ), meet(
% 67.16/67.63 meet( X, Y ), Z ) ) ==> zero }.
% 67.16/67.63 (1741) {G25,W10,D5,L1,V3,M1} P(843,1711) { meet( complement( Y ), meet( Z,
% 67.16/67.63 meet( X, Y ) ) ) ==> zero }.
% 67.16/67.63 (1748) {G26,W10,D5,L1,V3,M1} P(1741,990);d(744);d(752) { meet( meet( Y,
% 67.16/67.63 meet( Z, X ) ), complement( X ) ) ==> zero }.
% 67.16/67.63 (1774) {G27,W10,D6,L1,V3,M1} P(1598,1748);d(756) { meet( meet( Z,
% 67.16/67.63 complement( join( X, Y ) ) ), Y ) ==> zero }.
% 67.16/67.63 (1776) {G27,W10,D5,L1,V3,M1} P(832,1748);d(756) { meet( meet( Z, complement
% 67.16/67.63 ( X ) ), meet( Y, X ) ) ==> zero }.
% 67.16/67.63 (1792) {G28,W10,D5,L1,V3,M1} P(1776,991);d(744);d(747) { meet( meet( Z, Y )
% 67.16/67.63 , meet( X, complement( Y ) ) ) ==> zero }.
% 67.16/67.63 (1812) {G29,W10,D6,L1,V3,M1} P(1043,1792) { meet( X, meet( Z, complement(
% 67.16/67.63 join( Y, X ) ) ) ) ==> zero }.
% 67.16/67.63 (1834) {G23,W9,D5,L1,V1,M1} P(114,1033);d(756) { meet( one, composition(
% 67.16/67.63 converse( X ), complement( X ) ) ) ==> zero }.
% 67.16/67.63 (1860) {G24,W9,D6,L1,V1,M1} P(756,1834) { meet( one, composition( converse
% 67.16/67.63 ( complement( X ) ), X ) ) ==> zero }.
% 67.16/67.63 (1865) {G24,W9,D6,L1,V1,M1} P(7,1834) { meet( one, composition( X,
% 67.16/67.63 complement( converse( X ) ) ) ) ==> zero }.
% 67.16/67.63 (1876) {G25,W7,D5,L1,V0,M1} P(5,1860) { meet( one, converse( complement(
% 67.16/67.63 one ) ) ) ==> zero }.
% 67.16/67.63 (1879) {G26,W8,D6,L1,V0,M1} P(1876,1373);d(749) { meet( complement(
% 67.16/67.63 converse( complement( one ) ) ), one ) ==> one }.
% 67.16/67.63 (1890) {G27,W6,D5,L1,V0,M1} P(1879,1373);d(1598);d(189);d(11);d(223);d(77);
% 67.16/67.63 d(740) { complement( converse( complement( one ) ) ) ==> one }.
% 67.16/67.63 (1925) {G28,W6,D4,L1,V0,M1} P(1890,756) { converse( complement( one ) ) ==>
% 67.16/67.63 complement( one ) }.
% 67.16/67.63 (1940) {G29,W15,D6,L1,V2,M1} P(1925,26) { join( X, converse( join(
% 67.16/67.63 complement( one ), Y ) ) ) ==> join( join( X, complement( one ) ),
% 67.16/67.63 converse( Y ) ) }.
% 67.16/67.63 (1941) {G29,W15,D6,L1,V2,M1} P(1925,26) { join( X, converse( join( Y,
% 67.16/67.63 complement( one ) ) ) ) ==> join( join( X, converse( Y ) ), complement(
% 67.16/67.63 one ) ) }.
% 67.16/67.63 (1948) {G25,W10,D7,L1,V1,M1} P(1865,1373);d(749) { meet( complement(
% 67.16/67.63 composition( X, complement( converse( X ) ) ) ), one ) ==> one }.
% 67.16/67.63 (1975) {G26,W13,D5,L1,V3,M1} P(1712,1387);d(749);d(756) { meet( X, meet(
% 67.16/67.63 meet( X, Y ), Z ) ) ==> meet( meet( X, Y ), Z ) }.
% 67.16/67.63 (2009) {G21,W14,D6,L1,V4,M1} P(1625,1667) { meet( meet( meet( Z, join( X, Y
% 67.16/67.63 ) ), T ), complement( join( Y, X ) ) ) ==> zero }.
% 67.16/67.63 (2071) {G20,W11,D4,L1,V2,M1} P(1655,1373);d(749);d(756) { meet( join( Y, X
% 67.16/67.63 ), join( X, Y ) ) ==> join( X, Y ) }.
% 67.16/67.63 (2080) {G18,W10,D6,L1,V2,M1} P(773,1602);d(1598);d(1607);d(772) { meet(
% 67.16/67.63 meet( Y, complement( meet( X, Y ) ) ), X ) ==> zero }.
% 67.16/67.63 (2097) {G18,W14,D5,L1,V3,M1} P(772,1598);d(1609) { meet( meet( X,
% 67.16/67.63 complement( Y ) ), complement( Z ) ) ==> meet( complement( join( Y, Z ) )
% 67.16/67.63 , X ) }.
% 67.16/67.63 (2140) {G18,W9,D6,L1,V0,M1} P(1688,772);d(756) { meet( skol1, complement(
% 67.16/67.63 composition( complement( skol1 ), top ) ) ) ==> skol1 }.
% 67.16/67.63 (2163) {G20,W7,D5,L1,V0,M1} P(2140,1389);d(1598);d(1268);d(1507);d(77);d(
% 67.16/67.63 749) { complement( composition( complement( skol1 ), top ) ) ==> skol1
% 67.16/67.63 }.
% 67.16/67.63 (2206) {G21,W7,D4,L1,V0,M1} P(2163,756) { composition( complement( skol1 )
% 67.16/67.63 , top ) ==> complement( skol1 ) }.
% 67.16/67.63 (2229) {G30,W13,D5,L1,V3,M1} P(1812,1387);d(749);d(1589);d(1607);d(1);d(775
% 67.16/67.63 ) { meet( complement( join( X, Z ) ), Y ) = meet( Y, complement( join( Z
% 67.16/67.63 , X ) ) ) }.
% 67.16/67.63 (2405) {G21,W11,D5,L1,V2,M1} P(2080,722);d(740);d(2097);d(881) { meet( X,
% 67.16/67.63 complement( meet( Y, X ) ) ) ==> meet( complement( Y ), X ) }.
% 67.16/67.63 (2408) {G20,W10,D5,L1,V2,M1} P(2080,1389);d(740);d(951) { meet( Y, join(
% 67.16/67.63 complement( X ), meet( Y, X ) ) ) ==> Y }.
% 67.16/67.63 (2429) {G23,W11,D4,L1,V2,M1} P(2408,898);d(1);d(870) { join( complement( Y
% 67.16/67.63 ), meet( X, Y ) ) ==> join( X, complement( Y ) ) }.
% 67.16/67.63 (2431) {G21,W10,D5,L1,V2,M1} P(75,2408) { meet( X, join( complement( Y ),
% 67.16/67.63 meet( Y, X ) ) ) ==> X }.
% 67.16/67.63 (2432) {G21,W10,D5,L1,V2,M1} P(0,2408) { meet( Y, join( meet( Y, X ),
% 67.16/67.63 complement( X ) ) ) ==> Y }.
% 67.16/67.63 (2464) {G23,W11,D4,L1,V2,M1} P(2431,898);d(1);d(887) { join( complement( Y
% 67.16/67.63 ), meet( Y, X ) ) ==> join( X, complement( Y ) ) }.
% 67.16/67.63 (2510) {G22,W10,D6,L1,V2,M1} P(2432,950);d(756);d(771);d(950) { join( X,
% 67.16/67.63 meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 67.16/67.63 (2518) {G23,W11,D4,L1,V2,M1} P(2432,898);d(1);d(851) { join( meet( X, Y ),
% 67.16/67.63 complement( Y ) ) ==> join( X, complement( Y ) ) }.
% 67.16/67.63 (2522) {G23,W9,D5,L1,V3,M1} P(1001,2510);d(747) { join( X, meet( Y, meet( Z
% 67.16/67.63 , X ) ) ) ==> X }.
% 67.16/67.63 (2544) {G23,W11,D4,L1,V2,M1} P(988,2510);d(747) { join( meet( X, Y ), meet
% 67.16/67.63 ( Y, X ) ) ==> meet( X, Y ) }.
% 67.16/67.63 (2554) {G23,W10,D5,L1,V2,M1} P(756,2510) { join( Y, meet( join( Y, X ),
% 67.16/67.63 complement( X ) ) ) ==> Y }.
% 67.16/67.63 (2556) {G24,W10,D5,L1,V2,M1} P(309,2510);d(771);d(747);d(902) { join( X,
% 67.16/67.63 meet( complement( X ), Y ) ) ==> join( Y, X ) }.
% 67.16/67.63 (2557) {G23,W10,D5,L1,V2,M1} P(308,2510);d(772);d(747);d(908) { join( X,
% 67.16/67.63 meet( Y, complement( X ) ) ) ==> join( Y, X ) }.
% 67.16/67.63 (2564) {G23,W10,D5,L1,V2,M1} P(27,2510);d(771);d(747);d(889) { join( meet(
% 67.16/67.63 complement( X ), Y ), X ) ==> join( Y, X ) }.
% 67.16/67.63 (2724) {G24,W9,D7,L1,V1,M1} P(1017,2554);d(747) { join( X, complement(
% 67.16/67.63 converse( complement( converse( X ) ) ) ) ) ==> X }.
% 67.16/67.63 (2730) {G24,W11,D5,L1,V2,M1} P(308,2554);d(747);d(966);d(1032) { join( X,
% 67.16/67.63 complement( join( Y, X ) ) ) ==> join( complement( Y ), X ) }.
% 67.16/67.63 (2741) {G24,W10,D5,L1,V2,M1} P(75,2554) { join( X, meet( complement( Y ),
% 67.16/67.63 join( X, Y ) ) ) ==> X }.
% 67.16/67.63 (2746) {G24,W10,D5,L1,V2,M1} P(2554,0) { join( meet( join( X, Y ),
% 67.16/67.63 complement( Y ) ), X ) ==> X }.
% 67.16/67.63 (2749) {G25,W9,D7,L1,V1,M1} P(2724,772);d(756);d(756) { meet( X, converse(
% 67.16/67.63 complement( converse( complement( X ) ) ) ) ) ==> X }.
% 67.16/67.63 (2771) {G25,W10,D6,L1,V1,M1} P(7,2724) { join( converse( X ), complement(
% 67.16/67.63 converse( complement( X ) ) ) ) ==> converse( X ) }.
% 67.16/67.63 (2796) {G26,W7,D5,L1,V1,M1} P(2749,904);d(2771) { complement( converse(
% 67.16/67.63 complement( X ) ) ) ==> converse( X ) }.
% 67.16/67.63 (2816) {G27,W12,D6,L1,V2,M1} P(772,2796) { complement( converse( meet( X,
% 67.16/67.63 complement( Y ) ) ) ) ==> converse( join( complement( X ), Y ) ) }.
% 67.16/67.63 (2845) {G27,W12,D6,L1,V2,M1} P(951,2796) { complement( converse( join(
% 67.16/67.63 complement( X ), Y ) ) ) ==> converse( meet( X, complement( Y ) ) ) }.
% 67.16/67.63 (2847) {G27,W12,D6,L1,V2,M1} P(950,2796) { complement( converse( join( X,
% 67.16/67.63 complement( Y ) ) ) ) ==> converse( meet( complement( X ), Y ) ) }.
% 67.16/67.63 (2855) {G27,W9,D4,L1,V2,M1} P(972,2796);d(2796) { converse( meet( Y, X ) )
% 67.16/67.63 = converse( meet( X, Y ) ) }.
% 67.16/67.63 (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement( X ) ) ==>
% 67.16/67.63 complement( converse( X ) ) }.
% 67.16/67.63 (2873) {G28,W9,D6,L1,V1,M1} P(2866,1492) { composition( complement(
% 67.16/67.63 converse( composition( X, top ) ) ), X ) ==> zero }.
% 67.16/67.63 (2884) {G28,W7,D5,L1,V0,M1} P(2866,783) { composition( complement( converse
% 67.16/67.63 ( skol1 ) ), skol1 ) ==> zero }.
% 67.16/67.63 (2885) {G28,W11,D5,L1,V1,M1} P(2866,190) { join( complement( converse( X )
% 67.16/67.63 ), one ) ==> converse( join( complement( X ), one ) ) }.
% 67.16/67.63 (2889) {G28,W12,D6,L1,V2,M1} P(2866,20) { converse( join( Y, complement(
% 67.16/67.63 converse( X ) ) ) ) ==> join( converse( Y ), complement( X ) ) }.
% 67.16/67.63 (2891) {G28,W12,D6,L1,V2,M1} P(2866,16) { converse( composition( Y,
% 67.16/67.63 complement( converse( X ) ) ) ) ==> composition( complement( X ),
% 67.16/67.63 converse( Y ) ) }.
% 67.16/67.63 (2893) {G28,W12,D6,L1,V2,M1} P(2866,19) { converse( join( complement(
% 67.16/67.63 converse( X ) ), Y ) ) ==> join( complement( X ), converse( Y ) ) }.
% 67.16/67.63 (2894) {G28,W12,D5,L1,V2,M1} P(2866,8) { join( complement( converse( X ) )
% 67.16/67.63 , converse( Y ) ) ==> converse( join( complement( X ), Y ) ) }.
% 67.16/67.63 (2895) {G28,W12,D5,L1,V2,M1} P(2866,8) { join( converse( Y ), complement(
% 67.16/67.63 converse( X ) ) ) ==> converse( join( Y, complement( X ) ) ) }.
% 67.16/67.63 (2900) {G29,W11,D6,L1,V1,M1} P(2884,6);d(749) { composition( join(
% 67.16/67.63 complement( converse( skol1 ) ), X ), skol1 ) ==> composition( X, skol1 )
% 67.16/67.63 }.
% 67.16/67.63 (2901) {G29,W11,D6,L1,V1,M1} P(2884,6);d(740) { composition( join( X,
% 67.16/67.63 complement( converse( skol1 ) ) ), skol1 ) ==> composition( X, skol1 )
% 67.16/67.63 }.
% 67.16/67.63 (2918) {G28,W13,D5,L1,V3,M1} P(2855,8);d(8) { converse( join( meet( Y, X )
% 67.16/67.63 , Z ) ) = converse( join( meet( X, Y ), Z ) ) }.
% 67.16/67.63 (2971) {G29,W13,D7,L1,V2,M1} P(2873,6);d(749) { composition( join(
% 67.16/67.63 complement( converse( composition( X, top ) ) ), Y ), X ) ==> composition
% 67.16/67.63 ( Y, X ) }.
% 67.16/67.63 (2972) {G29,W13,D7,L1,V2,M1} P(2873,6);d(740) { composition( join( Y,
% 67.16/67.63 complement( converse( composition( X, top ) ) ) ), X ) ==> composition( Y
% 67.16/67.63 , X ) }.
% 67.16/67.63 (3021) {G25,W10,D5,L1,V2,M1} P(2741,0) { join( meet( complement( Y ), join
% 67.16/67.63 ( X, Y ) ), X ) ==> X }.
% 67.16/67.63 (3043) {G26,W10,D5,L1,V2,M1} P(0,3021) { join( meet( complement( Y ), join
% 67.16/67.63 ( Y, X ) ), X ) ==> X }.
% 67.16/67.63 (3061) {G27,W10,D6,L1,V2,M1} P(756,3043) { join( meet( X, join( complement
% 67.16/67.63 ( X ), Y ) ), Y ) ==> Y }.
% 67.16/67.63 (3070) {G27,W10,D5,L1,V2,M1} P(75,3043) { join( meet( join( X, Y ),
% 67.16/67.63 complement( X ) ), Y ) ==> Y }.
% 67.16/67.63 (3086) {G28,W14,D6,L1,V2,M1} P(1389,3070);d(951) { join( meet( X, join(
% 67.16/67.63 complement( X ), Y ) ), meet( Y, X ) ) ==> meet( Y, X ) }.
% 67.16/67.63 (3166) {G25,W11,D5,L1,V2,M1} P(2556,772);d(771);d(950);d(773) { meet( X,
% 67.16/67.63 complement( meet( X, Y ) ) ) ==> meet( complement( Y ), X ) }.
% 67.16/67.63 (3177) {G24,W11,D5,L1,V2,M1} P(2564,771);d(771);d(950);d(773) { meet(
% 67.16/67.63 complement( meet( X, Y ) ), X ) ==> meet( complement( Y ), X ) }.
% 67.16/67.63 (3386) {G29,W11,D6,L1,V2,M1} P(110,1104);d(2891);d(2866);d(756);d(7) { meet
% 67.16/67.63 ( composition( complement( composition( Y, X ) ), converse( X ) ), Y )
% 67.16/67.63 ==> zero }.
% 67.16/67.63 (3511) {G10,W9,D4,L1,V1,M1} P(215,192) { join( X, composition( top, X ) )
% 67.16/67.63 ==> composition( top, X ) }.
% 67.16/67.63 (3624) {G21,W9,D5,L1,V2,M1} P(881,193);d(187) { join( composition( meet(
% 67.16/67.63 one, X ), Y ), Y ) ==> Y }.
% 67.16/67.63 (3625) {G23,W9,D5,L1,V2,M1} P(898,193);d(187) { join( composition( meet( X
% 67.16/67.63 , one ), Y ), Y ) ==> Y }.
% 67.16/67.63 (3640) {G10,W9,D4,L1,V1,M1} P(214,193) { join( composition( top, X ), X )
% 67.16/67.63 ==> composition( top, X ) }.
% 67.16/67.63 (3644) {G6,W10,D5,L1,V1,M1} P(15,193) { join( composition( complement( one
% 67.16/67.63 ), X ), X ) ==> composition( top, X ) }.
% 67.16/67.63 (3654) {G28,W10,D6,L1,V2,M1} P(3640,1774) { meet( meet( Y, complement(
% 67.16/67.63 composition( top, X ) ) ), X ) ==> zero }.
% 67.16/67.63 (3669) {G21,W7,D4,L1,V1,M1} P(3640,1043) { meet( X, composition( top, X ) )
% 67.16/67.63 ==> X }.
% 67.16/67.63 (3671) {G11,W8,D4,L1,V1,M1} P(3640,1021) { join( composition( top, X ),
% 67.16/67.63 complement( X ) ) ==> top }.
% 67.16/67.63 (3675) {G25,W8,D4,L1,V1,M1} P(3640,626);d(2730) { join( complement( X ),
% 67.16/67.63 composition( top, X ) ) ==> top }.
% 67.16/67.63 (3681) {G11,W9,D4,L1,V1,M1} P(3640,20);d(16);d(223) { join( composition( X
% 67.16/67.63 , top ), X ) ==> composition( X, top ) }.
% 67.16/67.63 (3684) {G24,W11,D4,L1,V2,M1} P(3669,2522) { join( composition( top, X ),
% 67.16/67.63 meet( Y, X ) ) ==> composition( top, X ) }.
% 67.16/67.63 (3706) {G18,W12,D5,L1,V2,M1} P(972,3671) { join( composition( top, meet( X
% 67.16/67.63 , Y ) ), complement( meet( Y, X ) ) ) ==> top }.
% 67.16/67.63 (3715) {G26,W8,D5,L1,V1,M1} P(756,3675) { join( X, composition( top,
% 67.16/67.63 complement( X ) ) ) ==> top }.
% 67.16/67.63 (3731) {G29,W8,D5,L1,V1,M1} P(3715,19);d(223);d(2891);d(223) { join( X,
% 67.16/67.63 composition( complement( X ), top ) ) ==> top }.
% 67.16/67.63 (3733) {G30,W9,D4,L1,V1,M1} P(3731,3061);d(752);d(756) { join( X,
% 67.16/67.63 composition( X, top ) ) ==> composition( X, top ) }.
% 67.16/67.63 (3734) {G30,W9,D6,L1,V1,M1} P(3731,2746);d(747) { join( complement(
% 67.16/67.63 composition( complement( X ), top ) ), X ) ==> X }.
% 67.16/67.63 (3735) {G30,W9,D6,L1,V1,M1} P(3731,2741);d(752) { join( X, complement(
% 67.16/67.63 composition( complement( X ), top ) ) ) ==> X }.
% 67.16/67.63 (3748) {G30,W8,D4,L1,V1,M1} P(756,3731) { join( complement( X ),
% 67.16/67.63 composition( X, top ) ) ==> top }.
% 67.16/67.63 (3759) {G31,W8,D5,L1,V1,M1} P(3748,1602);d(752);d(771) { meet( complement(
% 67.16/67.63 composition( X, top ) ), X ) ==> zero }.
% 67.16/67.63 (3765) {G31,W10,D5,L1,V2,M1} P(3748,93);d(214) { join( complement( X ),
% 67.16/67.63 composition( join( X, Y ), top ) ) ==> top }.
% 67.16/67.63 (3782) {G32,W13,D6,L1,V1,M1} P(3759,722);d(749) { meet( complement(
% 67.16/67.63 composition( complement( X ), top ) ), X ) ==> complement( composition(
% 67.16/67.63 complement( X ), top ) ) }.
% 67.16/67.63 (3851) {G31,W9,D5,L1,V2,M1} P(3733,1052) { meet( composition( join( X, Y )
% 67.16/67.63 , top ), X ) ==> X }.
% 67.16/67.63 (3853) {G31,W9,D5,L1,V2,M1} P(3733,1057) { meet( composition( join( X, Y )
% 67.16/67.63 , top ), Y ) ==> Y }.
% 67.16/67.63 (3874) {G21,W9,D5,L1,V2,M1} P(3511,1041) { meet( X, composition( top, join
% 67.16/67.63 ( X, Y ) ) ) ==> X }.
% 67.16/67.63 (3882) {G11,W13,D4,L1,V2,M1} P(3511,29) { join( join( Y, X ), composition(
% 67.16/67.63 top, X ) ) ==> join( composition( top, X ), Y ) }.
% 67.16/67.63 (3917) {G22,W11,D4,L1,V2,M1} P(1373,3874) { meet( meet( X, Y ), composition
% 67.16/67.63 ( top, X ) ) ==> meet( X, Y ) }.
% 67.16/67.63 (3919) {G22,W11,D4,L1,V2,M1} P(1387,3874) { meet( meet( X, Y ), composition
% 67.16/67.63 ( top, Y ) ) ==> meet( X, Y ) }.
% 67.16/67.63 (4322) {G22,W13,D5,L1,V2,M1} P(3624,1032) { meet( Y, composition( meet( one
% 67.16/67.63 , X ), Y ) ) ==> composition( meet( one, X ), Y ) }.
% 67.16/67.63 (4323) {G22,W13,D5,L1,V2,M1} P(3624,1025) { meet( composition( meet( one, X
% 67.16/67.63 ), Y ), Y ) ==> composition( meet( one, X ), Y ) }.
% 67.16/67.63 (4327) {G22,W13,D6,L1,V3,M1} P(3624,30) { join( join( composition( meet(
% 67.16/67.63 one, X ), Y ), Z ), Y ) ==> join( Y, Z ) }.
% 67.16/67.63 (4353) {G24,W13,D5,L1,V2,M1} P(3625,1032) { meet( Y, composition( meet( X,
% 67.16/67.63 one ), Y ) ) ==> composition( meet( X, one ), Y ) }.
% 67.16/67.63 (4354) {G24,W13,D5,L1,V2,M1} P(3625,1025) { meet( composition( meet( X, one
% 67.16/67.63 ), Y ), Y ) ==> composition( meet( X, one ), Y ) }.
% 67.16/67.63 (4555) {G31,W13,D6,L1,V2,M1} P(3734,29) { join( join( X, Y ), complement(
% 67.16/67.63 composition( complement( X ), top ) ) ) ==> join( X, Y ) }.
% 67.16/67.63 (4558) {G31,W15,D7,L1,V2,M1} P(3735,221) { join( join( Y, X ), complement(
% 67.16/67.63 composition( complement( join( X, Y ) ), top ) ) ) ==> join( X, Y ) }.
% 67.16/67.63 (4962) {G32,W10,D6,L1,V2,M1} P(773,3765);d(756) { join( X, composition(
% 67.16/67.63 complement( meet( X, Y ) ), top ) ) ==> top }.
% 67.16/67.63 (5440) {G28,W10,D5,L1,V1,M1} P(3644,20);d(16);d(223);d(16);d(2866);d(186)
% 67.16/67.63 { join( composition( X, complement( one ) ), X ) ==> composition( X, top
% 67.16/67.63 ) }.
% 67.16/67.63 (5567) {G33,W11,D7,L1,V2,M1} P(4962,2741);d(752) { join( X, complement(
% 67.16/67.63 composition( complement( meet( X, Y ) ), top ) ) ) ==> X }.
% 67.16/67.63 (6438) {G29,W11,D7,L1,V2,M1} P(3654,2557);d(740) { join( meet( X,
% 67.16/67.63 complement( composition( top, complement( Y ) ) ) ), Y ) ==> Y }.
% 67.16/67.63 (6939) {G29,W11,D6,L1,V2,M1} P(110,1096);d(2866);d(756);d(7);d(2891) { meet
% 67.16/67.63 ( Y, composition( complement( composition( Y, X ) ), converse( X ) ) )
% 67.16/67.63 ==> zero }.
% 67.16/67.63 (7472) {G26,W11,D7,L1,V2,M1} P(1948,1708) { meet( meet( Y, composition( X,
% 67.16/67.63 complement( converse( X ) ) ) ), one ) ==> zero }.
% 67.16/67.63 (7708) {G19,W11,D4,L1,V3,M1} P(996,75) { meet( meet( Y, X ), Z ) = meet( Z
% 67.16/67.63 , meet( X, Y ) ) }.
% 67.16/67.63 (7979) {G24,W11,D6,L1,V2,M1} P(1256,870) { join( skol1, meet( composition(
% 67.16/67.63 meet( X, skol1 ), top ), Y ) ) ==> skol1 }.
% 67.16/67.63 (8755) {G24,W11,D4,L1,V3,M1} P(2544,247);d(2544) { composition( Z, meet( X
% 67.16/67.63 , Y ) ) = composition( Z, meet( Y, X ) ) }.
% 67.16/67.63 (8758) {G24,W11,D4,L1,V3,M1} P(2544,95);d(2544) { composition( meet( X, Y )
% 67.16/67.63 , Z ) = composition( meet( Y, X ), Z ) }.
% 67.16/67.63 (8800) {G21,W11,D4,L1,V3,M1} P(2071,7708);d(2071) { meet( join( Y, X ), Z )
% 67.16/67.63 = meet( Z, join( X, Y ) ) }.
% 67.16/67.63 (8801) {G21,W11,D4,L1,V3,M1} P(2071,996);d(2071) { meet( join( Y, X ), Z )
% 67.16/67.63 = meet( join( X, Y ), Z ) }.
% 67.16/67.63 (10113) {G25,W10,D5,L1,V2,M1} P(951,3177);d(756) { meet( join( complement(
% 67.16/67.63 X ), Y ), X ) ==> meet( Y, X ) }.
% 67.16/67.63 (10123) {G26,W10,D5,L1,V2,M1} P(10113,8801) { meet( join( Y, complement( X
% 67.16/67.63 ) ), X ) ==> meet( Y, X ) }.
% 67.16/67.63 (10124) {G26,W10,D5,L1,V2,M1} P(10113,8800) { meet( X, join( Y, complement
% 67.16/67.63 ( X ) ) ) ==> meet( Y, X ) }.
% 67.16/67.63 (10127) {G29,W10,D5,L1,V2,M1} P(10113,2544);d(3086) { meet( X, join(
% 67.16/67.63 complement( X ), Y ) ) ==> meet( Y, X ) }.
% 67.16/67.63 (10143) {G27,W11,D4,L1,V2,M1} P(756,10123) { meet( join( Y, X ), complement
% 67.16/67.63 ( X ) ) ==> meet( Y, complement( X ) ) }.
% 67.16/67.63 (10148) {G27,W11,D4,L1,V2,M1} P(756,10124) { meet( complement( X ), join( Y
% 67.16/67.63 , X ) ) ==> meet( Y, complement( X ) ) }.
% 67.16/67.63 (10493) {G21,W11,D5,L1,V2,M1} P(9,1495) { composition( converse(
% 67.16/67.63 composition( Y, X ) ), complement( composition( Y, top ) ) ) ==> zero }.
% 67.16/67.63 (10497) {G22,W11,D5,L1,V2,M1} P(10493,112);d(744);d(756);d(6) { composition
% 67.16/67.63 ( join( composition( X, Y ), X ), top ) ==> composition( X, top ) }.
% 67.16/67.63 (10498) {G22,W11,D5,L1,V2,M1} P(10493,111);d(756);d(7);d(744);d(6) {
% 67.16/67.63 composition( join( X, composition( X, Y ) ), top ) ==> composition( X,
% 67.16/67.63 top ) }.
% 67.16/67.63 (11288) {G32,W11,D4,L1,V2,M1} P(10497,3851) { meet( composition( X, top ),
% 67.16/67.63 composition( X, Y ) ) ==> composition( X, Y ) }.
% 67.16/67.63 (12255) {G29,W11,D5,L1,V1,M1} P(2885,772);d(2845) { meet( converse( X ),
% 67.16/67.63 complement( one ) ) ==> converse( meet( X, complement( one ) ) ) }.
% 67.16/67.63 (12278) {G30,W11,D5,L1,V1,M1} P(12255,2464);d(2894);d(2464);d(773);d(2866);
% 67.16/67.63 d(773) { complement( meet( one, converse( X ) ) ) ==> complement(
% 67.16/67.63 converse( meet( one, X ) ) ) }.
% 67.16/67.63 (12372) {G31,W9,D4,L1,V1,M1} P(12278,756);d(756) { meet( one, converse( X )
% 67.16/67.63 ) ==> converse( meet( one, X ) ) }.
% 67.16/67.63 (12392) {G32,W11,D5,L1,V1,M1} P(2866,12372) { meet( one, complement(
% 67.16/67.63 converse( X ) ) ) ==> converse( meet( one, complement( X ) ) ) }.
% 67.16/67.63 (12418) {G32,W9,D4,L1,V1,M1} P(12372,75) { meet( converse( X ), one ) ==>
% 67.16/67.63 converse( meet( one, X ) ) }.
% 67.16/67.63 (12419) {G32,W14,D6,L1,V2,M1} P(19,12372) { converse( meet( one, join(
% 67.16/67.63 converse( X ), Y ) ) ) ==> meet( one, join( X, converse( Y ) ) ) }.
% 67.16/67.63 (12420) {G33,W11,D5,L1,V1,M1} P(2866,12418) { meet( complement( converse( X
% 67.16/67.63 ) ), one ) ==> converse( meet( one, complement( X ) ) ) }.
% 67.16/67.63 (12548) {G16,W11,D5,L1,V1,M1} P(1414,110);d(776);d(744);d(7);d(3681) {
% 67.16/67.63 composition( complement( composition( X, skol1 ) ), top ) ==> complement
% 67.16/67.63 ( composition( X, skol1 ) ) }.
% 67.16/67.63 (15308) {G33,W9,D5,L1,V2,M1} P(11288,7979) { join( skol1, composition( meet
% 67.16/67.63 ( X, skol1 ), Y ) ) ==> skol1 }.
% 67.16/67.63 (15362) {G34,W9,D5,L1,V2,M1} P(15308,2071);d(1043) { join( composition(
% 67.16/67.63 meet( X, skol1 ), Y ), skol1 ) ==> skol1 }.
% 67.16/67.63 (15381) {G34,W13,D5,L1,V2,M1} P(15308,3853);d(13) { meet( skol1,
% 67.16/67.63 composition( meet( X, skol1 ), Y ) ) ==> composition( meet( X, skol1 ), Y
% 67.16/67.63 ) }.
% 67.16/67.63 (15949) {G30,W10,D6,L1,V1,M1} P(223,6939) { meet( X, composition(
% 67.16/67.63 complement( composition( X, top ) ), top ) ) ==> zero }.
% 67.16/67.63 (15953) {G31,W11,D7,L1,V1,M1} P(15949,3166);d(744);d(752) { meet(
% 67.16/67.63 complement( composition( complement( composition( X, top ) ), top ) ), X
% 67.16/67.63 ) ==> X }.
% 67.16/67.63 (18134) {G30,W10,D5,L1,V1,M1} P(2429,2900);d(2901) { composition( meet( X,
% 67.16/67.63 converse( skol1 ) ), skol1 ) ==> composition( X, skol1 ) }.
% 67.16/67.63 (18135) {G30,W10,D5,L1,V1,M1} P(2464,2900);d(2901) { composition( meet(
% 67.16/67.63 converse( skol1 ), X ), skol1 ) ==> composition( X, skol1 ) }.
% 67.16/67.63 (20566) {G21,W9,D5,L1,V1,M1} P(879,784);d(755);d(7) { composition( converse
% 67.16/67.63 ( meet( skol1, X ) ), complement( skol1 ) ) ==> zero }.
% 67.16/67.63 (20581) {G28,W9,D5,L1,V1,M1} P(20566,17);d(776);d(2866) { composition(
% 67.16/67.63 complement( converse( skol1 ) ), meet( skol1, X ) ) ==> zero }.
% 67.16/67.63 (20589) {G29,W15,D6,L1,V2,M1} P(20581,6);d(749) { composition( join(
% 67.16/67.63 complement( converse( skol1 ) ), Y ), meet( skol1, X ) ) ==> composition
% 67.16/67.63 ( Y, meet( skol1, X ) ) }.
% 67.16/67.63 (23978) {G28,W15,D6,L1,V3,M1} P(964,10148);d(1614);d(772);d(951);d(1613);d(
% 67.16/67.63 771);d(951) { meet( Z, join( complement( meet( X, Z ) ), Y ) ) ==> meet(
% 67.16/67.63 join( complement( X ), Y ), Z ) }.
% 67.16/67.63 (24022) {G19,W13,D5,L1,V3,M1} P(964,1625);d(772);d(772);d(772) { meet( Z,
% 67.16/67.63 meet( X, complement( Y ) ) ) ==> meet( meet( X, Z ), complement( Y ) )
% 67.16/67.63 }.
% 67.16/67.63 (25375) {G35,W11,D7,L1,V2,M1} P(1031,15362) { join( composition( converse(
% 67.16/67.63 meet( converse( skol1 ), X ) ), Y ), skol1 ) ==> skol1 }.
% 67.16/67.63 (25725) {G24,W11,D7,L1,V2,M1} P(1489,1061);d(750) { composition( Y,
% 67.16/67.63 complement( converse( composition( top, join( X, Y ) ) ) ) ) ==> zero }.
% 67.16/67.63 (25990) {G25,W12,D5,L1,V3,M1} P(1389,1076) { meet( composition( meet( Y, X
% 67.16/67.63 ), Z ), complement( composition( X, Z ) ) ) ==> zero }.
% 67.16/67.63 (27140) {G25,W11,D6,L1,V2,M1} P(3684,25725);d(4);d(1507) { composition(
% 67.16/67.63 meet( Y, X ), complement( converse( composition( top, X ) ) ) ) ==> zero
% 67.16/67.63 }.
% 67.16/67.63 (27278) {G26,W11,D5,L1,V2,M1} P(225,27140);d(7) { composition( meet( Y,
% 67.16/67.63 converse( X ) ), complement( composition( X, top ) ) ) ==> zero }.
% 67.16/67.63 (27298) {G27,W11,D5,L1,V2,M1} P(1030,27278);d(7) { composition( converse(
% 67.16/67.63 meet( X, Y ) ), complement( composition( Y, top ) ) ) ==> zero }.
% 67.16/67.63 (27502) {G28,W11,D6,L1,V2,M1} P(27298,17);d(776);d(2866) { composition(
% 67.16/67.63 complement( converse( composition( Y, top ) ) ), meet( X, Y ) ) ==> zero
% 67.16/67.63 }.
% 67.16/67.63 (28458) {G36,W11,D7,L1,V2,M1} P(9,25375) { join( converse( composition( Y,
% 67.16/67.63 meet( converse( skol1 ), X ) ) ), skol1 ) ==> skol1 }.
% 67.16/67.63 (28462) {G37,W12,D6,L1,V2,M1} P(28458,928);d(898);d(20) { join( converse(
% 67.16/67.63 skol1 ), composition( X, meet( converse( skol1 ), Y ) ) ) ==> converse(
% 67.16/67.63 skol1 ) }.
% 67.16/67.63 (34400) {G30,W12,D6,L1,V2,M1} P(6438,1369);d(756) { join( Y, meet( X,
% 67.16/67.63 composition( top, complement( Y ) ) ) ) ==> join( X, Y ) }.
% 67.16/67.63 (35053) {G29,W14,D6,L1,V3,M1} P(27502,1446);d(2866);d(7);d(797);d(744) {
% 67.16/67.63 meet( composition( complement( composition( X, top ) ), top ),
% 67.16/67.63 composition( meet( Y, X ), Z ) ) ==> zero }.
% 67.16/67.63 (36194) {G33,W11,D6,L1,V1,M1} P(1508,15953);d(3782) { complement(
% 67.16/67.63 composition( complement( composition( X, top ) ), top ) ) ==> composition
% 67.16/67.63 ( X, top ) }.
% 67.16/67.63 (36197) {G34,W11,D5,L1,V1,M1} P(36194,36194);d(1508) { composition(
% 67.16/67.63 complement( composition( X, top ) ), top ) ==> complement( composition( X
% 67.16/67.63 , top ) ) }.
% 67.16/67.63 (40136) {G35,W12,D5,L1,V3,M1} S(35053);d(36197) { meet( complement(
% 67.16/67.63 composition( X, top ) ), composition( meet( Y, X ), Z ) ) ==> zero }.
% 67.16/67.63 (40507) {G24,W15,D6,L1,V3,M1} P(2518,1607);d(1607) { meet( complement( join
% 67.16/67.63 ( meet( X, Y ), Z ) ), Y ) ==> meet( complement( join( X, Z ) ), Y ) }.
% 67.16/67.63 (51593) {G30,W15,D6,L1,V2,M1} P(1940,772);d(1607);d(772);d(2845) { meet( X
% 67.16/67.63 , converse( meet( one, complement( Y ) ) ) ) ==> meet( meet( X,
% 67.16/67.63 complement( converse( Y ) ) ), one ) }.
% 67.16/67.63 (51733) {G30,W15,D6,L1,V2,M1} P(1941,10143);d(1615);d(1941);d(771);d(40507)
% 67.16/67.63 ;d(772);d(10143);d(2847) { meet( X, converse( meet( complement( Y ), one
% 67.16/67.63 ) ) ) ==> meet( meet( X, complement( converse( Y ) ) ), one ) }.
% 67.16/67.63 (52972) {G29,W12,D5,L1,V2,M1} P(2866,2894);d(773);d(773);d(2866) {
% 67.16/67.63 complement( meet( converse( Y ), converse( X ) ) ) ==> complement(
% 67.16/67.63 converse( meet( Y, X ) ) ) }.
% 67.16/67.63 (53018) {G30,W10,D4,L1,V2,M1} P(52972,756);d(756) { meet( converse( X ),
% 67.16/67.63 converse( Y ) ) ==> converse( meet( X, Y ) ) }.
% 67.16/67.63 (53023) {G31,W11,D5,L1,V1,M1} P(53018,18135) { composition( converse( meet
% 67.16/67.63 ( skol1, X ) ), skol1 ) ==> composition( converse( X ), skol1 ) }.
% 67.16/67.63 (53024) {G31,W11,D5,L1,V1,M1} P(53018,18134) { composition( converse( meet
% 67.16/67.63 ( X, skol1 ) ), skol1 ) ==> composition( converse( X ), skol1 ) }.
% 67.16/67.63 (53040) {G31,W10,D5,L1,V2,M1} P(7,53018) { converse( meet( converse( X ), Y
% 67.16/67.63 ) ) ==> meet( X, converse( Y ) ) }.
% 67.16/67.63 (53041) {G31,W10,D5,L1,V2,M1} P(7,53018) { converse( meet( Y, converse( X )
% 67.16/67.63 ) ) ==> meet( converse( Y ), X ) }.
% 67.16/67.63 (53236) {G32,W11,D4,L1,V1,M1} P(53023,17);d(17) { composition( converse(
% 67.16/67.63 skol1 ), meet( skol1, X ) ) ==> composition( converse( skol1 ), X ) }.
% 67.16/67.63 (53285) {G33,W11,D4,L1,V1,M1} P(53236,8755) { composition( converse( skol1
% 67.16/67.63 ), meet( X, skol1 ) ) ==> composition( converse( skol1 ), X ) }.
% 67.16/67.63 (53310) {G35,W11,D6,L1,V1,M1} P(53285,1583);d(7);d(15381);d(17) {
% 67.16/67.63 composition( meet( X, skol1 ), complement( composition( converse( X ),
% 67.16/67.63 skol1 ) ) ) ==> zero }.
% 67.16/67.63 (53537) {G36,W11,D6,L1,V1,M1} P(53310,3386);d(744);d(225);d(12548);d(2866);
% 67.16/67.63 d(17) { meet( complement( composition( converse( skol1 ), X ) ), meet( X
% 67.16/67.63 , skol1 ) ) ==> zero }.
% 67.16/67.63 (53545) {G36,W11,D5,L1,V1,M1} P(7,53310) { composition( meet( converse( X )
% 67.16/67.63 , skol1 ), complement( composition( X, skol1 ) ) ) ==> zero }.
% 67.16/67.63 (53555) {G37,W11,D5,L1,V1,M1} P(53545,1582);d(776);d(744);d(12548);d(53040)
% 67.16/67.63 { meet( complement( composition( X, skol1 ) ), meet( X, converse( skol1
% 67.16/67.63 ) ) ) ==> zero }.
% 67.16/67.63 (54145) {G37,W11,D5,L1,V1,M1} P(53537,3706);d(796);d(749);d(951) { join(
% 67.16/67.63 complement( meet( X, skol1 ) ), composition( converse( skol1 ), X ) ) ==>
% 67.16/67.63 top }.
% 67.16/67.63 (54202) {G38,W10,D5,L1,V1,M1} P(54145,108);d(214);d(773);d(1470) { join(
% 67.16/67.63 complement( meet( skol1, X ) ), composition( skol1, X ) ) ==> top }.
% 67.16/67.63 (54272) {G39,W10,D5,L1,V1,M1} P(54202,1564);d(752) { meet( meet( skol1, X )
% 67.16/67.63 , complement( composition( skol1, X ) ) ) ==> zero }.
% 67.16/67.63 (54528) {G40,W11,D4,L1,V1,M1} P(54272,722);d(740);d(756) { meet( meet(
% 67.16/67.63 skol1, X ), composition( skol1, X ) ) ==> meet( skol1, X ) }.
% 67.16/67.63 (54628) {G41,W9,D6,L1,V0,M1} P(54528,7472) { meet( meet( skol1, complement
% 67.16/67.63 ( converse( skol1 ) ) ), one ) ==> zero }.
% 67.16/67.63 (54785) {G42,W9,D5,L1,V0,M1} P(54628,1430);d(749);d(950) { meet( join(
% 67.16/67.63 converse( skol1 ), complement( skol1 ) ), one ) ==> one }.
% 67.16/67.63 (54921) {G43,W9,D6,L1,V0,M1} P(54785,2855);d(186);d(12419);d(2866) { meet(
% 67.16/67.63 one, join( skol1, complement( converse( skol1 ) ) ) ) ==> one }.
% 67.16/67.63 (54922) {G44,W11,D5,L1,V1,M1} P(54921,2009);d(772);d(24022) { meet( meet(
% 67.16/67.63 converse( skol1 ), meet( one, X ) ), complement( skol1 ) ) ==> zero }.
% 67.16/67.63 (57189) {G45,W10,D5,L1,V1,M1} P(54922,2429);d(740);d(756) { join( meet(
% 67.16/67.63 converse( skol1 ), meet( one, X ) ), skol1 ) ==> skol1 }.
% 67.16/67.63 (57311) {G46,W10,D5,L1,V1,M1} P(7708,57189) { join( meet( meet( X, one ),
% 67.16/67.63 converse( skol1 ) ), skol1 ) ==> skol1 }.
% 67.16/67.63 (57565) {G47,W10,D6,L1,V1,M1} P(12418,57311);d(53018) { join( converse(
% 67.16/67.63 meet( meet( one, X ), skol1 ) ), skol1 ) ==> skol1 }.
% 67.16/67.63 (57760) {G48,W10,D5,L1,V1,M1} P(57565,1496);d(13);d(785) { composition(
% 67.16/67.63 meet( meet( one, X ), skol1 ), complement( skol1 ) ) ==> zero }.
% 67.16/67.63 (57835) {G49,W10,D5,L1,V1,M1} P(10127,57760) { composition( meet( meet( X,
% 67.16/67.63 one ), skol1 ), complement( skol1 ) ) ==> zero }.
% 67.16/67.63 (58070) {G50,W11,D5,L1,V1,M1} P(57835,3386);d(744);d(225);d(2206);d(2866)
% 67.16/67.63 { meet( complement( converse( skol1 ) ), meet( meet( X, one ), skol1 ) )
% 67.16/67.63 ==> zero }.
% 67.16/67.63 (60943) {G51,W9,D6,L1,V0,M1} P(58070,1975);d(12420) { meet( converse( meet
% 67.16/67.63 ( one, complement( skol1 ) ) ), skol1 ) ==> zero }.
% 67.16/67.63 (60952) {G52,W8,D5,L1,V0,M1} P(60943,53024);d(776);d(797);d(7) {
% 67.16/67.63 composition( meet( one, complement( skol1 ) ), skol1 ) ==> zero }.
% 67.16/67.63 (60959) {G52,W13,D6,L1,V0,M1} P(60943,3166);d(744);d(752);d(51593);d(1598)
% 67.16/67.63 { meet( complement( join( skol1, converse( skol1 ) ) ), one ) ==>
% 67.16/67.63 converse( meet( one, complement( skol1 ) ) ) }.
% 67.16/67.63 (60961) {G52,W9,D6,L1,V0,M1} P(2855,60943) { meet( converse( meet(
% 67.16/67.63 complement( skol1 ), one ) ), skol1 ) ==> zero }.
% 67.16/67.63 (60989) {G53,W8,D5,L1,V0,M1} P(60952,8758) { composition( meet( complement
% 67.16/67.63 ( skol1 ), one ), skol1 ) ==> zero }.
% 67.16/67.63 (61000) {G54,W9,D5,L1,V0,M1} P(60989,53555);d(744);d(747) { meet( meet(
% 67.16/67.63 complement( skol1 ), one ), converse( skol1 ) ) ==> zero }.
% 67.16/67.63 (61024) {G55,W14,D6,L1,V1,M1} P(61000,1371);d(740);d(1612);d(60959) { join
% 67.16/67.63 ( X, converse( meet( one, complement( skol1 ) ) ) ) ==> join( meet(
% 67.16/67.63 complement( skol1 ), one ), X ) }.
% 67.16/67.63 (61075) {G56,W14,D6,L1,V1,M1} P(60961,1445);d(740);d(51733);d(1598);d(60959
% 67.16/67.63 );d(61024) { join( converse( meet( complement( skol1 ), one ) ), X ) ==>
% 67.16/67.63 join( meet( complement( skol1 ), one ), X ) }.
% 67.16/67.63 (61077) {G57,W10,D5,L1,V0,M1} P(60961,5567);d(61075);d(1452);d(744);d(1507)
% 67.16/67.63 ;d(752);d(771) { converse( meet( complement( skol1 ), one ) ) ==> meet(
% 67.16/67.63 complement( skol1 ), one ) }.
% 67.16/67.63 (61258) {G58,W8,D4,L1,V0,M1} P(61077,12392);d(2405);d(756) { converse( meet
% 67.16/67.63 ( skol1, one ) ) ==> meet( skol1, one ) }.
% 67.16/67.63 (61279) {G59,W7,D4,L1,V0,M1} P(61258,53023);d(186);d(187) { composition(
% 67.16/67.63 meet( skol1, one ), skol1 ) ==> skol1 }.
% 67.16/67.63 (61463) {G60,W7,D4,L1,V0,M1} P(61279,8758) { composition( meet( one, skol1
% 67.16/67.63 ), skol1 ) ==> skol1 }.
% 67.16/67.63 (61527) {G61,W7,D4,L1,V0,M1} P(61463,10498);d(97);d(15362) { composition(
% 67.16/67.63 meet( one, skol1 ), top ) ==> skol1 }.
% 67.16/67.63 (63585) {G31,W11,D4,L1,V3,M1} P(773,2229);d(756);d(772);d(24022);d(756) {
% 67.16/67.63 meet( meet( X, Y ), Z ) = meet( meet( Y, Z ), X ) }.
% 67.16/67.63 (64457) {G32,W14,D6,L1,V3,M1} P(63585,10127);d(23978) { meet( meet( join(
% 67.16/67.63 complement( X ), Z ), Y ), X ) ==> meet( Z, meet( X, Y ) ) }.
% 67.16/67.63 (64458) {G33,W11,D4,L1,V3,M1} P(10127,63585);d(64457) { meet( Y, meet( X, Z
% 67.16/67.63 ) ) ==> meet( meet( Y, X ), Z ) }.
% 67.16/67.63 (64489) {G32,W11,D5,L1,V2,M1} P(63585,3919) { meet( meet( composition( top
% 67.16/67.63 , Y ), X ), Y ) ==> meet( X, Y ) }.
% 67.16/67.63 (64491) {G32,W11,D5,L1,V2,M1} P(63585,3917) { meet( meet( Y, composition(
% 67.16/67.63 top, X ) ), X ) ==> meet( X, Y ) }.
% 67.16/67.63 (65546) {G33,W12,D6,L1,V2,M1} P(10124,64489);d(64491) { meet( join( Y,
% 67.16/67.63 complement( composition( top, X ) ) ), X ) ==> meet( X, Y ) }.
% 67.16/67.63 (82543) {G30,W12,D6,L1,V2,M1} P(2429,2971);d(2972) { composition( meet( Y,
% 67.16/67.63 converse( composition( X, top ) ) ), X ) ==> composition( Y, X ) }.
% 67.16/67.63 (82544) {G30,W12,D6,L1,V2,M1} P(2464,2971);d(2972) { composition( meet(
% 67.16/67.63 converse( composition( X, top ) ), Y ), X ) ==> composition( Y, X ) }.
% 67.16/67.63 (89538) {G62,W14,D5,L1,V1,M1} P(61527,82544) { composition( meet( converse
% 67.16/67.63 ( skol1 ), X ), meet( one, skol1 ) ) ==> composition( X, meet( one, skol1
% 67.16/67.63 ) ) }.
% 67.16/67.63 (115358) {G36,W10,D5,L1,V1,M1} P(4322,40136) { composition( meet( one, X )
% 67.16/67.63 , complement( composition( X, top ) ) ) ==> zero }.
% 67.16/67.63 (115728) {G29,W13,D5,L1,V1,M1} P(5440,4327);d(2464) { join( composition(
% 67.16/67.63 meet( one, X ), top ), complement( one ) ) ==> join( X, complement( one )
% 67.16/67.63 ) }.
% 67.16/67.63 (115815) {G37,W10,D5,L1,V1,M1} P(115358,8758) { composition( meet( X, one )
% 67.16/67.63 , complement( composition( X, top ) ) ) ==> zero }.
% 67.16/67.63 (115879) {G38,W11,D5,L1,V1,M1} P(115815,1583);d(776);d(744);d(36197) { meet
% 67.16/67.63 ( converse( meet( X, one ) ), complement( composition( X, top ) ) ) ==>
% 67.16/67.63 zero }.
% 67.16/67.63 (115917) {G39,W11,D5,L1,V1,M1} P(115879,2816);d(776);d(744);d(2893) { join
% 67.16/67.63 ( complement( meet( X, one ) ), converse( composition( X, top ) ) ) ==>
% 67.16/67.63 top }.
% 67.16/67.63 (115979) {G40,W11,D5,L1,V1,M1} P(65546,115917);d(5);d(77);d(740) { join(
% 67.16/67.63 complement( meet( one, X ) ), converse( composition( X, top ) ) ) ==> top
% 67.16/67.63 }.
% 67.16/67.63 (116132) {G41,W11,D5,L1,V1,M1} P(115979,3882);d(214);d(267);d(1507);d(225)
% 67.16/67.63 { join( converse( composition( X, top ) ), complement( meet( one, X ) )
% 67.16/67.63 ) ==> top }.
% 67.16/67.63 (116207) {G42,W11,D6,L1,V1,M1} P(12372,116132);d(2895);d(224);d(19);d(2866)
% 67.16/67.63 { join( composition( top, X ), complement( converse( meet( one, X ) ) )
% 67.16/67.63 ) ==> top }.
% 67.16/67.63 (116360) {G43,W11,D5,L1,V1,M1} P(116207,2889);d(223) { join( converse(
% 67.16/67.63 composition( top, X ) ), complement( meet( one, X ) ) ) ==> top }.
% 67.16/67.63 (116459) {G44,W11,D5,L1,V1,M1} P(972,116360) { join( converse( composition
% 67.16/67.63 ( top, X ) ), complement( meet( X, one ) ) ) ==> top }.
% 67.16/67.63 (116495) {G45,W12,D6,L1,V1,M1} P(2891,116459);d(223);d(950);d(1) { join(
% 67.16/67.63 join( composition( complement( X ), top ), converse( X ) ), complement(
% 67.16/67.63 one ) ) ==> top }.
% 67.16/67.63 (130123) {G46,W9,D5,L1,V1,M1} P(1940,116495);d(848);d(772);d(115728);d(773)
% 67.16/67.63 { join( complement( meet( X, one ) ), converse( X ) ) ==> top }.
% 67.16/67.63 (130236) {G47,W9,D4,L1,V1,M1} P(130123,2730);d(77);d(740);d(756) { join(
% 67.16/67.63 meet( X, one ), converse( X ) ) ==> converse( X ) }.
% 67.16/67.63 (130266) {G48,W13,D5,L1,V1,M1} P(4354,130236);d(5) { join( meet( X, one ),
% 67.16/67.63 converse( meet( X, one ) ) ) ==> converse( meet( X, one ) ) }.
% 67.16/67.63 (130268) {G48,W13,D5,L1,V1,M1} P(4323,130236);d(5) { join( meet( one, X ),
% 67.16/67.63 converse( meet( one, X ) ) ) ==> converse( meet( one, X ) ) }.
% 67.16/67.63 (130334) {G48,W8,D5,L1,V1,M1} P(130236,2918);d(7);d(20) { join( converse(
% 67.16/67.63 meet( one, X ) ), X ) ==> X }.
% 67.16/67.63 (130452) {G48,W11,D5,L1,V2,M1} P(130236,987) { join( join( converse( X ), Y
% 67.16/67.63 ), complement( meet( one, X ) ) ) ==> top }.
% 67.16/67.63 (130516) {G49,W8,D5,L1,V1,M1} P(130334,4558);d(4555) { join( X, converse(
% 67.16/67.63 meet( one, X ) ) ) ==> X }.
% 67.16/67.63 (130741) {G50,W8,D4,L1,V1,M1} P(4353,130516);d(5);d(130266) { converse(
% 67.16/67.63 meet( X, one ) ) ==> meet( X, one ) }.
% 67.16/67.63 (130742) {G50,W8,D4,L1,V1,M1} P(4322,130516);d(5);d(130268) { converse(
% 67.16/67.63 meet( one, X ) ) ==> meet( one, X ) }.
% 67.16/67.63 (131159) {G51,W8,D4,L1,V1,M1} S(12418);d(130742) { meet( converse( X ), one
% 67.16/67.63 ) ==> meet( one, X ) }.
% 67.16/67.63 (131160) {G51,W8,D4,L1,V1,M1} S(12372);d(130742) { meet( one, converse( X )
% 67.16/67.63 ) ==> meet( one, X ) }.
% 67.16/67.63 (131304) {G52,W13,D5,L1,V2,M1} P(20,131159) { meet( one, join( X, converse
% 67.16/67.63 ( Y ) ) ) ==> meet( join( converse( X ), Y ), one ) }.
% 67.16/67.63 (131307) {G52,W13,D5,L1,V2,M1} P(19,131159) { meet( one, join( converse( X
% 67.16/67.63 ), Y ) ) ==> meet( join( X, converse( Y ) ), one ) }.
% 67.16/67.63 (131312) {G53,W13,D5,L1,V2,M1} P(20,131160);d(131307);d(131304) { meet(
% 67.16/67.63 join( X, converse( Y ) ), one ) ==> meet( join( converse( X ), Y ), one )
% 67.16/67.63 }.
% 67.16/67.63 (133490) {G49,W12,D6,L1,V2,M1} P(130452,10143);d(747);d(756);d(64458) {
% 67.16/67.63 meet( meet( join( converse( X ), Y ), one ), X ) ==> meet( one, X ) }.
% 67.16/67.63 (141028) {G50,W11,D6,L1,V2,M1} P(133490,82543);d(82543);d(187);d(7) {
% 67.16/67.63 composition( meet( join( composition( X, top ), Y ), one ), X ) ==> X }.
% 67.16/67.63 (141075) {G51,W11,D6,L1,V2,M1} P(34400,141028) { composition( meet( join( Y
% 67.16/67.63 , composition( X, top ) ), one ), X ) ==> X }.
% 67.16/67.63 (141354) {G54,W12,D6,L1,V2,M1} P(141075,16);d(7);d(130741);d(224);d(131312)
% 67.16/67.63 { composition( Y, meet( join( converse( X ), composition( top, Y ) ),
% 67.16/67.63 one ) ) ==> Y }.
% 67.16/67.63 (142989) {G63,W10,D4,L1,V1,M1} P(28462,141354);d(131159);d(89538) {
% 67.16/67.63 composition( X, meet( one, skol1 ) ) ==> meet( converse( skol1 ), X ) }.
% 67.16/67.63 (143166) {G64,W9,D4,L1,V1,M1} P(142989,17);d(53041);d(7);d(130742) {
% 67.16/67.63 composition( meet( one, skol1 ), X ) ==> meet( skol1, X ) }.
% 67.16/67.63 (143254) {G65,W12,D5,L1,V2,M1} P(143166,4);d(142989) { composition( meet(
% 67.16/67.63 converse( skol1 ), Y ), X ) ==> composition( Y, meet( skol1, X ) ) }.
% 67.16/67.63 (144520) {G66,W12,D5,L1,V2,M1} P(143254,25990) { meet( composition( X, meet
% 67.16/67.63 ( skol1, Y ) ), complement( composition( X, Y ) ) ) ==> zero }.
% 67.16/67.63 (144595) {G66,W12,D5,L1,V2,M1} P(10127,143254);d(20589) { composition( meet
% 67.16/67.63 ( X, converse( skol1 ) ), Y ) ==> composition( X, meet( skol1, Y ) ) }.
% 67.16/67.63 (144757) {G67,W13,D5,L1,V2,M1} P(144520,2429);d(740);d(756) { join(
% 67.16/67.63 composition( X, meet( skol1, Y ) ), composition( X, Y ) ) ==> composition
% 67.16/67.63 ( X, Y ) }.
% 67.16/67.63 (144759) {G68,W0,D0,L0,V0,M0} S(134);d(144757);d(144595);d(144595);d(64458)
% 67.16/67.63 ;d(768);q { }.
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 % SZS output end Refutation
% 67.16/67.63 found a proof!
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Unprocessed initial clauses:
% 67.16/67.63
% 67.16/67.63 (144761) {G0,W7,D3,L1,V2,M1} { join( X, Y ) = join( Y, X ) }.
% 67.16/67.63 (144762) {G0,W11,D4,L1,V3,M1} { join( X, join( Y, Z ) ) = join( join( X, Y
% 67.16/67.63 ), Z ) }.
% 67.16/67.63 (144763) {G0,W14,D6,L1,V2,M1} { X = join( complement( join( complement( X
% 67.16/67.63 ), complement( Y ) ) ), complement( join( complement( X ), Y ) ) ) }.
% 67.16/67.63 (144764) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) = complement( join(
% 67.16/67.63 complement( X ), complement( Y ) ) ) }.
% 67.16/67.63 (144765) {G0,W11,D4,L1,V3,M1} { composition( X, composition( Y, Z ) ) =
% 67.16/67.63 composition( composition( X, Y ), Z ) }.
% 67.16/67.63 (144766) {G0,W5,D3,L1,V1,M1} { composition( X, one ) = X }.
% 67.16/67.63 (144767) {G0,W13,D4,L1,V3,M1} { composition( join( X, Y ), Z ) = join(
% 67.16/67.63 composition( X, Z ), composition( Y, Z ) ) }.
% 67.16/67.63 (144768) {G0,W5,D4,L1,V1,M1} { converse( converse( X ) ) = X }.
% 67.16/67.63 (144769) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) = join( converse
% 67.16/67.63 ( X ), converse( Y ) ) }.
% 67.16/67.63 (144770) {G0,W10,D4,L1,V2,M1} { converse( composition( X, Y ) ) =
% 67.16/67.63 composition( converse( Y ), converse( X ) ) }.
% 67.16/67.63 (144771) {G0,W13,D6,L1,V2,M1} { join( composition( converse( X ),
% 67.16/67.63 complement( composition( X, Y ) ) ), complement( Y ) ) = complement( Y )
% 67.16/67.63 }.
% 67.16/67.63 (144772) {G0,W6,D4,L1,V1,M1} { top = join( X, complement( X ) ) }.
% 67.16/67.63 (144773) {G0,W6,D4,L1,V1,M1} { zero = meet( X, complement( X ) ) }.
% 67.16/67.63 (144774) {G0,W5,D3,L1,V0,M1} { composition( skol1, top ) = skol1 }.
% 67.16/67.63 (144775) {G0,W24,D6,L1,V0,M1} { ! join( composition( meet( skol2, converse
% 67.16/67.63 ( skol1 ) ), skol3 ), composition( meet( skol2, converse( skol1 ) ), meet
% 67.16/67.63 ( skol1, skol3 ) ) ) = composition( meet( skol2, converse( skol1 ) ),
% 67.16/67.63 meet( skol1, skol3 ) ) }.
% 67.16/67.63
% 67.16/67.63
% 67.16/67.63 Total Proof:
% 67.16/67.63
% 67.16/67.63 subsumption: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.16/67.63 parent0: (144761) {G0,W7,D3,L1,V2,M1} { join( X, Y ) = join( Y, X ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join
% 67.16/67.63 ( join( X, Y ), Z ) }.
% 67.16/67.63 parent0: (144762) {G0,W11,D4,L1,V3,M1} { join( X, join( Y, Z ) ) = join(
% 67.16/67.63 join( X, Y ), Z ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144778) {G0,W14,D6,L1,V2,M1} { join( complement( join( complement
% 67.16/67.63 ( X ), complement( Y ) ) ), complement( join( complement( X ), Y ) ) ) =
% 67.16/67.63 X }.
% 67.16/67.63 parent0[0]: (144763) {G0,W14,D6,L1,V2,M1} { X = join( complement( join(
% 67.16/67.63 complement( X ), complement( Y ) ) ), complement( join( complement( X ),
% 67.16/67.63 Y ) ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (2) {G0,W14,D6,L1,V2,M1} I { join( complement( join(
% 67.16/67.63 complement( X ), complement( Y ) ) ), complement( join( complement( X ),
% 67.16/67.63 Y ) ) ) ==> X }.
% 67.16/67.63 parent0: (144778) {G0,W14,D6,L1,V2,M1} { join( complement( join(
% 67.16/67.63 complement( X ), complement( Y ) ) ), complement( join( complement( X ),
% 67.16/67.63 Y ) ) ) = X }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144781) {G0,W10,D5,L1,V2,M1} { complement( join( complement( X )
% 67.16/67.63 , complement( Y ) ) ) = meet( X, Y ) }.
% 67.16/67.63 parent0[0]: (144764) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) = complement(
% 67.16/67.63 join( complement( X ), complement( Y ) ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 67.16/67.63 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 67.16/67.63 parent0: (144781) {G0,W10,D5,L1,V2,M1} { complement( join( complement( X )
% 67.16/67.63 , complement( Y ) ) ) = meet( X, Y ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z
% 67.16/67.63 ) ) ==> composition( composition( X, Y ), Z ) }.
% 67.16/67.63 parent0: (144765) {G0,W11,D4,L1,V3,M1} { composition( X, composition( Y, Z
% 67.16/67.63 ) ) = composition( composition( X, Y ), Z ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 67.16/67.63 parent0: (144766) {G0,W5,D3,L1,V1,M1} { composition( X, one ) = X }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144796) {G0,W13,D4,L1,V3,M1} { join( composition( X, Z ),
% 67.16/67.63 composition( Y, Z ) ) = composition( join( X, Y ), Z ) }.
% 67.16/67.63 parent0[0]: (144767) {G0,W13,D4,L1,V3,M1} { composition( join( X, Y ), Z )
% 67.16/67.63 = join( composition( X, Z ), composition( Y, Z ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 67.16/67.63 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 67.16/67.63 parent0: (144796) {G0,W13,D4,L1,V3,M1} { join( composition( X, Z ),
% 67.16/67.63 composition( Y, Z ) ) = composition( join( X, Y ), Z ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X
% 67.16/67.63 }.
% 67.16/67.63 parent0: (144768) {G0,W5,D4,L1,V1,M1} { converse( converse( X ) ) = X }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144811) {G0,W10,D4,L1,V2,M1} { join( converse( X ), converse( Y )
% 67.16/67.63 ) = converse( join( X, Y ) ) }.
% 67.16/67.63 parent0[0]: (144769) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) =
% 67.16/67.63 join( converse( X ), converse( Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y
% 67.16/67.63 ) ) ==> converse( join( X, Y ) ) }.
% 67.16/67.63 parent0: (144811) {G0,W10,D4,L1,V2,M1} { join( converse( X ), converse( Y
% 67.16/67.63 ) ) = converse( join( X, Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144820) {G0,W10,D4,L1,V2,M1} { composition( converse( Y ),
% 67.16/67.63 converse( X ) ) = converse( composition( X, Y ) ) }.
% 67.16/67.63 parent0[0]: (144770) {G0,W10,D4,L1,V2,M1} { converse( composition( X, Y )
% 67.16/67.63 ) = composition( converse( Y ), converse( X ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ),
% 67.16/67.63 converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 67.16/67.63 parent0: (144820) {G0,W10,D4,L1,V2,M1} { composition( converse( Y ),
% 67.16/67.63 converse( X ) ) = converse( composition( X, Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 67.16/67.63 , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement(
% 67.16/67.63 Y ) }.
% 67.16/67.63 parent0: (144771) {G0,W13,D6,L1,V2,M1} { join( composition( converse( X )
% 67.16/67.63 , complement( composition( X, Y ) ) ), complement( Y ) ) = complement( Y
% 67.16/67.63 ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144841) {G0,W6,D4,L1,V1,M1} { join( X, complement( X ) ) = top
% 67.16/67.63 }.
% 67.16/67.63 parent0[0]: (144772) {G0,W6,D4,L1,V1,M1} { top = join( X, complement( X )
% 67.16/67.63 ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==>
% 67.16/67.63 top }.
% 67.16/67.63 parent0: (144841) {G0,W6,D4,L1,V1,M1} { join( X, complement( X ) ) = top
% 67.16/67.63 }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144853) {G0,W6,D4,L1,V1,M1} { meet( X, complement( X ) ) = zero
% 67.16/67.63 }.
% 67.16/67.63 parent0[0]: (144773) {G0,W6,D4,L1,V1,M1} { zero = meet( X, complement( X )
% 67.16/67.63 ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (12) {G0,W6,D4,L1,V1,M1} I { meet( X, complement( X ) ) ==>
% 67.16/67.63 zero }.
% 67.16/67.63 parent0: (144853) {G0,W6,D4,L1,V1,M1} { meet( X, complement( X ) ) = zero
% 67.16/67.63 }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (13) {G0,W5,D3,L1,V0,M1} I { composition( skol1, top ) ==>
% 67.16/67.63 skol1 }.
% 67.16/67.63 parent0: (144774) {G0,W5,D3,L1,V0,M1} { composition( skol1, top ) = skol1
% 67.16/67.63 }.
% 67.16/67.63 substitution0:
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (14) {G0,W24,D6,L1,V0,M1} I { ! join( composition( meet( skol2
% 67.16/67.63 , converse( skol1 ) ), skol3 ), composition( meet( skol2, converse( skol1
% 67.16/67.63 ) ), meet( skol1, skol3 ) ) ) ==> composition( meet( skol2, converse(
% 67.16/67.63 skol1 ) ), meet( skol1, skol3 ) ) }.
% 67.16/67.63 parent0: (144775) {G0,W24,D6,L1,V0,M1} { ! join( composition( meet( skol2
% 67.16/67.63 , converse( skol1 ) ), skol3 ), composition( meet( skol2, converse( skol1
% 67.16/67.63 ) ), meet( skol1, skol3 ) ) ) = composition( meet( skol2, converse(
% 67.16/67.63 skol1 ) ), meet( skol1, skol3 ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144881) {G0,W6,D4,L1,V1,M1} { top ==> join( X, complement( X ) )
% 67.16/67.63 }.
% 67.16/67.63 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 67.16/67.63 }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (144882) {G1,W6,D4,L1,V1,M1} { top ==> join( complement( X ), X )
% 67.16/67.63 }.
% 67.16/67.63 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.16/67.63 parent1[0; 2]: (144881) {G0,W6,D4,L1,V1,M1} { top ==> join( X, complement
% 67.16/67.63 ( X ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := complement( X )
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144885) {G1,W6,D4,L1,V1,M1} { join( complement( X ), X ) ==> top
% 67.16/67.63 }.
% 67.16/67.63 parent0[0]: (144882) {G1,W6,D4,L1,V1,M1} { top ==> join( complement( X ),
% 67.16/67.63 X ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (15) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X )
% 67.16/67.63 ==> top }.
% 67.16/67.63 parent0: (144885) {G1,W6,D4,L1,V1,M1} { join( complement( X ), X ) ==> top
% 67.16/67.63 }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144887) {G0,W10,D4,L1,V2,M1} { converse( composition( Y, X ) )
% 67.16/67.63 ==> composition( converse( X ), converse( Y ) ) }.
% 67.16/67.63 parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ),
% 67.16/67.63 converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (144888) {G1,W10,D5,L1,V2,M1} { converse( composition( X,
% 67.16/67.63 converse( Y ) ) ) ==> composition( Y, converse( X ) ) }.
% 67.16/67.63 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.16/67.63 parent1[0; 7]: (144887) {G0,W10,D4,L1,V2,M1} { converse( composition( Y, X
% 67.16/67.63 ) ) ==> composition( converse( X ), converse( Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := converse( Y )
% 67.16/67.63 Y := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (16) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 67.16/67.63 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 67.16/67.63 parent0: (144888) {G1,W10,D5,L1,V2,M1} { converse( composition( X,
% 67.16/67.63 converse( Y ) ) ) ==> composition( Y, converse( X ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144893) {G0,W10,D4,L1,V2,M1} { converse( composition( Y, X ) )
% 67.16/67.63 ==> composition( converse( X ), converse( Y ) ) }.
% 67.16/67.63 parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ),
% 67.16/67.63 converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (144895) {G1,W10,D5,L1,V2,M1} { converse( composition( converse(
% 67.16/67.63 X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 67.16/67.63 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.16/67.63 parent1[0; 9]: (144893) {G0,W10,D4,L1,V2,M1} { converse( composition( Y, X
% 67.16/67.63 ) ) ==> composition( converse( X ), converse( Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := converse( X )
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition(
% 67.16/67.63 converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 67.16/67.63 parent0: (144895) {G1,W10,D5,L1,V2,M1} { converse( composition( converse(
% 67.16/67.63 X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144898) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) ==> join
% 67.16/67.63 ( converse( X ), converse( Y ) ) }.
% 67.16/67.63 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 67.16/67.63 ) ==> converse( join( X, Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (144900) {G1,W10,D4,L1,V2,M1} { converse( join( Y, X ) ) ==> join
% 67.16/67.63 ( converse( X ), converse( Y ) ) }.
% 67.16/67.63 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.16/67.63 parent1[0; 2]: (144898) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) )
% 67.16/67.63 ==> join( converse( X ), converse( Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (144902) {G1,W9,D4,L1,V2,M1} { converse( join( X, Y ) ) ==>
% 67.16/67.63 converse( join( Y, X ) ) }.
% 67.16/67.63 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 67.16/67.63 ) ==> converse( join( X, Y ) ) }.
% 67.16/67.63 parent1[0; 5]: (144900) {G1,W10,D4,L1,V2,M1} { converse( join( Y, X ) )
% 67.16/67.63 ==> join( converse( X ), converse( Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := X
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (18) {G1,W9,D4,L1,V2,M1} P(8,0);d(8) { converse( join( X, Y )
% 67.16/67.63 ) = converse( join( Y, X ) ) }.
% 67.16/67.63 parent0: (144902) {G1,W9,D4,L1,V2,M1} { converse( join( X, Y ) ) ==>
% 67.16/67.63 converse( join( Y, X ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144904) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) ==> join
% 67.16/67.63 ( converse( X ), converse( Y ) ) }.
% 67.16/67.63 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 67.16/67.63 ) ==> converse( join( X, Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (144905) {G1,W10,D5,L1,V2,M1} { converse( join( converse( X ), Y
% 67.16/67.63 ) ) ==> join( X, converse( Y ) ) }.
% 67.16/67.63 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.16/67.63 parent1[0; 7]: (144904) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) )
% 67.16/67.63 ==> join( converse( X ), converse( Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := converse( X )
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (19) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 67.16/67.63 ), Y ) ) ==> join( X, converse( Y ) ) }.
% 67.16/67.63 parent0: (144905) {G1,W10,D5,L1,V2,M1} { converse( join( converse( X ), Y
% 67.16/67.63 ) ) ==> join( X, converse( Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144910) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) ==> join
% 67.16/67.63 ( converse( X ), converse( Y ) ) }.
% 67.16/67.63 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 67.16/67.63 ) ==> converse( join( X, Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (144912) {G1,W10,D5,L1,V2,M1} { converse( join( X, converse( Y )
% 67.16/67.63 ) ) ==> join( converse( X ), Y ) }.
% 67.16/67.63 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.16/67.63 parent1[0; 9]: (144910) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) )
% 67.16/67.63 ==> join( converse( X ), converse( Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := converse( Y )
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (20) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 67.16/67.63 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 67.16/67.63 parent0: (144912) {G1,W10,D5,L1,V2,M1} { converse( join( X, converse( Y )
% 67.16/67.63 ) ) ==> join( converse( X ), Y ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144915) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) ==> join
% 67.16/67.63 ( converse( X ), converse( Y ) ) }.
% 67.16/67.63 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 67.16/67.63 ) ==> converse( join( X, Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (144918) {G1,W14,D5,L1,V3,M1} { converse( join( join( X, Y ), Z )
% 67.16/67.63 ) ==> join( converse( join( Y, X ) ), converse( Z ) ) }.
% 67.16/67.63 parent0[0]: (18) {G1,W9,D4,L1,V2,M1} P(8,0);d(8) { converse( join( X, Y ) )
% 67.16/67.63 = converse( join( Y, X ) ) }.
% 67.16/67.63 parent1[0; 8]: (144915) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) )
% 67.16/67.63 ==> join( converse( X ), converse( Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := join( X, Y )
% 67.16/67.63 Y := Z
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (144929) {G1,W13,D5,L1,V3,M1} { converse( join( join( X, Y ), Z )
% 67.16/67.63 ) ==> converse( join( join( Y, X ), Z ) ) }.
% 67.16/67.63 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 67.16/67.63 ) ==> converse( join( X, Y ) ) }.
% 67.16/67.63 parent1[0; 7]: (144918) {G1,W14,D5,L1,V3,M1} { converse( join( join( X, Y
% 67.16/67.63 ), Z ) ) ==> join( converse( join( Y, X ) ), converse( Z ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := join( Y, X )
% 67.16/67.63 Y := Z
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (21) {G2,W13,D5,L1,V3,M1} P(18,8);d(8) { converse( join( join
% 67.16/67.63 ( Y, X ), Z ) ) = converse( join( join( X, Y ), Z ) ) }.
% 67.16/67.63 parent0: (144929) {G1,W13,D5,L1,V3,M1} { converse( join( join( X, Y ), Z )
% 67.16/67.63 ) ==> converse( join( join( Y, X ), Z ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := X
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144930) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) ==> join
% 67.16/67.63 ( converse( X ), converse( Y ) ) }.
% 67.16/67.63 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 67.16/67.63 ) ==> converse( join( X, Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (144936) {G1,W14,D5,L1,V3,M1} { converse( join( X, join( Y, Z ) )
% 67.16/67.63 ) ==> join( converse( X ), converse( join( Z, Y ) ) ) }.
% 67.16/67.63 parent0[0]: (18) {G1,W9,D4,L1,V2,M1} P(8,0);d(8) { converse( join( X, Y ) )
% 67.16/67.63 = converse( join( Y, X ) ) }.
% 67.16/67.63 parent1[0; 10]: (144930) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) )
% 67.16/67.63 ==> join( converse( X ), converse( Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := Z
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := join( Y, Z )
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (144942) {G1,W13,D5,L1,V3,M1} { converse( join( X, join( Y, Z ) )
% 67.16/67.63 ) ==> converse( join( X, join( Z, Y ) ) ) }.
% 67.16/67.63 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 67.16/67.63 ) ==> converse( join( X, Y ) ) }.
% 67.16/67.63 parent1[0; 7]: (144936) {G1,W14,D5,L1,V3,M1} { converse( join( X, join( Y
% 67.16/67.63 , Z ) ) ) ==> join( converse( X ), converse( join( Z, Y ) ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := join( Z, Y )
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (144944) {G1,W13,D5,L1,V3,M1} { converse( join( X, join( Y, Z ) )
% 67.16/67.63 ) ==> converse( join( join( X, Z ), Y ) ) }.
% 67.16/67.63 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.16/67.63 join( X, Y ), Z ) }.
% 67.16/67.63 parent1[0; 8]: (144942) {G1,W13,D5,L1,V3,M1} { converse( join( X, join( Y
% 67.16/67.63 , Z ) ) ) ==> converse( join( X, join( Z, Y ) ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Z
% 67.16/67.63 Z := Y
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (144946) {G1,W13,D5,L1,V3,M1} { converse( join( join( X, Y ), Z )
% 67.16/67.63 ) ==> converse( join( join( X, Z ), Y ) ) }.
% 67.16/67.63 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.16/67.63 join( X, Y ), Z ) }.
% 67.16/67.63 parent1[0; 2]: (144944) {G1,W13,D5,L1,V3,M1} { converse( join( X, join( Y
% 67.16/67.63 , Z ) ) ) ==> converse( join( join( X, Z ), Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (22) {G2,W13,D5,L1,V3,M1} P(18,8);d(8);d(1);d(1) { converse(
% 67.16/67.63 join( join( Z, Y ), X ) ) = converse( join( join( Z, X ), Y ) ) }.
% 67.16/67.63 parent0: (144946) {G1,W13,D5,L1,V3,M1} { converse( join( join( X, Y ), Z )
% 67.16/67.63 ) ==> converse( join( join( X, Z ), Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Z
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144947) {G0,W10,D4,L1,V2,M1} { converse( composition( Y, X ) )
% 67.16/67.63 ==> composition( converse( X ), converse( Y ) ) }.
% 67.16/67.63 parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ),
% 67.16/67.63 converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (144949) {G1,W14,D5,L1,V3,M1} { converse( composition( X, join( Y
% 67.16/67.63 , Z ) ) ) ==> composition( converse( join( Z, Y ) ), converse( X ) ) }.
% 67.16/67.63 parent0[0]: (18) {G1,W9,D4,L1,V2,M1} P(8,0);d(8) { converse( join( X, Y ) )
% 67.16/67.63 = converse( join( Y, X ) ) }.
% 67.16/67.63 parent1[0; 8]: (144947) {G0,W10,D4,L1,V2,M1} { converse( composition( Y, X
% 67.16/67.63 ) ) ==> composition( converse( X ), converse( Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := Z
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := join( Y, Z )
% 67.16/67.63 Y := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (144955) {G1,W13,D5,L1,V3,M1} { converse( composition( X, join( Y
% 67.16/67.63 , Z ) ) ) ==> converse( composition( X, join( Z, Y ) ) ) }.
% 67.16/67.63 parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ),
% 67.16/67.63 converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 67.16/67.63 parent1[0; 7]: (144949) {G1,W14,D5,L1,V3,M1} { converse( composition( X,
% 67.16/67.63 join( Y, Z ) ) ) ==> composition( converse( join( Z, Y ) ), converse( X )
% 67.16/67.63 ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := join( Z, Y )
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (23) {G2,W13,D5,L1,V3,M1} P(18,9);d(9) { converse( composition
% 67.16/67.63 ( Z, join( Y, X ) ) ) = converse( composition( Z, join( X, Y ) ) ) }.
% 67.16/67.63 parent0: (144955) {G1,W13,D5,L1,V3,M1} { converse( composition( X, join( Y
% 67.16/67.63 , Z ) ) ) ==> converse( composition( X, join( Z, Y ) ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Z
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144957) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 67.16/67.63 X, join( Y, Z ) ) }.
% 67.16/67.63 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.16/67.63 join( X, Y ), Z ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (144961) {G1,W14,D5,L1,V3,M1} { join( join( X, converse( Y ) ),
% 67.16/67.63 converse( Z ) ) ==> join( X, converse( join( Y, Z ) ) ) }.
% 67.16/67.63 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 67.16/67.63 ) ==> converse( join( X, Y ) ) }.
% 67.16/67.63 parent1[0; 10]: (144957) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z )
% 67.16/67.63 ==> join( X, join( Y, Z ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := Z
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := converse( Y )
% 67.16/67.63 Z := converse( Z )
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (26) {G1,W14,D5,L1,V3,M1} P(8,1) { join( join( Z, converse( X
% 67.16/67.63 ) ), converse( Y ) ) ==> join( Z, converse( join( X, Y ) ) ) }.
% 67.16/67.63 parent0: (144961) {G1,W14,D5,L1,V3,M1} { join( join( X, converse( Y ) ),
% 67.16/67.63 converse( Z ) ) ==> join( X, converse( join( Y, Z ) ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Z
% 67.16/67.63 Y := X
% 67.16/67.63 Z := Y
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144964) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 67.16/67.63 X, join( Y, Z ) ) }.
% 67.16/67.63 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.16/67.63 join( X, Y ), Z ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (144967) {G1,W10,D6,L1,V2,M1} { join( join( complement( join( X,
% 67.16/67.63 Y ) ), X ), Y ) ==> top }.
% 67.16/67.63 parent0[0]: (15) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X )
% 67.16/67.63 ==> top }.
% 67.16/67.63 parent1[0; 9]: (144964) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 67.16/67.63 join( X, join( Y, Z ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := join( X, Y )
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := complement( join( X, Y ) )
% 67.16/67.63 Y := X
% 67.16/67.63 Z := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (27) {G2,W10,D6,L1,V2,M1} P(1,15) { join( join( complement(
% 67.16/67.63 join( X, Y ) ), X ), Y ) ==> top }.
% 67.16/67.63 parent0: (144967) {G1,W10,D6,L1,V2,M1} { join( join( complement( join( X,
% 67.16/67.63 Y ) ), X ), Y ) ==> top }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144973) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 67.16/67.63 X, join( Y, Z ) ) }.
% 67.16/67.63 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.16/67.63 join( X, Y ), Z ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (144978) {G1,W10,D5,L1,V2,M1} { join( join( X, complement( Y ) )
% 67.16/67.63 , Y ) ==> join( X, top ) }.
% 67.16/67.63 parent0[0]: (15) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X )
% 67.16/67.63 ==> top }.
% 67.16/67.63 parent1[0; 9]: (144973) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 67.16/67.63 join( X, join( Y, Z ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := complement( Y )
% 67.16/67.63 Z := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (28) {G2,W10,D5,L1,V2,M1} P(15,1) { join( join( Y, complement
% 67.16/67.63 ( X ) ), X ) ==> join( Y, top ) }.
% 67.16/67.63 parent0: (144978) {G1,W10,D5,L1,V2,M1} { join( join( X, complement( Y ) )
% 67.16/67.63 , Y ) ==> join( X, top ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144982) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 67.16/67.63 X, join( Y, Z ) ) }.
% 67.16/67.63 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.16/67.63 join( X, Y ), Z ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (144985) {G1,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join
% 67.16/67.63 ( join( Y, Z ), X ) }.
% 67.16/67.63 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.16/67.63 parent1[0; 6]: (144982) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 67.16/67.63 join( X, join( Y, Z ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := join( Y, Z )
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (29) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 67.16/67.63 join( join( Y, Z ), X ) }.
% 67.16/67.63 parent0: (144985) {G1,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join
% 67.16/67.63 ( join( Y, Z ), X ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (144999) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 67.16/67.63 X, join( Y, Z ) ) }.
% 67.16/67.63 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.16/67.63 join( X, Y ), Z ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145004) {G1,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join
% 67.16/67.63 ( X, join( Z, Y ) ) }.
% 67.16/67.63 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.16/67.63 parent1[0; 8]: (144999) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 67.16/67.63 join( X, join( Y, Z ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := Z
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145017) {G1,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join
% 67.16/67.63 ( join( X, Z ), Y ) }.
% 67.16/67.63 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.16/67.63 join( X, Y ), Z ) }.
% 67.16/67.63 parent1[0; 6]: (145004) {G1,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 67.16/67.63 join( X, join( Z, Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Z
% 67.16/67.63 Z := Y
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (30) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X
% 67.16/67.63 ) = join( join( Z, X ), Y ) }.
% 67.16/67.63 parent0: (145017) {G1,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join
% 67.16/67.63 ( join( X, Z ), Y ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Z
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145019) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 67.16/67.63 X, join( Y, Z ) ) }.
% 67.16/67.63 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.16/67.63 join( X, Y ), Z ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145022) {G1,W10,D4,L1,V2,M1} { join( join( X, Y ), complement( Y
% 67.16/67.63 ) ) ==> join( X, top ) }.
% 67.16/67.63 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 67.16/67.63 }.
% 67.16/67.63 parent1[0; 9]: (145019) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 67.16/67.63 join( X, join( Y, Z ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := complement( Y )
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (31) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ),
% 67.16/67.63 complement( X ) ) ==> join( Y, top ) }.
% 67.16/67.63 parent0: (145022) {G1,W10,D4,L1,V2,M1} { join( join( X, Y ), complement( Y
% 67.16/67.63 ) ) ==> join( X, top ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145026) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join( join( X,
% 67.16/67.63 Y ), complement( Y ) ) }.
% 67.16/67.63 parent0[0]: (31) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ),
% 67.16/67.63 complement( X ) ) ==> join( Y, top ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145029) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join(
% 67.16/67.63 complement( Y ), join( X, Y ) ) }.
% 67.16/67.63 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.16/67.63 parent1[0; 4]: (145026) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join(
% 67.16/67.63 join( X, Y ), complement( Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := join( X, Y )
% 67.16/67.63 Y := complement( Y )
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145042) {G1,W10,D5,L1,V2,M1} { join( X, top ) ==> join( join(
% 67.16/67.63 complement( Y ), X ), Y ) }.
% 67.16/67.63 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.16/67.63 join( X, Y ), Z ) }.
% 67.16/67.63 parent1[0; 4]: (145029) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join(
% 67.16/67.63 complement( Y ), join( X, Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := complement( Y )
% 67.16/67.63 Y := X
% 67.16/67.63 Z := Y
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145043) {G1,W10,D5,L1,V2,M1} { join( join( complement( Y ), X ),
% 67.16/67.63 Y ) ==> join( X, top ) }.
% 67.16/67.63 parent0[0]: (145042) {G1,W10,D5,L1,V2,M1} { join( X, top ) ==> join( join
% 67.16/67.63 ( complement( Y ), X ), Y ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (36) {G2,W10,D5,L1,V2,M1} P(31,0);d(1) { join( join(
% 67.16/67.63 complement( Y ), X ), Y ) ==> join( X, top ) }.
% 67.16/67.63 parent0: (145043) {G1,W10,D5,L1,V2,M1} { join( join( complement( Y ), X )
% 67.16/67.63 , Y ) ==> join( X, top ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145044) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join( join( X,
% 67.16/67.63 Y ), complement( Y ) ) }.
% 67.16/67.63 parent0[0]: (31) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ),
% 67.16/67.63 complement( X ) ) ==> join( Y, top ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145047) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join( join( Y
% 67.16/67.63 , X ), complement( Y ) ) }.
% 67.16/67.63 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.16/67.63 parent1[0; 5]: (145044) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join(
% 67.16/67.63 join( X, Y ), complement( Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145060) {G1,W10,D4,L1,V2,M1} { join( join( Y, X ), complement( Y
% 67.16/67.63 ) ) ==> join( X, top ) }.
% 67.16/67.63 parent0[0]: (145047) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join( join
% 67.16/67.63 ( Y, X ), complement( Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (37) {G2,W10,D4,L1,V2,M1} P(0,31) { join( join( Y, X ),
% 67.16/67.63 complement( Y ) ) ==> join( X, top ) }.
% 67.16/67.63 parent0: (145060) {G1,W10,D4,L1,V2,M1} { join( join( Y, X ), complement( Y
% 67.16/67.63 ) ) ==> join( X, top ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145062) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join( join( X,
% 67.16/67.63 Y ), complement( Y ) ) }.
% 67.16/67.63 parent0[0]: (31) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ),
% 67.16/67.63 complement( X ) ) ==> join( Y, top ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145063) {G1,W9,D5,L1,V1,M1} { join( X, top ) ==> join( top,
% 67.16/67.63 complement( complement( X ) ) ) }.
% 67.16/67.63 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 67.16/67.63 }.
% 67.16/67.63 parent1[0; 5]: (145062) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join(
% 67.16/67.63 join( X, Y ), complement( Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := complement( X )
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145064) {G1,W9,D5,L1,V1,M1} { join( top, complement( complement(
% 67.16/67.63 X ) ) ) ==> join( X, top ) }.
% 67.16/67.63 parent0[0]: (145063) {G1,W9,D5,L1,V1,M1} { join( X, top ) ==> join( top,
% 67.16/67.63 complement( complement( X ) ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (38) {G2,W9,D5,L1,V1,M1} P(11,31) { join( top, complement(
% 67.16/67.63 complement( X ) ) ) ==> join( X, top ) }.
% 67.16/67.63 parent0: (145064) {G1,W9,D5,L1,V1,M1} { join( top, complement( complement
% 67.16/67.63 ( X ) ) ) ==> join( X, top ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145066) {G2,W10,D4,L1,V2,M1} { join( Y, top ) ==> join( join( X,
% 67.16/67.63 Y ), complement( X ) ) }.
% 67.16/67.63 parent0[0]: (37) {G2,W10,D4,L1,V2,M1} P(0,31) { join( join( Y, X ),
% 67.16/67.63 complement( Y ) ) ==> join( X, top ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145073) {G1,W14,D5,L1,V3,M1} { join( join( X, Y ), top ) ==>
% 67.16/67.63 join( join( join( Z, X ), Y ), complement( Z ) ) }.
% 67.16/67.63 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.16/67.63 join( X, Y ), Z ) }.
% 67.16/67.63 parent1[0; 7]: (145066) {G2,W10,D4,L1,V2,M1} { join( Y, top ) ==> join(
% 67.16/67.63 join( X, Y ), complement( X ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Z
% 67.16/67.63 Y := X
% 67.16/67.63 Z := Y
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := Z
% 67.16/67.63 Y := join( X, Y )
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145074) {G1,W14,D5,L1,V3,M1} { join( join( join( Z, X ), Y ),
% 67.16/67.63 complement( Z ) ) ==> join( join( X, Y ), top ) }.
% 67.16/67.63 parent0[0]: (145073) {G1,W14,D5,L1,V3,M1} { join( join( X, Y ), top ) ==>
% 67.16/67.63 join( join( join( Z, X ), Y ), complement( Z ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (46) {G3,W14,D5,L1,V3,M1} P(1,37) { join( join( join( X, Y ),
% 67.16/67.63 Z ), complement( X ) ) ==> join( join( Y, Z ), top ) }.
% 67.16/67.63 parent0: (145074) {G1,W14,D5,L1,V3,M1} { join( join( join( Z, X ), Y ),
% 67.16/67.63 complement( Z ) ) ==> join( join( X, Y ), top ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := Z
% 67.16/67.63 Z := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145077) {G1,W11,D6,L1,V2,M1} { join( meet( X, Y ), complement(
% 67.16/67.63 join( complement( X ), Y ) ) ) ==> X }.
% 67.16/67.63 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 67.16/67.63 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 67.16/67.63 parent1[0; 2]: (2) {G0,W14,D6,L1,V2,M1} I { join( complement( join(
% 67.16/67.63 complement( X ), complement( Y ) ) ), complement( join( complement( X ),
% 67.16/67.63 Y ) ) ) ==> X }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (48) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 67.16/67.63 complement( join( complement( X ), Y ) ) ) ==> X }.
% 67.16/67.63 parent0: (145077) {G1,W11,D6,L1,V2,M1} { join( meet( X, Y ), complement(
% 67.16/67.63 join( complement( X ), Y ) ) ) ==> X }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145080) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) ) ==>
% 67.16/67.63 converse( join( converse( X ), Y ) ) }.
% 67.16/67.63 parent0[0]: (19) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 67.16/67.63 ), Y ) ) ==> join( X, converse( Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145081) {G1,W14,D6,L1,V3,M1} { join( X, converse( join( Y, Z ) )
% 67.16/67.63 ) ==> converse( join( join( converse( X ), Y ), Z ) ) }.
% 67.16/67.63 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.16/67.63 join( X, Y ), Z ) }.
% 67.16/67.63 parent1[0; 8]: (145080) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) )
% 67.16/67.63 ==> converse( join( converse( X ), Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := converse( X )
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := join( Y, Z )
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145082) {G1,W14,D6,L1,V3,M1} { converse( join( join( converse( X
% 67.16/67.63 ), Y ), Z ) ) ==> join( X, converse( join( Y, Z ) ) ) }.
% 67.16/67.63 parent0[0]: (145081) {G1,W14,D6,L1,V3,M1} { join( X, converse( join( Y, Z
% 67.16/67.63 ) ) ) ==> converse( join( join( converse( X ), Y ), Z ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (55) {G2,W14,D6,L1,V3,M1} P(1,19) { converse( join( join(
% 67.16/67.63 converse( X ), Y ), Z ) ) ==> join( X, converse( join( Y, Z ) ) ) }.
% 67.16/67.63 parent0: (145082) {G1,W14,D6,L1,V3,M1} { converse( join( join( converse( X
% 67.16/67.63 ), Y ), Z ) ) ==> join( X, converse( join( Y, Z ) ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145084) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) ) ==>
% 67.16/67.63 converse( join( converse( X ), Y ) ) }.
% 67.16/67.63 parent0[0]: (19) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 67.16/67.63 ), Y ) ) ==> join( X, converse( Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145085) {G1,W9,D6,L1,V1,M1} { join( X, converse( complement(
% 67.16/67.63 converse( X ) ) ) ) ==> converse( top ) }.
% 67.16/67.63 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 67.16/67.63 }.
% 67.16/67.63 parent1[0; 8]: (145084) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) )
% 67.16/67.63 ==> converse( join( converse( X ), Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := converse( X )
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := complement( converse( X ) )
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (59) {G2,W9,D6,L1,V1,M1} P(11,19) { join( X, converse(
% 67.16/67.63 complement( converse( X ) ) ) ) ==> converse( top ) }.
% 67.16/67.63 parent0: (145085) {G1,W9,D6,L1,V1,M1} { join( X, converse( complement(
% 67.16/67.63 converse( X ) ) ) ) ==> converse( top ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145088) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 67.16/67.63 ( complement( X ), complement( Y ) ) ) }.
% 67.16/67.63 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 67.16/67.63 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145091) {G1,W7,D4,L1,V1,M1} { meet( complement( X ), X ) ==>
% 67.16/67.63 complement( top ) }.
% 67.16/67.63 parent0[0]: (15) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X )
% 67.16/67.63 ==> top }.
% 67.16/67.63 parent1[0; 6]: (145088) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 67.16/67.63 ( join( complement( X ), complement( Y ) ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := complement( X )
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := complement( X )
% 67.16/67.63 Y := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (74) {G2,W7,D4,L1,V1,M1} P(15,3) { meet( complement( X ), X )
% 67.16/67.63 ==> complement( top ) }.
% 67.16/67.63 parent0: (145091) {G1,W7,D4,L1,V1,M1} { meet( complement( X ), X ) ==>
% 67.16/67.63 complement( top ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145093) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 67.16/67.63 ( complement( X ), complement( Y ) ) ) }.
% 67.16/67.63 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 67.16/67.63 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145095) {G1,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 67.16/67.63 ( complement( Y ), complement( X ) ) ) }.
% 67.16/67.63 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.16/67.63 parent1[0; 5]: (145093) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 67.16/67.63 ( join( complement( X ), complement( Y ) ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := complement( X )
% 67.16/67.63 Y := complement( Y )
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145097) {G1,W7,D3,L1,V2,M1} { meet( X, Y ) ==> meet( Y, X ) }.
% 67.16/67.63 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 67.16/67.63 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 67.16/67.63 parent1[0; 4]: (145095) {G1,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 67.16/67.63 ( join( complement( Y ), complement( X ) ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := X
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (75) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X
% 67.16/67.63 , Y ) }.
% 67.16/67.63 parent0: (145097) {G1,W7,D3,L1,V2,M1} { meet( X, Y ) ==> meet( Y, X ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145099) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 67.16/67.63 ( complement( X ), complement( Y ) ) ) }.
% 67.16/67.63 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 67.16/67.63 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145102) {G1,W7,D4,L1,V1,M1} { meet( X, complement( X ) ) ==>
% 67.16/67.63 complement( top ) }.
% 67.16/67.63 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 67.16/67.63 }.
% 67.16/67.63 parent1[0; 6]: (145099) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 67.16/67.63 ( join( complement( X ), complement( Y ) ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := complement( X )
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := complement( X )
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145103) {G1,W4,D3,L1,V0,M1} { zero ==> complement( top ) }.
% 67.16/67.63 parent0[0]: (12) {G0,W6,D4,L1,V1,M1} I { meet( X, complement( X ) ) ==>
% 67.16/67.63 zero }.
% 67.16/67.63 parent1[0; 1]: (145102) {G1,W7,D4,L1,V1,M1} { meet( X, complement( X ) )
% 67.16/67.63 ==> complement( top ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145104) {G1,W4,D3,L1,V0,M1} { complement( top ) ==> zero }.
% 67.16/67.63 parent0[0]: (145103) {G1,W4,D3,L1,V0,M1} { zero ==> complement( top ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.63 zero }.
% 67.16/67.63 parent0: (145104) {G1,W4,D3,L1,V0,M1} { complement( top ) ==> zero }.
% 67.16/67.63 substitution0:
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145106) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 67.16/67.63 ( complement( X ), complement( Y ) ) ) }.
% 67.16/67.63 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 67.16/67.63 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145107) {G1,W9,D5,L1,V1,M1} { meet( top, X ) ==> complement(
% 67.16/67.63 join( zero, complement( X ) ) ) }.
% 67.16/67.63 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.63 zero }.
% 67.16/67.63 parent1[0; 6]: (145106) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 67.16/67.63 ( join( complement( X ), complement( Y ) ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := top
% 67.16/67.63 Y := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145109) {G1,W9,D5,L1,V1,M1} { complement( join( zero, complement
% 67.16/67.63 ( X ) ) ) ==> meet( top, X ) }.
% 67.16/67.63 parent0[0]: (145107) {G1,W9,D5,L1,V1,M1} { meet( top, X ) ==> complement(
% 67.16/67.63 join( zero, complement( X ) ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (78) {G2,W9,D5,L1,V1,M1} P(77,3) { complement( join( zero,
% 67.16/67.63 complement( X ) ) ) ==> meet( top, X ) }.
% 67.16/67.63 parent0: (145109) {G1,W9,D5,L1,V1,M1} { complement( join( zero, complement
% 67.16/67.63 ( X ) ) ) ==> meet( top, X ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145112) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 67.16/67.63 ( complement( X ), complement( Y ) ) ) }.
% 67.16/67.63 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 67.16/67.63 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145114) {G1,W9,D5,L1,V1,M1} { meet( X, top ) ==> complement(
% 67.16/67.63 join( complement( X ), zero ) ) }.
% 67.16/67.63 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.63 zero }.
% 67.16/67.63 parent1[0; 8]: (145112) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 67.16/67.63 ( join( complement( X ), complement( Y ) ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := top
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145116) {G1,W9,D5,L1,V1,M1} { complement( join( complement( X ),
% 67.16/67.63 zero ) ) ==> meet( X, top ) }.
% 67.16/67.63 parent0[0]: (145114) {G1,W9,D5,L1,V1,M1} { meet( X, top ) ==> complement(
% 67.16/67.63 join( complement( X ), zero ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (79) {G2,W9,D5,L1,V1,M1} P(77,3) { complement( join(
% 67.16/67.63 complement( X ), zero ) ) ==> meet( X, top ) }.
% 67.16/67.63 parent0: (145116) {G1,W9,D5,L1,V1,M1} { complement( join( complement( X )
% 67.16/67.63 , zero ) ) ==> meet( X, top ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145118) {G2,W10,D5,L1,V2,M1} { join( X, top ) ==> join( join( X,
% 67.16/67.63 complement( Y ) ), Y ) }.
% 67.16/67.63 parent0[0]: (28) {G2,W10,D5,L1,V2,M1} P(15,1) { join( join( Y, complement(
% 67.16/67.63 X ) ), X ) ==> join( Y, top ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145119) {G2,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join( X,
% 67.16/67.63 zero ), top ) }.
% 67.16/67.63 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.63 zero }.
% 67.16/67.63 parent1[0; 7]: (145118) {G2,W10,D5,L1,V2,M1} { join( X, top ) ==> join(
% 67.16/67.63 join( X, complement( Y ) ), Y ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := top
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145120) {G2,W9,D4,L1,V1,M1} { join( join( X, zero ), top ) ==>
% 67.16/67.63 join( X, top ) }.
% 67.16/67.63 parent0[0]: (145119) {G2,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join(
% 67.16/67.63 X, zero ), top ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (80) {G3,W9,D4,L1,V1,M1} P(77,28) { join( join( X, zero ), top
% 67.16/67.63 ) ==> join( X, top ) }.
% 67.16/67.63 parent0: (145120) {G2,W9,D4,L1,V1,M1} { join( join( X, zero ), top ) ==>
% 67.16/67.63 join( X, top ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145122) {G0,W11,D4,L1,V3,M1} { composition( composition( X, Y ),
% 67.16/67.63 Z ) ==> composition( X, composition( Y, Z ) ) }.
% 67.16/67.63 parent0[0]: (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z
% 67.16/67.63 ) ) ==> composition( composition( X, Y ), Z ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145124) {G1,W9,D4,L1,V1,M1} { composition( composition( X, skol1
% 67.16/67.63 ), top ) ==> composition( X, skol1 ) }.
% 67.16/67.63 parent0[0]: (13) {G0,W5,D3,L1,V0,M1} I { composition( skol1, top ) ==>
% 67.16/67.63 skol1 }.
% 67.16/67.63 parent1[0; 8]: (145122) {G0,W11,D4,L1,V3,M1} { composition( composition( X
% 67.16/67.63 , Y ), Z ) ==> composition( X, composition( Y, Z ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := skol1
% 67.16/67.63 Z := top
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (90) {G1,W9,D4,L1,V1,M1} P(13,4) { composition( composition( X
% 67.16/67.63 , skol1 ), top ) ==> composition( X, skol1 ) }.
% 67.16/67.63 parent0: (145124) {G1,W9,D4,L1,V1,M1} { composition( composition( X, skol1
% 67.16/67.63 ), top ) ==> composition( X, skol1 ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145129) {G2,W6,D4,L1,V1,M1} { meet( complement( X ), X ) ==>
% 67.16/67.63 zero }.
% 67.16/67.63 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.63 zero }.
% 67.16/67.63 parent1[0; 5]: (74) {G2,W7,D4,L1,V1,M1} P(15,3) { meet( complement( X ), X
% 67.16/67.63 ) ==> complement( top ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (92) {G3,W6,D4,L1,V1,M1} S(74);d(77) { meet( complement( X ),
% 67.16/67.63 X ) ==> zero }.
% 67.16/67.63 parent0: (145129) {G2,W6,D4,L1,V1,M1} { meet( complement( X ), X ) ==>
% 67.16/67.63 zero }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145132) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 67.16/67.63 X, join( Y, Z ) ) }.
% 67.16/67.63 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.16/67.63 join( X, Y ), Z ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145136) {G1,W17,D5,L1,V4,M1} { join( join( X, composition( Y, Z
% 67.16/67.63 ) ), composition( T, Z ) ) ==> join( X, composition( join( Y, T ), Z ) )
% 67.16/67.63 }.
% 67.16/67.63 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 67.16/67.63 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 67.16/67.63 parent1[0; 12]: (145132) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z )
% 67.16/67.63 ==> join( X, join( Y, Z ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := T
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := composition( Y, Z )
% 67.16/67.63 Z := composition( T, Z )
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (93) {G1,W17,D5,L1,V4,M1} P(6,1) { join( join( T, composition
% 67.16/67.63 ( X, Y ) ), composition( Z, Y ) ) ==> join( T, composition( join( X, Z )
% 67.16/67.63 , Y ) ) }.
% 67.16/67.63 parent0: (145136) {G1,W17,D5,L1,V4,M1} { join( join( X, composition( Y, Z
% 67.16/67.63 ) ), composition( T, Z ) ) ==> join( X, composition( join( Y, T ), Z ) )
% 67.16/67.63 }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := T
% 67.16/67.63 Y := X
% 67.16/67.63 Z := Y
% 67.16/67.63 T := Z
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145139) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ), Y ) ==>
% 67.16/67.63 join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.16/67.63 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 67.16/67.63 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Z
% 67.16/67.63 Z := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145141) {G1,W13,D4,L1,V3,M1} { composition( join( Y, X ), Z )
% 67.16/67.63 ==> join( composition( X, Z ), composition( Y, Z ) ) }.
% 67.16/67.63 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.16/67.63 parent1[0; 2]: (145139) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ),
% 67.16/67.63 Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Z
% 67.16/67.63 Z := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145143) {G1,W11,D4,L1,V3,M1} { composition( join( X, Y ), Z )
% 67.16/67.63 ==> composition( join( Y, X ), Z ) }.
% 67.16/67.63 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 67.16/67.63 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 67.16/67.63 parent1[0; 6]: (145141) {G1,W13,D4,L1,V3,M1} { composition( join( Y, X ),
% 67.16/67.63 Z ) ==> join( composition( X, Z ), composition( Y, Z ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := X
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := Y
% 67.16/67.63 Y := X
% 67.16/67.63 Z := Z
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (95) {G1,W11,D4,L1,V3,M1} P(6,0);d(6) { composition( join( X,
% 67.16/67.63 Z ), Y ) = composition( join( Z, X ), Y ) }.
% 67.16/67.63 parent0: (145143) {G1,W11,D4,L1,V3,M1} { composition( join( X, Y ), Z )
% 67.16/67.63 ==> composition( join( Y, X ), Z ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Z
% 67.16/67.63 Z := Y
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145145) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ), Y ) ==>
% 67.16/67.63 join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.16/67.63 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 67.16/67.63 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Z
% 67.16/67.63 Z := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145147) {G1,W11,D4,L1,V1,M1} { composition( join( X, skol1 ),
% 67.16/67.63 top ) ==> join( composition( X, top ), skol1 ) }.
% 67.16/67.63 parent0[0]: (13) {G0,W5,D3,L1,V0,M1} I { composition( skol1, top ) ==>
% 67.16/67.63 skol1 }.
% 67.16/67.63 parent1[0; 10]: (145145) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z )
% 67.16/67.63 , Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := X
% 67.16/67.63 Y := top
% 67.16/67.63 Z := skol1
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 subsumption: (97) {G1,W11,D4,L1,V1,M1} P(13,6) { composition( join( X,
% 67.16/67.63 skol1 ), top ) ==> join( composition( X, top ), skol1 ) }.
% 67.16/67.63 parent0: (145147) {G1,W11,D4,L1,V1,M1} { composition( join( X, skol1 ),
% 67.16/67.63 top ) ==> join( composition( X, top ), skol1 ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63 permutation0:
% 67.16/67.63 0 ==> 0
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 eqswap: (145151) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 67.16/67.63 composition( converse( X ), complement( composition( X, Y ) ) ),
% 67.16/67.63 complement( Y ) ) }.
% 67.16/67.63 parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 67.16/67.63 , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement(
% 67.16/67.63 Y ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 Y := Y
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145153) {G1,W15,D6,L1,V1,M1} { complement( top ) ==> join(
% 67.16/67.63 composition( converse( composition( X, skol1 ) ), complement( composition
% 67.16/67.63 ( X, skol1 ) ) ), complement( top ) ) }.
% 67.16/67.63 parent0[0]: (90) {G1,W9,D4,L1,V1,M1} P(13,4) { composition( composition( X
% 67.16/67.63 , skol1 ), top ) ==> composition( X, skol1 ) }.
% 67.16/67.63 parent1[0; 10]: (145151) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 67.16/67.63 composition( converse( X ), complement( composition( X, Y ) ) ),
% 67.16/67.63 complement( Y ) ) }.
% 67.16/67.63 substitution0:
% 67.16/67.63 X := X
% 67.16/67.63 end
% 67.16/67.63 substitution1:
% 67.16/67.63 X := composition( X, skol1 )
% 67.16/67.63 Y := top
% 67.16/67.63 end
% 67.16/67.63
% 67.16/67.63 paramod: (145155) {G2,W14,D6,L1,V1,M1} { complement( top ) ==> join(
% 67.16/67.63 composition( converse( composition( X, skol1 ) ), complement( composition
% 67.16/67.63 ( X, skol1 ) ) ), zero ) }.
% 67.16/67.63 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.63 zero }.
% 67.16/67.63 parent1[0; 13]: (145153) {G1,W15,D6,L1,V1,M1} { complement( top ) ==> join
% 67.16/67.64 ( composition( converse( composition( X, skol1 ) ), complement(
% 67.16/67.64 composition( X, skol1 ) ) ), complement( top ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145156) {G2,W13,D6,L1,V1,M1} { zero ==> join( composition(
% 67.16/67.64 converse( composition( X, skol1 ) ), complement( composition( X, skol1 )
% 67.16/67.64 ) ), zero ) }.
% 67.16/67.64 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.64 zero }.
% 67.16/67.64 parent1[0; 1]: (145155) {G2,W14,D6,L1,V1,M1} { complement( top ) ==> join
% 67.16/67.64 ( composition( converse( composition( X, skol1 ) ), complement(
% 67.16/67.64 composition( X, skol1 ) ) ), zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145158) {G2,W13,D6,L1,V1,M1} { join( composition( converse(
% 67.16/67.64 composition( X, skol1 ) ), complement( composition( X, skol1 ) ) ), zero
% 67.16/67.64 ) ==> zero }.
% 67.16/67.64 parent0[0]: (145156) {G2,W13,D6,L1,V1,M1} { zero ==> join( composition(
% 67.16/67.64 converse( composition( X, skol1 ) ), complement( composition( X, skol1 )
% 67.16/67.64 ) ), zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (103) {G2,W13,D6,L1,V1,M1} P(90,10);d(77) { join( composition
% 67.16/67.64 ( converse( composition( X, skol1 ) ), complement( composition( X, skol1
% 67.16/67.64 ) ) ), zero ) ==> zero }.
% 67.16/67.64 parent0: (145158) {G2,W13,D6,L1,V1,M1} { join( composition( converse(
% 67.16/67.64 composition( X, skol1 ) ), complement( composition( X, skol1 ) ) ), zero
% 67.16/67.64 ) ==> zero }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145161) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 67.16/67.64 composition( converse( X ), complement( composition( X, Y ) ) ),
% 67.16/67.64 complement( Y ) ) }.
% 67.16/67.64 parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 67.16/67.64 , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement(
% 67.16/67.64 Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145162) {G1,W19,D7,L1,V3,M1} { complement( composition( X, Y ) )
% 67.16/67.64 ==> join( composition( converse( Z ), complement( composition(
% 67.16/67.64 composition( Z, X ), Y ) ) ), complement( composition( X, Y ) ) ) }.
% 67.16/67.64 parent0[0]: (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z
% 67.16/67.64 ) ) ==> composition( composition( X, Y ), Z ) }.
% 67.16/67.64 parent1[0; 10]: (145161) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 67.16/67.64 composition( converse( X ), complement( composition( X, Y ) ) ),
% 67.16/67.64 complement( Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Z
% 67.16/67.64 Y := X
% 67.16/67.64 Z := Y
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := Z
% 67.16/67.64 Y := composition( X, Y )
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145163) {G1,W19,D7,L1,V3,M1} { join( composition( converse( Z ),
% 67.16/67.64 complement( composition( composition( Z, X ), Y ) ) ), complement(
% 67.16/67.64 composition( X, Y ) ) ) ==> complement( composition( X, Y ) ) }.
% 67.16/67.64 parent0[0]: (145162) {G1,W19,D7,L1,V3,M1} { complement( composition( X, Y
% 67.16/67.64 ) ) ==> join( composition( converse( Z ), complement( composition(
% 67.16/67.64 composition( Z, X ), Y ) ) ), complement( composition( X, Y ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 Z := Z
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (104) {G1,W19,D7,L1,V3,M1} P(4,10) { join( composition(
% 67.16/67.64 converse( X ), complement( composition( composition( X, Y ), Z ) ) ),
% 67.16/67.64 complement( composition( Y, Z ) ) ) ==> complement( composition( Y, Z ) )
% 67.16/67.64 }.
% 67.16/67.64 parent0: (145163) {G1,W19,D7,L1,V3,M1} { join( composition( converse( Z )
% 67.16/67.64 , complement( composition( composition( Z, X ), Y ) ) ), complement(
% 67.16/67.64 composition( X, Y ) ) ) ==> complement( composition( X, Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := Z
% 67.16/67.64 Z := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145165) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 67.16/67.64 composition( converse( X ), complement( composition( X, Y ) ) ),
% 67.16/67.64 complement( Y ) ) }.
% 67.16/67.64 parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 67.16/67.64 , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement(
% 67.16/67.64 Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145167) {G1,W12,D6,L1,V1,M1} { complement( top ) ==> join(
% 67.16/67.64 composition( converse( X ), complement( composition( X, top ) ) ), zero )
% 67.16/67.64 }.
% 67.16/67.64 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.64 zero }.
% 67.16/67.64 parent1[0; 11]: (145165) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 67.16/67.64 composition( converse( X ), complement( composition( X, Y ) ) ),
% 67.16/67.64 complement( Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := top
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145168) {G2,W11,D6,L1,V1,M1} { zero ==> join( composition(
% 67.16/67.64 converse( X ), complement( composition( X, top ) ) ), zero ) }.
% 67.16/67.64 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.64 zero }.
% 67.16/67.64 parent1[0; 1]: (145167) {G1,W12,D6,L1,V1,M1} { complement( top ) ==> join
% 67.16/67.64 ( composition( converse( X ), complement( composition( X, top ) ) ), zero
% 67.16/67.64 ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145170) {G2,W11,D6,L1,V1,M1} { join( composition( converse( X ),
% 67.16/67.64 complement( composition( X, top ) ) ), zero ) ==> zero }.
% 67.16/67.64 parent0[0]: (145168) {G2,W11,D6,L1,V1,M1} { zero ==> join( composition(
% 67.16/67.64 converse( X ), complement( composition( X, top ) ) ), zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (105) {G2,W11,D6,L1,V1,M1} P(77,10) { join( composition(
% 67.16/67.64 converse( X ), complement( composition( X, top ) ) ), zero ) ==> zero }.
% 67.16/67.64 parent0: (145170) {G2,W11,D6,L1,V1,M1} { join( composition( converse( X )
% 67.16/67.64 , complement( composition( X, top ) ) ), zero ) ==> zero }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145173) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 67.16/67.64 X, join( Y, Z ) ) }.
% 67.16/67.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.16/67.64 join( X, Y ), Z ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 Z := Z
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145175) {G1,W17,D7,L1,V3,M1} { join( join( X, composition(
% 67.16/67.64 converse( Y ), complement( composition( Y, Z ) ) ) ), complement( Z ) )
% 67.16/67.64 ==> join( X, complement( Z ) ) }.
% 67.16/67.64 parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 67.16/67.64 , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement(
% 67.16/67.64 Y ) }.
% 67.16/67.64 parent1[0; 15]: (145173) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z )
% 67.16/67.64 ==> join( X, join( Y, Z ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := Z
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := composition( converse( Y ), complement( composition( Y, Z ) ) )
% 67.16/67.64 Z := complement( Z )
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (108) {G1,W17,D7,L1,V3,M1} P(10,1) { join( join( Z,
% 67.16/67.64 composition( converse( X ), complement( composition( X, Y ) ) ) ),
% 67.16/67.64 complement( Y ) ) ==> join( Z, complement( Y ) ) }.
% 67.16/67.64 parent0: (145175) {G1,W17,D7,L1,V3,M1} { join( join( X, composition(
% 67.16/67.64 converse( Y ), complement( composition( Y, Z ) ) ) ), complement( Z ) )
% 67.16/67.64 ==> join( X, complement( Z ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Z
% 67.16/67.64 Y := X
% 67.16/67.64 Z := Y
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145179) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 67.16/67.64 composition( converse( X ), complement( composition( X, Y ) ) ),
% 67.16/67.64 complement( Y ) ) }.
% 67.16/67.64 parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 67.16/67.64 , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement(
% 67.16/67.64 Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145181) {G1,W17,D7,L1,V2,M1} { complement( converse( X ) ) ==>
% 67.16/67.64 join( composition( converse( converse( Y ) ), complement( converse(
% 67.16/67.64 composition( X, Y ) ) ) ), complement( converse( X ) ) ) }.
% 67.16/67.64 parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ),
% 67.16/67.64 converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 67.16/67.64 parent1[0; 10]: (145179) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 67.16/67.64 composition( converse( X ), complement( composition( X, Y ) ) ),
% 67.16/67.64 complement( Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := converse( Y )
% 67.16/67.64 Y := converse( X )
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145182) {G1,W15,D7,L1,V2,M1} { complement( converse( X ) ) ==>
% 67.16/67.64 join( composition( Y, complement( converse( composition( X, Y ) ) ) ),
% 67.16/67.64 complement( converse( X ) ) ) }.
% 67.16/67.64 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.16/67.64 parent1[0; 6]: (145181) {G1,W17,D7,L1,V2,M1} { complement( converse( X ) )
% 67.16/67.64 ==> join( composition( converse( converse( Y ) ), complement( converse(
% 67.16/67.64 composition( X, Y ) ) ) ), complement( converse( X ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145183) {G1,W15,D7,L1,V2,M1} { join( composition( Y, complement(
% 67.16/67.64 converse( composition( X, Y ) ) ) ), complement( converse( X ) ) ) ==>
% 67.16/67.64 complement( converse( X ) ) }.
% 67.16/67.64 parent0[0]: (145182) {G1,W15,D7,L1,V2,M1} { complement( converse( X ) )
% 67.16/67.64 ==> join( composition( Y, complement( converse( composition( X, Y ) ) ) )
% 67.16/67.64 , complement( converse( X ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (110) {G1,W15,D7,L1,V2,M1} P(9,10);d(7) { join( composition( X
% 67.16/67.64 , complement( converse( composition( Y, X ) ) ) ), complement( converse(
% 67.16/67.64 Y ) ) ) ==> complement( converse( Y ) ) }.
% 67.16/67.64 parent0: (145183) {G1,W15,D7,L1,V2,M1} { join( composition( Y, complement
% 67.16/67.64 ( converse( composition( X, Y ) ) ) ), complement( converse( X ) ) ) ==>
% 67.16/67.64 complement( converse( X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145184) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 67.16/67.64 composition( converse( X ), complement( composition( X, Y ) ) ),
% 67.16/67.64 complement( Y ) ) }.
% 67.16/67.64 parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 67.16/67.64 , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement(
% 67.16/67.64 Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145185) {G1,W13,D6,L1,V2,M1} { complement( X ) ==> join(
% 67.16/67.64 complement( X ), composition( converse( Y ), complement( composition( Y,
% 67.16/67.64 X ) ) ) ) }.
% 67.16/67.64 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.16/67.64 parent1[0; 3]: (145184) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 67.16/67.64 composition( converse( X ), complement( composition( X, Y ) ) ),
% 67.16/67.64 complement( Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := composition( converse( Y ), complement( composition( Y, X ) ) )
% 67.16/67.64 Y := complement( X )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145188) {G1,W13,D6,L1,V2,M1} { join( complement( X ), composition
% 67.16/67.64 ( converse( Y ), complement( composition( Y, X ) ) ) ) ==> complement( X
% 67.16/67.64 ) }.
% 67.16/67.64 parent0[0]: (145185) {G1,W13,D6,L1,V2,M1} { complement( X ) ==> join(
% 67.16/67.64 complement( X ), composition( converse( Y ), complement( composition( Y,
% 67.16/67.64 X ) ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (111) {G1,W13,D6,L1,V2,M1} P(10,0) { join( complement( Y ),
% 67.16/67.64 composition( converse( X ), complement( composition( X, Y ) ) ) ) ==>
% 67.16/67.64 complement( Y ) }.
% 67.16/67.64 parent0: (145188) {G1,W13,D6,L1,V2,M1} { join( complement( X ),
% 67.16/67.64 composition( converse( Y ), complement( composition( Y, X ) ) ) ) ==>
% 67.16/67.64 complement( X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145190) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 67.16/67.64 composition( converse( X ), complement( composition( X, Y ) ) ),
% 67.16/67.64 complement( Y ) ) }.
% 67.16/67.64 parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 67.16/67.64 , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement(
% 67.16/67.64 Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145191) {G1,W13,D7,L1,V2,M1} { complement( X ) ==> join(
% 67.16/67.64 composition( Y, complement( composition( converse( Y ), X ) ) ),
% 67.16/67.64 complement( X ) ) }.
% 67.16/67.64 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.16/67.64 parent1[0; 5]: (145190) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 67.16/67.64 composition( converse( X ), complement( composition( X, Y ) ) ),
% 67.16/67.64 complement( Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := converse( Y )
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145192) {G1,W13,D7,L1,V2,M1} { join( composition( Y, complement(
% 67.16/67.64 composition( converse( Y ), X ) ) ), complement( X ) ) ==> complement( X
% 67.16/67.64 ) }.
% 67.16/67.64 parent0[0]: (145191) {G1,W13,D7,L1,V2,M1} { complement( X ) ==> join(
% 67.16/67.64 composition( Y, complement( composition( converse( Y ), X ) ) ),
% 67.16/67.64 complement( X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (112) {G1,W13,D7,L1,V2,M1} P(7,10) { join( composition( X,
% 67.16/67.64 complement( composition( converse( X ), Y ) ) ), complement( Y ) ) ==>
% 67.16/67.64 complement( Y ) }.
% 67.16/67.64 parent0: (145192) {G1,W13,D7,L1,V2,M1} { join( composition( Y, complement
% 67.16/67.64 ( composition( converse( Y ), X ) ) ), complement( X ) ) ==> complement(
% 67.16/67.64 X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145194) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 67.16/67.64 composition( converse( X ), complement( composition( X, Y ) ) ),
% 67.16/67.64 complement( Y ) ) }.
% 67.16/67.64 parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 67.16/67.64 , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement(
% 67.16/67.64 Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145196) {G1,W11,D5,L1,V0,M1} { complement( top ) ==> join(
% 67.16/67.64 composition( converse( skol1 ), complement( skol1 ) ), complement( top )
% 67.16/67.64 ) }.
% 67.16/67.64 parent0[0]: (13) {G0,W5,D3,L1,V0,M1} I { composition( skol1, top ) ==>
% 67.16/67.64 skol1 }.
% 67.16/67.64 parent1[0; 8]: (145194) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 67.16/67.64 composition( converse( X ), complement( composition( X, Y ) ) ),
% 67.16/67.64 complement( Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := skol1
% 67.16/67.64 Y := top
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145198) {G2,W10,D5,L1,V0,M1} { complement( top ) ==> join(
% 67.16/67.64 composition( converse( skol1 ), complement( skol1 ) ), zero ) }.
% 67.16/67.64 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.64 zero }.
% 67.16/67.64 parent1[0; 9]: (145196) {G1,W11,D5,L1,V0,M1} { complement( top ) ==> join
% 67.16/67.64 ( composition( converse( skol1 ), complement( skol1 ) ), complement( top
% 67.16/67.64 ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145199) {G2,W9,D5,L1,V0,M1} { zero ==> join( composition(
% 67.16/67.64 converse( skol1 ), complement( skol1 ) ), zero ) }.
% 67.16/67.64 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.64 zero }.
% 67.16/67.64 parent1[0; 1]: (145198) {G2,W10,D5,L1,V0,M1} { complement( top ) ==> join
% 67.16/67.64 ( composition( converse( skol1 ), complement( skol1 ) ), zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145201) {G2,W9,D5,L1,V0,M1} { join( composition( converse( skol1
% 67.16/67.64 ), complement( skol1 ) ), zero ) ==> zero }.
% 67.16/67.64 parent0[0]: (145199) {G2,W9,D5,L1,V0,M1} { zero ==> join( composition(
% 67.16/67.64 converse( skol1 ), complement( skol1 ) ), zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (113) {G2,W9,D5,L1,V0,M1} P(13,10);d(77) { join( composition(
% 67.16/67.64 converse( skol1 ), complement( skol1 ) ), zero ) ==> zero }.
% 67.16/67.64 parent0: (145201) {G2,W9,D5,L1,V0,M1} { join( composition( converse( skol1
% 67.16/67.64 ), complement( skol1 ) ), zero ) ==> zero }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145204) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 67.16/67.64 composition( converse( X ), complement( composition( X, Y ) ) ),
% 67.16/67.64 complement( Y ) ) }.
% 67.16/67.64 parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 67.16/67.64 , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement(
% 67.16/67.64 Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145205) {G1,W11,D5,L1,V1,M1} { complement( one ) ==> join(
% 67.16/67.64 composition( converse( X ), complement( X ) ), complement( one ) ) }.
% 67.16/67.64 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 67.16/67.64 parent1[0; 8]: (145204) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 67.16/67.64 composition( converse( X ), complement( composition( X, Y ) ) ),
% 67.16/67.64 complement( Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := one
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145206) {G1,W11,D5,L1,V1,M1} { join( composition( converse( X ),
% 67.16/67.64 complement( X ) ), complement( one ) ) ==> complement( one ) }.
% 67.16/67.64 parent0[0]: (145205) {G1,W11,D5,L1,V1,M1} { complement( one ) ==> join(
% 67.16/67.64 composition( converse( X ), complement( X ) ), complement( one ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (114) {G1,W11,D5,L1,V1,M1} P(5,10) { join( composition(
% 67.16/67.64 converse( X ), complement( X ) ), complement( one ) ) ==> complement( one
% 67.16/67.64 ) }.
% 67.16/67.64 parent0: (145206) {G1,W11,D5,L1,V1,M1} { join( composition( converse( X )
% 67.16/67.64 , complement( X ) ), complement( one ) ) ==> complement( one ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145208) {G3,W6,D4,L1,V1,M1} { zero ==> meet( complement( X ), X )
% 67.16/67.64 }.
% 67.16/67.64 parent0[0]: (92) {G3,W6,D4,L1,V1,M1} S(74);d(77) { meet( complement( X ), X
% 67.16/67.64 ) ==> zero }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145209) {G3,W10,D5,L1,V1,M1} { zero ==> meet( meet( top, X ),
% 67.16/67.64 join( zero, complement( X ) ) ) }.
% 67.16/67.64 parent0[0]: (78) {G2,W9,D5,L1,V1,M1} P(77,3) { complement( join( zero,
% 67.16/67.64 complement( X ) ) ) ==> meet( top, X ) }.
% 67.16/67.64 parent1[0; 3]: (145208) {G3,W6,D4,L1,V1,M1} { zero ==> meet( complement( X
% 67.16/67.64 ), X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := join( zero, complement( X ) )
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145210) {G3,W10,D5,L1,V1,M1} { meet( meet( top, X ), join( zero,
% 67.16/67.64 complement( X ) ) ) ==> zero }.
% 67.16/67.64 parent0[0]: (145209) {G3,W10,D5,L1,V1,M1} { zero ==> meet( meet( top, X )
% 67.16/67.64 , join( zero, complement( X ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (121) {G4,W10,D5,L1,V1,M1} P(78,92) { meet( meet( top, X ),
% 67.16/67.64 join( zero, complement( X ) ) ) ==> zero }.
% 67.16/67.64 parent0: (145210) {G3,W10,D5,L1,V1,M1} { meet( meet( top, X ), join( zero
% 67.16/67.64 , complement( X ) ) ) ==> zero }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145212) {G2,W9,D5,L1,V1,M1} { meet( top, X ) ==> complement( join
% 67.16/67.64 ( zero, complement( X ) ) ) }.
% 67.16/67.64 parent0[0]: (78) {G2,W9,D5,L1,V1,M1} P(77,3) { complement( join( zero,
% 67.16/67.64 complement( X ) ) ) ==> meet( top, X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145213) {G2,W8,D4,L1,V0,M1} { meet( top, top ) ==> complement(
% 67.16/67.64 join( zero, zero ) ) }.
% 67.16/67.64 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.64 zero }.
% 67.16/67.64 parent1[0; 7]: (145212) {G2,W9,D5,L1,V1,M1} { meet( top, X ) ==>
% 67.16/67.64 complement( join( zero, complement( X ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := top
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145214) {G2,W8,D4,L1,V0,M1} { complement( join( zero, zero ) )
% 67.16/67.64 ==> meet( top, top ) }.
% 67.16/67.64 parent0[0]: (145213) {G2,W8,D4,L1,V0,M1} { meet( top, top ) ==> complement
% 67.16/67.64 ( join( zero, zero ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (122) {G3,W8,D4,L1,V0,M1} P(77,78) { complement( join( zero,
% 67.16/67.64 zero ) ) ==> meet( top, top ) }.
% 67.16/67.64 parent0: (145214) {G2,W8,D4,L1,V0,M1} { complement( join( zero, zero ) )
% 67.16/67.64 ==> meet( top, top ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145216) {G1,W6,D4,L1,V1,M1} { top ==> join( complement( X ), X )
% 67.16/67.64 }.
% 67.16/67.64 parent0[0]: (15) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X )
% 67.16/67.64 ==> top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145218) {G2,W10,D5,L1,V1,M1} { top ==> join( meet( top, X ),
% 67.16/67.64 join( zero, complement( X ) ) ) }.
% 67.16/67.64 parent0[0]: (78) {G2,W9,D5,L1,V1,M1} P(77,3) { complement( join( zero,
% 67.16/67.64 complement( X ) ) ) ==> meet( top, X ) }.
% 67.16/67.64 parent1[0; 3]: (145216) {G1,W6,D4,L1,V1,M1} { top ==> join( complement( X
% 67.16/67.64 ), X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := join( zero, complement( X ) )
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145219) {G1,W10,D5,L1,V1,M1} { top ==> join( join( meet( top, X
% 67.16/67.64 ), zero ), complement( X ) ) }.
% 67.16/67.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.16/67.64 join( X, Y ), Z ) }.
% 67.16/67.64 parent1[0; 2]: (145218) {G2,W10,D5,L1,V1,M1} { top ==> join( meet( top, X
% 67.16/67.64 ), join( zero, complement( X ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := meet( top, X )
% 67.16/67.64 Y := zero
% 67.16/67.64 Z := complement( X )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145220) {G1,W10,D5,L1,V1,M1} { join( join( meet( top, X ), zero )
% 67.16/67.64 , complement( X ) ) ==> top }.
% 67.16/67.64 parent0[0]: (145219) {G1,W10,D5,L1,V1,M1} { top ==> join( join( meet( top
% 67.16/67.64 , X ), zero ), complement( X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (131) {G3,W10,D5,L1,V1,M1} P(78,15);d(1) { join( join( meet(
% 67.16/67.64 top, X ), zero ), complement( X ) ) ==> top }.
% 67.16/67.64 parent0: (145220) {G1,W10,D5,L1,V1,M1} { join( join( meet( top, X ), zero
% 67.16/67.64 ), complement( X ) ) ==> top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145221) {G0,W24,D6,L1,V0,M1} { ! composition( meet( skol2,
% 67.16/67.64 converse( skol1 ) ), meet( skol1, skol3 ) ) ==> join( composition( meet(
% 67.16/67.64 skol2, converse( skol1 ) ), skol3 ), composition( meet( skol2, converse(
% 67.16/67.64 skol1 ) ), meet( skol1, skol3 ) ) ) }.
% 67.16/67.64 parent0[0]: (14) {G0,W24,D6,L1,V0,M1} I { ! join( composition( meet( skol2
% 67.16/67.64 , converse( skol1 ) ), skol3 ), composition( meet( skol2, converse( skol1
% 67.16/67.64 ) ), meet( skol1, skol3 ) ) ) ==> composition( meet( skol2, converse(
% 67.16/67.64 skol1 ) ), meet( skol1, skol3 ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145222) {G1,W24,D6,L1,V0,M1} { ! composition( meet( skol2,
% 67.16/67.64 converse( skol1 ) ), meet( skol1, skol3 ) ) ==> join( composition( meet(
% 67.16/67.64 skol2, converse( skol1 ) ), meet( skol1, skol3 ) ), composition( meet(
% 67.16/67.64 skol2, converse( skol1 ) ), skol3 ) ) }.
% 67.16/67.64 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.16/67.64 parent1[0; 10]: (145221) {G0,W24,D6,L1,V0,M1} { ! composition( meet( skol2
% 67.16/67.64 , converse( skol1 ) ), meet( skol1, skol3 ) ) ==> join( composition( meet
% 67.16/67.64 ( skol2, converse( skol1 ) ), skol3 ), composition( meet( skol2, converse
% 67.16/67.64 ( skol1 ) ), meet( skol1, skol3 ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := composition( meet( skol2, converse( skol1 ) ), skol3 )
% 67.16/67.64 Y := composition( meet( skol2, converse( skol1 ) ), meet( skol1, skol3 )
% 67.16/67.64 )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145225) {G1,W24,D6,L1,V0,M1} { ! join( composition( meet( skol2,
% 67.16/67.64 converse( skol1 ) ), meet( skol1, skol3 ) ), composition( meet( skol2,
% 67.16/67.64 converse( skol1 ) ), skol3 ) ) ==> composition( meet( skol2, converse(
% 67.16/67.64 skol1 ) ), meet( skol1, skol3 ) ) }.
% 67.16/67.64 parent0[0]: (145222) {G1,W24,D6,L1,V0,M1} { ! composition( meet( skol2,
% 67.16/67.64 converse( skol1 ) ), meet( skol1, skol3 ) ) ==> join( composition( meet(
% 67.16/67.64 skol2, converse( skol1 ) ), meet( skol1, skol3 ) ), composition( meet(
% 67.16/67.64 skol2, converse( skol1 ) ), skol3 ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (134) {G1,W24,D6,L1,V0,M1} P(0,14) { ! join( composition( meet
% 67.16/67.64 ( skol2, converse( skol1 ) ), meet( skol1, skol3 ) ), composition( meet(
% 67.16/67.64 skol2, converse( skol1 ) ), skol3 ) ) ==> composition( meet( skol2,
% 67.16/67.64 converse( skol1 ) ), meet( skol1, skol3 ) ) }.
% 67.16/67.64 parent0: (145225) {G1,W24,D6,L1,V0,M1} { ! join( composition( meet( skol2
% 67.16/67.64 , converse( skol1 ) ), meet( skol1, skol3 ) ), composition( meet( skol2,
% 67.16/67.64 converse( skol1 ) ), skol3 ) ) ==> composition( meet( skol2, converse(
% 67.16/67.64 skol1 ) ), meet( skol1, skol3 ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145227) {G1,W6,D4,L1,V1,M1} { top ==> join( complement( X ), X )
% 67.16/67.64 }.
% 67.16/67.64 parent0[0]: (15) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X )
% 67.16/67.64 ==> top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145229) {G2,W9,D4,L1,V0,M1} { top ==> join( meet( top, top ),
% 67.16/67.64 join( zero, zero ) ) }.
% 67.16/67.64 parent0[0]: (122) {G3,W8,D4,L1,V0,M1} P(77,78) { complement( join( zero,
% 67.16/67.64 zero ) ) ==> meet( top, top ) }.
% 67.16/67.64 parent1[0; 3]: (145227) {G1,W6,D4,L1,V1,M1} { top ==> join( complement( X
% 67.16/67.64 ), X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := join( zero, zero )
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145230) {G1,W9,D5,L1,V0,M1} { top ==> join( join( meet( top, top
% 67.16/67.64 ), zero ), zero ) }.
% 67.16/67.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.16/67.64 join( X, Y ), Z ) }.
% 67.16/67.64 parent1[0; 2]: (145229) {G2,W9,D4,L1,V0,M1} { top ==> join( meet( top, top
% 67.16/67.64 ), join( zero, zero ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := meet( top, top )
% 67.16/67.64 Y := zero
% 67.16/67.64 Z := zero
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145231) {G1,W9,D5,L1,V0,M1} { join( join( meet( top, top ), zero
% 67.16/67.64 ), zero ) ==> top }.
% 67.16/67.64 parent0[0]: (145230) {G1,W9,D5,L1,V0,M1} { top ==> join( join( meet( top,
% 67.16/67.64 top ), zero ), zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (141) {G4,W9,D5,L1,V0,M1} P(122,15);d(1) { join( join( meet(
% 67.16/67.64 top, top ), zero ), zero ) ==> top }.
% 67.16/67.64 parent0: (145231) {G1,W9,D5,L1,V0,M1} { join( join( meet( top, top ), zero
% 67.16/67.64 ), zero ) ==> top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145233) {G3,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join( X,
% 67.16/67.64 zero ), top ) }.
% 67.16/67.64 parent0[0]: (80) {G3,W9,D4,L1,V1,M1} P(77,28) { join( join( X, zero ), top
% 67.16/67.64 ) ==> join( X, top ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145235) {G4,W11,D5,L1,V0,M1} { join( join( meet( top, top ),
% 67.16/67.64 zero ), top ) ==> join( top, top ) }.
% 67.16/67.64 parent0[0]: (141) {G4,W9,D5,L1,V0,M1} P(122,15);d(1) { join( join( meet(
% 67.16/67.64 top, top ), zero ), zero ) ==> top }.
% 67.16/67.64 parent1[0; 9]: (145233) {G3,W9,D4,L1,V1,M1} { join( X, top ) ==> join(
% 67.16/67.64 join( X, zero ), top ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := join( meet( top, top ), zero )
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145236) {G4,W9,D4,L1,V0,M1} { join( meet( top, top ), top ) ==>
% 67.16/67.64 join( top, top ) }.
% 67.16/67.64 parent0[0]: (80) {G3,W9,D4,L1,V1,M1} P(77,28) { join( join( X, zero ), top
% 67.16/67.64 ) ==> join( X, top ) }.
% 67.16/67.64 parent1[0; 1]: (145235) {G4,W11,D5,L1,V0,M1} { join( join( meet( top, top
% 67.16/67.64 ), zero ), top ) ==> join( top, top ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := meet( top, top )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (165) {G5,W9,D4,L1,V0,M1} P(141,80);d(80) { join( meet( top,
% 67.16/67.64 top ), top ) ==> join( top, top ) }.
% 67.16/67.64 parent0: (145236) {G4,W9,D4,L1,V0,M1} { join( meet( top, top ), top ) ==>
% 67.16/67.64 join( top, top ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145239) {G1,W10,D5,L1,V2,M1} { composition( converse( Y ), X )
% 67.16/67.64 ==> converse( composition( converse( X ), Y ) ) }.
% 67.16/67.64 parent0[0]: (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition(
% 67.16/67.64 converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145242) {G1,W8,D4,L1,V1,M1} { composition( converse( one ), X )
% 67.16/67.64 ==> converse( converse( X ) ) }.
% 67.16/67.64 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 67.16/67.64 parent1[0; 6]: (145239) {G1,W10,D5,L1,V2,M1} { composition( converse( Y )
% 67.16/67.64 , X ) ==> converse( composition( converse( X ), Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := converse( X )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := one
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145243) {G1,W6,D4,L1,V1,M1} { composition( converse( one ), X )
% 67.16/67.64 ==> X }.
% 67.16/67.64 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.16/67.64 parent1[0; 5]: (145242) {G1,W8,D4,L1,V1,M1} { composition( converse( one )
% 67.16/67.64 , X ) ==> converse( converse( X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (180) {G2,W6,D4,L1,V1,M1} P(5,17);d(7) { composition( converse
% 67.16/67.64 ( one ), X ) ==> X }.
% 67.16/67.64 parent0: (145243) {G1,W6,D4,L1,V1,M1} { composition( converse( one ), X )
% 67.16/67.64 ==> X }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145245) {G2,W6,D4,L1,V1,M1} { X ==> composition( converse( one )
% 67.16/67.64 , X ) }.
% 67.16/67.64 parent0[0]: (180) {G2,W6,D4,L1,V1,M1} P(5,17);d(7) { composition( converse
% 67.16/67.64 ( one ), X ) ==> X }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145247) {G1,W4,D3,L1,V0,M1} { one ==> converse( one ) }.
% 67.16/67.64 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 67.16/67.64 parent1[0; 2]: (145245) {G2,W6,D4,L1,V1,M1} { X ==> composition( converse
% 67.16/67.64 ( one ), X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := converse( one )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := one
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145248) {G1,W4,D3,L1,V0,M1} { converse( one ) ==> one }.
% 67.16/67.64 parent0[0]: (145247) {G1,W4,D3,L1,V0,M1} { one ==> converse( one ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (186) {G3,W4,D3,L1,V0,M1} P(180,5) { converse( one ) ==> one
% 67.16/67.64 }.
% 67.16/67.64 parent0: (145248) {G1,W4,D3,L1,V0,M1} { converse( one ) ==> one }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145250) {G2,W6,D4,L1,V1,M1} { X ==> composition( converse( one )
% 67.16/67.64 , X ) }.
% 67.16/67.64 parent0[0]: (180) {G2,W6,D4,L1,V1,M1} P(5,17);d(7) { composition( converse
% 67.16/67.64 ( one ), X ) ==> X }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145251) {G3,W5,D3,L1,V1,M1} { X ==> composition( one, X ) }.
% 67.16/67.64 parent0[0]: (186) {G3,W4,D3,L1,V0,M1} P(180,5) { converse( one ) ==> one
% 67.16/67.64 }.
% 67.16/67.64 parent1[0; 3]: (145250) {G2,W6,D4,L1,V1,M1} { X ==> composition( converse
% 67.16/67.64 ( one ), X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145252) {G3,W5,D3,L1,V1,M1} { composition( one, X ) ==> X }.
% 67.16/67.64 parent0[0]: (145251) {G3,W5,D3,L1,V1,M1} { X ==> composition( one, X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (187) {G4,W5,D3,L1,V1,M1} P(186,180) { composition( one, X )
% 67.16/67.64 ==> X }.
% 67.16/67.64 parent0: (145252) {G3,W5,D3,L1,V1,M1} { composition( one, X ) ==> X }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145254) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) ) ==>
% 67.16/67.64 converse( join( converse( X ), Y ) ) }.
% 67.16/67.64 parent0[0]: (19) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 67.16/67.64 ), Y ) ) ==> join( X, converse( Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145256) {G2,W9,D4,L1,V1,M1} { join( one, converse( X ) ) ==>
% 67.16/67.64 converse( join( one, X ) ) }.
% 67.16/67.64 parent0[0]: (186) {G3,W4,D3,L1,V0,M1} P(180,5) { converse( one ) ==> one
% 67.16/67.64 }.
% 67.16/67.64 parent1[0; 7]: (145254) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) )
% 67.16/67.64 ==> converse( join( converse( X ), Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := one
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (189) {G4,W9,D4,L1,V1,M1} P(186,19) { join( one, converse( X )
% 67.16/67.64 ) ==> converse( join( one, X ) ) }.
% 67.16/67.64 parent0: (145256) {G2,W9,D4,L1,V1,M1} { join( one, converse( X ) ) ==>
% 67.16/67.64 converse( join( one, X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145260) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) ==> join
% 67.16/67.64 ( converse( X ), converse( Y ) ) }.
% 67.16/67.64 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 67.16/67.64 ) ==> converse( join( X, Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145262) {G1,W9,D4,L1,V1,M1} { converse( join( X, one ) ) ==>
% 67.16/67.64 join( converse( X ), one ) }.
% 67.16/67.64 parent0[0]: (186) {G3,W4,D3,L1,V0,M1} P(180,5) { converse( one ) ==> one
% 67.16/67.64 }.
% 67.16/67.64 parent1[0; 8]: (145260) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) )
% 67.16/67.64 ==> join( converse( X ), converse( Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := one
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145264) {G1,W9,D4,L1,V1,M1} { join( converse( X ), one ) ==>
% 67.16/67.64 converse( join( X, one ) ) }.
% 67.16/67.64 parent0[0]: (145262) {G1,W9,D4,L1,V1,M1} { converse( join( X, one ) ) ==>
% 67.16/67.64 join( converse( X ), one ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (190) {G4,W9,D4,L1,V1,M1} P(186,8) { join( converse( X ), one
% 67.16/67.64 ) ==> converse( join( X, one ) ) }.
% 67.16/67.64 parent0: (145264) {G1,W9,D4,L1,V1,M1} { join( converse( X ), one ) ==>
% 67.16/67.64 converse( join( X, one ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145266) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 67.16/67.64 composition( converse( X ), complement( composition( X, Y ) ) ),
% 67.16/67.64 complement( Y ) ) }.
% 67.16/67.64 parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 67.16/67.64 , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement(
% 67.16/67.64 Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145268) {G1,W11,D5,L1,V1,M1} { complement( X ) ==> join(
% 67.16/67.64 composition( converse( one ), complement( X ) ), complement( X ) ) }.
% 67.16/67.64 parent0[0]: (187) {G4,W5,D3,L1,V1,M1} P(186,180) { composition( one, X )
% 67.16/67.64 ==> X }.
% 67.16/67.64 parent1[0; 8]: (145266) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 67.16/67.64 composition( converse( X ), complement( composition( X, Y ) ) ),
% 67.16/67.64 complement( Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := one
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145269) {G2,W8,D4,L1,V1,M1} { complement( X ) ==> join(
% 67.16/67.64 complement( X ), complement( X ) ) }.
% 67.16/67.64 parent0[0]: (180) {G2,W6,D4,L1,V1,M1} P(5,17);d(7) { composition( converse
% 67.16/67.64 ( one ), X ) ==> X }.
% 67.16/67.64 parent1[0; 4]: (145268) {G1,W11,D5,L1,V1,M1} { complement( X ) ==> join(
% 67.16/67.64 composition( converse( one ), complement( X ) ), complement( X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := complement( X )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145270) {G2,W8,D4,L1,V1,M1} { join( complement( X ), complement(
% 67.16/67.64 X ) ) ==> complement( X ) }.
% 67.16/67.64 parent0[0]: (145269) {G2,W8,D4,L1,V1,M1} { complement( X ) ==> join(
% 67.16/67.64 complement( X ), complement( X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (191) {G5,W8,D4,L1,V1,M1} P(187,10);d(180) { join( complement
% 67.16/67.64 ( X ), complement( X ) ) ==> complement( X ) }.
% 67.16/67.64 parent0: (145270) {G2,W8,D4,L1,V1,M1} { join( complement( X ), complement
% 67.16/67.64 ( X ) ) ==> complement( X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145272) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ), Y ) ==>
% 67.16/67.64 join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.16/67.64 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 67.16/67.64 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Z
% 67.16/67.64 Z := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145273) {G1,W11,D4,L1,V2,M1} { composition( join( one, X ), Y )
% 67.16/67.64 ==> join( Y, composition( X, Y ) ) }.
% 67.16/67.64 parent0[0]: (187) {G4,W5,D3,L1,V1,M1} P(186,180) { composition( one, X )
% 67.16/67.64 ==> X }.
% 67.16/67.64 parent1[0; 7]: (145272) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ),
% 67.16/67.64 Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := one
% 67.16/67.64 Y := Y
% 67.16/67.64 Z := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145275) {G1,W11,D4,L1,V2,M1} { join( Y, composition( X, Y ) ) ==>
% 67.16/67.64 composition( join( one, X ), Y ) }.
% 67.16/67.64 parent0[0]: (145273) {G1,W11,D4,L1,V2,M1} { composition( join( one, X ), Y
% 67.16/67.64 ) ==> join( Y, composition( X, Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (192) {G5,W11,D4,L1,V2,M1} P(187,6) { join( X, composition( Y
% 67.16/67.64 , X ) ) = composition( join( one, Y ), X ) }.
% 67.16/67.64 parent0: (145275) {G1,W11,D4,L1,V2,M1} { join( Y, composition( X, Y ) )
% 67.16/67.64 ==> composition( join( one, X ), Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145278) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ), Y ) ==>
% 67.16/67.64 join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.16/67.64 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 67.16/67.64 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Z
% 67.16/67.64 Z := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145280) {G1,W11,D4,L1,V2,M1} { composition( join( X, one ), Y )
% 67.16/67.64 ==> join( composition( X, Y ), Y ) }.
% 67.16/67.64 parent0[0]: (187) {G4,W5,D3,L1,V1,M1} P(186,180) { composition( one, X )
% 67.16/67.64 ==> X }.
% 67.16/67.64 parent1[0; 10]: (145278) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z )
% 67.16/67.64 , Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 Z := one
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145282) {G1,W11,D4,L1,V2,M1} { join( composition( X, Y ), Y ) ==>
% 67.16/67.64 composition( join( X, one ), Y ) }.
% 67.16/67.64 parent0[0]: (145280) {G1,W11,D4,L1,V2,M1} { composition( join( X, one ), Y
% 67.16/67.64 ) ==> join( composition( X, Y ), Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (193) {G5,W11,D4,L1,V2,M1} P(187,6) { join( composition( Y, X
% 67.16/67.64 ), X ) = composition( join( Y, one ), X ) }.
% 67.16/67.64 parent0: (145282) {G1,W11,D4,L1,V2,M1} { join( composition( X, Y ), Y )
% 67.16/67.64 ==> composition( join( X, one ), Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145284) {G5,W8,D4,L1,V1,M1} { complement( X ) ==> join(
% 67.16/67.64 complement( X ), complement( X ) ) }.
% 67.16/67.64 parent0[0]: (191) {G5,W8,D4,L1,V1,M1} P(187,10);d(180) { join( complement(
% 67.16/67.64 X ), complement( X ) ) ==> complement( X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145287) {G2,W7,D4,L1,V0,M1} { complement( top ) ==> join(
% 67.16/67.64 complement( top ), zero ) }.
% 67.16/67.64 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.64 zero }.
% 67.16/67.64 parent1[0; 6]: (145284) {G5,W8,D4,L1,V1,M1} { complement( X ) ==> join(
% 67.16/67.64 complement( X ), complement( X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := top
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145289) {G2,W6,D3,L1,V0,M1} { complement( top ) ==> join( zero,
% 67.16/67.64 zero ) }.
% 67.16/67.64 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.64 zero }.
% 67.16/67.64 parent1[0; 4]: (145287) {G2,W7,D4,L1,V0,M1} { complement( top ) ==> join(
% 67.16/67.64 complement( top ), zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145290) {G2,W5,D3,L1,V0,M1} { zero ==> join( zero, zero ) }.
% 67.16/67.64 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.64 zero }.
% 67.16/67.64 parent1[0; 1]: (145289) {G2,W6,D3,L1,V0,M1} { complement( top ) ==> join(
% 67.16/67.64 zero, zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145296) {G2,W5,D3,L1,V0,M1} { join( zero, zero ) ==> zero }.
% 67.16/67.64 parent0[0]: (145290) {G2,W5,D3,L1,V0,M1} { zero ==> join( zero, zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (196) {G6,W5,D3,L1,V0,M1} P(77,191) { join( zero, zero ) ==>
% 67.16/67.64 zero }.
% 67.16/67.64 parent0: (145296) {G2,W5,D3,L1,V0,M1} { join( zero, zero ) ==> zero }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145300) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 67.16/67.64 ( complement( X ), complement( Y ) ) ) }.
% 67.16/67.64 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 67.16/67.64 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145315) {G1,W7,D4,L1,V1,M1} { meet( X, X ) ==> complement(
% 67.16/67.64 complement( X ) ) }.
% 67.16/67.64 parent0[0]: (191) {G5,W8,D4,L1,V1,M1} P(187,10);d(180) { join( complement(
% 67.16/67.64 X ), complement( X ) ) ==> complement( X ) }.
% 67.16/67.64 parent1[0; 5]: (145300) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 67.16/67.64 ( join( complement( X ), complement( Y ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145316) {G1,W7,D4,L1,V1,M1} { complement( complement( X ) ) ==>
% 67.16/67.64 meet( X, X ) }.
% 67.16/67.64 parent0[0]: (145315) {G1,W7,D4,L1,V1,M1} { meet( X, X ) ==> complement(
% 67.16/67.64 complement( X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (197) {G6,W7,D4,L1,V1,M1} P(191,3) { complement( complement( X
% 67.16/67.64 ) ) = meet( X, X ) }.
% 67.16/67.64 parent0: (145316) {G1,W7,D4,L1,V1,M1} { complement( complement( X ) ) ==>
% 67.16/67.64 meet( X, X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145318) {G2,W10,D5,L1,V2,M1} { join( X, top ) ==> join( join( X,
% 67.16/67.64 complement( Y ) ), Y ) }.
% 67.16/67.64 parent0[0]: (28) {G2,W10,D5,L1,V2,M1} P(15,1) { join( join( Y, complement(
% 67.16/67.64 X ) ), X ) ==> join( Y, top ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145320) {G3,W9,D4,L1,V1,M1} { join( complement( X ), top ) ==>
% 67.16/67.64 join( complement( X ), X ) }.
% 67.16/67.64 parent0[0]: (191) {G5,W8,D4,L1,V1,M1} P(187,10);d(180) { join( complement(
% 67.16/67.64 X ), complement( X ) ) ==> complement( X ) }.
% 67.16/67.64 parent1[0; 6]: (145318) {G2,W10,D5,L1,V2,M1} { join( X, top ) ==> join(
% 67.16/67.64 join( X, complement( Y ) ), Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := complement( X )
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145321) {G2,W6,D4,L1,V1,M1} { join( complement( X ), top ) ==>
% 67.16/67.64 top }.
% 67.16/67.64 parent0[0]: (15) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X )
% 67.16/67.64 ==> top }.
% 67.16/67.64 parent1[0; 5]: (145320) {G3,W9,D4,L1,V1,M1} { join( complement( X ), top )
% 67.16/67.64 ==> join( complement( X ), X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (199) {G6,W6,D4,L1,V1,M1} P(191,28);d(15) { join( complement(
% 67.16/67.64 X ), top ) ==> top }.
% 67.16/67.64 parent0: (145321) {G2,W6,D4,L1,V1,M1} { join( complement( X ), top ) ==>
% 67.16/67.64 top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145324) {G3,W8,D4,L1,V0,M1} { meet( top, top ) ==> complement(
% 67.16/67.64 join( zero, zero ) ) }.
% 67.16/67.64 parent0[0]: (122) {G3,W8,D4,L1,V0,M1} P(77,78) { complement( join( zero,
% 67.16/67.64 zero ) ) ==> meet( top, top ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145325) {G4,W6,D3,L1,V0,M1} { meet( top, top ) ==> complement(
% 67.16/67.64 zero ) }.
% 67.16/67.64 parent0[0]: (196) {G6,W5,D3,L1,V0,M1} P(77,191) { join( zero, zero ) ==>
% 67.16/67.64 zero }.
% 67.16/67.64 parent1[0; 5]: (145324) {G3,W8,D4,L1,V0,M1} { meet( top, top ) ==>
% 67.16/67.64 complement( join( zero, zero ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (207) {G7,W6,D3,L1,V0,M1} P(196,122) { meet( top, top ) ==>
% 67.16/67.64 complement( zero ) }.
% 67.16/67.64 parent0: (145325) {G4,W6,D3,L1,V0,M1} { meet( top, top ) ==> complement(
% 67.16/67.64 zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145328) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 67.16/67.64 X, join( Y, Z ) ) }.
% 67.16/67.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.16/67.64 join( X, Y ), Z ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 Z := Z
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145330) {G1,W9,D4,L1,V1,M1} { join( join( X, zero ), zero ) ==>
% 67.16/67.64 join( X, zero ) }.
% 67.16/67.64 parent0[0]: (196) {G6,W5,D3,L1,V0,M1} P(77,191) { join( zero, zero ) ==>
% 67.16/67.64 zero }.
% 67.16/67.64 parent1[0; 8]: (145328) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 67.16/67.64 join( X, join( Y, Z ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := zero
% 67.16/67.64 Z := zero
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (208) {G7,W9,D4,L1,V1,M1} P(196,1) { join( join( X, zero ),
% 67.16/67.64 zero ) ==> join( X, zero ) }.
% 67.16/67.64 parent0: (145330) {G1,W9,D4,L1,V1,M1} { join( join( X, zero ), zero ) ==>
% 67.16/67.64 join( X, zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145334) {G5,W9,D4,L1,V0,M1} { join( top, top ) ==> join( meet(
% 67.16/67.64 top, top ), top ) }.
% 67.16/67.64 parent0[0]: (165) {G5,W9,D4,L1,V0,M1} P(141,80);d(80) { join( meet( top,
% 67.16/67.64 top ), top ) ==> join( top, top ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145336) {G6,W8,D4,L1,V0,M1} { join( top, top ) ==> join(
% 67.16/67.64 complement( zero ), top ) }.
% 67.16/67.64 parent0[0]: (207) {G7,W6,D3,L1,V0,M1} P(196,122) { meet( top, top ) ==>
% 67.16/67.64 complement( zero ) }.
% 67.16/67.64 parent1[0; 5]: (145334) {G5,W9,D4,L1,V0,M1} { join( top, top ) ==> join(
% 67.16/67.64 meet( top, top ), top ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145337) {G7,W5,D3,L1,V0,M1} { join( top, top ) ==> top }.
% 67.16/67.64 parent0[0]: (199) {G6,W6,D4,L1,V1,M1} P(191,28);d(15) { join( complement( X
% 67.16/67.64 ), top ) ==> top }.
% 67.16/67.64 parent1[0; 4]: (145336) {G6,W8,D4,L1,V0,M1} { join( top, top ) ==> join(
% 67.16/67.64 complement( zero ), top ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := zero
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (209) {G8,W5,D3,L1,V0,M1} P(207,165);d(199) { join( top, top )
% 67.16/67.64 ==> top }.
% 67.16/67.64 parent0: (145337) {G7,W5,D3,L1,V0,M1} { join( top, top ) ==> top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145340) {G2,W10,D5,L1,V2,M1} { join( Y, top ) ==> join( join(
% 67.16/67.64 complement( X ), Y ), X ) }.
% 67.16/67.64 parent0[0]: (36) {G2,W10,D5,L1,V2,M1} P(31,0);d(1) { join( join( complement
% 67.16/67.64 ( Y ), X ), Y ) ==> join( X, top ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145343) {G3,W7,D3,L1,V1,M1} { join( top, top ) ==> join( top, X
% 67.16/67.64 ) }.
% 67.16/67.64 parent0[0]: (199) {G6,W6,D4,L1,V1,M1} P(191,28);d(15) { join( complement( X
% 67.16/67.64 ), top ) ==> top }.
% 67.16/67.64 parent1[0; 5]: (145340) {G2,W10,D5,L1,V2,M1} { join( Y, top ) ==> join(
% 67.16/67.64 join( complement( X ), Y ), X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := top
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145344) {G4,W5,D3,L1,V1,M1} { top ==> join( top, X ) }.
% 67.16/67.64 parent0[0]: (209) {G8,W5,D3,L1,V0,M1} P(207,165);d(199) { join( top, top )
% 67.16/67.64 ==> top }.
% 67.16/67.64 parent1[0; 1]: (145343) {G3,W7,D3,L1,V1,M1} { join( top, top ) ==> join(
% 67.16/67.64 top, X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145345) {G4,W5,D3,L1,V1,M1} { join( top, X ) ==> top }.
% 67.16/67.64 parent0[0]: (145344) {G4,W5,D3,L1,V1,M1} { top ==> join( top, X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (214) {G9,W5,D3,L1,V1,M1} P(199,36);d(209) { join( top, X )
% 67.16/67.64 ==> top }.
% 67.16/67.64 parent0: (145345) {G4,W5,D3,L1,V1,M1} { join( top, X ) ==> top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145347) {G2,W10,D4,L1,V2,M1} { join( Y, top ) ==> join( join( X,
% 67.16/67.64 Y ), complement( X ) ) }.
% 67.16/67.64 parent0[0]: (37) {G2,W10,D4,L1,V2,M1} P(0,31) { join( join( Y, X ),
% 67.16/67.64 complement( Y ) ) ==> join( X, top ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145351) {G3,W9,D5,L1,V1,M1} { join( top, top ) ==> join( top,
% 67.16/67.64 complement( complement( X ) ) ) }.
% 67.16/67.64 parent0[0]: (199) {G6,W6,D4,L1,V1,M1} P(191,28);d(15) { join( complement( X
% 67.16/67.64 ), top ) ==> top }.
% 67.16/67.64 parent1[0; 5]: (145347) {G2,W10,D4,L1,V2,M1} { join( Y, top ) ==> join(
% 67.16/67.64 join( X, Y ), complement( X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := complement( X )
% 67.16/67.64 Y := top
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145352) {G3,W7,D3,L1,V1,M1} { join( top, top ) ==> join( X, top
% 67.16/67.64 ) }.
% 67.16/67.64 parent0[0]: (38) {G2,W9,D5,L1,V1,M1} P(11,31) { join( top, complement(
% 67.16/67.64 complement( X ) ) ) ==> join( X, top ) }.
% 67.16/67.64 parent1[0; 4]: (145351) {G3,W9,D5,L1,V1,M1} { join( top, top ) ==> join(
% 67.16/67.64 top, complement( complement( X ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145353) {G4,W5,D3,L1,V1,M1} { top ==> join( X, top ) }.
% 67.16/67.64 parent0[0]: (209) {G8,W5,D3,L1,V0,M1} P(207,165);d(199) { join( top, top )
% 67.16/67.64 ==> top }.
% 67.16/67.64 parent1[0; 1]: (145352) {G3,W7,D3,L1,V1,M1} { join( top, top ) ==> join( X
% 67.16/67.64 , top ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145354) {G4,W5,D3,L1,V1,M1} { join( X, top ) ==> top }.
% 67.16/67.64 parent0[0]: (145353) {G4,W5,D3,L1,V1,M1} { top ==> join( X, top ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (215) {G9,W5,D3,L1,V1,M1} P(199,37);d(38);d(209) { join( X,
% 67.16/67.64 top ) ==> top }.
% 67.16/67.64 parent0: (145354) {G4,W5,D3,L1,V1,M1} { join( X, top ) ==> top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145355) {G0,W5,D4,L1,V1,M1} { X ==> converse( converse( X ) ) }.
% 67.16/67.64 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145357) {G1,W13,D6,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 67.16/67.64 converse( converse( join( join( Y, X ), Z ) ) ) }.
% 67.16/67.64 parent0[0]: (21) {G2,W13,D5,L1,V3,M1} P(18,8);d(8) { converse( join( join(
% 67.16/67.64 Y, X ), Z ) ) = converse( join( join( X, Y ), Z ) ) }.
% 67.16/67.64 parent1[0; 7]: (145355) {G0,W5,D4,L1,V1,M1} { X ==> converse( converse( X
% 67.16/67.64 ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := X
% 67.16/67.64 Z := Z
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := join( join( X, Y ), Z )
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145359) {G1,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join
% 67.16/67.64 ( join( Y, X ), Z ) }.
% 67.16/67.64 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.16/67.64 parent1[0; 6]: (145357) {G1,W13,D6,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 67.16/67.64 converse( converse( join( join( Y, X ), Z ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := join( join( Y, X ), Z )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 Z := Z
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (221) {G3,W11,D4,L1,V3,M1} P(21,7);d(7) { join( join( Y, X ),
% 67.16/67.64 Z ) = join( join( X, Y ), Z ) }.
% 67.16/67.64 parent0: (145359) {G1,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join
% 67.16/67.64 ( join( Y, X ), Z ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := X
% 67.16/67.64 Z := Z
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145360) {G9,W5,D3,L1,V1,M1} { top ==> join( top, X ) }.
% 67.16/67.64 parent0[0]: (214) {G9,W5,D3,L1,V1,M1} P(199,36);d(209) { join( top, X ) ==>
% 67.16/67.64 top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145362) {G3,W4,D3,L1,V0,M1} { top ==> converse( top ) }.
% 67.16/67.64 parent0[0]: (59) {G2,W9,D6,L1,V1,M1} P(11,19) { join( X, converse(
% 67.16/67.64 complement( converse( X ) ) ) ) ==> converse( top ) }.
% 67.16/67.64 parent1[0; 2]: (145360) {G9,W5,D3,L1,V1,M1} { top ==> join( top, X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := top
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := converse( complement( converse( top ) ) )
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145363) {G3,W4,D3,L1,V0,M1} { converse( top ) ==> top }.
% 67.16/67.64 parent0[0]: (145362) {G3,W4,D3,L1,V0,M1} { top ==> converse( top ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (223) {G10,W4,D3,L1,V0,M1} P(214,59) { converse( top ) ==> top
% 67.16/67.64 }.
% 67.16/67.64 parent0: (145363) {G3,W4,D3,L1,V0,M1} { converse( top ) ==> top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145365) {G1,W10,D5,L1,V2,M1} { composition( converse( Y ), X )
% 67.16/67.64 ==> converse( composition( converse( X ), Y ) ) }.
% 67.16/67.64 parent0[0]: (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition(
% 67.16/67.64 converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145367) {G2,W9,D4,L1,V1,M1} { composition( converse( X ), top )
% 67.16/67.64 ==> converse( composition( top, X ) ) }.
% 67.16/67.64 parent0[0]: (223) {G10,W4,D3,L1,V0,M1} P(214,59) { converse( top ) ==> top
% 67.16/67.64 }.
% 67.16/67.64 parent1[0; 7]: (145365) {G1,W10,D5,L1,V2,M1} { composition( converse( Y )
% 67.16/67.64 , X ) ==> converse( composition( converse( X ), Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := top
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (224) {G11,W9,D4,L1,V1,M1} P(223,17) { composition( converse(
% 67.16/67.64 X ), top ) ==> converse( composition( top, X ) ) }.
% 67.16/67.64 parent0: (145367) {G2,W9,D4,L1,V1,M1} { composition( converse( X ), top )
% 67.16/67.64 ==> converse( composition( top, X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145371) {G1,W10,D5,L1,V2,M1} { composition( Y, converse( X ) )
% 67.16/67.64 ==> converse( composition( X, converse( Y ) ) ) }.
% 67.16/67.64 parent0[0]: (16) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 67.16/67.64 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145373) {G2,W9,D4,L1,V1,M1} { composition( top, converse( X ) )
% 67.16/67.64 ==> converse( composition( X, top ) ) }.
% 67.16/67.64 parent0[0]: (223) {G10,W4,D3,L1,V0,M1} P(214,59) { converse( top ) ==> top
% 67.16/67.64 }.
% 67.16/67.64 parent1[0; 8]: (145371) {G1,W10,D5,L1,V2,M1} { composition( Y, converse( X
% 67.16/67.64 ) ) ==> converse( composition( X, converse( Y ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := top
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (225) {G11,W9,D4,L1,V1,M1} P(223,16) { composition( top,
% 67.16/67.64 converse( X ) ) ==> converse( composition( X, top ) ) }.
% 67.16/67.64 parent0: (145373) {G2,W9,D4,L1,V1,M1} { composition( top, converse( X ) )
% 67.16/67.64 ==> converse( composition( X, top ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145376) {G6,W7,D4,L1,V1,M1} { meet( X, X ) = complement(
% 67.16/67.64 complement( X ) ) }.
% 67.16/67.64 parent0[0]: (197) {G6,W7,D4,L1,V1,M1} P(191,3) { complement( complement( X
% 67.16/67.64 ) ) = meet( X, X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145382) {G7,W10,D4,L1,V1,M1} { meet( complement( X ), complement
% 67.16/67.64 ( X ) ) = complement( meet( X, X ) ) }.
% 67.16/67.64 parent0[0]: (197) {G6,W7,D4,L1,V1,M1} P(191,3) { complement( complement( X
% 67.16/67.64 ) ) = meet( X, X ) }.
% 67.16/67.64 parent1[0; 7]: (145376) {G6,W7,D4,L1,V1,M1} { meet( X, X ) = complement(
% 67.16/67.64 complement( X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := complement( X )
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (231) {G7,W10,D4,L1,V1,M1} P(197,197) { meet( complement( X )
% 67.16/67.64 , complement( X ) ) ==> complement( meet( X, X ) ) }.
% 67.16/67.64 parent0: (145382) {G7,W10,D4,L1,V1,M1} { meet( complement( X ), complement
% 67.16/67.64 ( X ) ) = complement( meet( X, X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145385) {G3,W6,D4,L1,V1,M1} { zero ==> meet( complement( X ), X )
% 67.16/67.64 }.
% 67.16/67.64 parent0[0]: (92) {G3,W6,D4,L1,V1,M1} S(74);d(77) { meet( complement( X ), X
% 67.16/67.64 ) ==> zero }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145386) {G4,W8,D4,L1,V1,M1} { zero ==> meet( meet( X, X ),
% 67.16/67.64 complement( X ) ) }.
% 67.16/67.64 parent0[0]: (197) {G6,W7,D4,L1,V1,M1} P(191,3) { complement( complement( X
% 67.16/67.64 ) ) = meet( X, X ) }.
% 67.16/67.64 parent1[0; 3]: (145385) {G3,W6,D4,L1,V1,M1} { zero ==> meet( complement( X
% 67.16/67.64 ), X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := complement( X )
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145387) {G4,W8,D4,L1,V1,M1} { meet( meet( X, X ), complement( X )
% 67.16/67.64 ) ==> zero }.
% 67.16/67.64 parent0[0]: (145386) {G4,W8,D4,L1,V1,M1} { zero ==> meet( meet( X, X ),
% 67.16/67.64 complement( X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (236) {G7,W8,D4,L1,V1,M1} P(197,92) { meet( meet( X, X ),
% 67.16/67.64 complement( X ) ) ==> zero }.
% 67.16/67.64 parent0: (145387) {G4,W8,D4,L1,V1,M1} { meet( meet( X, X ), complement( X
% 67.16/67.64 ) ) ==> zero }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145388) {G0,W5,D4,L1,V1,M1} { X ==> converse( converse( X ) ) }.
% 67.16/67.64 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145390) {G1,W13,D6,L1,V3,M1} { composition( X, join( Y, Z ) )
% 67.16/67.64 ==> converse( converse( composition( X, join( Z, Y ) ) ) ) }.
% 67.16/67.64 parent0[0]: (23) {G2,W13,D5,L1,V3,M1} P(18,9);d(9) { converse( composition
% 67.16/67.64 ( Z, join( Y, X ) ) ) = converse( composition( Z, join( X, Y ) ) ) }.
% 67.16/67.64 parent1[0; 7]: (145388) {G0,W5,D4,L1,V1,M1} { X ==> converse( converse( X
% 67.16/67.64 ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Z
% 67.16/67.64 Y := Y
% 67.16/67.64 Z := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := composition( X, join( Y, Z ) )
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145392) {G1,W11,D4,L1,V3,M1} { composition( X, join( Y, Z ) )
% 67.16/67.64 ==> composition( X, join( Z, Y ) ) }.
% 67.16/67.64 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.16/67.64 parent1[0; 6]: (145390) {G1,W13,D6,L1,V3,M1} { composition( X, join( Y, Z
% 67.16/67.64 ) ) ==> converse( converse( composition( X, join( Z, Y ) ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := composition( X, join( Z, Y ) )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 Z := Z
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (247) {G3,W11,D4,L1,V3,M1} P(23,7);d(7) { composition( X, join
% 67.16/67.64 ( Z, Y ) ) = composition( X, join( Y, Z ) ) }.
% 67.16/67.64 parent0: (145392) {G1,W11,D4,L1,V3,M1} { composition( X, join( Y, Z ) )
% 67.16/67.64 ==> composition( X, join( Z, Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Z
% 67.16/67.64 Z := Y
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145394) {G0,W11,D4,L1,V3,M1} { composition( composition( X, Y ),
% 67.16/67.64 Z ) ==> composition( X, composition( Y, Z ) ) }.
% 67.16/67.64 parent0[0]: (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z
% 67.16/67.64 ) ) ==> composition( composition( X, Y ), Z ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 Z := Z
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145396) {G1,W13,D5,L1,V2,M1} { composition( composition( X, top
% 67.16/67.64 ), converse( Y ) ) ==> composition( X, converse( composition( Y, top ) )
% 67.16/67.64 ) }.
% 67.16/67.64 parent0[0]: (225) {G11,W9,D4,L1,V1,M1} P(223,16) { composition( top,
% 67.16/67.64 converse( X ) ) ==> converse( composition( X, top ) ) }.
% 67.16/67.64 parent1[0; 9]: (145394) {G0,W11,D4,L1,V3,M1} { composition( composition( X
% 67.16/67.64 , Y ), Z ) ==> composition( X, composition( Y, Z ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := top
% 67.16/67.64 Z := converse( Y )
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145398) {G1,W13,D5,L1,V2,M1} { composition( X, converse(
% 67.16/67.64 composition( Y, top ) ) ) ==> composition( composition( X, top ),
% 67.16/67.64 converse( Y ) ) }.
% 67.16/67.64 parent0[0]: (145396) {G1,W13,D5,L1,V2,M1} { composition( composition( X,
% 67.16/67.64 top ), converse( Y ) ) ==> composition( X, converse( composition( Y, top
% 67.16/67.64 ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (267) {G12,W13,D5,L1,V2,M1} P(225,4) { composition( Y,
% 67.16/67.64 converse( composition( X, top ) ) ) ==> composition( composition( Y, top
% 67.16/67.64 ), converse( X ) ) }.
% 67.16/67.64 parent0: (145398) {G1,W13,D5,L1,V2,M1} { composition( X, converse(
% 67.16/67.64 composition( Y, top ) ) ) ==> composition( composition( X, top ),
% 67.16/67.64 converse( Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145399) {G2,W10,D6,L1,V2,M1} { top ==> join( join( complement(
% 67.16/67.64 join( X, Y ) ), X ), Y ) }.
% 67.16/67.64 parent0[0]: (27) {G2,W10,D6,L1,V2,M1} P(1,15) { join( join( complement(
% 67.16/67.64 join( X, Y ) ), X ), Y ) ==> top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145401) {G1,W10,D6,L1,V2,M1} { top ==> join( Y, join( complement
% 67.16/67.64 ( join( X, Y ) ), X ) ) }.
% 67.16/67.64 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.16/67.64 parent1[0; 2]: (145399) {G2,W10,D6,L1,V2,M1} { top ==> join( join(
% 67.16/67.64 complement( join( X, Y ) ), X ), Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := join( complement( join( X, Y ) ), X )
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145415) {G1,W10,D6,L1,V2,M1} { top ==> join( join( X, complement
% 67.16/67.64 ( join( Y, X ) ) ), Y ) }.
% 67.16/67.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.16/67.64 join( X, Y ), Z ) }.
% 67.16/67.64 parent1[0; 2]: (145401) {G1,W10,D6,L1,V2,M1} { top ==> join( Y, join(
% 67.16/67.64 complement( join( X, Y ) ), X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := complement( join( Y, X ) )
% 67.16/67.64 Z := Y
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145416) {G1,W10,D6,L1,V2,M1} { join( join( X, complement( join( Y
% 67.16/67.64 , X ) ) ), Y ) ==> top }.
% 67.16/67.64 parent0[0]: (145415) {G1,W10,D6,L1,V2,M1} { top ==> join( join( X,
% 67.16/67.64 complement( join( Y, X ) ) ), Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (308) {G3,W10,D6,L1,V2,M1} P(27,0);d(1) { join( join( Y,
% 67.16/67.64 complement( join( X, Y ) ) ), X ) ==> top }.
% 67.16/67.64 parent0: (145416) {G1,W10,D6,L1,V2,M1} { join( join( X, complement( join(
% 67.16/67.64 Y, X ) ) ), Y ) ==> top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145417) {G2,W10,D6,L1,V2,M1} { top ==> join( join( complement(
% 67.16/67.64 join( X, Y ) ), X ), Y ) }.
% 67.16/67.64 parent0[0]: (27) {G2,W10,D6,L1,V2,M1} P(1,15) { join( join( complement(
% 67.16/67.64 join( X, Y ) ), X ), Y ) ==> top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145419) {G1,W10,D6,L1,V2,M1} { top ==> join( join( X, complement
% 67.16/67.64 ( join( X, Y ) ) ), Y ) }.
% 67.16/67.64 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.16/67.64 parent1[0; 3]: (145417) {G2,W10,D6,L1,V2,M1} { top ==> join( join(
% 67.16/67.64 complement( join( X, Y ) ), X ), Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := complement( join( X, Y ) )
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145427) {G1,W10,D6,L1,V2,M1} { join( join( X, complement( join( X
% 67.16/67.64 , Y ) ) ), Y ) ==> top }.
% 67.16/67.64 parent0[0]: (145419) {G1,W10,D6,L1,V2,M1} { top ==> join( join( X,
% 67.16/67.64 complement( join( X, Y ) ) ), Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (309) {G3,W10,D6,L1,V2,M1} P(0,27) { join( join( X, complement
% 67.16/67.64 ( join( X, Y ) ) ), Y ) ==> top }.
% 67.16/67.64 parent0: (145427) {G1,W10,D6,L1,V2,M1} { join( join( X, complement( join(
% 67.16/67.64 X, Y ) ) ), Y ) ==> top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145434) {G2,W10,D6,L1,V2,M1} { top ==> join( join( complement(
% 67.16/67.64 join( X, Y ) ), X ), Y ) }.
% 67.16/67.64 parent0[0]: (27) {G2,W10,D6,L1,V2,M1} P(1,15) { join( join( complement(
% 67.16/67.64 join( X, Y ) ), X ), Y ) ==> top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145437) {G1,W10,D6,L1,V2,M1} { top ==> join( join( complement(
% 67.16/67.64 join( Y, X ) ), X ), Y ) }.
% 67.16/67.64 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.16/67.64 parent1[0; 5]: (145434) {G2,W10,D6,L1,V2,M1} { top ==> join( join(
% 67.16/67.64 complement( join( X, Y ) ), X ), Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145450) {G1,W10,D6,L1,V2,M1} { join( join( complement( join( X, Y
% 67.16/67.64 ) ), Y ), X ) ==> top }.
% 67.16/67.64 parent0[0]: (145437) {G1,W10,D6,L1,V2,M1} { top ==> join( join( complement
% 67.16/67.64 ( join( Y, X ) ), X ), Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (310) {G3,W10,D6,L1,V2,M1} P(0,27) { join( join( complement(
% 67.16/67.64 join( Y, X ) ), X ), Y ) ==> top }.
% 67.16/67.64 parent0: (145450) {G1,W10,D6,L1,V2,M1} { join( join( complement( join( X,
% 67.16/67.64 Y ) ), Y ), X ) ==> top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145452) {G7,W8,D4,L1,V1,M1} { zero ==> meet( meet( X, X ),
% 67.16/67.64 complement( X ) ) }.
% 67.16/67.64 parent0[0]: (236) {G7,W8,D4,L1,V1,M1} P(197,92) { meet( meet( X, X ),
% 67.16/67.64 complement( X ) ) ==> zero }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145453) {G8,W10,D5,L1,V1,M1} { zero ==> meet( complement( meet(
% 67.16/67.64 X, X ) ), complement( complement( X ) ) ) }.
% 67.16/67.64 parent0[0]: (231) {G7,W10,D4,L1,V1,M1} P(197,197) { meet( complement( X ),
% 67.16/67.64 complement( X ) ) ==> complement( meet( X, X ) ) }.
% 67.16/67.64 parent1[0; 3]: (145452) {G7,W8,D4,L1,V1,M1} { zero ==> meet( meet( X, X )
% 67.16/67.64 , complement( X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := complement( X )
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145454) {G8,W10,D5,L1,V1,M1} { meet( complement( meet( X, X ) ),
% 67.16/67.64 complement( complement( X ) ) ) ==> zero }.
% 67.16/67.64 parent0[0]: (145453) {G8,W10,D5,L1,V1,M1} { zero ==> meet( complement(
% 67.16/67.64 meet( X, X ) ), complement( complement( X ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (384) {G8,W10,D5,L1,V1,M1} P(231,236) { meet( complement( meet
% 67.16/67.64 ( X, X ) ), complement( complement( X ) ) ) ==> zero }.
% 67.16/67.64 parent0: (145454) {G8,W10,D5,L1,V1,M1} { meet( complement( meet( X, X ) )
% 67.16/67.64 , complement( complement( X ) ) ) ==> zero }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145455) {G7,W10,D4,L1,V1,M1} { complement( meet( X, X ) ) ==>
% 67.16/67.64 meet( complement( X ), complement( X ) ) }.
% 67.16/67.64 parent0[0]: (231) {G7,W10,D4,L1,V1,M1} P(197,197) { meet( complement( X ),
% 67.16/67.64 complement( X ) ) ==> complement( meet( X, X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145456) {G6,W7,D4,L1,V1,M1} { meet( X, X ) = complement(
% 67.16/67.64 complement( X ) ) }.
% 67.16/67.64 parent0[0]: (197) {G6,W7,D4,L1,V1,M1} P(191,3) { complement( complement( X
% 67.16/67.64 ) ) = meet( X, X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145458) {G7,W9,D5,L1,V1,M1} { complement( meet( X, X ) ) ==>
% 67.16/67.64 complement( complement( complement( X ) ) ) }.
% 67.16/67.64 parent0[0]: (145456) {G6,W7,D4,L1,V1,M1} { meet( X, X ) = complement(
% 67.16/67.64 complement( X ) ) }.
% 67.16/67.64 parent1[0; 5]: (145455) {G7,W10,D4,L1,V1,M1} { complement( meet( X, X ) )
% 67.16/67.64 ==> meet( complement( X ), complement( X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := complement( X )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145461) {G7,W9,D5,L1,V1,M1} { complement( complement( complement
% 67.16/67.64 ( X ) ) ) ==> complement( meet( X, X ) ) }.
% 67.16/67.64 parent0[0]: (145458) {G7,W9,D5,L1,V1,M1} { complement( meet( X, X ) ) ==>
% 67.16/67.64 complement( complement( complement( X ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (385) {G8,W9,D5,L1,V1,M1} P(231,197) { complement( complement
% 67.16/67.64 ( complement( X ) ) ) = complement( meet( X, X ) ) }.
% 67.16/67.64 parent0: (145461) {G7,W9,D5,L1,V1,M1} { complement( complement( complement
% 67.16/67.64 ( X ) ) ) ==> complement( meet( X, X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145464) {G4,W10,D5,L1,V3,M1} { join( join( join( X, Y ), Z ),
% 67.16/67.64 complement( X ) ) ==> top }.
% 67.16/67.64 parent0[0]: (215) {G9,W5,D3,L1,V1,M1} P(199,37);d(38);d(209) { join( X, top
% 67.16/67.64 ) ==> top }.
% 67.16/67.64 parent1[0; 9]: (46) {G3,W14,D5,L1,V3,M1} P(1,37) { join( join( join( X, Y )
% 67.16/67.64 , Z ), complement( X ) ) ==> join( join( Y, Z ), top ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := join( Y, Z )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 Z := Z
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (599) {G10,W10,D5,L1,V3,M1} S(46);d(215) { join( join( join( X
% 67.16/67.64 , Y ), Z ), complement( X ) ) ==> top }.
% 67.16/67.64 parent0: (145464) {G4,W10,D5,L1,V3,M1} { join( join( join( X, Y ), Z ),
% 67.16/67.64 complement( X ) ) ==> top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 Z := Z
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145466) {G3,W10,D6,L1,V2,M1} { top ==> join( join( X, complement
% 67.16/67.64 ( join( Y, X ) ) ), Y ) }.
% 67.16/67.64 parent0[0]: (308) {G3,W10,D6,L1,V2,M1} P(27,0);d(1) { join( join( Y,
% 67.16/67.64 complement( join( X, Y ) ) ), X ) ==> top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145467) {G2,W10,D5,L1,V2,M1} { top ==> join( join( X, Y ),
% 67.16/67.64 complement( join( Y, X ) ) ) }.
% 67.16/67.64 parent0[0]: (30) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X )
% 67.16/67.64 = join( join( Z, X ), Y ) }.
% 67.16/67.64 parent1[0; 2]: (145466) {G3,W10,D6,L1,V2,M1} { top ==> join( join( X,
% 67.16/67.64 complement( join( Y, X ) ) ), Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := complement( join( Y, X ) )
% 67.16/67.64 Z := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145478) {G2,W10,D5,L1,V2,M1} { join( join( X, Y ), complement(
% 67.16/67.64 join( Y, X ) ) ) ==> top }.
% 67.16/67.64 parent0[0]: (145467) {G2,W10,D5,L1,V2,M1} { top ==> join( join( X, Y ),
% 67.16/67.64 complement( join( Y, X ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (626) {G4,W10,D5,L1,V2,M1} P(308,30) { join( join( X, Y ),
% 67.16/67.64 complement( join( Y, X ) ) ) ==> top }.
% 67.16/67.64 parent0: (145478) {G2,W10,D5,L1,V2,M1} { join( join( X, Y ), complement(
% 67.16/67.64 join( Y, X ) ) ) ==> top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145486) {G10,W10,D5,L1,V3,M1} { top ==> join( join( join( X, Y )
% 67.16/67.64 , Z ), complement( X ) ) }.
% 67.16/67.64 parent0[0]: (599) {G10,W10,D5,L1,V3,M1} S(46);d(215) { join( join( join( X
% 67.16/67.64 , Y ), Z ), complement( X ) ) ==> top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 Z := Z
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145487) {G2,W10,D5,L1,V3,M1} { top ==> join( join( X, Z ),
% 67.16/67.64 complement( meet( X, Y ) ) ) }.
% 67.16/67.64 parent0[0]: (48) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 67.16/67.64 complement( join( complement( X ), Y ) ) ) ==> X }.
% 67.16/67.64 parent1[0; 4]: (145486) {G10,W10,D5,L1,V3,M1} { top ==> join( join( join(
% 67.16/67.64 X, Y ), Z ), complement( X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := meet( X, Y )
% 67.16/67.64 Y := complement( join( complement( X ), Y ) )
% 67.16/67.64 Z := Z
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145488) {G2,W10,D5,L1,V3,M1} { join( join( X, Y ), complement(
% 67.16/67.64 meet( X, Z ) ) ) ==> top }.
% 67.16/67.64 parent0[0]: (145487) {G2,W10,D5,L1,V3,M1} { top ==> join( join( X, Z ),
% 67.16/67.64 complement( meet( X, Y ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Z
% 67.16/67.64 Z := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (692) {G11,W10,D5,L1,V3,M1} P(48,599) { join( join( X, Z ),
% 67.16/67.64 complement( meet( X, Y ) ) ) ==> top }.
% 67.16/67.64 parent0: (145488) {G2,W10,D5,L1,V3,M1} { join( join( X, Y ), complement(
% 67.16/67.64 meet( X, Z ) ) ) ==> top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Z
% 67.16/67.64 Z := Y
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145490) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.16/67.64 complement( join( complement( X ), Y ) ) ) }.
% 67.16/67.64 parent0[0]: (48) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 67.16/67.64 complement( join( complement( X ), Y ) ) ) ==> X }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145492) {G2,W8,D4,L1,V1,M1} { X ==> join( meet( X, top ),
% 67.16/67.64 complement( top ) ) }.
% 67.16/67.64 parent0[0]: (215) {G9,W5,D3,L1,V1,M1} P(199,37);d(38);d(209) { join( X, top
% 67.16/67.64 ) ==> top }.
% 67.16/67.64 parent1[0; 7]: (145490) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.16/67.64 complement( join( complement( X ), Y ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := complement( X )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := top
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145493) {G2,W7,D4,L1,V1,M1} { X ==> join( meet( X, top ), zero )
% 67.16/67.64 }.
% 67.16/67.64 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.64 zero }.
% 67.16/67.64 parent1[0; 6]: (145492) {G2,W8,D4,L1,V1,M1} { X ==> join( meet( X, top ),
% 67.16/67.64 complement( top ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145494) {G2,W7,D4,L1,V1,M1} { join( meet( X, top ), zero ) ==> X
% 67.16/67.64 }.
% 67.16/67.64 parent0[0]: (145493) {G2,W7,D4,L1,V1,M1} { X ==> join( meet( X, top ),
% 67.16/67.64 zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (715) {G10,W7,D4,L1,V1,M1} P(215,48);d(77) { join( meet( X,
% 67.16/67.64 top ), zero ) ==> X }.
% 67.16/67.64 parent0: (145494) {G2,W7,D4,L1,V1,M1} { join( meet( X, top ), zero ) ==> X
% 67.16/67.64 }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145496) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.16/67.64 complement( join( complement( X ), Y ) ) ) }.
% 67.16/67.64 parent0[0]: (48) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 67.16/67.64 complement( join( complement( X ), Y ) ) ) ==> X }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145497) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement(
% 67.16/67.64 Y ) ), meet( X, Y ) ) }.
% 67.16/67.64 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 67.16/67.64 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 67.16/67.64 parent1[0; 7]: (145496) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.16/67.64 complement( join( complement( X ), Y ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := complement( Y )
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145499) {G1,W10,D5,L1,V2,M1} { join( meet( X, complement( Y ) ),
% 67.16/67.64 meet( X, Y ) ) ==> X }.
% 67.16/67.64 parent0[0]: (145497) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( X,
% 67.16/67.64 complement( Y ) ), meet( X, Y ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (722) {G2,W10,D5,L1,V2,M1} P(3,48) { join( meet( X, complement
% 67.16/67.64 ( Y ) ), meet( X, Y ) ) ==> X }.
% 67.16/67.64 parent0: (145499) {G1,W10,D5,L1,V2,M1} { join( meet( X, complement( Y ) )
% 67.16/67.64 , meet( X, Y ) ) ==> X }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145502) {G2,W10,D4,L1,V2,M1} { join( Y, top ) ==> join( join( X,
% 67.16/67.64 Y ), complement( X ) ) }.
% 67.16/67.64 parent0[0]: (37) {G2,W10,D4,L1,V2,M1} P(0,31) { join( join( Y, X ),
% 67.16/67.64 complement( Y ) ) ==> join( X, top ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145504) {G2,W14,D6,L1,V2,M1} { join( complement( join(
% 67.16/67.64 complement( X ), Y ) ), top ) ==> join( X, complement( meet( X, Y ) ) )
% 67.16/67.64 }.
% 67.16/67.64 parent0[0]: (48) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 67.16/67.64 complement( join( complement( X ), Y ) ) ) ==> X }.
% 67.16/67.64 parent1[0; 9]: (145502) {G2,W10,D4,L1,V2,M1} { join( Y, top ) ==> join(
% 67.16/67.64 join( X, Y ), complement( X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := meet( X, Y )
% 67.16/67.64 Y := complement( join( complement( X ), Y ) )
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145505) {G3,W8,D5,L1,V2,M1} { top ==> join( X, complement( meet
% 67.16/67.64 ( X, Y ) ) ) }.
% 67.16/67.64 parent0[0]: (215) {G9,W5,D3,L1,V1,M1} P(199,37);d(38);d(209) { join( X, top
% 67.16/67.64 ) ==> top }.
% 67.16/67.64 parent1[0; 1]: (145504) {G2,W14,D6,L1,V2,M1} { join( complement( join(
% 67.16/67.64 complement( X ), Y ) ), top ) ==> join( X, complement( meet( X, Y ) ) )
% 67.16/67.64 }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := complement( join( complement( X ), Y ) )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145506) {G3,W8,D5,L1,V2,M1} { join( X, complement( meet( X, Y ) )
% 67.16/67.64 ) ==> top }.
% 67.16/67.64 parent0[0]: (145505) {G3,W8,D5,L1,V2,M1} { top ==> join( X, complement(
% 67.16/67.64 meet( X, Y ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (724) {G10,W8,D5,L1,V2,M1} P(48,37);d(215) { join( X,
% 67.16/67.64 complement( meet( X, Y ) ) ) ==> top }.
% 67.16/67.64 parent0: (145506) {G3,W8,D5,L1,V2,M1} { join( X, complement( meet( X, Y )
% 67.16/67.64 ) ) ==> top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145508) {G7,W9,D4,L1,V1,M1} { join( X, zero ) ==> join( join( X,
% 67.16/67.64 zero ), zero ) }.
% 67.16/67.64 parent0[0]: (208) {G7,W9,D4,L1,V1,M1} P(196,1) { join( join( X, zero ),
% 67.16/67.64 zero ) ==> join( X, zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145510) {G8,W9,D4,L1,V1,M1} { join( meet( X, top ), zero ) ==>
% 67.16/67.64 join( X, zero ) }.
% 67.16/67.64 parent0[0]: (715) {G10,W7,D4,L1,V1,M1} P(215,48);d(77) { join( meet( X, top
% 67.16/67.64 ), zero ) ==> X }.
% 67.16/67.64 parent1[0; 7]: (145508) {G7,W9,D4,L1,V1,M1} { join( X, zero ) ==> join(
% 67.16/67.64 join( X, zero ), zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := meet( X, top )
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145511) {G9,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 67.16/67.64 parent0[0]: (715) {G10,W7,D4,L1,V1,M1} P(215,48);d(77) { join( meet( X, top
% 67.16/67.64 ), zero ) ==> X }.
% 67.16/67.64 parent1[0; 1]: (145510) {G8,W9,D4,L1,V1,M1} { join( meet( X, top ), zero )
% 67.16/67.64 ==> join( X, zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145513) {G9,W5,D3,L1,V1,M1} { join( X, zero ) ==> X }.
% 67.16/67.64 parent0[0]: (145511) {G9,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.16/67.64 }.
% 67.16/67.64 parent0: (145513) {G9,W5,D3,L1,V1,M1} { join( X, zero ) ==> X }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145515) {G6,W7,D4,L1,V1,M1} { meet( X, X ) = complement(
% 67.16/67.64 complement( X ) ) }.
% 67.16/67.64 parent0[0]: (197) {G6,W7,D4,L1,V1,M1} P(191,3) { complement( complement( X
% 67.16/67.64 ) ) = meet( X, X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145516) {G10,W7,D4,L1,V1,M1} { X ==> join( meet( X, top ), zero )
% 67.16/67.64 }.
% 67.16/67.64 parent0[0]: (715) {G10,W7,D4,L1,V1,M1} P(215,48);d(77) { join( meet( X, top
% 67.16/67.64 ), zero ) ==> X }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145519) {G7,W7,D5,L1,V0,M1} { top ==> join( complement(
% 67.16/67.64 complement( top ) ), zero ) }.
% 67.16/67.64 parent0[0]: (145515) {G6,W7,D4,L1,V1,M1} { meet( X, X ) = complement(
% 67.16/67.64 complement( X ) ) }.
% 67.16/67.64 parent1[0; 3]: (145516) {G10,W7,D4,L1,V1,M1} { X ==> join( meet( X, top )
% 67.16/67.64 , zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := top
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := top
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145520) {G8,W5,D4,L1,V0,M1} { top ==> complement( complement(
% 67.16/67.64 top ) ) }.
% 67.16/67.64 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.16/67.64 }.
% 67.16/67.64 parent1[0; 2]: (145519) {G7,W7,D5,L1,V0,M1} { top ==> join( complement(
% 67.16/67.64 complement( top ) ), zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := complement( complement( top ) )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145521) {G2,W4,D3,L1,V0,M1} { top ==> complement( zero ) }.
% 67.16/67.64 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.64 zero }.
% 67.16/67.64 parent1[0; 3]: (145520) {G8,W5,D4,L1,V0,M1} { top ==> complement(
% 67.16/67.64 complement( top ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145522) {G2,W4,D3,L1,V0,M1} { complement( zero ) ==> top }.
% 67.16/67.64 parent0[0]: (145521) {G2,W4,D3,L1,V0,M1} { top ==> complement( zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) {
% 67.16/67.64 complement( zero ) ==> top }.
% 67.16/67.64 parent0: (145522) {G2,W4,D3,L1,V0,M1} { complement( zero ) ==> top }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145523) {G10,W7,D4,L1,V1,M1} { X ==> join( meet( X, top ), zero )
% 67.16/67.64 }.
% 67.16/67.64 parent0[0]: (715) {G10,W7,D4,L1,V1,M1} P(215,48);d(77) { join( meet( X, top
% 67.16/67.64 ), zero ) ==> X }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145525) {G2,W7,D4,L1,V1,M1} { X ==> join( meet( top, X ), zero )
% 67.16/67.64 }.
% 67.16/67.64 parent0[0]: (75) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 67.16/67.64 Y ) }.
% 67.16/67.64 parent1[0; 3]: (145523) {G10,W7,D4,L1,V1,M1} { X ==> join( meet( X, top )
% 67.16/67.64 , zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := top
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145527) {G3,W5,D3,L1,V1,M1} { X ==> meet( top, X ) }.
% 67.16/67.64 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.16/67.64 }.
% 67.16/67.64 parent1[0; 2]: (145525) {G2,W7,D4,L1,V1,M1} { X ==> join( meet( top, X ),
% 67.16/67.64 zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := meet( top, X )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145528) {G3,W5,D3,L1,V1,M1} { meet( top, X ) ==> X }.
% 67.16/67.64 parent0[0]: (145527) {G3,W5,D3,L1,V1,M1} { X ==> meet( top, X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (747) {G12,W5,D3,L1,V1,M1} P(75,715);d(740) { meet( top, X )
% 67.16/67.64 ==> X }.
% 67.16/67.64 parent0: (145528) {G3,W5,D3,L1,V1,M1} { meet( top, X ) ==> X }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145530) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 67.16/67.64 X, join( Y, Z ) ) }.
% 67.16/67.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.16/67.64 join( X, Y ), Z ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 Z := Z
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145533) {G1,W11,D5,L1,V2,M1} { join( join( X, meet( Y, top ) ),
% 67.16/67.64 zero ) ==> join( X, Y ) }.
% 67.16/67.64 parent0[0]: (715) {G10,W7,D4,L1,V1,M1} P(215,48);d(77) { join( meet( X, top
% 67.16/67.64 ), zero ) ==> X }.
% 67.16/67.64 parent1[0; 10]: (145530) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z )
% 67.16/67.64 ==> join( X, join( Y, Z ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := meet( Y, top )
% 67.16/67.64 Z := zero
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145534) {G2,W9,D4,L1,V2,M1} { join( X, meet( Y, top ) ) ==> join
% 67.16/67.64 ( X, Y ) }.
% 67.16/67.64 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.16/67.64 }.
% 67.16/67.64 parent1[0; 1]: (145533) {G1,W11,D5,L1,V2,M1} { join( join( X, meet( Y, top
% 67.16/67.64 ) ), zero ) ==> join( X, Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := join( X, meet( Y, top ) )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (748) {G12,W9,D4,L1,V2,M1} P(715,1);d(740) { join( Y, meet( X
% 67.16/67.64 , top ) ) ==> join( Y, X ) }.
% 67.16/67.64 parent0: (145534) {G2,W9,D4,L1,V2,M1} { join( X, meet( Y, top ) ) ==> join
% 67.16/67.64 ( X, Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145536) {G10,W7,D4,L1,V1,M1} { X ==> join( meet( X, top ), zero )
% 67.16/67.64 }.
% 67.16/67.64 parent0[0]: (715) {G10,W7,D4,L1,V1,M1} P(215,48);d(77) { join( meet( X, top
% 67.16/67.64 ), zero ) ==> X }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145538) {G1,W7,D4,L1,V1,M1} { X ==> join( zero, meet( X, top ) )
% 67.16/67.64 }.
% 67.16/67.64 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.16/67.64 parent1[0; 2]: (145536) {G10,W7,D4,L1,V1,M1} { X ==> join( meet( X, top )
% 67.16/67.64 , zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := meet( X, top )
% 67.16/67.64 Y := zero
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145540) {G2,W5,D3,L1,V1,M1} { X ==> join( zero, X ) }.
% 67.16/67.64 parent0[0]: (748) {G12,W9,D4,L1,V2,M1} P(715,1);d(740) { join( Y, meet( X,
% 67.16/67.64 top ) ) ==> join( Y, X ) }.
% 67.16/67.64 parent1[0; 2]: (145538) {G1,W7,D4,L1,V1,M1} { X ==> join( zero, meet( X,
% 67.16/67.64 top ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := zero
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145541) {G2,W5,D3,L1,V1,M1} { join( zero, X ) ==> X }.
% 67.16/67.64 parent0[0]: (145540) {G2,W5,D3,L1,V1,M1} { X ==> join( zero, X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (749) {G13,W5,D3,L1,V1,M1} P(715,0);d(748) { join( zero, X )
% 67.16/67.64 ==> X }.
% 67.16/67.64 parent0: (145541) {G2,W5,D3,L1,V1,M1} { join( zero, X ) ==> X }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145543) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.16/67.64 complement( join( complement( X ), Y ) ) ) }.
% 67.16/67.64 parent0[0]: (48) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 67.16/67.64 complement( join( complement( X ), Y ) ) ) ==> X }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145547) {G2,W10,D5,L1,V1,M1} { zero ==> join( meet( zero, X ),
% 67.16/67.64 complement( join( top, X ) ) ) }.
% 67.16/67.64 parent0[0]: (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) { complement
% 67.16/67.64 ( zero ) ==> top }.
% 67.16/67.64 parent1[0; 8]: (145543) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.16/67.64 complement( join( complement( X ), Y ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := zero
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145548) {G3,W8,D4,L1,V1,M1} { zero ==> join( meet( zero, X ),
% 67.16/67.64 complement( top ) ) }.
% 67.16/67.64 parent0[0]: (214) {G9,W5,D3,L1,V1,M1} P(199,36);d(209) { join( top, X ) ==>
% 67.16/67.64 top }.
% 67.16/67.64 parent1[0; 7]: (145547) {G2,W10,D5,L1,V1,M1} { zero ==> join( meet( zero,
% 67.16/67.64 X ), complement( join( top, X ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145549) {G2,W7,D4,L1,V1,M1} { zero ==> join( meet( zero, X ),
% 67.16/67.64 zero ) }.
% 67.16/67.64 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.64 zero }.
% 67.16/67.64 parent1[0; 6]: (145548) {G3,W8,D4,L1,V1,M1} { zero ==> join( meet( zero, X
% 67.16/67.64 ), complement( top ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145550) {G3,W5,D3,L1,V1,M1} { zero ==> meet( zero, X ) }.
% 67.16/67.64 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.16/67.64 }.
% 67.16/67.64 parent1[0; 2]: (145549) {G2,W7,D4,L1,V1,M1} { zero ==> join( meet( zero, X
% 67.16/67.64 ), zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := meet( zero, X )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145551) {G3,W5,D3,L1,V1,M1} { meet( zero, X ) ==> zero }.
% 67.16/67.64 parent0[0]: (145550) {G3,W5,D3,L1,V1,M1} { zero ==> meet( zero, X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (750) {G13,W5,D3,L1,V1,M1} P(744,48);d(214);d(77);d(740) {
% 67.16/67.64 meet( zero, X ) ==> zero }.
% 67.16/67.64 parent0: (145551) {G3,W5,D3,L1,V1,M1} { meet( zero, X ) ==> zero }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145553) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 67.16/67.64 ( complement( X ), complement( Y ) ) ) }.
% 67.16/67.64 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 67.16/67.64 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145557) {G1,W9,D5,L1,V1,M1} { meet( X, zero ) ==> complement(
% 67.16/67.64 join( complement( X ), top ) ) }.
% 67.16/67.64 parent0[0]: (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) { complement
% 67.16/67.64 ( zero ) ==> top }.
% 67.16/67.64 parent1[0; 8]: (145553) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 67.16/67.64 ( join( complement( X ), complement( Y ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := zero
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145558) {G2,W6,D3,L1,V1,M1} { meet( X, zero ) ==> complement(
% 67.16/67.64 top ) }.
% 67.16/67.64 parent0[0]: (215) {G9,W5,D3,L1,V1,M1} P(199,37);d(38);d(209) { join( X, top
% 67.16/67.64 ) ==> top }.
% 67.16/67.64 parent1[0; 5]: (145557) {G1,W9,D5,L1,V1,M1} { meet( X, zero ) ==>
% 67.16/67.64 complement( join( complement( X ), top ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := complement( X )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145559) {G2,W5,D3,L1,V1,M1} { meet( X, zero ) ==> zero }.
% 67.16/67.64 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.64 zero }.
% 67.16/67.64 parent1[0; 4]: (145558) {G2,W6,D3,L1,V1,M1} { meet( X, zero ) ==>
% 67.16/67.64 complement( top ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (751) {G13,W5,D3,L1,V1,M1} P(744,3);d(215);d(77) { meet( X,
% 67.16/67.64 zero ) ==> zero }.
% 67.16/67.64 parent0: (145559) {G2,W5,D3,L1,V1,M1} { meet( X, zero ) ==> zero }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145562) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.16/67.64 complement( join( complement( X ), Y ) ) ) }.
% 67.16/67.64 parent0[0]: (48) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 67.16/67.64 complement( join( complement( X ), Y ) ) ) ==> X }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 Y := Y
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145565) {G2,W9,D6,L1,V1,M1} { X ==> join( zero, complement( join
% 67.16/67.64 ( complement( X ), zero ) ) ) }.
% 67.16/67.64 parent0[0]: (751) {G13,W5,D3,L1,V1,M1} P(744,3);d(215);d(77) { meet( X,
% 67.16/67.64 zero ) ==> zero }.
% 67.16/67.64 parent1[0; 3]: (145562) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.16/67.64 complement( join( complement( X ), Y ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 Y := zero
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145566) {G3,W7,D5,L1,V1,M1} { X ==> complement( join( complement
% 67.16/67.64 ( X ), zero ) ) }.
% 67.16/67.64 parent0[0]: (749) {G13,W5,D3,L1,V1,M1} P(715,0);d(748) { join( zero, X )
% 67.16/67.64 ==> X }.
% 67.16/67.64 parent1[0; 2]: (145565) {G2,W9,D6,L1,V1,M1} { X ==> join( zero, complement
% 67.16/67.64 ( join( complement( X ), zero ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := complement( join( complement( X ), zero ) )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145567) {G3,W5,D3,L1,V1,M1} { X ==> meet( X, top ) }.
% 67.16/67.64 parent0[0]: (79) {G2,W9,D5,L1,V1,M1} P(77,3) { complement( join( complement
% 67.16/67.64 ( X ), zero ) ) ==> meet( X, top ) }.
% 67.16/67.64 parent1[0; 2]: (145566) {G3,W7,D5,L1,V1,M1} { X ==> complement( join(
% 67.16/67.64 complement( X ), zero ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145568) {G3,W5,D3,L1,V1,M1} { meet( X, top ) ==> X }.
% 67.16/67.64 parent0[0]: (145567) {G3,W5,D3,L1,V1,M1} { X ==> meet( X, top ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (752) {G14,W5,D3,L1,V1,M1} P(751,48);d(749);d(79) { meet( X,
% 67.16/67.64 top ) ==> X }.
% 67.16/67.64 parent0: (145568) {G3,W5,D3,L1,V1,M1} { meet( X, top ) ==> X }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145569) {G11,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 67.16/67.64 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.16/67.64 }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145571) {G3,W7,D4,L1,V0,M1} { composition( converse( skol1 ),
% 67.16/67.64 complement( skol1 ) ) ==> zero }.
% 67.16/67.64 parent0[0]: (113) {G2,W9,D5,L1,V0,M1} P(13,10);d(77) { join( composition(
% 67.16/67.64 converse( skol1 ), complement( skol1 ) ), zero ) ==> zero }.
% 67.16/67.64 parent1[0; 6]: (145569) {G11,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := composition( converse( skol1 ), complement( skol1 ) )
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (755) {G12,W7,D4,L1,V0,M1} P(740,113) { composition( converse
% 67.16/67.64 ( skol1 ), complement( skol1 ) ) ==> zero }.
% 67.16/67.64 parent0: (145571) {G3,W7,D4,L1,V0,M1} { composition( converse( skol1 ),
% 67.16/67.64 complement( skol1 ) ) ==> zero }.
% 67.16/67.64 substitution0:
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145574) {G2,W9,D5,L1,V1,M1} { meet( X, top ) ==> complement( join
% 67.16/67.64 ( complement( X ), zero ) ) }.
% 67.16/67.64 parent0[0]: (79) {G2,W9,D5,L1,V1,M1} P(77,3) { complement( join( complement
% 67.16/67.64 ( X ), zero ) ) ==> meet( X, top ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145576) {G3,W7,D4,L1,V1,M1} { meet( X, top ) ==> complement(
% 67.16/67.64 complement( X ) ) }.
% 67.16/67.64 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.16/67.64 }.
% 67.16/67.64 parent1[0; 5]: (145574) {G2,W9,D5,L1,V1,M1} { meet( X, top ) ==>
% 67.16/67.64 complement( join( complement( X ), zero ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := complement( X )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145577) {G4,W5,D4,L1,V1,M1} { X ==> complement( complement( X )
% 67.16/67.64 ) }.
% 67.16/67.64 parent0[0]: (752) {G14,W5,D3,L1,V1,M1} P(751,48);d(749);d(79) { meet( X,
% 67.16/67.64 top ) ==> X }.
% 67.16/67.64 parent1[0; 1]: (145576) {G3,W7,D4,L1,V1,M1} { meet( X, top ) ==>
% 67.16/67.64 complement( complement( X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145578) {G4,W5,D4,L1,V1,M1} { complement( complement( X ) ) ==> X
% 67.16/67.64 }.
% 67.16/67.64 parent0[0]: (145577) {G4,W5,D4,L1,V1,M1} { X ==> complement( complement( X
% 67.16/67.64 ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.16/67.64 complement( X ) ) ==> X }.
% 67.16/67.64 parent0: (145578) {G4,W5,D4,L1,V1,M1} { complement( complement( X ) ) ==>
% 67.16/67.64 X }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145580) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y ) ==>
% 67.16/67.64 converse( join( X, converse( Y ) ) ) }.
% 67.16/67.64 parent0[0]: (20) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 67.16/67.64 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := Y
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145582) {G2,W8,D4,L1,V1,M1} { join( converse( zero ), X ) ==>
% 67.16/67.64 converse( converse( X ) ) }.
% 67.16/67.64 parent0[0]: (749) {G13,W5,D3,L1,V1,M1} P(715,0);d(748) { join( zero, X )
% 67.16/67.64 ==> X }.
% 67.16/67.64 parent1[0; 6]: (145580) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y )
% 67.16/67.64 ==> converse( join( X, converse( Y ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := converse( X )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := zero
% 67.16/67.64 Y := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145583) {G1,W6,D4,L1,V1,M1} { join( converse( zero ), X ) ==> X
% 67.16/67.64 }.
% 67.16/67.64 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.16/67.64 parent1[0; 5]: (145582) {G2,W8,D4,L1,V1,M1} { join( converse( zero ), X )
% 67.16/67.64 ==> converse( converse( X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (758) {G14,W6,D4,L1,V1,M1} P(749,20);d(7) { join( converse(
% 67.16/67.64 zero ), X ) ==> X }.
% 67.16/67.64 parent0: (145583) {G1,W6,D4,L1,V1,M1} { join( converse( zero ), X ) ==> X
% 67.16/67.64 }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145585) {G8,W9,D5,L1,V1,M1} { complement( meet( X, X ) ) =
% 67.16/67.64 complement( complement( complement( X ) ) ) }.
% 67.16/67.64 parent0[0]: (385) {G8,W9,D5,L1,V1,M1} P(231,197) { complement( complement(
% 67.16/67.64 complement( X ) ) ) = complement( meet( X, X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145586) {G15,W5,D4,L1,V1,M1} { X ==> complement( complement( X )
% 67.16/67.64 ) }.
% 67.16/67.64 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.16/67.64 complement( X ) ) ==> X }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145589) {G9,W9,D6,L1,V1,M1} { meet( X, X ) ==> complement(
% 67.16/67.64 complement( complement( complement( X ) ) ) ) }.
% 67.16/67.64 parent0[0]: (145585) {G8,W9,D5,L1,V1,M1} { complement( meet( X, X ) ) =
% 67.16/67.64 complement( complement( complement( X ) ) ) }.
% 67.16/67.64 parent1[0; 5]: (145586) {G15,W5,D4,L1,V1,M1} { X ==> complement(
% 67.16/67.64 complement( X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := meet( X, X )
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145590) {G10,W7,D4,L1,V1,M1} { meet( X, X ) ==> complement(
% 67.16/67.64 complement( X ) ) }.
% 67.16/67.64 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.16/67.64 complement( X ) ) ==> X }.
% 67.16/67.64 parent1[0; 4]: (145589) {G9,W9,D6,L1,V1,M1} { meet( X, X ) ==> complement
% 67.16/67.64 ( complement( complement( complement( X ) ) ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := complement( complement( X ) )
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145592) {G11,W5,D3,L1,V1,M1} { meet( X, X ) ==> X }.
% 67.16/67.64 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.16/67.64 complement( X ) ) ==> X }.
% 67.16/67.64 parent1[0; 4]: (145590) {G10,W7,D4,L1,V1,M1} { meet( X, X ) ==> complement
% 67.16/67.64 ( complement( X ) ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 substitution1:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 subsumption: (768) {G16,W5,D3,L1,V1,M1} P(385,756);d(756);d(756) { meet( X
% 67.16/67.64 , X ) ==> X }.
% 67.16/67.64 parent0: (145592) {G11,W5,D3,L1,V1,M1} { meet( X, X ) ==> X }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64 permutation0:
% 67.16/67.64 0 ==> 0
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 eqswap: (145595) {G5,W8,D4,L1,V1,M1} { complement( X ) ==> join(
% 67.16/67.64 complement( X ), complement( X ) ) }.
% 67.16/67.64 parent0[0]: (191) {G5,W8,D4,L1,V1,M1} P(187,10);d(180) { join( complement(
% 67.16/67.64 X ), complement( X ) ) ==> complement( X ) }.
% 67.16/67.64 substitution0:
% 67.16/67.64 X := X
% 67.16/67.64 end
% 67.16/67.64
% 67.16/67.64 paramod: (145598) {G6,W9,D5,L1,V1,M1} { complement( complement( X ) ) ==>
% 67.16/67.64 join( complement( complement( X ) ), X ) }.
% 67.16/67.64 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.16/67.65 complement( X ) ) ==> X }.
% 67.16/67.65 parent1[0; 8]: (145595) {G5,W8,D4,L1,V1,M1} { complement( X ) ==> join(
% 67.16/67.65 complement( X ), complement( X ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := complement( X )
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145600) {G7,W7,D4,L1,V1,M1} { complement( complement( X ) ) ==>
% 67.16/67.65 join( X, X ) }.
% 67.16/67.65 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.16/67.65 complement( X ) ) ==> X }.
% 67.16/67.65 parent1[0; 5]: (145598) {G6,W9,D5,L1,V1,M1} { complement( complement( X )
% 67.16/67.65 ) ==> join( complement( complement( X ) ), X ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145601) {G8,W5,D3,L1,V1,M1} { X ==> join( X, X ) }.
% 67.16/67.65 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.16/67.65 complement( X ) ) ==> X }.
% 67.16/67.65 parent1[0; 1]: (145600) {G7,W7,D4,L1,V1,M1} { complement( complement( X )
% 67.16/67.65 ) ==> join( X, X ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145607) {G8,W5,D3,L1,V1,M1} { join( X, X ) ==> X }.
% 67.16/67.65 parent0[0]: (145601) {G8,W5,D3,L1,V1,M1} { X ==> join( X, X ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (769) {G16,W5,D3,L1,V1,M1} P(756,191) { join( X, X ) ==> X }.
% 67.16/67.65 parent0: (145607) {G8,W5,D3,L1,V1,M1} { join( X, X ) ==> X }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145611) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 67.16/67.65 ( complement( X ), complement( Y ) ) ) }.
% 67.16/67.65 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 67.16/67.65 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145614) {G1,W10,D5,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 67.16/67.65 complement( join( X, complement( Y ) ) ) }.
% 67.16/67.65 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.16/67.65 complement( X ) ) ==> X }.
% 67.16/67.65 parent1[0; 7]: (145611) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 67.16/67.65 ( join( complement( X ), complement( Y ) ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := complement( X )
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145616) {G1,W10,D5,L1,V2,M1} { complement( join( X, complement( Y
% 67.16/67.65 ) ) ) ==> meet( complement( X ), Y ) }.
% 67.16/67.65 parent0[0]: (145614) {G1,W10,D5,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 67.16/67.65 complement( join( X, complement( Y ) ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (771) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( X,
% 67.16/67.65 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 67.16/67.65 parent0: (145616) {G1,W10,D5,L1,V2,M1} { complement( join( X, complement(
% 67.16/67.65 Y ) ) ) ==> meet( complement( X ), Y ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145619) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 67.16/67.65 ( complement( X ), complement( Y ) ) ) }.
% 67.16/67.65 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 67.16/67.65 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145623) {G1,W10,D5,L1,V2,M1} { meet( X, complement( Y ) ) ==>
% 67.16/67.65 complement( join( complement( X ), Y ) ) }.
% 67.16/67.65 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.16/67.65 complement( X ) ) ==> X }.
% 67.16/67.65 parent1[0; 9]: (145619) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 67.16/67.65 ( join( complement( X ), complement( Y ) ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := Y
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 Y := complement( Y )
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145625) {G1,W10,D5,L1,V2,M1} { complement( join( complement( X )
% 67.16/67.65 , Y ) ) ==> meet( X, complement( Y ) ) }.
% 67.16/67.65 parent0[0]: (145623) {G1,W10,D5,L1,V2,M1} { meet( X, complement( Y ) ) ==>
% 67.16/67.65 complement( join( complement( X ), Y ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.16/67.65 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.16/67.65 parent0: (145625) {G1,W10,D5,L1,V2,M1} { complement( join( complement( X )
% 67.16/67.65 , Y ) ) ==> meet( X, complement( Y ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := Y
% 67.16/67.65 Y := X
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145627) {G15,W5,D4,L1,V1,M1} { X ==> complement( complement( X )
% 67.16/67.65 ) }.
% 67.16/67.65 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.16/67.65 complement( X ) ) ==> X }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145632) {G1,W10,D4,L1,V2,M1} { join( complement( X ), complement
% 67.16/67.65 ( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.16/67.65 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 67.16/67.65 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 67.16/67.65 parent1[0; 7]: (145627) {G15,W5,D4,L1,V1,M1} { X ==> complement(
% 67.16/67.65 complement( X ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := join( complement( X ), complement( Y ) )
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (773) {G16,W10,D4,L1,V2,M1} P(3,756) { join( complement( X ),
% 67.16/67.65 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.16/67.65 parent0: (145632) {G1,W10,D4,L1,V2,M1} { join( complement( X ), complement
% 67.16/67.65 ( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145634) {G16,W5,D3,L1,V1,M1} { X ==> join( X, X ) }.
% 67.16/67.65 parent0[0]: (769) {G16,W5,D3,L1,V1,M1} P(756,191) { join( X, X ) ==> X }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145637) {G2,W11,D5,L1,V2,M1} { join( X, Y ) ==> join( join( X,
% 67.16/67.65 join( X, Y ) ), Y ) }.
% 67.16/67.65 parent0[0]: (30) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X )
% 67.16/67.65 = join( join( Z, X ), Y ) }.
% 67.16/67.65 parent1[0; 4]: (145634) {G16,W5,D3,L1,V1,M1} { X ==> join( X, X ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := join( X, Y )
% 67.16/67.65 Y := Y
% 67.16/67.65 Z := X
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := join( X, Y )
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145639) {G1,W11,D5,L1,V2,M1} { join( X, Y ) ==> join( join( join
% 67.16/67.65 ( X, X ), Y ), Y ) }.
% 67.16/67.65 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.16/67.65 join( X, Y ), Z ) }.
% 67.16/67.65 parent1[0; 5]: (145637) {G2,W11,D5,L1,V2,M1} { join( X, Y ) ==> join( join
% 67.16/67.65 ( X, join( X, Y ) ), Y ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := X
% 67.16/67.65 Z := Y
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145640) {G2,W9,D4,L1,V2,M1} { join( X, Y ) ==> join( join( X, Y
% 67.16/67.65 ), Y ) }.
% 67.16/67.65 parent0[0]: (769) {G16,W5,D3,L1,V1,M1} P(756,191) { join( X, X ) ==> X }.
% 67.16/67.65 parent1[0; 6]: (145639) {G1,W11,D5,L1,V2,M1} { join( X, Y ) ==> join( join
% 67.16/67.65 ( join( X, X ), Y ), Y ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145641) {G2,W9,D4,L1,V2,M1} { join( join( X, Y ), Y ) ==> join( X
% 67.16/67.65 , Y ) }.
% 67.16/67.65 parent0[0]: (145640) {G2,W9,D4,L1,V2,M1} { join( X, Y ) ==> join( join( X
% 67.16/67.65 , Y ), Y ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (774) {G17,W9,D4,L1,V2,M1} P(769,30);d(1);d(769) { join( join
% 67.16/67.65 ( X, Y ), Y ) ==> join( X, Y ) }.
% 67.16/67.65 parent0: (145641) {G2,W9,D4,L1,V2,M1} { join( join( X, Y ), Y ) ==> join(
% 67.16/67.65 X, Y ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145650) {G2,W9,D4,L1,V2,M1} { join( join( X, Y ), X ) = join( X
% 67.16/67.65 , Y ) }.
% 67.16/67.65 parent0[0]: (769) {G16,W5,D3,L1,V1,M1} P(756,191) { join( X, X ) ==> X }.
% 67.16/67.65 parent1[0; 7]: (30) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ),
% 67.16/67.65 X ) = join( join( Z, X ), Y ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 Z := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (775) {G17,W9,D4,L1,V2,M1} P(769,30) { join( join( X, Y ), X )
% 67.16/67.65 ==> join( X, Y ) }.
% 67.16/67.65 parent0: (145650) {G2,W9,D4,L1,V2,M1} { join( join( X, Y ), X ) = join( X
% 67.16/67.65 , Y ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145651) {G14,W6,D4,L1,V1,M1} { X ==> join( converse( zero ), X )
% 67.16/67.65 }.
% 67.16/67.65 parent0[0]: (758) {G14,W6,D4,L1,V1,M1} P(749,20);d(7) { join( converse(
% 67.16/67.65 zero ), X ) ==> X }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145653) {G12,W4,D3,L1,V0,M1} { zero ==> converse( zero ) }.
% 67.16/67.65 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.16/67.65 }.
% 67.16/67.65 parent1[0; 2]: (145651) {G14,W6,D4,L1,V1,M1} { X ==> join( converse( zero
% 67.16/67.65 ), X ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := converse( zero )
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := zero
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145654) {G12,W4,D3,L1,V0,M1} { converse( zero ) ==> zero }.
% 67.16/67.65 parent0[0]: (145653) {G12,W4,D3,L1,V0,M1} { zero ==> converse( zero ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (776) {G15,W4,D3,L1,V0,M1} P(758,740) { converse( zero ) ==>
% 67.16/67.65 zero }.
% 67.16/67.65 parent0: (145654) {G12,W4,D3,L1,V0,M1} { converse( zero ) ==> zero }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145656) {G11,W9,D4,L1,V1,M1} { converse( composition( X, top ) )
% 67.16/67.65 ==> composition( top, converse( X ) ) }.
% 67.16/67.65 parent0[0]: (225) {G11,W9,D4,L1,V1,M1} P(223,16) { composition( top,
% 67.16/67.65 converse( X ) ) ==> converse( composition( X, top ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145657) {G12,W8,D4,L1,V0,M1} { converse( composition( zero, top
% 67.16/67.65 ) ) ==> composition( top, zero ) }.
% 67.16/67.65 parent0[0]: (776) {G15,W4,D3,L1,V0,M1} P(758,740) { converse( zero ) ==>
% 67.16/67.65 zero }.
% 67.16/67.65 parent1[0; 7]: (145656) {G11,W9,D4,L1,V1,M1} { converse( composition( X,
% 67.16/67.65 top ) ) ==> composition( top, converse( X ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := zero
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (778) {G16,W8,D4,L1,V0,M1} P(776,225) { converse( composition
% 67.16/67.65 ( zero, top ) ) ==> composition( top, zero ) }.
% 67.16/67.65 parent0: (145657) {G12,W8,D4,L1,V0,M1} { converse( composition( zero, top
% 67.16/67.65 ) ) ==> composition( top, zero ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145660) {G1,W10,D5,L1,V2,M1} { composition( converse( Y ), X )
% 67.16/67.65 ==> converse( composition( converse( X ), Y ) ) }.
% 67.16/67.65 parent0[0]: (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition(
% 67.16/67.65 converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145663) {G2,W8,D5,L1,V0,M1} { composition( converse( complement
% 67.16/67.65 ( skol1 ) ), skol1 ) ==> converse( zero ) }.
% 67.16/67.65 parent0[0]: (755) {G12,W7,D4,L1,V0,M1} P(740,113) { composition( converse(
% 67.16/67.65 skol1 ), complement( skol1 ) ) ==> zero }.
% 67.16/67.65 parent1[0; 7]: (145660) {G1,W10,D5,L1,V2,M1} { composition( converse( Y )
% 67.16/67.65 , X ) ==> converse( composition( converse( X ), Y ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := skol1
% 67.16/67.65 Y := complement( skol1 )
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145664) {G3,W7,D5,L1,V0,M1} { composition( converse( complement
% 67.16/67.65 ( skol1 ) ), skol1 ) ==> zero }.
% 67.16/67.65 parent0[0]: (776) {G15,W4,D3,L1,V0,M1} P(758,740) { converse( zero ) ==>
% 67.16/67.65 zero }.
% 67.16/67.65 parent1[0; 6]: (145663) {G2,W8,D5,L1,V0,M1} { composition( converse(
% 67.16/67.65 complement( skol1 ) ), skol1 ) ==> converse( zero ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (783) {G16,W7,D5,L1,V0,M1} P(755,17);d(776) { composition(
% 67.16/67.65 converse( complement( skol1 ) ), skol1 ) ==> zero }.
% 67.16/67.65 parent0: (145664) {G3,W7,D5,L1,V0,M1} { composition( converse( complement
% 67.16/67.65 ( skol1 ) ), skol1 ) ==> zero }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145667) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ), Y ) ==>
% 67.16/67.65 join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.16/67.65 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 67.16/67.65 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Z
% 67.16/67.65 Z := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145669) {G1,W14,D5,L1,V1,M1} { composition( join( converse(
% 67.16/67.65 skol1 ), X ), complement( skol1 ) ) ==> join( zero, composition( X,
% 67.16/67.65 complement( skol1 ) ) ) }.
% 67.16/67.65 parent0[0]: (755) {G12,W7,D4,L1,V0,M1} P(740,113) { composition( converse(
% 67.16/67.65 skol1 ), complement( skol1 ) ) ==> zero }.
% 67.16/67.65 parent1[0; 9]: (145667) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ),
% 67.16/67.65 Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := converse( skol1 )
% 67.16/67.65 Y := complement( skol1 )
% 67.16/67.65 Z := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145671) {G2,W12,D5,L1,V1,M1} { composition( join( converse(
% 67.16/67.65 skol1 ), X ), complement( skol1 ) ) ==> composition( X, complement( skol1
% 67.16/67.65 ) ) }.
% 67.16/67.65 parent0[0]: (749) {G13,W5,D3,L1,V1,M1} P(715,0);d(748) { join( zero, X )
% 67.16/67.65 ==> X }.
% 67.16/67.65 parent1[0; 8]: (145669) {G1,W14,D5,L1,V1,M1} { composition( join( converse
% 67.16/67.65 ( skol1 ), X ), complement( skol1 ) ) ==> join( zero, composition( X,
% 67.16/67.65 complement( skol1 ) ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := composition( X, complement( skol1 ) )
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (784) {G14,W12,D5,L1,V1,M1} P(755,6);d(749) { composition(
% 67.16/67.65 join( converse( skol1 ), X ), complement( skol1 ) ) ==> composition( X,
% 67.16/67.65 complement( skol1 ) ) }.
% 67.16/67.65 parent0: (145671) {G2,W12,D5,L1,V1,M1} { composition( join( converse(
% 67.16/67.65 skol1 ), X ), complement( skol1 ) ) ==> composition( X, complement( skol1
% 67.16/67.65 ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145674) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ), Y ) ==>
% 67.16/67.65 join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.16/67.65 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 67.16/67.65 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Z
% 67.16/67.65 Z := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145677) {G1,W14,D5,L1,V1,M1} { composition( join( X, converse(
% 67.16/67.65 skol1 ) ), complement( skol1 ) ) ==> join( composition( X, complement(
% 67.16/67.65 skol1 ) ), zero ) }.
% 67.16/67.65 parent0[0]: (755) {G12,W7,D4,L1,V0,M1} P(740,113) { composition( converse(
% 67.16/67.65 skol1 ), complement( skol1 ) ) ==> zero }.
% 67.16/67.65 parent1[0; 13]: (145674) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z )
% 67.16/67.65 , Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 Y := complement( skol1 )
% 67.16/67.65 Z := converse( skol1 )
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145678) {G2,W12,D5,L1,V1,M1} { composition( join( X, converse(
% 67.16/67.65 skol1 ) ), complement( skol1 ) ) ==> composition( X, complement( skol1 )
% 67.16/67.65 ) }.
% 67.16/67.65 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.16/67.65 }.
% 67.16/67.65 parent1[0; 8]: (145677) {G1,W14,D5,L1,V1,M1} { composition( join( X,
% 67.16/67.65 converse( skol1 ) ), complement( skol1 ) ) ==> join( composition( X,
% 67.16/67.65 complement( skol1 ) ), zero ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := composition( X, complement( skol1 ) )
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (785) {G13,W12,D5,L1,V1,M1} P(755,6);d(740) { composition(
% 67.16/67.65 join( X, converse( skol1 ) ), complement( skol1 ) ) ==> composition( X,
% 67.16/67.65 complement( skol1 ) ) }.
% 67.16/67.65 parent0: (145678) {G2,W12,D5,L1,V1,M1} { composition( join( X, converse(
% 67.16/67.65 skol1 ) ), complement( skol1 ) ) ==> composition( X, complement( skol1 )
% 67.16/67.65 ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145681) {G1,W9,D4,L1,V1,M1} { composition( X, skol1 ) ==>
% 67.16/67.65 composition( composition( X, skol1 ), top ) }.
% 67.16/67.65 parent0[0]: (90) {G1,W9,D4,L1,V1,M1} P(13,4) { composition( composition( X
% 67.16/67.65 , skol1 ), top ) ==> composition( X, skol1 ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145683) {G2,W9,D5,L1,V0,M1} { composition( converse( complement
% 67.16/67.65 ( skol1 ) ), skol1 ) ==> composition( zero, top ) }.
% 67.16/67.65 parent0[0]: (783) {G16,W7,D5,L1,V0,M1} P(755,17);d(776) { composition(
% 67.16/67.65 converse( complement( skol1 ) ), skol1 ) ==> zero }.
% 67.16/67.65 parent1[0; 7]: (145681) {G1,W9,D4,L1,V1,M1} { composition( X, skol1 ) ==>
% 67.16/67.65 composition( composition( X, skol1 ), top ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := converse( complement( skol1 ) )
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145684) {G3,W5,D3,L1,V0,M1} { zero ==> composition( zero, top )
% 67.16/67.65 }.
% 67.16/67.65 parent0[0]: (783) {G16,W7,D5,L1,V0,M1} P(755,17);d(776) { composition(
% 67.16/67.65 converse( complement( skol1 ) ), skol1 ) ==> zero }.
% 67.16/67.65 parent1[0; 1]: (145683) {G2,W9,D5,L1,V0,M1} { composition( converse(
% 67.16/67.65 complement( skol1 ) ), skol1 ) ==> composition( zero, top ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145686) {G3,W5,D3,L1,V0,M1} { composition( zero, top ) ==> zero
% 67.16/67.65 }.
% 67.16/67.65 parent0[0]: (145684) {G3,W5,D3,L1,V0,M1} { zero ==> composition( zero, top
% 67.16/67.65 ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (789) {G17,W5,D3,L1,V0,M1} P(783,90) { composition( zero, top
% 67.16/67.65 ) ==> zero }.
% 67.16/67.65 parent0: (145686) {G3,W5,D3,L1,V0,M1} { composition( zero, top ) ==> zero
% 67.16/67.65 }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145691) {G17,W6,D3,L1,V0,M1} { converse( zero ) ==> composition
% 67.16/67.65 ( top, zero ) }.
% 67.16/67.65 parent0[0]: (789) {G17,W5,D3,L1,V0,M1} P(783,90) { composition( zero, top )
% 67.16/67.65 ==> zero }.
% 67.16/67.65 parent1[0; 2]: (778) {G16,W8,D4,L1,V0,M1} P(776,225) { converse(
% 67.16/67.65 composition( zero, top ) ) ==> composition( top, zero ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145692) {G16,W5,D3,L1,V0,M1} { zero ==> composition( top, zero )
% 67.16/67.65 }.
% 67.16/67.65 parent0[0]: (776) {G15,W4,D3,L1,V0,M1} P(758,740) { converse( zero ) ==>
% 67.16/67.65 zero }.
% 67.16/67.65 parent1[0; 1]: (145691) {G17,W6,D3,L1,V0,M1} { converse( zero ) ==>
% 67.16/67.65 composition( top, zero ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145693) {G16,W5,D3,L1,V0,M1} { composition( top, zero ) ==> zero
% 67.16/67.65 }.
% 67.16/67.65 parent0[0]: (145692) {G16,W5,D3,L1,V0,M1} { zero ==> composition( top,
% 67.16/67.65 zero ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (795) {G18,W5,D3,L1,V0,M1} S(778);d(789);d(776) { composition
% 67.16/67.65 ( top, zero ) ==> zero }.
% 67.16/67.65 parent0: (145693) {G16,W5,D3,L1,V0,M1} { composition( top, zero ) ==> zero
% 67.16/67.65 }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145695) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ), Y ) ==>
% 67.16/67.65 join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.16/67.65 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 67.16/67.65 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Z
% 67.16/67.65 Z := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145699) {G1,W11,D4,L1,V1,M1} { composition( join( top, X ), zero
% 67.16/67.65 ) ==> join( zero, composition( X, zero ) ) }.
% 67.16/67.65 parent0[0]: (795) {G18,W5,D3,L1,V0,M1} S(778);d(789);d(776) { composition(
% 67.16/67.65 top, zero ) ==> zero }.
% 67.16/67.65 parent1[0; 7]: (145695) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ),
% 67.16/67.65 Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := top
% 67.16/67.65 Y := zero
% 67.16/67.65 Z := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145701) {G2,W9,D4,L1,V1,M1} { composition( join( top, X ), zero
% 67.16/67.65 ) ==> composition( X, zero ) }.
% 67.16/67.65 parent0[0]: (749) {G13,W5,D3,L1,V1,M1} P(715,0);d(748) { join( zero, X )
% 67.16/67.65 ==> X }.
% 67.16/67.65 parent1[0; 6]: (145699) {G1,W11,D4,L1,V1,M1} { composition( join( top, X )
% 67.16/67.65 , zero ) ==> join( zero, composition( X, zero ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := composition( X, zero )
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145702) {G3,W7,D3,L1,V1,M1} { composition( top, zero ) ==>
% 67.16/67.65 composition( X, zero ) }.
% 67.16/67.65 parent0[0]: (214) {G9,W5,D3,L1,V1,M1} P(199,36);d(209) { join( top, X ) ==>
% 67.16/67.65 top }.
% 67.16/67.65 parent1[0; 2]: (145701) {G2,W9,D4,L1,V1,M1} { composition( join( top, X )
% 67.16/67.65 , zero ) ==> composition( X, zero ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145703) {G4,W5,D3,L1,V1,M1} { zero ==> composition( X, zero )
% 67.16/67.65 }.
% 67.16/67.65 parent0[0]: (795) {G18,W5,D3,L1,V0,M1} S(778);d(789);d(776) { composition(
% 67.16/67.65 top, zero ) ==> zero }.
% 67.16/67.65 parent1[0; 1]: (145702) {G3,W7,D3,L1,V1,M1} { composition( top, zero ) ==>
% 67.16/67.65 composition( X, zero ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145704) {G4,W5,D3,L1,V1,M1} { composition( X, zero ) ==> zero }.
% 67.16/67.65 parent0[0]: (145703) {G4,W5,D3,L1,V1,M1} { zero ==> composition( X, zero )
% 67.16/67.65 }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (796) {G19,W5,D3,L1,V1,M1} P(795,6);d(749);d(214);d(795) {
% 67.16/67.65 composition( X, zero ) ==> zero }.
% 67.16/67.65 parent0: (145704) {G4,W5,D3,L1,V1,M1} { composition( X, zero ) ==> zero
% 67.16/67.65 }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145706) {G1,W10,D5,L1,V2,M1} { composition( converse( Y ), X )
% 67.16/67.65 ==> converse( composition( converse( X ), Y ) ) }.
% 67.16/67.65 parent0[0]: (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition(
% 67.16/67.65 converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145709) {G2,W7,D4,L1,V1,M1} { composition( converse( zero ), X )
% 67.16/67.65 ==> converse( zero ) }.
% 67.16/67.65 parent0[0]: (796) {G19,W5,D3,L1,V1,M1} P(795,6);d(749);d(214);d(795) {
% 67.16/67.65 composition( X, zero ) ==> zero }.
% 67.16/67.65 parent1[0; 6]: (145706) {G1,W10,D5,L1,V2,M1} { composition( converse( Y )
% 67.16/67.65 , X ) ==> converse( composition( converse( X ), Y ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := converse( X )
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 Y := zero
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145711) {G3,W6,D4,L1,V1,M1} { composition( converse( zero ), X )
% 67.16/67.65 ==> zero }.
% 67.16/67.65 parent0[0]: (776) {G15,W4,D3,L1,V0,M1} P(758,740) { converse( zero ) ==>
% 67.16/67.65 zero }.
% 67.16/67.65 parent1[0; 5]: (145709) {G2,W7,D4,L1,V1,M1} { composition( converse( zero
% 67.16/67.65 ), X ) ==> converse( zero ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145712) {G4,W5,D3,L1,V1,M1} { composition( zero, X ) ==> zero
% 67.16/67.65 }.
% 67.16/67.65 parent0[0]: (776) {G15,W4,D3,L1,V0,M1} P(758,740) { converse( zero ) ==>
% 67.16/67.65 zero }.
% 67.16/67.65 parent1[0; 2]: (145711) {G3,W6,D4,L1,V1,M1} { composition( converse( zero
% 67.16/67.65 ), X ) ==> zero }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (797) {G20,W5,D3,L1,V1,M1} P(796,17);d(776) { composition(
% 67.16/67.65 zero, X ) ==> zero }.
% 67.16/67.65 parent0: (145712) {G4,W5,D3,L1,V1,M1} { composition( zero, X ) ==> zero
% 67.16/67.65 }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145717) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.16/67.65 complement( join( complement( X ), Y ) ) ) }.
% 67.16/67.65 parent0[0]: (48) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 67.16/67.65 complement( join( complement( X ), Y ) ) ) ==> X }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145720) {G2,W12,D7,L1,V2,M1} { X ==> join( meet( X, complement(
% 67.16/67.65 meet( complement( X ), Y ) ) ), complement( top ) ) }.
% 67.16/67.65 parent0[0]: (724) {G10,W8,D5,L1,V2,M1} P(48,37);d(215) { join( X,
% 67.16/67.65 complement( meet( X, Y ) ) ) ==> top }.
% 67.16/67.65 parent1[0; 11]: (145717) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.16/67.65 complement( join( complement( X ), Y ) ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := complement( X )
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 Y := complement( meet( complement( X ), Y ) )
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145721) {G2,W11,D7,L1,V2,M1} { X ==> join( meet( X, complement(
% 67.16/67.65 meet( complement( X ), Y ) ) ), zero ) }.
% 67.16/67.65 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.65 zero }.
% 67.16/67.65 parent1[0; 10]: (145720) {G2,W12,D7,L1,V2,M1} { X ==> join( meet( X,
% 67.16/67.65 complement( meet( complement( X ), Y ) ) ), complement( top ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145722) {G3,W9,D6,L1,V2,M1} { X ==> meet( X, complement( meet(
% 67.16/67.65 complement( X ), Y ) ) ) }.
% 67.16/67.65 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.16/67.65 }.
% 67.16/67.65 parent1[0; 2]: (145721) {G2,W11,D7,L1,V2,M1} { X ==> join( meet( X,
% 67.16/67.65 complement( meet( complement( X ), Y ) ) ), zero ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := meet( X, complement( meet( complement( X ), Y ) ) )
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145723) {G3,W9,D6,L1,V2,M1} { meet( X, complement( meet(
% 67.16/67.65 complement( X ), Y ) ) ) ==> X }.
% 67.16/67.65 parent0[0]: (145722) {G3,W9,D6,L1,V2,M1} { X ==> meet( X, complement( meet
% 67.16/67.65 ( complement( X ), Y ) ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (803) {G12,W9,D6,L1,V2,M1} P(724,48);d(77);d(740) { meet( X,
% 67.16/67.65 complement( meet( complement( X ), Y ) ) ) ==> X }.
% 67.16/67.65 parent0: (145723) {G3,W9,D6,L1,V2,M1} { meet( X, complement( meet(
% 67.16/67.65 complement( X ), Y ) ) ) ==> X }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145725) {G3,W10,D6,L1,V2,M1} { top ==> join( join( complement(
% 67.16/67.65 join( X, Y ) ), Y ), X ) }.
% 67.16/67.65 parent0[0]: (310) {G3,W10,D6,L1,V2,M1} P(0,27) { join( join( complement(
% 67.16/67.65 join( Y, X ) ), X ), Y ) ==> top }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := Y
% 67.16/67.65 Y := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145728) {G4,W11,D6,L1,V2,M1} { top ==> join( join( complement(
% 67.16/67.65 top ), complement( meet( X, Y ) ) ), X ) }.
% 67.16/67.65 parent0[0]: (724) {G10,W8,D5,L1,V2,M1} P(48,37);d(215) { join( X,
% 67.16/67.65 complement( meet( X, Y ) ) ) ==> top }.
% 67.16/67.65 parent1[0; 5]: (145725) {G3,W10,D6,L1,V2,M1} { top ==> join( join(
% 67.16/67.65 complement( join( X, Y ) ), Y ), X ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 Y := complement( meet( X, Y ) )
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145729) {G5,W10,D6,L1,V2,M1} { top ==> join( complement( meet(
% 67.16/67.65 top, meet( X, Y ) ) ), X ) }.
% 67.16/67.65 parent0[0]: (773) {G16,W10,D4,L1,V2,M1} P(3,756) { join( complement( X ),
% 67.16/67.65 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.16/67.65 parent1[0; 3]: (145728) {G4,W11,D6,L1,V2,M1} { top ==> join( join(
% 67.16/67.65 complement( top ), complement( meet( X, Y ) ) ), X ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := top
% 67.16/67.65 Y := meet( X, Y )
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145730) {G6,W8,D5,L1,V2,M1} { top ==> join( complement( meet( X
% 67.16/67.65 , Y ) ), X ) }.
% 67.16/67.65 parent0[0]: (747) {G12,W5,D3,L1,V1,M1} P(75,715);d(740) { meet( top, X )
% 67.16/67.65 ==> X }.
% 67.16/67.65 parent1[0; 4]: (145729) {G5,W10,D6,L1,V2,M1} { top ==> join( complement(
% 67.16/67.65 meet( top, meet( X, Y ) ) ), X ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := meet( X, Y )
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145731) {G6,W8,D5,L1,V2,M1} { join( complement( meet( X, Y ) ), X
% 67.16/67.65 ) ==> top }.
% 67.16/67.65 parent0[0]: (145730) {G6,W8,D5,L1,V2,M1} { top ==> join( complement( meet
% 67.16/67.65 ( X, Y ) ), X ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (804) {G17,W8,D5,L1,V2,M1} P(724,310);d(773);d(747) { join(
% 67.16/67.65 complement( meet( X, Y ) ), X ) ==> top }.
% 67.16/67.65 parent0: (145731) {G6,W8,D5,L1,V2,M1} { join( complement( meet( X, Y ) ),
% 67.16/67.65 X ) ==> top }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145732) {G10,W8,D5,L1,V2,M1} { top ==> join( X, complement( meet
% 67.16/67.65 ( X, Y ) ) ) }.
% 67.16/67.65 parent0[0]: (724) {G10,W8,D5,L1,V2,M1} P(48,37);d(215) { join( X,
% 67.16/67.65 complement( meet( X, Y ) ) ) ==> top }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145733) {G2,W8,D5,L1,V2,M1} { top ==> join( X, complement( meet
% 67.16/67.65 ( Y, X ) ) ) }.
% 67.16/67.65 parent0[0]: (75) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 67.16/67.65 Y ) }.
% 67.16/67.65 parent1[0; 5]: (145732) {G10,W8,D5,L1,V2,M1} { top ==> join( X, complement
% 67.16/67.65 ( meet( X, Y ) ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := Y
% 67.16/67.65 Y := X
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145736) {G2,W8,D5,L1,V2,M1} { join( X, complement( meet( Y, X ) )
% 67.16/67.65 ) ==> top }.
% 67.16/67.65 parent0[0]: (145733) {G2,W8,D5,L1,V2,M1} { top ==> join( X, complement(
% 67.16/67.65 meet( Y, X ) ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (811) {G11,W8,D5,L1,V2,M1} P(75,724) { join( X, complement(
% 67.16/67.65 meet( Y, X ) ) ) ==> top }.
% 67.16/67.65 parent0: (145736) {G2,W8,D5,L1,V2,M1} { join( X, complement( meet( Y, X )
% 67.16/67.65 ) ) ==> top }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145738) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.16/67.65 complement( join( complement( X ), Y ) ) ) }.
% 67.16/67.65 parent0[0]: (48) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 67.16/67.65 complement( join( complement( X ), Y ) ) ) ==> X }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145741) {G2,W12,D5,L1,V2,M1} { meet( X, Y ) ==> join( meet( meet
% 67.16/67.65 ( X, Y ), X ), complement( top ) ) }.
% 67.16/67.65 parent0[0]: (804) {G17,W8,D5,L1,V2,M1} P(724,310);d(773);d(747) { join(
% 67.16/67.65 complement( meet( X, Y ) ), X ) ==> top }.
% 67.16/67.65 parent1[0; 11]: (145738) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.16/67.65 complement( join( complement( X ), Y ) ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := meet( X, Y )
% 67.16/67.65 Y := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145742) {G2,W11,D5,L1,V2,M1} { meet( X, Y ) ==> join( meet( meet
% 67.16/67.65 ( X, Y ), X ), zero ) }.
% 67.16/67.65 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.65 zero }.
% 67.16/67.65 parent1[0; 10]: (145741) {G2,W12,D5,L1,V2,M1} { meet( X, Y ) ==> join(
% 67.16/67.65 meet( meet( X, Y ), X ), complement( top ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145743) {G3,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X, Y
% 67.16/67.65 ), X ) }.
% 67.16/67.65 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.16/67.65 }.
% 67.16/67.65 parent1[0; 4]: (145742) {G2,W11,D5,L1,V2,M1} { meet( X, Y ) ==> join( meet
% 67.16/67.65 ( meet( X, Y ), X ), zero ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := meet( meet( X, Y ), X )
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145744) {G3,W9,D4,L1,V2,M1} { meet( meet( X, Y ), X ) ==> meet( X
% 67.16/67.65 , Y ) }.
% 67.16/67.65 parent0[0]: (145743) {G3,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X
% 67.16/67.65 , Y ), X ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (814) {G18,W9,D4,L1,V2,M1} P(804,48);d(77);d(740) { meet( meet
% 67.16/67.65 ( X, Y ), X ) ==> meet( X, Y ) }.
% 67.16/67.65 parent0: (145744) {G3,W9,D4,L1,V2,M1} { meet( meet( X, Y ), X ) ==> meet(
% 67.16/67.65 X, Y ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145745) {G17,W8,D5,L1,V2,M1} { top ==> join( complement( meet( X
% 67.16/67.65 , Y ) ), X ) }.
% 67.16/67.65 parent0[0]: (804) {G17,W8,D5,L1,V2,M1} P(724,310);d(773);d(747) { join(
% 67.16/67.65 complement( meet( X, Y ) ), X ) ==> top }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145746) {G2,W8,D5,L1,V2,M1} { top ==> join( complement( meet( Y
% 67.16/67.65 , X ) ), X ) }.
% 67.16/67.65 parent0[0]: (75) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 67.16/67.65 Y ) }.
% 67.16/67.65 parent1[0; 4]: (145745) {G17,W8,D5,L1,V2,M1} { top ==> join( complement(
% 67.16/67.65 meet( X, Y ) ), X ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := Y
% 67.16/67.65 Y := X
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145749) {G2,W8,D5,L1,V2,M1} { join( complement( meet( X, Y ) ), Y
% 67.16/67.65 ) ==> top }.
% 67.16/67.65 parent0[0]: (145746) {G2,W8,D5,L1,V2,M1} { top ==> join( complement( meet
% 67.16/67.65 ( Y, X ) ), X ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := Y
% 67.16/67.65 Y := X
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (818) {G18,W8,D5,L1,V2,M1} P(75,804) { join( complement( meet
% 67.16/67.65 ( Y, X ) ), X ) ==> top }.
% 67.16/67.65 parent0: (145749) {G2,W8,D5,L1,V2,M1} { join( complement( meet( X, Y ) ),
% 67.16/67.65 Y ) ==> top }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := Y
% 67.16/67.65 Y := X
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145751) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.16/67.65 complement( join( complement( X ), Y ) ) ) }.
% 67.16/67.65 parent0[0]: (48) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 67.16/67.65 complement( join( complement( X ), Y ) ) ) ==> X }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145754) {G2,W12,D5,L1,V2,M1} { meet( X, Y ) ==> join( meet( meet
% 67.16/67.65 ( X, Y ), Y ), complement( top ) ) }.
% 67.16/67.65 parent0[0]: (818) {G18,W8,D5,L1,V2,M1} P(75,804) { join( complement( meet(
% 67.16/67.65 Y, X ) ), X ) ==> top }.
% 67.16/67.65 parent1[0; 11]: (145751) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.16/67.65 complement( join( complement( X ), Y ) ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := Y
% 67.16/67.65 Y := X
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := meet( X, Y )
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145755) {G2,W11,D5,L1,V2,M1} { meet( X, Y ) ==> join( meet( meet
% 67.16/67.65 ( X, Y ), Y ), zero ) }.
% 67.16/67.65 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.65 zero }.
% 67.16/67.65 parent1[0; 10]: (145754) {G2,W12,D5,L1,V2,M1} { meet( X, Y ) ==> join(
% 67.16/67.65 meet( meet( X, Y ), Y ), complement( top ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145756) {G3,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X, Y
% 67.16/67.65 ), Y ) }.
% 67.16/67.65 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.16/67.65 }.
% 67.16/67.65 parent1[0; 4]: (145755) {G2,W11,D5,L1,V2,M1} { meet( X, Y ) ==> join( meet
% 67.16/67.65 ( meet( X, Y ), Y ), zero ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := meet( meet( X, Y ), Y )
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145757) {G3,W9,D4,L1,V2,M1} { meet( meet( X, Y ), Y ) ==> meet( X
% 67.16/67.65 , Y ) }.
% 67.16/67.65 parent0[0]: (145756) {G3,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X
% 67.16/67.65 , Y ), Y ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (820) {G19,W9,D4,L1,V2,M1} P(818,48);d(77);d(740) { meet( meet
% 67.16/67.65 ( X, Y ), Y ) ==> meet( X, Y ) }.
% 67.16/67.65 parent0: (145757) {G3,W9,D4,L1,V2,M1} { meet( meet( X, Y ), Y ) ==> meet(
% 67.16/67.65 X, Y ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145759) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 67.16/67.65 ( complement( X ), complement( Y ) ) ) }.
% 67.16/67.65 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 67.16/67.65 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145761) {G1,W9,D5,L1,V2,M1} { meet( meet( X, complement( Y ) ),
% 67.16/67.65 Y ) ==> complement( top ) }.
% 67.16/67.65 parent0[0]: (818) {G18,W8,D5,L1,V2,M1} P(75,804) { join( complement( meet(
% 67.16/67.65 Y, X ) ), X ) ==> top }.
% 67.16/67.65 parent1[0; 8]: (145759) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 67.16/67.65 ( join( complement( X ), complement( Y ) ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := complement( Y )
% 67.16/67.65 Y := X
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := meet( X, complement( Y ) )
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145762) {G2,W8,D5,L1,V2,M1} { meet( meet( X, complement( Y ) ),
% 67.16/67.65 Y ) ==> zero }.
% 67.16/67.65 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.16/67.65 zero }.
% 67.16/67.65 parent1[0; 7]: (145761) {G1,W9,D5,L1,V2,M1} { meet( meet( X, complement( Y
% 67.16/67.65 ) ), Y ) ==> complement( top ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (826) {G19,W8,D5,L1,V2,M1} P(818,3);d(77) { meet( meet( X,
% 67.16/67.65 complement( Y ) ), Y ) ==> zero }.
% 67.16/67.65 parent0: (145762) {G2,W8,D5,L1,V2,M1} { meet( meet( X, complement( Y ) ),
% 67.16/67.65 Y ) ==> zero }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145765) {G19,W8,D5,L1,V2,M1} { zero ==> meet( meet( X, complement
% 67.16/67.65 ( Y ) ), Y ) }.
% 67.16/67.65 parent0[0]: (826) {G19,W8,D5,L1,V2,M1} P(818,3);d(77) { meet( meet( X,
% 67.16/67.65 complement( Y ) ), Y ) ==> zero }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145766) {G16,W8,D4,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 67.16/67.65 complement( Y ) ) }.
% 67.16/67.65 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.16/67.65 complement( X ) ) ==> X }.
% 67.16/67.65 parent1[0; 5]: (145765) {G19,W8,D5,L1,V2,M1} { zero ==> meet( meet( X,
% 67.16/67.65 complement( Y ) ), Y ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := Y
% 67.16/67.65 end
% 67.16/67.65 substitution1:
% 67.16/67.65 X := X
% 67.16/67.65 Y := complement( Y )
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145767) {G16,W8,D4,L1,V2,M1} { meet( meet( X, Y ), complement( Y
% 67.16/67.65 ) ) ==> zero }.
% 67.16/67.65 parent0[0]: (145766) {G16,W8,D4,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 67.16/67.65 complement( Y ) ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 subsumption: (828) {G20,W8,D4,L1,V2,M1} P(756,826) { meet( meet( Y, X ),
% 67.16/67.65 complement( X ) ) ==> zero }.
% 67.16/67.65 parent0: (145767) {G16,W8,D4,L1,V2,M1} { meet( meet( X, Y ), complement( Y
% 67.16/67.65 ) ) ==> zero }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := Y
% 67.16/67.65 Y := X
% 67.16/67.65 end
% 67.16/67.65 permutation0:
% 67.16/67.65 0 ==> 0
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 eqswap: (145768) {G19,W8,D5,L1,V2,M1} { zero ==> meet( meet( X, complement
% 67.16/67.65 ( Y ) ), Y ) }.
% 67.16/67.65 parent0[0]: (826) {G19,W8,D5,L1,V2,M1} P(818,3);d(77) { meet( meet( X,
% 67.16/67.65 complement( Y ) ), Y ) ==> zero }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := X
% 67.16/67.65 Y := Y
% 67.16/67.65 end
% 67.16/67.65
% 67.16/67.65 paramod: (145769) {G2,W8,D5,L1,V2,M1} { zero ==> meet( Y, meet( X,
% 67.16/67.65 complement( Y ) ) ) }.
% 67.16/67.65 parent0[0]: (75) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 67.16/67.65 Y ) }.
% 67.16/67.65 parent1[0; 2]: (145768) {G19,W8,D5,L1,V2,M1} { zero ==> meet( meet( X,
% 67.16/67.65 complement( Y ) ), Y ) }.
% 67.16/67.65 substitution0:
% 67.16/67.65 X := Y
% 67.16/67.65 Y := meet( X, complement( Y ) )
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145773) {G2,W8,D5,L1,V2,M1} { meet( X, meet( Y, complement( X ) )
% 67.27/67.65 ) ==> zero }.
% 67.27/67.65 parent0[0]: (145769) {G2,W8,D5,L1,V2,M1} { zero ==> meet( Y, meet( X,
% 67.27/67.65 complement( Y ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (829) {G20,W8,D5,L1,V2,M1} P(826,75) { meet( Y, meet( X,
% 67.27/67.65 complement( Y ) ) ) ==> zero }.
% 67.27/67.65 parent0: (145773) {G2,W8,D5,L1,V2,M1} { meet( X, meet( Y, complement( X )
% 67.27/67.65 ) ) ==> zero }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145777) {G20,W8,D4,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 67.27/67.65 complement( Y ) ) }.
% 67.27/67.65 parent0[0]: (828) {G20,W8,D4,L1,V2,M1} P(756,826) { meet( meet( Y, X ),
% 67.27/67.65 complement( X ) ) ==> zero }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145778) {G2,W8,D4,L1,V2,M1} { zero ==> meet( complement( Y ),
% 67.27/67.65 meet( X, Y ) ) }.
% 67.27/67.65 parent0[0]: (75) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 67.27/67.65 Y ) }.
% 67.27/67.65 parent1[0; 2]: (145777) {G20,W8,D4,L1,V2,M1} { zero ==> meet( meet( X, Y )
% 67.27/67.65 , complement( Y ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := complement( Y )
% 67.27/67.65 Y := meet( X, Y )
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145782) {G2,W8,D4,L1,V2,M1} { meet( complement( X ), meet( Y, X )
% 67.27/67.65 ) ==> zero }.
% 67.27/67.65 parent0[0]: (145778) {G2,W8,D4,L1,V2,M1} { zero ==> meet( complement( Y )
% 67.27/67.65 , meet( X, Y ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (830) {G21,W8,D4,L1,V2,M1} P(828,75) { meet( complement( Y ),
% 67.27/67.65 meet( X, Y ) ) ==> zero }.
% 67.27/67.65 parent0: (145782) {G2,W8,D4,L1,V2,M1} { meet( complement( X ), meet( Y, X
% 67.27/67.65 ) ) ==> zero }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145786) {G20,W8,D4,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 67.27/67.65 complement( Y ) ) }.
% 67.27/67.65 parent0[0]: (828) {G20,W8,D4,L1,V2,M1} P(756,826) { meet( meet( Y, X ),
% 67.27/67.65 complement( X ) ) ==> zero }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145788) {G2,W8,D4,L1,V2,M1} { zero ==> meet( meet( Y, X ),
% 67.27/67.65 complement( Y ) ) }.
% 67.27/67.65 parent0[0]: (75) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 67.27/67.65 Y ) }.
% 67.27/67.65 parent1[0; 3]: (145786) {G20,W8,D4,L1,V2,M1} { zero ==> meet( meet( X, Y )
% 67.27/67.65 , complement( Y ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145794) {G2,W8,D4,L1,V2,M1} { meet( meet( X, Y ), complement( X )
% 67.27/67.65 ) ==> zero }.
% 67.27/67.65 parent0[0]: (145788) {G2,W8,D4,L1,V2,M1} { zero ==> meet( meet( Y, X ),
% 67.27/67.65 complement( Y ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (831) {G21,W8,D4,L1,V2,M1} P(75,828) { meet( meet( Y, X ),
% 67.27/67.65 complement( Y ) ) ==> zero }.
% 67.27/67.65 parent0: (145794) {G2,W8,D4,L1,V2,M1} { meet( meet( X, Y ), complement( X
% 67.27/67.65 ) ) ==> zero }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145796) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.27/67.65 complement( join( complement( X ), Y ) ) ) }.
% 67.27/67.65 parent0[0]: (48) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 67.27/67.65 complement( join( complement( X ), Y ) ) ) ==> X }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145799) {G2,W13,D7,L1,V2,M1} { complement( X ) ==> join( zero,
% 67.27/67.65 complement( join( complement( complement( X ) ), meet( Y, X ) ) ) ) }.
% 67.27/67.65 parent0[0]: (830) {G21,W8,D4,L1,V2,M1} P(828,75) { meet( complement( Y ),
% 67.27/67.65 meet( X, Y ) ) ==> zero }.
% 67.27/67.65 parent1[0; 4]: (145796) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.27/67.65 complement( join( complement( X ), Y ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := complement( X )
% 67.27/67.65 Y := meet( Y, X )
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145800) {G3,W11,D6,L1,V2,M1} { complement( X ) ==> complement(
% 67.27/67.65 join( complement( complement( X ) ), meet( Y, X ) ) ) }.
% 67.27/67.65 parent0[0]: (749) {G13,W5,D3,L1,V1,M1} P(715,0);d(748) { join( zero, X )
% 67.27/67.65 ==> X }.
% 67.27/67.65 parent1[0; 3]: (145799) {G2,W13,D7,L1,V2,M1} { complement( X ) ==> join(
% 67.27/67.65 zero, complement( join( complement( complement( X ) ), meet( Y, X ) ) ) )
% 67.27/67.65 }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := complement( join( complement( complement( X ) ), meet( Y, X ) ) )
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145801) {G4,W10,D5,L1,V2,M1} { complement( X ) ==> meet(
% 67.27/67.65 complement( X ), complement( meet( Y, X ) ) ) }.
% 67.27/67.65 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.65 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.65 parent1[0; 3]: (145800) {G3,W11,D6,L1,V2,M1} { complement( X ) ==>
% 67.27/67.65 complement( join( complement( complement( X ) ), meet( Y, X ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := meet( Y, X )
% 67.27/67.65 Y := complement( X )
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145802) {G4,W10,D5,L1,V2,M1} { meet( complement( X ), complement
% 67.27/67.65 ( meet( Y, X ) ) ) ==> complement( X ) }.
% 67.27/67.65 parent0[0]: (145801) {G4,W10,D5,L1,V2,M1} { complement( X ) ==> meet(
% 67.27/67.65 complement( X ), complement( meet( Y, X ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (832) {G22,W10,D5,L1,V2,M1} P(830,48);d(749);d(772) { meet(
% 67.27/67.65 complement( X ), complement( meet( Y, X ) ) ) ==> complement( X ) }.
% 67.27/67.65 parent0: (145802) {G4,W10,D5,L1,V2,M1} { meet( complement( X ), complement
% 67.27/67.65 ( meet( Y, X ) ) ) ==> complement( X ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145804) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.27/67.65 complement( join( complement( X ), Y ) ) ) }.
% 67.27/67.65 parent0[0]: (48) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 67.27/67.65 complement( join( complement( X ), Y ) ) ) ==> X }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145807) {G2,W12,D7,L1,V2,M1} { X ==> join( zero, complement(
% 67.27/67.65 join( complement( X ), meet( Y, complement( X ) ) ) ) ) }.
% 67.27/67.65 parent0[0]: (829) {G20,W8,D5,L1,V2,M1} P(826,75) { meet( Y, meet( X,
% 67.27/67.65 complement( Y ) ) ) ==> zero }.
% 67.27/67.65 parent1[0; 3]: (145804) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.27/67.65 complement( join( complement( X ), Y ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := meet( Y, complement( X ) )
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145808) {G3,W10,D6,L1,V2,M1} { X ==> complement( join(
% 67.27/67.65 complement( X ), meet( Y, complement( X ) ) ) ) }.
% 67.27/67.65 parent0[0]: (749) {G13,W5,D3,L1,V1,M1} P(715,0);d(748) { join( zero, X )
% 67.27/67.65 ==> X }.
% 67.27/67.65 parent1[0; 2]: (145807) {G2,W12,D7,L1,V2,M1} { X ==> join( zero,
% 67.27/67.65 complement( join( complement( X ), meet( Y, complement( X ) ) ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := complement( join( complement( X ), meet( Y, complement( X ) ) ) )
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145809) {G4,W9,D6,L1,V2,M1} { X ==> meet( X, complement( meet( Y
% 67.27/67.65 , complement( X ) ) ) ) }.
% 67.27/67.65 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.65 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.65 parent1[0; 2]: (145808) {G3,W10,D6,L1,V2,M1} { X ==> complement( join(
% 67.27/67.65 complement( X ), meet( Y, complement( X ) ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := meet( Y, complement( X ) )
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145810) {G4,W9,D6,L1,V2,M1} { meet( X, complement( meet( Y,
% 67.27/67.65 complement( X ) ) ) ) ==> X }.
% 67.27/67.65 parent0[0]: (145809) {G4,W9,D6,L1,V2,M1} { X ==> meet( X, complement( meet
% 67.27/67.65 ( Y, complement( X ) ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (835) {G21,W9,D6,L1,V2,M1} P(829,48);d(749);d(772) { meet( X,
% 67.27/67.65 complement( meet( Y, complement( X ) ) ) ) ==> X }.
% 67.27/67.65 parent0: (145810) {G4,W9,D6,L1,V2,M1} { meet( X, complement( meet( Y,
% 67.27/67.65 complement( X ) ) ) ) ==> X }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145812) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 67.27/67.65 join( X, Y ), Z ) }.
% 67.27/67.65 parent0[0]: (29) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 67.27/67.65 join( join( Y, Z ), X ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 Z := Z
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145821) {G2,W12,D5,L1,V3,M1} { join( top, Z ) = join( join( Z, X
% 67.27/67.65 ), complement( meet( Y, X ) ) ) }.
% 67.27/67.65 parent0[0]: (811) {G11,W8,D5,L1,V2,M1} P(75,724) { join( X, complement(
% 67.27/67.65 meet( Y, X ) ) ) ==> top }.
% 67.27/67.65 parent1[0; 2]: (145812) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) =
% 67.27/67.65 join( join( X, Y ), Z ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := Z
% 67.27/67.65 Y := X
% 67.27/67.65 Z := complement( meet( Y, X ) )
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145826) {G3,W10,D5,L1,V3,M1} { top = join( join( X, Y ),
% 67.27/67.65 complement( meet( Z, Y ) ) ) }.
% 67.27/67.65 parent0[0]: (214) {G9,W5,D3,L1,V1,M1} P(199,36);d(209) { join( top, X ) ==>
% 67.27/67.65 top }.
% 67.27/67.65 parent1[0; 1]: (145821) {G2,W12,D5,L1,V3,M1} { join( top, Z ) = join( join
% 67.27/67.65 ( Z, X ), complement( meet( Y, X ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := Z
% 67.27/67.65 Z := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145827) {G3,W10,D5,L1,V3,M1} { join( join( X, Y ), complement(
% 67.27/67.65 meet( Z, Y ) ) ) = top }.
% 67.27/67.65 parent0[0]: (145826) {G3,W10,D5,L1,V3,M1} { top = join( join( X, Y ),
% 67.27/67.65 complement( meet( Z, Y ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 Z := Z
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (840) {G12,W10,D5,L1,V3,M1} P(811,29);d(214) { join( join( Z,
% 67.27/67.65 X ), complement( meet( Y, X ) ) ) ==> top }.
% 67.27/67.65 parent0: (145827) {G3,W10,D5,L1,V3,M1} { join( join( X, Y ), complement(
% 67.27/67.65 meet( Z, Y ) ) ) = top }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Z
% 67.27/67.65 Y := X
% 67.27/67.65 Z := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145828) {G19,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X, Y
% 67.27/67.65 ), Y ) }.
% 67.27/67.65 parent0[0]: (820) {G19,W9,D4,L1,V2,M1} P(818,48);d(77);d(740) { meet( meet
% 67.27/67.65 ( X, Y ), Y ) ==> meet( X, Y ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145831) {G2,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( Y, meet( X
% 67.27/67.65 , Y ) ) }.
% 67.27/67.65 parent0[0]: (75) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 67.27/67.65 Y ) }.
% 67.27/67.65 parent1[0; 4]: (145828) {G19,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet
% 67.27/67.65 ( X, Y ), Y ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := meet( X, Y )
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145844) {G2,W9,D4,L1,V2,M1} { meet( Y, meet( X, Y ) ) ==> meet( X
% 67.27/67.65 , Y ) }.
% 67.27/67.65 parent0[0]: (145831) {G2,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( Y, meet
% 67.27/67.65 ( X, Y ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (843) {G20,W9,D4,L1,V2,M1} P(820,75) { meet( Y, meet( X, Y ) )
% 67.27/67.65 ==> meet( X, Y ) }.
% 67.27/67.65 parent0: (145844) {G2,W9,D4,L1,V2,M1} { meet( Y, meet( X, Y ) ) ==> meet(
% 67.27/67.65 X, Y ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145846) {G17,W9,D4,L1,V2,M1} { join( X, Y ) ==> join( join( X, Y
% 67.27/67.65 ), Y ) }.
% 67.27/67.65 parent0[0]: (774) {G17,W9,D4,L1,V2,M1} P(769,30);d(1);d(769) { join( join(
% 67.27/67.65 X, Y ), Y ) ==> join( X, Y ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145849) {G2,W17,D6,L1,V2,M1} { join( meet( X, Y ), complement(
% 67.27/67.65 join( complement( X ), Y ) ) ) ==> join( X, complement( join( complement
% 67.27/67.65 ( X ), Y ) ) ) }.
% 67.27/67.65 parent0[0]: (48) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 67.27/67.65 complement( join( complement( X ), Y ) ) ) ==> X }.
% 67.27/67.65 parent1[0; 11]: (145846) {G17,W9,D4,L1,V2,M1} { join( X, Y ) ==> join(
% 67.27/67.65 join( X, Y ), Y ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := meet( X, Y )
% 67.27/67.65 Y := complement( join( complement( X ), Y ) )
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145850) {G2,W9,D6,L1,V2,M1} { X ==> join( X, complement( join(
% 67.27/67.65 complement( X ), Y ) ) ) }.
% 67.27/67.65 parent0[0]: (48) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 67.27/67.65 complement( join( complement( X ), Y ) ) ) ==> X }.
% 67.27/67.65 parent1[0; 1]: (145849) {G2,W17,D6,L1,V2,M1} { join( meet( X, Y ),
% 67.27/67.65 complement( join( complement( X ), Y ) ) ) ==> join( X, complement( join
% 67.27/67.65 ( complement( X ), Y ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145857) {G3,W8,D5,L1,V2,M1} { X ==> join( X, meet( X, complement
% 67.27/67.65 ( Y ) ) ) }.
% 67.27/67.65 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.65 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.65 parent1[0; 4]: (145850) {G2,W9,D6,L1,V2,M1} { X ==> join( X, complement(
% 67.27/67.65 join( complement( X ), Y ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145858) {G3,W8,D5,L1,V2,M1} { join( X, meet( X, complement( Y ) )
% 67.27/67.65 ) ==> X }.
% 67.27/67.65 parent0[0]: (145857) {G3,W8,D5,L1,V2,M1} { X ==> join( X, meet( X,
% 67.27/67.65 complement( Y ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (847) {G18,W8,D5,L1,V2,M1} P(48,774);d(772) { join( X, meet( X
% 67.27/67.65 , complement( Y ) ) ) ==> X }.
% 67.27/67.65 parent0: (145858) {G3,W8,D5,L1,V2,M1} { join( X, meet( X, complement( Y )
% 67.27/67.65 ) ) ==> X }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145859) {G17,W9,D4,L1,V2,M1} { join( X, Y ) ==> join( join( X, Y
% 67.27/67.65 ), Y ) }.
% 67.27/67.65 parent0[0]: (774) {G17,W9,D4,L1,V2,M1} P(769,30);d(1);d(769) { join( join(
% 67.27/67.65 X, Y ), Y ) ==> join( X, Y ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145861) {G2,W13,D5,L1,V3,M1} { join( join( X, Y ), Z ) ==> join
% 67.27/67.65 ( join( join( X, Z ), Y ), Z ) }.
% 67.27/67.65 parent0[0]: (30) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X )
% 67.27/67.65 = join( join( Z, X ), Y ) }.
% 67.27/67.65 parent1[0; 7]: (145859) {G17,W9,D4,L1,V2,M1} { join( X, Y ) ==> join( join
% 67.27/67.65 ( X, Y ), Y ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Z
% 67.27/67.65 Y := Y
% 67.27/67.65 Z := X
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := join( X, Y )
% 67.27/67.65 Y := Z
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145863) {G2,W13,D5,L1,V3,M1} { join( join( X, Z ), Y ) ==> join
% 67.27/67.65 ( join( join( X, Z ), Y ), Z ) }.
% 67.27/67.65 parent0[0]: (30) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X )
% 67.27/67.65 = join( join( Z, X ), Y ) }.
% 67.27/67.65 parent1[0; 1]: (145861) {G2,W13,D5,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 67.27/67.65 join( join( join( X, Z ), Y ), Z ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Z
% 67.27/67.65 Y := Y
% 67.27/67.65 Z := X
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 Z := Z
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145867) {G2,W13,D5,L1,V3,M1} { join( join( join( X, Y ), Z ), Y )
% 67.27/67.65 ==> join( join( X, Y ), Z ) }.
% 67.27/67.65 parent0[0]: (145863) {G2,W13,D5,L1,V3,M1} { join( join( X, Z ), Y ) ==>
% 67.27/67.65 join( join( join( X, Z ), Y ), Z ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Z
% 67.27/67.65 Z := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (848) {G18,W13,D5,L1,V3,M1} P(774,30) { join( join( join( X, Y
% 67.27/67.65 ), Z ), Y ) ==> join( join( X, Y ), Z ) }.
% 67.27/67.65 parent0: (145867) {G2,W13,D5,L1,V3,M1} { join( join( join( X, Y ), Z ), Y
% 67.27/67.65 ) ==> join( join( X, Y ), Z ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 Z := Z
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145873) {G18,W8,D5,L1,V2,M1} { X ==> join( X, meet( X, complement
% 67.27/67.65 ( Y ) ) ) }.
% 67.27/67.65 parent0[0]: (847) {G18,W8,D5,L1,V2,M1} P(48,774);d(772) { join( X, meet( X
% 67.27/67.65 , complement( Y ) ) ) ==> X }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145874) {G16,W7,D4,L1,V2,M1} { X ==> join( X, meet( X, Y ) ) }.
% 67.27/67.65 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.65 complement( X ) ) ==> X }.
% 67.27/67.65 parent1[0; 6]: (145873) {G18,W8,D5,L1,V2,M1} { X ==> join( X, meet( X,
% 67.27/67.65 complement( Y ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := complement( Y )
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145875) {G16,W7,D4,L1,V2,M1} { join( X, meet( X, Y ) ) ==> X }.
% 67.27/67.65 parent0[0]: (145874) {G16,W7,D4,L1,V2,M1} { X ==> join( X, meet( X, Y ) )
% 67.27/67.65 }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (851) {G19,W7,D4,L1,V2,M1} P(756,847) { join( Y, meet( Y, X )
% 67.27/67.65 ) ==> Y }.
% 67.27/67.65 parent0: (145875) {G16,W7,D4,L1,V2,M1} { join( X, meet( X, Y ) ) ==> X }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145877) {G19,W7,D4,L1,V2,M1} { X ==> join( X, meet( X, Y ) ) }.
% 67.27/67.65 parent0[0]: (851) {G19,W7,D4,L1,V2,M1} P(756,847) { join( Y, meet( Y, X ) )
% 67.27/67.65 ==> Y }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145878) {G20,W7,D4,L1,V2,M1} { X ==> join( X, meet( Y, X ) ) }.
% 67.27/67.65 parent0[0]: (843) {G20,W9,D4,L1,V2,M1} P(820,75) { meet( Y, meet( X, Y ) )
% 67.27/67.65 ==> meet( X, Y ) }.
% 67.27/67.65 parent1[0; 4]: (145877) {G19,W7,D4,L1,V2,M1} { X ==> join( X, meet( X, Y )
% 67.27/67.65 ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := meet( Y, X )
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145879) {G20,W7,D4,L1,V2,M1} { join( X, meet( Y, X ) ) ==> X }.
% 67.27/67.65 parent0[0]: (145878) {G20,W7,D4,L1,V2,M1} { X ==> join( X, meet( Y, X ) )
% 67.27/67.65 }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (866) {G21,W7,D4,L1,V2,M1} P(843,851) { join( X, meet( Y, X )
% 67.27/67.65 ) ==> X }.
% 67.27/67.65 parent0: (145879) {G20,W7,D4,L1,V2,M1} { join( X, meet( Y, X ) ) ==> X }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145888) {G2,W11,D4,L1,V3,M1} { join( join( X, Y ), meet( X, Z )
% 67.27/67.65 ) = join( X, Y ) }.
% 67.27/67.65 parent0[0]: (851) {G19,W7,D4,L1,V2,M1} P(756,847) { join( Y, meet( Y, X ) )
% 67.27/67.65 ==> Y }.
% 67.27/67.65 parent1[0; 9]: (30) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ),
% 67.27/67.65 X ) = join( join( Z, X ), Y ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Z
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := meet( X, Z )
% 67.27/67.65 Y := Y
% 67.27/67.65 Z := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (870) {G20,W11,D4,L1,V3,M1} P(851,30) { join( join( X, Z ),
% 67.27/67.65 meet( X, Y ) ) ==> join( X, Z ) }.
% 67.27/67.65 parent0: (145888) {G2,W11,D4,L1,V3,M1} { join( join( X, Y ), meet( X, Z )
% 67.27/67.65 ) = join( X, Y ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Z
% 67.27/67.65 Z := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145890) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) ) ==>
% 67.27/67.65 converse( join( converse( X ), Y ) ) }.
% 67.27/67.65 parent0[0]: (19) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 67.27/67.65 ), Y ) ) ==> join( X, converse( Y ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145892) {G2,W11,D6,L1,V2,M1} { join( X, converse( meet( converse
% 67.27/67.65 ( X ), Y ) ) ) ==> converse( converse( X ) ) }.
% 67.27/67.65 parent0[0]: (851) {G19,W7,D4,L1,V2,M1} P(756,847) { join( Y, meet( Y, X ) )
% 67.27/67.65 ==> Y }.
% 67.27/67.65 parent1[0; 9]: (145890) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) )
% 67.27/67.65 ==> converse( join( converse( X ), Y ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := converse( X )
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := meet( converse( X ), Y )
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145893) {G1,W9,D6,L1,V2,M1} { join( X, converse( meet( converse
% 67.27/67.65 ( X ), Y ) ) ) ==> X }.
% 67.27/67.65 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.27/67.65 parent1[0; 8]: (145892) {G2,W11,D6,L1,V2,M1} { join( X, converse( meet(
% 67.27/67.65 converse( X ), Y ) ) ) ==> converse( converse( X ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (879) {G20,W9,D6,L1,V2,M1} P(851,19);d(7) { join( X, converse
% 67.27/67.65 ( meet( converse( X ), Y ) ) ) ==> X }.
% 67.27/67.65 parent0: (145893) {G1,W9,D6,L1,V2,M1} { join( X, converse( meet( converse
% 67.27/67.65 ( X ), Y ) ) ) ==> X }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145895) {G19,W7,D4,L1,V2,M1} { X ==> join( X, meet( X, Y ) ) }.
% 67.27/67.65 parent0[0]: (851) {G19,W7,D4,L1,V2,M1} P(756,847) { join( Y, meet( Y, X ) )
% 67.27/67.65 ==> Y }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145896) {G1,W7,D4,L1,V2,M1} { X ==> join( meet( X, Y ), X ) }.
% 67.27/67.65 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.27/67.65 parent1[0; 2]: (145895) {G19,W7,D4,L1,V2,M1} { X ==> join( X, meet( X, Y )
% 67.27/67.65 ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := meet( X, Y )
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145899) {G1,W7,D4,L1,V2,M1} { join( meet( X, Y ), X ) ==> X }.
% 67.27/67.65 parent0[0]: (145896) {G1,W7,D4,L1,V2,M1} { X ==> join( meet( X, Y ), X )
% 67.27/67.65 }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (881) {G20,W7,D4,L1,V2,M1} P(851,0) { join( meet( X, Y ), X )
% 67.27/67.65 ==> X }.
% 67.27/67.65 parent0: (145899) {G1,W7,D4,L1,V2,M1} { join( meet( X, Y ), X ) ==> X }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145908) {G2,W11,D4,L1,V3,M1} { join( join( X, Y ), meet( Z, X )
% 67.27/67.65 ) = join( X, Y ) }.
% 67.27/67.65 parent0[0]: (866) {G21,W7,D4,L1,V2,M1} P(843,851) { join( X, meet( Y, X ) )
% 67.27/67.65 ==> X }.
% 67.27/67.65 parent1[0; 9]: (30) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ),
% 67.27/67.65 X ) = join( join( Z, X ), Y ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Z
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := meet( Z, X )
% 67.27/67.65 Y := Y
% 67.27/67.65 Z := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (887) {G22,W11,D4,L1,V3,M1} P(866,30) { join( join( X, Z ),
% 67.27/67.65 meet( Y, X ) ) ==> join( X, Z ) }.
% 67.27/67.65 parent0: (145908) {G2,W11,D4,L1,V3,M1} { join( join( X, Y ), meet( Z, X )
% 67.27/67.65 ) = join( X, Y ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Z
% 67.27/67.65 Z := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145910) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 67.27/67.65 join( X, Y ), Z ) }.
% 67.27/67.65 parent0[0]: (29) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 67.27/67.65 join( join( Y, Z ), X ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 Z := Z
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145926) {G2,W11,D5,L1,V3,M1} { join( join( meet( X, Y ), Z ), Y
% 67.27/67.65 ) = join( Y, Z ) }.
% 67.27/67.65 parent0[0]: (866) {G21,W7,D4,L1,V2,M1} P(843,851) { join( X, meet( Y, X ) )
% 67.27/67.65 ==> X }.
% 67.27/67.65 parent1[0; 9]: (145910) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) =
% 67.27/67.65 join( join( X, Y ), Z ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := meet( X, Y )
% 67.27/67.65 Z := Z
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (889) {G22,W11,D5,L1,V3,M1} P(866,29) { join( join( meet( Y, X
% 67.27/67.65 ), Z ), X ) ==> join( X, Z ) }.
% 67.27/67.65 parent0: (145926) {G2,W11,D5,L1,V3,M1} { join( join( meet( X, Y ), Z ), Y
% 67.27/67.65 ) = join( Y, Z ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 Z := Z
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145931) {G21,W7,D4,L1,V2,M1} { X ==> join( X, meet( Y, X ) ) }.
% 67.27/67.65 parent0[0]: (866) {G21,W7,D4,L1,V2,M1} P(843,851) { join( X, meet( Y, X ) )
% 67.27/67.65 ==> X }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145932) {G1,W7,D4,L1,V2,M1} { X ==> join( meet( Y, X ), X ) }.
% 67.27/67.65 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.27/67.65 parent1[0; 2]: (145931) {G21,W7,D4,L1,V2,M1} { X ==> join( X, meet( Y, X )
% 67.27/67.65 ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := meet( Y, X )
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145935) {G1,W7,D4,L1,V2,M1} { join( meet( Y, X ), X ) ==> X }.
% 67.27/67.65 parent0[0]: (145932) {G1,W7,D4,L1,V2,M1} { X ==> join( meet( Y, X ), X )
% 67.27/67.65 }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (898) {G22,W7,D4,L1,V2,M1} P(866,0) { join( meet( Y, X ), X )
% 67.27/67.65 ==> X }.
% 67.27/67.65 parent0: (145935) {G1,W7,D4,L1,V2,M1} { join( meet( Y, X ), X ) ==> X }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145937) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 67.27/67.65 join( X, Y ), Z ) }.
% 67.27/67.65 parent0[0]: (29) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 67.27/67.65 join( join( Y, Z ), X ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 Z := Z
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145938) {G2,W11,D5,L1,V3,M1} { join( Y, Z ) = join( join( Z,
% 67.27/67.65 meet( X, Y ) ), Y ) }.
% 67.27/67.65 parent0[0]: (898) {G22,W7,D4,L1,V2,M1} P(866,0) { join( meet( Y, X ), X )
% 67.27/67.65 ==> X }.
% 67.27/67.65 parent1[0; 2]: (145937) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) =
% 67.27/67.65 join( join( X, Y ), Z ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := Z
% 67.27/67.65 Y := meet( X, Y )
% 67.27/67.65 Z := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145940) {G2,W11,D5,L1,V3,M1} { join( join( Y, meet( Z, X ) ), X )
% 67.27/67.65 = join( X, Y ) }.
% 67.27/67.65 parent0[0]: (145938) {G2,W11,D5,L1,V3,M1} { join( Y, Z ) = join( join( Z,
% 67.27/67.65 meet( X, Y ) ), Y ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Z
% 67.27/67.65 Y := X
% 67.27/67.65 Z := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (902) {G23,W11,D5,L1,V3,M1} P(898,29) { join( join( Z, meet( X
% 67.27/67.65 , Y ) ), Y ) ==> join( Y, Z ) }.
% 67.27/67.65 parent0: (145940) {G2,W11,D5,L1,V3,M1} { join( join( Y, meet( Z, X ) ), X
% 67.27/67.65 ) = join( X, Y ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := Z
% 67.27/67.65 Z := X
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145943) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y ) ==>
% 67.27/67.65 converse( join( X, converse( Y ) ) ) }.
% 67.27/67.65 parent0[0]: (20) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 67.27/67.65 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145945) {G2,W11,D6,L1,V2,M1} { join( converse( meet( X, converse
% 67.27/67.65 ( Y ) ) ), Y ) ==> converse( converse( Y ) ) }.
% 67.27/67.65 parent0[0]: (898) {G22,W7,D4,L1,V2,M1} P(866,0) { join( meet( Y, X ), X )
% 67.27/67.65 ==> X }.
% 67.27/67.65 parent1[0; 9]: (145943) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y )
% 67.27/67.65 ==> converse( join( X, converse( Y ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := converse( Y )
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := meet( X, converse( Y ) )
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145946) {G1,W9,D6,L1,V2,M1} { join( converse( meet( X, converse
% 67.27/67.65 ( Y ) ) ), Y ) ==> Y }.
% 67.27/67.65 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.27/67.65 parent1[0; 8]: (145945) {G2,W11,D6,L1,V2,M1} { join( converse( meet( X,
% 67.27/67.65 converse( Y ) ) ), Y ) ==> converse( converse( Y ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (904) {G23,W9,D6,L1,V2,M1} P(898,20);d(7) { join( converse(
% 67.27/67.65 meet( X, converse( Y ) ) ), Y ) ==> Y }.
% 67.27/67.65 parent0: (145946) {G1,W9,D6,L1,V2,M1} { join( converse( meet( X, converse
% 67.27/67.65 ( Y ) ) ), Y ) ==> Y }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145949) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 67.27/67.65 join( X, Y ), Z ) }.
% 67.27/67.65 parent0[0]: (29) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 67.27/67.65 join( join( Y, Z ), X ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 Z := Z
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145950) {G2,W11,D5,L1,V3,M1} { join( X, Z ) = join( join( Z,
% 67.27/67.65 meet( X, Y ) ), X ) }.
% 67.27/67.65 parent0[0]: (881) {G20,W7,D4,L1,V2,M1} P(851,0) { join( meet( X, Y ), X )
% 67.27/67.65 ==> X }.
% 67.27/67.65 parent1[0; 2]: (145949) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) =
% 67.27/67.65 join( join( X, Y ), Z ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := Z
% 67.27/67.65 Y := meet( X, Y )
% 67.27/67.65 Z := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145952) {G2,W11,D5,L1,V3,M1} { join( join( Y, meet( X, Z ) ), X )
% 67.27/67.65 = join( X, Y ) }.
% 67.27/67.65 parent0[0]: (145950) {G2,W11,D5,L1,V3,M1} { join( X, Z ) = join( join( Z,
% 67.27/67.65 meet( X, Y ) ), X ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Z
% 67.27/67.65 Z := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (908) {G21,W11,D5,L1,V3,M1} P(881,29) { join( join( Z, meet( X
% 67.27/67.65 , Y ) ), X ) ==> join( X, Z ) }.
% 67.27/67.65 parent0: (145952) {G2,W11,D5,L1,V3,M1} { join( join( Y, meet( X, Z ) ), X
% 67.27/67.65 ) = join( X, Y ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Z
% 67.27/67.65 Z := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145955) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y ) ==>
% 67.27/67.65 converse( join( X, converse( Y ) ) ) }.
% 67.27/67.65 parent0[0]: (20) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 67.27/67.65 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145957) {G2,W11,D6,L1,V2,M1} { join( converse( meet( converse( X
% 67.27/67.65 ), Y ) ), X ) ==> converse( converse( X ) ) }.
% 67.27/67.65 parent0[0]: (881) {G20,W7,D4,L1,V2,M1} P(851,0) { join( meet( X, Y ), X )
% 67.27/67.65 ==> X }.
% 67.27/67.65 parent1[0; 9]: (145955) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y )
% 67.27/67.65 ==> converse( join( X, converse( Y ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := converse( X )
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := meet( converse( X ), Y )
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145958) {G1,W9,D6,L1,V2,M1} { join( converse( meet( converse( X
% 67.27/67.65 ), Y ) ), X ) ==> X }.
% 67.27/67.65 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.27/67.65 parent1[0; 8]: (145957) {G2,W11,D6,L1,V2,M1} { join( converse( meet(
% 67.27/67.65 converse( X ), Y ) ), X ) ==> converse( converse( X ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (910) {G21,W9,D6,L1,V2,M1} P(881,20);d(7) { join( converse(
% 67.27/67.65 meet( converse( X ), Y ) ), X ) ==> X }.
% 67.27/67.65 parent0: (145958) {G1,W9,D6,L1,V2,M1} { join( converse( meet( converse( X
% 67.27/67.65 ), Y ) ), X ) ==> X }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145965) {G3,W15,D8,L1,V3,M1} { converse( join( join( converse(
% 67.27/67.65 meet( X, converse( Y ) ) ), Z ), Y ) ) = converse( join( Y, Z ) ) }.
% 67.27/67.65 parent0[0]: (904) {G23,W9,D6,L1,V2,M1} P(898,20);d(7) { join( converse(
% 67.27/67.65 meet( X, converse( Y ) ) ), Y ) ==> Y }.
% 67.27/67.65 parent1[0; 13]: (22) {G2,W13,D5,L1,V3,M1} P(18,8);d(8);d(1);d(1) { converse
% 67.27/67.65 ( join( join( Z, Y ), X ) ) = converse( join( join( Z, X ), Y ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := Z
% 67.27/67.65 Z := converse( meet( X, converse( Y ) ) )
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145966) {G3,W14,D5,L1,V3,M1} { join( meet( X, converse( Y ) ),
% 67.27/67.65 converse( join( Z, Y ) ) ) = converse( join( Y, Z ) ) }.
% 67.27/67.65 parent0[0]: (55) {G2,W14,D6,L1,V3,M1} P(1,19) { converse( join( join(
% 67.27/67.65 converse( X ), Y ), Z ) ) ==> join( X, converse( join( Y, Z ) ) ) }.
% 67.27/67.65 parent1[0; 1]: (145965) {G3,W15,D8,L1,V3,M1} { converse( join( join(
% 67.27/67.65 converse( meet( X, converse( Y ) ) ), Z ), Y ) ) = converse( join( Y, Z )
% 67.27/67.65 ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := meet( X, converse( Y ) )
% 67.27/67.65 Y := Z
% 67.27/67.65 Z := Y
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 Z := Z
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (928) {G24,W14,D5,L1,V3,M1} P(904,22);d(55) { join( meet( X,
% 67.27/67.65 converse( Y ) ), converse( join( Z, Y ) ) ) ==> converse( join( Y, Z ) )
% 67.27/67.65 }.
% 67.27/67.65 parent0: (145966) {G3,W14,D5,L1,V3,M1} { join( meet( X, converse( Y ) ),
% 67.27/67.65 converse( join( Z, Y ) ) ) = converse( join( Y, Z ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 Z := Z
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145969) {G20,W9,D4,L1,V2,M1} { meet( Y, X ) ==> meet( X, meet( Y
% 67.27/67.65 , X ) ) }.
% 67.27/67.65 parent0[0]: (843) {G20,W9,D4,L1,V2,M1} P(820,75) { meet( Y, meet( X, Y ) )
% 67.27/67.65 ==> meet( X, Y ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145971) {G21,W15,D6,L1,V2,M1} { meet( X, complement( meet( Y,
% 67.27/67.65 complement( X ) ) ) ) ==> meet( complement( meet( Y, complement( X ) ) )
% 67.27/67.65 , X ) }.
% 67.27/67.65 parent0[0]: (835) {G21,W9,D6,L1,V2,M1} P(829,48);d(749);d(772) { meet( X,
% 67.27/67.65 complement( meet( Y, complement( X ) ) ) ) ==> X }.
% 67.27/67.65 parent1[0; 14]: (145969) {G20,W9,D4,L1,V2,M1} { meet( Y, X ) ==> meet( X,
% 67.27/67.65 meet( Y, X ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := complement( meet( Y, complement( X ) ) )
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145972) {G22,W9,D6,L1,V2,M1} { X ==> meet( complement( meet( Y,
% 67.27/67.65 complement( X ) ) ), X ) }.
% 67.27/67.65 parent0[0]: (835) {G21,W9,D6,L1,V2,M1} P(829,48);d(749);d(772) { meet( X,
% 67.27/67.65 complement( meet( Y, complement( X ) ) ) ) ==> X }.
% 67.27/67.65 parent1[0; 1]: (145971) {G21,W15,D6,L1,V2,M1} { meet( X, complement( meet
% 67.27/67.65 ( Y, complement( X ) ) ) ) ==> meet( complement( meet( Y, complement( X )
% 67.27/67.65 ) ), X ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145974) {G22,W9,D6,L1,V2,M1} { meet( complement( meet( Y,
% 67.27/67.65 complement( X ) ) ), X ) ==> X }.
% 67.27/67.65 parent0[0]: (145972) {G22,W9,D6,L1,V2,M1} { X ==> meet( complement( meet(
% 67.27/67.65 Y, complement( X ) ) ), X ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (943) {G22,W9,D6,L1,V2,M1} P(835,843) { meet( complement( meet
% 67.27/67.65 ( Y, complement( X ) ) ), X ) ==> X }.
% 67.27/67.65 parent0: (145974) {G22,W9,D6,L1,V2,M1} { meet( complement( meet( Y,
% 67.27/67.65 complement( X ) ) ), X ) ==> X }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145977) {G22,W9,D6,L1,V2,M1} { Y ==> meet( complement( meet( X,
% 67.27/67.65 complement( Y ) ) ), Y ) }.
% 67.27/67.65 parent0[0]: (943) {G22,W9,D6,L1,V2,M1} P(835,843) { meet( complement( meet
% 67.27/67.65 ( Y, complement( X ) ) ), X ) ==> X }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145984) {G19,W9,D6,L1,V2,M1} { X ==> meet( complement( meet(
% 67.27/67.65 complement( X ), Y ) ), X ) }.
% 67.27/67.65 parent0[0]: (814) {G18,W9,D4,L1,V2,M1} P(804,48);d(77);d(740) { meet( meet
% 67.27/67.65 ( X, Y ), X ) ==> meet( X, Y ) }.
% 67.27/67.65 parent1[0; 4]: (145977) {G22,W9,D6,L1,V2,M1} { Y ==> meet( complement(
% 67.27/67.65 meet( X, complement( Y ) ) ), Y ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := complement( X )
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := meet( complement( X ), Y )
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145985) {G19,W9,D6,L1,V2,M1} { meet( complement( meet( complement
% 67.27/67.65 ( X ), Y ) ), X ) ==> X }.
% 67.27/67.65 parent0[0]: (145984) {G19,W9,D6,L1,V2,M1} { X ==> meet( complement( meet(
% 67.27/67.65 complement( X ), Y ) ), X ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (944) {G23,W9,D6,L1,V2,M1} P(814,943) { meet( complement( meet
% 67.27/67.65 ( complement( X ), Y ) ), X ) ==> X }.
% 67.27/67.65 parent0: (145985) {G19,W9,D6,L1,V2,M1} { meet( complement( meet(
% 67.27/67.65 complement( X ), Y ) ), X ) ==> X }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145987) {G22,W9,D6,L1,V2,M1} { Y ==> meet( complement( meet( X,
% 67.27/67.65 complement( Y ) ) ), Y ) }.
% 67.27/67.65 parent0[0]: (943) {G22,W9,D6,L1,V2,M1} P(835,843) { meet( complement( meet
% 67.27/67.65 ( Y, complement( X ) ) ), X ) ==> X }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145988) {G16,W10,D5,L1,V2,M1} { complement( X ) ==> meet(
% 67.27/67.65 complement( meet( Y, X ) ), complement( X ) ) }.
% 67.27/67.65 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.65 complement( X ) ) ==> X }.
% 67.27/67.65 parent1[0; 7]: (145987) {G22,W9,D6,L1,V2,M1} { Y ==> meet( complement(
% 67.27/67.65 meet( X, complement( Y ) ) ), Y ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := complement( X )
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145989) {G16,W10,D5,L1,V2,M1} { meet( complement( meet( Y, X ) )
% 67.27/67.65 , complement( X ) ) ==> complement( X ) }.
% 67.27/67.65 parent0[0]: (145988) {G16,W10,D5,L1,V2,M1} { complement( X ) ==> meet(
% 67.27/67.65 complement( meet( Y, X ) ), complement( X ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (945) {G23,W10,D5,L1,V2,M1} P(756,943) { meet( complement(
% 67.27/67.65 meet( Y, X ) ), complement( X ) ) ==> complement( X ) }.
% 67.27/67.65 parent0: (145989) {G16,W10,D5,L1,V2,M1} { meet( complement( meet( Y, X ) )
% 67.27/67.65 , complement( X ) ) ==> complement( X ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145991) {G23,W9,D6,L1,V2,M1} { X ==> meet( complement( meet(
% 67.27/67.65 complement( X ), Y ) ), X ) }.
% 67.27/67.65 parent0[0]: (944) {G23,W9,D6,L1,V2,M1} P(814,943) { meet( complement( meet
% 67.27/67.65 ( complement( X ), Y ) ), X ) ==> X }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145992) {G16,W10,D5,L1,V2,M1} { complement( X ) ==> meet(
% 67.27/67.65 complement( meet( X, Y ) ), complement( X ) ) }.
% 67.27/67.65 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.65 complement( X ) ) ==> X }.
% 67.27/67.65 parent1[0; 6]: (145991) {G23,W9,D6,L1,V2,M1} { X ==> meet( complement(
% 67.27/67.65 meet( complement( X ), Y ) ), X ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := complement( X )
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145993) {G16,W10,D5,L1,V2,M1} { meet( complement( meet( X, Y ) )
% 67.27/67.65 , complement( X ) ) ==> complement( X ) }.
% 67.27/67.65 parent0[0]: (145992) {G16,W10,D5,L1,V2,M1} { complement( X ) ==> meet(
% 67.27/67.65 complement( meet( X, Y ) ), complement( X ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (949) {G24,W10,D5,L1,V2,M1} P(756,944) { meet( complement(
% 67.27/67.65 meet( X, Y ) ), complement( X ) ) ==> complement( X ) }.
% 67.27/67.65 parent0: (145993) {G16,W10,D5,L1,V2,M1} { meet( complement( meet( X, Y ) )
% 67.27/67.65 , complement( X ) ) ==> complement( X ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (145995) {G16,W10,D4,L1,V2,M1} { complement( meet( X, Y ) ) ==>
% 67.27/67.65 join( complement( X ), complement( Y ) ) }.
% 67.27/67.65 parent0[0]: (773) {G16,W10,D4,L1,V2,M1} P(3,756) { join( complement( X ),
% 67.27/67.65 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (145996) {G16,W10,D5,L1,V2,M1} { complement( meet( complement( X
% 67.27/67.65 ), Y ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.65 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.65 complement( X ) ) ==> X }.
% 67.27/67.65 parent1[0; 7]: (145995) {G16,W10,D4,L1,V2,M1} { complement( meet( X, Y ) )
% 67.27/67.65 ==> join( complement( X ), complement( Y ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := complement( X )
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (950) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet(
% 67.27/67.65 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.65 parent0: (145996) {G16,W10,D5,L1,V2,M1} { complement( meet( complement( X
% 67.27/67.65 ), Y ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (146001) {G16,W10,D4,L1,V2,M1} { complement( meet( X, Y ) ) ==>
% 67.27/67.65 join( complement( X ), complement( Y ) ) }.
% 67.27/67.65 parent0[0]: (773) {G16,W10,D4,L1,V2,M1} P(3,756) { join( complement( X ),
% 67.27/67.65 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146003) {G16,W10,D5,L1,V2,M1} { complement( meet( X, complement
% 67.27/67.65 ( Y ) ) ) ==> join( complement( X ), Y ) }.
% 67.27/67.65 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.65 complement( X ) ) ==> X }.
% 67.27/67.65 parent1[0; 9]: (146001) {G16,W10,D4,L1,V2,M1} { complement( meet( X, Y ) )
% 67.27/67.65 ==> join( complement( X ), complement( Y ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := complement( Y )
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (951) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet( Y,
% 67.27/67.65 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 67.27/67.65 parent0: (146003) {G16,W10,D5,L1,V2,M1} { complement( meet( X, complement
% 67.27/67.65 ( Y ) ) ) ==> join( complement( X ), Y ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146008) {G2,W14,D5,L1,V3,M1} { join( join( complement( X ), Y )
% 67.27/67.65 , complement( Z ) ) = join( complement( meet( X, Z ) ), Y ) }.
% 67.27/67.65 parent0[0]: (773) {G16,W10,D4,L1,V2,M1} P(3,756) { join( complement( X ),
% 67.27/67.65 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.27/67.65 parent1[0; 9]: (30) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ),
% 67.27/67.65 X ) = join( join( Z, X ), Y ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Z
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := complement( Z )
% 67.27/67.65 Y := Y
% 67.27/67.65 Z := complement( X )
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (964) {G17,W14,D5,L1,V3,M1} P(773,30) { join( join( complement
% 67.27/67.65 ( X ), Z ), complement( Y ) ) ==> join( complement( meet( X, Y ) ), Z )
% 67.27/67.65 }.
% 67.27/67.65 parent0: (146008) {G2,W14,D5,L1,V3,M1} { join( join( complement( X ), Y )
% 67.27/67.65 , complement( Z ) ) = join( complement( meet( X, Z ) ), Y ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Z
% 67.27/67.65 Z := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (146010) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 67.27/67.65 join( X, Y ), Z ) }.
% 67.27/67.65 parent0[0]: (29) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 67.27/67.65 join( join( Y, Z ), X ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 Z := Z
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146011) {G2,W14,D5,L1,V3,M1} { join( complement( meet( X, Y ) )
% 67.27/67.65 , Z ) = join( join( Z, complement( X ) ), complement( Y ) ) }.
% 67.27/67.65 parent0[0]: (773) {G16,W10,D4,L1,V2,M1} P(3,756) { join( complement( X ),
% 67.27/67.65 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.27/67.65 parent1[0; 2]: (146010) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) =
% 67.27/67.65 join( join( X, Y ), Z ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := Z
% 67.27/67.65 Y := complement( X )
% 67.27/67.65 Z := complement( Y )
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (146013) {G2,W14,D5,L1,V3,M1} { join( join( Z, complement( X ) ),
% 67.27/67.65 complement( Y ) ) = join( complement( meet( X, Y ) ), Z ) }.
% 67.27/67.65 parent0[0]: (146011) {G2,W14,D5,L1,V3,M1} { join( complement( meet( X, Y )
% 67.27/67.65 ), Z ) = join( join( Z, complement( X ) ), complement( Y ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 Z := Z
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (966) {G17,W14,D5,L1,V3,M1} P(773,29) { join( join( Z,
% 67.27/67.65 complement( X ) ), complement( Y ) ) ==> join( complement( meet( X, Y ) )
% 67.27/67.65 , Z ) }.
% 67.27/67.65 parent0: (146013) {G2,W14,D5,L1,V3,M1} { join( join( Z, complement( X ) )
% 67.27/67.65 , complement( Y ) ) = join( complement( meet( X, Y ) ), Z ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 Z := Z
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (146015) {G16,W10,D4,L1,V2,M1} { complement( meet( X, Y ) ) ==>
% 67.27/67.65 join( complement( X ), complement( Y ) ) }.
% 67.27/67.65 parent0[0]: (773) {G16,W10,D4,L1,V2,M1} P(3,756) { join( complement( X ),
% 67.27/67.65 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146017) {G1,W10,D4,L1,V2,M1} { complement( meet( X, Y ) ) ==>
% 67.27/67.65 join( complement( Y ), complement( X ) ) }.
% 67.27/67.65 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.27/67.65 parent1[0; 5]: (146015) {G16,W10,D4,L1,V2,M1} { complement( meet( X, Y ) )
% 67.27/67.65 ==> join( complement( X ), complement( Y ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := complement( X )
% 67.27/67.65 Y := complement( Y )
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146019) {G2,W9,D4,L1,V2,M1} { complement( meet( X, Y ) ) ==>
% 67.27/67.65 complement( meet( Y, X ) ) }.
% 67.27/67.65 parent0[0]: (773) {G16,W10,D4,L1,V2,M1} P(3,756) { join( complement( X ),
% 67.27/67.65 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.27/67.65 parent1[0; 5]: (146017) {G1,W10,D4,L1,V2,M1} { complement( meet( X, Y ) )
% 67.27/67.65 ==> join( complement( Y ), complement( X ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (972) {G17,W9,D4,L1,V2,M1} P(773,0);d(773) { complement( meet
% 67.27/67.65 ( X, Y ) ) = complement( meet( Y, X ) ) }.
% 67.27/67.65 parent0: (146019) {G2,W9,D4,L1,V2,M1} { complement( meet( X, Y ) ) ==>
% 67.27/67.65 complement( meet( Y, X ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (146020) {G10,W10,D5,L1,V3,M1} { top ==> join( join( join( X, Y )
% 67.27/67.65 , Z ), complement( X ) ) }.
% 67.27/67.65 parent0[0]: (599) {G10,W10,D5,L1,V3,M1} S(46);d(215) { join( join( join( X
% 67.27/67.65 , Y ), Z ), complement( X ) ) ==> top }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 Z := Z
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146021) {G11,W14,D6,L1,V4,M1} { top ==> join( join( join( meet(
% 67.27/67.65 X, Y ), Z ), T ), complement( meet( Y, X ) ) ) }.
% 67.27/67.65 parent0[0]: (972) {G17,W9,D4,L1,V2,M1} P(773,0);d(773) { complement( meet(
% 67.27/67.65 X, Y ) ) = complement( meet( Y, X ) ) }.
% 67.27/67.65 parent1[0; 10]: (146020) {G10,W10,D5,L1,V3,M1} { top ==> join( join( join
% 67.27/67.65 ( X, Y ), Z ), complement( X ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := meet( X, Y )
% 67.27/67.65 Y := Z
% 67.27/67.65 Z := T
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (146024) {G11,W14,D6,L1,V4,M1} { join( join( join( meet( X, Y ), Z
% 67.27/67.65 ), T ), complement( meet( Y, X ) ) ) ==> top }.
% 67.27/67.65 parent0[0]: (146021) {G11,W14,D6,L1,V4,M1} { top ==> join( join( join(
% 67.27/67.65 meet( X, Y ), Z ), T ), complement( meet( Y, X ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 Z := Z
% 67.27/67.65 T := T
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (987) {G18,W14,D6,L1,V4,M1} P(972,599) { join( join( join(
% 67.27/67.65 meet( X, Y ), Z ), T ), complement( meet( Y, X ) ) ) ==> top }.
% 67.27/67.65 parent0: (146024) {G11,W14,D6,L1,V4,M1} { join( join( join( meet( X, Y ),
% 67.27/67.65 Z ), T ), complement( meet( Y, X ) ) ) ==> top }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 Z := Z
% 67.27/67.65 T := T
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (146025) {G3,W10,D5,L1,V1,M1} { top ==> join( join( meet( top, X )
% 67.27/67.65 , zero ), complement( X ) ) }.
% 67.27/67.65 parent0[0]: (131) {G3,W10,D5,L1,V1,M1} P(78,15);d(1) { join( join( meet(
% 67.27/67.65 top, X ), zero ), complement( X ) ) ==> top }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146028) {G4,W14,D6,L1,V2,M1} { top ==> join( join( meet( top,
% 67.27/67.65 meet( X, Y ) ), zero ), complement( meet( Y, X ) ) ) }.
% 67.27/67.65 parent0[0]: (972) {G17,W9,D4,L1,V2,M1} P(773,0);d(773) { complement( meet(
% 67.27/67.65 X, Y ) ) = complement( meet( Y, X ) ) }.
% 67.27/67.65 parent1[0; 10]: (146025) {G3,W10,D5,L1,V1,M1} { top ==> join( join( meet(
% 67.27/67.65 top, X ), zero ), complement( X ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := meet( X, Y )
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146030) {G5,W12,D5,L1,V2,M1} { top ==> join( meet( top, meet( X
% 67.27/67.65 , Y ) ), complement( meet( Y, X ) ) ) }.
% 67.27/67.65 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.27/67.65 }.
% 67.27/67.65 parent1[0; 3]: (146028) {G4,W14,D6,L1,V2,M1} { top ==> join( join( meet(
% 67.27/67.65 top, meet( X, Y ) ), zero ), complement( meet( Y, X ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := meet( top, meet( X, Y ) )
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146031) {G6,W10,D5,L1,V2,M1} { top ==> join( meet( X, Y ),
% 67.27/67.65 complement( meet( Y, X ) ) ) }.
% 67.27/67.65 parent0[0]: (747) {G12,W5,D3,L1,V1,M1} P(75,715);d(740) { meet( top, X )
% 67.27/67.65 ==> X }.
% 67.27/67.65 parent1[0; 3]: (146030) {G5,W12,D5,L1,V2,M1} { top ==> join( meet( top,
% 67.27/67.65 meet( X, Y ) ), complement( meet( Y, X ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := meet( X, Y )
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (146032) {G6,W10,D5,L1,V2,M1} { join( meet( X, Y ), complement(
% 67.27/67.65 meet( Y, X ) ) ) ==> top }.
% 67.27/67.65 parent0[0]: (146031) {G6,W10,D5,L1,V2,M1} { top ==> join( meet( X, Y ),
% 67.27/67.65 complement( meet( Y, X ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (988) {G18,W10,D5,L1,V2,M1} P(972,131);d(740);d(747) { join(
% 67.27/67.65 meet( X, Y ), complement( meet( Y, X ) ) ) ==> top }.
% 67.27/67.65 parent0: (146032) {G6,W10,D5,L1,V2,M1} { join( meet( X, Y ), complement(
% 67.27/67.65 meet( Y, X ) ) ) ==> top }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (146033) {G4,W10,D5,L1,V1,M1} { zero ==> meet( meet( top, X ),
% 67.27/67.65 join( zero, complement( X ) ) ) }.
% 67.27/67.65 parent0[0]: (121) {G4,W10,D5,L1,V1,M1} P(78,92) { meet( meet( top, X ),
% 67.27/67.65 join( zero, complement( X ) ) ) ==> zero }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146036) {G5,W14,D6,L1,V2,M1} { zero ==> meet( meet( top, meet( X
% 67.27/67.65 , Y ) ), join( zero, complement( meet( Y, X ) ) ) ) }.
% 67.27/67.65 parent0[0]: (972) {G17,W9,D4,L1,V2,M1} P(773,0);d(773) { complement( meet(
% 67.27/67.65 X, Y ) ) = complement( meet( Y, X ) ) }.
% 67.27/67.65 parent1[0; 10]: (146033) {G4,W10,D5,L1,V1,M1} { zero ==> meet( meet( top,
% 67.27/67.65 X ), join( zero, complement( X ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := meet( X, Y )
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146038) {G6,W12,D6,L1,V2,M1} { zero ==> meet( meet( X, Y ), join
% 67.27/67.65 ( zero, complement( meet( Y, X ) ) ) ) }.
% 67.27/67.65 parent0[0]: (747) {G12,W5,D3,L1,V1,M1} P(75,715);d(740) { meet( top, X )
% 67.27/67.65 ==> X }.
% 67.27/67.65 parent1[0; 3]: (146036) {G5,W14,D6,L1,V2,M1} { zero ==> meet( meet( top,
% 67.27/67.65 meet( X, Y ) ), join( zero, complement( meet( Y, X ) ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := meet( X, Y )
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146039) {G7,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 67.27/67.65 complement( meet( Y, X ) ) ) }.
% 67.27/67.65 parent0[0]: (749) {G13,W5,D3,L1,V1,M1} P(715,0);d(748) { join( zero, X )
% 67.27/67.65 ==> X }.
% 67.27/67.65 parent1[0; 6]: (146038) {G6,W12,D6,L1,V2,M1} { zero ==> meet( meet( X, Y )
% 67.27/67.65 , join( zero, complement( meet( Y, X ) ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := complement( meet( Y, X ) )
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (146040) {G7,W10,D5,L1,V2,M1} { meet( meet( X, Y ), complement(
% 67.27/67.65 meet( Y, X ) ) ) ==> zero }.
% 67.27/67.65 parent0[0]: (146039) {G7,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 67.27/67.65 complement( meet( Y, X ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (990) {G18,W10,D5,L1,V2,M1} P(972,121);d(747);d(749) { meet(
% 67.27/67.65 meet( X, Y ), complement( meet( Y, X ) ) ) ==> zero }.
% 67.27/67.65 parent0: (146040) {G7,W10,D5,L1,V2,M1} { meet( meet( X, Y ), complement(
% 67.27/67.65 meet( Y, X ) ) ) ==> zero }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (146041) {G8,W10,D5,L1,V1,M1} { zero ==> meet( complement( meet( X
% 67.27/67.65 , X ) ), complement( complement( X ) ) ) }.
% 67.27/67.65 parent0[0]: (384) {G8,W10,D5,L1,V1,M1} P(231,236) { meet( complement( meet
% 67.27/67.65 ( X, X ) ), complement( complement( X ) ) ) ==> zero }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146045) {G9,W16,D6,L1,V2,M1} { zero ==> meet( complement( meet(
% 67.27/67.65 meet( X, Y ), meet( X, Y ) ) ), complement( complement( meet( Y, X ) ) )
% 67.27/67.65 ) }.
% 67.27/67.65 parent0[0]: (972) {G17,W9,D4,L1,V2,M1} P(773,0);d(773) { complement( meet(
% 67.27/67.65 X, Y ) ) = complement( meet( Y, X ) ) }.
% 67.27/67.65 parent1[0; 12]: (146041) {G8,W10,D5,L1,V1,M1} { zero ==> meet( complement
% 67.27/67.65 ( meet( X, X ) ), complement( complement( X ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := meet( X, Y )
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146046) {G10,W12,D6,L1,V2,M1} { zero ==> meet( complement( meet
% 67.27/67.65 ( X, Y ) ), complement( complement( meet( Y, X ) ) ) ) }.
% 67.27/67.65 parent0[0]: (768) {G16,W5,D3,L1,V1,M1} P(385,756);d(756);d(756) { meet( X,
% 67.27/67.65 X ) ==> X }.
% 67.27/67.65 parent1[0; 4]: (146045) {G9,W16,D6,L1,V2,M1} { zero ==> meet( complement(
% 67.27/67.65 meet( meet( X, Y ), meet( X, Y ) ) ), complement( complement( meet( Y, X
% 67.27/67.65 ) ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := meet( X, Y )
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146047) {G11,W10,D5,L1,V2,M1} { zero ==> meet( complement( meet
% 67.27/67.65 ( X, Y ) ), meet( Y, X ) ) }.
% 67.27/67.65 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.65 complement( X ) ) ==> X }.
% 67.27/67.65 parent1[0; 7]: (146046) {G10,W12,D6,L1,V2,M1} { zero ==> meet( complement
% 67.27/67.65 ( meet( X, Y ) ), complement( complement( meet( Y, X ) ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := meet( Y, X )
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (146048) {G11,W10,D5,L1,V2,M1} { meet( complement( meet( X, Y ) )
% 67.27/67.65 , meet( Y, X ) ) ==> zero }.
% 67.27/67.65 parent0[0]: (146047) {G11,W10,D5,L1,V2,M1} { zero ==> meet( complement(
% 67.27/67.65 meet( X, Y ) ), meet( Y, X ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (991) {G18,W10,D5,L1,V2,M1} P(972,384);d(768);d(756) { meet(
% 67.27/67.65 complement( meet( X, Y ) ), meet( Y, X ) ) ==> zero }.
% 67.27/67.65 parent0: (146048) {G11,W10,D5,L1,V2,M1} { meet( complement( meet( X, Y ) )
% 67.27/67.65 , meet( Y, X ) ) ==> zero }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (146049) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 67.27/67.65 ( complement( X ), complement( Y ) ) ) }.
% 67.27/67.65 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 67.27/67.65 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146051) {G1,W14,D6,L1,V3,M1} { meet( meet( X, Y ), Z ) ==>
% 67.27/67.65 complement( join( complement( meet( Y, X ) ), complement( Z ) ) ) }.
% 67.27/67.65 parent0[0]: (972) {G17,W9,D4,L1,V2,M1} P(773,0);d(773) { complement( meet(
% 67.27/67.65 X, Y ) ) = complement( meet( Y, X ) ) }.
% 67.27/67.65 parent1[0; 8]: (146049) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 67.27/67.65 ( join( complement( X ), complement( Y ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := meet( X, Y )
% 67.27/67.65 Y := Z
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146057) {G1,W11,D4,L1,V3,M1} { meet( meet( X, Y ), Z ) ==> meet
% 67.27/67.65 ( meet( Y, X ), Z ) }.
% 67.27/67.65 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 67.27/67.65 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 67.27/67.65 parent1[0; 6]: (146051) {G1,W14,D6,L1,V3,M1} { meet( meet( X, Y ), Z ) ==>
% 67.27/67.65 complement( join( complement( meet( Y, X ) ), complement( Z ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := meet( Y, X )
% 67.27/67.65 Y := Z
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 Z := Z
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (996) {G18,W11,D4,L1,V3,M1} P(972,3);d(3) { meet( meet( Y, X )
% 67.27/67.65 , Z ) = meet( meet( X, Y ), Z ) }.
% 67.27/67.65 parent0: (146057) {G1,W11,D4,L1,V3,M1} { meet( meet( X, Y ), Z ) ==> meet
% 67.27/67.65 ( meet( Y, X ), Z ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 Z := Z
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (146059) {G12,W10,D5,L1,V3,M1} { top ==> join( join( X, Y ),
% 67.27/67.65 complement( meet( Z, Y ) ) ) }.
% 67.27/67.65 parent0[0]: (840) {G12,W10,D5,L1,V3,M1} P(811,29);d(214) { join( join( Z, X
% 67.27/67.65 ), complement( meet( Y, X ) ) ) ==> top }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := Z
% 67.27/67.65 Z := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146060) {G13,W10,D6,L1,V3,M1} { top ==> join( X, complement(
% 67.27/67.65 meet( Z, meet( Y, X ) ) ) ) }.
% 67.27/67.65 parent0[0]: (866) {G21,W7,D4,L1,V2,M1} P(843,851) { join( X, meet( Y, X ) )
% 67.27/67.65 ==> X }.
% 67.27/67.65 parent1[0; 3]: (146059) {G12,W10,D5,L1,V3,M1} { top ==> join( join( X, Y )
% 67.27/67.65 , complement( meet( Z, Y ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := meet( Y, X )
% 67.27/67.65 Z := Z
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 eqswap: (146061) {G13,W10,D6,L1,V3,M1} { join( X, complement( meet( Y,
% 67.27/67.65 meet( Z, X ) ) ) ) ==> top }.
% 67.27/67.65 parent0[0]: (146060) {G13,W10,D6,L1,V3,M1} { top ==> join( X, complement(
% 67.27/67.65 meet( Z, meet( Y, X ) ) ) ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Z
% 67.27/67.65 Z := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (1001) {G22,W10,D6,L1,V3,M1} P(866,840) { join( X, complement
% 67.27/67.65 ( meet( Z, meet( Y, X ) ) ) ) ==> top }.
% 67.27/67.65 parent0: (146061) {G13,W10,D6,L1,V3,M1} { join( X, complement( meet( Y,
% 67.27/67.65 meet( Z, X ) ) ) ) ==> top }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Z
% 67.27/67.65 Z := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146064) {G13,W8,D5,L1,V2,M1} { meet( X, join( X, complement( Y )
% 67.27/67.65 ) ) ==> X }.
% 67.27/67.65 parent0[0]: (950) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet(
% 67.27/67.65 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.65 parent1[0; 3]: (803) {G12,W9,D6,L1,V2,M1} P(724,48);d(77);d(740) { meet( X
% 67.27/67.65 , complement( meet( complement( X ), Y ) ) ) ==> X }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (1012) {G18,W8,D5,L1,V2,M1} S(803);d(950) { meet( X, join( X,
% 67.27/67.65 complement( Y ) ) ) ==> X }.
% 67.27/67.65 parent0: (146064) {G13,W8,D5,L1,V2,M1} { meet( X, join( X, complement( Y )
% 67.27/67.65 ) ) ==> X }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146068) {G2,W10,D5,L1,V2,M1} { join( meet( X, Y ), meet( X,
% 67.27/67.65 complement( Y ) ) ) ==> X }.
% 67.27/67.65 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.65 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.65 parent1[0; 5]: (48) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 67.27/67.65 complement( join( complement( X ), Y ) ) ) ==> X }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := Y
% 67.27/67.65 Y := X
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (1016) {G17,W10,D5,L1,V2,M1} S(48);d(772) { join( meet( X, Y )
% 67.27/67.65 , meet( X, complement( Y ) ) ) ==> X }.
% 67.27/67.65 parent0: (146068) {G2,W10,D5,L1,V2,M1} { join( meet( X, Y ), meet( X,
% 67.27/67.65 complement( Y ) ) ) ==> X }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 Y := Y
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146072) {G3,W8,D6,L1,V1,M1} { join( X, converse( complement(
% 67.27/67.65 converse( X ) ) ) ) ==> top }.
% 67.27/67.65 parent0[0]: (223) {G10,W4,D3,L1,V0,M1} P(214,59) { converse( top ) ==> top
% 67.27/67.65 }.
% 67.27/67.65 parent1[0; 7]: (59) {G2,W9,D6,L1,V1,M1} P(11,19) { join( X, converse(
% 67.27/67.65 complement( converse( X ) ) ) ) ==> converse( top ) }.
% 67.27/67.65 substitution0:
% 67.27/67.65 end
% 67.27/67.65 substitution1:
% 67.27/67.65 X := X
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 subsumption: (1017) {G11,W8,D6,L1,V1,M1} S(59);d(223) { join( X, converse(
% 67.27/67.65 complement( converse( X ) ) ) ) ==> top }.
% 67.27/67.65 parent0: (146072) {G3,W8,D6,L1,V1,M1} { join( X, converse( complement(
% 67.27/67.65 converse( X ) ) ) ) ==> top }.
% 67.27/67.65 substitution0:
% 67.27/67.65 X := X
% 67.27/67.65 end
% 67.27/67.65 permutation0:
% 67.27/67.65 0 ==> 0
% 67.27/67.65 end
% 67.27/67.65
% 67.27/67.65 paramod: (146076) {G2,W8,D4,L1,V2,M1} { join( join( X, Y ), complement( Y
% 67.27/67.66 ) ) ==> top }.
% 67.27/67.66 parent0[0]: (215) {G9,W5,D3,L1,V1,M1} P(199,37);d(38);d(209) { join( X, top
% 67.27/67.66 ) ==> top }.
% 67.27/67.66 parent1[0; 7]: (31) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ),
% 67.27/67.66 complement( X ) ) ==> join( Y, top ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1021) {G10,W8,D4,L1,V2,M1} S(31);d(215) { join( join( Y, X )
% 67.27/67.66 , complement( X ) ) ==> top }.
% 67.27/67.66 parent0: (146076) {G2,W8,D4,L1,V2,M1} { join( join( X, Y ), complement( Y
% 67.27/67.66 ) ) ==> top }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146079) {G18,W8,D5,L1,V2,M1} { X ==> meet( X, join( X, complement
% 67.27/67.66 ( Y ) ) ) }.
% 67.27/67.66 parent0[0]: (1012) {G18,W8,D5,L1,V2,M1} S(803);d(950) { meet( X, join( X,
% 67.27/67.66 complement( Y ) ) ) ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146080) {G16,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y ) ) }.
% 67.27/67.66 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.66 complement( X ) ) ==> X }.
% 67.27/67.66 parent1[0; 6]: (146079) {G18,W8,D5,L1,V2,M1} { X ==> meet( X, join( X,
% 67.27/67.66 complement( Y ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := complement( Y )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146081) {G16,W7,D4,L1,V2,M1} { meet( X, join( X, Y ) ) ==> X }.
% 67.27/67.66 parent0[0]: (146080) {G16,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y ) )
% 67.27/67.66 }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1025) {G19,W7,D4,L1,V2,M1} P(756,1012) { meet( Y, join( Y, X
% 67.27/67.66 ) ) ==> Y }.
% 67.27/67.66 parent0: (146081) {G16,W7,D4,L1,V2,M1} { meet( X, join( X, Y ) ) ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146083) {G19,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y ) ) }.
% 67.27/67.66 parent0[0]: (1025) {G19,W7,D4,L1,V2,M1} P(756,1012) { meet( Y, join( Y, X )
% 67.27/67.66 ) ==> Y }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146084) {G20,W13,D6,L1,V2,M1} { converse( meet( X, converse( Y )
% 67.27/67.66 ) ) ==> meet( converse( meet( X, converse( Y ) ) ), Y ) }.
% 67.27/67.66 parent0[0]: (904) {G23,W9,D6,L1,V2,M1} P(898,20);d(7) { join( converse(
% 67.27/67.66 meet( X, converse( Y ) ) ), Y ) ==> Y }.
% 67.27/67.66 parent1[0; 12]: (146083) {G19,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y
% 67.27/67.66 ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := converse( meet( X, converse( Y ) ) )
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146085) {G20,W13,D6,L1,V2,M1} { meet( converse( meet( X, converse
% 67.27/67.66 ( Y ) ) ), Y ) ==> converse( meet( X, converse( Y ) ) ) }.
% 67.27/67.66 parent0[0]: (146084) {G20,W13,D6,L1,V2,M1} { converse( meet( X, converse(
% 67.27/67.66 Y ) ) ) ==> meet( converse( meet( X, converse( Y ) ) ), Y ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1030) {G24,W13,D6,L1,V2,M1} P(904,1025) { meet( converse(
% 67.27/67.66 meet( X, converse( Y ) ) ), Y ) ==> converse( meet( X, converse( Y ) ) )
% 67.27/67.66 }.
% 67.27/67.66 parent0: (146085) {G20,W13,D6,L1,V2,M1} { meet( converse( meet( X,
% 67.27/67.66 converse( Y ) ) ), Y ) ==> converse( meet( X, converse( Y ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146087) {G19,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y ) ) }.
% 67.27/67.66 parent0[0]: (1025) {G19,W7,D4,L1,V2,M1} P(756,1012) { meet( Y, join( Y, X )
% 67.27/67.66 ) ==> Y }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146090) {G20,W13,D6,L1,V2,M1} { converse( meet( converse( X ), Y
% 67.27/67.66 ) ) ==> meet( converse( meet( converse( X ), Y ) ), X ) }.
% 67.27/67.66 parent0[0]: (910) {G21,W9,D6,L1,V2,M1} P(881,20);d(7) { join( converse(
% 67.27/67.66 meet( converse( X ), Y ) ), X ) ==> X }.
% 67.27/67.66 parent1[0; 12]: (146087) {G19,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y
% 67.27/67.66 ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := converse( meet( converse( X ), Y ) )
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146091) {G20,W13,D6,L1,V2,M1} { meet( converse( meet( converse( X
% 67.27/67.66 ), Y ) ), X ) ==> converse( meet( converse( X ), Y ) ) }.
% 67.27/67.66 parent0[0]: (146090) {G20,W13,D6,L1,V2,M1} { converse( meet( converse( X )
% 67.27/67.66 , Y ) ) ==> meet( converse( meet( converse( X ), Y ) ), X ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1031) {G22,W13,D6,L1,V2,M1} P(910,1025) { meet( converse(
% 67.27/67.66 meet( converse( X ), Y ) ), X ) ==> converse( meet( converse( X ), Y ) )
% 67.27/67.66 }.
% 67.27/67.66 parent0: (146091) {G20,W13,D6,L1,V2,M1} { meet( converse( meet( converse(
% 67.27/67.66 X ), Y ) ), X ) ==> converse( meet( converse( X ), Y ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146093) {G20,W9,D4,L1,V2,M1} { meet( Y, X ) ==> meet( X, meet( Y
% 67.27/67.66 , X ) ) }.
% 67.27/67.66 parent0[0]: (843) {G20,W9,D4,L1,V2,M1} P(820,75) { meet( Y, meet( X, Y ) )
% 67.27/67.66 ==> meet( X, Y ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146095) {G20,W11,D4,L1,V2,M1} { meet( X, join( X, Y ) ) ==> meet
% 67.27/67.66 ( join( X, Y ), X ) }.
% 67.27/67.66 parent0[0]: (1025) {G19,W7,D4,L1,V2,M1} P(756,1012) { meet( Y, join( Y, X )
% 67.27/67.66 ) ==> Y }.
% 67.27/67.66 parent1[0; 10]: (146093) {G20,W9,D4,L1,V2,M1} { meet( Y, X ) ==> meet( X,
% 67.27/67.66 meet( Y, X ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := join( X, Y )
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146096) {G20,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X ) }.
% 67.27/67.66 parent0[0]: (1025) {G19,W7,D4,L1,V2,M1} P(756,1012) { meet( Y, join( Y, X )
% 67.27/67.66 ) ==> Y }.
% 67.27/67.66 parent1[0; 1]: (146095) {G20,W11,D4,L1,V2,M1} { meet( X, join( X, Y ) )
% 67.27/67.66 ==> meet( join( X, Y ), X ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146098) {G20,W7,D4,L1,V2,M1} { meet( join( X, Y ), X ) ==> X }.
% 67.27/67.66 parent0[0]: (146096) {G20,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X )
% 67.27/67.66 }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1032) {G21,W7,D4,L1,V2,M1} P(1025,843) { meet( join( X, Y ),
% 67.27/67.66 X ) ==> X }.
% 67.27/67.66 parent0: (146098) {G20,W7,D4,L1,V2,M1} { meet( join( X, Y ), X ) ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146101) {G21,W8,D4,L1,V2,M1} { zero ==> meet( complement( X ),
% 67.27/67.66 meet( Y, X ) ) }.
% 67.27/67.66 parent0[0]: (830) {G21,W8,D4,L1,V2,M1} P(828,75) { meet( complement( Y ),
% 67.27/67.66 meet( X, Y ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146102) {G20,W8,D5,L1,V2,M1} { zero ==> meet( complement( join(
% 67.27/67.66 X, Y ) ), X ) }.
% 67.27/67.66 parent0[0]: (1025) {G19,W7,D4,L1,V2,M1} P(756,1012) { meet( Y, join( Y, X )
% 67.27/67.66 ) ==> Y }.
% 67.27/67.66 parent1[0; 7]: (146101) {G21,W8,D4,L1,V2,M1} { zero ==> meet( complement(
% 67.27/67.66 X ), meet( Y, X ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := join( X, Y )
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146103) {G20,W8,D5,L1,V2,M1} { meet( complement( join( X, Y ) ),
% 67.27/67.66 X ) ==> zero }.
% 67.27/67.66 parent0[0]: (146102) {G20,W8,D5,L1,V2,M1} { zero ==> meet( complement(
% 67.27/67.66 join( X, Y ) ), X ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1033) {G22,W8,D5,L1,V2,M1} P(1025,830) { meet( complement(
% 67.27/67.66 join( X, Y ) ), X ) ==> zero }.
% 67.27/67.66 parent0: (146103) {G20,W8,D5,L1,V2,M1} { meet( complement( join( X, Y ) )
% 67.27/67.66 , X ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146105) {G20,W8,D4,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 67.27/67.66 complement( Y ) ) }.
% 67.27/67.66 parent0[0]: (828) {G20,W8,D4,L1,V2,M1} P(756,826) { meet( meet( Y, X ),
% 67.27/67.66 complement( X ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146106) {G20,W8,D5,L1,V2,M1} { zero ==> meet( X, complement(
% 67.27/67.66 join( X, Y ) ) ) }.
% 67.27/67.66 parent0[0]: (1025) {G19,W7,D4,L1,V2,M1} P(756,1012) { meet( Y, join( Y, X )
% 67.27/67.66 ) ==> Y }.
% 67.27/67.66 parent1[0; 3]: (146105) {G20,W8,D4,L1,V2,M1} { zero ==> meet( meet( X, Y )
% 67.27/67.66 , complement( Y ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := join( X, Y )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146107) {G20,W8,D5,L1,V2,M1} { meet( X, complement( join( X, Y )
% 67.27/67.66 ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (146106) {G20,W8,D5,L1,V2,M1} { zero ==> meet( X, complement(
% 67.27/67.66 join( X, Y ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1034) {G21,W8,D5,L1,V2,M1} P(1025,828) { meet( X, complement
% 67.27/67.66 ( join( X, Y ) ) ) ==> zero }.
% 67.27/67.66 parent0: (146107) {G20,W8,D5,L1,V2,M1} { meet( X, complement( join( X, Y )
% 67.27/67.66 ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146109) {G19,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y ) ) }.
% 67.27/67.66 parent0[0]: (1025) {G19,W7,D4,L1,V2,M1} P(756,1012) { meet( Y, join( Y, X )
% 67.27/67.66 ) ==> Y }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146110) {G1,W9,D5,L1,V3,M1} { X ==> meet( X, join( join( X, Y )
% 67.27/67.66 , Z ) ) }.
% 67.27/67.66 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.27/67.66 join( X, Y ), Z ) }.
% 67.27/67.66 parent1[0; 4]: (146109) {G19,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y )
% 67.27/67.66 ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := join( Y, Z )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146111) {G1,W9,D5,L1,V3,M1} { meet( X, join( join( X, Y ), Z ) )
% 67.27/67.66 ==> X }.
% 67.27/67.66 parent0[0]: (146110) {G1,W9,D5,L1,V3,M1} { X ==> meet( X, join( join( X, Y
% 67.27/67.66 ), Z ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1041) {G20,W9,D5,L1,V3,M1} P(1,1025) { meet( X, join( join( X
% 67.27/67.66 , Y ), Z ) ) ==> X }.
% 67.27/67.66 parent0: (146111) {G1,W9,D5,L1,V3,M1} { meet( X, join( join( X, Y ), Z ) )
% 67.27/67.66 ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146112) {G19,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y ) ) }.
% 67.27/67.66 parent0[0]: (1025) {G19,W7,D4,L1,V2,M1} P(756,1012) { meet( Y, join( Y, X )
% 67.27/67.66 ) ==> Y }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146113) {G1,W7,D4,L1,V2,M1} { X ==> meet( X, join( Y, X ) ) }.
% 67.27/67.66 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.27/67.66 parent1[0; 4]: (146112) {G19,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y )
% 67.27/67.66 ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146116) {G1,W7,D4,L1,V2,M1} { meet( X, join( Y, X ) ) ==> X }.
% 67.27/67.66 parent0[0]: (146113) {G1,W7,D4,L1,V2,M1} { X ==> meet( X, join( Y, X ) )
% 67.27/67.66 }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1043) {G20,W7,D4,L1,V2,M1} P(0,1025) { meet( X, join( Y, X )
% 67.27/67.66 ) ==> X }.
% 67.27/67.66 parent0: (146116) {G1,W7,D4,L1,V2,M1} { meet( X, join( Y, X ) ) ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146118) {G21,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X ) }.
% 67.27/67.66 parent0[0]: (1032) {G21,W7,D4,L1,V2,M1} P(1025,843) { meet( join( X, Y ), X
% 67.27/67.66 ) ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146119) {G1,W9,D5,L1,V3,M1} { X ==> meet( join( join( X, Y ), Z
% 67.27/67.66 ), X ) }.
% 67.27/67.66 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.27/67.66 join( X, Y ), Z ) }.
% 67.27/67.66 parent1[0; 3]: (146118) {G21,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X
% 67.27/67.66 ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := join( Y, Z )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146120) {G1,W9,D5,L1,V3,M1} { meet( join( join( X, Y ), Z ), X )
% 67.27/67.66 ==> X }.
% 67.27/67.66 parent0[0]: (146119) {G1,W9,D5,L1,V3,M1} { X ==> meet( join( join( X, Y )
% 67.27/67.66 , Z ), X ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1052) {G22,W9,D5,L1,V3,M1} P(1,1032) { meet( join( join( X, Y
% 67.27/67.66 ), Z ), X ) ==> X }.
% 67.27/67.66 parent0: (146120) {G1,W9,D5,L1,V3,M1} { meet( join( join( X, Y ), Z ), X )
% 67.27/67.66 ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146121) {G21,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X ) }.
% 67.27/67.66 parent0[0]: (1032) {G21,W7,D4,L1,V2,M1} P(1025,843) { meet( join( X, Y ), X
% 67.27/67.66 ) ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146122) {G1,W7,D4,L1,V2,M1} { X ==> meet( join( Y, X ), X ) }.
% 67.27/67.66 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.27/67.66 parent1[0; 3]: (146121) {G21,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X
% 67.27/67.66 ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146125) {G1,W7,D4,L1,V2,M1} { meet( join( Y, X ), X ) ==> X }.
% 67.27/67.66 parent0[0]: (146122) {G1,W7,D4,L1,V2,M1} { X ==> meet( join( Y, X ), X )
% 67.27/67.66 }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1054) {G22,W7,D4,L1,V2,M1} P(0,1032) { meet( join( Y, X ), X
% 67.27/67.66 ) ==> X }.
% 67.27/67.66 parent0: (146125) {G1,W7,D4,L1,V2,M1} { meet( join( Y, X ), X ) ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146127) {G21,W8,D4,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 67.27/67.66 complement( X ) ) }.
% 67.27/67.66 parent0[0]: (831) {G21,W8,D4,L1,V2,M1} P(75,828) { meet( meet( Y, X ),
% 67.27/67.66 complement( Y ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146128) {G22,W8,D5,L1,V2,M1} { zero ==> meet( Y, complement(
% 67.27/67.66 join( X, Y ) ) ) }.
% 67.27/67.66 parent0[0]: (1054) {G22,W7,D4,L1,V2,M1} P(0,1032) { meet( join( Y, X ), X )
% 67.27/67.66 ==> X }.
% 67.27/67.66 parent1[0; 3]: (146127) {G21,W8,D4,L1,V2,M1} { zero ==> meet( meet( X, Y )
% 67.27/67.66 , complement( X ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := join( X, Y )
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146129) {G22,W8,D5,L1,V2,M1} { meet( X, complement( join( Y, X )
% 67.27/67.66 ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (146128) {G22,W8,D5,L1,V2,M1} { zero ==> meet( Y, complement(
% 67.27/67.66 join( X, Y ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1055) {G23,W8,D5,L1,V2,M1} P(1054,831) { meet( Y, complement
% 67.27/67.66 ( join( X, Y ) ) ) ==> zero }.
% 67.27/67.66 parent0: (146129) {G22,W8,D5,L1,V2,M1} { meet( X, complement( join( Y, X )
% 67.27/67.66 ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146130) {G22,W7,D4,L1,V2,M1} { Y ==> meet( join( X, Y ), Y ) }.
% 67.27/67.66 parent0[0]: (1054) {G22,W7,D4,L1,V2,M1} P(0,1032) { meet( join( Y, X ), X )
% 67.27/67.66 ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146131) {G2,W9,D5,L1,V3,M1} { X ==> meet( join( join( Y, X ), Z
% 67.27/67.66 ), X ) }.
% 67.27/67.66 parent0[0]: (30) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X )
% 67.27/67.66 = join( join( Z, X ), Y ) }.
% 67.27/67.66 parent1[0; 3]: (146130) {G22,W7,D4,L1,V2,M1} { Y ==> meet( join( X, Y ), Y
% 67.27/67.66 ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := join( Y, Z )
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146134) {G2,W9,D5,L1,V3,M1} { meet( join( join( Y, X ), Z ), X )
% 67.27/67.66 ==> X }.
% 67.27/67.66 parent0[0]: (146131) {G2,W9,D5,L1,V3,M1} { X ==> meet( join( join( Y, X )
% 67.27/67.66 , Z ), X ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1057) {G23,W9,D5,L1,V3,M1} P(30,1054) { meet( join( join( X,
% 67.27/67.66 Z ), Y ), Z ) ==> Z }.
% 67.27/67.66 parent0: (146134) {G2,W9,D5,L1,V3,M1} { meet( join( join( Y, X ), Z ), X )
% 67.27/67.66 ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Z
% 67.27/67.66 Y := X
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146136) {G22,W7,D4,L1,V2,M1} { Y ==> meet( join( X, Y ), Y ) }.
% 67.27/67.66 parent0[0]: (1054) {G22,W7,D4,L1,V2,M1} P(0,1032) { meet( join( Y, X ), X )
% 67.27/67.66 ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146137) {G1,W13,D5,L1,V3,M1} { composition( X, Y ) ==> meet(
% 67.27/67.66 composition( join( Z, X ), Y ), composition( X, Y ) ) }.
% 67.27/67.66 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 67.27/67.66 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 67.27/67.66 parent1[0; 5]: (146136) {G22,W7,D4,L1,V2,M1} { Y ==> meet( join( X, Y ), Y
% 67.27/67.66 ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Z
% 67.27/67.66 Y := X
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := composition( Z, Y )
% 67.27/67.66 Y := composition( X, Y )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146138) {G1,W13,D5,L1,V3,M1} { meet( composition( join( Z, X ), Y
% 67.27/67.66 ), composition( X, Y ) ) ==> composition( X, Y ) }.
% 67.27/67.66 parent0[0]: (146137) {G1,W13,D5,L1,V3,M1} { composition( X, Y ) ==> meet(
% 67.27/67.66 composition( join( Z, X ), Y ), composition( X, Y ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1061) {G23,W13,D5,L1,V3,M1} P(6,1054) { meet( composition(
% 67.27/67.66 join( X, Z ), Y ), composition( Z, Y ) ) ==> composition( Z, Y ) }.
% 67.27/67.66 parent0: (146138) {G1,W13,D5,L1,V3,M1} { meet( composition( join( Z, X ),
% 67.27/67.66 Y ), composition( X, Y ) ) ==> composition( X, Y ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Z
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := X
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146140) {G23,W8,D5,L1,V2,M1} { zero ==> meet( X, complement( join
% 67.27/67.66 ( Y, X ) ) ) }.
% 67.27/67.66 parent0[0]: (1055) {G23,W8,D5,L1,V2,M1} P(1054,831) { meet( Y, complement(
% 67.27/67.66 join( X, Y ) ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146141) {G1,W12,D6,L1,V3,M1} { zero ==> meet( composition( X, Y
% 67.27/67.66 ), complement( composition( join( Z, X ), Y ) ) ) }.
% 67.27/67.66 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 67.27/67.66 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 67.27/67.66 parent1[0; 7]: (146140) {G23,W8,D5,L1,V2,M1} { zero ==> meet( X,
% 67.27/67.66 complement( join( Y, X ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Z
% 67.27/67.66 Y := X
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := composition( X, Y )
% 67.27/67.66 Y := composition( Z, Y )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146142) {G1,W12,D6,L1,V3,M1} { meet( composition( X, Y ),
% 67.27/67.66 complement( composition( join( Z, X ), Y ) ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (146141) {G1,W12,D6,L1,V3,M1} { zero ==> meet( composition( X
% 67.27/67.66 , Y ), complement( composition( join( Z, X ), Y ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1076) {G24,W12,D6,L1,V3,M1} P(6,1055) { meet( composition( Z
% 67.27/67.66 , Y ), complement( composition( join( X, Z ), Y ) ) ) ==> zero }.
% 67.27/67.66 parent0: (146142) {G1,W12,D6,L1,V3,M1} { meet( composition( X, Y ),
% 67.27/67.66 complement( composition( join( Z, X ), Y ) ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Z
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := X
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146144) {G22,W8,D5,L1,V2,M1} { zero ==> meet( complement( join( X
% 67.27/67.66 , Y ) ), X ) }.
% 67.27/67.66 parent0[0]: (1033) {G22,W8,D5,L1,V2,M1} P(1025,830) { meet( complement(
% 67.27/67.66 join( X, Y ) ), X ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146145) {G1,W10,D6,L1,V2,M1} { zero ==> meet( complement(
% 67.27/67.66 converse( join( X, Y ) ) ), converse( X ) ) }.
% 67.27/67.66 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 67.27/67.66 ) ==> converse( join( X, Y ) ) }.
% 67.27/67.66 parent1[0; 4]: (146144) {G22,W8,D5,L1,V2,M1} { zero ==> meet( complement(
% 67.27/67.66 join( X, Y ) ), X ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := converse( X )
% 67.27/67.66 Y := converse( Y )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146146) {G1,W10,D6,L1,V2,M1} { meet( complement( converse( join(
% 67.27/67.66 X, Y ) ) ), converse( X ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (146145) {G1,W10,D6,L1,V2,M1} { zero ==> meet( complement(
% 67.27/67.66 converse( join( X, Y ) ) ), converse( X ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1096) {G23,W10,D6,L1,V2,M1} P(8,1033) { meet( complement(
% 67.27/67.66 converse( join( X, Y ) ) ), converse( X ) ) ==> zero }.
% 67.27/67.66 parent0: (146146) {G1,W10,D6,L1,V2,M1} { meet( complement( converse( join
% 67.27/67.66 ( X, Y ) ) ), converse( X ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146148) {G21,W8,D5,L1,V2,M1} { zero ==> meet( X, complement( join
% 67.27/67.66 ( X, Y ) ) ) }.
% 67.27/67.66 parent0[0]: (1034) {G21,W8,D5,L1,V2,M1} P(1025,828) { meet( X, complement(
% 67.27/67.66 join( X, Y ) ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146149) {G1,W10,D6,L1,V2,M1} { zero ==> meet( converse( X ),
% 67.27/67.66 complement( converse( join( X, Y ) ) ) ) }.
% 67.27/67.66 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 67.27/67.66 ) ==> converse( join( X, Y ) ) }.
% 67.27/67.66 parent1[0; 6]: (146148) {G21,W8,D5,L1,V2,M1} { zero ==> meet( X,
% 67.27/67.66 complement( join( X, Y ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := converse( X )
% 67.27/67.66 Y := converse( Y )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146150) {G1,W10,D6,L1,V2,M1} { meet( converse( X ), complement(
% 67.27/67.66 converse( join( X, Y ) ) ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (146149) {G1,W10,D6,L1,V2,M1} { zero ==> meet( converse( X ),
% 67.27/67.66 complement( converse( join( X, Y ) ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1104) {G22,W10,D6,L1,V2,M1} P(8,1034) { meet( converse( X ),
% 67.27/67.66 complement( converse( join( X, Y ) ) ) ) ==> zero }.
% 67.27/67.66 parent0: (146150) {G1,W10,D6,L1,V2,M1} { meet( converse( X ), complement(
% 67.27/67.66 converse( join( X, Y ) ) ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146152) {G1,W11,D4,L1,V1,M1} { join( composition( X, top ), skol1
% 67.27/67.66 ) ==> composition( join( X, skol1 ), top ) }.
% 67.27/67.66 parent0[0]: (97) {G1,W11,D4,L1,V1,M1} P(13,6) { composition( join( X, skol1
% 67.27/67.66 ), top ) ==> join( composition( X, top ), skol1 ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146154) {G2,W11,D5,L1,V1,M1} { join( composition( meet( X, skol1
% 67.27/67.66 ), top ), skol1 ) ==> composition( skol1, top ) }.
% 67.27/67.66 parent0[0]: (898) {G22,W7,D4,L1,V2,M1} P(866,0) { join( meet( Y, X ), X )
% 67.27/67.66 ==> X }.
% 67.27/67.66 parent1[0; 9]: (146152) {G1,W11,D4,L1,V1,M1} { join( composition( X, top )
% 67.27/67.66 , skol1 ) ==> composition( join( X, skol1 ), top ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := skol1
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := meet( X, skol1 )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146155) {G1,W9,D5,L1,V1,M1} { join( composition( meet( X, skol1
% 67.27/67.66 ), top ), skol1 ) ==> skol1 }.
% 67.27/67.66 parent0[0]: (13) {G0,W5,D3,L1,V0,M1} I { composition( skol1, top ) ==>
% 67.27/67.66 skol1 }.
% 67.27/67.66 parent1[0; 8]: (146154) {G2,W11,D5,L1,V1,M1} { join( composition( meet( X
% 67.27/67.66 , skol1 ), top ), skol1 ) ==> composition( skol1, top ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1256) {G23,W9,D5,L1,V1,M1} P(898,97);d(13) { join(
% 67.27/67.66 composition( meet( X, skol1 ), top ), skol1 ) ==> skol1 }.
% 67.27/67.66 parent0: (146155) {G1,W9,D5,L1,V1,M1} { join( composition( meet( X, skol1
% 67.27/67.66 ), top ), skol1 ) ==> skol1 }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146158) {G1,W11,D4,L1,V1,M1} { join( composition( X, top ), skol1
% 67.27/67.66 ) ==> composition( join( X, skol1 ), top ) }.
% 67.27/67.66 parent0[0]: (97) {G1,W11,D4,L1,V1,M1} P(13,6) { composition( join( X, skol1
% 67.27/67.66 ), top ) ==> join( composition( X, top ), skol1 ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146159) {G2,W10,D5,L1,V0,M1} { join( composition( complement(
% 67.27/67.66 skol1 ), top ), skol1 ) ==> composition( top, top ) }.
% 67.27/67.66 parent0[0]: (15) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X )
% 67.27/67.66 ==> top }.
% 67.27/67.66 parent1[0; 8]: (146158) {G1,W11,D4,L1,V1,M1} { join( composition( X, top )
% 67.27/67.66 , skol1 ) ==> composition( join( X, skol1 ), top ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := skol1
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := complement( skol1 )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1268) {G2,W10,D5,L1,V0,M1} P(15,97) { join( composition(
% 67.27/67.66 complement( skol1 ), top ), skol1 ) ==> composition( top, top ) }.
% 67.27/67.66 parent0: (146159) {G2,W10,D5,L1,V0,M1} { join( composition( complement(
% 67.27/67.66 skol1 ), top ), skol1 ) ==> composition( top, top ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146163) {G2,W14,D5,L1,V3,M1} { join( join( meet( X, Y ), Z ),
% 67.27/67.66 meet( X, complement( Y ) ) ) = join( X, Z ) }.
% 67.27/67.66 parent0[0]: (1016) {G17,W10,D5,L1,V2,M1} S(48);d(772) { join( meet( X, Y )
% 67.27/67.66 , meet( X, complement( Y ) ) ) ==> X }.
% 67.27/67.66 parent1[0; 12]: (30) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y )
% 67.27/67.66 , X ) = join( join( Z, X ), Y ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := meet( X, complement( Y ) )
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := meet( X, Y )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1369) {G18,W14,D5,L1,V3,M1} P(1016,30) { join( join( meet( X
% 67.27/67.66 , Y ), Z ), meet( X, complement( Y ) ) ) ==> join( X, Z ) }.
% 67.27/67.66 parent0: (146163) {G2,W14,D5,L1,V3,M1} { join( join( meet( X, Y ), Z ),
% 67.27/67.66 meet( X, complement( Y ) ) ) = join( X, Z ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146165) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 67.27/67.66 join( X, Y ), Z ) }.
% 67.27/67.66 parent0[0]: (29) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 67.27/67.66 join( join( Y, Z ), X ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146166) {G2,W14,D5,L1,V3,M1} { join( X, Z ) = join( join( Z,
% 67.27/67.66 meet( X, Y ) ), meet( X, complement( Y ) ) ) }.
% 67.27/67.66 parent0[0]: (1016) {G17,W10,D5,L1,V2,M1} S(48);d(772) { join( meet( X, Y )
% 67.27/67.66 , meet( X, complement( Y ) ) ) ==> X }.
% 67.27/67.66 parent1[0; 2]: (146165) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) =
% 67.27/67.66 join( join( X, Y ), Z ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := Z
% 67.27/67.66 Y := meet( X, Y )
% 67.27/67.66 Z := meet( X, complement( Y ) )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146168) {G2,W14,D5,L1,V3,M1} { join( join( Y, meet( X, Z ) ),
% 67.27/67.66 meet( X, complement( Z ) ) ) = join( X, Y ) }.
% 67.27/67.66 parent0[0]: (146166) {G2,W14,D5,L1,V3,M1} { join( X, Z ) = join( join( Z,
% 67.27/67.66 meet( X, Y ) ), meet( X, complement( Y ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1371) {G18,W14,D5,L1,V3,M1} P(1016,29) { join( join( Z, meet
% 67.27/67.66 ( X, Y ) ), meet( X, complement( Y ) ) ) ==> join( X, Z ) }.
% 67.27/67.66 parent0: (146168) {G2,W14,D5,L1,V3,M1} { join( join( Y, meet( X, Z ) ),
% 67.27/67.66 meet( X, complement( Z ) ) ) = join( X, Y ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146170) {G17,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet( X
% 67.27/67.66 , complement( Y ) ) ) }.
% 67.27/67.66 parent0[0]: (1016) {G17,W10,D5,L1,V2,M1} S(48);d(772) { join( meet( X, Y )
% 67.27/67.66 , meet( X, complement( Y ) ) ) ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146171) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( Y, X ), meet( X
% 67.27/67.66 , complement( Y ) ) ) }.
% 67.27/67.66 parent0[0]: (75) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 67.27/67.66 Y ) }.
% 67.27/67.66 parent1[0; 3]: (146170) {G17,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.27/67.66 meet( X, complement( Y ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146175) {G2,W10,D5,L1,V2,M1} { join( meet( Y, X ), meet( X,
% 67.27/67.66 complement( Y ) ) ) ==> X }.
% 67.27/67.66 parent0[0]: (146171) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( Y, X ), meet
% 67.27/67.66 ( X, complement( Y ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1372) {G18,W10,D5,L1,V2,M1} P(75,1016) { join( meet( Y, X ),
% 67.27/67.66 meet( X, complement( Y ) ) ) ==> X }.
% 67.27/67.66 parent0: (146175) {G2,W10,D5,L1,V2,M1} { join( meet( Y, X ), meet( X,
% 67.27/67.66 complement( Y ) ) ) ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146179) {G17,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet( X
% 67.27/67.66 , complement( Y ) ) ) }.
% 67.27/67.66 parent0[0]: (1016) {G17,W10,D5,L1,V2,M1} S(48);d(772) { join( meet( X, Y )
% 67.27/67.66 , meet( X, complement( Y ) ) ) ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146181) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet(
% 67.27/67.66 complement( Y ), X ) ) }.
% 67.27/67.66 parent0[0]: (75) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 67.27/67.66 Y ) }.
% 67.27/67.66 parent1[0; 6]: (146179) {G17,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.27/67.66 meet( X, complement( Y ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := complement( Y )
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146187) {G2,W10,D5,L1,V2,M1} { join( meet( X, Y ), meet(
% 67.27/67.66 complement( Y ), X ) ) ==> X }.
% 67.27/67.66 parent0[0]: (146181) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet
% 67.27/67.66 ( complement( Y ), X ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1373) {G18,W10,D5,L1,V2,M1} P(75,1016) { join( meet( X, Y ),
% 67.27/67.66 meet( complement( Y ), X ) ) ==> X }.
% 67.27/67.66 parent0: (146187) {G2,W10,D5,L1,V2,M1} { join( meet( X, Y ), meet(
% 67.27/67.66 complement( Y ), X ) ) ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146188) {G18,W10,D5,L1,V2,M1} { Y ==> join( meet( X, Y ), meet( Y
% 67.27/67.66 , complement( X ) ) ) }.
% 67.27/67.66 parent0[0]: (1372) {G18,W10,D5,L1,V2,M1} P(75,1016) { join( meet( Y, X ),
% 67.27/67.66 meet( X, complement( Y ) ) ) ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146190) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( Y, X ), meet(
% 67.27/67.66 complement( Y ), X ) ) }.
% 67.27/67.66 parent0[0]: (75) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 67.27/67.66 Y ) }.
% 67.27/67.66 parent1[0; 6]: (146188) {G18,W10,D5,L1,V2,M1} { Y ==> join( meet( X, Y ),
% 67.27/67.66 meet( Y, complement( X ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := complement( Y )
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146196) {G2,W10,D5,L1,V2,M1} { join( meet( Y, X ), meet(
% 67.27/67.66 complement( Y ), X ) ) ==> X }.
% 67.27/67.66 parent0[0]: (146190) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( Y, X ), meet
% 67.27/67.66 ( complement( Y ), X ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1387) {G19,W10,D5,L1,V2,M1} P(75,1372) { join( meet( Y, X ),
% 67.27/67.66 meet( complement( Y ), X ) ) ==> X }.
% 67.27/67.66 parent0: (146196) {G2,W10,D5,L1,V2,M1} { join( meet( Y, X ), meet(
% 67.27/67.66 complement( Y ), X ) ) ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146197) {G18,W10,D5,L1,V2,M1} { Y ==> join( meet( X, Y ), meet( Y
% 67.27/67.66 , complement( X ) ) ) }.
% 67.27/67.66 parent0[0]: (1372) {G18,W10,D5,L1,V2,M1} P(75,1016) { join( meet( Y, X ),
% 67.27/67.66 meet( X, complement( Y ) ) ) ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146198) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement(
% 67.27/67.66 Y ) ), meet( Y, X ) ) }.
% 67.27/67.66 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.27/67.66 parent1[0; 2]: (146197) {G18,W10,D5,L1,V2,M1} { Y ==> join( meet( X, Y ),
% 67.27/67.66 meet( Y, complement( X ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := meet( Y, X )
% 67.27/67.66 Y := meet( X, complement( Y ) )
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146201) {G1,W10,D5,L1,V2,M1} { join( meet( X, complement( Y ) ),
% 67.27/67.66 meet( Y, X ) ) ==> X }.
% 67.27/67.66 parent0[0]: (146198) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( X,
% 67.27/67.66 complement( Y ) ), meet( Y, X ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1389) {G19,W10,D5,L1,V2,M1} P(1372,0) { join( meet( Y,
% 67.27/67.66 complement( X ) ), meet( X, Y ) ) ==> Y }.
% 67.27/67.66 parent0: (146201) {G1,W10,D5,L1,V2,M1} { join( meet( X, complement( Y ) )
% 67.27/67.66 , meet( Y, X ) ) ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146204) {G3,W11,D5,L1,V1,M1} { composition( converse(
% 67.27/67.66 composition( X, skol1 ) ), complement( composition( X, skol1 ) ) ) ==>
% 67.27/67.66 zero }.
% 67.27/67.66 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.27/67.66 }.
% 67.27/67.66 parent1[0; 1]: (103) {G2,W13,D6,L1,V1,M1} P(90,10);d(77) { join(
% 67.27/67.66 composition( converse( composition( X, skol1 ) ), complement( composition
% 67.27/67.66 ( X, skol1 ) ) ), zero ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := composition( converse( composition( X, skol1 ) ), complement(
% 67.27/67.66 composition( X, skol1 ) ) )
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1414) {G12,W11,D5,L1,V1,M1} S(103);d(740) { composition(
% 67.27/67.66 converse( composition( X, skol1 ) ), complement( composition( X, skol1 )
% 67.27/67.66 ) ) ==> zero }.
% 67.27/67.66 parent0: (146204) {G3,W11,D5,L1,V1,M1} { composition( converse(
% 67.27/67.66 composition( X, skol1 ) ), complement( composition( X, skol1 ) ) ) ==>
% 67.27/67.66 zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146206) {G19,W10,D5,L1,V2,M1} { Y ==> join( meet( X, Y ), meet(
% 67.27/67.66 complement( X ), Y ) ) }.
% 67.27/67.66 parent0[0]: (1387) {G19,W10,D5,L1,V2,M1} P(75,1372) { join( meet( Y, X ),
% 67.27/67.66 meet( complement( Y ), X ) ) ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146207) {G18,W14,D6,L1,V3,M1} { X ==> join( meet( meet( Y, Z ),
% 67.27/67.66 X ), meet( complement( meet( Z, Y ) ), X ) ) }.
% 67.27/67.66 parent0[0]: (972) {G17,W9,D4,L1,V2,M1} P(773,0);d(773) { complement( meet(
% 67.27/67.66 X, Y ) ) = complement( meet( Y, X ) ) }.
% 67.27/67.66 parent1[0; 9]: (146206) {G19,W10,D5,L1,V2,M1} { Y ==> join( meet( X, Y ),
% 67.27/67.66 meet( complement( X ), Y ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := Z
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := meet( Y, Z )
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146210) {G18,W14,D6,L1,V3,M1} { join( meet( meet( Y, Z ), X ),
% 67.27/67.66 meet( complement( meet( Z, Y ) ), X ) ) ==> X }.
% 67.27/67.66 parent0[0]: (146207) {G18,W14,D6,L1,V3,M1} { X ==> join( meet( meet( Y, Z
% 67.27/67.66 ), X ), meet( complement( meet( Z, Y ) ), X ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1430) {G20,W14,D6,L1,V3,M1} P(972,1387) { join( meet( meet( X
% 67.27/67.66 , Y ), Z ), meet( complement( meet( Y, X ) ), Z ) ) ==> Z }.
% 67.27/67.66 parent0: (146210) {G18,W14,D6,L1,V3,M1} { join( meet( meet( Y, Z ), X ),
% 67.27/67.66 meet( complement( meet( Z, Y ) ), X ) ) ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Z
% 67.27/67.66 Y := X
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146212) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 67.27/67.66 join( X, Y ), Z ) }.
% 67.27/67.66 parent0[0]: (29) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 67.27/67.66 join( join( Y, Z ), X ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146213) {G2,W14,D5,L1,V3,M1} { join( X, Z ) = join( join( Z,
% 67.27/67.66 meet( X, Y ) ), meet( complement( Y ), X ) ) }.
% 67.27/67.66 parent0[0]: (1373) {G18,W10,D5,L1,V2,M1} P(75,1016) { join( meet( X, Y ),
% 67.27/67.66 meet( complement( Y ), X ) ) ==> X }.
% 67.27/67.66 parent1[0; 2]: (146212) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) =
% 67.27/67.66 join( join( X, Y ), Z ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := Z
% 67.27/67.66 Y := meet( X, Y )
% 67.27/67.66 Z := meet( complement( Y ), X )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146215) {G2,W14,D5,L1,V3,M1} { join( join( Y, meet( X, Z ) ),
% 67.27/67.66 meet( complement( Z ), X ) ) = join( X, Y ) }.
% 67.27/67.66 parent0[0]: (146213) {G2,W14,D5,L1,V3,M1} { join( X, Z ) = join( join( Z,
% 67.27/67.66 meet( X, Y ) ), meet( complement( Y ), X ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1445) {G19,W14,D5,L1,V3,M1} P(1373,29) { join( join( Z, meet
% 67.27/67.66 ( X, Y ) ), meet( complement( Y ), X ) ) ==> join( X, Z ) }.
% 67.27/67.66 parent0: (146215) {G2,W14,D5,L1,V3,M1} { join( join( Y, meet( X, Z ) ),
% 67.27/67.66 meet( complement( Z ), X ) ) = join( X, Y ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146218) {G21,W8,D5,L1,V2,M1} { zero ==> meet( X, complement( join
% 67.27/67.66 ( X, Y ) ) ) }.
% 67.27/67.66 parent0[0]: (1034) {G21,W8,D5,L1,V2,M1} P(1025,828) { meet( X, complement(
% 67.27/67.66 join( X, Y ) ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146220) {G2,W17,D7,L1,V3,M1} { zero ==> meet( composition(
% 67.27/67.66 converse( X ), complement( composition( composition( X, Y ), Z ) ) ),
% 67.27/67.66 complement( complement( composition( Y, Z ) ) ) ) }.
% 67.27/67.66 parent0[0]: (104) {G1,W19,D7,L1,V3,M1} P(4,10) { join( composition(
% 67.27/67.66 converse( X ), complement( composition( composition( X, Y ), Z ) ) ),
% 67.27/67.66 complement( composition( Y, Z ) ) ) ==> complement( composition( Y, Z ) )
% 67.27/67.66 }.
% 67.27/67.66 parent1[0; 13]: (146218) {G21,W8,D5,L1,V2,M1} { zero ==> meet( X,
% 67.27/67.66 complement( join( X, Y ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := composition( converse( X ), complement( composition( composition( X
% 67.27/67.66 , Y ), Z ) ) )
% 67.27/67.66 Y := complement( composition( Y, Z ) )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146221) {G3,W15,D7,L1,V3,M1} { zero ==> meet( composition(
% 67.27/67.66 converse( X ), complement( composition( composition( X, Y ), Z ) ) ),
% 67.27/67.66 composition( Y, Z ) ) }.
% 67.27/67.66 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.66 complement( X ) ) ==> X }.
% 67.27/67.66 parent1[0; 12]: (146220) {G2,W17,D7,L1,V3,M1} { zero ==> meet( composition
% 67.27/67.66 ( converse( X ), complement( composition( composition( X, Y ), Z ) ) ),
% 67.27/67.66 complement( complement( composition( Y, Z ) ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := composition( Y, Z )
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146222) {G3,W15,D7,L1,V3,M1} { meet( composition( converse( X ),
% 67.27/67.66 complement( composition( composition( X, Y ), Z ) ) ), composition( Y, Z
% 67.27/67.66 ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (146221) {G3,W15,D7,L1,V3,M1} { zero ==> meet( composition(
% 67.27/67.66 converse( X ), complement( composition( composition( X, Y ), Z ) ) ),
% 67.27/67.66 composition( Y, Z ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1446) {G22,W15,D7,L1,V3,M1} P(104,1034);d(756) { meet(
% 67.27/67.66 composition( converse( X ), complement( composition( composition( X, Y )
% 67.27/67.66 , Z ) ) ), composition( Y, Z ) ) ==> zero }.
% 67.27/67.66 parent0: (146222) {G3,W15,D7,L1,V3,M1} { meet( composition( converse( X )
% 67.27/67.66 , complement( composition( composition( X, Y ), Z ) ) ), composition( Y,
% 67.27/67.66 Z ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146223) {G17,W10,D5,L1,V2,M1} { join( X, complement( Y ) ) ==>
% 67.27/67.66 complement( meet( complement( X ), Y ) ) }.
% 67.27/67.66 parent0[0]: (950) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet(
% 67.27/67.66 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146227) {G18,W15,D6,L1,V3,M1} { join( meet( complement( X ), Y )
% 67.27/67.66 , complement( Z ) ) ==> complement( meet( join( X, complement( Y ) ), Z )
% 67.27/67.66 ) }.
% 67.27/67.66 parent0[0]: (950) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet(
% 67.27/67.66 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.66 parent1[0; 10]: (146223) {G17,W10,D5,L1,V2,M1} { join( X, complement( Y )
% 67.27/67.66 ) ==> complement( meet( complement( X ), Y ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := meet( complement( X ), Y )
% 67.27/67.66 Y := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1452) {G18,W15,D6,L1,V3,M1} P(950,950) { join( meet(
% 67.27/67.66 complement( X ), Y ), complement( Z ) ) ==> complement( meet( join( X,
% 67.27/67.66 complement( Y ) ), Z ) ) }.
% 67.27/67.66 parent0: (146227) {G18,W15,D6,L1,V3,M1} { join( meet( complement( X ), Y )
% 67.27/67.66 , complement( Z ) ) ==> complement( meet( join( X, complement( Y ) ), Z )
% 67.27/67.66 ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146234) {G16,W10,D4,L1,V2,M1} { complement( meet( X, Y ) ) ==>
% 67.27/67.66 join( complement( X ), complement( Y ) ) }.
% 67.27/67.66 parent0[0]: (773) {G16,W10,D4,L1,V2,M1} P(3,756) { join( complement( X ),
% 67.27/67.66 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146238) {G17,W15,D6,L1,V3,M1} { complement( meet( meet(
% 67.27/67.66 complement( X ), Y ), Z ) ) ==> join( join( X, complement( Y ) ),
% 67.27/67.66 complement( Z ) ) }.
% 67.27/67.66 parent0[0]: (950) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet(
% 67.27/67.66 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.66 parent1[0; 9]: (146234) {G16,W10,D4,L1,V2,M1} { complement( meet( X, Y ) )
% 67.27/67.66 ==> join( complement( X ), complement( Y ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := meet( complement( X ), Y )
% 67.27/67.66 Y := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146240) {G18,W14,D6,L1,V3,M1} { complement( meet( meet(
% 67.27/67.66 complement( X ), Y ), Z ) ) ==> join( complement( meet( Y, Z ) ), X ) }.
% 67.27/67.66 parent0[0]: (966) {G17,W14,D5,L1,V3,M1} P(773,29) { join( join( Z,
% 67.27/67.66 complement( X ) ), complement( Y ) ) ==> join( complement( meet( X, Y ) )
% 67.27/67.66 , Z ) }.
% 67.27/67.66 parent1[0; 8]: (146238) {G17,W15,D6,L1,V3,M1} { complement( meet( meet(
% 67.27/67.66 complement( X ), Y ), Z ) ) ==> join( join( X, complement( Y ) ),
% 67.27/67.66 complement( Z ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1470) {G18,W14,D6,L1,V3,M1} P(950,773);d(966) { complement(
% 67.27/67.66 meet( meet( complement( X ), Y ), Z ) ) ==> join( complement( meet( Y, Z
% 67.27/67.66 ) ), X ) }.
% 67.27/67.66 parent0: (146240) {G18,W14,D6,L1,V3,M1} { complement( meet( meet(
% 67.27/67.66 complement( X ), Y ), Z ) ) ==> join( complement( meet( Y, Z ) ), X ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146244) {G3,W9,D5,L1,V1,M1} { composition( converse( X ),
% 67.27/67.66 complement( composition( X, top ) ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.27/67.66 }.
% 67.27/67.66 parent1[0; 1]: (105) {G2,W11,D6,L1,V1,M1} P(77,10) { join( composition(
% 67.27/67.66 converse( X ), complement( composition( X, top ) ) ), zero ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := composition( converse( X ), complement( composition( X, top ) ) )
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1486) {G12,W9,D5,L1,V1,M1} S(105);d(740) { composition(
% 67.27/67.66 converse( X ), complement( composition( X, top ) ) ) ==> zero }.
% 67.27/67.66 parent0: (146244) {G3,W9,D5,L1,V1,M1} { composition( converse( X ),
% 67.27/67.66 complement( composition( X, top ) ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146247) {G12,W9,D5,L1,V1,M1} { zero ==> composition( converse( X
% 67.27/67.66 ), complement( composition( X, top ) ) ) }.
% 67.27/67.66 parent0[0]: (1486) {G12,W9,D5,L1,V1,M1} S(105);d(740) { composition(
% 67.27/67.66 converse( X ), complement( composition( X, top ) ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146249) {G12,W11,D6,L1,V1,M1} { zero ==> composition( converse(
% 67.27/67.66 converse( X ) ), complement( converse( composition( top, X ) ) ) ) }.
% 67.27/67.66 parent0[0]: (224) {G11,W9,D4,L1,V1,M1} P(223,17) { composition( converse( X
% 67.27/67.66 ), top ) ==> converse( composition( top, X ) ) }.
% 67.27/67.66 parent1[0; 7]: (146247) {G12,W9,D5,L1,V1,M1} { zero ==> composition(
% 67.27/67.66 converse( X ), complement( composition( X, top ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := converse( X )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146250) {G1,W9,D6,L1,V1,M1} { zero ==> composition( X,
% 67.27/67.66 complement( converse( composition( top, X ) ) ) ) }.
% 67.27/67.66 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.27/67.66 parent1[0; 3]: (146249) {G12,W11,D6,L1,V1,M1} { zero ==> composition(
% 67.27/67.66 converse( converse( X ) ), complement( converse( composition( top, X ) )
% 67.27/67.66 ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146251) {G1,W9,D6,L1,V1,M1} { composition( X, complement(
% 67.27/67.66 converse( composition( top, X ) ) ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (146250) {G1,W9,D6,L1,V1,M1} { zero ==> composition( X,
% 67.27/67.66 complement( converse( composition( top, X ) ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1489) {G13,W9,D6,L1,V1,M1} P(224,1486);d(7) { composition( X
% 67.27/67.66 , complement( converse( composition( top, X ) ) ) ) ==> zero }.
% 67.27/67.66 parent0: (146251) {G1,W9,D6,L1,V1,M1} { composition( X, complement(
% 67.27/67.66 converse( composition( top, X ) ) ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146253) {G12,W9,D5,L1,V1,M1} { zero ==> composition( converse( X
% 67.27/67.66 ), complement( composition( X, top ) ) ) }.
% 67.27/67.66 parent0[0]: (1486) {G12,W9,D5,L1,V1,M1} S(105);d(740) { composition(
% 67.27/67.66 converse( X ), complement( composition( X, top ) ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146254) {G11,W8,D5,L1,V0,M1} { zero ==> composition( top,
% 67.27/67.66 complement( composition( top, top ) ) ) }.
% 67.27/67.66 parent0[0]: (223) {G10,W4,D3,L1,V0,M1} P(214,59) { converse( top ) ==> top
% 67.27/67.66 }.
% 67.27/67.66 parent1[0; 3]: (146253) {G12,W9,D5,L1,V1,M1} { zero ==> composition(
% 67.27/67.66 converse( X ), complement( composition( X, top ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := top
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146255) {G11,W8,D5,L1,V0,M1} { composition( top, complement(
% 67.27/67.66 composition( top, top ) ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (146254) {G11,W8,D5,L1,V0,M1} { zero ==> composition( top,
% 67.27/67.66 complement( composition( top, top ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1490) {G13,W8,D5,L1,V0,M1} P(223,1486) { composition( top,
% 67.27/67.66 complement( composition( top, top ) ) ) ==> zero }.
% 67.27/67.66 parent0: (146255) {G11,W8,D5,L1,V0,M1} { composition( top, complement(
% 67.27/67.66 composition( top, top ) ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146257) {G1,W10,D5,L1,V2,M1} { composition( converse( Y ), X )
% 67.27/67.66 ==> converse( composition( converse( X ), Y ) ) }.
% 67.27/67.66 parent0[0]: (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition(
% 67.27/67.66 converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146261) {G2,W10,D6,L1,V1,M1} { composition( converse( complement
% 67.27/67.66 ( composition( X, top ) ) ), X ) ==> converse( zero ) }.
% 67.27/67.66 parent0[0]: (1486) {G12,W9,D5,L1,V1,M1} S(105);d(740) { composition(
% 67.27/67.66 converse( X ), complement( composition( X, top ) ) ) ==> zero }.
% 67.27/67.66 parent1[0; 9]: (146257) {G1,W10,D5,L1,V2,M1} { composition( converse( Y )
% 67.27/67.66 , X ) ==> converse( composition( converse( X ), Y ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := complement( composition( X, top ) )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146262) {G3,W9,D6,L1,V1,M1} { composition( converse( complement
% 67.27/67.66 ( composition( X, top ) ) ), X ) ==> zero }.
% 67.27/67.66 parent0[0]: (776) {G15,W4,D3,L1,V0,M1} P(758,740) { converse( zero ) ==>
% 67.27/67.66 zero }.
% 67.27/67.66 parent1[0; 8]: (146261) {G2,W10,D6,L1,V1,M1} { composition( converse(
% 67.27/67.66 complement( composition( X, top ) ) ), X ) ==> converse( zero ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1492) {G16,W9,D6,L1,V1,M1} P(1486,17);d(776) { composition(
% 67.27/67.66 converse( complement( composition( X, top ) ) ), X ) ==> zero }.
% 67.27/67.66 parent0: (146262) {G3,W9,D6,L1,V1,M1} { composition( converse( complement
% 67.27/67.66 ( composition( X, top ) ) ), X ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146265) {G0,W11,D4,L1,V3,M1} { composition( composition( X, Y ),
% 67.27/67.66 Z ) ==> composition( X, composition( Y, Z ) ) }.
% 67.27/67.66 parent0[0]: (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z
% 67.27/67.66 ) ) ==> composition( composition( X, Y ), Z ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146268) {G1,W13,D5,L1,V2,M1} { composition( composition( X,
% 67.27/67.66 converse( Y ) ), complement( composition( Y, top ) ) ) ==> composition( X
% 67.27/67.66 , zero ) }.
% 67.27/67.66 parent0[0]: (1486) {G12,W9,D5,L1,V1,M1} S(105);d(740) { composition(
% 67.27/67.66 converse( X ), complement( composition( X, top ) ) ) ==> zero }.
% 67.27/67.66 parent1[0; 12]: (146265) {G0,W11,D4,L1,V3,M1} { composition( composition(
% 67.27/67.66 X, Y ), Z ) ==> composition( X, composition( Y, Z ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := converse( Y )
% 67.27/67.66 Z := complement( composition( Y, top ) )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146269) {G2,W11,D5,L1,V2,M1} { composition( composition( X,
% 67.27/67.66 converse( Y ) ), complement( composition( Y, top ) ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (796) {G19,W5,D3,L1,V1,M1} P(795,6);d(749);d(214);d(795) {
% 67.27/67.66 composition( X, zero ) ==> zero }.
% 67.27/67.66 parent1[0; 10]: (146268) {G1,W13,D5,L1,V2,M1} { composition( composition(
% 67.27/67.66 X, converse( Y ) ), complement( composition( Y, top ) ) ) ==> composition
% 67.27/67.66 ( X, zero ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1495) {G20,W11,D5,L1,V2,M1} P(1486,4);d(796) { composition(
% 67.27/67.66 composition( Y, converse( X ) ), complement( composition( X, top ) ) )
% 67.27/67.66 ==> zero }.
% 67.27/67.66 parent0: (146269) {G2,W11,D5,L1,V2,M1} { composition( composition( X,
% 67.27/67.66 converse( Y ) ), complement( composition( Y, top ) ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146272) {G12,W9,D5,L1,V1,M1} { zero ==> composition( converse( X
% 67.27/67.66 ), complement( composition( X, top ) ) ) }.
% 67.27/67.66 parent0[0]: (1486) {G12,W9,D5,L1,V1,M1} S(105);d(740) { composition(
% 67.27/67.66 converse( X ), complement( composition( X, top ) ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146273) {G2,W14,D7,L1,V2,M1} { zero ==> composition( join( X,
% 67.27/67.66 converse( Y ) ), complement( composition( join( converse( X ), Y ), top )
% 67.27/67.66 ) ) }.
% 67.27/67.66 parent0[0]: (19) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 67.27/67.66 ), Y ) ) ==> join( X, converse( Y ) ) }.
% 67.27/67.66 parent1[0; 3]: (146272) {G12,W9,D5,L1,V1,M1} { zero ==> composition(
% 67.27/67.66 converse( X ), complement( composition( X, top ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := join( converse( X ), Y )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146274) {G2,W14,D7,L1,V2,M1} { composition( join( X, converse( Y
% 67.27/67.66 ) ), complement( composition( join( converse( X ), Y ), top ) ) ) ==>
% 67.27/67.66 zero }.
% 67.27/67.66 parent0[0]: (146273) {G2,W14,D7,L1,V2,M1} { zero ==> composition( join( X
% 67.27/67.66 , converse( Y ) ), complement( composition( join( converse( X ), Y ), top
% 67.27/67.66 ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1496) {G13,W14,D7,L1,V2,M1} P(19,1486) { composition( join( X
% 67.27/67.66 , converse( Y ) ), complement( composition( join( converse( X ), Y ), top
% 67.27/67.66 ) ) ) ==> zero }.
% 67.27/67.66 parent0: (146274) {G2,W14,D7,L1,V2,M1} { composition( join( X, converse( Y
% 67.27/67.66 ) ), complement( composition( join( converse( X ), Y ), top ) ) ) ==>
% 67.27/67.66 zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146276) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ), Y ) ==>
% 67.27/67.66 join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.27/67.66 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 67.27/67.66 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146281) {G1,W17,D6,L1,V1,M1} { composition( join( X, top ),
% 67.27/67.66 complement( composition( top, top ) ) ) ==> join( composition( X,
% 67.27/67.66 complement( composition( top, top ) ) ), zero ) }.
% 67.27/67.66 parent0[0]: (1490) {G13,W8,D5,L1,V0,M1} P(223,1486) { composition( top,
% 67.27/67.66 complement( composition( top, top ) ) ) ==> zero }.
% 67.27/67.66 parent1[0; 16]: (146276) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z )
% 67.27/67.66 , Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := complement( composition( top, top ) )
% 67.27/67.66 Z := top
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146282) {G2,W15,D5,L1,V1,M1} { composition( join( X, top ),
% 67.27/67.66 complement( composition( top, top ) ) ) ==> composition( X, complement(
% 67.27/67.66 composition( top, top ) ) ) }.
% 67.27/67.66 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.27/67.66 }.
% 67.27/67.66 parent1[0; 9]: (146281) {G1,W17,D6,L1,V1,M1} { composition( join( X, top )
% 67.27/67.66 , complement( composition( top, top ) ) ) ==> join( composition( X,
% 67.27/67.66 complement( composition( top, top ) ) ), zero ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := composition( X, complement( composition( top, top ) ) )
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146283) {G3,W13,D5,L1,V1,M1} { composition( top, complement(
% 67.27/67.66 composition( top, top ) ) ) ==> composition( X, complement( composition(
% 67.27/67.66 top, top ) ) ) }.
% 67.27/67.66 parent0[0]: (215) {G9,W5,D3,L1,V1,M1} P(199,37);d(38);d(209) { join( X, top
% 67.27/67.66 ) ==> top }.
% 67.27/67.66 parent1[0; 2]: (146282) {G2,W15,D5,L1,V1,M1} { composition( join( X, top )
% 67.27/67.66 , complement( composition( top, top ) ) ) ==> composition( X, complement
% 67.27/67.66 ( composition( top, top ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146284) {G4,W8,D5,L1,V1,M1} { zero ==> composition( X,
% 67.27/67.66 complement( composition( top, top ) ) ) }.
% 67.27/67.66 parent0[0]: (1490) {G13,W8,D5,L1,V0,M1} P(223,1486) { composition( top,
% 67.27/67.66 complement( composition( top, top ) ) ) ==> zero }.
% 67.27/67.66 parent1[0; 1]: (146283) {G3,W13,D5,L1,V1,M1} { composition( top,
% 67.27/67.66 complement( composition( top, top ) ) ) ==> composition( X, complement(
% 67.27/67.66 composition( top, top ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146285) {G4,W8,D5,L1,V1,M1} { composition( X, complement(
% 67.27/67.66 composition( top, top ) ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (146284) {G4,W8,D5,L1,V1,M1} { zero ==> composition( X,
% 67.27/67.66 complement( composition( top, top ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1498) {G14,W8,D5,L1,V1,M1} P(1490,6);d(740);d(215);d(1490) {
% 67.27/67.66 composition( X, complement( composition( top, top ) ) ) ==> zero }.
% 67.27/67.66 parent0: (146285) {G4,W8,D5,L1,V1,M1} { composition( X, complement(
% 67.27/67.66 composition( top, top ) ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146286) {G14,W8,D5,L1,V1,M1} { zero ==> composition( X,
% 67.27/67.66 complement( composition( top, top ) ) ) }.
% 67.27/67.66 parent0[0]: (1498) {G14,W8,D5,L1,V1,M1} P(1490,6);d(740);d(215);d(1490) {
% 67.27/67.66 composition( X, complement( composition( top, top ) ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146288) {G5,W6,D4,L1,V0,M1} { zero ==> complement( composition(
% 67.27/67.66 top, top ) ) }.
% 67.27/67.66 parent0[0]: (187) {G4,W5,D3,L1,V1,M1} P(186,180) { composition( one, X )
% 67.27/67.66 ==> X }.
% 67.27/67.66 parent1[0; 2]: (146286) {G14,W8,D5,L1,V1,M1} { zero ==> composition( X,
% 67.27/67.66 complement( composition( top, top ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := complement( composition( top, top ) )
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := one
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146289) {G5,W6,D4,L1,V0,M1} { complement( composition( top, top )
% 67.27/67.66 ) ==> zero }.
% 67.27/67.66 parent0[0]: (146288) {G5,W6,D4,L1,V0,M1} { zero ==> complement(
% 67.27/67.66 composition( top, top ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1499) {G15,W6,D4,L1,V0,M1} P(1498,187) { complement(
% 67.27/67.66 composition( top, top ) ) ==> zero }.
% 67.27/67.66 parent0: (146289) {G5,W6,D4,L1,V0,M1} { complement( composition( top, top
% 67.27/67.66 ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146291) {G15,W5,D4,L1,V1,M1} { X ==> complement( complement( X )
% 67.27/67.66 ) }.
% 67.27/67.66 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.66 complement( X ) ) ==> X }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146293) {G16,W6,D3,L1,V0,M1} { composition( top, top ) ==>
% 67.27/67.66 complement( zero ) }.
% 67.27/67.66 parent0[0]: (1499) {G15,W6,D4,L1,V0,M1} P(1498,187) { complement(
% 67.27/67.66 composition( top, top ) ) ==> zero }.
% 67.27/67.66 parent1[0; 5]: (146291) {G15,W5,D4,L1,V1,M1} { X ==> complement(
% 67.27/67.66 complement( X ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := composition( top, top )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146294) {G13,W5,D3,L1,V0,M1} { composition( top, top ) ==> top
% 67.27/67.66 }.
% 67.27/67.66 parent0[0]: (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) { complement
% 67.27/67.66 ( zero ) ==> top }.
% 67.27/67.66 parent1[0; 4]: (146293) {G16,W6,D3,L1,V0,M1} { composition( top, top ) ==>
% 67.27/67.66 complement( zero ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1507) {G16,W5,D3,L1,V0,M1} P(1499,756);d(744) { composition(
% 67.27/67.66 top, top ) ==> top }.
% 67.27/67.66 parent0: (146294) {G13,W5,D3,L1,V0,M1} { composition( top, top ) ==> top
% 67.27/67.66 }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146297) {G0,W11,D4,L1,V3,M1} { composition( composition( X, Y ),
% 67.27/67.66 Z ) ==> composition( X, composition( Y, Z ) ) }.
% 67.27/67.66 parent0[0]: (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z
% 67.27/67.66 ) ) ==> composition( composition( X, Y ), Z ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146299) {G1,W9,D4,L1,V1,M1} { composition( composition( X, top )
% 67.27/67.66 , top ) ==> composition( X, top ) }.
% 67.27/67.66 parent0[0]: (1507) {G16,W5,D3,L1,V0,M1} P(1499,756);d(744) { composition(
% 67.27/67.66 top, top ) ==> top }.
% 67.27/67.66 parent1[0; 8]: (146297) {G0,W11,D4,L1,V3,M1} { composition( composition( X
% 67.27/67.66 , Y ), Z ) ==> composition( X, composition( Y, Z ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := top
% 67.27/67.66 Z := top
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1508) {G17,W9,D4,L1,V1,M1} P(1507,4) { composition(
% 67.27/67.66 composition( X, top ), top ) ==> composition( X, top ) }.
% 67.27/67.66 parent0: (146299) {G1,W9,D4,L1,V1,M1} { composition( composition( X, top )
% 67.27/67.66 , top ) ==> composition( X, top ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146303) {G0,W6,D4,L1,V1,M1} { zero ==> meet( X, complement( X ) )
% 67.27/67.66 }.
% 67.27/67.66 parent0[0]: (12) {G0,W6,D4,L1,V1,M1} I { meet( X, complement( X ) ) ==>
% 67.27/67.66 zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146306) {G1,W11,D5,L1,V2,M1} { zero ==> meet( meet( X,
% 67.27/67.66 complement( Y ) ), join( complement( X ), Y ) ) }.
% 67.27/67.66 parent0[0]: (951) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet( Y,
% 67.27/67.66 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 67.27/67.66 parent1[0; 7]: (146303) {G0,W6,D4,L1,V1,M1} { zero ==> meet( X, complement
% 67.27/67.66 ( X ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := meet( X, complement( Y ) )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146307) {G1,W11,D5,L1,V2,M1} { meet( meet( X, complement( Y ) ),
% 67.27/67.66 join( complement( X ), Y ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (146306) {G1,W11,D5,L1,V2,M1} { zero ==> meet( meet( X,
% 67.27/67.66 complement( Y ) ), join( complement( X ), Y ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1564) {G18,W11,D5,L1,V2,M1} P(951,12) { meet( meet( X,
% 67.27/67.66 complement( Y ) ), join( complement( X ), Y ) ) ==> zero }.
% 67.27/67.66 parent0: (146307) {G1,W11,D5,L1,V2,M1} { meet( meet( X, complement( Y ) )
% 67.27/67.66 , join( complement( X ), Y ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146309) {G21,W8,D5,L1,V2,M1} { zero ==> meet( X, complement( join
% 67.27/67.66 ( X, Y ) ) ) }.
% 67.27/67.66 parent0[0]: (1034) {G21,W8,D5,L1,V2,M1} P(1025,828) { meet( X, complement(
% 67.27/67.66 join( X, Y ) ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146311) {G2,W14,D7,L1,V2,M1} { zero ==> meet( composition( X,
% 67.27/67.66 complement( converse( composition( Y, X ) ) ) ), complement( complement(
% 67.27/67.66 converse( Y ) ) ) ) }.
% 67.27/67.66 parent0[0]: (110) {G1,W15,D7,L1,V2,M1} P(9,10);d(7) { join( composition( X
% 67.27/67.66 , complement( converse( composition( Y, X ) ) ) ), complement( converse(
% 67.27/67.66 Y ) ) ) ==> complement( converse( Y ) ) }.
% 67.27/67.66 parent1[0; 11]: (146309) {G21,W8,D5,L1,V2,M1} { zero ==> meet( X,
% 67.27/67.66 complement( join( X, Y ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := composition( X, complement( converse( composition( Y, X ) ) ) )
% 67.27/67.66 Y := complement( converse( Y ) )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146312) {G3,W12,D7,L1,V2,M1} { zero ==> meet( composition( X,
% 67.27/67.66 complement( converse( composition( Y, X ) ) ) ), converse( Y ) ) }.
% 67.27/67.66 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.66 complement( X ) ) ==> X }.
% 67.27/67.66 parent1[0; 10]: (146311) {G2,W14,D7,L1,V2,M1} { zero ==> meet( composition
% 67.27/67.66 ( X, complement( converse( composition( Y, X ) ) ) ), complement(
% 67.27/67.66 complement( converse( Y ) ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := converse( Y )
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146313) {G3,W12,D7,L1,V2,M1} { meet( composition( X, complement(
% 67.27/67.66 converse( composition( Y, X ) ) ) ), converse( Y ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (146312) {G3,W12,D7,L1,V2,M1} { zero ==> meet( composition( X
% 67.27/67.66 , complement( converse( composition( Y, X ) ) ) ), converse( Y ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1582) {G22,W12,D7,L1,V2,M1} P(110,1034);d(756) { meet(
% 67.27/67.66 composition( X, complement( converse( composition( Y, X ) ) ) ), converse
% 67.27/67.66 ( Y ) ) ==> zero }.
% 67.27/67.66 parent0: (146313) {G3,W12,D7,L1,V2,M1} { meet( composition( X, complement
% 67.27/67.66 ( converse( composition( Y, X ) ) ) ), converse( Y ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146315) {G22,W8,D5,L1,V2,M1} { zero ==> meet( complement( join( X
% 67.27/67.66 , Y ) ), X ) }.
% 67.27/67.66 parent0[0]: (1033) {G22,W8,D5,L1,V2,M1} P(1025,830) { meet( complement(
% 67.27/67.66 join( X, Y ) ), X ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146317) {G2,W14,D7,L1,V2,M1} { zero ==> meet( complement(
% 67.27/67.66 complement( converse( Y ) ) ), composition( X, complement( converse(
% 67.27/67.66 composition( Y, X ) ) ) ) ) }.
% 67.27/67.66 parent0[0]: (110) {G1,W15,D7,L1,V2,M1} P(9,10);d(7) { join( composition( X
% 67.27/67.66 , complement( converse( composition( Y, X ) ) ) ), complement( converse(
% 67.27/67.66 Y ) ) ) ==> complement( converse( Y ) ) }.
% 67.27/67.66 parent1[0; 4]: (146315) {G22,W8,D5,L1,V2,M1} { zero ==> meet( complement(
% 67.27/67.66 join( X, Y ) ), X ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := composition( X, complement( converse( composition( Y, X ) ) ) )
% 67.27/67.66 Y := complement( converse( Y ) )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146318) {G3,W12,D7,L1,V2,M1} { zero ==> meet( converse( X ),
% 67.27/67.66 composition( Y, complement( converse( composition( X, Y ) ) ) ) ) }.
% 67.27/67.66 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.66 complement( X ) ) ==> X }.
% 67.27/67.66 parent1[0; 3]: (146317) {G2,W14,D7,L1,V2,M1} { zero ==> meet( complement(
% 67.27/67.66 complement( converse( Y ) ) ), composition( X, complement( converse(
% 67.27/67.66 composition( Y, X ) ) ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := converse( X )
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146319) {G3,W12,D7,L1,V2,M1} { meet( converse( X ), composition(
% 67.27/67.66 Y, complement( converse( composition( X, Y ) ) ) ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (146318) {G3,W12,D7,L1,V2,M1} { zero ==> meet( converse( X ),
% 67.27/67.66 composition( Y, complement( converse( composition( X, Y ) ) ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1583) {G23,W12,D7,L1,V2,M1} P(110,1033);d(756) { meet(
% 67.27/67.66 converse( Y ), composition( X, complement( converse( composition( Y, X )
% 67.27/67.66 ) ) ) ) ==> zero }.
% 67.27/67.66 parent0: (146319) {G3,W12,D7,L1,V2,M1} { meet( converse( X ), composition
% 67.27/67.66 ( Y, complement( converse( composition( X, Y ) ) ) ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146321) {G16,W10,D5,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 67.27/67.66 complement( join( X, complement( Y ) ) ) }.
% 67.27/67.66 parent0[0]: (771) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( X,
% 67.27/67.66 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146328) {G17,W15,D6,L1,V3,M1} { meet( complement( X ), meet( Y,
% 67.27/67.66 complement( Z ) ) ) ==> complement( join( X, join( complement( Y ), Z ) )
% 67.27/67.66 ) }.
% 67.27/67.66 parent0[0]: (951) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet( Y,
% 67.27/67.66 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 67.27/67.66 parent1[0; 11]: (146321) {G16,W10,D5,L1,V2,M1} { meet( complement( X ), Y
% 67.27/67.66 ) ==> complement( join( X, complement( Y ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Z
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := meet( Y, complement( Z ) )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146329) {G1,W15,D6,L1,V3,M1} { meet( complement( X ), meet( Y,
% 67.27/67.66 complement( Z ) ) ) ==> complement( join( join( X, complement( Y ) ), Z )
% 67.27/67.66 ) }.
% 67.27/67.66 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.27/67.66 join( X, Y ), Z ) }.
% 67.27/67.66 parent1[0; 9]: (146328) {G17,W15,D6,L1,V3,M1} { meet( complement( X ),
% 67.27/67.66 meet( Y, complement( Z ) ) ) ==> complement( join( X, join( complement( Y
% 67.27/67.66 ), Z ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := complement( Y )
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1589) {G18,W15,D6,L1,V3,M1} P(951,771);d(1) { meet(
% 67.27/67.66 complement( Z ), meet( X, complement( Y ) ) ) ==> complement( join( join
% 67.27/67.66 ( Z, complement( X ) ), Y ) ) }.
% 67.27/67.66 parent0: (146329) {G1,W15,D6,L1,V3,M1} { meet( complement( X ), meet( Y,
% 67.27/67.66 complement( Z ) ) ) ==> complement( join( join( X, complement( Y ) ), Z )
% 67.27/67.66 ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Z
% 67.27/67.66 Y := X
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146332) {G16,W10,D5,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 67.27/67.66 complement( join( X, complement( Y ) ) ) }.
% 67.27/67.66 parent0[0]: (771) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( X,
% 67.27/67.66 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146336) {G16,W10,D4,L1,V2,M1} { meet( complement( X ),
% 67.27/67.66 complement( Y ) ) ==> complement( join( X, Y ) ) }.
% 67.27/67.66 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.66 complement( X ) ) ==> X }.
% 67.27/67.66 parent1[0; 9]: (146332) {G16,W10,D5,L1,V2,M1} { meet( complement( X ), Y )
% 67.27/67.66 ==> complement( join( X, complement( Y ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := complement( Y )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1598) {G17,W10,D4,L1,V2,M1} P(756,771) { meet( complement( Y
% 67.27/67.66 ), complement( X ) ) ==> complement( join( Y, X ) ) }.
% 67.27/67.66 parent0: (146336) {G16,W10,D4,L1,V2,M1} { meet( complement( X ),
% 67.27/67.66 complement( Y ) ) ==> complement( join( X, Y ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146340) {G16,W10,D5,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 67.27/67.66 complement( join( X, complement( Y ) ) ) }.
% 67.27/67.66 parent0[0]: (771) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( X,
% 67.27/67.66 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146343) {G5,W11,D5,L1,V2,M1} { meet( complement( join( X, Y ) )
% 67.27/67.66 , join( Y, X ) ) ==> complement( top ) }.
% 67.27/67.66 parent0[0]: (626) {G4,W10,D5,L1,V2,M1} P(308,30) { join( join( X, Y ),
% 67.27/67.66 complement( join( Y, X ) ) ) ==> top }.
% 67.27/67.66 parent1[0; 10]: (146340) {G16,W10,D5,L1,V2,M1} { meet( complement( X ), Y
% 67.27/67.66 ) ==> complement( join( X, complement( Y ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := join( X, Y )
% 67.27/67.66 Y := join( Y, X )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146344) {G2,W10,D5,L1,V2,M1} { meet( complement( join( X, Y ) )
% 67.27/67.66 , join( Y, X ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.27/67.66 zero }.
% 67.27/67.66 parent1[0; 9]: (146343) {G5,W11,D5,L1,V2,M1} { meet( complement( join( X,
% 67.27/67.66 Y ) ), join( Y, X ) ) ==> complement( top ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1602) {G17,W10,D5,L1,V2,M1} P(626,771);d(77) { meet(
% 67.27/67.66 complement( join( X, Y ) ), join( Y, X ) ) ==> zero }.
% 67.27/67.66 parent0: (146344) {G2,W10,D5,L1,V2,M1} { meet( complement( join( X, Y ) )
% 67.27/67.66 , join( Y, X ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146346) {G16,W10,D5,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 67.27/67.66 complement( join( X, complement( Y ) ) ) }.
% 67.27/67.66 parent0[0]: (771) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( X,
% 67.27/67.66 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146347) {G2,W14,D6,L1,V3,M1} { meet( complement( join( X, Y ) )
% 67.27/67.66 , Z ) ==> complement( join( join( X, complement( Z ) ), Y ) ) }.
% 67.27/67.66 parent0[0]: (30) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X )
% 67.27/67.66 = join( join( Z, X ), Y ) }.
% 67.27/67.66 parent1[0; 8]: (146346) {G16,W10,D5,L1,V2,M1} { meet( complement( X ), Y )
% 67.27/67.66 ==> complement( join( X, complement( Y ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := complement( Z )
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := join( X, Y )
% 67.27/67.66 Y := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146350) {G2,W14,D6,L1,V3,M1} { complement( join( join( X,
% 67.27/67.66 complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 67.27/67.66 parent0[0]: (146347) {G2,W14,D6,L1,V3,M1} { meet( complement( join( X, Y )
% 67.27/67.66 ), Z ) ==> complement( join( join( X, complement( Z ) ), Y ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1607) {G17,W14,D6,L1,V3,M1} P(30,771) { complement( join(
% 67.27/67.66 join( X, complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z
% 67.27/67.66 ) }.
% 67.27/67.66 parent0: (146350) {G2,W14,D6,L1,V3,M1} { complement( join( join( X,
% 67.27/67.66 complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146351) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 67.27/67.66 join( X, Y ), Z ) }.
% 67.27/67.66 parent0[0]: (29) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 67.27/67.66 join( join( Y, Z ), X ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146352) {G16,W10,D5,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 67.27/67.66 complement( join( X, complement( Y ) ) ) }.
% 67.27/67.66 parent0[0]: (771) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( X,
% 67.27/67.66 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146353) {G2,W14,D6,L1,V3,M1} { meet( complement( join( X, Y ) )
% 67.27/67.66 , Z ) ==> complement( join( join( complement( Z ), X ), Y ) ) }.
% 67.27/67.66 parent0[0]: (146351) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join
% 67.27/67.66 ( join( X, Y ), Z ) }.
% 67.27/67.66 parent1[0; 8]: (146352) {G16,W10,D5,L1,V2,M1} { meet( complement( X ), Y )
% 67.27/67.66 ==> complement( join( X, complement( Y ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := complement( Z )
% 67.27/67.66 Y := X
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := join( X, Y )
% 67.27/67.66 Y := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146358) {G2,W14,D6,L1,V3,M1} { complement( join( join( complement
% 67.27/67.66 ( Z ), X ), Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 67.27/67.66 parent0[0]: (146353) {G2,W14,D6,L1,V3,M1} { meet( complement( join( X, Y )
% 67.27/67.66 ), Z ) ==> complement( join( join( complement( Z ), X ), Y ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1609) {G17,W14,D6,L1,V3,M1} P(29,771) { complement( join(
% 67.27/67.66 join( complement( Z ), X ), Y ) ) ==> meet( complement( join( X, Y ) ), Z
% 67.27/67.66 ) }.
% 67.27/67.66 parent0: (146358) {G2,W14,D6,L1,V3,M1} { complement( join( join(
% 67.27/67.66 complement( Z ), X ), Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146360) {G17,W10,D4,L1,V2,M1} { complement( join( X, Y ) ) ==>
% 67.27/67.66 meet( complement( X ), complement( Y ) ) }.
% 67.27/67.66 parent0[0]: (1598) {G17,W10,D4,L1,V2,M1} P(756,771) { meet( complement( Y )
% 67.27/67.66 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146364) {G17,W15,D6,L1,V3,M1} { complement( join( join( X,
% 67.27/67.66 complement( Y ) ), Z ) ) ==> meet( meet( complement( X ), Y ), complement
% 67.27/67.66 ( Z ) ) }.
% 67.27/67.66 parent0[0]: (771) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( X,
% 67.27/67.66 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 67.27/67.66 parent1[0; 9]: (146360) {G17,W10,D4,L1,V2,M1} { complement( join( X, Y ) )
% 67.27/67.66 ==> meet( complement( X ), complement( Y ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := join( X, complement( Y ) )
% 67.27/67.66 Y := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146366) {G18,W14,D5,L1,V3,M1} { meet( complement( join( X, Z ) )
% 67.27/67.66 , Y ) ==> meet( meet( complement( X ), Y ), complement( Z ) ) }.
% 67.27/67.66 parent0[0]: (1607) {G17,W14,D6,L1,V3,M1} P(30,771) { complement( join( join
% 67.27/67.66 ( X, complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z )
% 67.27/67.66 }.
% 67.27/67.66 parent1[0; 1]: (146364) {G17,W15,D6,L1,V3,M1} { complement( join( join( X
% 67.27/67.66 , complement( Y ) ), Z ) ) ==> meet( meet( complement( X ), Y ),
% 67.27/67.66 complement( Z ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146367) {G18,W14,D5,L1,V3,M1} { meet( meet( complement( X ), Z )
% 67.27/67.66 , complement( Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 67.27/67.66 parent0[0]: (146366) {G18,W14,D5,L1,V3,M1} { meet( complement( join( X, Z
% 67.27/67.66 ) ), Y ) ==> meet( meet( complement( X ), Y ), complement( Z ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1612) {G18,W14,D5,L1,V3,M1} P(771,1598);d(1607) { meet( meet
% 67.27/67.66 ( complement( X ), Y ), complement( Z ) ) ==> meet( complement( join( X,
% 67.27/67.66 Z ) ), Y ) }.
% 67.27/67.66 parent0: (146367) {G18,W14,D5,L1,V3,M1} { meet( meet( complement( X ), Z )
% 67.27/67.66 , complement( Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146369) {G17,W10,D4,L1,V2,M1} { complement( join( X, Y ) ) ==>
% 67.27/67.66 meet( complement( X ), complement( Y ) ) }.
% 67.27/67.66 parent0[0]: (1598) {G17,W10,D4,L1,V2,M1} P(756,771) { meet( complement( Y )
% 67.27/67.66 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146372) {G18,W15,D6,L1,V3,M1} { complement( join( meet( X,
% 67.27/67.66 complement( Y ) ), Z ) ) ==> meet( join( complement( X ), Y ), complement
% 67.27/67.66 ( Z ) ) }.
% 67.27/67.66 parent0[0]: (951) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet( Y,
% 67.27/67.66 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 67.27/67.66 parent1[0; 9]: (146369) {G17,W10,D4,L1,V2,M1} { complement( join( X, Y ) )
% 67.27/67.66 ==> meet( complement( X ), complement( Y ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := meet( X, complement( Y ) )
% 67.27/67.66 Y := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146374) {G18,W15,D6,L1,V3,M1} { meet( join( complement( X ), Y )
% 67.27/67.66 , complement( Z ) ) ==> complement( join( meet( X, complement( Y ) ), Z )
% 67.27/67.66 ) }.
% 67.27/67.66 parent0[0]: (146372) {G18,W15,D6,L1,V3,M1} { complement( join( meet( X,
% 67.27/67.66 complement( Y ) ), Z ) ) ==> meet( join( complement( X ), Y ), complement
% 67.27/67.66 ( Z ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1613) {G18,W15,D6,L1,V3,M1} P(951,1598) { meet( join(
% 67.27/67.66 complement( X ), Y ), complement( Z ) ) ==> complement( join( meet( X,
% 67.27/67.66 complement( Y ) ), Z ) ) }.
% 67.27/67.66 parent0: (146374) {G18,W15,D6,L1,V3,M1} { meet( join( complement( X ), Y )
% 67.27/67.66 , complement( Z ) ) ==> complement( join( meet( X, complement( Y ) ), Z )
% 67.27/67.66 ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146377) {G17,W10,D4,L1,V2,M1} { complement( join( X, Y ) ) ==>
% 67.27/67.66 meet( complement( X ), complement( Y ) ) }.
% 67.27/67.66 parent0[0]: (1598) {G17,W10,D4,L1,V2,M1} P(756,771) { meet( complement( Y )
% 67.27/67.66 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146381) {G18,W15,D6,L1,V3,M1} { complement( join( X, meet( Y,
% 67.27/67.66 complement( Z ) ) ) ) ==> meet( complement( X ), join( complement( Y ), Z
% 67.27/67.66 ) ) }.
% 67.27/67.66 parent0[0]: (951) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet( Y,
% 67.27/67.66 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 67.27/67.66 parent1[0; 11]: (146377) {G17,W10,D4,L1,V2,M1} { complement( join( X, Y )
% 67.27/67.66 ) ==> meet( complement( X ), complement( Y ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Z
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := meet( Y, complement( Z ) )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146383) {G18,W15,D6,L1,V3,M1} { meet( complement( X ), join(
% 67.27/67.66 complement( Y ), Z ) ) ==> complement( join( X, meet( Y, complement( Z )
% 67.27/67.66 ) ) ) }.
% 67.27/67.66 parent0[0]: (146381) {G18,W15,D6,L1,V3,M1} { complement( join( X, meet( Y
% 67.27/67.66 , complement( Z ) ) ) ) ==> meet( complement( X ), join( complement( Y )
% 67.27/67.66 , Z ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1614) {G18,W15,D6,L1,V3,M1} P(951,1598) { meet( complement( Z
% 67.27/67.66 ), join( complement( X ), Y ) ) ==> complement( join( Z, meet( X,
% 67.27/67.66 complement( Y ) ) ) ) }.
% 67.27/67.66 parent0: (146383) {G18,W15,D6,L1,V3,M1} { meet( complement( X ), join(
% 67.27/67.66 complement( Y ), Z ) ) ==> complement( join( X, meet( Y, complement( Z )
% 67.27/67.66 ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Z
% 67.27/67.66 Y := X
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146385) {G17,W10,D4,L1,V2,M1} { complement( join( X, Y ) ) ==>
% 67.27/67.66 meet( complement( X ), complement( Y ) ) }.
% 67.27/67.66 parent0[0]: (1598) {G17,W10,D4,L1,V2,M1} P(756,771) { meet( complement( Y )
% 67.27/67.66 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146388) {G18,W15,D6,L1,V3,M1} { complement( join( meet(
% 67.27/67.66 complement( X ), Y ), Z ) ) ==> meet( join( X, complement( Y ) ),
% 67.27/67.66 complement( Z ) ) }.
% 67.27/67.66 parent0[0]: (950) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet(
% 67.27/67.66 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.66 parent1[0; 9]: (146385) {G17,W10,D4,L1,V2,M1} { complement( join( X, Y ) )
% 67.27/67.66 ==> meet( complement( X ), complement( Y ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := meet( complement( X ), Y )
% 67.27/67.66 Y := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146390) {G18,W15,D6,L1,V3,M1} { meet( join( X, complement( Y ) )
% 67.27/67.66 , complement( Z ) ) ==> complement( join( meet( complement( X ), Y ), Z )
% 67.27/67.66 ) }.
% 67.27/67.66 parent0[0]: (146388) {G18,W15,D6,L1,V3,M1} { complement( join( meet(
% 67.27/67.66 complement( X ), Y ), Z ) ) ==> meet( join( X, complement( Y ) ),
% 67.27/67.66 complement( Z ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1615) {G18,W15,D6,L1,V3,M1} P(950,1598) { meet( join( X,
% 67.27/67.66 complement( Y ) ), complement( Z ) ) ==> complement( join( meet(
% 67.27/67.66 complement( X ), Y ), Z ) ) }.
% 67.27/67.66 parent0: (146390) {G18,W15,D6,L1,V3,M1} { meet( join( X, complement( Y ) )
% 67.27/67.66 , complement( Z ) ) ==> complement( join( meet( complement( X ), Y ), Z )
% 67.27/67.66 ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146392) {G17,W10,D4,L1,V2,M1} { complement( join( X, Y ) ) ==>
% 67.27/67.66 meet( complement( X ), complement( Y ) ) }.
% 67.27/67.66 parent0[0]: (1598) {G17,W10,D4,L1,V2,M1} P(756,771) { meet( complement( Y )
% 67.27/67.66 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146394) {G2,W10,D4,L1,V2,M1} { complement( join( X, Y ) ) ==>
% 67.27/67.66 meet( complement( Y ), complement( X ) ) }.
% 67.27/67.66 parent0[0]: (75) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 67.27/67.66 Y ) }.
% 67.27/67.66 parent1[0; 5]: (146392) {G17,W10,D4,L1,V2,M1} { complement( join( X, Y ) )
% 67.27/67.66 ==> meet( complement( X ), complement( Y ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := complement( Y )
% 67.27/67.66 Y := complement( X )
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146396) {G3,W9,D4,L1,V2,M1} { complement( join( X, Y ) ) ==>
% 67.27/67.66 complement( join( Y, X ) ) }.
% 67.27/67.66 parent0[0]: (1598) {G17,W10,D4,L1,V2,M1} P(756,771) { meet( complement( Y )
% 67.27/67.66 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 67.27/67.66 parent1[0; 5]: (146394) {G2,W10,D4,L1,V2,M1} { complement( join( X, Y ) )
% 67.27/67.66 ==> meet( complement( Y ), complement( X ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1625) {G18,W9,D4,L1,V2,M1} P(1598,75);d(1598) { complement(
% 67.27/67.66 join( X, Y ) ) = complement( join( Y, X ) ) }.
% 67.27/67.66 parent0: (146396) {G3,W9,D4,L1,V2,M1} { complement( join( X, Y ) ) ==>
% 67.27/67.66 complement( join( Y, X ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146401) {G12,W12,D6,L1,V3,M1} { complement( join( complement(
% 67.27/67.66 meet( X, Y ) ), join( X, Z ) ) ) = complement( top ) }.
% 67.27/67.66 parent0[0]: (692) {G11,W10,D5,L1,V3,M1} P(48,599) { join( join( X, Z ),
% 67.27/67.66 complement( meet( X, Y ) ) ) ==> top }.
% 67.27/67.66 parent1[0; 11]: (1625) {G18,W9,D4,L1,V2,M1} P(1598,75);d(1598) { complement
% 67.27/67.66 ( join( X, Y ) ) = complement( join( Y, X ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := complement( meet( X, Y ) )
% 67.27/67.66 Y := join( X, Z )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146402) {G2,W11,D6,L1,V3,M1} { complement( join( complement(
% 67.27/67.66 meet( X, Y ) ), join( X, Z ) ) ) = zero }.
% 67.27/67.66 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.27/67.66 zero }.
% 67.27/67.66 parent1[0; 10]: (146401) {G12,W12,D6,L1,V3,M1} { complement( join(
% 67.27/67.66 complement( meet( X, Y ) ), join( X, Z ) ) ) = complement( top ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146403) {G3,W10,D5,L1,V3,M1} { meet( meet( X, Y ), complement(
% 67.27/67.66 join( X, Z ) ) ) = zero }.
% 67.27/67.66 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.66 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.66 parent1[0; 1]: (146402) {G2,W11,D6,L1,V3,M1} { complement( join(
% 67.27/67.66 complement( meet( X, Y ) ), join( X, Z ) ) ) = zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := join( X, Z )
% 67.27/67.66 Y := meet( X, Y )
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1641) {G19,W10,D5,L1,V3,M1} P(692,1625);d(77);d(772) { meet(
% 67.27/67.66 meet( X, Z ), complement( join( X, Y ) ) ) ==> zero }.
% 67.27/67.66 parent0: (146403) {G3,W10,D5,L1,V3,M1} { meet( meet( X, Y ), complement(
% 67.27/67.66 join( X, Z ) ) ) = zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146411) {G5,W12,D6,L1,V2,M1} { complement( join( complement(
% 67.27/67.66 join( X, Y ) ), join( Y, X ) ) ) = complement( top ) }.
% 67.27/67.66 parent0[0]: (626) {G4,W10,D5,L1,V2,M1} P(308,30) { join( join( X, Y ),
% 67.27/67.66 complement( join( Y, X ) ) ) ==> top }.
% 67.27/67.66 parent1[0; 11]: (1625) {G18,W9,D4,L1,V2,M1} P(1598,75);d(1598) { complement
% 67.27/67.66 ( join( X, Y ) ) = complement( join( Y, X ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := complement( join( X, Y ) )
% 67.27/67.66 Y := join( Y, X )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146412) {G2,W11,D6,L1,V2,M1} { complement( join( complement(
% 67.27/67.66 join( X, Y ) ), join( Y, X ) ) ) = zero }.
% 67.27/67.66 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.27/67.66 zero }.
% 67.27/67.66 parent1[0; 10]: (146411) {G5,W12,D6,L1,V2,M1} { complement( join(
% 67.27/67.66 complement( join( X, Y ) ), join( Y, X ) ) ) = complement( top ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146413) {G3,W10,D5,L1,V2,M1} { meet( join( X, Y ), complement(
% 67.27/67.66 join( Y, X ) ) ) = zero }.
% 67.27/67.66 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.66 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.66 parent1[0; 1]: (146412) {G2,W11,D6,L1,V2,M1} { complement( join(
% 67.27/67.66 complement( join( X, Y ) ), join( Y, X ) ) ) = zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := join( Y, X )
% 67.27/67.66 Y := join( X, Y )
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1655) {G19,W10,D5,L1,V2,M1} P(626,1625);d(77);d(772) { meet(
% 67.27/67.66 join( Y, X ), complement( join( X, Y ) ) ) ==> zero }.
% 67.27/67.66 parent0: (146413) {G3,W10,D5,L1,V2,M1} { meet( join( X, Y ), complement(
% 67.27/67.66 join( Y, X ) ) ) = zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146416) {G19,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, Y ),
% 67.27/67.66 complement( join( X, Z ) ) ) }.
% 67.27/67.66 parent0[0]: (1641) {G19,W10,D5,L1,V3,M1} P(692,1625);d(77);d(772) { meet(
% 67.27/67.66 meet( X, Z ), complement( join( X, Y ) ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146417) {G17,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, Y ),
% 67.27/67.66 meet( complement( X ), Z ) ) }.
% 67.27/67.66 parent0[0]: (771) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( X,
% 67.27/67.66 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 67.27/67.66 parent1[0; 6]: (146416) {G19,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, Y
% 67.27/67.66 ), complement( join( X, Z ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Z
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := complement( Z )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146418) {G17,W10,D5,L1,V3,M1} { meet( meet( X, Y ), meet(
% 67.27/67.66 complement( X ), Z ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (146417) {G17,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, Y ),
% 67.27/67.66 meet( complement( X ), Z ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1664) {G20,W10,D5,L1,V3,M1} P(771,1641) { meet( meet( X, Z )
% 67.27/67.66 , meet( complement( X ), Y ) ) ==> zero }.
% 67.27/67.66 parent0: (146418) {G17,W10,D5,L1,V3,M1} { meet( meet( X, Y ), meet(
% 67.27/67.66 complement( X ), Z ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146420) {G19,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, Y ),
% 67.27/67.66 complement( join( X, Z ) ) ) }.
% 67.27/67.66 parent0[0]: (1641) {G19,W10,D5,L1,V3,M1} P(692,1625);d(77);d(772) { meet(
% 67.27/67.66 meet( X, Z ), complement( join( X, Y ) ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146423) {G20,W10,D5,L1,V3,M1} { zero ==> meet( meet( meet( X, Y
% 67.27/67.66 ), Z ), complement( Y ) ) }.
% 67.27/67.66 parent0[0]: (1387) {G19,W10,D5,L1,V2,M1} P(75,1372) { join( meet( Y, X ),
% 67.27/67.66 meet( complement( Y ), X ) ) ==> X }.
% 67.27/67.66 parent1[0; 9]: (146420) {G19,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, Y
% 67.27/67.66 ), complement( join( X, Z ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := meet( X, Y )
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := meet( complement( X ), Y )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146424) {G20,W10,D5,L1,V3,M1} { meet( meet( meet( X, Y ), Z ),
% 67.27/67.66 complement( Y ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (146423) {G20,W10,D5,L1,V3,M1} { zero ==> meet( meet( meet( X
% 67.27/67.66 , Y ), Z ), complement( Y ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1667) {G20,W10,D5,L1,V3,M1} P(1387,1641) { meet( meet( meet(
% 67.27/67.66 X, Y ), Z ), complement( Y ) ) ==> zero }.
% 67.27/67.66 parent0: (146424) {G20,W10,D5,L1,V3,M1} { meet( meet( meet( X, Y ), Z ),
% 67.27/67.66 complement( Y ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146426) {G1,W13,D6,L1,V2,M1} { complement( X ) ==> join(
% 67.27/67.66 complement( X ), composition( converse( Y ), complement( composition( Y,
% 67.27/67.66 X ) ) ) ) }.
% 67.27/67.66 parent0[0]: (111) {G1,W13,D6,L1,V2,M1} P(10,0) { join( complement( Y ),
% 67.27/67.66 composition( converse( X ), complement( composition( X, Y ) ) ) ) ==>
% 67.27/67.66 complement( Y ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146429) {G2,W13,D7,L1,V0,M1} { complement( skol1 ) ==> join(
% 67.27/67.66 complement( skol1 ), composition( converse( converse( complement( skol1 )
% 67.27/67.66 ) ), complement( zero ) ) ) }.
% 67.27/67.66 parent0[0]: (783) {G16,W7,D5,L1,V0,M1} P(755,17);d(776) { composition(
% 67.27/67.66 converse( complement( skol1 ) ), skol1 ) ==> zero }.
% 67.27/67.66 parent1[0; 12]: (146426) {G1,W13,D6,L1,V2,M1} { complement( X ) ==> join(
% 67.27/67.66 complement( X ), composition( converse( Y ), complement( composition( Y,
% 67.27/67.66 X ) ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := skol1
% 67.27/67.66 Y := converse( complement( skol1 ) )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146430) {G1,W11,D5,L1,V0,M1} { complement( skol1 ) ==> join(
% 67.27/67.66 complement( skol1 ), composition( complement( skol1 ), complement( zero )
% 67.27/67.66 ) ) }.
% 67.27/67.66 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.27/67.66 parent1[0; 7]: (146429) {G2,W13,D7,L1,V0,M1} { complement( skol1 ) ==>
% 67.27/67.66 join( complement( skol1 ), composition( converse( converse( complement(
% 67.27/67.66 skol1 ) ) ), complement( zero ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := complement( skol1 )
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146431) {G2,W10,D5,L1,V0,M1} { complement( skol1 ) ==> join(
% 67.27/67.66 complement( skol1 ), composition( complement( skol1 ), top ) ) }.
% 67.27/67.66 parent0[0]: (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) { complement
% 67.27/67.66 ( zero ) ==> top }.
% 67.27/67.66 parent1[0; 9]: (146430) {G1,W11,D5,L1,V0,M1} { complement( skol1 ) ==>
% 67.27/67.66 join( complement( skol1 ), composition( complement( skol1 ), complement(
% 67.27/67.66 zero ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146432) {G2,W10,D5,L1,V0,M1} { join( complement( skol1 ),
% 67.27/67.66 composition( complement( skol1 ), top ) ) ==> complement( skol1 ) }.
% 67.27/67.66 parent0[0]: (146431) {G2,W10,D5,L1,V0,M1} { complement( skol1 ) ==> join(
% 67.27/67.66 complement( skol1 ), composition( complement( skol1 ), top ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1688) {G17,W10,D5,L1,V0,M1} P(783,111);d(7);d(744) { join(
% 67.27/67.66 complement( skol1 ), composition( complement( skol1 ), top ) ) ==>
% 67.27/67.66 complement( skol1 ) }.
% 67.27/67.66 parent0: (146432) {G2,W10,D5,L1,V0,M1} { join( complement( skol1 ),
% 67.27/67.66 composition( complement( skol1 ), top ) ) ==> complement( skol1 ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146434) {G18,W10,D5,L1,V2,M1} { zero ==> meet( complement( meet(
% 67.27/67.66 X, Y ) ), meet( Y, X ) ) }.
% 67.27/67.66 parent0[0]: (991) {G18,W10,D5,L1,V2,M1} P(972,384);d(768);d(756) { meet(
% 67.27/67.66 complement( meet( X, Y ) ), meet( Y, X ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146439) {G19,W13,D6,L1,V3,M1} { zero ==> meet( complement( zero
% 67.27/67.66 ), meet( meet( complement( X ), Z ), meet( X, Y ) ) ) }.
% 67.27/67.66 parent0[0]: (1664) {G20,W10,D5,L1,V3,M1} P(771,1641) { meet( meet( X, Z ),
% 67.27/67.66 meet( complement( X ), Y ) ) ==> zero }.
% 67.27/67.66 parent1[0; 4]: (146434) {G18,W10,D5,L1,V2,M1} { zero ==> meet( complement
% 67.27/67.66 ( meet( X, Y ) ), meet( Y, X ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := meet( X, Y )
% 67.27/67.66 Y := meet( complement( X ), Z )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146441) {G13,W12,D6,L1,V3,M1} { zero ==> meet( top, meet( meet(
% 67.27/67.66 complement( X ), Y ), meet( X, Z ) ) ) }.
% 67.27/67.66 parent0[0]: (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) { complement
% 67.27/67.66 ( zero ) ==> top }.
% 67.27/67.66 parent1[0; 3]: (146439) {G19,W13,D6,L1,V3,M1} { zero ==> meet( complement
% 67.27/67.66 ( zero ), meet( meet( complement( X ), Z ), meet( X, Y ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146442) {G13,W10,D5,L1,V3,M1} { zero ==> meet( meet( complement
% 67.27/67.66 ( X ), Y ), meet( X, Z ) ) }.
% 67.27/67.66 parent0[0]: (747) {G12,W5,D3,L1,V1,M1} P(75,715);d(740) { meet( top, X )
% 67.27/67.66 ==> X }.
% 67.27/67.66 parent1[0; 2]: (146441) {G13,W12,D6,L1,V3,M1} { zero ==> meet( top, meet(
% 67.27/67.66 meet( complement( X ), Y ), meet( X, Z ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := meet( meet( complement( X ), Y ), meet( X, Z ) )
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146443) {G13,W10,D5,L1,V3,M1} { meet( meet( complement( X ), Y )
% 67.27/67.66 , meet( X, Z ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (146442) {G13,W10,D5,L1,V3,M1} { zero ==> meet( meet(
% 67.27/67.66 complement( X ), Y ), meet( X, Z ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1698) {G21,W10,D5,L1,V3,M1} P(1664,991);d(744);d(747) { meet
% 67.27/67.66 ( meet( complement( X ), Z ), meet( X, Y ) ) ==> zero }.
% 67.27/67.66 parent0: (146443) {G13,W10,D5,L1,V3,M1} { meet( meet( complement( X ), Y )
% 67.27/67.66 , meet( X, Z ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146445) {G20,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, Y ), meet
% 67.27/67.66 ( complement( X ), Z ) ) }.
% 67.27/67.66 parent0[0]: (1664) {G20,W10,D5,L1,V3,M1} P(771,1641) { meet( meet( X, Z ),
% 67.27/67.66 meet( complement( X ), Y ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146455) {G21,W10,D5,L1,V3,M1} { zero ==> meet( meet( Y, X ),
% 67.27/67.66 meet( complement( X ), Z ) ) }.
% 67.27/67.66 parent0[0]: (843) {G20,W9,D4,L1,V2,M1} P(820,75) { meet( Y, meet( X, Y ) )
% 67.27/67.66 ==> meet( X, Y ) }.
% 67.27/67.66 parent1[0; 3]: (146445) {G20,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, Y
% 67.27/67.66 ), meet( complement( X ), Z ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := meet( Y, X )
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146458) {G21,W10,D5,L1,V3,M1} { meet( meet( X, Y ), meet(
% 67.27/67.66 complement( Y ), Z ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (146455) {G21,W10,D5,L1,V3,M1} { zero ==> meet( meet( Y, X ),
% 67.27/67.66 meet( complement( X ), Z ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1708) {G21,W10,D5,L1,V3,M1} P(843,1664) { meet( meet( Y, X )
% 67.27/67.66 , meet( complement( X ), Z ) ) ==> zero }.
% 67.27/67.66 parent0: (146458) {G21,W10,D5,L1,V3,M1} { meet( meet( X, Y ), meet(
% 67.27/67.66 complement( Y ), Z ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146461) {G21,W10,D5,L1,V3,M1} { zero ==> meet( meet( complement(
% 67.27/67.66 X ), Y ), meet( X, Z ) ) }.
% 67.27/67.66 parent0[0]: (1698) {G21,W10,D5,L1,V3,M1} P(1664,991);d(744);d(747) { meet(
% 67.27/67.66 meet( complement( X ), Z ), meet( X, Y ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146464) {G22,W10,D5,L1,V3,M1} { zero ==> meet( complement( Y ),
% 67.27/67.66 meet( meet( X, Y ), Z ) ) }.
% 67.27/67.66 parent0[0]: (945) {G23,W10,D5,L1,V2,M1} P(756,943) { meet( complement( meet
% 67.27/67.66 ( Y, X ) ), complement( X ) ) ==> complement( X ) }.
% 67.27/67.66 parent1[0; 3]: (146461) {G21,W10,D5,L1,V3,M1} { zero ==> meet( meet(
% 67.27/67.66 complement( X ), Y ), meet( X, Z ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := meet( X, Y )
% 67.27/67.66 Y := complement( Y )
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146466) {G22,W10,D5,L1,V3,M1} { meet( complement( X ), meet( meet
% 67.27/67.66 ( Y, X ), Z ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (146464) {G22,W10,D5,L1,V3,M1} { zero ==> meet( complement( Y
% 67.27/67.66 ), meet( meet( X, Y ), Z ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1711) {G24,W10,D5,L1,V3,M1} P(945,1698) { meet( complement( Y
% 67.27/67.66 ), meet( meet( X, Y ), Z ) ) ==> zero }.
% 67.27/67.66 parent0: (146466) {G22,W10,D5,L1,V3,M1} { meet( complement( X ), meet(
% 67.27/67.66 meet( Y, X ), Z ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146469) {G21,W10,D5,L1,V3,M1} { zero ==> meet( meet( complement(
% 67.27/67.66 X ), Y ), meet( X, Z ) ) }.
% 67.27/67.66 parent0[0]: (1698) {G21,W10,D5,L1,V3,M1} P(1664,991);d(744);d(747) { meet(
% 67.27/67.66 meet( complement( X ), Z ), meet( X, Y ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146472) {G22,W10,D5,L1,V3,M1} { zero ==> meet( complement( X ),
% 67.27/67.66 meet( meet( X, Y ), Z ) ) }.
% 67.27/67.66 parent0[0]: (949) {G24,W10,D5,L1,V2,M1} P(756,944) { meet( complement( meet
% 67.27/67.66 ( X, Y ) ), complement( X ) ) ==> complement( X ) }.
% 67.27/67.66 parent1[0; 3]: (146469) {G21,W10,D5,L1,V3,M1} { zero ==> meet( meet(
% 67.27/67.66 complement( X ), Y ), meet( X, Z ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := meet( X, Y )
% 67.27/67.66 Y := complement( X )
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146474) {G22,W10,D5,L1,V3,M1} { meet( complement( X ), meet( meet
% 67.27/67.66 ( X, Y ), Z ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (146472) {G22,W10,D5,L1,V3,M1} { zero ==> meet( complement( X
% 67.27/67.66 ), meet( meet( X, Y ), Z ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1712) {G25,W10,D5,L1,V3,M1} P(949,1698) { meet( complement( X
% 67.27/67.66 ), meet( meet( X, Y ), Z ) ) ==> zero }.
% 67.27/67.66 parent0: (146474) {G22,W10,D5,L1,V3,M1} { meet( complement( X ), meet(
% 67.27/67.66 meet( X, Y ), Z ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146477) {G24,W10,D5,L1,V3,M1} { zero ==> meet( complement( X ),
% 67.27/67.66 meet( meet( Y, X ), Z ) ) }.
% 67.27/67.66 parent0[0]: (1711) {G24,W10,D5,L1,V3,M1} P(945,1698) { meet( complement( Y
% 67.27/67.66 ), meet( meet( X, Y ), Z ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := X
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146487) {G21,W10,D5,L1,V3,M1} { zero ==> meet( complement( X ),
% 67.27/67.66 meet( Z, meet( Y, X ) ) ) }.
% 67.27/67.66 parent0[0]: (843) {G20,W9,D4,L1,V2,M1} P(820,75) { meet( Y, meet( X, Y ) )
% 67.27/67.66 ==> meet( X, Y ) }.
% 67.27/67.66 parent1[0; 5]: (146477) {G24,W10,D5,L1,V3,M1} { zero ==> meet( complement
% 67.27/67.66 ( X ), meet( meet( Y, X ), Z ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Z
% 67.27/67.66 Y := meet( Y, X )
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := meet( Z, meet( Y, X ) )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146490) {G21,W10,D5,L1,V3,M1} { meet( complement( X ), meet( Y,
% 67.27/67.66 meet( Z, X ) ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (146487) {G21,W10,D5,L1,V3,M1} { zero ==> meet( complement( X
% 67.27/67.66 ), meet( Z, meet( Y, X ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1741) {G25,W10,D5,L1,V3,M1} P(843,1711) { meet( complement( Y
% 67.27/67.66 ), meet( Z, meet( X, Y ) ) ) ==> zero }.
% 67.27/67.66 parent0: (146490) {G21,W10,D5,L1,V3,M1} { meet( complement( X ), meet( Y,
% 67.27/67.66 meet( Z, X ) ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := X
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146493) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 67.27/67.66 complement( meet( Y, X ) ) ) }.
% 67.27/67.66 parent0[0]: (990) {G18,W10,D5,L1,V2,M1} P(972,121);d(747);d(749) { meet(
% 67.27/67.66 meet( X, Y ), complement( meet( Y, X ) ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146498) {G19,W13,D6,L1,V3,M1} { zero ==> meet( meet( meet( X,
% 67.27/67.66 meet( Y, Z ) ), complement( Z ) ), complement( zero ) ) }.
% 67.27/67.66 parent0[0]: (1741) {G25,W10,D5,L1,V3,M1} P(843,1711) { meet( complement( Y
% 67.27/67.66 ), meet( Z, meet( X, Y ) ) ) ==> zero }.
% 67.27/67.66 parent1[0; 12]: (146493) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y
% 67.27/67.66 ), complement( meet( Y, X ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := X
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := meet( X, meet( Y, Z ) )
% 67.27/67.66 Y := complement( Z )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146499) {G13,W12,D6,L1,V3,M1} { zero ==> meet( meet( meet( X,
% 67.27/67.66 meet( Y, Z ) ), complement( Z ) ), top ) }.
% 67.27/67.66 parent0[0]: (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) { complement
% 67.27/67.66 ( zero ) ==> top }.
% 67.27/67.66 parent1[0; 11]: (146498) {G19,W13,D6,L1,V3,M1} { zero ==> meet( meet( meet
% 67.27/67.66 ( X, meet( Y, Z ) ), complement( Z ) ), complement( zero ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146500) {G14,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, meet( Y
% 67.27/67.66 , Z ) ), complement( Z ) ) }.
% 67.27/67.66 parent0[0]: (752) {G14,W5,D3,L1,V1,M1} P(751,48);d(749);d(79) { meet( X,
% 67.27/67.66 top ) ==> X }.
% 67.27/67.66 parent1[0; 2]: (146499) {G13,W12,D6,L1,V3,M1} { zero ==> meet( meet( meet
% 67.27/67.66 ( X, meet( Y, Z ) ), complement( Z ) ), top ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := meet( meet( X, meet( Y, Z ) ), complement( Z ) )
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146501) {G14,W10,D5,L1,V3,M1} { meet( meet( X, meet( Y, Z ) ),
% 67.27/67.66 complement( Z ) ) ==> zero }.
% 67.27/67.66 parent0[0]: (146500) {G14,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, meet
% 67.27/67.66 ( Y, Z ) ), complement( Z ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1748) {G26,W10,D5,L1,V3,M1} P(1741,990);d(744);d(752) { meet
% 67.27/67.66 ( meet( Y, meet( Z, X ) ), complement( X ) ) ==> zero }.
% 67.27/67.66 parent0: (146501) {G14,W10,D5,L1,V3,M1} { meet( meet( X, meet( Y, Z ) ),
% 67.27/67.66 complement( Z ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Y
% 67.27/67.66 Y := Z
% 67.27/67.66 Z := X
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146503) {G26,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, meet( Y,
% 67.27/67.66 Z ) ), complement( Z ) ) }.
% 67.27/67.66 parent0[0]: (1748) {G26,W10,D5,L1,V3,M1} P(1741,990);d(744);d(752) { meet(
% 67.27/67.66 meet( Y, meet( Z, X ) ), complement( X ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Z
% 67.27/67.66 Y := X
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146505) {G18,W12,D6,L1,V3,M1} { zero ==> meet( meet( X,
% 67.27/67.66 complement( join( Y, Z ) ) ), complement( complement( Z ) ) ) }.
% 67.27/67.66 parent0[0]: (1598) {G17,W10,D4,L1,V2,M1} P(756,771) { meet( complement( Y )
% 67.27/67.66 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 67.27/67.66 parent1[0; 5]: (146503) {G26,W10,D5,L1,V3,M1} { zero ==> meet( meet( X,
% 67.27/67.66 meet( Y, Z ) ), complement( Z ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Z
% 67.27/67.66 Y := Y
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := complement( Y )
% 67.27/67.66 Z := complement( Z )
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146506) {G16,W10,D6,L1,V3,M1} { zero ==> meet( meet( X,
% 67.27/67.66 complement( join( Y, Z ) ) ), Z ) }.
% 67.27/67.66 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.66 complement( X ) ) ==> X }.
% 67.27/67.66 parent1[0; 9]: (146505) {G18,W12,D6,L1,V3,M1} { zero ==> meet( meet( X,
% 67.27/67.66 complement( join( Y, Z ) ) ), complement( complement( Z ) ) ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Z
% 67.27/67.66 end
% 67.27/67.66 substitution1:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146507) {G16,W10,D6,L1,V3,M1} { meet( meet( X, complement( join(
% 67.27/67.66 Y, Z ) ) ), Z ) ==> zero }.
% 67.27/67.66 parent0[0]: (146506) {G16,W10,D6,L1,V3,M1} { zero ==> meet( meet( X,
% 67.27/67.66 complement( join( Y, Z ) ) ), Z ) }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := X
% 67.27/67.66 Y := Y
% 67.27/67.66 Z := Z
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 subsumption: (1774) {G27,W10,D6,L1,V3,M1} P(1598,1748);d(756) { meet( meet
% 67.27/67.66 ( Z, complement( join( X, Y ) ) ), Y ) ==> zero }.
% 67.27/67.66 parent0: (146507) {G16,W10,D6,L1,V3,M1} { meet( meet( X, complement( join
% 67.27/67.66 ( Y, Z ) ) ), Z ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Z
% 67.27/67.66 Y := X
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66 permutation0:
% 67.27/67.66 0 ==> 0
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 eqswap: (146509) {G26,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, meet( Y,
% 67.27/67.66 Z ) ), complement( Z ) ) }.
% 67.27/67.66 parent0[0]: (1748) {G26,W10,D5,L1,V3,M1} P(1741,990);d(744);d(752) { meet(
% 67.27/67.66 meet( Y, meet( Z, X ) ), complement( X ) ) ==> zero }.
% 67.27/67.66 substitution0:
% 67.27/67.66 X := Z
% 67.27/67.66 Y := X
% 67.27/67.66 Z := Y
% 67.27/67.66 end
% 67.27/67.66
% 67.27/67.66 paramod: (146518) {G23,W12,D6,L1,V3,M1} { zero ==> meet( meet( X,
% 67.27/67.67 complement( Y ) ), complement( complement( meet( Z, Y ) ) ) ) }.
% 67.27/67.67 parent0[0]: (832) {G22,W10,D5,L1,V2,M1} P(830,48);d(749);d(772) { meet(
% 67.27/67.67 complement( X ), complement( meet( Y, X ) ) ) ==> complement( X ) }.
% 67.27/67.67 parent1[0; 5]: (146509) {G26,W10,D5,L1,V3,M1} { zero ==> meet( meet( X,
% 67.27/67.67 meet( Y, Z ) ), complement( Z ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := Z
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := complement( Y )
% 67.27/67.67 Z := complement( meet( Z, Y ) )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146519) {G16,W10,D5,L1,V3,M1} { zero ==> meet( meet( X,
% 67.27/67.67 complement( Y ) ), meet( Z, Y ) ) }.
% 67.27/67.67 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.67 complement( X ) ) ==> X }.
% 67.27/67.67 parent1[0; 7]: (146518) {G23,W12,D6,L1,V3,M1} { zero ==> meet( meet( X,
% 67.27/67.67 complement( Y ) ), complement( complement( meet( Z, Y ) ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := meet( Z, Y )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146520) {G16,W10,D5,L1,V3,M1} { meet( meet( X, complement( Y ) )
% 67.27/67.67 , meet( Z, Y ) ) ==> zero }.
% 67.27/67.67 parent0[0]: (146519) {G16,W10,D5,L1,V3,M1} { zero ==> meet( meet( X,
% 67.27/67.67 complement( Y ) ), meet( Z, Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (1776) {G27,W10,D5,L1,V3,M1} P(832,1748);d(756) { meet( meet(
% 67.27/67.67 Z, complement( X ) ), meet( Y, X ) ) ==> zero }.
% 67.27/67.67 parent0: (146520) {G16,W10,D5,L1,V3,M1} { meet( meet( X, complement( Y ) )
% 67.27/67.67 , meet( Z, Y ) ) ==> zero }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Z
% 67.27/67.67 Y := X
% 67.27/67.67 Z := Y
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146522) {G18,W10,D5,L1,V2,M1} { zero ==> meet( complement( meet(
% 67.27/67.67 X, Y ) ), meet( Y, X ) ) }.
% 67.27/67.67 parent0[0]: (991) {G18,W10,D5,L1,V2,M1} P(972,384);d(768);d(756) { meet(
% 67.27/67.67 complement( meet( X, Y ) ), meet( Y, X ) ) ==> zero }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146526) {G19,W13,D6,L1,V3,M1} { zero ==> meet( complement( zero
% 67.27/67.67 ), meet( meet( Z, Y ), meet( X, complement( Y ) ) ) ) }.
% 67.27/67.67 parent0[0]: (1776) {G27,W10,D5,L1,V3,M1} P(832,1748);d(756) { meet( meet( Z
% 67.27/67.67 , complement( X ) ), meet( Y, X ) ) ==> zero }.
% 67.27/67.67 parent1[0; 4]: (146522) {G18,W10,D5,L1,V2,M1} { zero ==> meet( complement
% 67.27/67.67 ( meet( X, Y ) ), meet( Y, X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := Z
% 67.27/67.67 Z := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := meet( X, complement( Y ) )
% 67.27/67.67 Y := meet( Z, Y )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146528) {G13,W12,D6,L1,V3,M1} { zero ==> meet( top, meet( meet(
% 67.27/67.67 X, Y ), meet( Z, complement( Y ) ) ) ) }.
% 67.27/67.67 parent0[0]: (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) { complement
% 67.27/67.67 ( zero ) ==> top }.
% 67.27/67.67 parent1[0; 3]: (146526) {G19,W13,D6,L1,V3,M1} { zero ==> meet( complement
% 67.27/67.67 ( zero ), meet( meet( Z, Y ), meet( X, complement( Y ) ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := Z
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146529) {G13,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, Y ),
% 67.27/67.67 meet( Z, complement( Y ) ) ) }.
% 67.27/67.67 parent0[0]: (747) {G12,W5,D3,L1,V1,M1} P(75,715);d(740) { meet( top, X )
% 67.27/67.67 ==> X }.
% 67.27/67.67 parent1[0; 2]: (146528) {G13,W12,D6,L1,V3,M1} { zero ==> meet( top, meet(
% 67.27/67.67 meet( X, Y ), meet( Z, complement( Y ) ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := meet( meet( X, Y ), meet( Z, complement( Y ) ) )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146530) {G13,W10,D5,L1,V3,M1} { meet( meet( X, Y ), meet( Z,
% 67.27/67.67 complement( Y ) ) ) ==> zero }.
% 67.27/67.67 parent0[0]: (146529) {G13,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, Y ),
% 67.27/67.67 meet( Z, complement( Y ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (1792) {G28,W10,D5,L1,V3,M1} P(1776,991);d(744);d(747) { meet
% 67.27/67.67 ( meet( Z, Y ), meet( X, complement( Y ) ) ) ==> zero }.
% 67.27/67.67 parent0: (146530) {G13,W10,D5,L1,V3,M1} { meet( meet( X, Y ), meet( Z,
% 67.27/67.67 complement( Y ) ) ) ==> zero }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Z
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146532) {G28,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, Y ), meet
% 67.27/67.67 ( Z, complement( Y ) ) ) }.
% 67.27/67.67 parent0[0]: (1792) {G28,W10,D5,L1,V3,M1} P(1776,991);d(744);d(747) { meet(
% 67.27/67.67 meet( Z, Y ), meet( X, complement( Y ) ) ) ==> zero }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Z
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146533) {G21,W10,D6,L1,V3,M1} { zero ==> meet( X, meet( Z,
% 67.27/67.67 complement( join( Y, X ) ) ) ) }.
% 67.27/67.67 parent0[0]: (1043) {G20,W7,D4,L1,V2,M1} P(0,1025) { meet( X, join( Y, X ) )
% 67.27/67.67 ==> X }.
% 67.27/67.67 parent1[0; 3]: (146532) {G28,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, Y
% 67.27/67.67 ), meet( Z, complement( Y ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := join( Y, X )
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146534) {G21,W10,D6,L1,V3,M1} { meet( X, meet( Y, complement(
% 67.27/67.67 join( Z, X ) ) ) ) ==> zero }.
% 67.27/67.67 parent0[0]: (146533) {G21,W10,D6,L1,V3,M1} { zero ==> meet( X, meet( Z,
% 67.27/67.67 complement( join( Y, X ) ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Z
% 67.27/67.67 Z := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (1812) {G29,W10,D6,L1,V3,M1} P(1043,1792) { meet( X, meet( Z,
% 67.27/67.67 complement( join( Y, X ) ) ) ) ==> zero }.
% 67.27/67.67 parent0: (146534) {G21,W10,D6,L1,V3,M1} { meet( X, meet( Y, complement(
% 67.27/67.67 join( Z, X ) ) ) ) ==> zero }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Z
% 67.27/67.67 Z := Y
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146536) {G22,W8,D5,L1,V2,M1} { zero ==> meet( complement( join( X
% 67.27/67.67 , Y ) ), X ) }.
% 67.27/67.67 parent0[0]: (1033) {G22,W8,D5,L1,V2,M1} P(1025,830) { meet( complement(
% 67.27/67.67 join( X, Y ) ), X ) ==> zero }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146538) {G2,W11,D5,L1,V1,M1} { zero ==> meet( complement(
% 67.27/67.67 complement( one ) ), composition( converse( X ), complement( X ) ) ) }.
% 67.27/67.67 parent0[0]: (114) {G1,W11,D5,L1,V1,M1} P(5,10) { join( composition(
% 67.27/67.67 converse( X ), complement( X ) ), complement( one ) ) ==> complement( one
% 67.27/67.67 ) }.
% 67.27/67.67 parent1[0; 4]: (146536) {G22,W8,D5,L1,V2,M1} { zero ==> meet( complement(
% 67.27/67.67 join( X, Y ) ), X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := composition( converse( X ), complement( X ) )
% 67.27/67.67 Y := complement( one )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146539) {G3,W9,D5,L1,V1,M1} { zero ==> meet( one, composition(
% 67.27/67.67 converse( X ), complement( X ) ) ) }.
% 67.27/67.67 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.67 complement( X ) ) ==> X }.
% 67.27/67.67 parent1[0; 3]: (146538) {G2,W11,D5,L1,V1,M1} { zero ==> meet( complement(
% 67.27/67.67 complement( one ) ), composition( converse( X ), complement( X ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := one
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146540) {G3,W9,D5,L1,V1,M1} { meet( one, composition( converse( X
% 67.27/67.67 ), complement( X ) ) ) ==> zero }.
% 67.27/67.67 parent0[0]: (146539) {G3,W9,D5,L1,V1,M1} { zero ==> meet( one, composition
% 67.27/67.67 ( converse( X ), complement( X ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (1834) {G23,W9,D5,L1,V1,M1} P(114,1033);d(756) { meet( one,
% 67.27/67.67 composition( converse( X ), complement( X ) ) ) ==> zero }.
% 67.27/67.67 parent0: (146540) {G3,W9,D5,L1,V1,M1} { meet( one, composition( converse(
% 67.27/67.67 X ), complement( X ) ) ) ==> zero }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146542) {G23,W9,D5,L1,V1,M1} { zero ==> meet( one, composition(
% 67.27/67.67 converse( X ), complement( X ) ) ) }.
% 67.27/67.67 parent0[0]: (1834) {G23,W9,D5,L1,V1,M1} P(114,1033);d(756) { meet( one,
% 67.27/67.67 composition( converse( X ), complement( X ) ) ) ==> zero }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146543) {G16,W9,D6,L1,V1,M1} { zero ==> meet( one, composition(
% 67.27/67.67 converse( complement( X ) ), X ) ) }.
% 67.27/67.67 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.67 complement( X ) ) ==> X }.
% 67.27/67.67 parent1[0; 8]: (146542) {G23,W9,D5,L1,V1,M1} { zero ==> meet( one,
% 67.27/67.67 composition( converse( X ), complement( X ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := complement( X )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146544) {G16,W9,D6,L1,V1,M1} { meet( one, composition( converse(
% 67.27/67.67 complement( X ) ), X ) ) ==> zero }.
% 67.27/67.67 parent0[0]: (146543) {G16,W9,D6,L1,V1,M1} { zero ==> meet( one,
% 67.27/67.67 composition( converse( complement( X ) ), X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (1860) {G24,W9,D6,L1,V1,M1} P(756,1834) { meet( one,
% 67.27/67.67 composition( converse( complement( X ) ), X ) ) ==> zero }.
% 67.27/67.67 parent0: (146544) {G16,W9,D6,L1,V1,M1} { meet( one, composition( converse
% 67.27/67.67 ( complement( X ) ), X ) ) ==> zero }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146546) {G23,W9,D5,L1,V1,M1} { zero ==> meet( one, composition(
% 67.27/67.67 converse( X ), complement( X ) ) ) }.
% 67.27/67.67 parent0[0]: (1834) {G23,W9,D5,L1,V1,M1} P(114,1033);d(756) { meet( one,
% 67.27/67.67 composition( converse( X ), complement( X ) ) ) ==> zero }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146547) {G1,W9,D6,L1,V1,M1} { zero ==> meet( one, composition( X
% 67.27/67.67 , complement( converse( X ) ) ) ) }.
% 67.27/67.67 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.27/67.67 parent1[0; 5]: (146546) {G23,W9,D5,L1,V1,M1} { zero ==> meet( one,
% 67.27/67.67 composition( converse( X ), complement( X ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := converse( X )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146548) {G1,W9,D6,L1,V1,M1} { meet( one, composition( X,
% 67.27/67.67 complement( converse( X ) ) ) ) ==> zero }.
% 67.27/67.67 parent0[0]: (146547) {G1,W9,D6,L1,V1,M1} { zero ==> meet( one, composition
% 67.27/67.67 ( X, complement( converse( X ) ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (1865) {G24,W9,D6,L1,V1,M1} P(7,1834) { meet( one, composition
% 67.27/67.67 ( X, complement( converse( X ) ) ) ) ==> zero }.
% 67.27/67.67 parent0: (146548) {G1,W9,D6,L1,V1,M1} { meet( one, composition( X,
% 67.27/67.67 complement( converse( X ) ) ) ) ==> zero }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146550) {G24,W9,D6,L1,V1,M1} { zero ==> meet( one, composition(
% 67.27/67.67 converse( complement( X ) ), X ) ) }.
% 67.27/67.67 parent0[0]: (1860) {G24,W9,D6,L1,V1,M1} P(756,1834) { meet( one,
% 67.27/67.67 composition( converse( complement( X ) ), X ) ) ==> zero }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146551) {G1,W7,D5,L1,V0,M1} { zero ==> meet( one, converse(
% 67.27/67.67 complement( one ) ) ) }.
% 67.27/67.67 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 67.27/67.67 parent1[0; 4]: (146550) {G24,W9,D6,L1,V1,M1} { zero ==> meet( one,
% 67.27/67.67 composition( converse( complement( X ) ), X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := converse( complement( one ) )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := one
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146552) {G1,W7,D5,L1,V0,M1} { meet( one, converse( complement(
% 67.27/67.67 one ) ) ) ==> zero }.
% 67.27/67.67 parent0[0]: (146551) {G1,W7,D5,L1,V0,M1} { zero ==> meet( one, converse(
% 67.27/67.67 complement( one ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (1876) {G25,W7,D5,L1,V0,M1} P(5,1860) { meet( one, converse(
% 67.27/67.67 complement( one ) ) ) ==> zero }.
% 67.27/67.67 parent0: (146552) {G1,W7,D5,L1,V0,M1} { meet( one, converse( complement(
% 67.27/67.67 one ) ) ) ==> zero }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146554) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet(
% 67.27/67.67 complement( Y ), X ) ) }.
% 67.27/67.67 parent0[0]: (1373) {G18,W10,D5,L1,V2,M1} P(75,1016) { join( meet( X, Y ),
% 67.27/67.67 meet( complement( Y ), X ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146556) {G19,W10,D7,L1,V0,M1} { one ==> join( zero, meet(
% 67.27/67.67 complement( converse( complement( one ) ) ), one ) ) }.
% 67.27/67.67 parent0[0]: (1876) {G25,W7,D5,L1,V0,M1} P(5,1860) { meet( one, converse(
% 67.27/67.67 complement( one ) ) ) ==> zero }.
% 67.27/67.67 parent1[0; 3]: (146554) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.27/67.67 meet( complement( Y ), X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := one
% 67.27/67.67 Y := converse( complement( one ) )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146557) {G14,W8,D6,L1,V0,M1} { one ==> meet( complement(
% 67.27/67.67 converse( complement( one ) ) ), one ) }.
% 67.27/67.67 parent0[0]: (749) {G13,W5,D3,L1,V1,M1} P(715,0);d(748) { join( zero, X )
% 67.27/67.67 ==> X }.
% 67.27/67.67 parent1[0; 2]: (146556) {G19,W10,D7,L1,V0,M1} { one ==> join( zero, meet(
% 67.27/67.67 complement( converse( complement( one ) ) ), one ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := meet( complement( converse( complement( one ) ) ), one )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146558) {G14,W8,D6,L1,V0,M1} { meet( complement( converse(
% 67.27/67.67 complement( one ) ) ), one ) ==> one }.
% 67.27/67.67 parent0[0]: (146557) {G14,W8,D6,L1,V0,M1} { one ==> meet( complement(
% 67.27/67.67 converse( complement( one ) ) ), one ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (1879) {G26,W8,D6,L1,V0,M1} P(1876,1373);d(749) { meet(
% 67.27/67.67 complement( converse( complement( one ) ) ), one ) ==> one }.
% 67.27/67.67 parent0: (146558) {G14,W8,D6,L1,V0,M1} { meet( complement( converse(
% 67.27/67.67 complement( one ) ) ), one ) ==> one }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146560) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet(
% 67.27/67.67 complement( Y ), X ) ) }.
% 67.27/67.67 parent0[0]: (1373) {G18,W10,D5,L1,V2,M1} P(75,1016) { join( meet( X, Y ),
% 67.27/67.67 meet( complement( Y ), X ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146567) {G19,W14,D7,L1,V0,M1} { complement( converse( complement
% 67.27/67.67 ( one ) ) ) ==> join( one, meet( complement( one ), complement( converse
% 67.27/67.67 ( complement( one ) ) ) ) ) }.
% 67.27/67.67 parent0[0]: (1879) {G26,W8,D6,L1,V0,M1} P(1876,1373);d(749) { meet(
% 67.27/67.67 complement( converse( complement( one ) ) ), one ) ==> one }.
% 67.27/67.67 parent1[0; 6]: (146560) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.27/67.67 meet( complement( Y ), X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := complement( converse( complement( one ) ) )
% 67.27/67.67 Y := one
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146569) {G18,W13,D7,L1,V0,M1} { complement( converse( complement
% 67.27/67.67 ( one ) ) ) ==> join( one, complement( join( one, converse( complement(
% 67.27/67.67 one ) ) ) ) ) }.
% 67.27/67.67 parent0[0]: (1598) {G17,W10,D4,L1,V2,M1} P(756,771) { meet( complement( Y )
% 67.27/67.67 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 67.27/67.67 parent1[0; 7]: (146567) {G19,W14,D7,L1,V0,M1} { complement( converse(
% 67.27/67.67 complement( one ) ) ) ==> join( one, meet( complement( one ), complement
% 67.27/67.67 ( converse( complement( one ) ) ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := converse( complement( one ) )
% 67.27/67.67 Y := one
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146570) {G5,W13,D7,L1,V0,M1} { complement( converse( complement
% 67.27/67.67 ( one ) ) ) ==> join( one, complement( converse( join( one, complement(
% 67.27/67.67 one ) ) ) ) ) }.
% 67.27/67.67 parent0[0]: (189) {G4,W9,D4,L1,V1,M1} P(186,19) { join( one, converse( X )
% 67.27/67.67 ) ==> converse( join( one, X ) ) }.
% 67.27/67.67 parent1[0; 8]: (146569) {G18,W13,D7,L1,V0,M1} { complement( converse(
% 67.27/67.67 complement( one ) ) ) ==> join( one, complement( join( one, converse(
% 67.27/67.67 complement( one ) ) ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := complement( one )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146571) {G1,W10,D5,L1,V0,M1} { complement( converse( complement
% 67.27/67.67 ( one ) ) ) ==> join( one, complement( converse( top ) ) ) }.
% 67.27/67.67 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 67.27/67.67 }.
% 67.27/67.67 parent1[0; 9]: (146570) {G5,W13,D7,L1,V0,M1} { complement( converse(
% 67.27/67.67 complement( one ) ) ) ==> join( one, complement( converse( join( one,
% 67.27/67.67 complement( one ) ) ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := one
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146572) {G2,W9,D5,L1,V0,M1} { complement( converse( complement(
% 67.27/67.67 one ) ) ) ==> join( one, complement( top ) ) }.
% 67.27/67.67 parent0[0]: (223) {G10,W4,D3,L1,V0,M1} P(214,59) { converse( top ) ==> top
% 67.27/67.67 }.
% 67.27/67.67 parent1[0; 8]: (146571) {G1,W10,D5,L1,V0,M1} { complement( converse(
% 67.27/67.67 complement( one ) ) ) ==> join( one, complement( converse( top ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146573) {G2,W8,D5,L1,V0,M1} { complement( converse( complement(
% 67.27/67.67 one ) ) ) ==> join( one, zero ) }.
% 67.27/67.67 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.27/67.67 zero }.
% 67.27/67.67 parent1[0; 7]: (146572) {G2,W9,D5,L1,V0,M1} { complement( converse(
% 67.27/67.67 complement( one ) ) ) ==> join( one, complement( top ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146574) {G3,W6,D5,L1,V0,M1} { complement( converse( complement(
% 67.27/67.67 one ) ) ) ==> one }.
% 67.27/67.67 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.27/67.67 }.
% 67.27/67.67 parent1[0; 5]: (146573) {G2,W8,D5,L1,V0,M1} { complement( converse(
% 67.27/67.67 complement( one ) ) ) ==> join( one, zero ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := one
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (1890) {G27,W6,D5,L1,V0,M1} P(1879,1373);d(1598);d(189);d(11);
% 67.27/67.67 d(223);d(77);d(740) { complement( converse( complement( one ) ) ) ==> one
% 67.27/67.67 }.
% 67.27/67.67 parent0: (146574) {G3,W6,D5,L1,V0,M1} { complement( converse( complement(
% 67.27/67.67 one ) ) ) ==> one }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146577) {G15,W5,D4,L1,V1,M1} { X ==> complement( complement( X )
% 67.27/67.67 ) }.
% 67.27/67.67 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.67 complement( X ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146578) {G16,W6,D4,L1,V0,M1} { converse( complement( one ) ) ==>
% 67.27/67.67 complement( one ) }.
% 67.27/67.67 parent0[0]: (1890) {G27,W6,D5,L1,V0,M1} P(1879,1373);d(1598);d(189);d(11);d
% 67.27/67.67 (223);d(77);d(740) { complement( converse( complement( one ) ) ) ==> one
% 67.27/67.67 }.
% 67.27/67.67 parent1[0; 5]: (146577) {G15,W5,D4,L1,V1,M1} { X ==> complement(
% 67.27/67.67 complement( X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := converse( complement( one ) )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (1925) {G28,W6,D4,L1,V0,M1} P(1890,756) { converse( complement
% 67.27/67.67 ( one ) ) ==> complement( one ) }.
% 67.27/67.67 parent0: (146578) {G16,W6,D4,L1,V0,M1} { converse( complement( one ) ) ==>
% 67.27/67.67 complement( one ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146581) {G1,W14,D5,L1,V3,M1} { join( X, converse( join( Y, Z ) )
% 67.27/67.67 ) ==> join( join( X, converse( Y ) ), converse( Z ) ) }.
% 67.27/67.67 parent0[0]: (26) {G1,W14,D5,L1,V3,M1} P(8,1) { join( join( Z, converse( X )
% 67.27/67.67 ), converse( Y ) ) ==> join( Z, converse( join( X, Y ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := Z
% 67.27/67.67 Z := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146582) {G2,W15,D6,L1,V2,M1} { join( X, converse( join(
% 67.27/67.67 complement( one ), Y ) ) ) ==> join( join( X, complement( one ) ),
% 67.27/67.67 converse( Y ) ) }.
% 67.27/67.67 parent0[0]: (1925) {G28,W6,D4,L1,V0,M1} P(1890,756) { converse( complement
% 67.27/67.67 ( one ) ) ==> complement( one ) }.
% 67.27/67.67 parent1[0; 11]: (146581) {G1,W14,D5,L1,V3,M1} { join( X, converse( join( Y
% 67.27/67.67 , Z ) ) ) ==> join( join( X, converse( Y ) ), converse( Z ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := complement( one )
% 67.27/67.67 Z := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (1940) {G29,W15,D6,L1,V2,M1} P(1925,26) { join( X, converse(
% 67.27/67.67 join( complement( one ), Y ) ) ) ==> join( join( X, complement( one ) ),
% 67.27/67.67 converse( Y ) ) }.
% 67.27/67.67 parent0: (146582) {G2,W15,D6,L1,V2,M1} { join( X, converse( join(
% 67.27/67.67 complement( one ), Y ) ) ) ==> join( join( X, complement( one ) ),
% 67.27/67.67 converse( Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146587) {G1,W14,D5,L1,V3,M1} { join( X, converse( join( Y, Z ) )
% 67.27/67.67 ) ==> join( join( X, converse( Y ) ), converse( Z ) ) }.
% 67.27/67.67 parent0[0]: (26) {G1,W14,D5,L1,V3,M1} P(8,1) { join( join( Z, converse( X )
% 67.27/67.67 ), converse( Y ) ) ==> join( Z, converse( join( X, Y ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := Z
% 67.27/67.67 Z := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146589) {G2,W15,D6,L1,V2,M1} { join( X, converse( join( Y,
% 67.27/67.67 complement( one ) ) ) ) ==> join( join( X, converse( Y ) ), complement(
% 67.27/67.67 one ) ) }.
% 67.27/67.67 parent0[0]: (1925) {G28,W6,D4,L1,V0,M1} P(1890,756) { converse( complement
% 67.27/67.67 ( one ) ) ==> complement( one ) }.
% 67.27/67.67 parent1[0; 13]: (146587) {G1,W14,D5,L1,V3,M1} { join( X, converse( join( Y
% 67.27/67.67 , Z ) ) ) ==> join( join( X, converse( Y ) ), converse( Z ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := complement( one )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (1941) {G29,W15,D6,L1,V2,M1} P(1925,26) { join( X, converse(
% 67.27/67.67 join( Y, complement( one ) ) ) ) ==> join( join( X, converse( Y ) ),
% 67.27/67.67 complement( one ) ) }.
% 67.27/67.67 parent0: (146589) {G2,W15,D6,L1,V2,M1} { join( X, converse( join( Y,
% 67.27/67.67 complement( one ) ) ) ) ==> join( join( X, converse( Y ) ), complement(
% 67.27/67.67 one ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146593) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet(
% 67.27/67.67 complement( Y ), X ) ) }.
% 67.27/67.67 parent0[0]: (1373) {G18,W10,D5,L1,V2,M1} P(75,1016) { join( meet( X, Y ),
% 67.27/67.67 meet( complement( Y ), X ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146595) {G19,W12,D8,L1,V1,M1} { one ==> join( zero, meet(
% 67.27/67.67 complement( composition( X, complement( converse( X ) ) ) ), one ) ) }.
% 67.27/67.67 parent0[0]: (1865) {G24,W9,D6,L1,V1,M1} P(7,1834) { meet( one, composition
% 67.27/67.67 ( X, complement( converse( X ) ) ) ) ==> zero }.
% 67.27/67.67 parent1[0; 3]: (146593) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.27/67.67 meet( complement( Y ), X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := one
% 67.27/67.67 Y := composition( X, complement( converse( X ) ) )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146596) {G14,W10,D7,L1,V1,M1} { one ==> meet( complement(
% 67.27/67.67 composition( X, complement( converse( X ) ) ) ), one ) }.
% 67.27/67.67 parent0[0]: (749) {G13,W5,D3,L1,V1,M1} P(715,0);d(748) { join( zero, X )
% 67.27/67.67 ==> X }.
% 67.27/67.67 parent1[0; 2]: (146595) {G19,W12,D8,L1,V1,M1} { one ==> join( zero, meet(
% 67.27/67.67 complement( composition( X, complement( converse( X ) ) ) ), one ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := meet( complement( composition( X, complement( converse( X ) ) ) ),
% 67.27/67.67 one )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146597) {G14,W10,D7,L1,V1,M1} { meet( complement( composition( X
% 67.27/67.67 , complement( converse( X ) ) ) ), one ) ==> one }.
% 67.27/67.67 parent0[0]: (146596) {G14,W10,D7,L1,V1,M1} { one ==> meet( complement(
% 67.27/67.67 composition( X, complement( converse( X ) ) ) ), one ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (1948) {G25,W10,D7,L1,V1,M1} P(1865,1373);d(749) { meet(
% 67.27/67.67 complement( composition( X, complement( converse( X ) ) ) ), one ) ==>
% 67.27/67.67 one }.
% 67.27/67.67 parent0: (146597) {G14,W10,D7,L1,V1,M1} { meet( complement( composition( X
% 67.27/67.67 , complement( converse( X ) ) ) ), one ) ==> one }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146599) {G19,W10,D5,L1,V2,M1} { Y ==> join( meet( X, Y ), meet(
% 67.27/67.67 complement( X ), Y ) ) }.
% 67.27/67.67 parent0[0]: (1387) {G19,W10,D5,L1,V2,M1} P(75,1372) { join( meet( Y, X ),
% 67.27/67.67 meet( complement( Y ), X ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146602) {G20,W17,D6,L1,V3,M1} { meet( meet( X, Y ), Z ) ==> join
% 67.27/67.67 ( zero, meet( complement( complement( X ) ), meet( meet( X, Y ), Z ) ) )
% 67.27/67.67 }.
% 67.27/67.67 parent0[0]: (1712) {G25,W10,D5,L1,V3,M1} P(949,1698) { meet( complement( X
% 67.27/67.67 ), meet( meet( X, Y ), Z ) ) ==> zero }.
% 67.27/67.67 parent1[0; 7]: (146599) {G19,W10,D5,L1,V2,M1} { Y ==> join( meet( X, Y ),
% 67.27/67.67 meet( complement( X ), Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := complement( X )
% 67.27/67.67 Y := meet( meet( X, Y ), Z )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146604) {G14,W15,D5,L1,V3,M1} { meet( meet( X, Y ), Z ) ==> meet
% 67.27/67.67 ( complement( complement( X ) ), meet( meet( X, Y ), Z ) ) }.
% 67.27/67.67 parent0[0]: (749) {G13,W5,D3,L1,V1,M1} P(715,0);d(748) { join( zero, X )
% 67.27/67.67 ==> X }.
% 67.27/67.67 parent1[0; 6]: (146602) {G20,W17,D6,L1,V3,M1} { meet( meet( X, Y ), Z )
% 67.27/67.67 ==> join( zero, meet( complement( complement( X ) ), meet( meet( X, Y ),
% 67.27/67.67 Z ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := meet( complement( complement( X ) ), meet( meet( X, Y ), Z ) )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146605) {G15,W13,D5,L1,V3,M1} { meet( meet( X, Y ), Z ) ==> meet
% 67.27/67.67 ( X, meet( meet( X, Y ), Z ) ) }.
% 67.27/67.67 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.67 complement( X ) ) ==> X }.
% 67.27/67.67 parent1[0; 7]: (146604) {G14,W15,D5,L1,V3,M1} { meet( meet( X, Y ), Z )
% 67.27/67.67 ==> meet( complement( complement( X ) ), meet( meet( X, Y ), Z ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146606) {G15,W13,D5,L1,V3,M1} { meet( X, meet( meet( X, Y ), Z )
% 67.27/67.67 ) ==> meet( meet( X, Y ), Z ) }.
% 67.27/67.67 parent0[0]: (146605) {G15,W13,D5,L1,V3,M1} { meet( meet( X, Y ), Z ) ==>
% 67.27/67.67 meet( X, meet( meet( X, Y ), Z ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (1975) {G26,W13,D5,L1,V3,M1} P(1712,1387);d(749);d(756) { meet
% 67.27/67.67 ( X, meet( meet( X, Y ), Z ) ) ==> meet( meet( X, Y ), Z ) }.
% 67.27/67.67 parent0: (146606) {G15,W13,D5,L1,V3,M1} { meet( X, meet( meet( X, Y ), Z )
% 67.27/67.67 ) ==> meet( meet( X, Y ), Z ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146607) {G20,W10,D5,L1,V3,M1} { zero ==> meet( meet( meet( X, Y )
% 67.27/67.67 , Z ), complement( Y ) ) }.
% 67.27/67.67 parent0[0]: (1667) {G20,W10,D5,L1,V3,M1} P(1387,1641) { meet( meet( meet( X
% 67.27/67.67 , Y ), Z ), complement( Y ) ) ==> zero }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146608) {G19,W14,D6,L1,V4,M1} { zero ==> meet( meet( meet( X,
% 67.27/67.67 join( Y, Z ) ), T ), complement( join( Z, Y ) ) ) }.
% 67.27/67.67 parent0[0]: (1625) {G18,W9,D4,L1,V2,M1} P(1598,75);d(1598) { complement(
% 67.27/67.67 join( X, Y ) ) = complement( join( Y, X ) ) }.
% 67.27/67.67 parent1[0; 10]: (146607) {G20,W10,D5,L1,V3,M1} { zero ==> meet( meet( meet
% 67.27/67.67 ( X, Y ), Z ), complement( Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := Z
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := join( Y, Z )
% 67.27/67.67 Z := T
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146611) {G19,W14,D6,L1,V4,M1} { meet( meet( meet( X, join( Y, Z )
% 67.27/67.67 ), T ), complement( join( Z, Y ) ) ) ==> zero }.
% 67.27/67.67 parent0[0]: (146608) {G19,W14,D6,L1,V4,M1} { zero ==> meet( meet( meet( X
% 67.27/67.67 , join( Y, Z ) ), T ), complement( join( Z, Y ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 T := T
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2009) {G21,W14,D6,L1,V4,M1} P(1625,1667) { meet( meet( meet(
% 67.27/67.67 Z, join( X, Y ) ), T ), complement( join( Y, X ) ) ) ==> zero }.
% 67.27/67.67 parent0: (146611) {G19,W14,D6,L1,V4,M1} { meet( meet( meet( X, join( Y, Z
% 67.27/67.67 ) ), T ), complement( join( Z, Y ) ) ) ==> zero }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Z
% 67.27/67.67 Y := X
% 67.27/67.67 Z := Y
% 67.27/67.67 T := T
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146613) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet(
% 67.27/67.67 complement( Y ), X ) ) }.
% 67.27/67.67 parent0[0]: (1373) {G18,W10,D5,L1,V2,M1} P(75,1016) { join( meet( X, Y ),
% 67.27/67.67 meet( complement( Y ), X ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146618) {G19,W15,D7,L1,V2,M1} { join( X, Y ) ==> join( zero,
% 67.27/67.67 meet( complement( complement( join( Y, X ) ) ), join( X, Y ) ) ) }.
% 67.27/67.67 parent0[0]: (1655) {G19,W10,D5,L1,V2,M1} P(626,1625);d(77);d(772) { meet(
% 67.27/67.67 join( Y, X ), complement( join( X, Y ) ) ) ==> zero }.
% 67.27/67.67 parent1[0; 5]: (146613) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 67.27/67.67 meet( complement( Y ), X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := join( X, Y )
% 67.27/67.67 Y := complement( join( Y, X ) )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146619) {G14,W13,D6,L1,V2,M1} { join( X, Y ) ==> meet(
% 67.27/67.67 complement( complement( join( Y, X ) ) ), join( X, Y ) ) }.
% 67.27/67.67 parent0[0]: (749) {G13,W5,D3,L1,V1,M1} P(715,0);d(748) { join( zero, X )
% 67.27/67.67 ==> X }.
% 67.27/67.67 parent1[0; 4]: (146618) {G19,W15,D7,L1,V2,M1} { join( X, Y ) ==> join(
% 67.27/67.67 zero, meet( complement( complement( join( Y, X ) ) ), join( X, Y ) ) )
% 67.27/67.67 }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := meet( complement( complement( join( Y, X ) ) ), join( X, Y ) )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146620) {G15,W11,D4,L1,V2,M1} { join( X, Y ) ==> meet( join( Y,
% 67.27/67.67 X ), join( X, Y ) ) }.
% 67.27/67.67 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.67 complement( X ) ) ==> X }.
% 67.27/67.67 parent1[0; 5]: (146619) {G14,W13,D6,L1,V2,M1} { join( X, Y ) ==> meet(
% 67.27/67.67 complement( complement( join( Y, X ) ) ), join( X, Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := join( Y, X )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146621) {G15,W11,D4,L1,V2,M1} { meet( join( Y, X ), join( X, Y )
% 67.27/67.67 ) ==> join( X, Y ) }.
% 67.27/67.67 parent0[0]: (146620) {G15,W11,D4,L1,V2,M1} { join( X, Y ) ==> meet( join(
% 67.27/67.67 Y, X ), join( X, Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2071) {G20,W11,D4,L1,V2,M1} P(1655,1373);d(749);d(756) { meet
% 67.27/67.67 ( join( Y, X ), join( X, Y ) ) ==> join( X, Y ) }.
% 67.27/67.67 parent0: (146621) {G15,W11,D4,L1,V2,M1} { meet( join( Y, X ), join( X, Y )
% 67.27/67.67 ) ==> join( X, Y ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146623) {G17,W10,D5,L1,V2,M1} { zero ==> meet( complement( join(
% 67.27/67.67 X, Y ) ), join( Y, X ) ) }.
% 67.27/67.67 parent0[0]: (1602) {G17,W10,D5,L1,V2,M1} P(626,771);d(77) { meet(
% 67.27/67.67 complement( join( X, Y ) ), join( Y, X ) ) ==> zero }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146629) {G17,W13,D6,L1,V2,M1} { zero ==> meet( complement( join
% 67.27/67.67 ( complement( X ), complement( Y ) ) ), complement( meet( Y, X ) ) ) }.
% 67.27/67.67 parent0[0]: (773) {G16,W10,D4,L1,V2,M1} P(3,756) { join( complement( X ),
% 67.27/67.67 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.27/67.67 parent1[0; 9]: (146623) {G17,W10,D5,L1,V2,M1} { zero ==> meet( complement
% 67.27/67.67 ( join( X, Y ) ), join( Y, X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := complement( X )
% 67.27/67.67 Y := complement( Y )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146631) {G18,W12,D6,L1,V2,M1} { zero ==> complement( join( join
% 67.27/67.67 ( complement( X ), complement( Y ) ), meet( Y, X ) ) ) }.
% 67.27/67.67 parent0[0]: (1598) {G17,W10,D4,L1,V2,M1} P(756,771) { meet( complement( Y )
% 67.27/67.67 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 67.27/67.67 parent1[0; 2]: (146629) {G17,W13,D6,L1,V2,M1} { zero ==> meet( complement
% 67.27/67.67 ( join( complement( X ), complement( Y ) ) ), complement( meet( Y, X ) )
% 67.27/67.67 ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := meet( Y, X )
% 67.27/67.67 Y := join( complement( X ), complement( Y ) )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146632) {G18,W11,D6,L1,V2,M1} { zero ==> meet( complement( join
% 67.27/67.67 ( complement( X ), meet( Y, X ) ) ), Y ) }.
% 67.27/67.67 parent0[0]: (1607) {G17,W14,D6,L1,V3,M1} P(30,771) { complement( join( join
% 67.27/67.67 ( X, complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z )
% 67.27/67.67 }.
% 67.27/67.67 parent1[0; 2]: (146631) {G18,W12,D6,L1,V2,M1} { zero ==> complement( join
% 67.27/67.67 ( join( complement( X ), complement( Y ) ), meet( Y, X ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := complement( X )
% 67.27/67.67 Y := meet( Y, X )
% 67.27/67.67 Z := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146633) {G17,W10,D6,L1,V2,M1} { zero ==> meet( meet( X,
% 67.27/67.67 complement( meet( Y, X ) ) ), Y ) }.
% 67.27/67.67 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.67 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.67 parent1[0; 3]: (146632) {G18,W11,D6,L1,V2,M1} { zero ==> meet( complement
% 67.27/67.67 ( join( complement( X ), meet( Y, X ) ) ), Y ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := meet( Y, X )
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146634) {G17,W10,D6,L1,V2,M1} { meet( meet( X, complement( meet(
% 67.27/67.67 Y, X ) ) ), Y ) ==> zero }.
% 67.27/67.67 parent0[0]: (146633) {G17,W10,D6,L1,V2,M1} { zero ==> meet( meet( X,
% 67.27/67.67 complement( meet( Y, X ) ) ), Y ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2080) {G18,W10,D6,L1,V2,M1} P(773,1602);d(1598);d(1607);d(772
% 67.27/67.67 ) { meet( meet( Y, complement( meet( X, Y ) ) ), X ) ==> zero }.
% 67.27/67.67 parent0: (146634) {G17,W10,D6,L1,V2,M1} { meet( meet( X, complement( meet
% 67.27/67.67 ( Y, X ) ) ), Y ) ==> zero }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146636) {G17,W10,D4,L1,V2,M1} { complement( join( X, Y ) ) ==>
% 67.27/67.67 meet( complement( X ), complement( Y ) ) }.
% 67.27/67.67 parent0[0]: (1598) {G17,W10,D4,L1,V2,M1} P(756,771) { meet( complement( Y )
% 67.27/67.67 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146640) {G17,W15,D6,L1,V3,M1} { complement( join( join(
% 67.27/67.67 complement( X ), Y ), Z ) ) ==> meet( meet( X, complement( Y ) ),
% 67.27/67.67 complement( Z ) ) }.
% 67.27/67.67 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.67 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.67 parent1[0; 9]: (146636) {G17,W10,D4,L1,V2,M1} { complement( join( X, Y ) )
% 67.27/67.67 ==> meet( complement( X ), complement( Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := join( complement( X ), Y )
% 67.27/67.67 Y := Z
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146642) {G18,W14,D5,L1,V3,M1} { meet( complement( join( Y, Z ) )
% 67.27/67.67 , X ) ==> meet( meet( X, complement( Y ) ), complement( Z ) ) }.
% 67.27/67.67 parent0[0]: (1609) {G17,W14,D6,L1,V3,M1} P(29,771) { complement( join( join
% 67.27/67.67 ( complement( Z ), X ), Y ) ) ==> meet( complement( join( X, Y ) ), Z )
% 67.27/67.67 }.
% 67.27/67.67 parent1[0; 1]: (146640) {G17,W15,D6,L1,V3,M1} { complement( join( join(
% 67.27/67.67 complement( X ), Y ), Z ) ) ==> meet( meet( X, complement( Y ) ),
% 67.27/67.67 complement( Z ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := Z
% 67.27/67.67 Z := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146643) {G18,W14,D5,L1,V3,M1} { meet( meet( Z, complement( X ) )
% 67.27/67.67 , complement( Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 67.27/67.67 parent0[0]: (146642) {G18,W14,D5,L1,V3,M1} { meet( complement( join( Y, Z
% 67.27/67.67 ) ), X ) ==> meet( meet( X, complement( Y ) ), complement( Z ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Z
% 67.27/67.67 Y := X
% 67.27/67.67 Z := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2097) {G18,W14,D5,L1,V3,M1} P(772,1598);d(1609) { meet( meet
% 67.27/67.67 ( X, complement( Y ) ), complement( Z ) ) ==> meet( complement( join( Y,
% 67.27/67.67 Z ) ), X ) }.
% 67.27/67.67 parent0: (146643) {G18,W14,D5,L1,V3,M1} { meet( meet( Z, complement( X ) )
% 67.27/67.67 , complement( Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := Z
% 67.27/67.67 Z := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146645) {G16,W10,D5,L1,V2,M1} { meet( X, complement( Y ) ) ==>
% 67.27/67.67 complement( join( complement( X ), Y ) ) }.
% 67.27/67.67 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.67 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146647) {G17,W11,D6,L1,V0,M1} { meet( skol1, complement(
% 67.27/67.67 composition( complement( skol1 ), top ) ) ) ==> complement( complement(
% 67.27/67.67 skol1 ) ) }.
% 67.27/67.67 parent0[0]: (1688) {G17,W10,D5,L1,V0,M1} P(783,111);d(7);d(744) { join(
% 67.27/67.67 complement( skol1 ), composition( complement( skol1 ), top ) ) ==>
% 67.27/67.67 complement( skol1 ) }.
% 67.27/67.67 parent1[0; 9]: (146645) {G16,W10,D5,L1,V2,M1} { meet( X, complement( Y ) )
% 67.27/67.67 ==> complement( join( complement( X ), Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := skol1
% 67.27/67.67 Y := composition( complement( skol1 ), top )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146648) {G16,W9,D6,L1,V0,M1} { meet( skol1, complement(
% 67.27/67.67 composition( complement( skol1 ), top ) ) ) ==> skol1 }.
% 67.27/67.67 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.67 complement( X ) ) ==> X }.
% 67.27/67.67 parent1[0; 8]: (146647) {G17,W11,D6,L1,V0,M1} { meet( skol1, complement(
% 67.27/67.67 composition( complement( skol1 ), top ) ) ) ==> complement( complement(
% 67.27/67.67 skol1 ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := skol1
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2140) {G18,W9,D6,L1,V0,M1} P(1688,772);d(756) { meet( skol1,
% 67.27/67.67 complement( composition( complement( skol1 ), top ) ) ) ==> skol1 }.
% 67.27/67.67 parent0: (146648) {G16,W9,D6,L1,V0,M1} { meet( skol1, complement(
% 67.27/67.67 composition( complement( skol1 ), top ) ) ) ==> skol1 }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146651) {G19,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement(
% 67.27/67.67 Y ) ), meet( Y, X ) ) }.
% 67.27/67.67 parent0[0]: (1389) {G19,W10,D5,L1,V2,M1} P(1372,0) { join( meet( Y,
% 67.27/67.67 complement( X ) ), meet( X, Y ) ) ==> Y }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146658) {G19,W16,D7,L1,V0,M1} { complement( composition(
% 67.27/67.67 complement( skol1 ), top ) ) ==> join( meet( complement( composition(
% 67.27/67.67 complement( skol1 ), top ) ), complement( skol1 ) ), skol1 ) }.
% 67.27/67.67 parent0[0]: (2140) {G18,W9,D6,L1,V0,M1} P(1688,772);d(756) { meet( skol1,
% 67.27/67.67 complement( composition( complement( skol1 ), top ) ) ) ==> skol1 }.
% 67.27/67.67 parent1[0; 15]: (146651) {G19,W10,D5,L1,V2,M1} { X ==> join( meet( X,
% 67.27/67.67 complement( Y ) ), meet( Y, X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := complement( composition( complement( skol1 ), top ) )
% 67.27/67.67 Y := skol1
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146659) {G18,W15,D7,L1,V0,M1} { complement( composition(
% 67.27/67.67 complement( skol1 ), top ) ) ==> join( complement( join( composition(
% 67.27/67.67 complement( skol1 ), top ), skol1 ) ), skol1 ) }.
% 67.27/67.67 parent0[0]: (1598) {G17,W10,D4,L1,V2,M1} P(756,771) { meet( complement( Y )
% 67.27/67.67 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 67.27/67.67 parent1[0; 7]: (146658) {G19,W16,D7,L1,V0,M1} { complement( composition(
% 67.27/67.67 complement( skol1 ), top ) ) ==> join( meet( complement( composition(
% 67.27/67.67 complement( skol1 ), top ) ), complement( skol1 ) ), skol1 ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := skol1
% 67.27/67.67 Y := composition( complement( skol1 ), top )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146660) {G3,W12,D5,L1,V0,M1} { complement( composition(
% 67.27/67.67 complement( skol1 ), top ) ) ==> join( complement( composition( top, top
% 67.27/67.67 ) ), skol1 ) }.
% 67.27/67.67 parent0[0]: (1268) {G2,W10,D5,L1,V0,M1} P(15,97) { join( composition(
% 67.27/67.67 complement( skol1 ), top ), skol1 ) ==> composition( top, top ) }.
% 67.27/67.67 parent1[0; 8]: (146659) {G18,W15,D7,L1,V0,M1} { complement( composition(
% 67.27/67.67 complement( skol1 ), top ) ) ==> join( complement( join( composition(
% 67.27/67.67 complement( skol1 ), top ), skol1 ) ), skol1 ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146661) {G4,W10,D5,L1,V0,M1} { complement( composition(
% 67.27/67.67 complement( skol1 ), top ) ) ==> join( complement( top ), skol1 ) }.
% 67.27/67.67 parent0[0]: (1507) {G16,W5,D3,L1,V0,M1} P(1499,756);d(744) { composition(
% 67.27/67.67 top, top ) ==> top }.
% 67.27/67.67 parent1[0; 8]: (146660) {G3,W12,D5,L1,V0,M1} { complement( composition(
% 67.27/67.67 complement( skol1 ), top ) ) ==> join( complement( composition( top, top
% 67.27/67.67 ) ), skol1 ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146662) {G2,W9,D5,L1,V0,M1} { complement( composition(
% 67.27/67.67 complement( skol1 ), top ) ) ==> join( zero, skol1 ) }.
% 67.27/67.67 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.27/67.67 zero }.
% 67.27/67.67 parent1[0; 7]: (146661) {G4,W10,D5,L1,V0,M1} { complement( composition(
% 67.27/67.67 complement( skol1 ), top ) ) ==> join( complement( top ), skol1 ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146663) {G3,W7,D5,L1,V0,M1} { complement( composition(
% 67.27/67.67 complement( skol1 ), top ) ) ==> skol1 }.
% 67.27/67.67 parent0[0]: (749) {G13,W5,D3,L1,V1,M1} P(715,0);d(748) { join( zero, X )
% 67.27/67.67 ==> X }.
% 67.27/67.67 parent1[0; 6]: (146662) {G2,W9,D5,L1,V0,M1} { complement( composition(
% 67.27/67.67 complement( skol1 ), top ) ) ==> join( zero, skol1 ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := skol1
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2163) {G20,W7,D5,L1,V0,M1} P(2140,1389);d(1598);d(1268);d(
% 67.27/67.67 1507);d(77);d(749) { complement( composition( complement( skol1 ), top )
% 67.27/67.67 ) ==> skol1 }.
% 67.27/67.67 parent0: (146663) {G3,W7,D5,L1,V0,M1} { complement( composition(
% 67.27/67.67 complement( skol1 ), top ) ) ==> skol1 }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146666) {G15,W5,D4,L1,V1,M1} { X ==> complement( complement( X )
% 67.27/67.67 ) }.
% 67.27/67.67 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.67 complement( X ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146667) {G16,W7,D4,L1,V0,M1} { composition( complement( skol1 )
% 67.27/67.67 , top ) ==> complement( skol1 ) }.
% 67.27/67.67 parent0[0]: (2163) {G20,W7,D5,L1,V0,M1} P(2140,1389);d(1598);d(1268);d(1507
% 67.27/67.67 );d(77);d(749) { complement( composition( complement( skol1 ), top ) )
% 67.27/67.67 ==> skol1 }.
% 67.27/67.67 parent1[0; 6]: (146666) {G15,W5,D4,L1,V1,M1} { X ==> complement(
% 67.27/67.67 complement( X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := composition( complement( skol1 ), top )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2206) {G21,W7,D4,L1,V0,M1} P(2163,756) { composition(
% 67.27/67.67 complement( skol1 ), top ) ==> complement( skol1 ) }.
% 67.27/67.67 parent0: (146667) {G16,W7,D4,L1,V0,M1} { composition( complement( skol1 )
% 67.27/67.67 , top ) ==> complement( skol1 ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146670) {G19,W10,D5,L1,V2,M1} { Y ==> join( meet( X, Y ), meet(
% 67.27/67.67 complement( X ), Y ) ) }.
% 67.27/67.67 parent0[0]: (1387) {G19,W10,D5,L1,V2,M1} P(75,1372) { join( meet( Y, X ),
% 67.27/67.67 meet( complement( Y ), X ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146677) {G20,W18,D7,L1,V3,M1} { meet( X, complement( join( Y, Z
% 67.27/67.67 ) ) ) ==> join( zero, meet( complement( Z ), meet( X, complement( join(
% 67.27/67.67 Y, Z ) ) ) ) ) }.
% 67.27/67.67 parent0[0]: (1812) {G29,W10,D6,L1,V3,M1} P(1043,1792) { meet( X, meet( Z,
% 67.27/67.67 complement( join( Y, X ) ) ) ) ==> zero }.
% 67.27/67.67 parent1[0; 8]: (146670) {G19,W10,D5,L1,V2,M1} { Y ==> join( meet( X, Y ),
% 67.27/67.67 meet( complement( X ), Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Z
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := Z
% 67.27/67.67 Y := meet( X, complement( join( Y, Z ) ) )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146679) {G14,W16,D6,L1,V3,M1} { meet( X, complement( join( Y, Z
% 67.27/67.67 ) ) ) ==> meet( complement( Z ), meet( X, complement( join( Y, Z ) ) ) )
% 67.27/67.67 }.
% 67.27/67.67 parent0[0]: (749) {G13,W5,D3,L1,V1,M1} P(715,0);d(748) { join( zero, X )
% 67.27/67.67 ==> X }.
% 67.27/67.67 parent1[0; 7]: (146677) {G20,W18,D7,L1,V3,M1} { meet( X, complement( join
% 67.27/67.67 ( Y, Z ) ) ) ==> join( zero, meet( complement( Z ), meet( X, complement(
% 67.27/67.67 join( Y, Z ) ) ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := meet( complement( Z ), meet( X, complement( join( Y, Z ) ) ) )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146680) {G15,W16,D6,L1,V3,M1} { meet( X, complement( join( Y, Z
% 67.27/67.67 ) ) ) ==> complement( join( join( Z, complement( X ) ), join( Y, Z ) ) )
% 67.27/67.67 }.
% 67.27/67.67 parent0[0]: (1589) {G18,W15,D6,L1,V3,M1} P(951,771);d(1) { meet( complement
% 67.27/67.67 ( Z ), meet( X, complement( Y ) ) ) ==> complement( join( join( Z,
% 67.27/67.67 complement( X ) ), Y ) ) }.
% 67.27/67.67 parent1[0; 7]: (146679) {G14,W16,D6,L1,V3,M1} { meet( X, complement( join
% 67.27/67.67 ( Y, Z ) ) ) ==> meet( complement( Z ), meet( X, complement( join( Y, Z )
% 67.27/67.67 ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := join( Y, Z )
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146681) {G16,W15,D6,L1,V3,M1} { meet( X, complement( join( Y, Z
% 67.27/67.67 ) ) ) ==> meet( complement( join( Z, join( Y, Z ) ) ), X ) }.
% 67.27/67.67 parent0[0]: (1607) {G17,W14,D6,L1,V3,M1} P(30,771) { complement( join( join
% 67.27/67.67 ( X, complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z )
% 67.27/67.67 }.
% 67.27/67.67 parent1[0; 7]: (146680) {G15,W16,D6,L1,V3,M1} { meet( X, complement( join
% 67.27/67.67 ( Y, Z ) ) ) ==> complement( join( join( Z, complement( X ) ), join( Y, Z
% 67.27/67.67 ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Z
% 67.27/67.67 Y := join( Y, Z )
% 67.27/67.67 Z := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146682) {G1,W15,D6,L1,V3,M1} { meet( X, complement( join( Y, Z )
% 67.27/67.67 ) ) ==> meet( complement( join( join( Z, Y ), Z ) ), X ) }.
% 67.27/67.67 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.27/67.67 join( X, Y ), Z ) }.
% 67.27/67.67 parent1[0; 9]: (146681) {G16,W15,D6,L1,V3,M1} { meet( X, complement( join
% 67.27/67.67 ( Y, Z ) ) ) ==> meet( complement( join( Z, join( Y, Z ) ) ), X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Z
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146683) {G2,W13,D5,L1,V3,M1} { meet( X, complement( join( Y, Z )
% 67.27/67.67 ) ) ==> meet( complement( join( Z, Y ) ), X ) }.
% 67.27/67.67 parent0[0]: (775) {G17,W9,D4,L1,V2,M1} P(769,30) { join( join( X, Y ), X )
% 67.27/67.67 ==> join( X, Y ) }.
% 67.27/67.67 parent1[0; 9]: (146682) {G1,W15,D6,L1,V3,M1} { meet( X, complement( join(
% 67.27/67.67 Y, Z ) ) ) ==> meet( complement( join( join( Z, Y ), Z ) ), X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Z
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146684) {G2,W13,D5,L1,V3,M1} { meet( complement( join( Z, Y ) ),
% 67.27/67.67 X ) ==> meet( X, complement( join( Y, Z ) ) ) }.
% 67.27/67.67 parent0[0]: (146683) {G2,W13,D5,L1,V3,M1} { meet( X, complement( join( Y,
% 67.27/67.67 Z ) ) ) ==> meet( complement( join( Z, Y ) ), X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2229) {G30,W13,D5,L1,V3,M1} P(1812,1387);d(749);d(1589);d(
% 67.27/67.67 1607);d(1);d(775) { meet( complement( join( X, Z ) ), Y ) = meet( Y,
% 67.27/67.67 complement( join( Z, X ) ) ) }.
% 67.27/67.67 parent0: (146684) {G2,W13,D5,L1,V3,M1} { meet( complement( join( Z, Y ) )
% 67.27/67.67 , X ) ==> meet( X, complement( join( Y, Z ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := Z
% 67.27/67.67 Z := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146686) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement( Y
% 67.27/67.67 ) ), meet( X, Y ) ) }.
% 67.27/67.67 parent0[0]: (722) {G2,W10,D5,L1,V2,M1} P(3,48) { join( meet( X, complement
% 67.27/67.67 ( Y ) ), meet( X, Y ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146691) {G3,W18,D7,L1,V2,M1} { meet( X, complement( meet( Y, X )
% 67.27/67.67 ) ) ==> join( meet( meet( X, complement( meet( Y, X ) ) ), complement( Y
% 67.27/67.67 ) ), zero ) }.
% 67.27/67.67 parent0[0]: (2080) {G18,W10,D6,L1,V2,M1} P(773,1602);d(1598);d(1607);d(772)
% 67.27/67.67 { meet( meet( Y, complement( meet( X, Y ) ) ), X ) ==> zero }.
% 67.27/67.67 parent1[0; 17]: (146686) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X,
% 67.27/67.67 complement( Y ) ), meet( X, Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := meet( X, complement( meet( Y, X ) ) )
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146692) {G4,W16,D6,L1,V2,M1} { meet( X, complement( meet( Y, X )
% 67.27/67.67 ) ) ==> meet( meet( X, complement( meet( Y, X ) ) ), complement( Y ) )
% 67.27/67.67 }.
% 67.27/67.67 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.27/67.67 }.
% 67.27/67.67 parent1[0; 7]: (146691) {G3,W18,D7,L1,V2,M1} { meet( X, complement( meet(
% 67.27/67.67 Y, X ) ) ) ==> join( meet( meet( X, complement( meet( Y, X ) ) ),
% 67.27/67.67 complement( Y ) ), zero ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := meet( meet( X, complement( meet( Y, X ) ) ), complement( Y ) )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146693) {G5,W15,D6,L1,V2,M1} { meet( X, complement( meet( Y, X )
% 67.27/67.67 ) ) ==> meet( complement( join( meet( Y, X ), Y ) ), X ) }.
% 67.27/67.67 parent0[0]: (2097) {G18,W14,D5,L1,V3,M1} P(772,1598);d(1609) { meet( meet(
% 67.27/67.67 X, complement( Y ) ), complement( Z ) ) ==> meet( complement( join( Y, Z
% 67.27/67.67 ) ), X ) }.
% 67.27/67.67 parent1[0; 7]: (146692) {G4,W16,D6,L1,V2,M1} { meet( X, complement( meet(
% 67.27/67.67 Y, X ) ) ) ==> meet( meet( X, complement( meet( Y, X ) ) ), complement( Y
% 67.27/67.67 ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := meet( Y, X )
% 67.27/67.67 Z := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146694) {G6,W11,D5,L1,V2,M1} { meet( X, complement( meet( Y, X )
% 67.27/67.67 ) ) ==> meet( complement( Y ), X ) }.
% 67.27/67.67 parent0[0]: (881) {G20,W7,D4,L1,V2,M1} P(851,0) { join( meet( X, Y ), X )
% 67.27/67.67 ==> X }.
% 67.27/67.67 parent1[0; 9]: (146693) {G5,W15,D6,L1,V2,M1} { meet( X, complement( meet(
% 67.27/67.67 Y, X ) ) ) ==> meet( complement( join( meet( Y, X ), Y ) ), X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2405) {G21,W11,D5,L1,V2,M1} P(2080,722);d(740);d(2097);d(881)
% 67.27/67.67 { meet( X, complement( meet( Y, X ) ) ) ==> meet( complement( Y ), X )
% 67.27/67.67 }.
% 67.27/67.67 parent0: (146694) {G6,W11,D5,L1,V2,M1} { meet( X, complement( meet( Y, X )
% 67.27/67.67 ) ) ==> meet( complement( Y ), X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146697) {G19,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement(
% 67.27/67.67 Y ) ), meet( Y, X ) ) }.
% 67.27/67.67 parent0[0]: (1389) {G19,W10,D5,L1,V2,M1} P(1372,0) { join( meet( Y,
% 67.27/67.67 complement( X ) ), meet( X, Y ) ) ==> Y }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146701) {G19,W13,D8,L1,V2,M1} { X ==> join( meet( X, complement
% 67.27/67.67 ( meet( Y, complement( meet( X, Y ) ) ) ) ), zero ) }.
% 67.27/67.67 parent0[0]: (2080) {G18,W10,D6,L1,V2,M1} P(773,1602);d(1598);d(1607);d(772)
% 67.27/67.67 { meet( meet( Y, complement( meet( X, Y ) ) ), X ) ==> zero }.
% 67.27/67.67 parent1[0; 12]: (146697) {G19,W10,D5,L1,V2,M1} { X ==> join( meet( X,
% 67.27/67.67 complement( Y ) ), meet( Y, X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := meet( Y, complement( meet( X, Y ) ) )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146702) {G12,W11,D7,L1,V2,M1} { X ==> meet( X, complement( meet
% 67.27/67.67 ( Y, complement( meet( X, Y ) ) ) ) ) }.
% 67.27/67.67 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.27/67.67 }.
% 67.27/67.67 parent1[0; 2]: (146701) {G19,W13,D8,L1,V2,M1} { X ==> join( meet( X,
% 67.27/67.67 complement( meet( Y, complement( meet( X, Y ) ) ) ) ), zero ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := meet( X, complement( meet( Y, complement( meet( X, Y ) ) ) ) )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146703) {G13,W10,D5,L1,V2,M1} { X ==> meet( X, join( complement
% 67.27/67.67 ( Y ), meet( X, Y ) ) ) }.
% 67.27/67.67 parent0[0]: (951) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet( Y,
% 67.27/67.67 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 67.27/67.67 parent1[0; 4]: (146702) {G12,W11,D7,L1,V2,M1} { X ==> meet( X, complement
% 67.27/67.67 ( meet( Y, complement( meet( X, Y ) ) ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := meet( X, Y )
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146704) {G13,W10,D5,L1,V2,M1} { meet( X, join( complement( Y ),
% 67.27/67.67 meet( X, Y ) ) ) ==> X }.
% 67.27/67.67 parent0[0]: (146703) {G13,W10,D5,L1,V2,M1} { X ==> meet( X, join(
% 67.27/67.67 complement( Y ), meet( X, Y ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2408) {G20,W10,D5,L1,V2,M1} P(2080,1389);d(740);d(951) { meet
% 67.27/67.67 ( Y, join( complement( X ), meet( Y, X ) ) ) ==> Y }.
% 67.27/67.67 parent0: (146704) {G13,W10,D5,L1,V2,M1} { meet( X, join( complement( Y ),
% 67.27/67.67 meet( X, Y ) ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146706) {G22,W7,D4,L1,V2,M1} { Y ==> join( meet( X, Y ), Y ) }.
% 67.27/67.67 parent0[0]: (898) {G22,W7,D4,L1,V2,M1} P(866,0) { join( meet( Y, X ), X )
% 67.27/67.67 ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146709) {G21,W15,D5,L1,V2,M1} { join( complement( X ), meet( Y,
% 67.27/67.67 X ) ) ==> join( Y, join( complement( X ), meet( Y, X ) ) ) }.
% 67.27/67.67 parent0[0]: (2408) {G20,W10,D5,L1,V2,M1} P(2080,1389);d(740);d(951) { meet
% 67.27/67.67 ( Y, join( complement( X ), meet( Y, X ) ) ) ==> Y }.
% 67.27/67.67 parent1[0; 8]: (146706) {G22,W7,D4,L1,V2,M1} { Y ==> join( meet( X, Y ), Y
% 67.27/67.67 ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := join( complement( X ), meet( Y, X ) )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146710) {G1,W15,D5,L1,V2,M1} { join( complement( X ), meet( Y, X
% 67.27/67.67 ) ) ==> join( join( Y, complement( X ) ), meet( Y, X ) ) }.
% 67.27/67.67 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.27/67.67 join( X, Y ), Z ) }.
% 67.27/67.67 parent1[0; 7]: (146709) {G21,W15,D5,L1,V2,M1} { join( complement( X ),
% 67.27/67.67 meet( Y, X ) ) ==> join( Y, join( complement( X ), meet( Y, X ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := complement( X )
% 67.27/67.67 Z := meet( Y, X )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146711) {G2,W11,D4,L1,V2,M1} { join( complement( X ), meet( Y, X
% 67.27/67.67 ) ) ==> join( Y, complement( X ) ) }.
% 67.27/67.67 parent0[0]: (870) {G20,W11,D4,L1,V3,M1} P(851,30) { join( join( X, Z ),
% 67.27/67.67 meet( X, Y ) ) ==> join( X, Z ) }.
% 67.27/67.67 parent1[0; 7]: (146710) {G1,W15,D5,L1,V2,M1} { join( complement( X ), meet
% 67.27/67.67 ( Y, X ) ) ==> join( join( Y, complement( X ) ), meet( Y, X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 Z := complement( X )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2429) {G23,W11,D4,L1,V2,M1} P(2408,898);d(1);d(870) { join(
% 67.27/67.67 complement( Y ), meet( X, Y ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.67 parent0: (146711) {G2,W11,D4,L1,V2,M1} { join( complement( X ), meet( Y, X
% 67.27/67.67 ) ) ==> join( Y, complement( X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146713) {G20,W10,D5,L1,V2,M1} { X ==> meet( X, join( complement(
% 67.27/67.67 Y ), meet( X, Y ) ) ) }.
% 67.27/67.67 parent0[0]: (2408) {G20,W10,D5,L1,V2,M1} P(2080,1389);d(740);d(951) { meet
% 67.27/67.67 ( Y, join( complement( X ), meet( Y, X ) ) ) ==> Y }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146715) {G2,W10,D5,L1,V2,M1} { X ==> meet( X, join( complement(
% 67.27/67.67 Y ), meet( Y, X ) ) ) }.
% 67.27/67.67 parent0[0]: (75) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 67.27/67.67 Y ) }.
% 67.27/67.67 parent1[0; 7]: (146713) {G20,W10,D5,L1,V2,M1} { X ==> meet( X, join(
% 67.27/67.67 complement( Y ), meet( X, Y ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146721) {G2,W10,D5,L1,V2,M1} { meet( X, join( complement( Y ),
% 67.27/67.67 meet( Y, X ) ) ) ==> X }.
% 67.27/67.67 parent0[0]: (146715) {G2,W10,D5,L1,V2,M1} { X ==> meet( X, join(
% 67.27/67.67 complement( Y ), meet( Y, X ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2431) {G21,W10,D5,L1,V2,M1} P(75,2408) { meet( X, join(
% 67.27/67.67 complement( Y ), meet( Y, X ) ) ) ==> X }.
% 67.27/67.67 parent0: (146721) {G2,W10,D5,L1,V2,M1} { meet( X, join( complement( Y ),
% 67.27/67.67 meet( Y, X ) ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146722) {G20,W10,D5,L1,V2,M1} { X ==> meet( X, join( complement(
% 67.27/67.67 Y ), meet( X, Y ) ) ) }.
% 67.27/67.67 parent0[0]: (2408) {G20,W10,D5,L1,V2,M1} P(2080,1389);d(740);d(951) { meet
% 67.27/67.67 ( Y, join( complement( X ), meet( Y, X ) ) ) ==> Y }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146723) {G1,W10,D5,L1,V2,M1} { X ==> meet( X, join( meet( X, Y )
% 67.27/67.67 , complement( Y ) ) ) }.
% 67.27/67.67 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.27/67.67 parent1[0; 4]: (146722) {G20,W10,D5,L1,V2,M1} { X ==> meet( X, join(
% 67.27/67.67 complement( Y ), meet( X, Y ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := complement( Y )
% 67.27/67.67 Y := meet( X, Y )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146726) {G1,W10,D5,L1,V2,M1} { meet( X, join( meet( X, Y ),
% 67.27/67.67 complement( Y ) ) ) ==> X }.
% 67.27/67.67 parent0[0]: (146723) {G1,W10,D5,L1,V2,M1} { X ==> meet( X, join( meet( X,
% 67.27/67.67 Y ), complement( Y ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2432) {G21,W10,D5,L1,V2,M1} P(0,2408) { meet( Y, join( meet(
% 67.27/67.67 Y, X ), complement( X ) ) ) ==> Y }.
% 67.27/67.67 parent0: (146726) {G1,W10,D5,L1,V2,M1} { meet( X, join( meet( X, Y ),
% 67.27/67.67 complement( Y ) ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146728) {G22,W7,D4,L1,V2,M1} { Y ==> join( meet( X, Y ), Y ) }.
% 67.27/67.67 parent0[0]: (898) {G22,W7,D4,L1,V2,M1} P(866,0) { join( meet( Y, X ), X )
% 67.27/67.67 ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146731) {G22,W15,D5,L1,V2,M1} { join( complement( X ), meet( X,
% 67.27/67.67 Y ) ) ==> join( Y, join( complement( X ), meet( X, Y ) ) ) }.
% 67.27/67.67 parent0[0]: (2431) {G21,W10,D5,L1,V2,M1} P(75,2408) { meet( X, join(
% 67.27/67.67 complement( Y ), meet( Y, X ) ) ) ==> X }.
% 67.27/67.67 parent1[0; 8]: (146728) {G22,W7,D4,L1,V2,M1} { Y ==> join( meet( X, Y ), Y
% 67.27/67.67 ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := join( complement( X ), meet( X, Y ) )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146732) {G1,W15,D5,L1,V2,M1} { join( complement( X ), meet( X, Y
% 67.27/67.67 ) ) ==> join( join( Y, complement( X ) ), meet( X, Y ) ) }.
% 67.27/67.67 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.27/67.67 join( X, Y ), Z ) }.
% 67.27/67.67 parent1[0; 7]: (146731) {G22,W15,D5,L1,V2,M1} { join( complement( X ),
% 67.27/67.67 meet( X, Y ) ) ==> join( Y, join( complement( X ), meet( X, Y ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := complement( X )
% 67.27/67.67 Z := meet( X, Y )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146733) {G2,W11,D4,L1,V2,M1} { join( complement( X ), meet( X, Y
% 67.27/67.67 ) ) ==> join( Y, complement( X ) ) }.
% 67.27/67.67 parent0[0]: (887) {G22,W11,D4,L1,V3,M1} P(866,30) { join( join( X, Z ),
% 67.27/67.67 meet( Y, X ) ) ==> join( X, Z ) }.
% 67.27/67.67 parent1[0; 7]: (146732) {G1,W15,D5,L1,V2,M1} { join( complement( X ), meet
% 67.27/67.67 ( X, Y ) ) ==> join( join( Y, complement( X ) ), meet( X, Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 Z := complement( X )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2464) {G23,W11,D4,L1,V2,M1} P(2431,898);d(1);d(887) { join(
% 67.27/67.67 complement( Y ), meet( Y, X ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.67 parent0: (146733) {G2,W11,D4,L1,V2,M1} { join( complement( X ), meet( X, Y
% 67.27/67.67 ) ) ==> join( Y, complement( X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146736) {G17,W10,D5,L1,V2,M1} { join( X, complement( Y ) ) ==>
% 67.27/67.67 complement( meet( complement( X ), Y ) ) }.
% 67.27/67.67 parent0[0]: (950) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet(
% 67.27/67.67 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146741) {G18,W14,D7,L1,V2,M1} { join( X, complement( join( meet
% 67.27/67.67 ( complement( X ), Y ), complement( Y ) ) ) ) ==> complement( complement
% 67.27/67.67 ( X ) ) }.
% 67.27/67.67 parent0[0]: (2432) {G21,W10,D5,L1,V2,M1} P(0,2408) { meet( Y, join( meet( Y
% 67.27/67.67 , X ), complement( X ) ) ) ==> Y }.
% 67.27/67.67 parent1[0; 12]: (146736) {G17,W10,D5,L1,V2,M1} { join( X, complement( Y )
% 67.27/67.67 ) ==> complement( meet( complement( X ), Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := complement( X )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := join( meet( complement( X ), Y ), complement( Y ) )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146742) {G16,W12,D7,L1,V2,M1} { join( X, complement( join( meet
% 67.27/67.67 ( complement( X ), Y ), complement( Y ) ) ) ) ==> X }.
% 67.27/67.67 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.67 complement( X ) ) ==> X }.
% 67.27/67.67 parent1[0; 11]: (146741) {G18,W14,D7,L1,V2,M1} { join( X, complement( join
% 67.27/67.67 ( meet( complement( X ), Y ), complement( Y ) ) ) ) ==> complement(
% 67.27/67.67 complement( X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146743) {G17,W11,D7,L1,V2,M1} { join( X, meet( complement( meet
% 67.27/67.67 ( complement( X ), Y ) ), Y ) ) ==> X }.
% 67.27/67.67 parent0[0]: (771) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( X,
% 67.27/67.67 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 67.27/67.67 parent1[0; 3]: (146742) {G16,W12,D7,L1,V2,M1} { join( X, complement( join
% 67.27/67.67 ( meet( complement( X ), Y ), complement( Y ) ) ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := meet( complement( X ), Y )
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146744) {G18,W10,D6,L1,V2,M1} { join( X, meet( join( X,
% 67.27/67.67 complement( Y ) ), Y ) ) ==> X }.
% 67.27/67.67 parent0[0]: (950) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet(
% 67.27/67.67 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.67 parent1[0; 4]: (146743) {G17,W11,D7,L1,V2,M1} { join( X, meet( complement
% 67.27/67.67 ( meet( complement( X ), Y ) ), Y ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2510) {G22,W10,D6,L1,V2,M1} P(2432,950);d(756);d(771);d(950)
% 67.27/67.67 { join( X, meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 67.27/67.67 parent0: (146744) {G18,W10,D6,L1,V2,M1} { join( X, meet( join( X,
% 67.27/67.67 complement( Y ) ), Y ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146747) {G22,W7,D4,L1,V2,M1} { Y ==> join( meet( X, Y ), Y ) }.
% 67.27/67.67 parent0[0]: (898) {G22,W7,D4,L1,V2,M1} P(866,0) { join( meet( Y, X ), X )
% 67.27/67.67 ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146750) {G22,W15,D5,L1,V2,M1} { join( meet( X, Y ), complement(
% 67.27/67.67 Y ) ) ==> join( X, join( meet( X, Y ), complement( Y ) ) ) }.
% 67.27/67.67 parent0[0]: (2432) {G21,W10,D5,L1,V2,M1} P(0,2408) { meet( Y, join( meet( Y
% 67.27/67.67 , X ), complement( X ) ) ) ==> Y }.
% 67.27/67.67 parent1[0; 8]: (146747) {G22,W7,D4,L1,V2,M1} { Y ==> join( meet( X, Y ), Y
% 67.27/67.67 ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := join( meet( X, Y ), complement( Y ) )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146751) {G1,W15,D5,L1,V2,M1} { join( meet( X, Y ), complement( Y
% 67.27/67.67 ) ) ==> join( join( X, meet( X, Y ) ), complement( Y ) ) }.
% 67.27/67.67 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.27/67.67 join( X, Y ), Z ) }.
% 67.27/67.67 parent1[0; 7]: (146750) {G22,W15,D5,L1,V2,M1} { join( meet( X, Y ),
% 67.27/67.67 complement( Y ) ) ==> join( X, join( meet( X, Y ), complement( Y ) ) )
% 67.27/67.67 }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := meet( X, Y )
% 67.27/67.67 Z := complement( Y )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146752) {G2,W11,D4,L1,V2,M1} { join( meet( X, Y ), complement( Y
% 67.27/67.67 ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.67 parent0[0]: (851) {G19,W7,D4,L1,V2,M1} P(756,847) { join( Y, meet( Y, X ) )
% 67.27/67.67 ==> Y }.
% 67.27/67.67 parent1[0; 8]: (146751) {G1,W15,D5,L1,V2,M1} { join( meet( X, Y ),
% 67.27/67.67 complement( Y ) ) ==> join( join( X, meet( X, Y ) ), complement( Y ) )
% 67.27/67.67 }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2518) {G23,W11,D4,L1,V2,M1} P(2432,898);d(1);d(851) { join(
% 67.27/67.67 meet( X, Y ), complement( Y ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.67 parent0: (146752) {G2,W11,D4,L1,V2,M1} { join( meet( X, Y ), complement( Y
% 67.27/67.67 ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146755) {G22,W10,D6,L1,V2,M1} { X ==> join( X, meet( join( X,
% 67.27/67.67 complement( Y ) ), Y ) ) }.
% 67.27/67.67 parent0[0]: (2510) {G22,W10,D6,L1,V2,M1} P(2432,950);d(756);d(771);d(950)
% 67.27/67.67 { join( X, meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146757) {G23,W11,D6,L1,V3,M1} { X ==> join( X, meet( top, meet(
% 67.27/67.67 Y, meet( Z, X ) ) ) ) }.
% 67.27/67.67 parent0[0]: (1001) {G22,W10,D6,L1,V3,M1} P(866,840) { join( X, complement(
% 67.27/67.67 meet( Z, meet( Y, X ) ) ) ) ==> top }.
% 67.27/67.67 parent1[0; 5]: (146755) {G22,W10,D6,L1,V2,M1} { X ==> join( X, meet( join
% 67.27/67.67 ( X, complement( Y ) ), Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Z
% 67.27/67.67 Z := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := meet( Y, meet( Z, X ) )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146758) {G13,W9,D5,L1,V3,M1} { X ==> join( X, meet( Y, meet( Z,
% 67.27/67.67 X ) ) ) }.
% 67.27/67.67 parent0[0]: (747) {G12,W5,D3,L1,V1,M1} P(75,715);d(740) { meet( top, X )
% 67.27/67.67 ==> X }.
% 67.27/67.67 parent1[0; 4]: (146757) {G23,W11,D6,L1,V3,M1} { X ==> join( X, meet( top,
% 67.27/67.67 meet( Y, meet( Z, X ) ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := meet( Y, meet( Z, X ) )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146759) {G13,W9,D5,L1,V3,M1} { join( X, meet( Y, meet( Z, X ) ) )
% 67.27/67.67 ==> X }.
% 67.27/67.67 parent0[0]: (146758) {G13,W9,D5,L1,V3,M1} { X ==> join( X, meet( Y, meet(
% 67.27/67.67 Z, X ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2522) {G23,W9,D5,L1,V3,M1} P(1001,2510);d(747) { join( X,
% 67.27/67.67 meet( Y, meet( Z, X ) ) ) ==> X }.
% 67.27/67.67 parent0: (146759) {G13,W9,D5,L1,V3,M1} { join( X, meet( Y, meet( Z, X ) )
% 67.27/67.67 ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := Z
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146761) {G22,W10,D6,L1,V2,M1} { X ==> join( X, meet( join( X,
% 67.27/67.67 complement( Y ) ), Y ) ) }.
% 67.27/67.67 parent0[0]: (2510) {G22,W10,D6,L1,V2,M1} P(2432,950);d(756);d(771);d(950)
% 67.27/67.67 { join( X, meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146763) {G19,W13,D5,L1,V2,M1} { meet( X, Y ) ==> join( meet( X,
% 67.27/67.67 Y ), meet( top, meet( Y, X ) ) ) }.
% 67.27/67.67 parent0[0]: (988) {G18,W10,D5,L1,V2,M1} P(972,131);d(740);d(747) { join(
% 67.27/67.67 meet( X, Y ), complement( meet( Y, X ) ) ) ==> top }.
% 67.27/67.67 parent1[0; 9]: (146761) {G22,W10,D6,L1,V2,M1} { X ==> join( X, meet( join
% 67.27/67.67 ( X, complement( Y ) ), Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := meet( X, Y )
% 67.27/67.67 Y := meet( Y, X )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146764) {G13,W11,D4,L1,V2,M1} { meet( X, Y ) ==> join( meet( X,
% 67.27/67.67 Y ), meet( Y, X ) ) }.
% 67.27/67.67 parent0[0]: (747) {G12,W5,D3,L1,V1,M1} P(75,715);d(740) { meet( top, X )
% 67.27/67.67 ==> X }.
% 67.27/67.67 parent1[0; 8]: (146763) {G19,W13,D5,L1,V2,M1} { meet( X, Y ) ==> join(
% 67.27/67.67 meet( X, Y ), meet( top, meet( Y, X ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := meet( Y, X )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146765) {G13,W11,D4,L1,V2,M1} { join( meet( X, Y ), meet( Y, X )
% 67.27/67.67 ) ==> meet( X, Y ) }.
% 67.27/67.67 parent0[0]: (146764) {G13,W11,D4,L1,V2,M1} { meet( X, Y ) ==> join( meet(
% 67.27/67.67 X, Y ), meet( Y, X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2544) {G23,W11,D4,L1,V2,M1} P(988,2510);d(747) { join( meet(
% 67.27/67.67 X, Y ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 67.27/67.67 parent0: (146765) {G13,W11,D4,L1,V2,M1} { join( meet( X, Y ), meet( Y, X )
% 67.27/67.67 ) ==> meet( X, Y ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146767) {G22,W10,D6,L1,V2,M1} { X ==> join( X, meet( join( X,
% 67.27/67.67 complement( Y ) ), Y ) ) }.
% 67.27/67.67 parent0[0]: (2510) {G22,W10,D6,L1,V2,M1} P(2432,950);d(756);d(771);d(950)
% 67.27/67.67 { join( X, meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146768) {G16,W10,D5,L1,V2,M1} { X ==> join( X, meet( join( X, Y
% 67.27/67.67 ), complement( Y ) ) ) }.
% 67.27/67.67 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.67 complement( X ) ) ==> X }.
% 67.27/67.67 parent1[0; 7]: (146767) {G22,W10,D6,L1,V2,M1} { X ==> join( X, meet( join
% 67.27/67.67 ( X, complement( Y ) ), Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := complement( Y )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146769) {G16,W10,D5,L1,V2,M1} { join( X, meet( join( X, Y ),
% 67.27/67.67 complement( Y ) ) ) ==> X }.
% 67.27/67.67 parent0[0]: (146768) {G16,W10,D5,L1,V2,M1} { X ==> join( X, meet( join( X
% 67.27/67.67 , Y ), complement( Y ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2554) {G23,W10,D5,L1,V2,M1} P(756,2510) { join( Y, meet( join
% 67.27/67.67 ( Y, X ), complement( X ) ) ) ==> Y }.
% 67.27/67.67 parent0: (146769) {G16,W10,D5,L1,V2,M1} { join( X, meet( join( X, Y ),
% 67.27/67.67 complement( Y ) ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146771) {G22,W10,D6,L1,V2,M1} { X ==> join( X, meet( join( X,
% 67.27/67.67 complement( Y ) ), Y ) ) }.
% 67.27/67.67 parent0[0]: (2510) {G22,W10,D6,L1,V2,M1} P(2432,950);d(756);d(771);d(950)
% 67.27/67.67 { join( X, meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146776) {G4,W19,D7,L1,V2,M1} { join( X, complement( join( X,
% 67.27/67.67 complement( Y ) ) ) ) ==> join( join( X, complement( join( X, complement
% 67.27/67.67 ( Y ) ) ) ), meet( top, Y ) ) }.
% 67.27/67.67 parent0[0]: (309) {G3,W10,D6,L1,V2,M1} P(0,27) { join( join( X, complement
% 67.27/67.67 ( join( X, Y ) ) ), Y ) ==> top }.
% 67.27/67.67 parent1[0; 17]: (146771) {G22,W10,D6,L1,V2,M1} { X ==> join( X, meet( join
% 67.27/67.67 ( X, complement( Y ) ), Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := complement( Y )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := join( X, complement( join( X, complement( Y ) ) ) )
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146778) {G5,W18,D6,L1,V2,M1} { join( X, complement( join( X,
% 67.27/67.67 complement( Y ) ) ) ) ==> join( join( X, meet( complement( X ), Y ) ),
% 67.27/67.67 meet( top, Y ) ) }.
% 67.27/67.67 parent0[0]: (771) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( X,
% 67.27/67.67 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 67.27/67.67 parent1[0; 11]: (146776) {G4,W19,D7,L1,V2,M1} { join( X, complement( join
% 67.27/67.67 ( X, complement( Y ) ) ) ) ==> join( join( X, complement( join( X,
% 67.27/67.67 complement( Y ) ) ) ), meet( top, Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146779) {G6,W17,D6,L1,V2,M1} { join( X, meet( complement( X ), Y
% 67.27/67.67 ) ) ==> join( join( X, meet( complement( X ), Y ) ), meet( top, Y ) )
% 67.27/67.67 }.
% 67.27/67.67 parent0[0]: (771) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( X,
% 67.27/67.67 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 67.27/67.67 parent1[0; 3]: (146778) {G5,W18,D6,L1,V2,M1} { join( X, complement( join(
% 67.27/67.67 X, complement( Y ) ) ) ) ==> join( join( X, meet( complement( X ), Y ) )
% 67.27/67.67 , meet( top, Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146783) {G7,W15,D6,L1,V2,M1} { join( X, meet( complement( X ), Y
% 67.27/67.67 ) ) ==> join( join( X, meet( complement( X ), Y ) ), Y ) }.
% 67.27/67.67 parent0[0]: (747) {G12,W5,D3,L1,V1,M1} P(75,715);d(740) { meet( top, X )
% 67.27/67.67 ==> X }.
% 67.27/67.67 parent1[0; 14]: (146779) {G6,W17,D6,L1,V2,M1} { join( X, meet( complement
% 67.27/67.67 ( X ), Y ) ) ==> join( join( X, meet( complement( X ), Y ) ), meet( top,
% 67.27/67.67 Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146784) {G8,W10,D5,L1,V2,M1} { join( X, meet( complement( X ), Y
% 67.27/67.67 ) ) ==> join( Y, X ) }.
% 67.27/67.67 parent0[0]: (902) {G23,W11,D5,L1,V3,M1} P(898,29) { join( join( Z, meet( X
% 67.27/67.67 , Y ) ), Y ) ==> join( Y, Z ) }.
% 67.27/67.67 parent1[0; 7]: (146783) {G7,W15,D6,L1,V2,M1} { join( X, meet( complement(
% 67.27/67.67 X ), Y ) ) ==> join( join( X, meet( complement( X ), Y ) ), Y ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := complement( X )
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2556) {G24,W10,D5,L1,V2,M1} P(309,2510);d(771);d(747);d(902)
% 67.27/67.67 { join( X, meet( complement( X ), Y ) ) ==> join( Y, X ) }.
% 67.27/67.67 parent0: (146784) {G8,W10,D5,L1,V2,M1} { join( X, meet( complement( X ), Y
% 67.27/67.67 ) ) ==> join( Y, X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146787) {G22,W10,D6,L1,V2,M1} { X ==> join( X, meet( join( X,
% 67.27/67.67 complement( Y ) ), Y ) ) }.
% 67.27/67.67 parent0[0]: (2510) {G22,W10,D6,L1,V2,M1} P(2432,950);d(756);d(771);d(950)
% 67.27/67.67 { join( X, meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146792) {G4,W19,D7,L1,V2,M1} { join( X, complement( join(
% 67.27/67.67 complement( Y ), X ) ) ) ==> join( join( X, complement( join( complement
% 67.27/67.67 ( Y ), X ) ) ), meet( top, Y ) ) }.
% 67.27/67.67 parent0[0]: (308) {G3,W10,D6,L1,V2,M1} P(27,0);d(1) { join( join( Y,
% 67.27/67.67 complement( join( X, Y ) ) ), X ) ==> top }.
% 67.27/67.67 parent1[0; 17]: (146787) {G22,W10,D6,L1,V2,M1} { X ==> join( X, meet( join
% 67.27/67.67 ( X, complement( Y ) ), Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := complement( Y )
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := join( X, complement( join( complement( Y ), X ) ) )
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146794) {G5,W18,D6,L1,V2,M1} { join( X, complement( join(
% 67.27/67.67 complement( Y ), X ) ) ) ==> join( join( X, meet( Y, complement( X ) ) )
% 67.27/67.67 , meet( top, Y ) ) }.
% 67.27/67.67 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.67 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.67 parent1[0; 11]: (146792) {G4,W19,D7,L1,V2,M1} { join( X, complement( join
% 67.27/67.67 ( complement( Y ), X ) ) ) ==> join( join( X, complement( join(
% 67.27/67.67 complement( Y ), X ) ) ), meet( top, Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146795) {G6,W17,D6,L1,V2,M1} { join( X, meet( Y, complement( X )
% 67.27/67.67 ) ) ==> join( join( X, meet( Y, complement( X ) ) ), meet( top, Y ) )
% 67.27/67.67 }.
% 67.27/67.67 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.67 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.67 parent1[0; 3]: (146794) {G5,W18,D6,L1,V2,M1} { join( X, complement( join(
% 67.27/67.67 complement( Y ), X ) ) ) ==> join( join( X, meet( Y, complement( X ) ) )
% 67.27/67.67 , meet( top, Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146799) {G7,W15,D6,L1,V2,M1} { join( X, meet( Y, complement( X )
% 67.27/67.67 ) ) ==> join( join( X, meet( Y, complement( X ) ) ), Y ) }.
% 67.27/67.67 parent0[0]: (747) {G12,W5,D3,L1,V1,M1} P(75,715);d(740) { meet( top, X )
% 67.27/67.67 ==> X }.
% 67.27/67.67 parent1[0; 14]: (146795) {G6,W17,D6,L1,V2,M1} { join( X, meet( Y,
% 67.27/67.67 complement( X ) ) ) ==> join( join( X, meet( Y, complement( X ) ) ), meet
% 67.27/67.67 ( top, Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146800) {G8,W10,D5,L1,V2,M1} { join( X, meet( Y, complement( X )
% 67.27/67.67 ) ) ==> join( Y, X ) }.
% 67.27/67.67 parent0[0]: (908) {G21,W11,D5,L1,V3,M1} P(881,29) { join( join( Z, meet( X
% 67.27/67.67 , Y ) ), X ) ==> join( X, Z ) }.
% 67.27/67.67 parent1[0; 7]: (146799) {G7,W15,D6,L1,V2,M1} { join( X, meet( Y,
% 67.27/67.67 complement( X ) ) ) ==> join( join( X, meet( Y, complement( X ) ) ), Y )
% 67.27/67.67 }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := complement( X )
% 67.27/67.67 Z := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2557) {G23,W10,D5,L1,V2,M1} P(308,2510);d(772);d(747);d(908)
% 67.27/67.67 { join( X, meet( Y, complement( X ) ) ) ==> join( Y, X ) }.
% 67.27/67.67 parent0: (146800) {G8,W10,D5,L1,V2,M1} { join( X, meet( Y, complement( X )
% 67.27/67.67 ) ) ==> join( Y, X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146803) {G22,W10,D6,L1,V2,M1} { X ==> join( X, meet( join( X,
% 67.27/67.67 complement( Y ) ), Y ) ) }.
% 67.27/67.67 parent0[0]: (2510) {G22,W10,D6,L1,V2,M1} P(2432,950);d(756);d(771);d(950)
% 67.27/67.67 { join( X, meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146808) {G3,W19,D7,L1,V2,M1} { join( complement( join( X,
% 67.27/67.67 complement( Y ) ) ), X ) ==> join( join( complement( join( X, complement
% 67.27/67.67 ( Y ) ) ), X ), meet( top, Y ) ) }.
% 67.27/67.67 parent0[0]: (27) {G2,W10,D6,L1,V2,M1} P(1,15) { join( join( complement(
% 67.27/67.67 join( X, Y ) ), X ), Y ) ==> top }.
% 67.27/67.67 parent1[0; 17]: (146803) {G22,W10,D6,L1,V2,M1} { X ==> join( X, meet( join
% 67.27/67.67 ( X, complement( Y ) ), Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := complement( Y )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := join( complement( join( X, complement( Y ) ) ), X )
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146810) {G4,W18,D6,L1,V2,M1} { join( complement( join( X,
% 67.27/67.67 complement( Y ) ) ), X ) ==> join( join( meet( complement( X ), Y ), X )
% 67.27/67.67 , meet( top, Y ) ) }.
% 67.27/67.67 parent0[0]: (771) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( X,
% 67.27/67.67 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 67.27/67.67 parent1[0; 10]: (146808) {G3,W19,D7,L1,V2,M1} { join( complement( join( X
% 67.27/67.67 , complement( Y ) ) ), X ) ==> join( join( complement( join( X,
% 67.27/67.67 complement( Y ) ) ), X ), meet( top, Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146811) {G5,W17,D6,L1,V2,M1} { join( meet( complement( X ), Y )
% 67.27/67.67 , X ) ==> join( join( meet( complement( X ), Y ), X ), meet( top, Y ) )
% 67.27/67.67 }.
% 67.27/67.67 parent0[0]: (771) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( X,
% 67.27/67.67 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 67.27/67.67 parent1[0; 2]: (146810) {G4,W18,D6,L1,V2,M1} { join( complement( join( X,
% 67.27/67.67 complement( Y ) ) ), X ) ==> join( join( meet( complement( X ), Y ), X )
% 67.27/67.67 , meet( top, Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146815) {G6,W15,D6,L1,V2,M1} { join( meet( complement( X ), Y )
% 67.27/67.67 , X ) ==> join( join( meet( complement( X ), Y ), X ), Y ) }.
% 67.27/67.67 parent0[0]: (747) {G12,W5,D3,L1,V1,M1} P(75,715);d(740) { meet( top, X )
% 67.27/67.67 ==> X }.
% 67.27/67.67 parent1[0; 14]: (146811) {G5,W17,D6,L1,V2,M1} { join( meet( complement( X
% 67.27/67.67 ), Y ), X ) ==> join( join( meet( complement( X ), Y ), X ), meet( top,
% 67.27/67.67 Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146816) {G7,W10,D5,L1,V2,M1} { join( meet( complement( X ), Y )
% 67.27/67.67 , X ) ==> join( Y, X ) }.
% 67.27/67.67 parent0[0]: (889) {G22,W11,D5,L1,V3,M1} P(866,29) { join( join( meet( Y, X
% 67.27/67.67 ), Z ), X ) ==> join( X, Z ) }.
% 67.27/67.67 parent1[0; 7]: (146815) {G6,W15,D6,L1,V2,M1} { join( meet( complement( X )
% 67.27/67.67 , Y ), X ) ==> join( join( meet( complement( X ), Y ), X ), Y ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := complement( X )
% 67.27/67.67 Z := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2564) {G23,W10,D5,L1,V2,M1} P(27,2510);d(771);d(747);d(889)
% 67.27/67.67 { join( meet( complement( X ), Y ), X ) ==> join( Y, X ) }.
% 67.27/67.67 parent0: (146816) {G7,W10,D5,L1,V2,M1} { join( meet( complement( X ), Y )
% 67.27/67.67 , X ) ==> join( Y, X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146819) {G23,W10,D5,L1,V2,M1} { X ==> join( X, meet( join( X, Y )
% 67.27/67.67 , complement( Y ) ) ) }.
% 67.27/67.67 parent0[0]: (2554) {G23,W10,D5,L1,V2,M1} P(756,2510) { join( Y, meet( join
% 67.27/67.67 ( Y, X ), complement( X ) ) ) ==> Y }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146821) {G12,W11,D8,L1,V1,M1} { X ==> join( X, meet( top,
% 67.27/67.67 complement( converse( complement( converse( X ) ) ) ) ) ) }.
% 67.27/67.67 parent0[0]: (1017) {G11,W8,D6,L1,V1,M1} S(59);d(223) { join( X, converse(
% 67.27/67.67 complement( converse( X ) ) ) ) ==> top }.
% 67.27/67.67 parent1[0; 5]: (146819) {G23,W10,D5,L1,V2,M1} { X ==> join( X, meet( join
% 67.27/67.67 ( X, Y ), complement( Y ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := converse( complement( converse( X ) ) )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146822) {G13,W9,D7,L1,V1,M1} { X ==> join( X, complement(
% 67.27/67.67 converse( complement( converse( X ) ) ) ) ) }.
% 67.27/67.67 parent0[0]: (747) {G12,W5,D3,L1,V1,M1} P(75,715);d(740) { meet( top, X )
% 67.27/67.67 ==> X }.
% 67.27/67.67 parent1[0; 4]: (146821) {G12,W11,D8,L1,V1,M1} { X ==> join( X, meet( top,
% 67.27/67.67 complement( converse( complement( converse( X ) ) ) ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := complement( converse( complement( converse( X ) ) ) )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146823) {G13,W9,D7,L1,V1,M1} { join( X, complement( converse(
% 67.27/67.67 complement( converse( X ) ) ) ) ) ==> X }.
% 67.27/67.67 parent0[0]: (146822) {G13,W9,D7,L1,V1,M1} { X ==> join( X, complement(
% 67.27/67.67 converse( complement( converse( X ) ) ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2724) {G24,W9,D7,L1,V1,M1} P(1017,2554);d(747) { join( X,
% 67.27/67.67 complement( converse( complement( converse( X ) ) ) ) ) ==> X }.
% 67.27/67.67 parent0: (146823) {G13,W9,D7,L1,V1,M1} { join( X, complement( converse(
% 67.27/67.67 complement( converse( X ) ) ) ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146825) {G23,W10,D5,L1,V2,M1} { X ==> join( X, meet( join( X, Y )
% 67.27/67.67 , complement( Y ) ) ) }.
% 67.27/67.67 parent0[0]: (2554) {G23,W10,D5,L1,V2,M1} P(756,2510) { join( Y, meet( join
% 67.27/67.67 ( Y, X ), complement( X ) ) ) ==> Y }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146830) {G4,W18,D6,L1,V2,M1} { join( X, complement( join( Y, X )
% 67.27/67.67 ) ) ==> join( join( X, complement( join( Y, X ) ) ), meet( top,
% 67.27/67.67 complement( Y ) ) ) }.
% 67.27/67.67 parent0[0]: (308) {G3,W10,D6,L1,V2,M1} P(27,0);d(1) { join( join( Y,
% 67.27/67.67 complement( join( X, Y ) ) ), X ) ==> top }.
% 67.27/67.67 parent1[0; 15]: (146825) {G23,W10,D5,L1,V2,M1} { X ==> join( X, meet( join
% 67.27/67.67 ( X, Y ), complement( Y ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := join( X, complement( join( Y, X ) ) )
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146831) {G5,W16,D6,L1,V2,M1} { join( X, complement( join( Y, X )
% 67.27/67.67 ) ) ==> join( join( X, complement( join( Y, X ) ) ), complement( Y ) )
% 67.27/67.67 }.
% 67.27/67.67 parent0[0]: (747) {G12,W5,D3,L1,V1,M1} P(75,715);d(740) { meet( top, X )
% 67.27/67.67 ==> X }.
% 67.27/67.67 parent1[0; 14]: (146830) {G4,W18,D6,L1,V2,M1} { join( X, complement( join
% 67.27/67.67 ( Y, X ) ) ) ==> join( join( X, complement( join( Y, X ) ) ), meet( top,
% 67.27/67.67 complement( Y ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := complement( Y )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146832) {G6,W15,D6,L1,V2,M1} { join( X, complement( join( Y, X )
% 67.27/67.67 ) ) ==> join( complement( meet( join( Y, X ), Y ) ), X ) }.
% 67.27/67.67 parent0[0]: (966) {G17,W14,D5,L1,V3,M1} P(773,29) { join( join( Z,
% 67.27/67.67 complement( X ) ), complement( Y ) ) ==> join( complement( meet( X, Y ) )
% 67.27/67.67 , Z ) }.
% 67.27/67.67 parent1[0; 7]: (146831) {G5,W16,D6,L1,V2,M1} { join( X, complement( join(
% 67.27/67.67 Y, X ) ) ) ==> join( join( X, complement( join( Y, X ) ) ), complement( Y
% 67.27/67.67 ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := join( Y, X )
% 67.27/67.67 Y := Y
% 67.27/67.67 Z := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146833) {G7,W11,D5,L1,V2,M1} { join( X, complement( join( Y, X )
% 67.27/67.67 ) ) ==> join( complement( Y ), X ) }.
% 67.27/67.67 parent0[0]: (1032) {G21,W7,D4,L1,V2,M1} P(1025,843) { meet( join( X, Y ), X
% 67.27/67.67 ) ==> X }.
% 67.27/67.67 parent1[0; 9]: (146832) {G6,W15,D6,L1,V2,M1} { join( X, complement( join(
% 67.27/67.67 Y, X ) ) ) ==> join( complement( meet( join( Y, X ), Y ) ), X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2730) {G24,W11,D5,L1,V2,M1} P(308,2554);d(747);d(966);d(1032)
% 67.27/67.67 { join( X, complement( join( Y, X ) ) ) ==> join( complement( Y ), X )
% 67.27/67.67 }.
% 67.27/67.67 parent0: (146833) {G7,W11,D5,L1,V2,M1} { join( X, complement( join( Y, X )
% 67.27/67.67 ) ) ==> join( complement( Y ), X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146835) {G23,W10,D5,L1,V2,M1} { X ==> join( X, meet( join( X, Y )
% 67.27/67.67 , complement( Y ) ) ) }.
% 67.27/67.67 parent0[0]: (2554) {G23,W10,D5,L1,V2,M1} P(756,2510) { join( Y, meet( join
% 67.27/67.67 ( Y, X ), complement( X ) ) ) ==> Y }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146836) {G2,W10,D5,L1,V2,M1} { X ==> join( X, meet( complement(
% 67.27/67.67 Y ), join( X, Y ) ) ) }.
% 67.27/67.67 parent0[0]: (75) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 67.27/67.67 Y ) }.
% 67.27/67.67 parent1[0; 4]: (146835) {G23,W10,D5,L1,V2,M1} { X ==> join( X, meet( join
% 67.27/67.67 ( X, Y ), complement( Y ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := complement( Y )
% 67.27/67.67 Y := join( X, Y )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146839) {G2,W10,D5,L1,V2,M1} { join( X, meet( complement( Y ),
% 67.27/67.67 join( X, Y ) ) ) ==> X }.
% 67.27/67.67 parent0[0]: (146836) {G2,W10,D5,L1,V2,M1} { X ==> join( X, meet(
% 67.27/67.67 complement( Y ), join( X, Y ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2741) {G24,W10,D5,L1,V2,M1} P(75,2554) { join( X, meet(
% 67.27/67.67 complement( Y ), join( X, Y ) ) ) ==> X }.
% 67.27/67.67 parent0: (146839) {G2,W10,D5,L1,V2,M1} { join( X, meet( complement( Y ),
% 67.27/67.67 join( X, Y ) ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146840) {G23,W10,D5,L1,V2,M1} { X ==> join( X, meet( join( X, Y )
% 67.27/67.67 , complement( Y ) ) ) }.
% 67.27/67.67 parent0[0]: (2554) {G23,W10,D5,L1,V2,M1} P(756,2510) { join( Y, meet( join
% 67.27/67.67 ( Y, X ), complement( X ) ) ) ==> Y }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146841) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( join( X, Y ),
% 67.27/67.67 complement( Y ) ), X ) }.
% 67.27/67.67 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.27/67.67 parent1[0; 2]: (146840) {G23,W10,D5,L1,V2,M1} { X ==> join( X, meet( join
% 67.27/67.67 ( X, Y ), complement( Y ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := meet( join( X, Y ), complement( Y ) )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146845) {G1,W10,D5,L1,V2,M1} { join( meet( join( X, Y ),
% 67.27/67.67 complement( Y ) ), X ) ==> X }.
% 67.27/67.67 parent0[0]: (146841) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( join( X, Y )
% 67.27/67.67 , complement( Y ) ), X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2746) {G24,W10,D5,L1,V2,M1} P(2554,0) { join( meet( join( X,
% 67.27/67.67 Y ), complement( Y ) ), X ) ==> X }.
% 67.27/67.67 parent0: (146845) {G1,W10,D5,L1,V2,M1} { join( meet( join( X, Y ),
% 67.27/67.67 complement( Y ) ), X ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146850) {G16,W10,D5,L1,V2,M1} { meet( X, complement( Y ) ) ==>
% 67.27/67.67 complement( join( complement( X ), Y ) ) }.
% 67.27/67.67 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.67 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146853) {G17,W13,D9,L1,V1,M1} { meet( X, complement( complement
% 67.27/67.67 ( converse( complement( converse( complement( X ) ) ) ) ) ) ) ==>
% 67.27/67.67 complement( complement( X ) ) }.
% 67.27/67.67 parent0[0]: (2724) {G24,W9,D7,L1,V1,M1} P(1017,2554);d(747) { join( X,
% 67.27/67.67 complement( converse( complement( converse( X ) ) ) ) ) ==> X }.
% 67.27/67.67 parent1[0; 11]: (146850) {G16,W10,D5,L1,V2,M1} { meet( X, complement( Y )
% 67.27/67.67 ) ==> complement( join( complement( X ), Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := complement( X )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := complement( converse( complement( converse( complement( X ) ) ) ) )
% 67.27/67.67
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146855) {G16,W11,D9,L1,V1,M1} { meet( X, complement( complement
% 67.27/67.67 ( converse( complement( converse( complement( X ) ) ) ) ) ) ) ==> X }.
% 67.27/67.67 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.67 complement( X ) ) ==> X }.
% 67.27/67.67 parent1[0; 10]: (146853) {G17,W13,D9,L1,V1,M1} { meet( X, complement(
% 67.27/67.67 complement( converse( complement( converse( complement( X ) ) ) ) ) ) )
% 67.27/67.67 ==> complement( complement( X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146857) {G16,W9,D7,L1,V1,M1} { meet( X, converse( complement(
% 67.27/67.67 converse( complement( X ) ) ) ) ) ==> X }.
% 67.27/67.67 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.67 complement( X ) ) ==> X }.
% 67.27/67.67 parent1[0; 3]: (146855) {G16,W11,D9,L1,V1,M1} { meet( X, complement(
% 67.27/67.67 complement( converse( complement( converse( complement( X ) ) ) ) ) ) )
% 67.27/67.67 ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := converse( complement( converse( complement( X ) ) ) )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2749) {G25,W9,D7,L1,V1,M1} P(2724,772);d(756);d(756) { meet(
% 67.27/67.67 X, converse( complement( converse( complement( X ) ) ) ) ) ==> X }.
% 67.27/67.67 parent0: (146857) {G16,W9,D7,L1,V1,M1} { meet( X, converse( complement(
% 67.27/67.67 converse( complement( X ) ) ) ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146860) {G24,W9,D7,L1,V1,M1} { X ==> join( X, complement(
% 67.27/67.67 converse( complement( converse( X ) ) ) ) ) }.
% 67.27/67.67 parent0[0]: (2724) {G24,W9,D7,L1,V1,M1} P(1017,2554);d(747) { join( X,
% 67.27/67.67 complement( converse( complement( converse( X ) ) ) ) ) ==> X }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146861) {G1,W10,D6,L1,V1,M1} { converse( X ) ==> join( converse
% 67.27/67.67 ( X ), complement( converse( complement( X ) ) ) ) }.
% 67.27/67.67 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.27/67.67 parent1[0; 9]: (146860) {G24,W9,D7,L1,V1,M1} { X ==> join( X, complement(
% 67.27/67.67 converse( complement( converse( X ) ) ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := converse( X )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146862) {G1,W10,D6,L1,V1,M1} { join( converse( X ), complement(
% 67.27/67.67 converse( complement( X ) ) ) ) ==> converse( X ) }.
% 67.27/67.67 parent0[0]: (146861) {G1,W10,D6,L1,V1,M1} { converse( X ) ==> join(
% 67.27/67.67 converse( X ), complement( converse( complement( X ) ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2771) {G25,W10,D6,L1,V1,M1} P(7,2724) { join( converse( X ),
% 67.27/67.67 complement( converse( complement( X ) ) ) ) ==> converse( X ) }.
% 67.27/67.67 parent0: (146862) {G1,W10,D6,L1,V1,M1} { join( converse( X ), complement(
% 67.27/67.67 converse( complement( X ) ) ) ) ==> converse( X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146864) {G23,W9,D6,L1,V2,M1} { Y ==> join( converse( meet( X,
% 67.27/67.67 converse( Y ) ) ), Y ) }.
% 67.27/67.67 parent0[0]: (904) {G23,W9,D6,L1,V2,M1} P(898,20);d(7) { join( converse(
% 67.27/67.67 meet( X, converse( Y ) ) ), Y ) ==> Y }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146866) {G24,W12,D6,L1,V1,M1} { complement( converse( complement
% 67.27/67.67 ( X ) ) ) ==> join( converse( X ), complement( converse( complement( X )
% 67.27/67.67 ) ) ) }.
% 67.27/67.67 parent0[0]: (2749) {G25,W9,D7,L1,V1,M1} P(2724,772);d(756);d(756) { meet( X
% 67.27/67.67 , converse( complement( converse( complement( X ) ) ) ) ) ==> X }.
% 67.27/67.67 parent1[0; 7]: (146864) {G23,W9,D6,L1,V2,M1} { Y ==> join( converse( meet
% 67.27/67.67 ( X, converse( Y ) ) ), Y ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := complement( converse( complement( X ) ) )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146867) {G25,W7,D5,L1,V1,M1} { complement( converse( complement
% 67.27/67.67 ( X ) ) ) ==> converse( X ) }.
% 67.27/67.67 parent0[0]: (2771) {G25,W10,D6,L1,V1,M1} P(7,2724) { join( converse( X ),
% 67.27/67.67 complement( converse( complement( X ) ) ) ) ==> converse( X ) }.
% 67.27/67.67 parent1[0; 5]: (146866) {G24,W12,D6,L1,V1,M1} { complement( converse(
% 67.27/67.67 complement( X ) ) ) ==> join( converse( X ), complement( converse(
% 67.27/67.67 complement( X ) ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2796) {G26,W7,D5,L1,V1,M1} P(2749,904);d(2771) { complement(
% 67.27/67.67 converse( complement( X ) ) ) ==> converse( X ) }.
% 67.27/67.67 parent0: (146867) {G25,W7,D5,L1,V1,M1} { complement( converse( complement
% 67.27/67.67 ( X ) ) ) ==> converse( X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146870) {G26,W7,D5,L1,V1,M1} { converse( X ) ==> complement(
% 67.27/67.67 converse( complement( X ) ) ) }.
% 67.27/67.67 parent0[0]: (2796) {G26,W7,D5,L1,V1,M1} P(2749,904);d(2771) { complement(
% 67.27/67.67 converse( complement( X ) ) ) ==> converse( X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146875) {G17,W12,D6,L1,V2,M1} { converse( join( complement( X )
% 67.27/67.67 , Y ) ) ==> complement( converse( meet( X, complement( Y ) ) ) ) }.
% 67.27/67.67 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.67 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.67 parent1[0; 8]: (146870) {G26,W7,D5,L1,V1,M1} { converse( X ) ==>
% 67.27/67.67 complement( converse( complement( X ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := join( complement( X ), Y )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146876) {G17,W12,D6,L1,V2,M1} { complement( converse( meet( X,
% 67.27/67.67 complement( Y ) ) ) ) ==> converse( join( complement( X ), Y ) ) }.
% 67.27/67.67 parent0[0]: (146875) {G17,W12,D6,L1,V2,M1} { converse( join( complement( X
% 67.27/67.67 ), Y ) ) ==> complement( converse( meet( X, complement( Y ) ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2816) {G27,W12,D6,L1,V2,M1} P(772,2796) { complement(
% 67.27/67.67 converse( meet( X, complement( Y ) ) ) ) ==> converse( join( complement(
% 67.27/67.67 X ), Y ) ) }.
% 67.27/67.67 parent0: (146876) {G17,W12,D6,L1,V2,M1} { complement( converse( meet( X,
% 67.27/67.67 complement( Y ) ) ) ) ==> converse( join( complement( X ), Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146878) {G26,W7,D5,L1,V1,M1} { converse( X ) ==> complement(
% 67.27/67.67 converse( complement( X ) ) ) }.
% 67.27/67.67 parent0[0]: (2796) {G26,W7,D5,L1,V1,M1} P(2749,904);d(2771) { complement(
% 67.27/67.67 converse( complement( X ) ) ) ==> converse( X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146883) {G18,W12,D6,L1,V2,M1} { converse( meet( X, complement( Y
% 67.27/67.67 ) ) ) ==> complement( converse( join( complement( X ), Y ) ) ) }.
% 67.27/67.67 parent0[0]: (951) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet( Y,
% 67.27/67.67 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 67.27/67.67 parent1[0; 8]: (146878) {G26,W7,D5,L1,V1,M1} { converse( X ) ==>
% 67.27/67.67 complement( converse( complement( X ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := meet( X, complement( Y ) )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146884) {G18,W12,D6,L1,V2,M1} { complement( converse( join(
% 67.27/67.67 complement( X ), Y ) ) ) ==> converse( meet( X, complement( Y ) ) ) }.
% 67.27/67.67 parent0[0]: (146883) {G18,W12,D6,L1,V2,M1} { converse( meet( X, complement
% 67.27/67.67 ( Y ) ) ) ==> complement( converse( join( complement( X ), Y ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2845) {G27,W12,D6,L1,V2,M1} P(951,2796) { complement(
% 67.27/67.67 converse( join( complement( X ), Y ) ) ) ==> converse( meet( X,
% 67.27/67.67 complement( Y ) ) ) }.
% 67.27/67.67 parent0: (146884) {G18,W12,D6,L1,V2,M1} { complement( converse( join(
% 67.27/67.67 complement( X ), Y ) ) ) ==> converse( meet( X, complement( Y ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146886) {G26,W7,D5,L1,V1,M1} { converse( X ) ==> complement(
% 67.27/67.67 converse( complement( X ) ) ) }.
% 67.27/67.67 parent0[0]: (2796) {G26,W7,D5,L1,V1,M1} P(2749,904);d(2771) { complement(
% 67.27/67.67 converse( complement( X ) ) ) ==> converse( X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146891) {G18,W12,D6,L1,V2,M1} { converse( meet( complement( X )
% 67.27/67.67 , Y ) ) ==> complement( converse( join( X, complement( Y ) ) ) ) }.
% 67.27/67.67 parent0[0]: (950) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet(
% 67.27/67.67 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.67 parent1[0; 8]: (146886) {G26,W7,D5,L1,V1,M1} { converse( X ) ==>
% 67.27/67.67 complement( converse( complement( X ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := meet( complement( X ), Y )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146892) {G18,W12,D6,L1,V2,M1} { complement( converse( join( X,
% 67.27/67.67 complement( Y ) ) ) ) ==> converse( meet( complement( X ), Y ) ) }.
% 67.27/67.67 parent0[0]: (146891) {G18,W12,D6,L1,V2,M1} { converse( meet( complement( X
% 67.27/67.67 ), Y ) ) ==> complement( converse( join( X, complement( Y ) ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2847) {G27,W12,D6,L1,V2,M1} P(950,2796) { complement(
% 67.27/67.67 converse( join( X, complement( Y ) ) ) ) ==> converse( meet( complement(
% 67.27/67.67 X ), Y ) ) }.
% 67.27/67.67 parent0: (146892) {G18,W12,D6,L1,V2,M1} { complement( converse( join( X,
% 67.27/67.67 complement( Y ) ) ) ) ==> converse( meet( complement( X ), Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146893) {G26,W7,D5,L1,V1,M1} { converse( X ) ==> complement(
% 67.27/67.67 converse( complement( X ) ) ) }.
% 67.27/67.67 parent0[0]: (2796) {G26,W7,D5,L1,V1,M1} P(2749,904);d(2771) { complement(
% 67.27/67.67 converse( complement( X ) ) ) ==> converse( X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146895) {G18,W11,D6,L1,V2,M1} { converse( meet( X, Y ) ) ==>
% 67.27/67.67 complement( converse( complement( meet( Y, X ) ) ) ) }.
% 67.27/67.67 parent0[0]: (972) {G17,W9,D4,L1,V2,M1} P(773,0);d(773) { complement( meet(
% 67.27/67.67 X, Y ) ) = complement( meet( Y, X ) ) }.
% 67.27/67.67 parent1[0; 7]: (146893) {G26,W7,D5,L1,V1,M1} { converse( X ) ==>
% 67.27/67.67 complement( converse( complement( X ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := meet( X, Y )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146897) {G19,W9,D4,L1,V2,M1} { converse( meet( X, Y ) ) ==>
% 67.27/67.67 converse( meet( Y, X ) ) }.
% 67.27/67.67 parent0[0]: (2796) {G26,W7,D5,L1,V1,M1} P(2749,904);d(2771) { complement(
% 67.27/67.67 converse( complement( X ) ) ) ==> converse( X ) }.
% 67.27/67.67 parent1[0; 5]: (146895) {G18,W11,D6,L1,V2,M1} { converse( meet( X, Y ) )
% 67.27/67.67 ==> complement( converse( complement( meet( Y, X ) ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := meet( Y, X )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2855) {G27,W9,D4,L1,V2,M1} P(972,2796);d(2796) { converse(
% 67.27/67.67 meet( Y, X ) ) = converse( meet( X, Y ) ) }.
% 67.27/67.67 parent0: (146897) {G19,W9,D4,L1,V2,M1} { converse( meet( X, Y ) ) ==>
% 67.27/67.67 converse( meet( Y, X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146898) {G26,W7,D5,L1,V1,M1} { converse( X ) ==> complement(
% 67.27/67.67 converse( complement( X ) ) ) }.
% 67.27/67.67 parent0[0]: (2796) {G26,W7,D5,L1,V1,M1} P(2749,904);d(2771) { complement(
% 67.27/67.67 converse( complement( X ) ) ) ==> converse( X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146900) {G16,W7,D4,L1,V1,M1} { converse( complement( X ) ) ==>
% 67.27/67.67 complement( converse( X ) ) }.
% 67.27/67.67 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.67 complement( X ) ) ==> X }.
% 67.27/67.67 parent1[0; 6]: (146898) {G26,W7,D5,L1,V1,M1} { converse( X ) ==>
% 67.27/67.67 complement( converse( complement( X ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := complement( X )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.67 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.67 parent0: (146900) {G16,W7,D4,L1,V1,M1} { converse( complement( X ) ) ==>
% 67.27/67.67 complement( converse( X ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146903) {G16,W9,D6,L1,V1,M1} { zero ==> composition( converse(
% 67.27/67.67 complement( composition( X, top ) ) ), X ) }.
% 67.27/67.67 parent0[0]: (1492) {G16,W9,D6,L1,V1,M1} P(1486,17);d(776) { composition(
% 67.27/67.67 converse( complement( composition( X, top ) ) ), X ) ==> zero }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146904) {G17,W9,D6,L1,V1,M1} { zero ==> composition( complement
% 67.27/67.67 ( converse( composition( X, top ) ) ), X ) }.
% 67.27/67.67 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.67 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.67 parent1[0; 3]: (146903) {G16,W9,D6,L1,V1,M1} { zero ==> composition(
% 67.27/67.67 converse( complement( composition( X, top ) ) ), X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := composition( X, top )
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146905) {G17,W9,D6,L1,V1,M1} { composition( complement( converse
% 67.27/67.67 ( composition( X, top ) ) ), X ) ==> zero }.
% 67.27/67.67 parent0[0]: (146904) {G17,W9,D6,L1,V1,M1} { zero ==> composition(
% 67.27/67.67 complement( converse( composition( X, top ) ) ), X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2873) {G28,W9,D6,L1,V1,M1} P(2866,1492) { composition(
% 67.27/67.67 complement( converse( composition( X, top ) ) ), X ) ==> zero }.
% 67.27/67.67 parent0: (146905) {G17,W9,D6,L1,V1,M1} { composition( complement( converse
% 67.27/67.67 ( composition( X, top ) ) ), X ) ==> zero }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146907) {G16,W7,D5,L1,V0,M1} { zero ==> composition( converse(
% 67.27/67.67 complement( skol1 ) ), skol1 ) }.
% 67.27/67.67 parent0[0]: (783) {G16,W7,D5,L1,V0,M1} P(755,17);d(776) { composition(
% 67.27/67.67 converse( complement( skol1 ) ), skol1 ) ==> zero }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146908) {G17,W7,D5,L1,V0,M1} { zero ==> composition( complement
% 67.27/67.67 ( converse( skol1 ) ), skol1 ) }.
% 67.27/67.67 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.67 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.67 parent1[0; 3]: (146907) {G16,W7,D5,L1,V0,M1} { zero ==> composition(
% 67.27/67.67 converse( complement( skol1 ) ), skol1 ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := skol1
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146909) {G17,W7,D5,L1,V0,M1} { composition( complement( converse
% 67.27/67.67 ( skol1 ) ), skol1 ) ==> zero }.
% 67.27/67.67 parent0[0]: (146908) {G17,W7,D5,L1,V0,M1} { zero ==> composition(
% 67.27/67.67 complement( converse( skol1 ) ), skol1 ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2884) {G28,W7,D5,L1,V0,M1} P(2866,783) { composition(
% 67.27/67.67 complement( converse( skol1 ) ), skol1 ) ==> zero }.
% 67.27/67.67 parent0: (146909) {G17,W7,D5,L1,V0,M1} { composition( complement( converse
% 67.27/67.67 ( skol1 ) ), skol1 ) ==> zero }.
% 67.27/67.67 substitution0:
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146911) {G4,W9,D4,L1,V1,M1} { converse( join( X, one ) ) ==> join
% 67.27/67.67 ( converse( X ), one ) }.
% 67.27/67.67 parent0[0]: (190) {G4,W9,D4,L1,V1,M1} P(186,8) { join( converse( X ), one )
% 67.27/67.67 ==> converse( join( X, one ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146912) {G5,W11,D5,L1,V1,M1} { converse( join( complement( X ),
% 67.27/67.67 one ) ) ==> join( complement( converse( X ) ), one ) }.
% 67.27/67.67 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.67 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.67 parent1[0; 7]: (146911) {G4,W9,D4,L1,V1,M1} { converse( join( X, one ) )
% 67.27/67.67 ==> join( converse( X ), one ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := complement( X )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146913) {G5,W11,D5,L1,V1,M1} { join( complement( converse( X ) )
% 67.27/67.67 , one ) ==> converse( join( complement( X ), one ) ) }.
% 67.27/67.67 parent0[0]: (146912) {G5,W11,D5,L1,V1,M1} { converse( join( complement( X
% 67.27/67.67 ), one ) ) ==> join( complement( converse( X ) ), one ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2885) {G28,W11,D5,L1,V1,M1} P(2866,190) { join( complement(
% 67.27/67.67 converse( X ) ), one ) ==> converse( join( complement( X ), one ) ) }.
% 67.27/67.67 parent0: (146913) {G5,W11,D5,L1,V1,M1} { join( complement( converse( X ) )
% 67.27/67.67 , one ) ==> converse( join( complement( X ), one ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146915) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y ) ==>
% 67.27/67.67 converse( join( X, converse( Y ) ) ) }.
% 67.27/67.67 parent0[0]: (20) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 67.27/67.67 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146919) {G2,W12,D6,L1,V2,M1} { join( converse( X ), complement(
% 67.27/67.67 Y ) ) ==> converse( join( X, complement( converse( Y ) ) ) ) }.
% 67.27/67.67 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.67 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.67 parent1[0; 9]: (146915) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y )
% 67.27/67.67 ==> converse( join( X, converse( Y ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := X
% 67.27/67.67 Y := complement( Y )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146921) {G2,W12,D6,L1,V2,M1} { converse( join( X, complement(
% 67.27/67.67 converse( Y ) ) ) ) ==> join( converse( X ), complement( Y ) ) }.
% 67.27/67.67 parent0[0]: (146919) {G2,W12,D6,L1,V2,M1} { join( converse( X ),
% 67.27/67.67 complement( Y ) ) ==> converse( join( X, complement( converse( Y ) ) ) )
% 67.27/67.67 }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2889) {G28,W12,D6,L1,V2,M1} P(2866,20) { converse( join( Y,
% 67.27/67.67 complement( converse( X ) ) ) ) ==> join( converse( Y ), complement( X )
% 67.27/67.67 ) }.
% 67.27/67.67 parent0: (146921) {G2,W12,D6,L1,V2,M1} { converse( join( X, complement(
% 67.27/67.67 converse( Y ) ) ) ) ==> join( converse( X ), complement( Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67 permutation0:
% 67.27/67.67 0 ==> 0
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146923) {G1,W10,D5,L1,V2,M1} { composition( Y, converse( X ) )
% 67.27/67.67 ==> converse( composition( X, converse( Y ) ) ) }.
% 67.27/67.67 parent0[0]: (16) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 67.27/67.67 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := X
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 paramod: (146927) {G2,W12,D6,L1,V2,M1} { composition( complement( X ),
% 67.27/67.67 converse( Y ) ) ==> converse( composition( Y, complement( converse( X ) )
% 67.27/67.67 ) ) }.
% 67.27/67.67 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.67 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.67 parent1[0; 9]: (146923) {G1,W10,D5,L1,V2,M1} { composition( Y, converse( X
% 67.27/67.67 ) ) ==> converse( composition( X, converse( Y ) ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 end
% 67.27/67.67 substitution1:
% 67.27/67.67 X := Y
% 67.27/67.67 Y := complement( X )
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 eqswap: (146929) {G2,W12,D6,L1,V2,M1} { converse( composition( Y,
% 67.27/67.67 complement( converse( X ) ) ) ) ==> composition( complement( X ),
% 67.27/67.67 converse( Y ) ) }.
% 67.27/67.67 parent0[0]: (146927) {G2,W12,D6,L1,V2,M1} { composition( complement( X ),
% 67.27/67.67 converse( Y ) ) ==> converse( composition( Y, complement( converse( X ) )
% 67.27/67.67 ) ) }.
% 67.27/67.67 substitution0:
% 67.27/67.67 X := X
% 67.27/67.67 Y := Y
% 67.27/67.67 end
% 67.27/67.67
% 67.27/67.67 subsumption: (2891) {G28,W12,D6,L1,V2,M1} P(2866,16) { converse(
% 67.27/67.67 composition( Y, complement( converse( X ) ) ) ) ==> composition(
% 67.27/67.67 complement( X ), converse( Y ) ) }.
% 67.27/67.67 parent0: (146929) {G2,W12,D6,L1,V2,M1} { converse( composition( Y,
% 67.27/67.67 complement( converse( X ) ) ) ) ==> composition( complement( X ),
% 67.27/67.67 converse( Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (146931) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) ) ==>
% 67.27/67.68 converse( join( converse( X ), Y ) ) }.
% 67.27/67.68 parent0[0]: (19) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 67.27/67.68 ), Y ) ) ==> join( X, converse( Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (146935) {G2,W12,D6,L1,V2,M1} { join( complement( X ), converse(
% 67.27/67.68 Y ) ) ==> converse( join( complement( converse( X ) ), Y ) ) }.
% 67.27/67.68 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.68 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.68 parent1[0; 8]: (146931) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) )
% 67.27/67.68 ==> converse( join( converse( X ), Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := complement( X )
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (146937) {G2,W12,D6,L1,V2,M1} { converse( join( complement(
% 67.27/67.68 converse( X ) ), Y ) ) ==> join( complement( X ), converse( Y ) ) }.
% 67.27/67.68 parent0[0]: (146935) {G2,W12,D6,L1,V2,M1} { join( complement( X ),
% 67.27/67.68 converse( Y ) ) ==> converse( join( complement( converse( X ) ), Y ) )
% 67.27/67.68 }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (2893) {G28,W12,D6,L1,V2,M1} P(2866,19) { converse( join(
% 67.27/67.68 complement( converse( X ) ), Y ) ) ==> join( complement( X ), converse( Y
% 67.27/67.68 ) ) }.
% 67.27/67.68 parent0: (146937) {G2,W12,D6,L1,V2,M1} { converse( join( complement(
% 67.27/67.68 converse( X ) ), Y ) ) ==> join( complement( X ), converse( Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (146939) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) ==> join
% 67.27/67.68 ( converse( X ), converse( Y ) ) }.
% 67.27/67.68 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 67.27/67.68 ) ==> converse( join( X, Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (146940) {G1,W12,D5,L1,V2,M1} { converse( join( complement( X ),
% 67.27/67.68 Y ) ) ==> join( complement( converse( X ) ), converse( Y ) ) }.
% 67.27/67.68 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.68 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.68 parent1[0; 7]: (146939) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) )
% 67.27/67.68 ==> join( converse( X ), converse( Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := complement( X )
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (146942) {G1,W12,D5,L1,V2,M1} { join( complement( converse( X ) )
% 67.27/67.68 , converse( Y ) ) ==> converse( join( complement( X ), Y ) ) }.
% 67.27/67.68 parent0[0]: (146940) {G1,W12,D5,L1,V2,M1} { converse( join( complement( X
% 67.27/67.68 ), Y ) ) ==> join( complement( converse( X ) ), converse( Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (2894) {G28,W12,D5,L1,V2,M1} P(2866,8) { join( complement(
% 67.27/67.68 converse( X ) ), converse( Y ) ) ==> converse( join( complement( X ), Y )
% 67.27/67.68 ) }.
% 67.27/67.68 parent0: (146942) {G1,W12,D5,L1,V2,M1} { join( complement( converse( X ) )
% 67.27/67.68 , converse( Y ) ) ==> converse( join( complement( X ), Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (146945) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) ==> join
% 67.27/67.68 ( converse( X ), converse( Y ) ) }.
% 67.27/67.68 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 67.27/67.68 ) ==> converse( join( X, Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (146947) {G1,W12,D5,L1,V2,M1} { converse( join( X, complement( Y
% 67.27/67.68 ) ) ) ==> join( converse( X ), complement( converse( Y ) ) ) }.
% 67.27/67.68 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.68 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.68 parent1[0; 9]: (146945) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) )
% 67.27/67.68 ==> join( converse( X ), converse( Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := complement( Y )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (146949) {G1,W12,D5,L1,V2,M1} { join( converse( X ), complement(
% 67.27/67.68 converse( Y ) ) ) ==> converse( join( X, complement( Y ) ) ) }.
% 67.27/67.68 parent0[0]: (146947) {G1,W12,D5,L1,V2,M1} { converse( join( X, complement
% 67.27/67.68 ( Y ) ) ) ==> join( converse( X ), complement( converse( Y ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (2895) {G28,W12,D5,L1,V2,M1} P(2866,8) { join( converse( Y ),
% 67.27/67.68 complement( converse( X ) ) ) ==> converse( join( Y, complement( X ) ) )
% 67.27/67.68 }.
% 67.27/67.68 parent0: (146949) {G1,W12,D5,L1,V2,M1} { join( converse( X ), complement(
% 67.27/67.68 converse( Y ) ) ) ==> converse( join( X, complement( Y ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (146951) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ), Y ) ==>
% 67.27/67.68 join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.27/67.68 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 67.27/67.68 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Z
% 67.27/67.68 Z := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (146953) {G1,W13,D6,L1,V1,M1} { composition( join( complement(
% 67.27/67.68 converse( skol1 ) ), X ), skol1 ) ==> join( zero, composition( X, skol1 )
% 67.27/67.68 ) }.
% 67.27/67.68 parent0[0]: (2884) {G28,W7,D5,L1,V0,M1} P(2866,783) { composition(
% 67.27/67.68 complement( converse( skol1 ) ), skol1 ) ==> zero }.
% 67.27/67.68 parent1[0; 9]: (146951) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ),
% 67.27/67.68 Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := complement( converse( skol1 ) )
% 67.27/67.68 Y := skol1
% 67.27/67.68 Z := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (146955) {G2,W11,D6,L1,V1,M1} { composition( join( complement(
% 67.27/67.68 converse( skol1 ) ), X ), skol1 ) ==> composition( X, skol1 ) }.
% 67.27/67.68 parent0[0]: (749) {G13,W5,D3,L1,V1,M1} P(715,0);d(748) { join( zero, X )
% 67.27/67.68 ==> X }.
% 67.27/67.68 parent1[0; 8]: (146953) {G1,W13,D6,L1,V1,M1} { composition( join(
% 67.27/67.68 complement( converse( skol1 ) ), X ), skol1 ) ==> join( zero, composition
% 67.27/67.68 ( X, skol1 ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := composition( X, skol1 )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (2900) {G29,W11,D6,L1,V1,M1} P(2884,6);d(749) { composition(
% 67.27/67.68 join( complement( converse( skol1 ) ), X ), skol1 ) ==> composition( X,
% 67.27/67.68 skol1 ) }.
% 67.27/67.68 parent0: (146955) {G2,W11,D6,L1,V1,M1} { composition( join( complement(
% 67.27/67.68 converse( skol1 ) ), X ), skol1 ) ==> composition( X, skol1 ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (146958) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ), Y ) ==>
% 67.27/67.68 join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.27/67.68 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 67.27/67.68 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Z
% 67.27/67.68 Z := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (146961) {G1,W13,D6,L1,V1,M1} { composition( join( X, complement
% 67.27/67.68 ( converse( skol1 ) ) ), skol1 ) ==> join( composition( X, skol1 ), zero
% 67.27/67.68 ) }.
% 67.27/67.68 parent0[0]: (2884) {G28,W7,D5,L1,V0,M1} P(2866,783) { composition(
% 67.27/67.68 complement( converse( skol1 ) ), skol1 ) ==> zero }.
% 67.27/67.68 parent1[0; 12]: (146958) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z )
% 67.27/67.68 , Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := skol1
% 67.27/67.68 Z := complement( converse( skol1 ) )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (146962) {G2,W11,D6,L1,V1,M1} { composition( join( X, complement
% 67.27/67.68 ( converse( skol1 ) ) ), skol1 ) ==> composition( X, skol1 ) }.
% 67.27/67.68 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.27/67.68 }.
% 67.27/67.68 parent1[0; 8]: (146961) {G1,W13,D6,L1,V1,M1} { composition( join( X,
% 67.27/67.68 complement( converse( skol1 ) ) ), skol1 ) ==> join( composition( X,
% 67.27/67.68 skol1 ), zero ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := composition( X, skol1 )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (2901) {G29,W11,D6,L1,V1,M1} P(2884,6);d(740) { composition(
% 67.27/67.68 join( X, complement( converse( skol1 ) ) ), skol1 ) ==> composition( X,
% 67.27/67.68 skol1 ) }.
% 67.27/67.68 parent0: (146962) {G2,W11,D6,L1,V1,M1} { composition( join( X, complement
% 67.27/67.68 ( converse( skol1 ) ) ), skol1 ) ==> composition( X, skol1 ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (146964) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) ==> join
% 67.27/67.68 ( converse( X ), converse( Y ) ) }.
% 67.27/67.68 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 67.27/67.68 ) ==> converse( join( X, Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (146966) {G1,W14,D5,L1,V3,M1} { converse( join( meet( X, Y ), Z )
% 67.27/67.68 ) ==> join( converse( meet( Y, X ) ), converse( Z ) ) }.
% 67.27/67.68 parent0[0]: (2855) {G27,W9,D4,L1,V2,M1} P(972,2796);d(2796) { converse(
% 67.27/67.68 meet( Y, X ) ) = converse( meet( X, Y ) ) }.
% 67.27/67.68 parent1[0; 8]: (146964) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) )
% 67.27/67.68 ==> join( converse( X ), converse( Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := meet( X, Y )
% 67.27/67.68 Y := Z
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (146972) {G1,W13,D5,L1,V3,M1} { converse( join( meet( X, Y ), Z )
% 67.27/67.68 ) ==> converse( join( meet( Y, X ), Z ) ) }.
% 67.27/67.68 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 67.27/67.68 ) ==> converse( join( X, Y ) ) }.
% 67.27/67.68 parent1[0; 7]: (146966) {G1,W14,D5,L1,V3,M1} { converse( join( meet( X, Y
% 67.27/67.68 ), Z ) ) ==> join( converse( meet( Y, X ) ), converse( Z ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := meet( Y, X )
% 67.27/67.68 Y := Z
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 Z := Z
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (2918) {G28,W13,D5,L1,V3,M1} P(2855,8);d(8) { converse( join(
% 67.27/67.68 meet( Y, X ), Z ) ) = converse( join( meet( X, Y ), Z ) ) }.
% 67.27/67.68 parent0: (146972) {G1,W13,D5,L1,V3,M1} { converse( join( meet( X, Y ), Z )
% 67.27/67.68 ) ==> converse( join( meet( Y, X ), Z ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 Z := Z
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (146974) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ), Y ) ==>
% 67.27/67.68 join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.27/67.68 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 67.27/67.68 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Z
% 67.27/67.68 Z := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (146976) {G1,W15,D7,L1,V2,M1} { composition( join( complement(
% 67.27/67.68 converse( composition( X, top ) ) ), Y ), X ) ==> join( zero, composition
% 67.27/67.68 ( Y, X ) ) }.
% 67.27/67.68 parent0[0]: (2873) {G28,W9,D6,L1,V1,M1} P(2866,1492) { composition(
% 67.27/67.68 complement( converse( composition( X, top ) ) ), X ) ==> zero }.
% 67.27/67.68 parent1[0; 11]: (146974) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z )
% 67.27/67.68 , Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := complement( converse( composition( X, top ) ) )
% 67.27/67.68 Y := X
% 67.27/67.68 Z := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (146978) {G2,W13,D7,L1,V2,M1} { composition( join( complement(
% 67.27/67.68 converse( composition( X, top ) ) ), Y ), X ) ==> composition( Y, X ) }.
% 67.27/67.68 parent0[0]: (749) {G13,W5,D3,L1,V1,M1} P(715,0);d(748) { join( zero, X )
% 67.27/67.68 ==> X }.
% 67.27/67.68 parent1[0; 10]: (146976) {G1,W15,D7,L1,V2,M1} { composition( join(
% 67.27/67.68 complement( converse( composition( X, top ) ) ), Y ), X ) ==> join( zero
% 67.27/67.68 , composition( Y, X ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := composition( Y, X )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (2971) {G29,W13,D7,L1,V2,M1} P(2873,6);d(749) { composition(
% 67.27/67.68 join( complement( converse( composition( X, top ) ) ), Y ), X ) ==>
% 67.27/67.68 composition( Y, X ) }.
% 67.27/67.68 parent0: (146978) {G2,W13,D7,L1,V2,M1} { composition( join( complement(
% 67.27/67.68 converse( composition( X, top ) ) ), Y ), X ) ==> composition( Y, X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (146981) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ), Y ) ==>
% 67.27/67.68 join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.27/67.68 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 67.27/67.68 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Z
% 67.27/67.68 Z := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (146984) {G1,W15,D7,L1,V2,M1} { composition( join( X, complement
% 67.27/67.68 ( converse( composition( Y, top ) ) ) ), Y ) ==> join( composition( X, Y
% 67.27/67.68 ), zero ) }.
% 67.27/67.68 parent0[0]: (2873) {G28,W9,D6,L1,V1,M1} P(2866,1492) { composition(
% 67.27/67.68 complement( converse( composition( X, top ) ) ), X ) ==> zero }.
% 67.27/67.68 parent1[0; 14]: (146981) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z )
% 67.27/67.68 , Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 Z := complement( converse( composition( Y, top ) ) )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (146985) {G2,W13,D7,L1,V2,M1} { composition( join( X, complement
% 67.27/67.68 ( converse( composition( Y, top ) ) ) ), Y ) ==> composition( X, Y ) }.
% 67.27/67.68 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.27/67.68 }.
% 67.27/67.68 parent1[0; 10]: (146984) {G1,W15,D7,L1,V2,M1} { composition( join( X,
% 67.27/67.68 complement( converse( composition( Y, top ) ) ) ), Y ) ==> join(
% 67.27/67.68 composition( X, Y ), zero ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := composition( X, Y )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (2972) {G29,W13,D7,L1,V2,M1} P(2873,6);d(740) { composition(
% 67.27/67.68 join( Y, complement( converse( composition( X, top ) ) ) ), X ) ==>
% 67.27/67.68 composition( Y, X ) }.
% 67.27/67.68 parent0: (146985) {G2,W13,D7,L1,V2,M1} { composition( join( X, complement
% 67.27/67.68 ( converse( composition( Y, top ) ) ) ), Y ) ==> composition( X, Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (146987) {G24,W10,D5,L1,V2,M1} { X ==> join( X, meet( complement(
% 67.27/67.68 Y ), join( X, Y ) ) ) }.
% 67.27/67.68 parent0[0]: (2741) {G24,W10,D5,L1,V2,M1} P(75,2554) { join( X, meet(
% 67.27/67.68 complement( Y ), join( X, Y ) ) ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (146988) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( complement( Y )
% 67.27/67.68 , join( X, Y ) ), X ) }.
% 67.27/67.68 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.27/67.68 parent1[0; 2]: (146987) {G24,W10,D5,L1,V2,M1} { X ==> join( X, meet(
% 67.27/67.68 complement( Y ), join( X, Y ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := meet( complement( Y ), join( X, Y ) )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (146992) {G1,W10,D5,L1,V2,M1} { join( meet( complement( Y ), join
% 67.27/67.68 ( X, Y ) ), X ) ==> X }.
% 67.27/67.68 parent0[0]: (146988) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( complement(
% 67.27/67.68 Y ), join( X, Y ) ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3021) {G25,W10,D5,L1,V2,M1} P(2741,0) { join( meet(
% 67.27/67.68 complement( Y ), join( X, Y ) ), X ) ==> X }.
% 67.27/67.68 parent0: (146992) {G1,W10,D5,L1,V2,M1} { join( meet( complement( Y ), join
% 67.27/67.68 ( X, Y ) ), X ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (146996) {G25,W10,D5,L1,V2,M1} { Y ==> join( meet( complement( X )
% 67.27/67.68 , join( Y, X ) ), Y ) }.
% 67.27/67.68 parent0[0]: (3021) {G25,W10,D5,L1,V2,M1} P(2741,0) { join( meet( complement
% 67.27/67.68 ( Y ), join( X, Y ) ), X ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (146998) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( complement( Y )
% 67.27/67.68 , join( Y, X ) ), X ) }.
% 67.27/67.68 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 67.27/67.68 parent1[0; 6]: (146996) {G25,W10,D5,L1,V2,M1} { Y ==> join( meet(
% 67.27/67.68 complement( X ), join( Y, X ) ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147004) {G1,W10,D5,L1,V2,M1} { join( meet( complement( Y ), join
% 67.27/67.68 ( Y, X ) ), X ) ==> X }.
% 67.27/67.68 parent0[0]: (146998) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( complement(
% 67.27/67.68 Y ), join( Y, X ) ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3043) {G26,W10,D5,L1,V2,M1} P(0,3021) { join( meet(
% 67.27/67.68 complement( Y ), join( Y, X ) ), X ) ==> X }.
% 67.27/67.68 parent0: (147004) {G1,W10,D5,L1,V2,M1} { join( meet( complement( Y ), join
% 67.27/67.68 ( Y, X ) ), X ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147006) {G26,W10,D5,L1,V2,M1} { Y ==> join( meet( complement( X )
% 67.27/67.68 , join( X, Y ) ), Y ) }.
% 67.27/67.68 parent0[0]: (3043) {G26,W10,D5,L1,V2,M1} P(0,3021) { join( meet( complement
% 67.27/67.68 ( Y ), join( Y, X ) ), X ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147007) {G16,W10,D6,L1,V2,M1} { X ==> join( meet( Y, join(
% 67.27/67.68 complement( Y ), X ) ), X ) }.
% 67.27/67.68 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.68 complement( X ) ) ==> X }.
% 67.27/67.68 parent1[0; 4]: (147006) {G26,W10,D5,L1,V2,M1} { Y ==> join( meet(
% 67.27/67.68 complement( X ), join( X, Y ) ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := complement( Y )
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147008) {G16,W10,D6,L1,V2,M1} { join( meet( Y, join( complement(
% 67.27/67.68 Y ), X ) ), X ) ==> X }.
% 67.27/67.68 parent0[0]: (147007) {G16,W10,D6,L1,V2,M1} { X ==> join( meet( Y, join(
% 67.27/67.68 complement( Y ), X ) ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3061) {G27,W10,D6,L1,V2,M1} P(756,3043) { join( meet( X, join
% 67.27/67.68 ( complement( X ), Y ) ), Y ) ==> Y }.
% 67.27/67.68 parent0: (147008) {G16,W10,D6,L1,V2,M1} { join( meet( Y, join( complement
% 67.27/67.68 ( Y ), X ) ), X ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147009) {G26,W10,D5,L1,V2,M1} { Y ==> join( meet( complement( X )
% 67.27/67.68 , join( X, Y ) ), Y ) }.
% 67.27/67.68 parent0[0]: (3043) {G26,W10,D5,L1,V2,M1} P(0,3021) { join( meet( complement
% 67.27/67.68 ( Y ), join( Y, X ) ), X ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147010) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( join( Y, X ),
% 67.27/67.68 complement( Y ) ), X ) }.
% 67.27/67.68 parent0[0]: (75) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 67.27/67.68 Y ) }.
% 67.27/67.68 parent1[0; 3]: (147009) {G26,W10,D5,L1,V2,M1} { Y ==> join( meet(
% 67.27/67.68 complement( X ), join( X, Y ) ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := join( Y, X )
% 67.27/67.68 Y := complement( Y )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147013) {G2,W10,D5,L1,V2,M1} { join( meet( join( Y, X ),
% 67.27/67.68 complement( Y ) ), X ) ==> X }.
% 67.27/67.68 parent0[0]: (147010) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( join( Y, X )
% 67.27/67.68 , complement( Y ) ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3070) {G27,W10,D5,L1,V2,M1} P(75,3043) { join( meet( join( X
% 67.27/67.68 , Y ), complement( X ) ), Y ) ==> Y }.
% 67.27/67.68 parent0: (147013) {G2,W10,D5,L1,V2,M1} { join( meet( join( Y, X ),
% 67.27/67.68 complement( Y ) ), X ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147015) {G27,W10,D5,L1,V2,M1} { Y ==> join( meet( join( X, Y ),
% 67.27/67.68 complement( X ) ), Y ) }.
% 67.27/67.68 parent0[0]: (3070) {G27,W10,D5,L1,V2,M1} P(75,3043) { join( meet( join( X,
% 67.27/67.68 Y ), complement( X ) ), Y ) ==> Y }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147017) {G20,W15,D7,L1,V2,M1} { meet( X, Y ) ==> join( meet( Y,
% 67.27/67.68 complement( meet( Y, complement( X ) ) ) ), meet( X, Y ) ) }.
% 67.27/67.68 parent0[0]: (1389) {G19,W10,D5,L1,V2,M1} P(1372,0) { join( meet( Y,
% 67.27/67.68 complement( X ) ), meet( X, Y ) ) ==> Y }.
% 67.27/67.68 parent1[0; 6]: (147015) {G27,W10,D5,L1,V2,M1} { Y ==> join( meet( join( X
% 67.27/67.68 , Y ), complement( X ) ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := meet( Y, complement( X ) )
% 67.27/67.68 Y := meet( X, Y )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147018) {G18,W14,D6,L1,V2,M1} { meet( X, Y ) ==> join( meet( Y,
% 67.27/67.68 join( complement( Y ), X ) ), meet( X, Y ) ) }.
% 67.27/67.68 parent0[0]: (951) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet( Y,
% 67.27/67.68 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 67.27/67.68 parent1[0; 7]: (147017) {G20,W15,D7,L1,V2,M1} { meet( X, Y ) ==> join(
% 67.27/67.68 meet( Y, complement( meet( Y, complement( X ) ) ) ), meet( X, Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147019) {G18,W14,D6,L1,V2,M1} { join( meet( Y, join( complement(
% 67.27/67.68 Y ), X ) ), meet( X, Y ) ) ==> meet( X, Y ) }.
% 67.27/67.68 parent0[0]: (147018) {G18,W14,D6,L1,V2,M1} { meet( X, Y ) ==> join( meet(
% 67.27/67.68 Y, join( complement( Y ), X ) ), meet( X, Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3086) {G28,W14,D6,L1,V2,M1} P(1389,3070);d(951) { join( meet
% 67.27/67.68 ( X, join( complement( X ), Y ) ), meet( Y, X ) ) ==> meet( Y, X ) }.
% 67.27/67.68 parent0: (147019) {G18,W14,D6,L1,V2,M1} { join( meet( Y, join( complement
% 67.27/67.68 ( Y ), X ) ), meet( X, Y ) ) ==> meet( X, Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147021) {G16,W10,D5,L1,V2,M1} { meet( X, complement( Y ) ) ==>
% 67.27/67.68 complement( join( complement( X ), Y ) ) }.
% 67.27/67.68 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.68 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147026) {G17,W14,D7,L1,V2,M1} { meet( X, complement( meet(
% 67.27/67.68 complement( complement( X ) ), Y ) ) ) ==> complement( join( Y,
% 67.27/67.68 complement( X ) ) ) }.
% 67.27/67.68 parent0[0]: (2556) {G24,W10,D5,L1,V2,M1} P(309,2510);d(771);d(747);d(902)
% 67.27/67.68 { join( X, meet( complement( X ), Y ) ) ==> join( Y, X ) }.
% 67.27/67.68 parent1[0; 10]: (147021) {G16,W10,D5,L1,V2,M1} { meet( X, complement( Y )
% 67.27/67.68 ) ==> complement( join( complement( X ), Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := complement( X )
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := meet( complement( complement( X ) ), Y )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147027) {G17,W13,D7,L1,V2,M1} { meet( X, complement( meet(
% 67.27/67.68 complement( complement( X ) ), Y ) ) ) ==> meet( complement( Y ), X ) }.
% 67.27/67.68 parent0[0]: (771) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( X,
% 67.27/67.68 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 67.27/67.68 parent1[0; 9]: (147026) {G17,W14,D7,L1,V2,M1} { meet( X, complement( meet
% 67.27/67.68 ( complement( complement( X ) ), Y ) ) ) ==> complement( join( Y,
% 67.27/67.68 complement( X ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147028) {G18,W12,D5,L1,V2,M1} { meet( X, join( complement( X ),
% 67.27/67.68 complement( Y ) ) ) ==> meet( complement( Y ), X ) }.
% 67.27/67.68 parent0[0]: (950) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet(
% 67.27/67.68 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.68 parent1[0; 3]: (147027) {G17,W13,D7,L1,V2,M1} { meet( X, complement( meet
% 67.27/67.68 ( complement( complement( X ) ), Y ) ) ) ==> meet( complement( Y ), X )
% 67.27/67.68 }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := complement( X )
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147029) {G17,W11,D5,L1,V2,M1} { meet( X, complement( meet( X, Y
% 67.27/67.68 ) ) ) ==> meet( complement( Y ), X ) }.
% 67.27/67.68 parent0[0]: (773) {G16,W10,D4,L1,V2,M1} P(3,756) { join( complement( X ),
% 67.27/67.68 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.27/67.68 parent1[0; 3]: (147028) {G18,W12,D5,L1,V2,M1} { meet( X, join( complement
% 67.27/67.68 ( X ), complement( Y ) ) ) ==> meet( complement( Y ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3166) {G25,W11,D5,L1,V2,M1} P(2556,772);d(771);d(950);d(773)
% 67.27/67.68 { meet( X, complement( meet( X, Y ) ) ) ==> meet( complement( Y ), X )
% 67.27/67.68 }.
% 67.27/67.68 parent0: (147029) {G17,W11,D5,L1,V2,M1} { meet( X, complement( meet( X, Y
% 67.27/67.68 ) ) ) ==> meet( complement( Y ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147032) {G16,W10,D5,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 67.27/67.68 complement( join( X, complement( Y ) ) ) }.
% 67.27/67.68 parent0[0]: (771) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( X,
% 67.27/67.68 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147037) {G17,W14,D7,L1,V2,M1} { meet( complement( meet(
% 67.27/67.68 complement( complement( X ) ), Y ) ), X ) ==> complement( join( Y,
% 67.27/67.68 complement( X ) ) ) }.
% 67.27/67.68 parent0[0]: (2564) {G23,W10,D5,L1,V2,M1} P(27,2510);d(771);d(747);d(889) {
% 67.27/67.68 join( meet( complement( X ), Y ), X ) ==> join( Y, X ) }.
% 67.27/67.68 parent1[0; 10]: (147032) {G16,W10,D5,L1,V2,M1} { meet( complement( X ), Y
% 67.27/67.68 ) ==> complement( join( X, complement( Y ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := complement( X )
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := meet( complement( complement( X ) ), Y )
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147038) {G17,W13,D7,L1,V2,M1} { meet( complement( meet(
% 67.27/67.68 complement( complement( X ) ), Y ) ), X ) ==> meet( complement( Y ), X )
% 67.27/67.68 }.
% 67.27/67.68 parent0[0]: (771) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( X,
% 67.27/67.68 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 67.27/67.68 parent1[0; 9]: (147037) {G17,W14,D7,L1,V2,M1} { meet( complement( meet(
% 67.27/67.68 complement( complement( X ) ), Y ) ), X ) ==> complement( join( Y,
% 67.27/67.68 complement( X ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147039) {G18,W12,D5,L1,V2,M1} { meet( join( complement( X ),
% 67.27/67.68 complement( Y ) ), X ) ==> meet( complement( Y ), X ) }.
% 67.27/67.68 parent0[0]: (950) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet(
% 67.27/67.68 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.68 parent1[0; 2]: (147038) {G17,W13,D7,L1,V2,M1} { meet( complement( meet(
% 67.27/67.68 complement( complement( X ) ), Y ) ), X ) ==> meet( complement( Y ), X )
% 67.27/67.68 }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := complement( X )
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147040) {G17,W11,D5,L1,V2,M1} { meet( complement( meet( X, Y ) )
% 67.27/67.68 , X ) ==> meet( complement( Y ), X ) }.
% 67.27/67.68 parent0[0]: (773) {G16,W10,D4,L1,V2,M1} P(3,756) { join( complement( X ),
% 67.27/67.68 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.27/67.68 parent1[0; 2]: (147039) {G18,W12,D5,L1,V2,M1} { meet( join( complement( X
% 67.27/67.68 ), complement( Y ) ), X ) ==> meet( complement( Y ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3177) {G24,W11,D5,L1,V2,M1} P(2564,771);d(771);d(950);d(773)
% 67.27/67.68 { meet( complement( meet( X, Y ) ), X ) ==> meet( complement( Y ), X )
% 67.27/67.68 }.
% 67.27/67.68 parent0: (147040) {G17,W11,D5,L1,V2,M1} { meet( complement( meet( X, Y ) )
% 67.27/67.68 , X ) ==> meet( complement( Y ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147043) {G22,W10,D6,L1,V2,M1} { zero ==> meet( converse( X ),
% 67.27/67.68 complement( converse( join( X, Y ) ) ) ) }.
% 67.27/67.68 parent0[0]: (1104) {G22,W10,D6,L1,V2,M1} P(8,1034) { meet( converse( X ),
% 67.27/67.68 complement( converse( join( X, Y ) ) ) ) ==> zero }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147048) {G2,W16,D8,L1,V2,M1} { zero ==> meet( converse(
% 67.27/67.68 composition( X, complement( converse( composition( Y, X ) ) ) ) ),
% 67.27/67.68 complement( converse( complement( converse( Y ) ) ) ) ) }.
% 67.27/67.68 parent0[0]: (110) {G1,W15,D7,L1,V2,M1} P(9,10);d(7) { join( composition( X
% 67.27/67.68 , complement( converse( composition( Y, X ) ) ) ), complement( converse(
% 67.27/67.68 Y ) ) ) ==> complement( converse( Y ) ) }.
% 67.27/67.68 parent1[0; 13]: (147043) {G22,W10,D6,L1,V2,M1} { zero ==> meet( converse(
% 67.27/67.68 X ), complement( converse( join( X, Y ) ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := composition( X, complement( converse( composition( Y, X ) ) ) )
% 67.27/67.68 Y := complement( converse( Y ) )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147049) {G3,W15,D7,L1,V2,M1} { zero ==> meet( composition(
% 67.27/67.68 complement( composition( Y, X ) ), converse( X ) ), complement( converse
% 67.27/67.68 ( complement( converse( Y ) ) ) ) ) }.
% 67.27/67.68 parent0[0]: (2891) {G28,W12,D6,L1,V2,M1} P(2866,16) { converse( composition
% 67.27/67.68 ( Y, complement( converse( X ) ) ) ) ==> composition( complement( X ),
% 67.27/67.68 converse( Y ) ) }.
% 67.27/67.68 parent1[0; 3]: (147048) {G2,W16,D8,L1,V2,M1} { zero ==> meet( converse(
% 67.27/67.68 composition( X, complement( converse( composition( Y, X ) ) ) ) ),
% 67.27/67.68 complement( converse( complement( converse( Y ) ) ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := composition( Y, X )
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147050) {G4,W15,D7,L1,V2,M1} { zero ==> meet( composition(
% 67.27/67.68 complement( composition( X, Y ) ), converse( Y ) ), complement(
% 67.27/67.68 complement( converse( converse( X ) ) ) ) ) }.
% 67.27/67.68 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.68 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.68 parent1[0; 11]: (147049) {G3,W15,D7,L1,V2,M1} { zero ==> meet( composition
% 67.27/67.68 ( complement( composition( Y, X ) ), converse( X ) ), complement(
% 67.27/67.68 converse( complement( converse( Y ) ) ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := converse( X )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147051) {G5,W13,D6,L1,V2,M1} { zero ==> meet( composition(
% 67.27/67.68 complement( composition( X, Y ) ), converse( Y ) ), converse( converse( X
% 67.27/67.68 ) ) ) }.
% 67.27/67.68 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.68 complement( X ) ) ==> X }.
% 67.27/67.68 parent1[0; 10]: (147050) {G4,W15,D7,L1,V2,M1} { zero ==> meet( composition
% 67.27/67.68 ( complement( composition( X, Y ) ), converse( Y ) ), complement(
% 67.27/67.68 complement( converse( converse( X ) ) ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := converse( converse( X ) )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147052) {G1,W11,D6,L1,V2,M1} { zero ==> meet( composition(
% 67.27/67.68 complement( composition( X, Y ) ), converse( Y ) ), X ) }.
% 67.27/67.68 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.27/67.68 parent1[0; 10]: (147051) {G5,W13,D6,L1,V2,M1} { zero ==> meet( composition
% 67.27/67.68 ( complement( composition( X, Y ) ), converse( Y ) ), converse( converse
% 67.27/67.68 ( X ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147053) {G1,W11,D6,L1,V2,M1} { meet( composition( complement(
% 67.27/67.68 composition( X, Y ) ), converse( Y ) ), X ) ==> zero }.
% 67.27/67.68 parent0[0]: (147052) {G1,W11,D6,L1,V2,M1} { zero ==> meet( composition(
% 67.27/67.68 complement( composition( X, Y ) ), converse( Y ) ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3386) {G29,W11,D6,L1,V2,M1} P(110,1104);d(2891);d(2866);d(756
% 67.27/67.68 );d(7) { meet( composition( complement( composition( Y, X ) ), converse(
% 67.27/67.68 X ) ), Y ) ==> zero }.
% 67.27/67.68 parent0: (147053) {G1,W11,D6,L1,V2,M1} { meet( composition( complement(
% 67.27/67.68 composition( X, Y ) ), converse( Y ) ), X ) ==> zero }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147055) {G5,W11,D4,L1,V2,M1} { composition( join( one, Y ), X ) =
% 67.27/67.68 join( X, composition( Y, X ) ) }.
% 67.27/67.68 parent0[0]: (192) {G5,W11,D4,L1,V2,M1} P(187,6) { join( X, composition( Y,
% 67.27/67.68 X ) ) = composition( join( one, Y ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147056) {G6,W9,D4,L1,V1,M1} { composition( top, X ) = join( X,
% 67.27/67.68 composition( top, X ) ) }.
% 67.27/67.68 parent0[0]: (215) {G9,W5,D3,L1,V1,M1} P(199,37);d(38);d(209) { join( X, top
% 67.27/67.68 ) ==> top }.
% 67.27/67.68 parent1[0; 2]: (147055) {G5,W11,D4,L1,V2,M1} { composition( join( one, Y )
% 67.27/67.68 , X ) = join( X, composition( Y, X ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := one
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := top
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147057) {G6,W9,D4,L1,V1,M1} { join( X, composition( top, X ) ) =
% 67.27/67.68 composition( top, X ) }.
% 67.27/67.68 parent0[0]: (147056) {G6,W9,D4,L1,V1,M1} { composition( top, X ) = join( X
% 67.27/67.68 , composition( top, X ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3511) {G10,W9,D4,L1,V1,M1} P(215,192) { join( X, composition
% 67.27/67.68 ( top, X ) ) ==> composition( top, X ) }.
% 67.27/67.68 parent0: (147057) {G6,W9,D4,L1,V1,M1} { join( X, composition( top, X ) ) =
% 67.27/67.68 composition( top, X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147059) {G5,W11,D4,L1,V2,M1} { composition( join( X, one ), Y ) =
% 67.27/67.68 join( composition( X, Y ), Y ) }.
% 67.27/67.68 parent0[0]: (193) {G5,W11,D4,L1,V2,M1} P(187,6) { join( composition( Y, X )
% 67.27/67.68 , X ) = composition( join( Y, one ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147061) {G6,W11,D5,L1,V2,M1} { composition( one, Y ) = join(
% 67.27/67.68 composition( meet( one, X ), Y ), Y ) }.
% 67.27/67.68 parent0[0]: (881) {G20,W7,D4,L1,V2,M1} P(851,0) { join( meet( X, Y ), X )
% 67.27/67.68 ==> X }.
% 67.27/67.68 parent1[0; 2]: (147059) {G5,W11,D4,L1,V2,M1} { composition( join( X, one )
% 67.27/67.68 , Y ) = join( composition( X, Y ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := one
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := meet( one, X )
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147062) {G5,W9,D5,L1,V2,M1} { X = join( composition( meet( one,
% 67.27/67.68 Y ), X ), X ) }.
% 67.27/67.68 parent0[0]: (187) {G4,W5,D3,L1,V1,M1} P(186,180) { composition( one, X )
% 67.27/67.68 ==> X }.
% 67.27/67.68 parent1[0; 1]: (147061) {G6,W11,D5,L1,V2,M1} { composition( one, Y ) =
% 67.27/67.68 join( composition( meet( one, X ), Y ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147063) {G5,W9,D5,L1,V2,M1} { join( composition( meet( one, Y ),
% 67.27/67.68 X ), X ) = X }.
% 67.27/67.68 parent0[0]: (147062) {G5,W9,D5,L1,V2,M1} { X = join( composition( meet(
% 67.27/67.68 one, Y ), X ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3624) {G21,W9,D5,L1,V2,M1} P(881,193);d(187) { join(
% 67.27/67.68 composition( meet( one, X ), Y ), Y ) ==> Y }.
% 67.27/67.68 parent0: (147063) {G5,W9,D5,L1,V2,M1} { join( composition( meet( one, Y )
% 67.27/67.68 , X ), X ) = X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147065) {G5,W11,D4,L1,V2,M1} { composition( join( X, one ), Y ) =
% 67.27/67.68 join( composition( X, Y ), Y ) }.
% 67.27/67.68 parent0[0]: (193) {G5,W11,D4,L1,V2,M1} P(187,6) { join( composition( Y, X )
% 67.27/67.68 , X ) = composition( join( Y, one ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147067) {G6,W11,D5,L1,V2,M1} { composition( one, Y ) = join(
% 67.27/67.68 composition( meet( X, one ), Y ), Y ) }.
% 67.27/67.68 parent0[0]: (898) {G22,W7,D4,L1,V2,M1} P(866,0) { join( meet( Y, X ), X )
% 67.27/67.68 ==> X }.
% 67.27/67.68 parent1[0; 2]: (147065) {G5,W11,D4,L1,V2,M1} { composition( join( X, one )
% 67.27/67.68 , Y ) = join( composition( X, Y ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := one
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := meet( X, one )
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147068) {G5,W9,D5,L1,V2,M1} { X = join( composition( meet( Y,
% 67.27/67.68 one ), X ), X ) }.
% 67.27/67.68 parent0[0]: (187) {G4,W5,D3,L1,V1,M1} P(186,180) { composition( one, X )
% 67.27/67.68 ==> X }.
% 67.27/67.68 parent1[0; 1]: (147067) {G6,W11,D5,L1,V2,M1} { composition( one, Y ) =
% 67.27/67.68 join( composition( meet( X, one ), Y ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147069) {G5,W9,D5,L1,V2,M1} { join( composition( meet( Y, one ),
% 67.27/67.68 X ), X ) = X }.
% 67.27/67.68 parent0[0]: (147068) {G5,W9,D5,L1,V2,M1} { X = join( composition( meet( Y
% 67.27/67.68 , one ), X ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3625) {G23,W9,D5,L1,V2,M1} P(898,193);d(187) { join(
% 67.27/67.68 composition( meet( X, one ), Y ), Y ) ==> Y }.
% 67.27/67.68 parent0: (147069) {G5,W9,D5,L1,V2,M1} { join( composition( meet( Y, one )
% 67.27/67.68 , X ), X ) = X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147071) {G5,W11,D4,L1,V2,M1} { composition( join( X, one ), Y ) =
% 67.27/67.68 join( composition( X, Y ), Y ) }.
% 67.27/67.68 parent0[0]: (193) {G5,W11,D4,L1,V2,M1} P(187,6) { join( composition( Y, X )
% 67.27/67.68 , X ) = composition( join( Y, one ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147072) {G6,W9,D4,L1,V1,M1} { composition( top, X ) = join(
% 67.27/67.68 composition( top, X ), X ) }.
% 67.27/67.68 parent0[0]: (214) {G9,W5,D3,L1,V1,M1} P(199,36);d(209) { join( top, X ) ==>
% 67.27/67.68 top }.
% 67.27/67.68 parent1[0; 2]: (147071) {G5,W11,D4,L1,V2,M1} { composition( join( X, one )
% 67.27/67.68 , Y ) = join( composition( X, Y ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := one
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := top
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147073) {G6,W9,D4,L1,V1,M1} { join( composition( top, X ), X ) =
% 67.27/67.68 composition( top, X ) }.
% 67.27/67.68 parent0[0]: (147072) {G6,W9,D4,L1,V1,M1} { composition( top, X ) = join(
% 67.27/67.68 composition( top, X ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3640) {G10,W9,D4,L1,V1,M1} P(214,193) { join( composition(
% 67.27/67.68 top, X ), X ) ==> composition( top, X ) }.
% 67.27/67.68 parent0: (147073) {G6,W9,D4,L1,V1,M1} { join( composition( top, X ), X ) =
% 67.27/67.68 composition( top, X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147075) {G5,W11,D4,L1,V2,M1} { composition( join( X, one ), Y ) =
% 67.27/67.68 join( composition( X, Y ), Y ) }.
% 67.27/67.68 parent0[0]: (193) {G5,W11,D4,L1,V2,M1} P(187,6) { join( composition( Y, X )
% 67.27/67.68 , X ) = composition( join( Y, one ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147076) {G2,W10,D5,L1,V1,M1} { composition( top, X ) = join(
% 67.27/67.68 composition( complement( one ), X ), X ) }.
% 67.27/67.68 parent0[0]: (15) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X )
% 67.27/67.68 ==> top }.
% 67.27/67.68 parent1[0; 2]: (147075) {G5,W11,D4,L1,V2,M1} { composition( join( X, one )
% 67.27/67.68 , Y ) = join( composition( X, Y ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := one
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := complement( one )
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147077) {G2,W10,D5,L1,V1,M1} { join( composition( complement( one
% 67.27/67.68 ), X ), X ) = composition( top, X ) }.
% 67.27/67.68 parent0[0]: (147076) {G2,W10,D5,L1,V1,M1} { composition( top, X ) = join(
% 67.27/67.68 composition( complement( one ), X ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3644) {G6,W10,D5,L1,V1,M1} P(15,193) { join( composition(
% 67.27/67.68 complement( one ), X ), X ) ==> composition( top, X ) }.
% 67.27/67.68 parent0: (147077) {G2,W10,D5,L1,V1,M1} { join( composition( complement(
% 67.27/67.68 one ), X ), X ) = composition( top, X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147079) {G27,W10,D6,L1,V3,M1} { zero ==> meet( meet( X,
% 67.27/67.68 complement( join( Y, Z ) ) ), Z ) }.
% 67.27/67.68 parent0[0]: (1774) {G27,W10,D6,L1,V3,M1} P(1598,1748);d(756) { meet( meet(
% 67.27/67.68 Z, complement( join( X, Y ) ) ), Y ) ==> zero }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := Z
% 67.27/67.68 Z := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147080) {G11,W10,D6,L1,V2,M1} { zero ==> meet( meet( X,
% 67.27/67.68 complement( composition( top, Y ) ) ), Y ) }.
% 67.27/67.68 parent0[0]: (3640) {G10,W9,D4,L1,V1,M1} P(214,193) { join( composition( top
% 67.27/67.68 , X ), X ) ==> composition( top, X ) }.
% 67.27/67.68 parent1[0; 6]: (147079) {G27,W10,D6,L1,V3,M1} { zero ==> meet( meet( X,
% 67.27/67.68 complement( join( Y, Z ) ) ), Z ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := composition( top, Y )
% 67.27/67.68 Z := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147081) {G11,W10,D6,L1,V2,M1} { meet( meet( X, complement(
% 67.27/67.68 composition( top, Y ) ) ), Y ) ==> zero }.
% 67.27/67.68 parent0[0]: (147080) {G11,W10,D6,L1,V2,M1} { zero ==> meet( meet( X,
% 67.27/67.68 complement( composition( top, Y ) ) ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3654) {G28,W10,D6,L1,V2,M1} P(3640,1774) { meet( meet( Y,
% 67.27/67.68 complement( composition( top, X ) ) ), X ) ==> zero }.
% 67.27/67.68 parent0: (147081) {G11,W10,D6,L1,V2,M1} { meet( meet( X, complement(
% 67.27/67.68 composition( top, Y ) ) ), Y ) ==> zero }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147083) {G20,W7,D4,L1,V2,M1} { X ==> meet( X, join( Y, X ) ) }.
% 67.27/67.68 parent0[0]: (1043) {G20,W7,D4,L1,V2,M1} P(0,1025) { meet( X, join( Y, X ) )
% 67.27/67.68 ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147084) {G11,W7,D4,L1,V1,M1} { X ==> meet( X, composition( top,
% 67.27/67.68 X ) ) }.
% 67.27/67.68 parent0[0]: (3640) {G10,W9,D4,L1,V1,M1} P(214,193) { join( composition( top
% 67.27/67.68 , X ), X ) ==> composition( top, X ) }.
% 67.27/67.68 parent1[0; 4]: (147083) {G20,W7,D4,L1,V2,M1} { X ==> meet( X, join( Y, X )
% 67.27/67.68 ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := composition( top, X )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147085) {G11,W7,D4,L1,V1,M1} { meet( X, composition( top, X ) )
% 67.27/67.68 ==> X }.
% 67.27/67.68 parent0[0]: (147084) {G11,W7,D4,L1,V1,M1} { X ==> meet( X, composition(
% 67.27/67.68 top, X ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3669) {G21,W7,D4,L1,V1,M1} P(3640,1043) { meet( X,
% 67.27/67.68 composition( top, X ) ) ==> X }.
% 67.27/67.68 parent0: (147085) {G11,W7,D4,L1,V1,M1} { meet( X, composition( top, X ) )
% 67.27/67.68 ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147087) {G10,W8,D4,L1,V2,M1} { top ==> join( join( X, Y ),
% 67.27/67.68 complement( Y ) ) }.
% 67.27/67.68 parent0[0]: (1021) {G10,W8,D4,L1,V2,M1} S(31);d(215) { join( join( Y, X ),
% 67.27/67.68 complement( X ) ) ==> top }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147088) {G11,W8,D4,L1,V1,M1} { top ==> join( composition( top, X
% 67.27/67.68 ), complement( X ) ) }.
% 67.27/67.68 parent0[0]: (3640) {G10,W9,D4,L1,V1,M1} P(214,193) { join( composition( top
% 67.27/67.68 , X ), X ) ==> composition( top, X ) }.
% 67.27/67.68 parent1[0; 3]: (147087) {G10,W8,D4,L1,V2,M1} { top ==> join( join( X, Y )
% 67.27/67.68 , complement( Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := composition( top, X )
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147089) {G11,W8,D4,L1,V1,M1} { join( composition( top, X ),
% 67.27/67.68 complement( X ) ) ==> top }.
% 67.27/67.68 parent0[0]: (147088) {G11,W8,D4,L1,V1,M1} { top ==> join( composition( top
% 67.27/67.68 , X ), complement( X ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3671) {G11,W8,D4,L1,V1,M1} P(3640,1021) { join( composition(
% 67.27/67.68 top, X ), complement( X ) ) ==> top }.
% 67.27/67.68 parent0: (147089) {G11,W8,D4,L1,V1,M1} { join( composition( top, X ),
% 67.27/67.68 complement( X ) ) ==> top }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147091) {G4,W10,D5,L1,V2,M1} { top ==> join( join( X, Y ),
% 67.27/67.68 complement( join( Y, X ) ) ) }.
% 67.27/67.68 parent0[0]: (626) {G4,W10,D5,L1,V2,M1} P(308,30) { join( join( X, Y ),
% 67.27/67.68 complement( join( Y, X ) ) ) ==> top }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147093) {G5,W12,D6,L1,V1,M1} { top ==> join( composition( top, X
% 67.27/67.68 ), complement( join( X, composition( top, X ) ) ) ) }.
% 67.27/67.68 parent0[0]: (3640) {G10,W9,D4,L1,V1,M1} P(214,193) { join( composition( top
% 67.27/67.68 , X ), X ) ==> composition( top, X ) }.
% 67.27/67.68 parent1[0; 3]: (147091) {G4,W10,D5,L1,V2,M1} { top ==> join( join( X, Y )
% 67.27/67.68 , complement( join( Y, X ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := composition( top, X )
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147095) {G6,W8,D4,L1,V1,M1} { top ==> join( complement( X ),
% 67.27/67.68 composition( top, X ) ) }.
% 67.27/67.68 parent0[0]: (2730) {G24,W11,D5,L1,V2,M1} P(308,2554);d(747);d(966);d(1032)
% 67.27/67.68 { join( X, complement( join( Y, X ) ) ) ==> join( complement( Y ), X )
% 67.27/67.68 }.
% 67.27/67.68 parent1[0; 2]: (147093) {G5,W12,D6,L1,V1,M1} { top ==> join( composition(
% 67.27/67.68 top, X ), complement( join( X, composition( top, X ) ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := composition( top, X )
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147096) {G6,W8,D4,L1,V1,M1} { join( complement( X ), composition
% 67.27/67.68 ( top, X ) ) ==> top }.
% 67.27/67.68 parent0[0]: (147095) {G6,W8,D4,L1,V1,M1} { top ==> join( complement( X ),
% 67.27/67.68 composition( top, X ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3675) {G25,W8,D4,L1,V1,M1} P(3640,626);d(2730) { join(
% 67.27/67.68 complement( X ), composition( top, X ) ) ==> top }.
% 67.27/67.68 parent0: (147096) {G6,W8,D4,L1,V1,M1} { join( complement( X ), composition
% 67.27/67.68 ( top, X ) ) ==> top }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147098) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y ) ==>
% 67.27/67.68 converse( join( X, converse( Y ) ) ) }.
% 67.27/67.68 parent0[0]: (20) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 67.27/67.68 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147101) {G2,W13,D6,L1,V1,M1} { join( converse( composition( top
% 67.27/67.68 , converse( X ) ) ), X ) ==> converse( composition( top, converse( X ) )
% 67.27/67.68 ) }.
% 67.27/67.68 parent0[0]: (3640) {G10,W9,D4,L1,V1,M1} P(214,193) { join( composition( top
% 67.27/67.68 , X ), X ) ==> composition( top, X ) }.
% 67.27/67.68 parent1[0; 9]: (147098) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y )
% 67.27/67.68 ==> converse( join( X, converse( Y ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := converse( X )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := composition( top, converse( X ) )
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147103) {G2,W12,D6,L1,V1,M1} { join( converse( composition( top
% 67.27/67.68 , converse( X ) ) ), X ) ==> composition( X, converse( top ) ) }.
% 67.27/67.68 parent0[0]: (16) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 67.27/67.68 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 67.27/67.68 parent1[0; 8]: (147101) {G2,W13,D6,L1,V1,M1} { join( converse( composition
% 67.27/67.68 ( top, converse( X ) ) ), X ) ==> converse( composition( top, converse( X
% 67.27/67.68 ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := top
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147104) {G2,W11,D5,L1,V1,M1} { join( composition( X, converse(
% 67.27/67.68 top ) ), X ) ==> composition( X, converse( top ) ) }.
% 67.27/67.68 parent0[0]: (16) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 67.27/67.68 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 67.27/67.68 parent1[0; 2]: (147103) {G2,W12,D6,L1,V1,M1} { join( converse( composition
% 67.27/67.68 ( top, converse( X ) ) ), X ) ==> composition( X, converse( top ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := top
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147108) {G3,W10,D5,L1,V1,M1} { join( composition( X, converse(
% 67.27/67.68 top ) ), X ) ==> composition( X, top ) }.
% 67.27/67.68 parent0[0]: (223) {G10,W4,D3,L1,V0,M1} P(214,59) { converse( top ) ==> top
% 67.27/67.68 }.
% 67.27/67.68 parent1[0; 9]: (147104) {G2,W11,D5,L1,V1,M1} { join( composition( X,
% 67.27/67.68 converse( top ) ), X ) ==> composition( X, converse( top ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147109) {G4,W9,D4,L1,V1,M1} { join( composition( X, top ), X )
% 67.27/67.68 ==> composition( X, top ) }.
% 67.27/67.68 parent0[0]: (223) {G10,W4,D3,L1,V0,M1} P(214,59) { converse( top ) ==> top
% 67.27/67.68 }.
% 67.27/67.68 parent1[0; 4]: (147108) {G3,W10,D5,L1,V1,M1} { join( composition( X,
% 67.27/67.68 converse( top ) ), X ) ==> composition( X, top ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3681) {G11,W9,D4,L1,V1,M1} P(3640,20);d(16);d(223) { join(
% 67.27/67.68 composition( X, top ), X ) ==> composition( X, top ) }.
% 67.27/67.68 parent0: (147109) {G4,W9,D4,L1,V1,M1} { join( composition( X, top ), X )
% 67.27/67.68 ==> composition( X, top ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147114) {G23,W9,D5,L1,V3,M1} { X ==> join( X, meet( Y, meet( Z, X
% 67.27/67.68 ) ) ) }.
% 67.27/67.68 parent0[0]: (2522) {G23,W9,D5,L1,V3,M1} P(1001,2510);d(747) { join( X, meet
% 67.27/67.68 ( Y, meet( Z, X ) ) ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 Z := Z
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147115) {G22,W11,D4,L1,V2,M1} { composition( top, X ) ==> join(
% 67.27/67.68 composition( top, X ), meet( Y, X ) ) }.
% 67.27/67.68 parent0[0]: (3669) {G21,W7,D4,L1,V1,M1} P(3640,1043) { meet( X, composition
% 67.27/67.68 ( top, X ) ) ==> X }.
% 67.27/67.68 parent1[0; 10]: (147114) {G23,W9,D5,L1,V3,M1} { X ==> join( X, meet( Y,
% 67.27/67.68 meet( Z, X ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := composition( top, X )
% 67.27/67.68 Y := Y
% 67.27/67.68 Z := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147116) {G22,W11,D4,L1,V2,M1} { join( composition( top, X ), meet
% 67.27/67.68 ( Y, X ) ) ==> composition( top, X ) }.
% 67.27/67.68 parent0[0]: (147115) {G22,W11,D4,L1,V2,M1} { composition( top, X ) ==>
% 67.27/67.68 join( composition( top, X ), meet( Y, X ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3684) {G24,W11,D4,L1,V2,M1} P(3669,2522) { join( composition
% 67.27/67.68 ( top, X ), meet( Y, X ) ) ==> composition( top, X ) }.
% 67.27/67.68 parent0: (147116) {G22,W11,D4,L1,V2,M1} { join( composition( top, X ),
% 67.27/67.68 meet( Y, X ) ) ==> composition( top, X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147117) {G11,W8,D4,L1,V1,M1} { top ==> join( composition( top, X
% 67.27/67.68 ), complement( X ) ) }.
% 67.27/67.68 parent0[0]: (3671) {G11,W8,D4,L1,V1,M1} P(3640,1021) { join( composition(
% 67.27/67.68 top, X ), complement( X ) ) ==> top }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147118) {G12,W12,D5,L1,V2,M1} { top ==> join( composition( top,
% 67.27/67.68 meet( X, Y ) ), complement( meet( Y, X ) ) ) }.
% 67.27/67.68 parent0[0]: (972) {G17,W9,D4,L1,V2,M1} P(773,0);d(773) { complement( meet(
% 67.27/67.68 X, Y ) ) = complement( meet( Y, X ) ) }.
% 67.27/67.68 parent1[0; 8]: (147117) {G11,W8,D4,L1,V1,M1} { top ==> join( composition(
% 67.27/67.68 top, X ), complement( X ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := meet( X, Y )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147121) {G12,W12,D5,L1,V2,M1} { join( composition( top, meet( X,
% 67.27/67.68 Y ) ), complement( meet( Y, X ) ) ) ==> top }.
% 67.27/67.68 parent0[0]: (147118) {G12,W12,D5,L1,V2,M1} { top ==> join( composition(
% 67.27/67.68 top, meet( X, Y ) ), complement( meet( Y, X ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3706) {G18,W12,D5,L1,V2,M1} P(972,3671) { join( composition(
% 67.27/67.68 top, meet( X, Y ) ), complement( meet( Y, X ) ) ) ==> top }.
% 67.27/67.68 parent0: (147121) {G12,W12,D5,L1,V2,M1} { join( composition( top, meet( X
% 67.27/67.68 , Y ) ), complement( meet( Y, X ) ) ) ==> top }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147123) {G25,W8,D4,L1,V1,M1} { top ==> join( complement( X ),
% 67.27/67.68 composition( top, X ) ) }.
% 67.27/67.68 parent0[0]: (3675) {G25,W8,D4,L1,V1,M1} P(3640,626);d(2730) { join(
% 67.27/67.68 complement( X ), composition( top, X ) ) ==> top }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147124) {G16,W8,D5,L1,V1,M1} { top ==> join( X, composition( top
% 67.27/67.68 , complement( X ) ) ) }.
% 67.27/67.68 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.68 complement( X ) ) ==> X }.
% 67.27/67.68 parent1[0; 3]: (147123) {G25,W8,D4,L1,V1,M1} { top ==> join( complement( X
% 67.27/67.68 ), composition( top, X ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := complement( X )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147125) {G16,W8,D5,L1,V1,M1} { join( X, composition( top,
% 67.27/67.68 complement( X ) ) ) ==> top }.
% 67.27/67.68 parent0[0]: (147124) {G16,W8,D5,L1,V1,M1} { top ==> join( X, composition(
% 67.27/67.68 top, complement( X ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3715) {G26,W8,D5,L1,V1,M1} P(756,3675) { join( X, composition
% 67.27/67.68 ( top, complement( X ) ) ) ==> top }.
% 67.27/67.68 parent0: (147125) {G16,W8,D5,L1,V1,M1} { join( X, composition( top,
% 67.27/67.68 complement( X ) ) ) ==> top }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147127) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) ) ==>
% 67.27/67.68 converse( join( converse( X ), Y ) ) }.
% 67.27/67.68 parent0[0]: (19) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 67.27/67.68 ), Y ) ) ==> join( X, converse( Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147131) {G2,W11,D7,L1,V1,M1} { join( X, converse( composition(
% 67.27/67.68 top, complement( converse( X ) ) ) ) ) ==> converse( top ) }.
% 67.27/67.68 parent0[0]: (3715) {G26,W8,D5,L1,V1,M1} P(756,3675) { join( X, composition
% 67.27/67.68 ( top, complement( X ) ) ) ==> top }.
% 67.27/67.68 parent1[0; 10]: (147127) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) )
% 67.27/67.68 ==> converse( join( converse( X ), Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := converse( X )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := composition( top, complement( converse( X ) ) )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147132) {G3,W10,D7,L1,V1,M1} { join( X, converse( composition(
% 67.27/67.68 top, complement( converse( X ) ) ) ) ) ==> top }.
% 67.27/67.68 parent0[0]: (223) {G10,W4,D3,L1,V0,M1} P(214,59) { converse( top ) ==> top
% 67.27/67.68 }.
% 67.27/67.68 parent1[0; 9]: (147131) {G2,W11,D7,L1,V1,M1} { join( X, converse(
% 67.27/67.68 composition( top, complement( converse( X ) ) ) ) ) ==> converse( top )
% 67.27/67.68 }.
% 67.27/67.68 substitution0:
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147133) {G4,W9,D5,L1,V1,M1} { join( X, composition( complement(
% 67.27/67.68 X ), converse( top ) ) ) ==> top }.
% 67.27/67.68 parent0[0]: (2891) {G28,W12,D6,L1,V2,M1} P(2866,16) { converse( composition
% 67.27/67.68 ( Y, complement( converse( X ) ) ) ) ==> composition( complement( X ),
% 67.27/67.68 converse( Y ) ) }.
% 67.27/67.68 parent1[0; 3]: (147132) {G3,W10,D7,L1,V1,M1} { join( X, converse(
% 67.27/67.68 composition( top, complement( converse( X ) ) ) ) ) ==> top }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := top
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147134) {G5,W8,D5,L1,V1,M1} { join( X, composition( complement(
% 67.27/67.68 X ), top ) ) ==> top }.
% 67.27/67.68 parent0[0]: (223) {G10,W4,D3,L1,V0,M1} P(214,59) { converse( top ) ==> top
% 67.27/67.68 }.
% 67.27/67.68 parent1[0; 6]: (147133) {G4,W9,D5,L1,V1,M1} { join( X, composition(
% 67.27/67.68 complement( X ), converse( top ) ) ) ==> top }.
% 67.27/67.68 substitution0:
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3731) {G29,W8,D5,L1,V1,M1} P(3715,19);d(223);d(2891);d(223)
% 67.27/67.68 { join( X, composition( complement( X ), top ) ) ==> top }.
% 67.27/67.68 parent0: (147134) {G5,W8,D5,L1,V1,M1} { join( X, composition( complement(
% 67.27/67.68 X ), top ) ) ==> top }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147137) {G27,W10,D6,L1,V2,M1} { Y ==> join( meet( X, join(
% 67.27/67.68 complement( X ), Y ) ), Y ) }.
% 67.27/67.68 parent0[0]: (3061) {G27,W10,D6,L1,V2,M1} P(756,3043) { join( meet( X, join
% 67.27/67.68 ( complement( X ), Y ) ), Y ) ==> Y }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147140) {G28,W15,D6,L1,V1,M1} { composition( complement(
% 67.27/67.68 complement( X ) ), top ) ==> join( meet( X, top ), composition(
% 67.27/67.68 complement( complement( X ) ), top ) ) }.
% 67.27/67.68 parent0[0]: (3731) {G29,W8,D5,L1,V1,M1} P(3715,19);d(223);d(2891);d(223) {
% 67.27/67.68 join( X, composition( complement( X ), top ) ) ==> top }.
% 67.27/67.68 parent1[0; 9]: (147137) {G27,W10,D6,L1,V2,M1} { Y ==> join( meet( X, join
% 67.27/67.68 ( complement( X ), Y ) ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := complement( X )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := composition( complement( complement( X ) ), top )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147141) {G15,W13,D6,L1,V1,M1} { composition( complement(
% 67.27/67.68 complement( X ) ), top ) ==> join( X, composition( complement( complement
% 67.27/67.68 ( X ) ), top ) ) }.
% 67.27/67.68 parent0[0]: (752) {G14,W5,D3,L1,V1,M1} P(751,48);d(749);d(79) { meet( X,
% 67.27/67.68 top ) ==> X }.
% 67.27/67.68 parent1[0; 7]: (147140) {G28,W15,D6,L1,V1,M1} { composition( complement(
% 67.27/67.68 complement( X ) ), top ) ==> join( meet( X, top ), composition(
% 67.27/67.68 complement( complement( X ) ), top ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147143) {G16,W11,D5,L1,V1,M1} { composition( complement(
% 67.27/67.68 complement( X ) ), top ) ==> join( X, composition( X, top ) ) }.
% 67.27/67.68 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.68 complement( X ) ) ==> X }.
% 67.27/67.68 parent1[0; 9]: (147141) {G15,W13,D6,L1,V1,M1} { composition( complement(
% 67.27/67.68 complement( X ) ), top ) ==> join( X, composition( complement( complement
% 67.27/67.68 ( X ) ), top ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147144) {G16,W9,D4,L1,V1,M1} { composition( X, top ) ==> join( X
% 67.27/67.68 , composition( X, top ) ) }.
% 67.27/67.68 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.68 complement( X ) ) ==> X }.
% 67.27/67.68 parent1[0; 2]: (147143) {G16,W11,D5,L1,V1,M1} { composition( complement(
% 67.27/67.68 complement( X ) ), top ) ==> join( X, composition( X, top ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147146) {G16,W9,D4,L1,V1,M1} { join( X, composition( X, top ) )
% 67.27/67.68 ==> composition( X, top ) }.
% 67.27/67.68 parent0[0]: (147144) {G16,W9,D4,L1,V1,M1} { composition( X, top ) ==> join
% 67.27/67.68 ( X, composition( X, top ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3733) {G30,W9,D4,L1,V1,M1} P(3731,3061);d(752);d(756) { join
% 67.27/67.68 ( X, composition( X, top ) ) ==> composition( X, top ) }.
% 67.27/67.68 parent0: (147146) {G16,W9,D4,L1,V1,M1} { join( X, composition( X, top ) )
% 67.27/67.68 ==> composition( X, top ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147149) {G24,W10,D5,L1,V2,M1} { X ==> join( meet( join( X, Y ),
% 67.27/67.68 complement( Y ) ), X ) }.
% 67.27/67.68 parent0[0]: (2746) {G24,W10,D5,L1,V2,M1} P(2554,0) { join( meet( join( X, Y
% 67.27/67.68 ), complement( Y ) ), X ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147151) {G25,W11,D7,L1,V1,M1} { X ==> join( meet( top,
% 67.27/67.68 complement( composition( complement( X ), top ) ) ), X ) }.
% 67.27/67.68 parent0[0]: (3731) {G29,W8,D5,L1,V1,M1} P(3715,19);d(223);d(2891);d(223) {
% 67.27/67.68 join( X, composition( complement( X ), top ) ) ==> top }.
% 67.27/67.68 parent1[0; 4]: (147149) {G24,W10,D5,L1,V2,M1} { X ==> join( meet( join( X
% 67.27/67.68 , Y ), complement( Y ) ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := composition( complement( X ), top )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147152) {G13,W9,D6,L1,V1,M1} { X ==> join( complement(
% 67.27/67.68 composition( complement( X ), top ) ), X ) }.
% 67.27/67.68 parent0[0]: (747) {G12,W5,D3,L1,V1,M1} P(75,715);d(740) { meet( top, X )
% 67.27/67.68 ==> X }.
% 67.27/67.68 parent1[0; 3]: (147151) {G25,W11,D7,L1,V1,M1} { X ==> join( meet( top,
% 67.27/67.68 complement( composition( complement( X ), top ) ) ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := complement( composition( complement( X ), top ) )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147153) {G13,W9,D6,L1,V1,M1} { join( complement( composition(
% 67.27/67.68 complement( X ), top ) ), X ) ==> X }.
% 67.27/67.68 parent0[0]: (147152) {G13,W9,D6,L1,V1,M1} { X ==> join( complement(
% 67.27/67.68 composition( complement( X ), top ) ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3734) {G30,W9,D6,L1,V1,M1} P(3731,2746);d(747) { join(
% 67.27/67.68 complement( composition( complement( X ), top ) ), X ) ==> X }.
% 67.27/67.68 parent0: (147153) {G13,W9,D6,L1,V1,M1} { join( complement( composition(
% 67.27/67.68 complement( X ), top ) ), X ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147155) {G24,W10,D5,L1,V2,M1} { X ==> join( X, meet( complement(
% 67.27/67.68 Y ), join( X, Y ) ) ) }.
% 67.27/67.68 parent0[0]: (2741) {G24,W10,D5,L1,V2,M1} P(75,2554) { join( X, meet(
% 67.27/67.68 complement( Y ), join( X, Y ) ) ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147157) {G25,W11,D7,L1,V1,M1} { X ==> join( X, meet( complement
% 67.27/67.68 ( composition( complement( X ), top ) ), top ) ) }.
% 67.27/67.68 parent0[0]: (3731) {G29,W8,D5,L1,V1,M1} P(3715,19);d(223);d(2891);d(223) {
% 67.27/67.68 join( X, composition( complement( X ), top ) ) ==> top }.
% 67.27/67.68 parent1[0; 10]: (147155) {G24,W10,D5,L1,V2,M1} { X ==> join( X, meet(
% 67.27/67.68 complement( Y ), join( X, Y ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := composition( complement( X ), top )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147158) {G15,W9,D6,L1,V1,M1} { X ==> join( X, complement(
% 67.27/67.68 composition( complement( X ), top ) ) ) }.
% 67.27/67.68 parent0[0]: (752) {G14,W5,D3,L1,V1,M1} P(751,48);d(749);d(79) { meet( X,
% 67.27/67.68 top ) ==> X }.
% 67.27/67.68 parent1[0; 4]: (147157) {G25,W11,D7,L1,V1,M1} { X ==> join( X, meet(
% 67.27/67.68 complement( composition( complement( X ), top ) ), top ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := complement( composition( complement( X ), top ) )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147159) {G15,W9,D6,L1,V1,M1} { join( X, complement( composition(
% 67.27/67.68 complement( X ), top ) ) ) ==> X }.
% 67.27/67.68 parent0[0]: (147158) {G15,W9,D6,L1,V1,M1} { X ==> join( X, complement(
% 67.27/67.68 composition( complement( X ), top ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3735) {G30,W9,D6,L1,V1,M1} P(3731,2741);d(752) { join( X,
% 67.27/67.68 complement( composition( complement( X ), top ) ) ) ==> X }.
% 67.27/67.68 parent0: (147159) {G15,W9,D6,L1,V1,M1} { join( X, complement( composition
% 67.27/67.68 ( complement( X ), top ) ) ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147161) {G29,W8,D5,L1,V1,M1} { top ==> join( X, composition(
% 67.27/67.68 complement( X ), top ) ) }.
% 67.27/67.68 parent0[0]: (3731) {G29,W8,D5,L1,V1,M1} P(3715,19);d(223);d(2891);d(223) {
% 67.27/67.68 join( X, composition( complement( X ), top ) ) ==> top }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147162) {G16,W8,D4,L1,V1,M1} { top ==> join( complement( X ),
% 67.27/67.68 composition( X, top ) ) }.
% 67.27/67.68 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.68 complement( X ) ) ==> X }.
% 67.27/67.68 parent1[0; 6]: (147161) {G29,W8,D5,L1,V1,M1} { top ==> join( X,
% 67.27/67.68 composition( complement( X ), top ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := complement( X )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147163) {G16,W8,D4,L1,V1,M1} { join( complement( X ), composition
% 67.27/67.68 ( X, top ) ) ==> top }.
% 67.27/67.68 parent0[0]: (147162) {G16,W8,D4,L1,V1,M1} { top ==> join( complement( X )
% 67.27/67.68 , composition( X, top ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3748) {G30,W8,D4,L1,V1,M1} P(756,3731) { join( complement( X
% 67.27/67.68 ), composition( X, top ) ) ==> top }.
% 67.27/67.68 parent0: (147163) {G16,W8,D4,L1,V1,M1} { join( complement( X ),
% 67.27/67.68 composition( X, top ) ) ==> top }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147165) {G17,W10,D5,L1,V2,M1} { zero ==> meet( complement( join(
% 67.27/67.68 X, Y ) ), join( Y, X ) ) }.
% 67.27/67.68 parent0[0]: (1602) {G17,W10,D5,L1,V2,M1} P(626,771);d(77) { meet(
% 67.27/67.68 complement( join( X, Y ) ), join( Y, X ) ) ==> zero }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147169) {G18,W11,D6,L1,V1,M1} { zero ==> meet( complement( join
% 67.27/67.68 ( composition( X, top ), complement( X ) ) ), top ) }.
% 67.27/67.68 parent0[0]: (3748) {G30,W8,D4,L1,V1,M1} P(756,3731) { join( complement( X )
% 67.27/67.68 , composition( X, top ) ) ==> top }.
% 67.27/67.68 parent1[0; 10]: (147165) {G17,W10,D5,L1,V2,M1} { zero ==> meet( complement
% 67.27/67.68 ( join( X, Y ) ), join( Y, X ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := composition( X, top )
% 67.27/67.68 Y := complement( X )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147170) {G15,W9,D5,L1,V1,M1} { zero ==> complement( join(
% 67.27/67.68 composition( X, top ), complement( X ) ) ) }.
% 67.27/67.68 parent0[0]: (752) {G14,W5,D3,L1,V1,M1} P(751,48);d(749);d(79) { meet( X,
% 67.27/67.68 top ) ==> X }.
% 67.27/67.68 parent1[0; 2]: (147169) {G18,W11,D6,L1,V1,M1} { zero ==> meet( complement
% 67.27/67.68 ( join( composition( X, top ), complement( X ) ) ), top ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := complement( join( composition( X, top ), complement( X ) ) )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147171) {G16,W8,D5,L1,V1,M1} { zero ==> meet( complement(
% 67.27/67.68 composition( X, top ) ), X ) }.
% 67.27/67.68 parent0[0]: (771) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( X,
% 67.27/67.68 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 67.27/67.68 parent1[0; 2]: (147170) {G15,W9,D5,L1,V1,M1} { zero ==> complement( join(
% 67.27/67.68 composition( X, top ), complement( X ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := composition( X, top )
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147172) {G16,W8,D5,L1,V1,M1} { meet( complement( composition( X,
% 67.27/67.68 top ) ), X ) ==> zero }.
% 67.27/67.68 parent0[0]: (147171) {G16,W8,D5,L1,V1,M1} { zero ==> meet( complement(
% 67.27/67.68 composition( X, top ) ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3759) {G31,W8,D5,L1,V1,M1} P(3748,1602);d(752);d(771) { meet
% 67.27/67.68 ( complement( composition( X, top ) ), X ) ==> zero }.
% 67.27/67.68 parent0: (147172) {G16,W8,D5,L1,V1,M1} { meet( complement( composition( X
% 67.27/67.68 , top ) ), X ) ==> zero }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147174) {G1,W17,D5,L1,V4,M1} { join( X, composition( join( Y, T )
% 67.27/67.68 , Z ) ) ==> join( join( X, composition( Y, Z ) ), composition( T, Z ) )
% 67.27/67.68 }.
% 67.27/67.68 parent0[0]: (93) {G1,W17,D5,L1,V4,M1} P(6,1) { join( join( T, composition(
% 67.27/67.68 X, Y ) ), composition( Z, Y ) ) ==> join( T, composition( join( X, Z ), Y
% 67.27/67.68 ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := Z
% 67.27/67.68 Z := T
% 67.27/67.68 T := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147178) {G2,W14,D5,L1,V2,M1} { join( complement( X ),
% 67.27/67.68 composition( join( X, Y ), top ) ) ==> join( top, composition( Y, top ) )
% 67.27/67.68 }.
% 67.27/67.68 parent0[0]: (3748) {G30,W8,D4,L1,V1,M1} P(756,3731) { join( complement( X )
% 67.27/67.68 , composition( X, top ) ) ==> top }.
% 67.27/67.68 parent1[0; 10]: (147174) {G1,W17,D5,L1,V4,M1} { join( X, composition( join
% 67.27/67.68 ( Y, T ), Z ) ) ==> join( join( X, composition( Y, Z ) ), composition( T
% 67.27/67.68 , Z ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := complement( X )
% 67.27/67.68 Y := X
% 67.27/67.68 Z := top
% 67.27/67.68 T := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147179) {G3,W10,D5,L1,V2,M1} { join( complement( X ),
% 67.27/67.68 composition( join( X, Y ), top ) ) ==> top }.
% 67.27/67.68 parent0[0]: (214) {G9,W5,D3,L1,V1,M1} P(199,36);d(209) { join( top, X ) ==>
% 67.27/67.68 top }.
% 67.27/67.68 parent1[0; 9]: (147178) {G2,W14,D5,L1,V2,M1} { join( complement( X ),
% 67.27/67.68 composition( join( X, Y ), top ) ) ==> join( top, composition( Y, top ) )
% 67.27/67.68 }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := composition( Y, top )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3765) {G31,W10,D5,L1,V2,M1} P(3748,93);d(214) { join(
% 67.27/67.68 complement( X ), composition( join( X, Y ), top ) ) ==> top }.
% 67.27/67.68 parent0: (147179) {G3,W10,D5,L1,V2,M1} { join( complement( X ),
% 67.27/67.68 composition( join( X, Y ), top ) ) ==> top }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147182) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement( Y
% 67.27/67.68 ) ), meet( X, Y ) ) }.
% 67.27/67.68 parent0[0]: (722) {G2,W10,D5,L1,V2,M1} P(3,48) { join( meet( X, complement
% 67.27/67.68 ( Y ) ), meet( X, Y ) ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147184) {G3,W15,D7,L1,V1,M1} { complement( composition(
% 67.27/67.68 complement( X ), top ) ) ==> join( zero, meet( complement( composition(
% 67.27/67.68 complement( X ), top ) ), X ) ) }.
% 67.27/67.68 parent0[0]: (3759) {G31,W8,D5,L1,V1,M1} P(3748,1602);d(752);d(771) { meet(
% 67.27/67.68 complement( composition( X, top ) ), X ) ==> zero }.
% 67.27/67.68 parent1[0; 7]: (147182) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X,
% 67.27/67.68 complement( Y ) ), meet( X, Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := complement( X )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := complement( composition( complement( X ), top ) )
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147186) {G4,W13,D6,L1,V1,M1} { complement( composition(
% 67.27/67.68 complement( X ), top ) ) ==> meet( complement( composition( complement( X
% 67.27/67.68 ), top ) ), X ) }.
% 67.27/67.68 parent0[0]: (749) {G13,W5,D3,L1,V1,M1} P(715,0);d(748) { join( zero, X )
% 67.27/67.68 ==> X }.
% 67.27/67.68 parent1[0; 6]: (147184) {G3,W15,D7,L1,V1,M1} { complement( composition(
% 67.27/67.68 complement( X ), top ) ) ==> join( zero, meet( complement( composition(
% 67.27/67.68 complement( X ), top ) ), X ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := meet( complement( composition( complement( X ), top ) ), X )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147187) {G4,W13,D6,L1,V1,M1} { meet( complement( composition(
% 67.27/67.68 complement( X ), top ) ), X ) ==> complement( composition( complement( X
% 67.27/67.68 ), top ) ) }.
% 67.27/67.68 parent0[0]: (147186) {G4,W13,D6,L1,V1,M1} { complement( composition(
% 67.27/67.68 complement( X ), top ) ) ==> meet( complement( composition( complement( X
% 67.27/67.68 ), top ) ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3782) {G32,W13,D6,L1,V1,M1} P(3759,722);d(749) { meet(
% 67.27/67.68 complement( composition( complement( X ), top ) ), X ) ==> complement(
% 67.27/67.68 composition( complement( X ), top ) ) }.
% 67.27/67.68 parent0: (147187) {G4,W13,D6,L1,V1,M1} { meet( complement( composition(
% 67.27/67.68 complement( X ), top ) ), X ) ==> complement( composition( complement( X
% 67.27/67.68 ), top ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147189) {G22,W9,D5,L1,V3,M1} { X ==> meet( join( join( X, Y ), Z
% 67.27/67.68 ), X ) }.
% 67.27/67.68 parent0[0]: (1052) {G22,W9,D5,L1,V3,M1} P(1,1032) { meet( join( join( X, Y
% 67.27/67.68 ), Z ), X ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 Z := Z
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147190) {G23,W9,D5,L1,V2,M1} { X ==> meet( composition( join( X
% 67.27/67.68 , Y ), top ), X ) }.
% 67.27/67.68 parent0[0]: (3733) {G30,W9,D4,L1,V1,M1} P(3731,3061);d(752);d(756) { join(
% 67.27/67.68 X, composition( X, top ) ) ==> composition( X, top ) }.
% 67.27/67.68 parent1[0; 3]: (147189) {G22,W9,D5,L1,V3,M1} { X ==> meet( join( join( X,
% 67.27/67.68 Y ), Z ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := join( X, Y )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 Z := composition( join( X, Y ), top )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147192) {G23,W9,D5,L1,V2,M1} { meet( composition( join( X, Y ),
% 67.27/67.68 top ), X ) ==> X }.
% 67.27/67.68 parent0[0]: (147190) {G23,W9,D5,L1,V2,M1} { X ==> meet( composition( join
% 67.27/67.68 ( X, Y ), top ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3851) {G31,W9,D5,L1,V2,M1} P(3733,1052) { meet( composition(
% 67.27/67.68 join( X, Y ), top ), X ) ==> X }.
% 67.27/67.68 parent0: (147192) {G23,W9,D5,L1,V2,M1} { meet( composition( join( X, Y ),
% 67.27/67.68 top ), X ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147195) {G23,W9,D5,L1,V3,M1} { Y ==> meet( join( join( X, Y ), Z
% 67.27/67.68 ), Y ) }.
% 67.27/67.68 parent0[0]: (1057) {G23,W9,D5,L1,V3,M1} P(30,1054) { meet( join( join( X, Z
% 67.27/67.68 ), Y ), Z ) ==> Z }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Z
% 67.27/67.68 Z := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147196) {G24,W9,D5,L1,V2,M1} { X ==> meet( composition( join( Y
% 67.27/67.68 , X ), top ), X ) }.
% 67.27/67.68 parent0[0]: (3733) {G30,W9,D4,L1,V1,M1} P(3731,3061);d(752);d(756) { join(
% 67.27/67.68 X, composition( X, top ) ) ==> composition( X, top ) }.
% 67.27/67.68 parent1[0; 3]: (147195) {G23,W9,D5,L1,V3,M1} { Y ==> meet( join( join( X,
% 67.27/67.68 Y ), Z ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := join( Y, X )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 Z := composition( join( Y, X ), top )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147198) {G24,W9,D5,L1,V2,M1} { meet( composition( join( Y, X ),
% 67.27/67.68 top ), X ) ==> X }.
% 67.27/67.68 parent0[0]: (147196) {G24,W9,D5,L1,V2,M1} { X ==> meet( composition( join
% 67.27/67.68 ( Y, X ), top ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3853) {G31,W9,D5,L1,V2,M1} P(3733,1057) { meet( composition(
% 67.27/67.68 join( X, Y ), top ), Y ) ==> Y }.
% 67.27/67.68 parent0: (147198) {G24,W9,D5,L1,V2,M1} { meet( composition( join( Y, X ),
% 67.27/67.68 top ), X ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147201) {G20,W9,D5,L1,V3,M1} { X ==> meet( X, join( join( X, Y )
% 67.27/67.68 , Z ) ) }.
% 67.27/67.68 parent0[0]: (1041) {G20,W9,D5,L1,V3,M1} P(1,1025) { meet( X, join( join( X
% 67.27/67.68 , Y ), Z ) ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 Z := Z
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147202) {G11,W9,D5,L1,V2,M1} { X ==> meet( X, composition( top,
% 67.27/67.68 join( X, Y ) ) ) }.
% 67.27/67.68 parent0[0]: (3511) {G10,W9,D4,L1,V1,M1} P(215,192) { join( X, composition(
% 67.27/67.68 top, X ) ) ==> composition( top, X ) }.
% 67.27/67.68 parent1[0; 4]: (147201) {G20,W9,D5,L1,V3,M1} { X ==> meet( X, join( join(
% 67.27/67.68 X, Y ), Z ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := join( X, Y )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 Z := composition( top, join( X, Y ) )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147204) {G11,W9,D5,L1,V2,M1} { meet( X, composition( top, join( X
% 67.27/67.68 , Y ) ) ) ==> X }.
% 67.27/67.68 parent0[0]: (147202) {G11,W9,D5,L1,V2,M1} { X ==> meet( X, composition(
% 67.27/67.68 top, join( X, Y ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3874) {G21,W9,D5,L1,V2,M1} P(3511,1041) { meet( X,
% 67.27/67.68 composition( top, join( X, Y ) ) ) ==> X }.
% 67.27/67.68 parent0: (147204) {G11,W9,D5,L1,V2,M1} { meet( X, composition( top, join(
% 67.27/67.68 X, Y ) ) ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147207) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 67.27/67.68 join( X, Y ), Z ) }.
% 67.27/67.68 parent0[0]: (29) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 67.27/67.68 join( join( Y, Z ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 Z := Z
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147221) {G2,W13,D4,L1,V2,M1} { join( composition( top, X ), Y )
% 67.27/67.68 = join( join( Y, X ), composition( top, X ) ) }.
% 67.27/67.68 parent0[0]: (3511) {G10,W9,D4,L1,V1,M1} P(215,192) { join( X, composition(
% 67.27/67.68 top, X ) ) ==> composition( top, X ) }.
% 67.27/67.68 parent1[0; 2]: (147207) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) =
% 67.27/67.68 join( join( X, Y ), Z ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 Z := composition( top, X )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147225) {G2,W13,D4,L1,V2,M1} { join( join( Y, X ), composition(
% 67.27/67.68 top, X ) ) = join( composition( top, X ), Y ) }.
% 67.27/67.68 parent0[0]: (147221) {G2,W13,D4,L1,V2,M1} { join( composition( top, X ), Y
% 67.27/67.68 ) = join( join( Y, X ), composition( top, X ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3882) {G11,W13,D4,L1,V2,M1} P(3511,29) { join( join( Y, X ),
% 67.27/67.68 composition( top, X ) ) ==> join( composition( top, X ), Y ) }.
% 67.27/67.68 parent0: (147225) {G2,W13,D4,L1,V2,M1} { join( join( Y, X ), composition(
% 67.27/67.68 top, X ) ) = join( composition( top, X ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147229) {G21,W9,D5,L1,V2,M1} { X ==> meet( X, composition( top,
% 67.27/67.68 join( X, Y ) ) ) }.
% 67.27/67.68 parent0[0]: (3874) {G21,W9,D5,L1,V2,M1} P(3511,1041) { meet( X, composition
% 67.27/67.68 ( top, join( X, Y ) ) ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147234) {G19,W11,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X,
% 67.27/67.68 Y ), composition( top, X ) ) }.
% 67.27/67.68 parent0[0]: (1373) {G18,W10,D5,L1,V2,M1} P(75,1016) { join( meet( X, Y ),
% 67.27/67.68 meet( complement( Y ), X ) ) ==> X }.
% 67.27/67.68 parent1[0; 10]: (147229) {G21,W9,D5,L1,V2,M1} { X ==> meet( X, composition
% 67.27/67.68 ( top, join( X, Y ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := meet( X, Y )
% 67.27/67.68 Y := meet( complement( Y ), X )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147235) {G19,W11,D4,L1,V2,M1} { meet( meet( X, Y ), composition(
% 67.27/67.68 top, X ) ) ==> meet( X, Y ) }.
% 67.27/67.68 parent0[0]: (147234) {G19,W11,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet(
% 67.27/67.68 X, Y ), composition( top, X ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3917) {G22,W11,D4,L1,V2,M1} P(1373,3874) { meet( meet( X, Y )
% 67.27/67.68 , composition( top, X ) ) ==> meet( X, Y ) }.
% 67.27/67.68 parent0: (147235) {G19,W11,D4,L1,V2,M1} { meet( meet( X, Y ), composition
% 67.27/67.68 ( top, X ) ) ==> meet( X, Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147237) {G21,W9,D5,L1,V2,M1} { X ==> meet( X, composition( top,
% 67.27/67.68 join( X, Y ) ) ) }.
% 67.27/67.68 parent0[0]: (3874) {G21,W9,D5,L1,V2,M1} P(3511,1041) { meet( X, composition
% 67.27/67.68 ( top, join( X, Y ) ) ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147242) {G20,W11,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X,
% 67.27/67.68 Y ), composition( top, Y ) ) }.
% 67.27/67.68 parent0[0]: (1387) {G19,W10,D5,L1,V2,M1} P(75,1372) { join( meet( Y, X ),
% 67.27/67.68 meet( complement( Y ), X ) ) ==> X }.
% 67.27/67.68 parent1[0; 10]: (147237) {G21,W9,D5,L1,V2,M1} { X ==> meet( X, composition
% 67.27/67.68 ( top, join( X, Y ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := meet( X, Y )
% 67.27/67.68 Y := meet( complement( X ), Y )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147243) {G20,W11,D4,L1,V2,M1} { meet( meet( X, Y ), composition(
% 67.27/67.68 top, Y ) ) ==> meet( X, Y ) }.
% 67.27/67.68 parent0[0]: (147242) {G20,W11,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet(
% 67.27/67.68 X, Y ), composition( top, Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (3919) {G22,W11,D4,L1,V2,M1} P(1387,3874) { meet( meet( X, Y )
% 67.27/67.68 , composition( top, Y ) ) ==> meet( X, Y ) }.
% 67.27/67.68 parent0: (147243) {G20,W11,D4,L1,V2,M1} { meet( meet( X, Y ), composition
% 67.27/67.68 ( top, Y ) ) ==> meet( X, Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147245) {G21,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X ) }.
% 67.27/67.68 parent0[0]: (1032) {G21,W7,D4,L1,V2,M1} P(1025,843) { meet( join( X, Y ), X
% 67.27/67.68 ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147246) {G22,W13,D5,L1,V2,M1} { composition( meet( one, X ), Y )
% 67.27/67.68 ==> meet( Y, composition( meet( one, X ), Y ) ) }.
% 67.27/67.68 parent0[0]: (3624) {G21,W9,D5,L1,V2,M1} P(881,193);d(187) { join(
% 67.27/67.68 composition( meet( one, X ), Y ), Y ) ==> Y }.
% 67.27/67.68 parent1[0; 7]: (147245) {G21,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X
% 67.27/67.68 ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := composition( meet( one, X ), Y )
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147247) {G22,W13,D5,L1,V2,M1} { meet( Y, composition( meet( one,
% 67.27/67.68 X ), Y ) ) ==> composition( meet( one, X ), Y ) }.
% 67.27/67.68 parent0[0]: (147246) {G22,W13,D5,L1,V2,M1} { composition( meet( one, X ),
% 67.27/67.68 Y ) ==> meet( Y, composition( meet( one, X ), Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (4322) {G22,W13,D5,L1,V2,M1} P(3624,1032) { meet( Y,
% 67.27/67.68 composition( meet( one, X ), Y ) ) ==> composition( meet( one, X ), Y )
% 67.27/67.68 }.
% 67.27/67.68 parent0: (147247) {G22,W13,D5,L1,V2,M1} { meet( Y, composition( meet( one
% 67.27/67.68 , X ), Y ) ) ==> composition( meet( one, X ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147249) {G19,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y ) ) }.
% 67.27/67.68 parent0[0]: (1025) {G19,W7,D4,L1,V2,M1} P(756,1012) { meet( Y, join( Y, X )
% 67.27/67.68 ) ==> Y }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147252) {G20,W13,D5,L1,V2,M1} { composition( meet( one, X ), Y )
% 67.27/67.68 ==> meet( composition( meet( one, X ), Y ), Y ) }.
% 67.27/67.68 parent0[0]: (3624) {G21,W9,D5,L1,V2,M1} P(881,193);d(187) { join(
% 67.27/67.68 composition( meet( one, X ), Y ), Y ) ==> Y }.
% 67.27/67.68 parent1[0; 12]: (147249) {G19,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y
% 67.27/67.68 ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := composition( meet( one, X ), Y )
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147253) {G20,W13,D5,L1,V2,M1} { meet( composition( meet( one, X )
% 67.27/67.68 , Y ), Y ) ==> composition( meet( one, X ), Y ) }.
% 67.27/67.68 parent0[0]: (147252) {G20,W13,D5,L1,V2,M1} { composition( meet( one, X ),
% 67.27/67.68 Y ) ==> meet( composition( meet( one, X ), Y ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (4323) {G22,W13,D5,L1,V2,M1} P(3624,1025) { meet( composition
% 67.27/67.68 ( meet( one, X ), Y ), Y ) ==> composition( meet( one, X ), Y ) }.
% 67.27/67.68 parent0: (147253) {G20,W13,D5,L1,V2,M1} { meet( composition( meet( one, X
% 67.27/67.68 ), Y ), Y ) ==> composition( meet( one, X ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147256) {G2,W13,D6,L1,V3,M1} { join( join( composition( meet(
% 67.27/67.68 one, X ), Y ), Z ), Y ) = join( Y, Z ) }.
% 67.27/67.68 parent0[0]: (3624) {G21,W9,D5,L1,V2,M1} P(881,193);d(187) { join(
% 67.27/67.68 composition( meet( one, X ), Y ), Y ) ==> Y }.
% 67.27/67.68 parent1[0; 11]: (30) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y )
% 67.27/67.68 , X ) = join( join( Z, X ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := Z
% 67.27/67.68 Z := composition( meet( one, X ), Y )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (4327) {G22,W13,D6,L1,V3,M1} P(3624,30) { join( join(
% 67.27/67.68 composition( meet( one, X ), Y ), Z ), Y ) ==> join( Y, Z ) }.
% 67.27/67.68 parent0: (147256) {G2,W13,D6,L1,V3,M1} { join( join( composition( meet(
% 67.27/67.68 one, X ), Y ), Z ), Y ) = join( Y, Z ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 Z := Z
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147258) {G21,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X ) }.
% 67.27/67.68 parent0[0]: (1032) {G21,W7,D4,L1,V2,M1} P(1025,843) { meet( join( X, Y ), X
% 67.27/67.68 ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147261) {G22,W13,D5,L1,V2,M1} { composition( meet( X, one ), Y )
% 67.27/67.68 ==> meet( Y, composition( meet( X, one ), Y ) ) }.
% 67.27/67.68 parent0[0]: (3625) {G23,W9,D5,L1,V2,M1} P(898,193);d(187) { join(
% 67.27/67.68 composition( meet( X, one ), Y ), Y ) ==> Y }.
% 67.27/67.68 parent1[0; 7]: (147258) {G21,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X
% 67.27/67.68 ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := composition( meet( X, one ), Y )
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147262) {G22,W13,D5,L1,V2,M1} { meet( Y, composition( meet( X,
% 67.27/67.68 one ), Y ) ) ==> composition( meet( X, one ), Y ) }.
% 67.27/67.68 parent0[0]: (147261) {G22,W13,D5,L1,V2,M1} { composition( meet( X, one ),
% 67.27/67.68 Y ) ==> meet( Y, composition( meet( X, one ), Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (4353) {G24,W13,D5,L1,V2,M1} P(3625,1032) { meet( Y,
% 67.27/67.68 composition( meet( X, one ), Y ) ) ==> composition( meet( X, one ), Y )
% 67.27/67.68 }.
% 67.27/67.68 parent0: (147262) {G22,W13,D5,L1,V2,M1} { meet( Y, composition( meet( X,
% 67.27/67.68 one ), Y ) ) ==> composition( meet( X, one ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147264) {G19,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y ) ) }.
% 67.27/67.68 parent0[0]: (1025) {G19,W7,D4,L1,V2,M1} P(756,1012) { meet( Y, join( Y, X )
% 67.27/67.68 ) ==> Y }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147265) {G20,W13,D5,L1,V2,M1} { composition( meet( X, one ), Y )
% 67.27/67.68 ==> meet( composition( meet( X, one ), Y ), Y ) }.
% 67.27/67.68 parent0[0]: (3625) {G23,W9,D5,L1,V2,M1} P(898,193);d(187) { join(
% 67.27/67.68 composition( meet( X, one ), Y ), Y ) ==> Y }.
% 67.27/67.68 parent1[0; 12]: (147264) {G19,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y
% 67.27/67.68 ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := composition( meet( X, one ), Y )
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147266) {G20,W13,D5,L1,V2,M1} { meet( composition( meet( X, one )
% 67.27/67.68 , Y ), Y ) ==> composition( meet( X, one ), Y ) }.
% 67.27/67.68 parent0[0]: (147265) {G20,W13,D5,L1,V2,M1} { composition( meet( X, one ),
% 67.27/67.68 Y ) ==> meet( composition( meet( X, one ), Y ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (4354) {G24,W13,D5,L1,V2,M1} P(3625,1025) { meet( composition
% 67.27/67.68 ( meet( X, one ), Y ), Y ) ==> composition( meet( X, one ), Y ) }.
% 67.27/67.68 parent0: (147266) {G20,W13,D5,L1,V2,M1} { meet( composition( meet( X, one
% 67.27/67.68 ), Y ), Y ) ==> composition( meet( X, one ), Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147268) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 67.27/67.68 join( X, Y ), Z ) }.
% 67.27/67.68 parent0[0]: (29) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 67.27/67.68 join( join( Y, Z ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 Z := Z
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147270) {G2,W13,D6,L1,V2,M1} { join( join( X, Y ), complement(
% 67.27/67.68 composition( complement( X ), top ) ) ) = join( X, Y ) }.
% 67.27/67.68 parent0[0]: (3734) {G30,W9,D6,L1,V1,M1} P(3731,2746);d(747) { join(
% 67.27/67.68 complement( composition( complement( X ), top ) ), X ) ==> X }.
% 67.27/67.68 parent1[0; 11]: (147268) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) =
% 67.27/67.68 join( join( X, Y ), Z ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := complement( composition( complement( X ), top ) )
% 67.27/67.68 Y := X
% 67.27/67.68 Z := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (4555) {G31,W13,D6,L1,V2,M1} P(3734,29) { join( join( X, Y ),
% 67.27/67.68 complement( composition( complement( X ), top ) ) ) ==> join( X, Y ) }.
% 67.27/67.68 parent0: (147270) {G2,W13,D6,L1,V2,M1} { join( join( X, Y ), complement(
% 67.27/67.68 composition( complement( X ), top ) ) ) = join( X, Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147273) {G30,W9,D6,L1,V1,M1} { X ==> join( X, complement(
% 67.27/67.68 composition( complement( X ), top ) ) ) }.
% 67.27/67.68 parent0[0]: (3735) {G30,W9,D6,L1,V1,M1} P(3731,2741);d(752) { join( X,
% 67.27/67.68 complement( composition( complement( X ), top ) ) ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147274) {G4,W15,D7,L1,V2,M1} { join( X, Y ) ==> join( join( Y, X
% 67.27/67.68 ), complement( composition( complement( join( X, Y ) ), top ) ) ) }.
% 67.27/67.68 parent0[0]: (221) {G3,W11,D4,L1,V3,M1} P(21,7);d(7) { join( join( Y, X ), Z
% 67.27/67.68 ) = join( join( X, Y ), Z ) }.
% 67.27/67.68 parent1[0; 4]: (147273) {G30,W9,D6,L1,V1,M1} { X ==> join( X, complement(
% 67.27/67.68 composition( complement( X ), top ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 Z := complement( composition( complement( join( X, Y ) ), top ) )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := join( X, Y )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147277) {G4,W15,D7,L1,V2,M1} { join( join( Y, X ), complement(
% 67.27/67.68 composition( complement( join( X, Y ) ), top ) ) ) ==> join( X, Y ) }.
% 67.27/67.68 parent0[0]: (147274) {G4,W15,D7,L1,V2,M1} { join( X, Y ) ==> join( join( Y
% 67.27/67.68 , X ), complement( composition( complement( join( X, Y ) ), top ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (4558) {G31,W15,D7,L1,V2,M1} P(3735,221) { join( join( Y, X )
% 67.27/67.68 , complement( composition( complement( join( X, Y ) ), top ) ) ) ==> join
% 67.27/67.68 ( X, Y ) }.
% 67.27/67.68 parent0: (147277) {G4,W15,D7,L1,V2,M1} { join( join( Y, X ), complement(
% 67.27/67.68 composition( complement( join( X, Y ) ), top ) ) ) ==> join( X, Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147279) {G31,W10,D5,L1,V2,M1} { top ==> join( complement( X ),
% 67.27/67.68 composition( join( X, Y ), top ) ) }.
% 67.27/67.68 parent0[0]: (3765) {G31,W10,D5,L1,V2,M1} P(3748,93);d(214) { join(
% 67.27/67.68 complement( X ), composition( join( X, Y ), top ) ) ==> top }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147281) {G17,W12,D6,L1,V2,M1} { top ==> join( complement(
% 67.27/67.68 complement( X ) ), composition( complement( meet( X, Y ) ), top ) ) }.
% 67.27/67.68 parent0[0]: (773) {G16,W10,D4,L1,V2,M1} P(3,756) { join( complement( X ),
% 67.27/67.68 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.27/67.68 parent1[0; 7]: (147279) {G31,W10,D5,L1,V2,M1} { top ==> join( complement(
% 67.27/67.68 X ), composition( join( X, Y ), top ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := complement( X )
% 67.27/67.68 Y := complement( Y )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147282) {G16,W10,D6,L1,V2,M1} { top ==> join( X, composition(
% 67.27/67.68 complement( meet( X, Y ) ), top ) ) }.
% 67.27/67.68 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.68 complement( X ) ) ==> X }.
% 67.27/67.68 parent1[0; 3]: (147281) {G17,W12,D6,L1,V2,M1} { top ==> join( complement(
% 67.27/67.68 complement( X ) ), composition( complement( meet( X, Y ) ), top ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147283) {G16,W10,D6,L1,V2,M1} { join( X, composition( complement
% 67.27/67.68 ( meet( X, Y ) ), top ) ) ==> top }.
% 67.27/67.68 parent0[0]: (147282) {G16,W10,D6,L1,V2,M1} { top ==> join( X, composition
% 67.27/67.68 ( complement( meet( X, Y ) ), top ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (4962) {G32,W10,D6,L1,V2,M1} P(773,3765);d(756) { join( X,
% 67.27/67.68 composition( complement( meet( X, Y ) ), top ) ) ==> top }.
% 67.27/67.68 parent0: (147283) {G16,W10,D6,L1,V2,M1} { join( X, composition( complement
% 67.27/67.68 ( meet( X, Y ) ), top ) ) ==> top }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147285) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y ) ==>
% 67.27/67.68 converse( join( X, converse( Y ) ) ) }.
% 67.27/67.68 parent0[0]: (20) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 67.27/67.68 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147291) {G2,W14,D6,L1,V1,M1} { join( converse( composition(
% 67.27/67.68 complement( one ), converse( X ) ) ), X ) ==> converse( composition( top
% 67.27/67.68 , converse( X ) ) ) }.
% 67.27/67.68 parent0[0]: (3644) {G6,W10,D5,L1,V1,M1} P(15,193) { join( composition(
% 67.27/67.68 complement( one ), X ), X ) ==> composition( top, X ) }.
% 67.27/67.68 parent1[0; 10]: (147285) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y )
% 67.27/67.68 ==> converse( join( X, converse( Y ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := converse( X )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := composition( complement( one ), converse( X ) )
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147293) {G2,W13,D6,L1,V1,M1} { join( converse( composition(
% 67.27/67.68 complement( one ), converse( X ) ) ), X ) ==> composition( X, converse(
% 67.27/67.68 top ) ) }.
% 67.27/67.68 parent0[0]: (16) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 67.27/67.68 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 67.27/67.68 parent1[0; 9]: (147291) {G2,W14,D6,L1,V1,M1} { join( converse( composition
% 67.27/67.68 ( complement( one ), converse( X ) ) ), X ) ==> converse( composition(
% 67.27/67.68 top, converse( X ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := top
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147295) {G3,W12,D6,L1,V1,M1} { join( converse( composition(
% 67.27/67.68 complement( one ), converse( X ) ) ), X ) ==> composition( X, top ) }.
% 67.27/67.68 parent0[0]: (223) {G10,W4,D3,L1,V0,M1} P(214,59) { converse( top ) ==> top
% 67.27/67.68 }.
% 67.27/67.68 parent1[0; 11]: (147293) {G2,W13,D6,L1,V1,M1} { join( converse(
% 67.27/67.68 composition( complement( one ), converse( X ) ) ), X ) ==> composition( X
% 67.27/67.68 , converse( top ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147296) {G2,W11,D6,L1,V1,M1} { join( composition( X, converse(
% 67.27/67.68 complement( one ) ) ), X ) ==> composition( X, top ) }.
% 67.27/67.68 parent0[0]: (16) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 67.27/67.68 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 67.27/67.68 parent1[0; 2]: (147295) {G3,W12,D6,L1,V1,M1} { join( converse( composition
% 67.27/67.68 ( complement( one ), converse( X ) ) ), X ) ==> composition( X, top ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := complement( one )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147297) {G3,W11,D6,L1,V1,M1} { join( composition( X, complement
% 67.27/67.68 ( converse( one ) ) ), X ) ==> composition( X, top ) }.
% 67.27/67.68 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.68 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.68 parent1[0; 4]: (147296) {G2,W11,D6,L1,V1,M1} { join( composition( X,
% 67.27/67.68 converse( complement( one ) ) ), X ) ==> composition( X, top ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := one
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147298) {G4,W10,D5,L1,V1,M1} { join( composition( X, complement
% 67.27/67.68 ( one ) ), X ) ==> composition( X, top ) }.
% 67.27/67.68 parent0[0]: (186) {G3,W4,D3,L1,V0,M1} P(180,5) { converse( one ) ==> one
% 67.27/67.68 }.
% 67.27/67.68 parent1[0; 5]: (147297) {G3,W11,D6,L1,V1,M1} { join( composition( X,
% 67.27/67.68 complement( converse( one ) ) ), X ) ==> composition( X, top ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (5440) {G28,W10,D5,L1,V1,M1} P(3644,20);d(16);d(223);d(16);d(
% 67.27/67.68 2866);d(186) { join( composition( X, complement( one ) ), X ) ==>
% 67.27/67.68 composition( X, top ) }.
% 67.27/67.68 parent0: (147298) {G4,W10,D5,L1,V1,M1} { join( composition( X, complement
% 67.27/67.68 ( one ) ), X ) ==> composition( X, top ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147301) {G24,W10,D5,L1,V2,M1} { X ==> join( X, meet( complement(
% 67.27/67.68 Y ), join( X, Y ) ) ) }.
% 67.27/67.68 parent0[0]: (2741) {G24,W10,D5,L1,V2,M1} P(75,2554) { join( X, meet(
% 67.27/67.68 complement( Y ), join( X, Y ) ) ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147303) {G25,W13,D8,L1,V2,M1} { X ==> join( X, meet( complement
% 67.27/67.68 ( composition( complement( meet( X, Y ) ), top ) ), top ) ) }.
% 67.27/67.68 parent0[0]: (4962) {G32,W10,D6,L1,V2,M1} P(773,3765);d(756) { join( X,
% 67.27/67.68 composition( complement( meet( X, Y ) ), top ) ) ==> top }.
% 67.27/67.68 parent1[0; 12]: (147301) {G24,W10,D5,L1,V2,M1} { X ==> join( X, meet(
% 67.27/67.68 complement( Y ), join( X, Y ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := composition( complement( meet( X, Y ) ), top )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147304) {G15,W11,D7,L1,V2,M1} { X ==> join( X, complement(
% 67.27/67.68 composition( complement( meet( X, Y ) ), top ) ) ) }.
% 67.27/67.68 parent0[0]: (752) {G14,W5,D3,L1,V1,M1} P(751,48);d(749);d(79) { meet( X,
% 67.27/67.68 top ) ==> X }.
% 67.27/67.68 parent1[0; 4]: (147303) {G25,W13,D8,L1,V2,M1} { X ==> join( X, meet(
% 67.27/67.68 complement( composition( complement( meet( X, Y ) ), top ) ), top ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := complement( composition( complement( meet( X, Y ) ), top ) )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147305) {G15,W11,D7,L1,V2,M1} { join( X, complement( composition
% 67.27/67.68 ( complement( meet( X, Y ) ), top ) ) ) ==> X }.
% 67.27/67.68 parent0[0]: (147304) {G15,W11,D7,L1,V2,M1} { X ==> join( X, complement(
% 67.27/67.68 composition( complement( meet( X, Y ) ), top ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (5567) {G33,W11,D7,L1,V2,M1} P(4962,2741);d(752) { join( X,
% 67.27/67.68 complement( composition( complement( meet( X, Y ) ), top ) ) ) ==> X }.
% 67.27/67.68 parent0: (147305) {G15,W11,D7,L1,V2,M1} { join( X, complement( composition
% 67.27/67.68 ( complement( meet( X, Y ) ), top ) ) ) ==> X }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147307) {G23,W10,D5,L1,V2,M1} { join( Y, X ) ==> join( X, meet( Y
% 67.27/67.68 , complement( X ) ) ) }.
% 67.27/67.68 parent0[0]: (2557) {G23,W10,D5,L1,V2,M1} P(308,2510);d(772);d(747);d(908)
% 67.27/67.68 { join( X, meet( Y, complement( X ) ) ) ==> join( Y, X ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147309) {G24,W13,D7,L1,V2,M1} { join( meet( X, complement(
% 67.27/67.68 composition( top, complement( Y ) ) ) ), Y ) ==> join( Y, zero ) }.
% 67.27/67.68 parent0[0]: (3654) {G28,W10,D6,L1,V2,M1} P(3640,1774) { meet( meet( Y,
% 67.27/67.68 complement( composition( top, X ) ) ), X ) ==> zero }.
% 67.27/67.68 parent1[0; 12]: (147307) {G23,W10,D5,L1,V2,M1} { join( Y, X ) ==> join( X
% 67.27/67.68 , meet( Y, complement( X ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := complement( Y )
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := meet( X, complement( composition( top, complement( Y ) ) ) )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147310) {G12,W11,D7,L1,V2,M1} { join( meet( X, complement(
% 67.27/67.68 composition( top, complement( Y ) ) ) ), Y ) ==> Y }.
% 67.27/67.68 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.27/67.68 }.
% 67.27/67.68 parent1[0; 10]: (147309) {G24,W13,D7,L1,V2,M1} { join( meet( X, complement
% 67.27/67.68 ( composition( top, complement( Y ) ) ) ), Y ) ==> join( Y, zero ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (6438) {G29,W11,D7,L1,V2,M1} P(3654,2557);d(740) { join( meet
% 67.27/67.68 ( X, complement( composition( top, complement( Y ) ) ) ), Y ) ==> Y }.
% 67.27/67.68 parent0: (147310) {G12,W11,D7,L1,V2,M1} { join( meet( X, complement(
% 67.27/67.68 composition( top, complement( Y ) ) ) ), Y ) ==> Y }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147313) {G23,W10,D6,L1,V2,M1} { zero ==> meet( complement(
% 67.27/67.68 converse( join( X, Y ) ) ), converse( X ) ) }.
% 67.27/67.68 parent0[0]: (1096) {G23,W10,D6,L1,V2,M1} P(8,1033) { meet( complement(
% 67.27/67.68 converse( join( X, Y ) ) ), converse( X ) ) ==> zero }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147318) {G2,W16,D8,L1,V2,M1} { zero ==> meet( complement(
% 67.27/67.68 converse( complement( converse( Y ) ) ) ), converse( composition( X,
% 67.27/67.68 complement( converse( composition( Y, X ) ) ) ) ) ) }.
% 67.27/67.68 parent0[0]: (110) {G1,W15,D7,L1,V2,M1} P(9,10);d(7) { join( composition( X
% 67.27/67.68 , complement( converse( composition( Y, X ) ) ) ), complement( converse(
% 67.27/67.68 Y ) ) ) ==> complement( converse( Y ) ) }.
% 67.27/67.68 parent1[0; 5]: (147313) {G23,W10,D6,L1,V2,M1} { zero ==> meet( complement
% 67.27/67.68 ( converse( join( X, Y ) ) ), converse( X ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := composition( X, complement( converse( composition( Y, X ) ) ) )
% 67.27/67.68 Y := complement( converse( Y ) )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147319) {G3,W16,D8,L1,V2,M1} { zero ==> meet( complement(
% 67.27/67.68 complement( converse( converse( X ) ) ) ), converse( composition( Y,
% 67.27/67.68 complement( converse( composition( X, Y ) ) ) ) ) ) }.
% 67.27/67.68 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.68 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.68 parent1[0; 4]: (147318) {G2,W16,D8,L1,V2,M1} { zero ==> meet( complement(
% 67.27/67.68 converse( complement( converse( Y ) ) ) ), converse( composition( X,
% 67.27/67.68 complement( converse( composition( Y, X ) ) ) ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := converse( X )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147320) {G4,W14,D8,L1,V2,M1} { zero ==> meet( converse( converse
% 67.27/67.68 ( X ) ), converse( composition( Y, complement( converse( composition( X,
% 67.27/67.68 Y ) ) ) ) ) ) }.
% 67.27/67.68 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.68 complement( X ) ) ==> X }.
% 67.27/67.68 parent1[0; 3]: (147319) {G3,W16,D8,L1,V2,M1} { zero ==> meet( complement(
% 67.27/67.68 complement( converse( converse( X ) ) ) ), converse( composition( Y,
% 67.27/67.68 complement( converse( composition( X, Y ) ) ) ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := converse( converse( X ) )
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147321) {G1,W12,D8,L1,V2,M1} { zero ==> meet( X, converse(
% 67.27/67.68 composition( Y, complement( converse( composition( X, Y ) ) ) ) ) ) }.
% 67.27/67.68 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.27/67.68 parent1[0; 3]: (147320) {G4,W14,D8,L1,V2,M1} { zero ==> meet( converse(
% 67.27/67.68 converse( X ) ), converse( composition( Y, complement( converse(
% 67.27/67.68 composition( X, Y ) ) ) ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147322) {G2,W11,D6,L1,V2,M1} { zero ==> meet( X, composition(
% 67.27/67.68 complement( composition( X, Y ) ), converse( Y ) ) ) }.
% 67.27/67.68 parent0[0]: (2891) {G28,W12,D6,L1,V2,M1} P(2866,16) { converse( composition
% 67.27/67.68 ( Y, complement( converse( X ) ) ) ) ==> composition( complement( X ),
% 67.27/67.68 converse( Y ) ) }.
% 67.27/67.68 parent1[0; 4]: (147321) {G1,W12,D8,L1,V2,M1} { zero ==> meet( X, converse
% 67.27/67.68 ( composition( Y, complement( converse( composition( X, Y ) ) ) ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := composition( X, Y )
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147323) {G2,W11,D6,L1,V2,M1} { meet( X, composition( complement(
% 67.27/67.68 composition( X, Y ) ), converse( Y ) ) ) ==> zero }.
% 67.27/67.68 parent0[0]: (147322) {G2,W11,D6,L1,V2,M1} { zero ==> meet( X, composition
% 67.27/67.68 ( complement( composition( X, Y ) ), converse( Y ) ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (6939) {G29,W11,D6,L1,V2,M1} P(110,1096);d(2866);d(756);d(7);d
% 67.27/67.68 (2891) { meet( Y, composition( complement( composition( Y, X ) ),
% 67.27/67.68 converse( X ) ) ) ==> zero }.
% 67.27/67.68 parent0: (147323) {G2,W11,D6,L1,V2,M1} { meet( X, composition( complement
% 67.27/67.68 ( composition( X, Y ) ), converse( Y ) ) ) ==> zero }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147325) {G21,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, Y ), meet
% 67.27/67.68 ( complement( Y ), Z ) ) }.
% 67.27/67.68 parent0[0]: (1708) {G21,W10,D5,L1,V3,M1} P(843,1664) { meet( meet( Y, X ),
% 67.27/67.68 meet( complement( X ), Z ) ) ==> zero }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 Z := Z
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147327) {G22,W11,D7,L1,V2,M1} { zero ==> meet( meet( X,
% 67.27/67.68 composition( Y, complement( converse( Y ) ) ) ), one ) }.
% 67.27/67.68 parent0[0]: (1948) {G25,W10,D7,L1,V1,M1} P(1865,1373);d(749) { meet(
% 67.27/67.68 complement( composition( X, complement( converse( X ) ) ) ), one ) ==>
% 67.27/67.68 one }.
% 67.27/67.68 parent1[0; 10]: (147325) {G21,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, Y
% 67.27/67.68 ), meet( complement( Y ), Z ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := composition( Y, complement( converse( Y ) ) )
% 67.27/67.68 Z := one
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147329) {G22,W11,D7,L1,V2,M1} { meet( meet( X, composition( Y,
% 67.27/67.68 complement( converse( Y ) ) ) ), one ) ==> zero }.
% 67.27/67.68 parent0[0]: (147327) {G22,W11,D7,L1,V2,M1} { zero ==> meet( meet( X,
% 67.27/67.68 composition( Y, complement( converse( Y ) ) ) ), one ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (7472) {G26,W11,D7,L1,V2,M1} P(1948,1708) { meet( meet( Y,
% 67.27/67.68 composition( X, complement( converse( X ) ) ) ), one ) ==> zero }.
% 67.27/67.68 parent0: (147329) {G22,W11,D7,L1,V2,M1} { meet( meet( X, composition( Y,
% 67.27/67.68 complement( converse( Y ) ) ) ), one ) ==> zero }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147330) {G2,W11,D4,L1,V3,M1} { meet( meet( Y, X ), Z ) = meet( Z
% 67.27/67.68 , meet( X, Y ) ) }.
% 67.27/67.68 parent0[0]: (996) {G18,W11,D4,L1,V3,M1} P(972,3);d(3) { meet( meet( Y, X )
% 67.27/67.68 , Z ) = meet( meet( X, Y ), Z ) }.
% 67.27/67.68 parent1[0; 1]: (75) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet(
% 67.27/67.68 X, Y ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Y
% 67.27/67.68 Y := X
% 67.27/67.68 Z := Z
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := Z
% 67.27/67.68 Y := meet( X, Y )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (7708) {G19,W11,D4,L1,V3,M1} P(996,75) { meet( meet( Y, X ), Z
% 67.27/67.68 ) = meet( Z, meet( X, Y ) ) }.
% 67.27/67.68 parent0: (147330) {G2,W11,D4,L1,V3,M1} { meet( meet( Y, X ), Z ) = meet( Z
% 67.27/67.68 , meet( X, Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 Z := Z
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147335) {G20,W11,D4,L1,V3,M1} { join( X, Y ) ==> join( join( X, Y
% 67.27/67.68 ), meet( X, Z ) ) }.
% 67.27/67.68 parent0[0]: (870) {G20,W11,D4,L1,V3,M1} P(851,30) { join( join( X, Z ),
% 67.27/67.68 meet( X, Y ) ) ==> join( X, Z ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Z
% 67.27/67.68 Z := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147337) {G21,W17,D6,L1,V2,M1} { join( composition( meet( X,
% 67.27/67.68 skol1 ), top ), skol1 ) ==> join( skol1, meet( composition( meet( X,
% 67.27/67.68 skol1 ), top ), Y ) ) }.
% 67.27/67.68 parent0[0]: (1256) {G23,W9,D5,L1,V1,M1} P(898,97);d(13) { join( composition
% 67.27/67.68 ( meet( X, skol1 ), top ), skol1 ) ==> skol1 }.
% 67.27/67.68 parent1[0; 9]: (147335) {G20,W11,D4,L1,V3,M1} { join( X, Y ) ==> join(
% 67.27/67.68 join( X, Y ), meet( X, Z ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := composition( meet( X, skol1 ), top )
% 67.27/67.68 Y := skol1
% 67.27/67.68 Z := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147338) {G22,W11,D6,L1,V2,M1} { skol1 ==> join( skol1, meet(
% 67.27/67.68 composition( meet( X, skol1 ), top ), Y ) ) }.
% 67.27/67.68 parent0[0]: (1256) {G23,W9,D5,L1,V1,M1} P(898,97);d(13) { join( composition
% 67.27/67.68 ( meet( X, skol1 ), top ), skol1 ) ==> skol1 }.
% 67.27/67.68 parent1[0; 1]: (147337) {G21,W17,D6,L1,V2,M1} { join( composition( meet( X
% 67.27/67.68 , skol1 ), top ), skol1 ) ==> join( skol1, meet( composition( meet( X,
% 67.27/67.68 skol1 ), top ), Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 eqswap: (147340) {G22,W11,D6,L1,V2,M1} { join( skol1, meet( composition(
% 67.27/67.68 meet( X, skol1 ), top ), Y ) ) ==> skol1 }.
% 67.27/67.68 parent0[0]: (147338) {G22,W11,D6,L1,V2,M1} { skol1 ==> join( skol1, meet(
% 67.27/67.68 composition( meet( X, skol1 ), top ), Y ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 subsumption: (7979) {G24,W11,D6,L1,V2,M1} P(1256,870) { join( skol1, meet(
% 67.27/67.68 composition( meet( X, skol1 ), top ), Y ) ) ==> skol1 }.
% 67.27/67.68 parent0: (147340) {G22,W11,D6,L1,V2,M1} { join( skol1, meet( composition(
% 67.27/67.68 meet( X, skol1 ), top ), Y ) ) ==> skol1 }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := X
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 permutation0:
% 67.27/67.68 0 ==> 0
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147345) {G4,W15,D5,L1,V3,M1} { composition( X, join( meet( Y, Z
% 67.27/67.68 ), meet( Z, Y ) ) ) = composition( X, meet( Z, Y ) ) }.
% 67.27/67.68 parent0[0]: (2544) {G23,W11,D4,L1,V2,M1} P(988,2510);d(747) { join( meet( X
% 67.27/67.68 , Y ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 67.27/67.68 parent1[0; 12]: (247) {G3,W11,D4,L1,V3,M1} P(23,7);d(7) { composition( X,
% 67.27/67.68 join( Z, Y ) ) = composition( X, join( Y, Z ) ) }.
% 67.27/67.68 substitution0:
% 67.27/67.68 X := Z
% 67.27/67.68 Y := Y
% 67.27/67.68 end
% 67.27/67.68 substitution1:
% 67.27/67.68 X := X
% 67.27/67.68 Y := meet( Z, Y )
% 67.27/67.68 Z := meet( Y, Z )
% 67.27/67.68 end
% 67.27/67.68
% 67.27/67.68 paramod: (147347) {G5,W11,D4,L1,V3,M1} { composition( X, meet( Y, Z ) ) =
% 67.27/67.68 composition( X, meet( Z, Y ) ) }.
% 67.27/67.68 parent0[0]: (2544) {G23,W11,D4,L1,V2,M1} P(988,2510);d(747) { join( meet( X
% 67.27/67.69 , Y ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 67.27/67.69 parent1[0; 3]: (147345) {G4,W15,D5,L1,V3,M1} { composition( X, join( meet
% 67.27/67.69 ( Y, Z ), meet( Z, Y ) ) ) = composition( X, meet( Z, Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := Z
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (8755) {G24,W11,D4,L1,V3,M1} P(2544,247);d(2544) { composition
% 67.27/67.69 ( Z, meet( X, Y ) ) = composition( Z, meet( Y, X ) ) }.
% 67.27/67.69 parent0: (147347) {G5,W11,D4,L1,V3,M1} { composition( X, meet( Y, Z ) ) =
% 67.27/67.69 composition( X, meet( Z, Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Z
% 67.27/67.69 Y := X
% 67.27/67.69 Z := Y
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147351) {G2,W15,D5,L1,V3,M1} { composition( join( meet( X, Y ),
% 67.27/67.69 meet( Y, X ) ), Z ) = composition( meet( Y, X ), Z ) }.
% 67.27/67.69 parent0[0]: (2544) {G23,W11,D4,L1,V2,M1} P(988,2510);d(747) { join( meet( X
% 67.27/67.69 , Y ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 67.27/67.69 parent1[0; 11]: (95) {G1,W11,D4,L1,V3,M1} P(6,0);d(6) { composition( join(
% 67.27/67.69 X, Z ), Y ) = composition( join( Z, X ), Y ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := meet( X, Y )
% 67.27/67.69 Y := Z
% 67.27/67.69 Z := meet( Y, X )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147353) {G3,W11,D4,L1,V3,M1} { composition( meet( X, Y ), Z ) =
% 67.27/67.69 composition( meet( Y, X ), Z ) }.
% 67.27/67.69 parent0[0]: (2544) {G23,W11,D4,L1,V2,M1} P(988,2510);d(747) { join( meet( X
% 67.27/67.69 , Y ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 67.27/67.69 parent1[0; 2]: (147351) {G2,W15,D5,L1,V3,M1} { composition( join( meet( X
% 67.27/67.69 , Y ), meet( Y, X ) ), Z ) = composition( meet( Y, X ), Z ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (8758) {G24,W11,D4,L1,V3,M1} P(2544,95);d(2544) { composition
% 67.27/67.69 ( meet( X, Y ), Z ) = composition( meet( Y, X ), Z ) }.
% 67.27/67.69 parent0: (147353) {G3,W11,D4,L1,V3,M1} { composition( meet( X, Y ), Z ) =
% 67.27/67.69 composition( meet( Y, X ), Z ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147355) {G19,W11,D4,L1,V3,M1} { meet( Z, meet( Y, X ) ) = meet(
% 67.27/67.69 meet( X, Y ), Z ) }.
% 67.27/67.69 parent0[0]: (7708) {G19,W11,D4,L1,V3,M1} P(996,75) { meet( meet( Y, X ), Z
% 67.27/67.69 ) = meet( Z, meet( X, Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147358) {G20,W15,D5,L1,V3,M1} { meet( X, meet( join( Y, Z ),
% 67.27/67.69 join( Z, Y ) ) ) = meet( join( Y, Z ), X ) }.
% 67.27/67.69 parent0[0]: (2071) {G20,W11,D4,L1,V2,M1} P(1655,1373);d(749);d(756) { meet
% 67.27/67.69 ( join( Y, X ), join( X, Y ) ) ==> join( X, Y ) }.
% 67.27/67.69 parent1[0; 11]: (147355) {G19,W11,D4,L1,V3,M1} { meet( Z, meet( Y, X ) ) =
% 67.27/67.69 meet( meet( X, Y ), Z ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := Z
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := join( Z, Y )
% 67.27/67.69 Y := join( Y, Z )
% 67.27/67.69 Z := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147360) {G21,W11,D4,L1,V3,M1} { meet( X, join( Z, Y ) ) = meet(
% 67.27/67.69 join( Y, Z ), X ) }.
% 67.27/67.69 parent0[0]: (2071) {G20,W11,D4,L1,V2,M1} P(1655,1373);d(749);d(756) { meet
% 67.27/67.69 ( join( Y, X ), join( X, Y ) ) ==> join( X, Y ) }.
% 67.27/67.69 parent1[0; 3]: (147358) {G20,W15,D5,L1,V3,M1} { meet( X, meet( join( Y, Z
% 67.27/67.69 ), join( Z, Y ) ) ) = meet( join( Y, Z ), X ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Z
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147361) {G21,W11,D4,L1,V3,M1} { meet( join( Z, Y ), X ) = meet( X
% 67.27/67.69 , join( Y, Z ) ) }.
% 67.27/67.69 parent0[0]: (147360) {G21,W11,D4,L1,V3,M1} { meet( X, join( Z, Y ) ) =
% 67.27/67.69 meet( join( Y, Z ), X ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Z
% 67.27/67.69 Z := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (8800) {G21,W11,D4,L1,V3,M1} P(2071,7708);d(2071) { meet( join
% 67.27/67.69 ( Y, X ), Z ) = meet( Z, join( X, Y ) ) }.
% 67.27/67.69 parent0: (147361) {G21,W11,D4,L1,V3,M1} { meet( join( Z, Y ), X ) = meet(
% 67.27/67.69 X, join( Y, Z ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Z
% 67.27/67.69 Y := X
% 67.27/67.69 Z := Y
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147365) {G19,W15,D5,L1,V3,M1} { meet( meet( join( X, Y ), join(
% 67.27/67.69 Y, X ) ), Z ) = meet( join( X, Y ), Z ) }.
% 67.27/67.69 parent0[0]: (2071) {G20,W11,D4,L1,V2,M1} P(1655,1373);d(749);d(756) { meet
% 67.27/67.69 ( join( Y, X ), join( X, Y ) ) ==> join( X, Y ) }.
% 67.27/67.69 parent1[0; 11]: (996) {G18,W11,D4,L1,V3,M1} P(972,3);d(3) { meet( meet( Y,
% 67.27/67.69 X ), Z ) = meet( meet( X, Y ), Z ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := join( Y, X )
% 67.27/67.69 Y := join( X, Y )
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147367) {G20,W11,D4,L1,V3,M1} { meet( join( Y, X ), Z ) = meet(
% 67.27/67.69 join( X, Y ), Z ) }.
% 67.27/67.69 parent0[0]: (2071) {G20,W11,D4,L1,V2,M1} P(1655,1373);d(749);d(756) { meet
% 67.27/67.69 ( join( Y, X ), join( X, Y ) ) ==> join( X, Y ) }.
% 67.27/67.69 parent1[0; 2]: (147365) {G19,W15,D5,L1,V3,M1} { meet( meet( join( X, Y ),
% 67.27/67.69 join( Y, X ) ), Z ) = meet( join( X, Y ), Z ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (8801) {G21,W11,D4,L1,V3,M1} P(2071,996);d(2071) { meet( join
% 67.27/67.69 ( Y, X ), Z ) = meet( join( X, Y ), Z ) }.
% 67.27/67.69 parent0: (147367) {G20,W11,D4,L1,V3,M1} { meet( join( Y, X ), Z ) = meet(
% 67.27/67.69 join( X, Y ), Z ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147369) {G24,W11,D5,L1,V2,M1} { meet( complement( Y ), X ) ==>
% 67.27/67.69 meet( complement( meet( X, Y ) ), X ) }.
% 67.27/67.69 parent0[0]: (3177) {G24,W11,D5,L1,V2,M1} P(2564,771);d(771);d(950);d(773)
% 67.27/67.69 { meet( complement( meet( X, Y ) ), X ) ==> meet( complement( Y ), X )
% 67.27/67.69 }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147375) {G18,W12,D5,L1,V2,M1} { meet( complement( complement( X
% 67.27/67.69 ) ), Y ) ==> meet( join( complement( Y ), X ), Y ) }.
% 67.27/67.69 parent0[0]: (951) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet( Y,
% 67.27/67.69 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 67.27/67.69 parent1[0; 7]: (147369) {G24,W11,D5,L1,V2,M1} { meet( complement( Y ), X )
% 67.27/67.69 ==> meet( complement( meet( X, Y ) ), X ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := complement( X )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147376) {G16,W10,D5,L1,V2,M1} { meet( X, Y ) ==> meet( join(
% 67.27/67.69 complement( Y ), X ), Y ) }.
% 67.27/67.69 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.69 complement( X ) ) ==> X }.
% 67.27/67.69 parent1[0; 2]: (147375) {G18,W12,D5,L1,V2,M1} { meet( complement(
% 67.27/67.69 complement( X ) ), Y ) ==> meet( join( complement( Y ), X ), Y ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147377) {G16,W10,D5,L1,V2,M1} { meet( join( complement( Y ), X )
% 67.27/67.69 , Y ) ==> meet( X, Y ) }.
% 67.27/67.69 parent0[0]: (147376) {G16,W10,D5,L1,V2,M1} { meet( X, Y ) ==> meet( join(
% 67.27/67.69 complement( Y ), X ), Y ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (10113) {G25,W10,D5,L1,V2,M1} P(951,3177);d(756) { meet( join
% 67.27/67.69 ( complement( X ), Y ), X ) ==> meet( Y, X ) }.
% 67.27/67.69 parent0: (147377) {G16,W10,D5,L1,V2,M1} { meet( join( complement( Y ), X )
% 67.27/67.69 , Y ) ==> meet( X, Y ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147378) {G25,W10,D5,L1,V2,M1} { meet( Y, X ) ==> meet( join(
% 67.27/67.69 complement( X ), Y ), X ) }.
% 67.27/67.69 parent0[0]: (10113) {G25,W10,D5,L1,V2,M1} P(951,3177);d(756) { meet( join(
% 67.27/67.69 complement( X ), Y ), X ) ==> meet( Y, X ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147380) {G22,W10,D5,L1,V2,M1} { meet( X, Y ) ==> meet( join( X,
% 67.27/67.69 complement( Y ) ), Y ) }.
% 67.27/67.69 parent0[0]: (8801) {G21,W11,D4,L1,V3,M1} P(2071,996);d(2071) { meet( join(
% 67.27/67.69 Y, X ), Z ) = meet( join( X, Y ), Z ) }.
% 67.27/67.69 parent1[0; 4]: (147378) {G25,W10,D5,L1,V2,M1} { meet( Y, X ) ==> meet(
% 67.27/67.69 join( complement( X ), Y ), X ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := complement( Y )
% 67.27/67.69 Z := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147386) {G22,W10,D5,L1,V2,M1} { meet( join( X, complement( Y ) )
% 67.27/67.69 , Y ) ==> meet( X, Y ) }.
% 67.27/67.69 parent0[0]: (147380) {G22,W10,D5,L1,V2,M1} { meet( X, Y ) ==> meet( join(
% 67.27/67.69 X, complement( Y ) ), Y ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (10123) {G26,W10,D5,L1,V2,M1} P(10113,8801) { meet( join( Y,
% 67.27/67.69 complement( X ) ), X ) ==> meet( Y, X ) }.
% 67.27/67.69 parent0: (147386) {G22,W10,D5,L1,V2,M1} { meet( join( X, complement( Y ) )
% 67.27/67.69 , Y ) ==> meet( X, Y ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147387) {G25,W10,D5,L1,V2,M1} { meet( Y, X ) ==> meet( join(
% 67.27/67.69 complement( X ), Y ), X ) }.
% 67.27/67.69 parent0[0]: (10113) {G25,W10,D5,L1,V2,M1} P(951,3177);d(756) { meet( join(
% 67.27/67.69 complement( X ), Y ), X ) ==> meet( Y, X ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147406) {G22,W10,D5,L1,V2,M1} { meet( X, Y ) ==> meet( Y, join(
% 67.27/67.69 X, complement( Y ) ) ) }.
% 67.27/67.69 parent0[0]: (8800) {G21,W11,D4,L1,V3,M1} P(2071,7708);d(2071) { meet( join
% 67.27/67.69 ( Y, X ), Z ) = meet( Z, join( X, Y ) ) }.
% 67.27/67.69 parent1[0; 4]: (147387) {G25,W10,D5,L1,V2,M1} { meet( Y, X ) ==> meet(
% 67.27/67.69 join( complement( X ), Y ), X ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := complement( Y )
% 67.27/67.69 Z := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147410) {G22,W10,D5,L1,V2,M1} { meet( Y, join( X, complement( Y )
% 67.27/67.69 ) ) ==> meet( X, Y ) }.
% 67.27/67.69 parent0[0]: (147406) {G22,W10,D5,L1,V2,M1} { meet( X, Y ) ==> meet( Y,
% 67.27/67.69 join( X, complement( Y ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (10124) {G26,W10,D5,L1,V2,M1} P(10113,8800) { meet( X, join( Y
% 67.27/67.69 , complement( X ) ) ) ==> meet( Y, X ) }.
% 67.27/67.69 parent0: (147410) {G22,W10,D5,L1,V2,M1} { meet( Y, join( X, complement( Y
% 67.27/67.69 ) ) ) ==> meet( X, Y ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147412) {G23,W11,D4,L1,V2,M1} { meet( X, Y ) ==> join( meet( X, Y
% 67.27/67.69 ), meet( Y, X ) ) }.
% 67.27/67.69 parent0[0]: (2544) {G23,W11,D4,L1,V2,M1} P(988,2510);d(747) { join( meet( X
% 67.27/67.69 , Y ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147416) {G24,W17,D6,L1,V2,M1} { meet( X, join( complement( X ),
% 67.27/67.69 Y ) ) ==> join( meet( X, join( complement( X ), Y ) ), meet( Y, X ) ) }.
% 67.27/67.69 parent0[0]: (10113) {G25,W10,D5,L1,V2,M1} P(951,3177);d(756) { meet( join(
% 67.27/67.69 complement( X ), Y ), X ) ==> meet( Y, X ) }.
% 67.27/67.69 parent1[0; 14]: (147412) {G23,W11,D4,L1,V2,M1} { meet( X, Y ) ==> join(
% 67.27/67.69 meet( X, Y ), meet( Y, X ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := join( complement( X ), Y )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147418) {G25,W10,D5,L1,V2,M1} { meet( X, join( complement( X ),
% 67.27/67.69 Y ) ) ==> meet( Y, X ) }.
% 67.27/67.69 parent0[0]: (3086) {G28,W14,D6,L1,V2,M1} P(1389,3070);d(951) { join( meet(
% 67.27/67.69 X, join( complement( X ), Y ) ), meet( Y, X ) ) ==> meet( Y, X ) }.
% 67.27/67.69 parent1[0; 7]: (147416) {G24,W17,D6,L1,V2,M1} { meet( X, join( complement
% 67.27/67.69 ( X ), Y ) ) ==> join( meet( X, join( complement( X ), Y ) ), meet( Y, X
% 67.27/67.69 ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (10127) {G29,W10,D5,L1,V2,M1} P(10113,2544);d(3086) { meet( X
% 67.27/67.69 , join( complement( X ), Y ) ) ==> meet( Y, X ) }.
% 67.27/67.69 parent0: (147418) {G25,W10,D5,L1,V2,M1} { meet( X, join( complement( X ),
% 67.27/67.69 Y ) ) ==> meet( Y, X ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147421) {G26,W10,D5,L1,V2,M1} { meet( X, Y ) ==> meet( join( X,
% 67.27/67.69 complement( Y ) ), Y ) }.
% 67.27/67.69 parent0[0]: (10123) {G26,W10,D5,L1,V2,M1} P(10113,8801) { meet( join( Y,
% 67.27/67.69 complement( X ) ), X ) ==> meet( Y, X ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147422) {G16,W11,D4,L1,V2,M1} { meet( X, complement( Y ) ) ==>
% 67.27/67.69 meet( join( X, Y ), complement( Y ) ) }.
% 67.27/67.69 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.69 complement( X ) ) ==> X }.
% 67.27/67.69 parent1[0; 8]: (147421) {G26,W10,D5,L1,V2,M1} { meet( X, Y ) ==> meet(
% 67.27/67.69 join( X, complement( Y ) ), Y ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := complement( Y )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147423) {G16,W11,D4,L1,V2,M1} { meet( join( X, Y ), complement( Y
% 67.27/67.69 ) ) ==> meet( X, complement( Y ) ) }.
% 67.27/67.69 parent0[0]: (147422) {G16,W11,D4,L1,V2,M1} { meet( X, complement( Y ) )
% 67.27/67.69 ==> meet( join( X, Y ), complement( Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (10143) {G27,W11,D4,L1,V2,M1} P(756,10123) { meet( join( Y, X
% 67.27/67.69 ), complement( X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.69 parent0: (147423) {G16,W11,D4,L1,V2,M1} { meet( join( X, Y ), complement(
% 67.27/67.69 Y ) ) ==> meet( X, complement( Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147425) {G26,W10,D5,L1,V2,M1} { meet( Y, X ) ==> meet( X, join( Y
% 67.27/67.69 , complement( X ) ) ) }.
% 67.27/67.69 parent0[0]: (10124) {G26,W10,D5,L1,V2,M1} P(10113,8800) { meet( X, join( Y
% 67.27/67.69 , complement( X ) ) ) ==> meet( Y, X ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147426) {G16,W11,D4,L1,V2,M1} { meet( X, complement( Y ) ) ==>
% 67.27/67.69 meet( complement( Y ), join( X, Y ) ) }.
% 67.27/67.69 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.69 complement( X ) ) ==> X }.
% 67.27/67.69 parent1[0; 10]: (147425) {G26,W10,D5,L1,V2,M1} { meet( Y, X ) ==> meet( X
% 67.27/67.69 , join( Y, complement( X ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := complement( Y )
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147427) {G16,W11,D4,L1,V2,M1} { meet( complement( Y ), join( X, Y
% 67.27/67.69 ) ) ==> meet( X, complement( Y ) ) }.
% 67.27/67.69 parent0[0]: (147426) {G16,W11,D4,L1,V2,M1} { meet( X, complement( Y ) )
% 67.27/67.69 ==> meet( complement( Y ), join( X, Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (10148) {G27,W11,D4,L1,V2,M1} P(756,10124) { meet( complement
% 67.27/67.69 ( X ), join( Y, X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.69 parent0: (147427) {G16,W11,D4,L1,V2,M1} { meet( complement( Y ), join( X,
% 67.27/67.69 Y ) ) ==> meet( X, complement( Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147429) {G20,W11,D5,L1,V2,M1} { zero ==> composition( composition
% 67.27/67.69 ( X, converse( Y ) ), complement( composition( Y, top ) ) ) }.
% 67.27/67.69 parent0[0]: (1495) {G20,W11,D5,L1,V2,M1} P(1486,4);d(796) { composition(
% 67.27/67.69 composition( Y, converse( X ) ), complement( composition( X, top ) ) )
% 67.27/67.69 ==> zero }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147432) {G1,W11,D5,L1,V2,M1} { zero ==> composition( converse(
% 67.27/67.69 composition( Y, X ) ), complement( composition( Y, top ) ) ) }.
% 67.27/67.69 parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ),
% 67.27/67.69 converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 67.27/67.69 parent1[0; 3]: (147429) {G20,W11,D5,L1,V2,M1} { zero ==> composition(
% 67.27/67.69 composition( X, converse( Y ) ), complement( composition( Y, top ) ) )
% 67.27/67.69 }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := converse( X )
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147433) {G1,W11,D5,L1,V2,M1} { composition( converse( composition
% 67.27/67.69 ( X, Y ) ), complement( composition( X, top ) ) ) ==> zero }.
% 67.27/67.69 parent0[0]: (147432) {G1,W11,D5,L1,V2,M1} { zero ==> composition( converse
% 67.27/67.69 ( composition( Y, X ) ), complement( composition( Y, top ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (10493) {G21,W11,D5,L1,V2,M1} P(9,1495) { composition(
% 67.27/67.69 converse( composition( Y, X ) ), complement( composition( Y, top ) ) )
% 67.27/67.69 ==> zero }.
% 67.27/67.69 parent0: (147433) {G1,W11,D5,L1,V2,M1} { composition( converse(
% 67.27/67.69 composition( X, Y ) ), complement( composition( X, top ) ) ) ==> zero }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147435) {G1,W13,D7,L1,V2,M1} { complement( Y ) ==> join(
% 67.27/67.69 composition( X, complement( composition( converse( X ), Y ) ) ),
% 67.27/67.69 complement( Y ) ) }.
% 67.27/67.69 parent0[0]: (112) {G1,W13,D7,L1,V2,M1} P(7,10) { join( composition( X,
% 67.27/67.69 complement( composition( converse( X ), Y ) ) ), complement( Y ) ) ==>
% 67.27/67.69 complement( Y ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147439) {G2,W18,D6,L1,V2,M1} { complement( complement(
% 67.27/67.69 composition( X, top ) ) ) ==> join( composition( composition( X, Y ),
% 67.27/67.69 complement( zero ) ), complement( complement( composition( X, top ) ) ) )
% 67.27/67.69 }.
% 67.27/67.69 parent0[0]: (10493) {G21,W11,D5,L1,V2,M1} P(9,1495) { composition( converse
% 67.27/67.69 ( composition( Y, X ) ), complement( composition( Y, top ) ) ) ==> zero
% 67.27/67.69 }.
% 67.27/67.69 parent1[0; 12]: (147435) {G1,W13,D7,L1,V2,M1} { complement( Y ) ==> join(
% 67.27/67.69 composition( X, complement( composition( converse( X ), Y ) ) ),
% 67.27/67.69 complement( Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := composition( X, Y )
% 67.27/67.69 Y := complement( composition( X, top ) )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147440) {G3,W17,D6,L1,V2,M1} { complement( complement(
% 67.27/67.69 composition( X, top ) ) ) ==> join( composition( composition( X, Y ), top
% 67.27/67.69 ), complement( complement( composition( X, top ) ) ) ) }.
% 67.27/67.69 parent0[0]: (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) { complement
% 67.27/67.69 ( zero ) ==> top }.
% 67.27/67.69 parent1[0; 11]: (147439) {G2,W18,D6,L1,V2,M1} { complement( complement(
% 67.27/67.69 composition( X, top ) ) ) ==> join( composition( composition( X, Y ),
% 67.27/67.69 complement( zero ) ), complement( complement( composition( X, top ) ) ) )
% 67.27/67.69 }.
% 67.27/67.69 substitution0:
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147442) {G4,W15,D5,L1,V2,M1} { complement( complement(
% 67.27/67.69 composition( X, top ) ) ) ==> join( composition( composition( X, Y ), top
% 67.27/67.69 ), composition( X, top ) ) }.
% 67.27/67.69 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.69 complement( X ) ) ==> X }.
% 67.27/67.69 parent1[0; 12]: (147440) {G3,W17,D6,L1,V2,M1} { complement( complement(
% 67.27/67.69 composition( X, top ) ) ) ==> join( composition( composition( X, Y ), top
% 67.27/67.69 ), complement( complement( composition( X, top ) ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := composition( X, top )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147443) {G5,W13,D5,L1,V2,M1} { composition( X, top ) ==> join(
% 67.27/67.69 composition( composition( X, Y ), top ), composition( X, top ) ) }.
% 67.27/67.69 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.69 complement( X ) ) ==> X }.
% 67.27/67.69 parent1[0; 1]: (147442) {G4,W15,D5,L1,V2,M1} { complement( complement(
% 67.27/67.69 composition( X, top ) ) ) ==> join( composition( composition( X, Y ), top
% 67.27/67.69 ), composition( X, top ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := composition( X, top )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147446) {G1,W11,D5,L1,V2,M1} { composition( X, top ) ==>
% 67.27/67.69 composition( join( composition( X, Y ), X ), top ) }.
% 67.27/67.69 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 67.27/67.69 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 67.27/67.69 parent1[0; 4]: (147443) {G5,W13,D5,L1,V2,M1} { composition( X, top ) ==>
% 67.27/67.69 join( composition( composition( X, Y ), top ), composition( X, top ) )
% 67.27/67.69 }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := composition( X, Y )
% 67.27/67.69 Y := X
% 67.27/67.69 Z := top
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147447) {G1,W11,D5,L1,V2,M1} { composition( join( composition( X
% 67.27/67.69 , Y ), X ), top ) ==> composition( X, top ) }.
% 67.27/67.69 parent0[0]: (147446) {G1,W11,D5,L1,V2,M1} { composition( X, top ) ==>
% 67.27/67.69 composition( join( composition( X, Y ), X ), top ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (10497) {G22,W11,D5,L1,V2,M1} P(10493,112);d(744);d(756);d(6)
% 67.27/67.69 { composition( join( composition( X, Y ), X ), top ) ==> composition( X
% 67.27/67.69 , top ) }.
% 67.27/67.69 parent0: (147447) {G1,W11,D5,L1,V2,M1} { composition( join( composition( X
% 67.27/67.69 , Y ), X ), top ) ==> composition( X, top ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147449) {G1,W13,D6,L1,V2,M1} { complement( X ) ==> join(
% 67.27/67.69 complement( X ), composition( converse( Y ), complement( composition( Y,
% 67.27/67.69 X ) ) ) ) }.
% 67.27/67.69 parent0[0]: (111) {G1,W13,D6,L1,V2,M1} P(10,0) { join( complement( Y ),
% 67.27/67.69 composition( converse( X ), complement( composition( X, Y ) ) ) ) ==>
% 67.27/67.69 complement( Y ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147454) {G2,W20,D7,L1,V2,M1} { complement( complement(
% 67.27/67.69 composition( X, top ) ) ) ==> join( complement( complement( composition(
% 67.27/67.69 X, top ) ) ), composition( converse( converse( composition( X, Y ) ) ),
% 67.27/67.69 complement( zero ) ) ) }.
% 67.27/67.69 parent0[0]: (10493) {G21,W11,D5,L1,V2,M1} P(9,1495) { composition( converse
% 67.27/67.69 ( composition( Y, X ) ), complement( composition( Y, top ) ) ) ==> zero
% 67.27/67.69 }.
% 67.27/67.69 parent1[0; 19]: (147449) {G1,W13,D6,L1,V2,M1} { complement( X ) ==> join(
% 67.27/67.69 complement( X ), composition( converse( Y ), complement( composition( Y,
% 67.27/67.69 X ) ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := complement( composition( X, top ) )
% 67.27/67.69 Y := converse( composition( X, Y ) )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147456) {G3,W18,D7,L1,V2,M1} { complement( complement(
% 67.27/67.69 composition( X, top ) ) ) ==> join( composition( X, top ), composition(
% 67.27/67.69 converse( converse( composition( X, Y ) ) ), complement( zero ) ) ) }.
% 67.27/67.69 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.69 complement( X ) ) ==> X }.
% 67.27/67.69 parent1[0; 7]: (147454) {G2,W20,D7,L1,V2,M1} { complement( complement(
% 67.27/67.69 composition( X, top ) ) ) ==> join( complement( complement( composition(
% 67.27/67.69 X, top ) ) ), composition( converse( converse( composition( X, Y ) ) ),
% 67.27/67.69 complement( zero ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := composition( X, top )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147457) {G4,W16,D7,L1,V2,M1} { composition( X, top ) ==> join(
% 67.27/67.69 composition( X, top ), composition( converse( converse( composition( X, Y
% 67.27/67.69 ) ) ), complement( zero ) ) ) }.
% 67.27/67.69 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.69 complement( X ) ) ==> X }.
% 67.27/67.69 parent1[0; 1]: (147456) {G3,W18,D7,L1,V2,M1} { complement( complement(
% 67.27/67.69 composition( X, top ) ) ) ==> join( composition( X, top ), composition(
% 67.27/67.69 converse( converse( composition( X, Y ) ) ), complement( zero ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := composition( X, top )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147462) {G1,W14,D5,L1,V2,M1} { composition( X, top ) ==> join(
% 67.27/67.69 composition( X, top ), composition( composition( X, Y ), complement( zero
% 67.27/67.69 ) ) ) }.
% 67.27/67.69 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.27/67.69 parent1[0; 9]: (147457) {G4,W16,D7,L1,V2,M1} { composition( X, top ) ==>
% 67.27/67.69 join( composition( X, top ), composition( converse( converse( composition
% 67.27/67.69 ( X, Y ) ) ), complement( zero ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := composition( X, Y )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147463) {G2,W13,D5,L1,V2,M1} { composition( X, top ) ==> join(
% 67.27/67.69 composition( X, top ), composition( composition( X, Y ), top ) ) }.
% 67.27/67.69 parent0[0]: (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) { complement
% 67.27/67.69 ( zero ) ==> top }.
% 67.27/67.69 parent1[0; 12]: (147462) {G1,W14,D5,L1,V2,M1} { composition( X, top ) ==>
% 67.27/67.69 join( composition( X, top ), composition( composition( X, Y ), complement
% 67.27/67.69 ( zero ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147464) {G1,W11,D5,L1,V2,M1} { composition( X, top ) ==>
% 67.27/67.69 composition( join( X, composition( X, Y ) ), top ) }.
% 67.27/67.69 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 67.27/67.69 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 67.27/67.69 parent1[0; 4]: (147463) {G2,W13,D5,L1,V2,M1} { composition( X, top ) ==>
% 67.27/67.69 join( composition( X, top ), composition( composition( X, Y ), top ) )
% 67.27/67.69 }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := composition( X, Y )
% 67.27/67.69 Z := top
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147465) {G1,W11,D5,L1,V2,M1} { composition( join( X, composition
% 67.27/67.69 ( X, Y ) ), top ) ==> composition( X, top ) }.
% 67.27/67.69 parent0[0]: (147464) {G1,W11,D5,L1,V2,M1} { composition( X, top ) ==>
% 67.27/67.69 composition( join( X, composition( X, Y ) ), top ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (10498) {G22,W11,D5,L1,V2,M1} P(10493,111);d(756);d(7);d(744);
% 67.27/67.69 d(6) { composition( join( X, composition( X, Y ) ), top ) ==> composition
% 67.27/67.69 ( X, top ) }.
% 67.27/67.69 parent0: (147465) {G1,W11,D5,L1,V2,M1} { composition( join( X, composition
% 67.27/67.69 ( X, Y ) ), top ) ==> composition( X, top ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147467) {G31,W9,D5,L1,V2,M1} { X ==> meet( composition( join( X,
% 67.27/67.69 Y ), top ), X ) }.
% 67.27/67.69 parent0[0]: (3851) {G31,W9,D5,L1,V2,M1} P(3733,1052) { meet( composition(
% 67.27/67.69 join( X, Y ), top ), X ) ==> X }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147468) {G23,W11,D4,L1,V2,M1} { composition( X, Y ) ==> meet(
% 67.27/67.69 composition( X, top ), composition( X, Y ) ) }.
% 67.27/67.69 parent0[0]: (10497) {G22,W11,D5,L1,V2,M1} P(10493,112);d(744);d(756);d(6)
% 67.27/67.69 { composition( join( composition( X, Y ), X ), top ) ==> composition( X
% 67.27/67.69 , top ) }.
% 67.27/67.69 parent1[0; 5]: (147467) {G31,W9,D5,L1,V2,M1} { X ==> meet( composition(
% 67.27/67.69 join( X, Y ), top ), X ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := composition( X, Y )
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147469) {G23,W11,D4,L1,V2,M1} { meet( composition( X, top ),
% 67.27/67.69 composition( X, Y ) ) ==> composition( X, Y ) }.
% 67.27/67.69 parent0[0]: (147468) {G23,W11,D4,L1,V2,M1} { composition( X, Y ) ==> meet
% 67.27/67.69 ( composition( X, top ), composition( X, Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (11288) {G32,W11,D4,L1,V2,M1} P(10497,3851) { meet(
% 67.27/67.69 composition( X, top ), composition( X, Y ) ) ==> composition( X, Y ) }.
% 67.27/67.69 parent0: (147469) {G23,W11,D4,L1,V2,M1} { meet( composition( X, top ),
% 67.27/67.69 composition( X, Y ) ) ==> composition( X, Y ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147471) {G16,W10,D5,L1,V2,M1} { meet( X, complement( Y ) ) ==>
% 67.27/67.69 complement( join( complement( X ), Y ) ) }.
% 67.27/67.69 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.69 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147476) {G17,W12,D6,L1,V1,M1} { meet( converse( X ), complement
% 67.27/67.69 ( one ) ) ==> complement( converse( join( complement( X ), one ) ) ) }.
% 67.27/67.69 parent0[0]: (2885) {G28,W11,D5,L1,V1,M1} P(2866,190) { join( complement(
% 67.27/67.69 converse( X ) ), one ) ==> converse( join( complement( X ), one ) ) }.
% 67.27/67.69 parent1[0; 7]: (147471) {G16,W10,D5,L1,V2,M1} { meet( X, complement( Y ) )
% 67.27/67.69 ==> complement( join( complement( X ), Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := converse( X )
% 67.27/67.69 Y := one
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147477) {G18,W11,D5,L1,V1,M1} { meet( converse( X ), complement
% 67.27/67.69 ( one ) ) ==> converse( meet( X, complement( one ) ) ) }.
% 67.27/67.69 parent0[0]: (2845) {G27,W12,D6,L1,V2,M1} P(951,2796) { complement( converse
% 67.27/67.69 ( join( complement( X ), Y ) ) ) ==> converse( meet( X, complement( Y ) )
% 67.27/67.69 ) }.
% 67.27/67.69 parent1[0; 6]: (147476) {G17,W12,D6,L1,V1,M1} { meet( converse( X ),
% 67.27/67.69 complement( one ) ) ==> complement( converse( join( complement( X ), one
% 67.27/67.69 ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := one
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (12255) {G29,W11,D5,L1,V1,M1} P(2885,772);d(2845) { meet(
% 67.27/67.69 converse( X ), complement( one ) ) ==> converse( meet( X, complement( one
% 67.27/67.69 ) ) ) }.
% 67.27/67.69 parent0: (147477) {G18,W11,D5,L1,V1,M1} { meet( converse( X ), complement
% 67.27/67.69 ( one ) ) ==> converse( meet( X, complement( one ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147480) {G23,W11,D4,L1,V2,M1} { join( Y, complement( X ) ) ==>
% 67.27/67.69 join( complement( X ), meet( X, Y ) ) }.
% 67.27/67.69 parent0[0]: (2464) {G23,W11,D4,L1,V2,M1} P(2431,898);d(1);d(887) { join(
% 67.27/67.69 complement( Y ), meet( Y, X ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147486) {G24,W16,D6,L1,V1,M1} { join( complement( one ),
% 67.27/67.69 complement( converse( X ) ) ) ==> join( complement( converse( X ) ),
% 67.27/67.69 converse( meet( X, complement( one ) ) ) ) }.
% 67.27/67.69 parent0[0]: (12255) {G29,W11,D5,L1,V1,M1} P(2885,772);d(2845) { meet(
% 67.27/67.69 converse( X ), complement( one ) ) ==> converse( meet( X, complement( one
% 67.27/67.69 ) ) ) }.
% 67.27/67.69 parent1[0; 11]: (147480) {G23,W11,D4,L1,V2,M1} { join( Y, complement( X )
% 67.27/67.69 ) ==> join( complement( X ), meet( X, Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := converse( X )
% 67.27/67.69 Y := complement( one )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147487) {G25,W15,D6,L1,V1,M1} { join( complement( one ),
% 67.27/67.69 complement( converse( X ) ) ) ==> converse( join( complement( X ), meet(
% 67.27/67.69 X, complement( one ) ) ) ) }.
% 67.27/67.69 parent0[0]: (2894) {G28,W12,D5,L1,V2,M1} P(2866,8) { join( complement(
% 67.27/67.69 converse( X ) ), converse( Y ) ) ==> converse( join( complement( X ), Y )
% 67.27/67.69 ) }.
% 67.27/67.69 parent1[0; 7]: (147486) {G24,W16,D6,L1,V1,M1} { join( complement( one ),
% 67.27/67.69 complement( converse( X ) ) ) ==> join( complement( converse( X ) ),
% 67.27/67.69 converse( meet( X, complement( one ) ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := meet( X, complement( one ) )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147488) {G24,W13,D5,L1,V1,M1} { join( complement( one ),
% 67.27/67.69 complement( converse( X ) ) ) ==> converse( join( complement( one ),
% 67.27/67.69 complement( X ) ) ) }.
% 67.27/67.69 parent0[0]: (2464) {G23,W11,D4,L1,V2,M1} P(2431,898);d(1);d(887) { join(
% 67.27/67.69 complement( Y ), meet( Y, X ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.69 parent1[0; 8]: (147487) {G25,W15,D6,L1,V1,M1} { join( complement( one ),
% 67.27/67.69 complement( converse( X ) ) ) ==> converse( join( complement( X ), meet(
% 67.27/67.69 X, complement( one ) ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := complement( one )
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147490) {G17,W12,D5,L1,V1,M1} { join( complement( one ),
% 67.27/67.69 complement( converse( X ) ) ) ==> converse( complement( meet( one, X ) )
% 67.27/67.69 ) }.
% 67.27/67.69 parent0[0]: (773) {G16,W10,D4,L1,V2,M1} P(3,756) { join( complement( X ),
% 67.27/67.69 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.27/67.69 parent1[0; 8]: (147488) {G24,W13,D5,L1,V1,M1} { join( complement( one ),
% 67.27/67.69 complement( converse( X ) ) ) ==> converse( join( complement( one ),
% 67.27/67.69 complement( X ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := one
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147492) {G18,W12,D5,L1,V1,M1} { join( complement( one ),
% 67.27/67.69 complement( converse( X ) ) ) ==> complement( converse( meet( one, X ) )
% 67.27/67.69 ) }.
% 67.27/67.69 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.69 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.69 parent1[0; 7]: (147490) {G17,W12,D5,L1,V1,M1} { join( complement( one ),
% 67.27/67.69 complement( converse( X ) ) ) ==> converse( complement( meet( one, X ) )
% 67.27/67.69 ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := meet( one, X )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147493) {G17,W11,D5,L1,V1,M1} { complement( meet( one, converse
% 67.27/67.69 ( X ) ) ) ==> complement( converse( meet( one, X ) ) ) }.
% 67.27/67.69 parent0[0]: (773) {G16,W10,D4,L1,V2,M1} P(3,756) { join( complement( X ),
% 67.27/67.69 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.27/67.69 parent1[0; 1]: (147492) {G18,W12,D5,L1,V1,M1} { join( complement( one ),
% 67.27/67.69 complement( converse( X ) ) ) ==> complement( converse( meet( one, X ) )
% 67.27/67.69 ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := one
% 67.27/67.69 Y := converse( X )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (12278) {G30,W11,D5,L1,V1,M1} P(12255,2464);d(2894);d(2464);d(
% 67.27/67.69 773);d(2866);d(773) { complement( meet( one, converse( X ) ) ) ==>
% 67.27/67.69 complement( converse( meet( one, X ) ) ) }.
% 67.27/67.69 parent0: (147493) {G17,W11,D5,L1,V1,M1} { complement( meet( one, converse
% 67.27/67.69 ( X ) ) ) ==> complement( converse( meet( one, X ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147496) {G15,W5,D4,L1,V1,M1} { X ==> complement( complement( X )
% 67.27/67.69 ) }.
% 67.27/67.69 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.69 complement( X ) ) ==> X }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147498) {G16,W11,D6,L1,V1,M1} { meet( one, converse( X ) ) ==>
% 67.27/67.69 complement( complement( converse( meet( one, X ) ) ) ) }.
% 67.27/67.69 parent0[0]: (12278) {G30,W11,D5,L1,V1,M1} P(12255,2464);d(2894);d(2464);d(
% 67.27/67.69 773);d(2866);d(773) { complement( meet( one, converse( X ) ) ) ==>
% 67.27/67.69 complement( converse( meet( one, X ) ) ) }.
% 67.27/67.69 parent1[0; 6]: (147496) {G15,W5,D4,L1,V1,M1} { X ==> complement(
% 67.27/67.69 complement( X ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := meet( one, converse( X ) )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147499) {G16,W9,D4,L1,V1,M1} { meet( one, converse( X ) ) ==>
% 67.27/67.69 converse( meet( one, X ) ) }.
% 67.27/67.69 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.69 complement( X ) ) ==> X }.
% 67.27/67.69 parent1[0; 5]: (147498) {G16,W11,D6,L1,V1,M1} { meet( one, converse( X ) )
% 67.27/67.69 ==> complement( complement( converse( meet( one, X ) ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := converse( meet( one, X ) )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (12372) {G31,W9,D4,L1,V1,M1} P(12278,756);d(756) { meet( one,
% 67.27/67.69 converse( X ) ) ==> converse( meet( one, X ) ) }.
% 67.27/67.69 parent0: (147499) {G16,W9,D4,L1,V1,M1} { meet( one, converse( X ) ) ==>
% 67.27/67.69 converse( meet( one, X ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147502) {G31,W9,D4,L1,V1,M1} { converse( meet( one, X ) ) ==>
% 67.27/67.69 meet( one, converse( X ) ) }.
% 67.27/67.69 parent0[0]: (12372) {G31,W9,D4,L1,V1,M1} P(12278,756);d(756) { meet( one,
% 67.27/67.69 converse( X ) ) ==> converse( meet( one, X ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147503) {G28,W11,D5,L1,V1,M1} { converse( meet( one, complement
% 67.27/67.69 ( X ) ) ) ==> meet( one, complement( converse( X ) ) ) }.
% 67.27/67.69 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.69 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.69 parent1[0; 8]: (147502) {G31,W9,D4,L1,V1,M1} { converse( meet( one, X ) )
% 67.27/67.69 ==> meet( one, converse( X ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := complement( X )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147504) {G28,W11,D5,L1,V1,M1} { meet( one, complement( converse(
% 67.27/67.69 X ) ) ) ==> converse( meet( one, complement( X ) ) ) }.
% 67.27/67.69 parent0[0]: (147503) {G28,W11,D5,L1,V1,M1} { converse( meet( one,
% 67.27/67.69 complement( X ) ) ) ==> meet( one, complement( converse( X ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (12392) {G32,W11,D5,L1,V1,M1} P(2866,12372) { meet( one,
% 67.27/67.69 complement( converse( X ) ) ) ==> converse( meet( one, complement( X ) )
% 67.27/67.69 ) }.
% 67.27/67.69 parent0: (147504) {G28,W11,D5,L1,V1,M1} { meet( one, complement( converse
% 67.27/67.69 ( X ) ) ) ==> converse( meet( one, complement( X ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147505) {G31,W9,D4,L1,V1,M1} { converse( meet( one, X ) ) ==>
% 67.27/67.69 meet( one, converse( X ) ) }.
% 67.27/67.69 parent0[0]: (12372) {G31,W9,D4,L1,V1,M1} P(12278,756);d(756) { meet( one,
% 67.27/67.69 converse( X ) ) ==> converse( meet( one, X ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147507) {G2,W9,D4,L1,V1,M1} { converse( meet( one, X ) ) ==>
% 67.27/67.69 meet( converse( X ), one ) }.
% 67.27/67.69 parent0[0]: (75) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 67.27/67.69 Y ) }.
% 67.27/67.69 parent1[0; 5]: (147505) {G31,W9,D4,L1,V1,M1} { converse( meet( one, X ) )
% 67.27/67.69 ==> meet( one, converse( X ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := converse( X )
% 67.27/67.69 Y := one
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147513) {G2,W9,D4,L1,V1,M1} { meet( converse( X ), one ) ==>
% 67.27/67.69 converse( meet( one, X ) ) }.
% 67.27/67.69 parent0[0]: (147507) {G2,W9,D4,L1,V1,M1} { converse( meet( one, X ) ) ==>
% 67.27/67.69 meet( converse( X ), one ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (12418) {G32,W9,D4,L1,V1,M1} P(12372,75) { meet( converse( X )
% 67.27/67.69 , one ) ==> converse( meet( one, X ) ) }.
% 67.27/67.69 parent0: (147513) {G2,W9,D4,L1,V1,M1} { meet( converse( X ), one ) ==>
% 67.27/67.69 converse( meet( one, X ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147515) {G31,W9,D4,L1,V1,M1} { converse( meet( one, X ) ) ==>
% 67.27/67.69 meet( one, converse( X ) ) }.
% 67.27/67.69 parent0[0]: (12372) {G31,W9,D4,L1,V1,M1} P(12278,756);d(756) { meet( one,
% 67.27/67.69 converse( X ) ) ==> converse( meet( one, X ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147516) {G2,W14,D6,L1,V2,M1} { converse( meet( one, join(
% 67.27/67.69 converse( X ), Y ) ) ) ==> meet( one, join( X, converse( Y ) ) ) }.
% 67.27/67.69 parent0[0]: (19) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 67.27/67.69 ), Y ) ) ==> join( X, converse( Y ) ) }.
% 67.27/67.69 parent1[0; 10]: (147515) {G31,W9,D4,L1,V1,M1} { converse( meet( one, X ) )
% 67.27/67.69 ==> meet( one, converse( X ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := join( converse( X ), Y )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (12419) {G32,W14,D6,L1,V2,M1} P(19,12372) { converse( meet(
% 67.27/67.69 one, join( converse( X ), Y ) ) ) ==> meet( one, join( X, converse( Y ) )
% 67.27/67.69 ) }.
% 67.27/67.69 parent0: (147516) {G2,W14,D6,L1,V2,M1} { converse( meet( one, join(
% 67.27/67.69 converse( X ), Y ) ) ) ==> meet( one, join( X, converse( Y ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147519) {G32,W9,D4,L1,V1,M1} { converse( meet( one, X ) ) ==>
% 67.27/67.69 meet( converse( X ), one ) }.
% 67.27/67.69 parent0[0]: (12418) {G32,W9,D4,L1,V1,M1} P(12372,75) { meet( converse( X )
% 67.27/67.69 , one ) ==> converse( meet( one, X ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147520) {G28,W11,D5,L1,V1,M1} { converse( meet( one, complement
% 67.27/67.69 ( X ) ) ) ==> meet( complement( converse( X ) ), one ) }.
% 67.27/67.69 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.69 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.69 parent1[0; 7]: (147519) {G32,W9,D4,L1,V1,M1} { converse( meet( one, X ) )
% 67.27/67.69 ==> meet( converse( X ), one ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := complement( X )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147521) {G28,W11,D5,L1,V1,M1} { meet( complement( converse( X ) )
% 67.27/67.69 , one ) ==> converse( meet( one, complement( X ) ) ) }.
% 67.27/67.69 parent0[0]: (147520) {G28,W11,D5,L1,V1,M1} { converse( meet( one,
% 67.27/67.69 complement( X ) ) ) ==> meet( complement( converse( X ) ), one ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (12420) {G33,W11,D5,L1,V1,M1} P(2866,12418) { meet( complement
% 67.27/67.69 ( converse( X ) ), one ) ==> converse( meet( one, complement( X ) ) ) }.
% 67.27/67.69 parent0: (147521) {G28,W11,D5,L1,V1,M1} { meet( complement( converse( X )
% 67.27/67.69 ), one ) ==> converse( meet( one, complement( X ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147523) {G1,W15,D7,L1,V2,M1} { complement( converse( Y ) ) ==>
% 67.27/67.69 join( composition( X, complement( converse( composition( Y, X ) ) ) ),
% 67.27/67.69 complement( converse( Y ) ) ) }.
% 67.27/67.69 parent0[0]: (110) {G1,W15,D7,L1,V2,M1} P(9,10);d(7) { join( composition( X
% 67.27/67.69 , complement( converse( composition( Y, X ) ) ) ), complement( converse(
% 67.27/67.69 Y ) ) ) ==> complement( converse( Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147528) {G2,W22,D7,L1,V1,M1} { complement( converse( converse(
% 67.27/67.69 composition( X, skol1 ) ) ) ) ==> join( composition( complement(
% 67.27/67.69 composition( X, skol1 ) ), complement( converse( zero ) ) ), complement(
% 67.27/67.69 converse( converse( composition( X, skol1 ) ) ) ) ) }.
% 67.27/67.69 parent0[0]: (1414) {G12,W11,D5,L1,V1,M1} S(103);d(740) { composition(
% 67.27/67.69 converse( composition( X, skol1 ) ), complement( composition( X, skol1 )
% 67.27/67.69 ) ) ==> zero }.
% 67.27/67.69 parent1[0; 15]: (147523) {G1,W15,D7,L1,V2,M1} { complement( converse( Y )
% 67.27/67.69 ) ==> join( composition( X, complement( converse( composition( Y, X ) )
% 67.27/67.69 ) ), complement( converse( Y ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := complement( composition( X, skol1 ) )
% 67.27/67.69 Y := converse( composition( X, skol1 ) )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147529) {G3,W21,D7,L1,V1,M1} { complement( converse( converse(
% 67.27/67.69 composition( X, skol1 ) ) ) ) ==> join( composition( complement(
% 67.27/67.69 composition( X, skol1 ) ), complement( zero ) ), complement( converse(
% 67.27/67.69 converse( composition( X, skol1 ) ) ) ) ) }.
% 67.27/67.69 parent0[0]: (776) {G15,W4,D3,L1,V0,M1} P(758,740) { converse( zero ) ==>
% 67.27/67.69 zero }.
% 67.27/67.69 parent1[0; 14]: (147528) {G2,W22,D7,L1,V1,M1} { complement( converse(
% 67.27/67.69 converse( composition( X, skol1 ) ) ) ) ==> join( composition( complement
% 67.27/67.69 ( composition( X, skol1 ) ), complement( converse( zero ) ) ), complement
% 67.27/67.69 ( converse( converse( composition( X, skol1 ) ) ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147530) {G4,W20,D7,L1,V1,M1} { complement( converse( converse(
% 67.27/67.69 composition( X, skol1 ) ) ) ) ==> join( composition( complement(
% 67.27/67.69 composition( X, skol1 ) ), top ), complement( converse( converse(
% 67.27/67.69 composition( X, skol1 ) ) ) ) ) }.
% 67.27/67.69 parent0[0]: (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) { complement
% 67.27/67.69 ( zero ) ==> top }.
% 67.27/67.69 parent1[0; 13]: (147529) {G3,W21,D7,L1,V1,M1} { complement( converse(
% 67.27/67.69 converse( composition( X, skol1 ) ) ) ) ==> join( composition( complement
% 67.27/67.69 ( composition( X, skol1 ) ), complement( zero ) ), complement( converse(
% 67.27/67.69 converse( composition( X, skol1 ) ) ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147532) {G1,W18,D6,L1,V1,M1} { complement( converse( converse(
% 67.27/67.69 composition( X, skol1 ) ) ) ) ==> join( composition( complement(
% 67.27/67.69 composition( X, skol1 ) ), top ), complement( composition( X, skol1 ) ) )
% 67.27/67.69 }.
% 67.27/67.69 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.27/67.69 parent1[0; 15]: (147530) {G4,W20,D7,L1,V1,M1} { complement( converse(
% 67.27/67.69 converse( composition( X, skol1 ) ) ) ) ==> join( composition( complement
% 67.27/67.69 ( composition( X, skol1 ) ), top ), complement( converse( converse(
% 67.27/67.69 composition( X, skol1 ) ) ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := composition( X, skol1 )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147533) {G1,W16,D6,L1,V1,M1} { complement( composition( X, skol1
% 67.27/67.69 ) ) ==> join( composition( complement( composition( X, skol1 ) ), top )
% 67.27/67.69 , complement( composition( X, skol1 ) ) ) }.
% 67.27/67.69 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.27/67.69 parent1[0; 2]: (147532) {G1,W18,D6,L1,V1,M1} { complement( converse(
% 67.27/67.69 converse( composition( X, skol1 ) ) ) ) ==> join( composition( complement
% 67.27/67.69 ( composition( X, skol1 ) ), top ), complement( composition( X, skol1 ) )
% 67.27/67.69 ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := composition( X, skol1 )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147536) {G2,W11,D5,L1,V1,M1} { complement( composition( X, skol1
% 67.27/67.69 ) ) ==> composition( complement( composition( X, skol1 ) ), top ) }.
% 67.27/67.69 parent0[0]: (3681) {G11,W9,D4,L1,V1,M1} P(3640,20);d(16);d(223) { join(
% 67.27/67.69 composition( X, top ), X ) ==> composition( X, top ) }.
% 67.27/67.69 parent1[0; 5]: (147533) {G1,W16,D6,L1,V1,M1} { complement( composition( X
% 67.27/67.69 , skol1 ) ) ==> join( composition( complement( composition( X, skol1 ) )
% 67.27/67.69 , top ), complement( composition( X, skol1 ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := complement( composition( X, skol1 ) )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147537) {G2,W11,D5,L1,V1,M1} { composition( complement(
% 67.27/67.69 composition( X, skol1 ) ), top ) ==> complement( composition( X, skol1 )
% 67.27/67.69 ) }.
% 67.27/67.69 parent0[0]: (147536) {G2,W11,D5,L1,V1,M1} { complement( composition( X,
% 67.27/67.69 skol1 ) ) ==> composition( complement( composition( X, skol1 ) ), top )
% 67.27/67.69 }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (12548) {G16,W11,D5,L1,V1,M1} P(1414,110);d(776);d(744);d(7);d
% 67.27/67.69 (3681) { composition( complement( composition( X, skol1 ) ), top ) ==>
% 67.27/67.69 complement( composition( X, skol1 ) ) }.
% 67.27/67.69 parent0: (147537) {G2,W11,D5,L1,V1,M1} { composition( complement(
% 67.27/67.69 composition( X, skol1 ) ), top ) ==> complement( composition( X, skol1 )
% 67.27/67.69 ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147539) {G24,W11,D6,L1,V2,M1} { skol1 ==> join( skol1, meet(
% 67.27/67.69 composition( meet( X, skol1 ), top ), Y ) ) }.
% 67.27/67.69 parent0[0]: (7979) {G24,W11,D6,L1,V2,M1} P(1256,870) { join( skol1, meet(
% 67.27/67.69 composition( meet( X, skol1 ), top ), Y ) ) ==> skol1 }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147540) {G25,W9,D5,L1,V2,M1} { skol1 ==> join( skol1,
% 67.27/67.69 composition( meet( X, skol1 ), Y ) ) }.
% 67.27/67.69 parent0[0]: (11288) {G32,W11,D4,L1,V2,M1} P(10497,3851) { meet( composition
% 67.27/67.69 ( X, top ), composition( X, Y ) ) ==> composition( X, Y ) }.
% 67.27/67.69 parent1[0; 4]: (147539) {G24,W11,D6,L1,V2,M1} { skol1 ==> join( skol1,
% 67.27/67.69 meet( composition( meet( X, skol1 ), top ), Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := meet( X, skol1 )
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := composition( meet( X, skol1 ), Y )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147541) {G25,W9,D5,L1,V2,M1} { join( skol1, composition( meet( X
% 67.27/67.69 , skol1 ), Y ) ) ==> skol1 }.
% 67.27/67.69 parent0[0]: (147540) {G25,W9,D5,L1,V2,M1} { skol1 ==> join( skol1,
% 67.27/67.69 composition( meet( X, skol1 ), Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (15308) {G33,W9,D5,L1,V2,M1} P(11288,7979) { join( skol1,
% 67.27/67.69 composition( meet( X, skol1 ), Y ) ) ==> skol1 }.
% 67.27/67.69 parent0: (147541) {G25,W9,D5,L1,V2,M1} { join( skol1, composition( meet( X
% 67.27/67.69 , skol1 ), Y ) ) ==> skol1 }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147543) {G20,W11,D4,L1,V2,M1} { join( Y, X ) ==> meet( join( X, Y
% 67.27/67.69 ), join( Y, X ) ) }.
% 67.27/67.69 parent0[0]: (2071) {G20,W11,D4,L1,V2,M1} P(1655,1373);d(749);d(756) { meet
% 67.27/67.69 ( join( Y, X ), join( X, Y ) ) ==> join( X, Y ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147547) {G21,W17,D6,L1,V2,M1} { join( composition( meet( X,
% 67.27/67.69 skol1 ), Y ), skol1 ) ==> meet( skol1, join( composition( meet( X, skol1
% 67.27/67.69 ), Y ), skol1 ) ) }.
% 67.27/67.69 parent0[0]: (15308) {G33,W9,D5,L1,V2,M1} P(11288,7979) { join( skol1,
% 67.27/67.69 composition( meet( X, skol1 ), Y ) ) ==> skol1 }.
% 67.27/67.69 parent1[0; 9]: (147543) {G20,W11,D4,L1,V2,M1} { join( Y, X ) ==> meet(
% 67.27/67.69 join( X, Y ), join( Y, X ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := skol1
% 67.27/67.69 Y := composition( meet( X, skol1 ), Y )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147549) {G21,W9,D5,L1,V2,M1} { join( composition( meet( X, skol1
% 67.27/67.69 ), Y ), skol1 ) ==> skol1 }.
% 67.27/67.69 parent0[0]: (1043) {G20,W7,D4,L1,V2,M1} P(0,1025) { meet( X, join( Y, X ) )
% 67.27/67.69 ==> X }.
% 67.27/67.69 parent1[0; 8]: (147547) {G21,W17,D6,L1,V2,M1} { join( composition( meet( X
% 67.27/67.69 , skol1 ), Y ), skol1 ) ==> meet( skol1, join( composition( meet( X,
% 67.27/67.69 skol1 ), Y ), skol1 ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := skol1
% 67.27/67.69 Y := composition( meet( X, skol1 ), Y )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (15362) {G34,W9,D5,L1,V2,M1} P(15308,2071);d(1043) { join(
% 67.27/67.69 composition( meet( X, skol1 ), Y ), skol1 ) ==> skol1 }.
% 67.27/67.69 parent0: (147549) {G21,W9,D5,L1,V2,M1} { join( composition( meet( X, skol1
% 67.27/67.69 ), Y ), skol1 ) ==> skol1 }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147552) {G31,W9,D5,L1,V2,M1} { Y ==> meet( composition( join( X,
% 67.27/67.69 Y ), top ), Y ) }.
% 67.27/67.69 parent0[0]: (3853) {G31,W9,D5,L1,V2,M1} P(3733,1057) { meet( composition(
% 67.27/67.69 join( X, Y ), top ), Y ) ==> Y }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147555) {G32,W15,D5,L1,V2,M1} { composition( meet( X, skol1 ), Y
% 67.27/67.69 ) ==> meet( composition( skol1, top ), composition( meet( X, skol1 ), Y
% 67.27/67.69 ) ) }.
% 67.27/67.69 parent0[0]: (15308) {G33,W9,D5,L1,V2,M1} P(11288,7979) { join( skol1,
% 67.27/67.69 composition( meet( X, skol1 ), Y ) ) ==> skol1 }.
% 67.27/67.69 parent1[0; 8]: (147552) {G31,W9,D5,L1,V2,M1} { Y ==> meet( composition(
% 67.27/67.69 join( X, Y ), top ), Y ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := skol1
% 67.27/67.69 Y := composition( meet( X, skol1 ), Y )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147556) {G1,W13,D5,L1,V2,M1} { composition( meet( X, skol1 ), Y
% 67.27/67.69 ) ==> meet( skol1, composition( meet( X, skol1 ), Y ) ) }.
% 67.27/67.69 parent0[0]: (13) {G0,W5,D3,L1,V0,M1} I { composition( skol1, top ) ==>
% 67.27/67.69 skol1 }.
% 67.27/67.69 parent1[0; 7]: (147555) {G32,W15,D5,L1,V2,M1} { composition( meet( X,
% 67.27/67.69 skol1 ), Y ) ==> meet( composition( skol1, top ), composition( meet( X,
% 67.27/67.69 skol1 ), Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147557) {G1,W13,D5,L1,V2,M1} { meet( skol1, composition( meet( X
% 67.27/67.69 , skol1 ), Y ) ) ==> composition( meet( X, skol1 ), Y ) }.
% 67.27/67.69 parent0[0]: (147556) {G1,W13,D5,L1,V2,M1} { composition( meet( X, skol1 )
% 67.27/67.69 , Y ) ==> meet( skol1, composition( meet( X, skol1 ), Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (15381) {G34,W13,D5,L1,V2,M1} P(15308,3853);d(13) { meet(
% 67.27/67.69 skol1, composition( meet( X, skol1 ), Y ) ) ==> composition( meet( X,
% 67.27/67.69 skol1 ), Y ) }.
% 67.27/67.69 parent0: (147557) {G1,W13,D5,L1,V2,M1} { meet( skol1, composition( meet( X
% 67.27/67.69 , skol1 ), Y ) ) ==> composition( meet( X, skol1 ), Y ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147559) {G29,W11,D6,L1,V2,M1} { zero ==> meet( X, composition(
% 67.27/67.69 complement( composition( X, Y ) ), converse( Y ) ) ) }.
% 67.27/67.69 parent0[0]: (6939) {G29,W11,D6,L1,V2,M1} P(110,1096);d(2866);d(756);d(7);d(
% 67.27/67.69 2891) { meet( Y, composition( complement( composition( Y, X ) ), converse
% 67.27/67.69 ( X ) ) ) ==> zero }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147560) {G11,W10,D6,L1,V1,M1} { zero ==> meet( X, composition(
% 67.27/67.69 complement( composition( X, top ) ), top ) ) }.
% 67.27/67.69 parent0[0]: (223) {G10,W4,D3,L1,V0,M1} P(214,59) { converse( top ) ==> top
% 67.27/67.69 }.
% 67.27/67.69 parent1[0; 9]: (147559) {G29,W11,D6,L1,V2,M1} { zero ==> meet( X,
% 67.27/67.69 composition( complement( composition( X, Y ) ), converse( Y ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := top
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147561) {G11,W10,D6,L1,V1,M1} { meet( X, composition( complement
% 67.27/67.69 ( composition( X, top ) ), top ) ) ==> zero }.
% 67.27/67.69 parent0[0]: (147560) {G11,W10,D6,L1,V1,M1} { zero ==> meet( X, composition
% 67.27/67.69 ( complement( composition( X, top ) ), top ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (15949) {G30,W10,D6,L1,V1,M1} P(223,6939) { meet( X,
% 67.27/67.69 composition( complement( composition( X, top ) ), top ) ) ==> zero }.
% 67.27/67.69 parent0: (147561) {G11,W10,D6,L1,V1,M1} { meet( X, composition( complement
% 67.27/67.69 ( composition( X, top ) ), top ) ) ==> zero }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147563) {G25,W11,D5,L1,V2,M1} { meet( complement( Y ), X ) ==>
% 67.27/67.69 meet( X, complement( meet( X, Y ) ) ) }.
% 67.27/67.69 parent0[0]: (3166) {G25,W11,D5,L1,V2,M1} P(2556,772);d(771);d(950);d(773)
% 67.27/67.69 { meet( X, complement( meet( X, Y ) ) ) ==> meet( complement( Y ), X )
% 67.27/67.69 }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147567) {G26,W14,D7,L1,V1,M1} { meet( complement( composition(
% 67.27/67.69 complement( composition( X, top ) ), top ) ), X ) ==> meet( X, complement
% 67.27/67.69 ( zero ) ) }.
% 67.27/67.69 parent0[0]: (15949) {G30,W10,D6,L1,V1,M1} P(223,6939) { meet( X,
% 67.27/67.69 composition( complement( composition( X, top ) ), top ) ) ==> zero }.
% 67.27/67.69 parent1[0; 13]: (147563) {G25,W11,D5,L1,V2,M1} { meet( complement( Y ), X
% 67.27/67.69 ) ==> meet( X, complement( meet( X, Y ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := composition( complement( composition( X, top ) ), top )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147568) {G13,W13,D7,L1,V1,M1} { meet( complement( composition(
% 67.27/67.69 complement( composition( X, top ) ), top ) ), X ) ==> meet( X, top ) }.
% 67.27/67.69 parent0[0]: (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) { complement
% 67.27/67.69 ( zero ) ==> top }.
% 67.27/67.69 parent1[0; 12]: (147567) {G26,W14,D7,L1,V1,M1} { meet( complement(
% 67.27/67.69 composition( complement( composition( X, top ) ), top ) ), X ) ==> meet(
% 67.27/67.69 X, complement( zero ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147569) {G14,W11,D7,L1,V1,M1} { meet( complement( composition(
% 67.27/67.69 complement( composition( X, top ) ), top ) ), X ) ==> X }.
% 67.27/67.69 parent0[0]: (752) {G14,W5,D3,L1,V1,M1} P(751,48);d(749);d(79) { meet( X,
% 67.27/67.69 top ) ==> X }.
% 67.27/67.69 parent1[0; 10]: (147568) {G13,W13,D7,L1,V1,M1} { meet( complement(
% 67.27/67.69 composition( complement( composition( X, top ) ), top ) ), X ) ==> meet(
% 67.27/67.69 X, top ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (15953) {G31,W11,D7,L1,V1,M1} P(15949,3166);d(744);d(752) {
% 67.27/67.69 meet( complement( composition( complement( composition( X, top ) ), top )
% 67.27/67.69 ), X ) ==> X }.
% 67.27/67.69 parent0: (147569) {G14,W11,D7,L1,V1,M1} { meet( complement( composition(
% 67.27/67.69 complement( composition( X, top ) ), top ) ), X ) ==> X }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147572) {G29,W11,D6,L1,V1,M1} { composition( X, skol1 ) ==>
% 67.27/67.69 composition( join( complement( converse( skol1 ) ), X ), skol1 ) }.
% 67.27/67.69 parent0[0]: (2900) {G29,W11,D6,L1,V1,M1} P(2884,6);d(749) { composition(
% 67.27/67.69 join( complement( converse( skol1 ) ), X ), skol1 ) ==> composition( X,
% 67.27/67.69 skol1 ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147574) {G24,W14,D6,L1,V1,M1} { composition( meet( X, converse(
% 67.27/67.69 skol1 ) ), skol1 ) ==> composition( join( X, complement( converse( skol1
% 67.27/67.69 ) ) ), skol1 ) }.
% 67.27/67.69 parent0[0]: (2429) {G23,W11,D4,L1,V2,M1} P(2408,898);d(1);d(870) { join(
% 67.27/67.69 complement( Y ), meet( X, Y ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.69 parent1[0; 8]: (147572) {G29,W11,D6,L1,V1,M1} { composition( X, skol1 )
% 67.27/67.69 ==> composition( join( complement( converse( skol1 ) ), X ), skol1 ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := converse( skol1 )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := meet( X, converse( skol1 ) )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147575) {G25,W10,D5,L1,V1,M1} { composition( meet( X, converse(
% 67.27/67.69 skol1 ) ), skol1 ) ==> composition( X, skol1 ) }.
% 67.27/67.69 parent0[0]: (2901) {G29,W11,D6,L1,V1,M1} P(2884,6);d(740) { composition(
% 67.27/67.69 join( X, complement( converse( skol1 ) ) ), skol1 ) ==> composition( X,
% 67.27/67.69 skol1 ) }.
% 67.27/67.69 parent1[0; 7]: (147574) {G24,W14,D6,L1,V1,M1} { composition( meet( X,
% 67.27/67.69 converse( skol1 ) ), skol1 ) ==> composition( join( X, complement(
% 67.27/67.69 converse( skol1 ) ) ), skol1 ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (18134) {G30,W10,D5,L1,V1,M1} P(2429,2900);d(2901) {
% 67.27/67.69 composition( meet( X, converse( skol1 ) ), skol1 ) ==> composition( X,
% 67.27/67.69 skol1 ) }.
% 67.27/67.69 parent0: (147575) {G25,W10,D5,L1,V1,M1} { composition( meet( X, converse(
% 67.27/67.69 skol1 ) ), skol1 ) ==> composition( X, skol1 ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147578) {G29,W11,D6,L1,V1,M1} { composition( X, skol1 ) ==>
% 67.27/67.69 composition( join( complement( converse( skol1 ) ), X ), skol1 ) }.
% 67.27/67.69 parent0[0]: (2900) {G29,W11,D6,L1,V1,M1} P(2884,6);d(749) { composition(
% 67.27/67.69 join( complement( converse( skol1 ) ), X ), skol1 ) ==> composition( X,
% 67.27/67.69 skol1 ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147580) {G24,W14,D6,L1,V1,M1} { composition( meet( converse(
% 67.27/67.69 skol1 ), X ), skol1 ) ==> composition( join( X, complement( converse(
% 67.27/67.69 skol1 ) ) ), skol1 ) }.
% 67.27/67.69 parent0[0]: (2464) {G23,W11,D4,L1,V2,M1} P(2431,898);d(1);d(887) { join(
% 67.27/67.69 complement( Y ), meet( Y, X ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.69 parent1[0; 8]: (147578) {G29,W11,D6,L1,V1,M1} { composition( X, skol1 )
% 67.27/67.69 ==> composition( join( complement( converse( skol1 ) ), X ), skol1 ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := converse( skol1 )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := meet( converse( skol1 ), X )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147581) {G25,W10,D5,L1,V1,M1} { composition( meet( converse(
% 67.27/67.69 skol1 ), X ), skol1 ) ==> composition( X, skol1 ) }.
% 67.27/67.69 parent0[0]: (2901) {G29,W11,D6,L1,V1,M1} P(2884,6);d(740) { composition(
% 67.27/67.69 join( X, complement( converse( skol1 ) ) ), skol1 ) ==> composition( X,
% 67.27/67.69 skol1 ) }.
% 67.27/67.69 parent1[0; 7]: (147580) {G24,W14,D6,L1,V1,M1} { composition( meet(
% 67.27/67.69 converse( skol1 ), X ), skol1 ) ==> composition( join( X, complement(
% 67.27/67.69 converse( skol1 ) ) ), skol1 ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (18135) {G30,W10,D5,L1,V1,M1} P(2464,2900);d(2901) {
% 67.27/67.69 composition( meet( converse( skol1 ), X ), skol1 ) ==> composition( X,
% 67.27/67.69 skol1 ) }.
% 67.27/67.69 parent0: (147581) {G25,W10,D5,L1,V1,M1} { composition( meet( converse(
% 67.27/67.69 skol1 ), X ), skol1 ) ==> composition( X, skol1 ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147584) {G14,W12,D5,L1,V1,M1} { composition( X, complement( skol1
% 67.27/67.69 ) ) ==> composition( join( converse( skol1 ), X ), complement( skol1 ) )
% 67.27/67.69 }.
% 67.27/67.69 parent0[0]: (784) {G14,W12,D5,L1,V1,M1} P(755,6);d(749) { composition( join
% 67.27/67.69 ( converse( skol1 ), X ), complement( skol1 ) ) ==> composition( X,
% 67.27/67.69 complement( skol1 ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147587) {G15,W15,D7,L1,V1,M1} { composition( converse( meet(
% 67.27/67.69 converse( converse( skol1 ) ), X ) ), complement( skol1 ) ) ==>
% 67.27/67.69 composition( converse( skol1 ), complement( skol1 ) ) }.
% 67.27/67.69 parent0[0]: (879) {G20,W9,D6,L1,V2,M1} P(851,19);d(7) { join( X, converse(
% 67.27/67.69 meet( converse( X ), Y ) ) ) ==> X }.
% 67.27/67.69 parent1[0; 11]: (147584) {G14,W12,D5,L1,V1,M1} { composition( X,
% 67.27/67.69 complement( skol1 ) ) ==> composition( join( converse( skol1 ), X ),
% 67.27/67.69 complement( skol1 ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := converse( skol1 )
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := converse( meet( converse( converse( skol1 ) ), X ) )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147588) {G13,W11,D7,L1,V1,M1} { composition( converse( meet(
% 67.27/67.69 converse( converse( skol1 ) ), X ) ), complement( skol1 ) ) ==> zero }.
% 67.27/67.69 parent0[0]: (755) {G12,W7,D4,L1,V0,M1} P(740,113) { composition( converse(
% 67.27/67.69 skol1 ), complement( skol1 ) ) ==> zero }.
% 67.27/67.69 parent1[0; 10]: (147587) {G15,W15,D7,L1,V1,M1} { composition( converse(
% 67.27/67.69 meet( converse( converse( skol1 ) ), X ) ), complement( skol1 ) ) ==>
% 67.27/67.69 composition( converse( skol1 ), complement( skol1 ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147589) {G1,W9,D5,L1,V1,M1} { composition( converse( meet( skol1
% 67.27/67.69 , X ) ), complement( skol1 ) ) ==> zero }.
% 67.27/67.69 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.27/67.69 parent1[0; 4]: (147588) {G13,W11,D7,L1,V1,M1} { composition( converse(
% 67.27/67.69 meet( converse( converse( skol1 ) ), X ) ), complement( skol1 ) ) ==>
% 67.27/67.69 zero }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := skol1
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (20566) {G21,W9,D5,L1,V1,M1} P(879,784);d(755);d(7) {
% 67.27/67.69 composition( converse( meet( skol1, X ) ), complement( skol1 ) ) ==> zero
% 67.27/67.69 }.
% 67.27/67.69 parent0: (147589) {G1,W9,D5,L1,V1,M1} { composition( converse( meet( skol1
% 67.27/67.69 , X ) ), complement( skol1 ) ) ==> zero }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147592) {G1,W10,D5,L1,V2,M1} { composition( converse( Y ), X )
% 67.27/67.69 ==> converse( composition( converse( X ), Y ) ) }.
% 67.27/67.69 parent0[0]: (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition(
% 67.27/67.69 converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147596) {G2,W10,D5,L1,V1,M1} { composition( converse( complement
% 67.27/67.69 ( skol1 ) ), meet( skol1, X ) ) ==> converse( zero ) }.
% 67.27/67.69 parent0[0]: (20566) {G21,W9,D5,L1,V1,M1} P(879,784);d(755);d(7) {
% 67.27/67.69 composition( converse( meet( skol1, X ) ), complement( skol1 ) ) ==> zero
% 67.27/67.69 }.
% 67.27/67.69 parent1[0; 9]: (147592) {G1,W10,D5,L1,V2,M1} { composition( converse( Y )
% 67.27/67.69 , X ) ==> converse( composition( converse( X ), Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := meet( skol1, X )
% 67.27/67.69 Y := complement( skol1 )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147597) {G3,W9,D5,L1,V1,M1} { composition( converse( complement
% 67.27/67.69 ( skol1 ) ), meet( skol1, X ) ) ==> zero }.
% 67.27/67.69 parent0[0]: (776) {G15,W4,D3,L1,V0,M1} P(758,740) { converse( zero ) ==>
% 67.27/67.69 zero }.
% 67.27/67.69 parent1[0; 8]: (147596) {G2,W10,D5,L1,V1,M1} { composition( converse(
% 67.27/67.69 complement( skol1 ) ), meet( skol1, X ) ) ==> converse( zero ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147598) {G4,W9,D5,L1,V1,M1} { composition( complement( converse
% 67.27/67.69 ( skol1 ) ), meet( skol1, X ) ) ==> zero }.
% 67.27/67.69 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.69 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.69 parent1[0; 2]: (147597) {G3,W9,D5,L1,V1,M1} { composition( converse(
% 67.27/67.69 complement( skol1 ) ), meet( skol1, X ) ) ==> zero }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := skol1
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (20581) {G28,W9,D5,L1,V1,M1} P(20566,17);d(776);d(2866) {
% 67.27/67.69 composition( complement( converse( skol1 ) ), meet( skol1, X ) ) ==> zero
% 67.27/67.69 }.
% 67.27/67.69 parent0: (147598) {G4,W9,D5,L1,V1,M1} { composition( complement( converse
% 67.27/67.69 ( skol1 ) ), meet( skol1, X ) ) ==> zero }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147601) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ), Y ) ==>
% 67.27/67.69 join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.27/67.69 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 67.27/67.69 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Z
% 67.27/67.69 Z := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147603) {G1,W17,D6,L1,V2,M1} { composition( join( complement(
% 67.27/67.69 converse( skol1 ) ), X ), meet( skol1, Y ) ) ==> join( zero, composition
% 67.27/67.69 ( X, meet( skol1, Y ) ) ) }.
% 67.27/67.69 parent0[0]: (20581) {G28,W9,D5,L1,V1,M1} P(20566,17);d(776);d(2866) {
% 67.27/67.69 composition( complement( converse( skol1 ) ), meet( skol1, X ) ) ==> zero
% 67.27/67.69 }.
% 67.27/67.69 parent1[0; 11]: (147601) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z )
% 67.27/67.69 , Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := complement( converse( skol1 ) )
% 67.27/67.69 Y := meet( skol1, Y )
% 67.27/67.69 Z := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147605) {G2,W15,D6,L1,V2,M1} { composition( join( complement(
% 67.27/67.69 converse( skol1 ) ), X ), meet( skol1, Y ) ) ==> composition( X, meet(
% 67.27/67.69 skol1, Y ) ) }.
% 67.27/67.69 parent0[0]: (749) {G13,W5,D3,L1,V1,M1} P(715,0);d(748) { join( zero, X )
% 67.27/67.69 ==> X }.
% 67.27/67.69 parent1[0; 10]: (147603) {G1,W17,D6,L1,V2,M1} { composition( join(
% 67.27/67.69 complement( converse( skol1 ) ), X ), meet( skol1, Y ) ) ==> join( zero,
% 67.27/67.69 composition( X, meet( skol1, Y ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := composition( X, meet( skol1, Y ) )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (20589) {G29,W15,D6,L1,V2,M1} P(20581,6);d(749) { composition
% 67.27/67.69 ( join( complement( converse( skol1 ) ), Y ), meet( skol1, X ) ) ==>
% 67.27/67.69 composition( Y, meet( skol1, X ) ) }.
% 67.27/67.69 parent0: (147605) {G2,W15,D6,L1,V2,M1} { composition( join( complement(
% 67.27/67.69 converse( skol1 ) ), X ), meet( skol1, Y ) ) ==> composition( X, meet(
% 67.27/67.69 skol1, Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147608) {G27,W11,D4,L1,V2,M1} { meet( Y, complement( X ) ) ==>
% 67.27/67.69 meet( complement( X ), join( Y, X ) ) }.
% 67.27/67.69 parent0[0]: (10148) {G27,W11,D4,L1,V2,M1} P(756,10124) { meet( complement(
% 67.27/67.69 X ), join( Y, X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147616) {G18,W19,D6,L1,V3,M1} { meet( join( complement( X ), Y )
% 67.27/67.69 , complement( complement( Z ) ) ) ==> meet( complement( complement( Z ) )
% 67.27/67.69 , join( complement( meet( X, Z ) ), Y ) ) }.
% 67.27/67.69 parent0[0]: (964) {G17,W14,D5,L1,V3,M1} P(773,30) { join( join( complement
% 67.27/67.69 ( X ), Z ), complement( Y ) ) ==> join( complement( meet( X, Y ) ), Z )
% 67.27/67.69 }.
% 67.27/67.69 parent1[0; 13]: (147608) {G27,W11,D4,L1,V2,M1} { meet( Y, complement( X )
% 67.27/67.69 ) ==> meet( complement( X ), join( Y, X ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Z
% 67.27/67.69 Z := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := complement( Z )
% 67.27/67.69 Y := join( complement( X ), Y )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147617) {G19,W19,D6,L1,V3,M1} { meet( join( complement( X ), Y )
% 67.27/67.69 , complement( complement( Z ) ) ) ==> complement( join( complement( Z ),
% 67.27/67.69 meet( meet( X, Z ), complement( Y ) ) ) ) }.
% 67.27/67.69 parent0[0]: (1614) {G18,W15,D6,L1,V3,M1} P(951,1598) { meet( complement( Z
% 67.27/67.69 ), join( complement( X ), Y ) ) ==> complement( join( Z, meet( X,
% 67.27/67.69 complement( Y ) ) ) ) }.
% 67.27/67.69 parent1[0; 9]: (147616) {G18,W19,D6,L1,V3,M1} { meet( join( complement( X
% 67.27/67.69 ), Y ), complement( complement( Z ) ) ) ==> meet( complement( complement
% 67.27/67.69 ( Z ) ), join( complement( meet( X, Z ) ), Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := meet( X, Z )
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := complement( Z )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147618) {G17,W18,D6,L1,V3,M1} { meet( join( complement( X ), Y )
% 67.27/67.69 , complement( complement( Z ) ) ) ==> meet( Z, complement( meet( meet( X
% 67.27/67.69 , Z ), complement( Y ) ) ) ) }.
% 67.27/67.69 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.69 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.69 parent1[0; 9]: (147617) {G19,W19,D6,L1,V3,M1} { meet( join( complement( X
% 67.27/67.69 ), Y ), complement( complement( Z ) ) ) ==> complement( join( complement
% 67.27/67.69 ( Z ), meet( meet( X, Z ), complement( Y ) ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := meet( meet( X, Z ), complement( Y ) )
% 67.27/67.69 Y := Z
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147619) {G18,W17,D6,L1,V3,M1} { meet( join( complement( X ), Y )
% 67.27/67.69 , complement( complement( Z ) ) ) ==> meet( Z, join( complement( meet( X
% 67.27/67.69 , Z ) ), Y ) ) }.
% 67.27/67.69 parent0[0]: (951) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet( Y,
% 67.27/67.69 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 67.27/67.69 parent1[0; 11]: (147618) {G17,W18,D6,L1,V3,M1} { meet( join( complement( X
% 67.27/67.69 ), Y ), complement( complement( Z ) ) ) ==> meet( Z, complement( meet(
% 67.27/67.69 meet( X, Z ), complement( Y ) ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := meet( X, Z )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147620) {G19,W17,D6,L1,V3,M1} { complement( join( meet( X,
% 67.27/67.69 complement( Y ) ), complement( Z ) ) ) ==> meet( Z, join( complement(
% 67.27/67.69 meet( X, Z ) ), Y ) ) }.
% 67.27/67.69 parent0[0]: (1613) {G18,W15,D6,L1,V3,M1} P(951,1598) { meet( join(
% 67.27/67.69 complement( X ), Y ), complement( Z ) ) ==> complement( join( meet( X,
% 67.27/67.69 complement( Y ) ), Z ) ) }.
% 67.27/67.69 parent1[0; 1]: (147619) {G18,W17,D6,L1,V3,M1} { meet( join( complement( X
% 67.27/67.69 ), Y ), complement( complement( Z ) ) ) ==> meet( Z, join( complement(
% 67.27/67.69 meet( X, Z ) ), Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := complement( Z )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147621) {G17,W16,D6,L1,V3,M1} { meet( complement( meet( X,
% 67.27/67.69 complement( Y ) ) ), Z ) ==> meet( Z, join( complement( meet( X, Z ) ), Y
% 67.27/67.69 ) ) }.
% 67.27/67.69 parent0[0]: (771) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( X,
% 67.27/67.69 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 67.27/67.69 parent1[0; 1]: (147620) {G19,W17,D6,L1,V3,M1} { complement( join( meet( X
% 67.27/67.69 , complement( Y ) ), complement( Z ) ) ) ==> meet( Z, join( complement(
% 67.27/67.69 meet( X, Z ) ), Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := meet( X, complement( Y ) )
% 67.27/67.69 Y := Z
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147622) {G18,W15,D6,L1,V3,M1} { meet( join( complement( X ), Y )
% 67.27/67.69 , Z ) ==> meet( Z, join( complement( meet( X, Z ) ), Y ) ) }.
% 67.27/67.69 parent0[0]: (951) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet( Y,
% 67.27/67.69 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 67.27/67.69 parent1[0; 2]: (147621) {G17,W16,D6,L1,V3,M1} { meet( complement( meet( X
% 67.27/67.69 , complement( Y ) ) ), Z ) ==> meet( Z, join( complement( meet( X, Z ) )
% 67.27/67.69 , Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147623) {G18,W15,D6,L1,V3,M1} { meet( Z, join( complement( meet(
% 67.27/67.69 X, Z ) ), Y ) ) ==> meet( join( complement( X ), Y ), Z ) }.
% 67.27/67.69 parent0[0]: (147622) {G18,W15,D6,L1,V3,M1} { meet( join( complement( X ),
% 67.27/67.69 Y ), Z ) ==> meet( Z, join( complement( meet( X, Z ) ), Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (23978) {G28,W15,D6,L1,V3,M1} P(964,10148);d(1614);d(772);d(
% 67.27/67.69 951);d(1613);d(771);d(951) { meet( Z, join( complement( meet( X, Z ) ), Y
% 67.27/67.69 ) ) ==> meet( join( complement( X ), Y ), Z ) }.
% 67.27/67.69 parent0: (147623) {G18,W15,D6,L1,V3,M1} { meet( Z, join( complement( meet
% 67.27/67.69 ( X, Z ) ), Y ) ) ==> meet( join( complement( X ), Y ), Z ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147633) {G18,W16,D6,L1,V3,M1} { complement( join( complement( X
% 67.27/67.69 ), join( complement( Y ), Z ) ) ) = complement( join( complement( meet(
% 67.27/67.69 Y, X ) ), Z ) ) }.
% 67.27/67.69 parent0[0]: (964) {G17,W14,D5,L1,V3,M1} P(773,30) { join( join( complement
% 67.27/67.69 ( X ), Z ), complement( Y ) ) ==> join( complement( meet( X, Y ) ), Z )
% 67.27/67.69 }.
% 67.27/67.69 parent1[0; 10]: (1625) {G18,W9,D4,L1,V2,M1} P(1598,75);d(1598) { complement
% 67.27/67.69 ( join( X, Y ) ) = complement( join( Y, X ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := complement( X )
% 67.27/67.69 Y := join( complement( Y ), Z )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147635) {G17,W15,D6,L1,V3,M1} { complement( join( complement( X
% 67.27/67.69 ), join( complement( Y ), Z ) ) ) = meet( meet( Y, X ), complement( Z )
% 67.27/67.69 ) }.
% 67.27/67.69 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.69 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.69 parent1[0; 9]: (147633) {G18,W16,D6,L1,V3,M1} { complement( join(
% 67.27/67.69 complement( X ), join( complement( Y ), Z ) ) ) = complement( join(
% 67.27/67.69 complement( meet( Y, X ) ), Z ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Z
% 67.27/67.69 Y := meet( Y, X )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147639) {G17,W14,D6,L1,V3,M1} { meet( X, complement( join(
% 67.27/67.69 complement( Y ), Z ) ) ) = meet( meet( Y, X ), complement( Z ) ) }.
% 67.27/67.69 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.69 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.69 parent1[0; 1]: (147635) {G17,W15,D6,L1,V3,M1} { complement( join(
% 67.27/67.69 complement( X ), join( complement( Y ), Z ) ) ) = meet( meet( Y, X ),
% 67.27/67.69 complement( Z ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := join( complement( Y ), Z )
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147641) {G17,W13,D5,L1,V3,M1} { meet( X, meet( Y, complement( Z
% 67.27/67.69 ) ) ) = meet( meet( Y, X ), complement( Z ) ) }.
% 67.27/67.69 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.69 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.69 parent1[0; 3]: (147639) {G17,W14,D6,L1,V3,M1} { meet( X, complement( join
% 67.27/67.69 ( complement( Y ), Z ) ) ) = meet( meet( Y, X ), complement( Z ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Z
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (24022) {G19,W13,D5,L1,V3,M1} P(964,1625);d(772);d(772);d(772)
% 67.27/67.69 { meet( Z, meet( X, complement( Y ) ) ) ==> meet( meet( X, Z ),
% 67.27/67.69 complement( Y ) ) }.
% 67.27/67.69 parent0: (147641) {G17,W13,D5,L1,V3,M1} { meet( X, meet( Y, complement( Z
% 67.27/67.69 ) ) ) = meet( meet( Y, X ), complement( Z ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Z
% 67.27/67.69 Y := X
% 67.27/67.69 Z := Y
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147644) {G34,W9,D5,L1,V2,M1} { skol1 ==> join( composition( meet
% 67.27/67.69 ( X, skol1 ), Y ), skol1 ) }.
% 67.27/67.69 parent0[0]: (15362) {G34,W9,D5,L1,V2,M1} P(15308,2071);d(1043) { join(
% 67.27/67.69 composition( meet( X, skol1 ), Y ), skol1 ) ==> skol1 }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147645) {G23,W11,D7,L1,V2,M1} { skol1 ==> join( composition(
% 67.27/67.69 converse( meet( converse( skol1 ), X ) ), Y ), skol1 ) }.
% 67.27/67.69 parent0[0]: (1031) {G22,W13,D6,L1,V2,M1} P(910,1025) { meet( converse( meet
% 67.27/67.69 ( converse( X ), Y ) ), X ) ==> converse( meet( converse( X ), Y ) ) }.
% 67.27/67.69 parent1[0; 4]: (147644) {G34,W9,D5,L1,V2,M1} { skol1 ==> join( composition
% 67.27/67.69 ( meet( X, skol1 ), Y ), skol1 ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := skol1
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := converse( meet( converse( skol1 ), X ) )
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147646) {G23,W11,D7,L1,V2,M1} { join( composition( converse( meet
% 67.27/67.69 ( converse( skol1 ), X ) ), Y ), skol1 ) ==> skol1 }.
% 67.27/67.69 parent0[0]: (147645) {G23,W11,D7,L1,V2,M1} { skol1 ==> join( composition(
% 67.27/67.69 converse( meet( converse( skol1 ), X ) ), Y ), skol1 ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (25375) {G35,W11,D7,L1,V2,M1} P(1031,15362) { join(
% 67.27/67.69 composition( converse( meet( converse( skol1 ), X ) ), Y ), skol1 ) ==>
% 67.27/67.69 skol1 }.
% 67.27/67.69 parent0: (147646) {G23,W11,D7,L1,V2,M1} { join( composition( converse(
% 67.27/67.69 meet( converse( skol1 ), X ) ), Y ), skol1 ) ==> skol1 }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147648) {G23,W13,D5,L1,V3,M1} { composition( Y, Z ) ==> meet(
% 67.27/67.69 composition( join( X, Y ), Z ), composition( Y, Z ) ) }.
% 67.27/67.69 parent0[0]: (1061) {G23,W13,D5,L1,V3,M1} P(6,1054) { meet( composition(
% 67.27/67.69 join( X, Z ), Y ), composition( Z, Y ) ) ==> composition( Z, Y ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Z
% 67.27/67.69 Z := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147652) {G14,W21,D8,L1,V2,M1} { composition( X, complement(
% 67.27/67.69 converse( composition( top, join( Y, X ) ) ) ) ) ==> meet( zero,
% 67.27/67.69 composition( X, complement( converse( composition( top, join( Y, X ) ) )
% 67.27/67.69 ) ) ) }.
% 67.27/67.69 parent0[0]: (1489) {G13,W9,D6,L1,V1,M1} P(224,1486);d(7) { composition( X,
% 67.27/67.69 complement( converse( composition( top, X ) ) ) ) ==> zero }.
% 67.27/67.69 parent1[0; 11]: (147648) {G23,W13,D5,L1,V3,M1} { composition( Y, Z ) ==>
% 67.27/67.69 meet( composition( join( X, Y ), Z ), composition( Y, Z ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := join( Y, X )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 Z := complement( converse( composition( top, join( Y, X ) ) ) )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147654) {G14,W11,D7,L1,V2,M1} { composition( X, complement(
% 67.27/67.69 converse( composition( top, join( Y, X ) ) ) ) ) ==> zero }.
% 67.27/67.69 parent0[0]: (750) {G13,W5,D3,L1,V1,M1} P(744,48);d(214);d(77);d(740) { meet
% 67.27/67.69 ( zero, X ) ==> zero }.
% 67.27/67.69 parent1[0; 10]: (147652) {G14,W21,D8,L1,V2,M1} { composition( X,
% 67.27/67.69 complement( converse( composition( top, join( Y, X ) ) ) ) ) ==> meet(
% 67.27/67.69 zero, composition( X, complement( converse( composition( top, join( Y, X
% 67.27/67.69 ) ) ) ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := composition( X, complement( converse( composition( top, join( Y, X
% 67.27/67.69 ) ) ) ) )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (25725) {G24,W11,D7,L1,V2,M1} P(1489,1061);d(750) {
% 67.27/67.69 composition( Y, complement( converse( composition( top, join( X, Y ) ) )
% 67.27/67.69 ) ) ==> zero }.
% 67.27/67.69 parent0: (147654) {G14,W11,D7,L1,V2,M1} { composition( X, complement(
% 67.27/67.69 converse( composition( top, join( Y, X ) ) ) ) ) ==> zero }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147657) {G24,W12,D6,L1,V3,M1} { zero ==> meet( composition( X, Y
% 67.27/67.69 ), complement( composition( join( Z, X ), Y ) ) ) }.
% 67.27/67.69 parent0[0]: (1076) {G24,W12,D6,L1,V3,M1} P(6,1055) { meet( composition( Z,
% 67.27/67.69 Y ), complement( composition( join( X, Z ), Y ) ) ) ==> zero }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Z
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147662) {G20,W12,D5,L1,V3,M1} { zero ==> meet( composition( meet
% 67.27/67.69 ( X, Y ), Z ), complement( composition( Y, Z ) ) ) }.
% 67.27/67.69 parent0[0]: (1389) {G19,W10,D5,L1,V2,M1} P(1372,0) { join( meet( Y,
% 67.27/67.69 complement( X ) ), meet( X, Y ) ) ==> Y }.
% 67.27/67.69 parent1[0; 10]: (147657) {G24,W12,D6,L1,V3,M1} { zero ==> meet(
% 67.27/67.69 composition( X, Y ), complement( composition( join( Z, X ), Y ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := meet( X, Y )
% 67.27/67.69 Y := Z
% 67.27/67.69 Z := meet( Y, complement( X ) )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147663) {G20,W12,D5,L1,V3,M1} { meet( composition( meet( X, Y ),
% 67.27/67.69 Z ), complement( composition( Y, Z ) ) ) ==> zero }.
% 67.27/67.69 parent0[0]: (147662) {G20,W12,D5,L1,V3,M1} { zero ==> meet( composition(
% 67.27/67.69 meet( X, Y ), Z ), complement( composition( Y, Z ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (25990) {G25,W12,D5,L1,V3,M1} P(1389,1076) { meet( composition
% 67.27/67.69 ( meet( Y, X ), Z ), complement( composition( X, Z ) ) ) ==> zero }.
% 67.27/67.69 parent0: (147663) {G20,W12,D5,L1,V3,M1} { meet( composition( meet( X, Y )
% 67.27/67.69 , Z ), complement( composition( Y, Z ) ) ) ==> zero }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147665) {G24,W11,D7,L1,V2,M1} { zero ==> composition( X,
% 67.27/67.69 complement( converse( composition( top, join( Y, X ) ) ) ) ) }.
% 67.27/67.69 parent0[0]: (25725) {G24,W11,D7,L1,V2,M1} P(1489,1061);d(750) { composition
% 67.27/67.69 ( Y, complement( converse( composition( top, join( X, Y ) ) ) ) ) ==>
% 67.27/67.69 zero }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147671) {G25,W13,D7,L1,V2,M1} { zero ==> composition( meet( X, Y
% 67.27/67.69 ), complement( converse( composition( top, composition( top, Y ) ) ) ) )
% 67.27/67.69 }.
% 67.27/67.69 parent0[0]: (3684) {G24,W11,D4,L1,V2,M1} P(3669,2522) { join( composition(
% 67.27/67.69 top, X ), meet( Y, X ) ) ==> composition( top, X ) }.
% 67.27/67.69 parent1[0; 10]: (147665) {G24,W11,D7,L1,V2,M1} { zero ==> composition( X,
% 67.27/67.69 complement( converse( composition( top, join( Y, X ) ) ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := meet( X, Y )
% 67.27/67.69 Y := composition( top, Y )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147672) {G1,W13,D7,L1,V2,M1} { zero ==> composition( meet( X, Y
% 67.27/67.69 ), complement( converse( composition( composition( top, top ), Y ) ) ) )
% 67.27/67.69 }.
% 67.27/67.69 parent0[0]: (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z
% 67.27/67.69 ) ) ==> composition( composition( X, Y ), Z ) }.
% 67.27/67.69 parent1[0; 8]: (147671) {G25,W13,D7,L1,V2,M1} { zero ==> composition( meet
% 67.27/67.69 ( X, Y ), complement( converse( composition( top, composition( top, Y ) )
% 67.27/67.69 ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := top
% 67.27/67.69 Y := top
% 67.27/67.69 Z := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147673) {G2,W11,D6,L1,V2,M1} { zero ==> composition( meet( X, Y
% 67.27/67.69 ), complement( converse( composition( top, Y ) ) ) ) }.
% 67.27/67.69 parent0[0]: (1507) {G16,W5,D3,L1,V0,M1} P(1499,756);d(744) { composition(
% 67.27/67.69 top, top ) ==> top }.
% 67.27/67.69 parent1[0; 9]: (147672) {G1,W13,D7,L1,V2,M1} { zero ==> composition( meet
% 67.27/67.69 ( X, Y ), complement( converse( composition( composition( top, top ), Y )
% 67.27/67.69 ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147674) {G2,W11,D6,L1,V2,M1} { composition( meet( X, Y ),
% 67.27/67.69 complement( converse( composition( top, Y ) ) ) ) ==> zero }.
% 67.27/67.69 parent0[0]: (147673) {G2,W11,D6,L1,V2,M1} { zero ==> composition( meet( X
% 67.27/67.69 , Y ), complement( converse( composition( top, Y ) ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (27140) {G25,W11,D6,L1,V2,M1} P(3684,25725);d(4);d(1507) {
% 67.27/67.69 composition( meet( Y, X ), complement( converse( composition( top, X ) )
% 67.27/67.69 ) ) ==> zero }.
% 67.27/67.69 parent0: (147674) {G2,W11,D6,L1,V2,M1} { composition( meet( X, Y ),
% 67.27/67.69 complement( converse( composition( top, Y ) ) ) ) ==> zero }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147676) {G25,W11,D6,L1,V2,M1} { zero ==> composition( meet( X, Y
% 67.27/67.69 ), complement( converse( composition( top, Y ) ) ) ) }.
% 67.27/67.69 parent0[0]: (27140) {G25,W11,D6,L1,V2,M1} P(3684,25725);d(4);d(1507) {
% 67.27/67.69 composition( meet( Y, X ), complement( converse( composition( top, X ) )
% 67.27/67.69 ) ) ==> zero }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147678) {G12,W13,D7,L1,V2,M1} { zero ==> composition( meet( X,
% 67.27/67.69 converse( Y ) ), complement( converse( converse( composition( Y, top ) )
% 67.27/67.69 ) ) ) }.
% 67.27/67.69 parent0[0]: (225) {G11,W9,D4,L1,V1,M1} P(223,16) { composition( top,
% 67.27/67.69 converse( X ) ) ==> converse( composition( X, top ) ) }.
% 67.27/67.69 parent1[0; 9]: (147676) {G25,W11,D6,L1,V2,M1} { zero ==> composition( meet
% 67.27/67.69 ( X, Y ), complement( converse( composition( top, Y ) ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := converse( Y )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147679) {G1,W11,D5,L1,V2,M1} { zero ==> composition( meet( X,
% 67.27/67.69 converse( Y ) ), complement( composition( Y, top ) ) ) }.
% 67.27/67.69 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.27/67.69 parent1[0; 8]: (147678) {G12,W13,D7,L1,V2,M1} { zero ==> composition( meet
% 67.27/67.69 ( X, converse( Y ) ), complement( converse( converse( composition( Y, top
% 67.27/67.69 ) ) ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := composition( Y, top )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147680) {G1,W11,D5,L1,V2,M1} { composition( meet( X, converse( Y
% 67.27/67.69 ) ), complement( composition( Y, top ) ) ) ==> zero }.
% 67.27/67.69 parent0[0]: (147679) {G1,W11,D5,L1,V2,M1} { zero ==> composition( meet( X
% 67.27/67.69 , converse( Y ) ), complement( composition( Y, top ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (27278) {G26,W11,D5,L1,V2,M1} P(225,27140);d(7) { composition
% 67.27/67.69 ( meet( Y, converse( X ) ), complement( composition( X, top ) ) ) ==>
% 67.27/67.69 zero }.
% 67.27/67.69 parent0: (147680) {G1,W11,D5,L1,V2,M1} { composition( meet( X, converse( Y
% 67.27/67.69 ) ), complement( composition( Y, top ) ) ) ==> zero }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147682) {G26,W11,D5,L1,V2,M1} { zero ==> composition( meet( X,
% 67.27/67.69 converse( Y ) ), complement( composition( Y, top ) ) ) }.
% 67.27/67.69 parent0[0]: (27278) {G26,W11,D5,L1,V2,M1} P(225,27140);d(7) { composition(
% 67.27/67.69 meet( Y, converse( X ) ), complement( composition( X, top ) ) ) ==> zero
% 67.27/67.69 }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147684) {G25,W13,D7,L1,V2,M1} { zero ==> composition( converse(
% 67.27/67.69 meet( X, converse( converse( Y ) ) ) ), complement( composition( Y, top )
% 67.27/67.69 ) ) }.
% 67.27/67.69 parent0[0]: (1030) {G24,W13,D6,L1,V2,M1} P(904,1025) { meet( converse( meet
% 67.27/67.69 ( X, converse( Y ) ) ), Y ) ==> converse( meet( X, converse( Y ) ) ) }.
% 67.27/67.69 parent1[0; 3]: (147682) {G26,W11,D5,L1,V2,M1} { zero ==> composition( meet
% 67.27/67.69 ( X, converse( Y ) ), complement( composition( Y, top ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := converse( Y )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := converse( meet( X, converse( converse( Y ) ) ) )
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147685) {G1,W11,D5,L1,V2,M1} { zero ==> composition( converse(
% 67.27/67.69 meet( X, Y ) ), complement( composition( Y, top ) ) ) }.
% 67.27/67.69 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.27/67.69 parent1[0; 6]: (147684) {G25,W13,D7,L1,V2,M1} { zero ==> composition(
% 67.27/67.69 converse( meet( X, converse( converse( Y ) ) ) ), complement( composition
% 67.27/67.69 ( Y, top ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147686) {G1,W11,D5,L1,V2,M1} { composition( converse( meet( X, Y
% 67.27/67.69 ) ), complement( composition( Y, top ) ) ) ==> zero }.
% 67.27/67.69 parent0[0]: (147685) {G1,W11,D5,L1,V2,M1} { zero ==> composition( converse
% 67.27/67.69 ( meet( X, Y ) ), complement( composition( Y, top ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (27298) {G27,W11,D5,L1,V2,M1} P(1030,27278);d(7) { composition
% 67.27/67.69 ( converse( meet( X, Y ) ), complement( composition( Y, top ) ) ) ==>
% 67.27/67.69 zero }.
% 67.27/67.69 parent0: (147686) {G1,W11,D5,L1,V2,M1} { composition( converse( meet( X, Y
% 67.27/67.69 ) ), complement( composition( Y, top ) ) ) ==> zero }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147688) {G1,W10,D5,L1,V2,M1} { composition( converse( Y ), X )
% 67.27/67.69 ==> converse( composition( converse( X ), Y ) ) }.
% 67.27/67.69 parent0[0]: (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition(
% 67.27/67.69 converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147692) {G2,W12,D6,L1,V2,M1} { composition( converse( complement
% 67.27/67.69 ( composition( X, top ) ) ), meet( Y, X ) ) ==> converse( zero ) }.
% 67.27/67.69 parent0[0]: (27298) {G27,W11,D5,L1,V2,M1} P(1030,27278);d(7) { composition
% 67.27/67.69 ( converse( meet( X, Y ) ), complement( composition( Y, top ) ) ) ==>
% 67.27/67.69 zero }.
% 67.27/67.69 parent1[0; 11]: (147688) {G1,W10,D5,L1,V2,M1} { composition( converse( Y )
% 67.27/67.69 , X ) ==> converse( composition( converse( X ), Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := meet( Y, X )
% 67.27/67.69 Y := complement( composition( X, top ) )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147693) {G3,W11,D6,L1,V2,M1} { composition( converse( complement
% 67.27/67.69 ( composition( X, top ) ) ), meet( Y, X ) ) ==> zero }.
% 67.27/67.69 parent0[0]: (776) {G15,W4,D3,L1,V0,M1} P(758,740) { converse( zero ) ==>
% 67.27/67.69 zero }.
% 67.27/67.69 parent1[0; 10]: (147692) {G2,W12,D6,L1,V2,M1} { composition( converse(
% 67.27/67.69 complement( composition( X, top ) ) ), meet( Y, X ) ) ==> converse( zero
% 67.27/67.69 ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147694) {G4,W11,D6,L1,V2,M1} { composition( complement( converse
% 67.27/67.69 ( composition( X, top ) ) ), meet( Y, X ) ) ==> zero }.
% 67.27/67.69 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.69 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.69 parent1[0; 2]: (147693) {G3,W11,D6,L1,V2,M1} { composition( converse(
% 67.27/67.69 complement( composition( X, top ) ) ), meet( Y, X ) ) ==> zero }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := composition( X, top )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (27502) {G28,W11,D6,L1,V2,M1} P(27298,17);d(776);d(2866) {
% 67.27/67.69 composition( complement( converse( composition( Y, top ) ) ), meet( X, Y
% 67.27/67.69 ) ) ==> zero }.
% 67.27/67.69 parent0: (147694) {G4,W11,D6,L1,V2,M1} { composition( complement( converse
% 67.27/67.69 ( composition( X, top ) ) ), meet( Y, X ) ) ==> zero }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147697) {G35,W11,D7,L1,V2,M1} { skol1 ==> join( composition(
% 67.27/67.69 converse( meet( converse( skol1 ), X ) ), Y ), skol1 ) }.
% 67.27/67.69 parent0[0]: (25375) {G35,W11,D7,L1,V2,M1} P(1031,15362) { join( composition
% 67.27/67.69 ( converse( meet( converse( skol1 ), X ) ), Y ), skol1 ) ==> skol1 }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147698) {G1,W11,D7,L1,V2,M1} { skol1 ==> join( converse(
% 67.27/67.69 composition( Y, meet( converse( skol1 ), X ) ) ), skol1 ) }.
% 67.27/67.69 parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ),
% 67.27/67.69 converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 67.27/67.69 parent1[0; 3]: (147697) {G35,W11,D7,L1,V2,M1} { skol1 ==> join(
% 67.27/67.69 composition( converse( meet( converse( skol1 ), X ) ), Y ), skol1 ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := meet( converse( skol1 ), X )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := converse( Y )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147699) {G1,W11,D7,L1,V2,M1} { join( converse( composition( X,
% 67.27/67.69 meet( converse( skol1 ), Y ) ) ), skol1 ) ==> skol1 }.
% 67.27/67.69 parent0[0]: (147698) {G1,W11,D7,L1,V2,M1} { skol1 ==> join( converse(
% 67.27/67.69 composition( Y, meet( converse( skol1 ), X ) ) ), skol1 ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (28458) {G36,W11,D7,L1,V2,M1} P(9,25375) { join( converse(
% 67.27/67.69 composition( Y, meet( converse( skol1 ), X ) ) ), skol1 ) ==> skol1 }.
% 67.27/67.69 parent0: (147699) {G1,W11,D7,L1,V2,M1} { join( converse( composition( X,
% 67.27/67.69 meet( converse( skol1 ), Y ) ) ), skol1 ) ==> skol1 }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147701) {G24,W14,D5,L1,V3,M1} { converse( join( Y, Z ) ) ==> join
% 67.27/67.69 ( meet( X, converse( Y ) ), converse( join( Z, Y ) ) ) }.
% 67.27/67.69 parent0[0]: (928) {G24,W14,D5,L1,V3,M1} P(904,22);d(55) { join( meet( X,
% 67.27/67.69 converse( Y ) ), converse( join( Z, Y ) ) ) ==> converse( join( Y, Z ) )
% 67.27/67.69 }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147705) {G25,W18,D8,L1,V3,M1} { converse( join( skol1, converse
% 67.27/67.69 ( composition( X, meet( converse( skol1 ), Y ) ) ) ) ) ==> join( meet( Z
% 67.27/67.69 , converse( skol1 ) ), converse( skol1 ) ) }.
% 67.27/67.69 parent0[0]: (28458) {G36,W11,D7,L1,V2,M1} P(9,25375) { join( converse(
% 67.27/67.69 composition( Y, meet( converse( skol1 ), X ) ) ), skol1 ) ==> skol1 }.
% 67.27/67.69 parent1[0; 17]: (147701) {G24,W14,D5,L1,V3,M1} { converse( join( Y, Z ) )
% 67.27/67.69 ==> join( meet( X, converse( Y ) ), converse( join( Z, Y ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := Z
% 67.27/67.69 Y := skol1
% 67.27/67.69 Z := converse( composition( X, meet( converse( skol1 ), Y ) ) )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147706) {G23,W13,D8,L1,V2,M1} { converse( join( skol1, converse
% 67.27/67.69 ( composition( X, meet( converse( skol1 ), Y ) ) ) ) ) ==> converse(
% 67.27/67.69 skol1 ) }.
% 67.27/67.69 parent0[0]: (898) {G22,W7,D4,L1,V2,M1} P(866,0) { join( meet( Y, X ), X )
% 67.27/67.69 ==> X }.
% 67.27/67.69 parent1[0; 11]: (147705) {G25,W18,D8,L1,V3,M1} { converse( join( skol1,
% 67.27/67.69 converse( composition( X, meet( converse( skol1 ), Y ) ) ) ) ) ==> join(
% 67.27/67.69 meet( Z, converse( skol1 ) ), converse( skol1 ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := converse( skol1 )
% 67.27/67.69 Y := Z
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147707) {G2,W12,D6,L1,V2,M1} { join( converse( skol1 ),
% 67.27/67.69 composition( X, meet( converse( skol1 ), Y ) ) ) ==> converse( skol1 )
% 67.27/67.69 }.
% 67.27/67.69 parent0[0]: (20) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 67.27/67.69 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 67.27/67.69 parent1[0; 1]: (147706) {G23,W13,D8,L1,V2,M1} { converse( join( skol1,
% 67.27/67.69 converse( composition( X, meet( converse( skol1 ), Y ) ) ) ) ) ==>
% 67.27/67.69 converse( skol1 ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := composition( X, meet( converse( skol1 ), Y ) )
% 67.27/67.69 Y := skol1
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (28462) {G37,W12,D6,L1,V2,M1} P(28458,928);d(898);d(20) { join
% 67.27/67.69 ( converse( skol1 ), composition( X, meet( converse( skol1 ), Y ) ) ) ==>
% 67.27/67.69 converse( skol1 ) }.
% 67.27/67.69 parent0: (147707) {G2,W12,D6,L1,V2,M1} { join( converse( skol1 ),
% 67.27/67.69 composition( X, meet( converse( skol1 ), Y ) ) ) ==> converse( skol1 )
% 67.27/67.69 }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147710) {G18,W14,D5,L1,V3,M1} { join( X, Z ) ==> join( join( meet
% 67.27/67.69 ( X, Y ), Z ), meet( X, complement( Y ) ) ) }.
% 67.27/67.69 parent0[0]: (1369) {G18,W14,D5,L1,V3,M1} P(1016,30) { join( join( meet( X,
% 67.27/67.69 Y ), Z ), meet( X, complement( Y ) ) ) ==> join( X, Z ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147713) {G19,W14,D8,L1,V2,M1} { join( X, Y ) ==> join( Y, meet(
% 67.27/67.69 X, complement( complement( composition( top, complement( Y ) ) ) ) ) )
% 67.27/67.69 }.
% 67.27/67.69 parent0[0]: (6438) {G29,W11,D7,L1,V2,M1} P(3654,2557);d(740) { join( meet(
% 67.27/67.69 X, complement( composition( top, complement( Y ) ) ) ), Y ) ==> Y }.
% 67.27/67.69 parent1[0; 5]: (147710) {G18,W14,D5,L1,V3,M1} { join( X, Z ) ==> join(
% 67.27/67.69 join( meet( X, Y ), Z ), meet( X, complement( Y ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := complement( composition( top, complement( Y ) ) )
% 67.27/67.69 Z := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147714) {G16,W12,D6,L1,V2,M1} { join( X, Y ) ==> join( Y, meet(
% 67.27/67.69 X, composition( top, complement( Y ) ) ) ) }.
% 67.27/67.69 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.69 complement( X ) ) ==> X }.
% 67.27/67.69 parent1[0; 8]: (147713) {G19,W14,D8,L1,V2,M1} { join( X, Y ) ==> join( Y,
% 67.27/67.69 meet( X, complement( complement( composition( top, complement( Y ) ) ) )
% 67.27/67.69 ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := composition( top, complement( Y ) )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147715) {G16,W12,D6,L1,V2,M1} { join( Y, meet( X, composition(
% 67.27/67.69 top, complement( Y ) ) ) ) ==> join( X, Y ) }.
% 67.27/67.69 parent0[0]: (147714) {G16,W12,D6,L1,V2,M1} { join( X, Y ) ==> join( Y,
% 67.27/67.69 meet( X, composition( top, complement( Y ) ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (34400) {G30,W12,D6,L1,V2,M1} P(6438,1369);d(756) { join( Y,
% 67.27/67.69 meet( X, composition( top, complement( Y ) ) ) ) ==> join( X, Y ) }.
% 67.27/67.69 parent0: (147715) {G16,W12,D6,L1,V2,M1} { join( Y, meet( X, composition(
% 67.27/67.69 top, complement( Y ) ) ) ) ==> join( X, Y ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147717) {G22,W15,D7,L1,V3,M1} { zero ==> meet( composition(
% 67.27/67.69 converse( X ), complement( composition( composition( X, Y ), Z ) ) ),
% 67.27/67.69 composition( Y, Z ) ) }.
% 67.27/67.69 parent0[0]: (1446) {G22,W15,D7,L1,V3,M1} P(104,1034);d(756) { meet(
% 67.27/67.69 composition( converse( X ), complement( composition( composition( X, Y )
% 67.27/67.69 , Z ) ) ), composition( Y, Z ) ) ==> zero }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147723) {G23,W19,D8,L1,V3,M1} { zero ==> meet( composition(
% 67.27/67.69 converse( complement( converse( composition( X, top ) ) ) ), complement(
% 67.27/67.69 composition( zero, Z ) ) ), composition( meet( Y, X ), Z ) ) }.
% 67.27/67.69 parent0[0]: (27502) {G28,W11,D6,L1,V2,M1} P(27298,17);d(776);d(2866) {
% 67.27/67.69 composition( complement( converse( composition( Y, top ) ) ), meet( X, Y
% 67.27/67.69 ) ) ==> zero }.
% 67.27/67.69 parent1[0; 12]: (147717) {G22,W15,D7,L1,V3,M1} { zero ==> meet(
% 67.27/67.69 composition( converse( X ), complement( composition( composition( X, Y )
% 67.27/67.69 , Z ) ) ), composition( Y, Z ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := complement( converse( composition( X, top ) ) )
% 67.27/67.69 Y := meet( Y, X )
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147725) {G24,W19,D8,L1,V3,M1} { zero ==> meet( composition(
% 67.27/67.69 complement( converse( converse( composition( X, top ) ) ) ), complement(
% 67.27/67.69 composition( zero, Y ) ) ), composition( meet( Z, X ), Y ) ) }.
% 67.27/67.69 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.69 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.69 parent1[0; 4]: (147723) {G23,W19,D8,L1,V3,M1} { zero ==> meet( composition
% 67.27/67.69 ( converse( complement( converse( composition( X, top ) ) ) ), complement
% 67.27/67.69 ( composition( zero, Z ) ) ), composition( meet( Y, X ), Z ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := converse( composition( X, top ) )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Z
% 67.27/67.69 Z := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147726) {G1,W17,D6,L1,V3,M1} { zero ==> meet( composition(
% 67.27/67.69 complement( composition( X, top ) ), complement( composition( zero, Y ) )
% 67.27/67.69 ), composition( meet( Z, X ), Y ) ) }.
% 67.27/67.69 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.27/67.69 parent1[0; 5]: (147725) {G24,W19,D8,L1,V3,M1} { zero ==> meet( composition
% 67.27/67.69 ( complement( converse( converse( composition( X, top ) ) ) ), complement
% 67.27/67.69 ( composition( zero, Y ) ) ), composition( meet( Z, X ), Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := composition( X, top )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147727) {G2,W15,D6,L1,V3,M1} { zero ==> meet( composition(
% 67.27/67.69 complement( composition( X, top ) ), complement( zero ) ), composition(
% 67.27/67.69 meet( Z, X ), Y ) ) }.
% 67.27/67.69 parent0[0]: (797) {G20,W5,D3,L1,V1,M1} P(796,17);d(776) { composition( zero
% 67.27/67.69 , X ) ==> zero }.
% 67.27/67.69 parent1[0; 9]: (147726) {G1,W17,D6,L1,V3,M1} { zero ==> meet( composition
% 67.27/67.69 ( complement( composition( X, top ) ), complement( composition( zero, Y )
% 67.27/67.69 ) ), composition( meet( Z, X ), Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147728) {G3,W14,D6,L1,V3,M1} { zero ==> meet( composition(
% 67.27/67.69 complement( composition( X, top ) ), top ), composition( meet( Y, X ), Z
% 67.27/67.69 ) ) }.
% 67.27/67.69 parent0[0]: (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) { complement
% 67.27/67.69 ( zero ) ==> top }.
% 67.27/67.69 parent1[0; 8]: (147727) {G2,W15,D6,L1,V3,M1} { zero ==> meet( composition
% 67.27/67.69 ( complement( composition( X, top ) ), complement( zero ) ), composition
% 67.27/67.69 ( meet( Z, X ), Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Z
% 67.27/67.69 Z := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147729) {G3,W14,D6,L1,V3,M1} { meet( composition( complement(
% 67.27/67.69 composition( X, top ) ), top ), composition( meet( Y, X ), Z ) ) ==> zero
% 67.27/67.69 }.
% 67.27/67.69 parent0[0]: (147728) {G3,W14,D6,L1,V3,M1} { zero ==> meet( composition(
% 67.27/67.69 complement( composition( X, top ) ), top ), composition( meet( Y, X ), Z
% 67.27/67.69 ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (35053) {G29,W14,D6,L1,V3,M1} P(27502,1446);d(2866);d(7);d(797
% 67.27/67.69 );d(744) { meet( composition( complement( composition( X, top ) ), top )
% 67.27/67.69 , composition( meet( Y, X ), Z ) ) ==> zero }.
% 67.27/67.69 parent0: (147729) {G3,W14,D6,L1,V3,M1} { meet( composition( complement(
% 67.27/67.69 composition( X, top ) ), top ), composition( meet( Y, X ), Z ) ) ==> zero
% 67.27/67.69 }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147731) {G31,W11,D7,L1,V1,M1} { X ==> meet( complement(
% 67.27/67.69 composition( complement( composition( X, top ) ), top ) ), X ) }.
% 67.27/67.69 parent0[0]: (15953) {G31,W11,D7,L1,V1,M1} P(15949,3166);d(744);d(752) {
% 67.27/67.69 meet( complement( composition( complement( composition( X, top ) ), top )
% 67.27/67.69 ), X ) ==> X }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147733) {G18,W15,D7,L1,V1,M1} { composition( X, top ) ==> meet(
% 67.27/67.69 complement( composition( complement( composition( X, top ) ), top ) ),
% 67.27/67.69 composition( X, top ) ) }.
% 67.27/67.69 parent0[0]: (1508) {G17,W9,D4,L1,V1,M1} P(1507,4) { composition(
% 67.27/67.69 composition( X, top ), top ) ==> composition( X, top ) }.
% 67.27/67.69 parent1[0; 8]: (147731) {G31,W11,D7,L1,V1,M1} { X ==> meet( complement(
% 67.27/67.69 composition( complement( composition( X, top ) ), top ) ), X ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := composition( X, top )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147734) {G19,W11,D6,L1,V1,M1} { composition( X, top ) ==>
% 67.27/67.69 complement( composition( complement( composition( X, top ) ), top ) ) }.
% 67.27/67.69 parent0[0]: (3782) {G32,W13,D6,L1,V1,M1} P(3759,722);d(749) { meet(
% 67.27/67.69 complement( composition( complement( X ), top ) ), X ) ==> complement(
% 67.27/67.69 composition( complement( X ), top ) ) }.
% 67.27/67.69 parent1[0; 4]: (147733) {G18,W15,D7,L1,V1,M1} { composition( X, top ) ==>
% 67.27/67.69 meet( complement( composition( complement( composition( X, top ) ), top )
% 67.27/67.69 ), composition( X, top ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := composition( X, top )
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147735) {G19,W11,D6,L1,V1,M1} { complement( composition(
% 67.27/67.69 complement( composition( X, top ) ), top ) ) ==> composition( X, top )
% 67.27/67.69 }.
% 67.27/67.69 parent0[0]: (147734) {G19,W11,D6,L1,V1,M1} { composition( X, top ) ==>
% 67.27/67.69 complement( composition( complement( composition( X, top ) ), top ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (36194) {G33,W11,D6,L1,V1,M1} P(1508,15953);d(3782) {
% 67.27/67.69 complement( composition( complement( composition( X, top ) ), top ) ) ==>
% 67.27/67.69 composition( X, top ) }.
% 67.27/67.69 parent0: (147735) {G19,W11,D6,L1,V1,M1} { complement( composition(
% 67.27/67.69 complement( composition( X, top ) ), top ) ) ==> composition( X, top )
% 67.27/67.69 }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147736) {G33,W11,D6,L1,V1,M1} { composition( X, top ) ==>
% 67.27/67.69 complement( composition( complement( composition( X, top ) ), top ) ) }.
% 67.27/67.69 parent0[0]: (36194) {G33,W11,D6,L1,V1,M1} P(1508,15953);d(3782) {
% 67.27/67.69 complement( composition( complement( composition( X, top ) ), top ) ) ==>
% 67.27/67.69 composition( X, top ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147740) {G34,W13,D5,L1,V1,M1} { composition( complement(
% 67.27/67.69 composition( X, top ) ), top ) ==> complement( composition( composition(
% 67.27/67.69 X, top ), top ) ) }.
% 67.27/67.69 parent0[0]: (36194) {G33,W11,D6,L1,V1,M1} P(1508,15953);d(3782) {
% 67.27/67.69 complement( composition( complement( composition( X, top ) ), top ) ) ==>
% 67.27/67.69 composition( X, top ) }.
% 67.27/67.69 parent1[0; 9]: (147736) {G33,W11,D6,L1,V1,M1} { composition( X, top ) ==>
% 67.27/67.69 complement( composition( complement( composition( X, top ) ), top ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := complement( composition( X, top ) )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147741) {G18,W11,D5,L1,V1,M1} { composition( complement(
% 67.27/67.69 composition( X, top ) ), top ) ==> complement( composition( X, top ) )
% 67.27/67.69 }.
% 67.27/67.69 parent0[0]: (1508) {G17,W9,D4,L1,V1,M1} P(1507,4) { composition(
% 67.27/67.69 composition( X, top ), top ) ==> composition( X, top ) }.
% 67.27/67.69 parent1[0; 8]: (147740) {G34,W13,D5,L1,V1,M1} { composition( complement(
% 67.27/67.69 composition( X, top ) ), top ) ==> complement( composition( composition(
% 67.27/67.69 X, top ), top ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (36197) {G34,W11,D5,L1,V1,M1} P(36194,36194);d(1508) {
% 67.27/67.69 composition( complement( composition( X, top ) ), top ) ==> complement(
% 67.27/67.69 composition( X, top ) ) }.
% 67.27/67.69 parent0: (147741) {G18,W11,D5,L1,V1,M1} { composition( complement(
% 67.27/67.69 composition( X, top ) ), top ) ==> complement( composition( X, top ) )
% 67.27/67.69 }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147745) {G30,W12,D5,L1,V3,M1} { meet( complement( composition( X
% 67.27/67.69 , top ) ), composition( meet( Y, X ), Z ) ) ==> zero }.
% 67.27/67.69 parent0[0]: (36197) {G34,W11,D5,L1,V1,M1} P(36194,36194);d(1508) {
% 67.27/67.69 composition( complement( composition( X, top ) ), top ) ==> complement(
% 67.27/67.69 composition( X, top ) ) }.
% 67.27/67.69 parent1[0; 2]: (35053) {G29,W14,D6,L1,V3,M1} P(27502,1446);d(2866);d(7);d(
% 67.27/67.69 797);d(744) { meet( composition( complement( composition( X, top ) ), top
% 67.27/67.69 ), composition( meet( Y, X ), Z ) ) ==> zero }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (40136) {G35,W12,D5,L1,V3,M1} S(35053);d(36197) { meet(
% 67.27/67.69 complement( composition( X, top ) ), composition( meet( Y, X ), Z ) ) ==>
% 67.27/67.69 zero }.
% 67.27/67.69 parent0: (147745) {G30,W12,D5,L1,V3,M1} { meet( complement( composition( X
% 67.27/67.69 , top ) ), composition( meet( Y, X ), Z ) ) ==> zero }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147748) {G17,W14,D6,L1,V3,M1} { meet( complement( join( X, Z ) )
% 67.27/67.69 , Y ) ==> complement( join( join( X, complement( Y ) ), Z ) ) }.
% 67.27/67.69 parent0[0]: (1607) {G17,W14,D6,L1,V3,M1} P(30,771) { complement( join( join
% 67.27/67.69 ( X, complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z )
% 67.27/67.69 }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Z
% 67.27/67.69 Z := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147758) {G18,W16,D6,L1,V3,M1} { meet( complement( join( meet( X
% 67.27/67.69 , Y ), Z ) ), Y ) ==> complement( join( join( X, complement( Y ) ), Z ) )
% 67.27/67.69 }.
% 67.27/67.69 parent0[0]: (2518) {G23,W11,D4,L1,V2,M1} P(2432,898);d(1);d(851) { join(
% 67.27/67.69 meet( X, Y ), complement( Y ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.69 parent1[0; 11]: (147748) {G17,W14,D6,L1,V3,M1} { meet( complement( join( X
% 67.27/67.69 , Z ) ), Y ) ==> complement( join( join( X, complement( Y ) ), Z ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := meet( X, Y )
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147759) {G18,W15,D6,L1,V3,M1} { meet( complement( join( meet( X
% 67.27/67.69 , Y ), Z ) ), Y ) ==> meet( complement( join( X, Z ) ), Y ) }.
% 67.27/67.69 parent0[0]: (1607) {G17,W14,D6,L1,V3,M1} P(30,771) { complement( join( join
% 67.27/67.69 ( X, complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z )
% 67.27/67.69 }.
% 67.27/67.69 parent1[0; 9]: (147758) {G18,W16,D6,L1,V3,M1} { meet( complement( join(
% 67.27/67.69 meet( X, Y ), Z ) ), Y ) ==> complement( join( join( X, complement( Y ) )
% 67.27/67.69 , Z ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Z
% 67.27/67.69 Z := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (40507) {G24,W15,D6,L1,V3,M1} P(2518,1607);d(1607) { meet(
% 67.27/67.69 complement( join( meet( X, Y ), Z ) ), Y ) ==> meet( complement( join( X
% 67.27/67.69 , Z ) ), Y ) }.
% 67.27/67.69 parent0: (147759) {G18,W15,D6,L1,V3,M1} { meet( complement( join( meet( X
% 67.27/67.69 , Y ), Z ) ), Y ) ==> meet( complement( join( X, Z ) ), Y ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 Z := Z
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147762) {G16,W10,D5,L1,V2,M1} { meet( X, complement( Y ) ) ==>
% 67.27/67.69 complement( join( complement( X ), Y ) ) }.
% 67.27/67.69 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.69 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147766) {G17,W18,D7,L1,V2,M1} { meet( X, complement( converse(
% 67.27/67.69 join( complement( one ), Y ) ) ) ) ==> complement( join( join( complement
% 67.27/67.69 ( X ), complement( one ) ), converse( Y ) ) ) }.
% 67.27/67.69 parent0[0]: (1940) {G29,W15,D6,L1,V2,M1} P(1925,26) { join( X, converse(
% 67.27/67.69 join( complement( one ), Y ) ) ) ==> join( join( X, complement( one ) ),
% 67.27/67.69 converse( Y ) ) }.
% 67.27/67.69 parent1[0; 10]: (147762) {G16,W10,D5,L1,V2,M1} { meet( X, complement( Y )
% 67.27/67.69 ) ==> complement( join( complement( X ), Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := complement( X )
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := converse( join( complement( one ), Y ) )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147767) {G18,W17,D7,L1,V2,M1} { meet( X, complement( converse(
% 67.27/67.69 join( complement( one ), Y ) ) ) ) ==> meet( complement( join( complement
% 67.27/67.69 ( X ), converse( Y ) ) ), one ) }.
% 67.27/67.69 parent0[0]: (1607) {G17,W14,D6,L1,V3,M1} P(30,771) { complement( join( join
% 67.27/67.69 ( X, complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z )
% 67.27/67.69 }.
% 67.27/67.69 parent1[0; 9]: (147766) {G17,W18,D7,L1,V2,M1} { meet( X, complement(
% 67.27/67.69 converse( join( complement( one ), Y ) ) ) ) ==> complement( join( join(
% 67.27/67.69 complement( X ), complement( one ) ), converse( Y ) ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := complement( X )
% 67.27/67.69 Y := converse( Y )
% 67.27/67.69 Z := one
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147768) {G17,W16,D7,L1,V2,M1} { meet( X, complement( converse(
% 67.27/67.69 join( complement( one ), Y ) ) ) ) ==> meet( meet( X, complement(
% 67.27/67.69 converse( Y ) ) ), one ) }.
% 67.27/67.69 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.69 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.69 parent1[0; 10]: (147767) {G18,W17,D7,L1,V2,M1} { meet( X, complement(
% 67.27/67.69 converse( join( complement( one ), Y ) ) ) ) ==> meet( complement( join(
% 67.27/67.69 complement( X ), converse( Y ) ) ), one ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := converse( Y )
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147769) {G18,W15,D6,L1,V2,M1} { meet( X, converse( meet( one,
% 67.27/67.69 complement( Y ) ) ) ) ==> meet( meet( X, complement( converse( Y ) ) ),
% 67.27/67.69 one ) }.
% 67.27/67.69 parent0[0]: (2845) {G27,W12,D6,L1,V2,M1} P(951,2796) { complement( converse
% 67.27/67.69 ( join( complement( X ), Y ) ) ) ==> converse( meet( X, complement( Y ) )
% 67.27/67.69 ) }.
% 67.27/67.69 parent1[0; 3]: (147768) {G17,W16,D7,L1,V2,M1} { meet( X, complement(
% 67.27/67.69 converse( join( complement( one ), Y ) ) ) ) ==> meet( meet( X,
% 67.27/67.69 complement( converse( Y ) ) ), one ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := one
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 subsumption: (51593) {G30,W15,D6,L1,V2,M1} P(1940,772);d(1607);d(772);d(
% 67.27/67.69 2845) { meet( X, converse( meet( one, complement( Y ) ) ) ) ==> meet(
% 67.27/67.69 meet( X, complement( converse( Y ) ) ), one ) }.
% 67.27/67.69 parent0: (147769) {G18,W15,D6,L1,V2,M1} { meet( X, converse( meet( one,
% 67.27/67.69 complement( Y ) ) ) ) ==> meet( meet( X, complement( converse( Y ) ) ),
% 67.27/67.69 one ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 permutation0:
% 67.27/67.69 0 ==> 0
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 eqswap: (147772) {G27,W11,D4,L1,V2,M1} { meet( X, complement( Y ) ) ==>
% 67.27/67.69 meet( join( X, Y ), complement( Y ) ) }.
% 67.27/67.69 parent0[0]: (10143) {G27,W11,D4,L1,V2,M1} P(756,10123) { meet( join( Y, X )
% 67.27/67.69 , complement( X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := Y
% 67.27/67.69 Y := X
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147780) {G28,W23,D7,L1,V2,M1} { meet( X, complement( converse(
% 67.27/67.69 join( Y, complement( one ) ) ) ) ) ==> meet( join( join( X, converse( Y )
% 67.27/67.69 ), complement( one ) ), complement( converse( join( Y, complement( one )
% 67.27/67.69 ) ) ) ) }.
% 67.27/67.69 parent0[0]: (1941) {G29,W15,D6,L1,V2,M1} P(1925,26) { join( X, converse(
% 67.27/67.69 join( Y, complement( one ) ) ) ) ==> join( join( X, converse( Y ) ),
% 67.27/67.69 complement( one ) ) }.
% 67.27/67.69 parent1[0; 10]: (147772) {G27,W11,D4,L1,V2,M1} { meet( X, complement( Y )
% 67.27/67.69 ) ==> meet( join( X, Y ), complement( Y ) ) }.
% 67.27/67.69 substitution0:
% 67.27/67.69 X := X
% 67.27/67.69 Y := Y
% 67.27/67.69 end
% 67.27/67.69 substitution1:
% 67.27/67.69 X := X
% 67.27/67.69 Y := converse( join( Y, complement( one ) ) )
% 67.27/67.69 end
% 67.27/67.69
% 67.27/67.69 paramod: (147781) {G19,W23,D8,L1,V2,M1} { meet( X, complement( converse(
% 67.27/67.69 join( Y, complement( one ) ) ) ) ) ==> complement( join( meet( complement
% 67.27/67.69 ( join( X, converse( Y ) ) ), one ), converse( join( Y, complement( one )
% 67.27/67.69 ) ) ) ) }.
% 67.27/67.69 parent0[0]: (1615) {G18,W15,D6,L1,V3,M1} P(950,1598) { meet( join( X,
% 67.27/67.70 complement( Y ) ), complement( Z ) ) ==> complement( join( meet(
% 67.27/67.70 complement( X ), Y ), Z ) ) }.
% 67.27/67.70 parent1[0; 9]: (147780) {G28,W23,D7,L1,V2,M1} { meet( X, complement(
% 67.27/67.70 converse( join( Y, complement( one ) ) ) ) ) ==> meet( join( join( X,
% 67.27/67.70 converse( Y ) ), complement( one ) ), complement( converse( join( Y,
% 67.27/67.70 complement( one ) ) ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := join( X, converse( Y ) )
% 67.27/67.70 Y := one
% 67.27/67.70 Z := converse( join( Y, complement( one ) ) )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147782) {G20,W23,D9,L1,V2,M1} { meet( X, complement( converse(
% 67.27/67.70 join( Y, complement( one ) ) ) ) ) ==> complement( join( join( meet(
% 67.27/67.70 complement( join( X, converse( Y ) ) ), one ), converse( Y ) ),
% 67.27/67.70 complement( one ) ) ) }.
% 67.27/67.70 parent0[0]: (1941) {G29,W15,D6,L1,V2,M1} P(1925,26) { join( X, converse(
% 67.27/67.70 join( Y, complement( one ) ) ) ) ==> join( join( X, converse( Y ) ),
% 67.27/67.70 complement( one ) ) }.
% 67.27/67.70 parent1[0; 10]: (147781) {G19,W23,D8,L1,V2,M1} { meet( X, complement(
% 67.27/67.70 converse( join( Y, complement( one ) ) ) ) ) ==> complement( join( meet(
% 67.27/67.70 complement( join( X, converse( Y ) ) ), one ), converse( join( Y,
% 67.27/67.70 complement( one ) ) ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := meet( complement( join( X, converse( Y ) ) ), one )
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147783) {G17,W22,D9,L1,V2,M1} { meet( X, complement( converse(
% 67.27/67.70 join( Y, complement( one ) ) ) ) ) ==> meet( complement( join( meet(
% 67.27/67.70 complement( join( X, converse( Y ) ) ), one ), converse( Y ) ) ), one )
% 67.27/67.70 }.
% 67.27/67.70 parent0[0]: (771) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( X,
% 67.27/67.70 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 67.27/67.70 parent1[0; 9]: (147782) {G20,W23,D9,L1,V2,M1} { meet( X, complement(
% 67.27/67.70 converse( join( Y, complement( one ) ) ) ) ) ==> complement( join( join(
% 67.27/67.70 meet( complement( join( X, converse( Y ) ) ), one ), converse( Y ) ),
% 67.27/67.70 complement( one ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := join( meet( complement( join( X, converse( Y ) ) ), one ), converse
% 67.27/67.70 ( Y ) )
% 67.27/67.70 Y := one
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147784) {G18,W20,D8,L1,V2,M1} { meet( X, complement( converse(
% 67.27/67.70 join( Y, complement( one ) ) ) ) ) ==> meet( complement( join( complement
% 67.27/67.70 ( join( X, converse( Y ) ) ), converse( Y ) ) ), one ) }.
% 67.27/67.70 parent0[0]: (40507) {G24,W15,D6,L1,V3,M1} P(2518,1607);d(1607) { meet(
% 67.27/67.70 complement( join( meet( X, Y ), Z ) ), Y ) ==> meet( complement( join( X
% 67.27/67.70 , Z ) ), Y ) }.
% 67.27/67.70 parent1[0; 9]: (147783) {G17,W22,D9,L1,V2,M1} { meet( X, complement(
% 67.27/67.70 converse( join( Y, complement( one ) ) ) ) ) ==> meet( complement( join(
% 67.27/67.70 meet( complement( join( X, converse( Y ) ) ), one ), converse( Y ) ) ),
% 67.27/67.70 one ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := complement( join( X, converse( Y ) ) )
% 67.27/67.70 Y := one
% 67.27/67.70 Z := converse( Y )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147785) {G17,W19,D7,L1,V2,M1} { meet( X, complement( converse(
% 67.27/67.70 join( Y, complement( one ) ) ) ) ) ==> meet( meet( join( X, converse( Y )
% 67.27/67.70 ), complement( converse( Y ) ) ), one ) }.
% 67.27/67.70 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.70 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.70 parent1[0; 10]: (147784) {G18,W20,D8,L1,V2,M1} { meet( X, complement(
% 67.27/67.70 converse( join( Y, complement( one ) ) ) ) ) ==> meet( complement( join(
% 67.27/67.70 complement( join( X, converse( Y ) ) ), converse( Y ) ) ), one ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := converse( Y )
% 67.27/67.70 Y := join( X, converse( Y ) )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147786) {G18,W16,D7,L1,V2,M1} { meet( X, complement( converse(
% 67.27/67.70 join( Y, complement( one ) ) ) ) ) ==> meet( meet( X, complement(
% 67.27/67.70 converse( Y ) ) ), one ) }.
% 67.27/67.70 parent0[0]: (10143) {G27,W11,D4,L1,V2,M1} P(756,10123) { meet( join( Y, X )
% 67.27/67.70 , complement( X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.70 parent1[0; 10]: (147785) {G17,W19,D7,L1,V2,M1} { meet( X, complement(
% 67.27/67.70 converse( join( Y, complement( one ) ) ) ) ) ==> meet( meet( join( X,
% 67.27/67.70 converse( Y ) ), complement( converse( Y ) ) ), one ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := converse( Y )
% 67.27/67.70 Y := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147787) {G19,W15,D6,L1,V2,M1} { meet( X, converse( meet(
% 67.27/67.70 complement( Y ), one ) ) ) ==> meet( meet( X, complement( converse( Y ) )
% 67.27/67.70 ), one ) }.
% 67.27/67.70 parent0[0]: (2847) {G27,W12,D6,L1,V2,M1} P(950,2796) { complement( converse
% 67.27/67.70 ( join( X, complement( Y ) ) ) ) ==> converse( meet( complement( X ), Y )
% 67.27/67.70 ) }.
% 67.27/67.70 parent1[0; 3]: (147786) {G18,W16,D7,L1,V2,M1} { meet( X, complement(
% 67.27/67.70 converse( join( Y, complement( one ) ) ) ) ) ==> meet( meet( X,
% 67.27/67.70 complement( converse( Y ) ) ), one ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := Y
% 67.27/67.70 Y := one
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (51733) {G30,W15,D6,L1,V2,M1} P(1941,10143);d(1615);d(1941);d(
% 67.27/67.70 771);d(40507);d(772);d(10143);d(2847) { meet( X, converse( meet(
% 67.27/67.70 complement( Y ), one ) ) ) ==> meet( meet( X, complement( converse( Y ) )
% 67.27/67.70 ), one ) }.
% 67.27/67.70 parent0: (147787) {G19,W15,D6,L1,V2,M1} { meet( X, converse( meet(
% 67.27/67.70 complement( Y ), one ) ) ) ==> meet( meet( X, complement( converse( Y ) )
% 67.27/67.70 ), one ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147790) {G28,W12,D5,L1,V2,M1} { converse( join( complement( X ),
% 67.27/67.70 Y ) ) ==> join( complement( converse( X ) ), converse( Y ) ) }.
% 67.27/67.70 parent0[0]: (2894) {G28,W12,D5,L1,V2,M1} P(2866,8) { join( complement(
% 67.27/67.70 converse( X ) ), converse( Y ) ) ==> converse( join( complement( X ), Y )
% 67.27/67.70 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147795) {G28,W14,D5,L1,V2,M1} { converse( join( complement( X )
% 67.27/67.70 , complement( Y ) ) ) ==> join( complement( converse( X ) ), complement(
% 67.27/67.70 converse( Y ) ) ) }.
% 67.27/67.70 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.70 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.70 parent1[0; 11]: (147790) {G28,W12,D5,L1,V2,M1} { converse( join(
% 67.27/67.70 complement( X ), Y ) ) ==> join( complement( converse( X ) ), converse( Y
% 67.27/67.70 ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := Y
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 Y := complement( Y )
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147797) {G17,W13,D5,L1,V2,M1} { converse( join( complement( X )
% 67.27/67.70 , complement( Y ) ) ) ==> complement( meet( converse( X ), converse( Y )
% 67.27/67.70 ) ) }.
% 67.27/67.70 parent0[0]: (773) {G16,W10,D4,L1,V2,M1} P(3,756) { join( complement( X ),
% 67.27/67.70 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.27/67.70 parent1[0; 7]: (147795) {G28,W14,D5,L1,V2,M1} { converse( join( complement
% 67.27/67.70 ( X ), complement( Y ) ) ) ==> join( complement( converse( X ) ),
% 67.27/67.70 complement( converse( Y ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := converse( X )
% 67.27/67.70 Y := converse( Y )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147799) {G17,W12,D5,L1,V2,M1} { converse( complement( meet( X, Y
% 67.27/67.70 ) ) ) ==> complement( meet( converse( X ), converse( Y ) ) ) }.
% 67.27/67.70 parent0[0]: (773) {G16,W10,D4,L1,V2,M1} P(3,756) { join( complement( X ),
% 67.27/67.70 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.27/67.70 parent1[0; 2]: (147797) {G17,W13,D5,L1,V2,M1} { converse( join( complement
% 67.27/67.70 ( X ), complement( Y ) ) ) ==> complement( meet( converse( X ), converse
% 67.27/67.70 ( Y ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147800) {G18,W12,D5,L1,V2,M1} { complement( converse( meet( X, Y
% 67.27/67.70 ) ) ) ==> complement( meet( converse( X ), converse( Y ) ) ) }.
% 67.27/67.70 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.70 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.70 parent1[0; 1]: (147799) {G17,W12,D5,L1,V2,M1} { converse( complement( meet
% 67.27/67.70 ( X, Y ) ) ) ==> complement( meet( converse( X ), converse( Y ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := meet( X, Y )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147801) {G18,W12,D5,L1,V2,M1} { complement( meet( converse( X ),
% 67.27/67.70 converse( Y ) ) ) ==> complement( converse( meet( X, Y ) ) ) }.
% 67.27/67.70 parent0[0]: (147800) {G18,W12,D5,L1,V2,M1} { complement( converse( meet( X
% 67.27/67.70 , Y ) ) ) ==> complement( meet( converse( X ), converse( Y ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (52972) {G29,W12,D5,L1,V2,M1} P(2866,2894);d(773);d(773);d(
% 67.27/67.70 2866) { complement( meet( converse( Y ), converse( X ) ) ) ==> complement
% 67.27/67.70 ( converse( meet( Y, X ) ) ) }.
% 67.27/67.70 parent0: (147801) {G18,W12,D5,L1,V2,M1} { complement( meet( converse( X )
% 67.27/67.70 , converse( Y ) ) ) ==> complement( converse( meet( X, Y ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := Y
% 67.27/67.70 Y := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147803) {G15,W5,D4,L1,V1,M1} { X ==> complement( complement( X )
% 67.27/67.70 ) }.
% 67.27/67.70 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.70 complement( X ) ) ==> X }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147805) {G16,W12,D6,L1,V2,M1} { meet( converse( X ), converse( Y
% 67.27/67.70 ) ) ==> complement( complement( converse( meet( X, Y ) ) ) ) }.
% 67.27/67.70 parent0[0]: (52972) {G29,W12,D5,L1,V2,M1} P(2866,2894);d(773);d(773);d(2866
% 67.27/67.70 ) { complement( meet( converse( Y ), converse( X ) ) ) ==> complement(
% 67.27/67.70 converse( meet( Y, X ) ) ) }.
% 67.27/67.70 parent1[0; 7]: (147803) {G15,W5,D4,L1,V1,M1} { X ==> complement(
% 67.27/67.70 complement( X ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := Y
% 67.27/67.70 Y := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := meet( converse( X ), converse( Y ) )
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147806) {G16,W10,D4,L1,V2,M1} { meet( converse( X ), converse( Y
% 67.27/67.70 ) ) ==> converse( meet( X, Y ) ) }.
% 67.27/67.70 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.70 complement( X ) ) ==> X }.
% 67.27/67.70 parent1[0; 6]: (147805) {G16,W12,D6,L1,V2,M1} { meet( converse( X ),
% 67.27/67.70 converse( Y ) ) ==> complement( complement( converse( meet( X, Y ) ) ) )
% 67.27/67.70 }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := converse( meet( X, Y ) )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (53018) {G30,W10,D4,L1,V2,M1} P(52972,756);d(756) { meet(
% 67.27/67.70 converse( X ), converse( Y ) ) ==> converse( meet( X, Y ) ) }.
% 67.27/67.70 parent0: (147806) {G16,W10,D4,L1,V2,M1} { meet( converse( X ), converse( Y
% 67.27/67.70 ) ) ==> converse( meet( X, Y ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147809) {G30,W10,D5,L1,V1,M1} { composition( X, skol1 ) ==>
% 67.27/67.70 composition( meet( converse( skol1 ), X ), skol1 ) }.
% 67.27/67.70 parent0[0]: (18135) {G30,W10,D5,L1,V1,M1} P(2464,2900);d(2901) {
% 67.27/67.70 composition( meet( converse( skol1 ), X ), skol1 ) ==> composition( X,
% 67.27/67.70 skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147810) {G31,W11,D5,L1,V1,M1} { composition( converse( X ),
% 67.27/67.70 skol1 ) ==> composition( converse( meet( skol1, X ) ), skol1 ) }.
% 67.27/67.70 parent0[0]: (53018) {G30,W10,D4,L1,V2,M1} P(52972,756);d(756) { meet(
% 67.27/67.70 converse( X ), converse( Y ) ) ==> converse( meet( X, Y ) ) }.
% 67.27/67.70 parent1[0; 6]: (147809) {G30,W10,D5,L1,V1,M1} { composition( X, skol1 )
% 67.27/67.70 ==> composition( meet( converse( skol1 ), X ), skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := skol1
% 67.27/67.70 Y := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := converse( X )
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147811) {G31,W11,D5,L1,V1,M1} { composition( converse( meet(
% 67.27/67.70 skol1, X ) ), skol1 ) ==> composition( converse( X ), skol1 ) }.
% 67.27/67.70 parent0[0]: (147810) {G31,W11,D5,L1,V1,M1} { composition( converse( X ),
% 67.27/67.70 skol1 ) ==> composition( converse( meet( skol1, X ) ), skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (53023) {G31,W11,D5,L1,V1,M1} P(53018,18135) { composition(
% 67.27/67.70 converse( meet( skol1, X ) ), skol1 ) ==> composition( converse( X ),
% 67.27/67.70 skol1 ) }.
% 67.27/67.70 parent0: (147811) {G31,W11,D5,L1,V1,M1} { composition( converse( meet(
% 67.27/67.70 skol1, X ) ), skol1 ) ==> composition( converse( X ), skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147813) {G30,W10,D5,L1,V1,M1} { composition( X, skol1 ) ==>
% 67.27/67.70 composition( meet( X, converse( skol1 ) ), skol1 ) }.
% 67.27/67.70 parent0[0]: (18134) {G30,W10,D5,L1,V1,M1} P(2429,2900);d(2901) {
% 67.27/67.70 composition( meet( X, converse( skol1 ) ), skol1 ) ==> composition( X,
% 67.27/67.70 skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147814) {G31,W11,D5,L1,V1,M1} { composition( converse( X ),
% 67.27/67.70 skol1 ) ==> composition( converse( meet( X, skol1 ) ), skol1 ) }.
% 67.27/67.70 parent0[0]: (53018) {G30,W10,D4,L1,V2,M1} P(52972,756);d(756) { meet(
% 67.27/67.70 converse( X ), converse( Y ) ) ==> converse( meet( X, Y ) ) }.
% 67.27/67.70 parent1[0; 6]: (147813) {G30,W10,D5,L1,V1,M1} { composition( X, skol1 )
% 67.27/67.70 ==> composition( meet( X, converse( skol1 ) ), skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := skol1
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := converse( X )
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147815) {G31,W11,D5,L1,V1,M1} { composition( converse( meet( X,
% 67.27/67.70 skol1 ) ), skol1 ) ==> composition( converse( X ), skol1 ) }.
% 67.27/67.70 parent0[0]: (147814) {G31,W11,D5,L1,V1,M1} { composition( converse( X ),
% 67.27/67.70 skol1 ) ==> composition( converse( meet( X, skol1 ) ), skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (53024) {G31,W11,D5,L1,V1,M1} P(53018,18134) { composition(
% 67.27/67.70 converse( meet( X, skol1 ) ), skol1 ) ==> composition( converse( X ),
% 67.27/67.70 skol1 ) }.
% 67.27/67.70 parent0: (147815) {G31,W11,D5,L1,V1,M1} { composition( converse( meet( X,
% 67.27/67.70 skol1 ) ), skol1 ) ==> composition( converse( X ), skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147817) {G30,W10,D4,L1,V2,M1} { converse( meet( X, Y ) ) ==> meet
% 67.27/67.70 ( converse( X ), converse( Y ) ) }.
% 67.27/67.70 parent0[0]: (53018) {G30,W10,D4,L1,V2,M1} P(52972,756);d(756) { meet(
% 67.27/67.70 converse( X ), converse( Y ) ) ==> converse( meet( X, Y ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147818) {G1,W10,D5,L1,V2,M1} { converse( meet( converse( X ), Y
% 67.27/67.70 ) ) ==> meet( X, converse( Y ) ) }.
% 67.27/67.70 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.27/67.70 parent1[0; 7]: (147817) {G30,W10,D4,L1,V2,M1} { converse( meet( X, Y ) )
% 67.27/67.70 ==> meet( converse( X ), converse( Y ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := converse( X )
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (53040) {G31,W10,D5,L1,V2,M1} P(7,53018) { converse( meet(
% 67.27/67.70 converse( X ), Y ) ) ==> meet( X, converse( Y ) ) }.
% 67.27/67.70 parent0: (147818) {G1,W10,D5,L1,V2,M1} { converse( meet( converse( X ), Y
% 67.27/67.70 ) ) ==> meet( X, converse( Y ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147823) {G30,W10,D4,L1,V2,M1} { converse( meet( X, Y ) ) ==> meet
% 67.27/67.70 ( converse( X ), converse( Y ) ) }.
% 67.27/67.70 parent0[0]: (53018) {G30,W10,D4,L1,V2,M1} P(52972,756);d(756) { meet(
% 67.27/67.70 converse( X ), converse( Y ) ) ==> converse( meet( X, Y ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147825) {G1,W10,D5,L1,V2,M1} { converse( meet( X, converse( Y )
% 67.27/67.70 ) ) ==> meet( converse( X ), Y ) }.
% 67.27/67.70 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.27/67.70 parent1[0; 9]: (147823) {G30,W10,D4,L1,V2,M1} { converse( meet( X, Y ) )
% 67.27/67.70 ==> meet( converse( X ), converse( Y ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := Y
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 Y := converse( Y )
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (53041) {G31,W10,D5,L1,V2,M1} P(7,53018) { converse( meet( Y,
% 67.27/67.70 converse( X ) ) ) ==> meet( converse( Y ), X ) }.
% 67.27/67.70 parent0: (147825) {G1,W10,D5,L1,V2,M1} { converse( meet( X, converse( Y )
% 67.27/67.70 ) ) ==> meet( converse( X ), Y ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := Y
% 67.27/67.70 Y := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147829) {G1,W10,D5,L1,V2,M1} { composition( converse( Y ), X )
% 67.27/67.70 ==> converse( composition( converse( X ), Y ) ) }.
% 67.27/67.70 parent0[0]: (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition(
% 67.27/67.70 converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147833) {G2,W12,D5,L1,V1,M1} { composition( converse( skol1 ),
% 67.27/67.70 meet( skol1, X ) ) ==> converse( composition( converse( X ), skol1 ) )
% 67.27/67.70 }.
% 67.27/67.70 parent0[0]: (53023) {G31,W11,D5,L1,V1,M1} P(53018,18135) { composition(
% 67.27/67.70 converse( meet( skol1, X ) ), skol1 ) ==> composition( converse( X ),
% 67.27/67.70 skol1 ) }.
% 67.27/67.70 parent1[0; 8]: (147829) {G1,W10,D5,L1,V2,M1} { composition( converse( Y )
% 67.27/67.70 , X ) ==> converse( composition( converse( X ), Y ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := meet( skol1, X )
% 67.27/67.70 Y := skol1
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147834) {G2,W11,D4,L1,V1,M1} { composition( converse( skol1 ),
% 67.27/67.70 meet( skol1, X ) ) ==> composition( converse( skol1 ), X ) }.
% 67.27/67.70 parent0[0]: (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition(
% 67.27/67.70 converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 67.27/67.70 parent1[0; 7]: (147833) {G2,W12,D5,L1,V1,M1} { composition( converse(
% 67.27/67.70 skol1 ), meet( skol1, X ) ) ==> converse( composition( converse( X ),
% 67.27/67.70 skol1 ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := skol1
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (53236) {G32,W11,D4,L1,V1,M1} P(53023,17);d(17) { composition
% 67.27/67.70 ( converse( skol1 ), meet( skol1, X ) ) ==> composition( converse( skol1
% 67.27/67.70 ), X ) }.
% 67.27/67.70 parent0: (147834) {G2,W11,D4,L1,V1,M1} { composition( converse( skol1 ),
% 67.27/67.70 meet( skol1, X ) ) ==> composition( converse( skol1 ), X ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147836) {G32,W11,D4,L1,V1,M1} { composition( converse( skol1 ), X
% 67.27/67.70 ) ==> composition( converse( skol1 ), meet( skol1, X ) ) }.
% 67.27/67.70 parent0[0]: (53236) {G32,W11,D4,L1,V1,M1} P(53023,17);d(17) { composition(
% 67.27/67.70 converse( skol1 ), meet( skol1, X ) ) ==> composition( converse( skol1 )
% 67.27/67.70 , X ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147838) {G25,W11,D4,L1,V1,M1} { composition( converse( skol1 ),
% 67.27/67.70 X ) ==> composition( converse( skol1 ), meet( X, skol1 ) ) }.
% 67.27/67.70 parent0[0]: (8755) {G24,W11,D4,L1,V3,M1} P(2544,247);d(2544) { composition
% 67.27/67.70 ( Z, meet( X, Y ) ) = composition( Z, meet( Y, X ) ) }.
% 67.27/67.70 parent1[0; 5]: (147836) {G32,W11,D4,L1,V1,M1} { composition( converse(
% 67.27/67.70 skol1 ), X ) ==> composition( converse( skol1 ), meet( skol1, X ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := skol1
% 67.27/67.70 Y := X
% 67.27/67.70 Z := converse( skol1 )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147844) {G25,W11,D4,L1,V1,M1} { composition( converse( skol1 ),
% 67.27/67.70 meet( X, skol1 ) ) ==> composition( converse( skol1 ), X ) }.
% 67.27/67.70 parent0[0]: (147838) {G25,W11,D4,L1,V1,M1} { composition( converse( skol1
% 67.27/67.70 ), X ) ==> composition( converse( skol1 ), meet( X, skol1 ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (53285) {G33,W11,D4,L1,V1,M1} P(53236,8755) { composition(
% 67.27/67.70 converse( skol1 ), meet( X, skol1 ) ) ==> composition( converse( skol1 )
% 67.27/67.70 , X ) }.
% 67.27/67.70 parent0: (147844) {G25,W11,D4,L1,V1,M1} { composition( converse( skol1 ),
% 67.27/67.70 meet( X, skol1 ) ) ==> composition( converse( skol1 ), X ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147846) {G23,W12,D7,L1,V2,M1} { zero ==> meet( converse( X ),
% 67.27/67.70 composition( Y, complement( converse( composition( X, Y ) ) ) ) ) }.
% 67.27/67.70 parent0[0]: (1583) {G23,W12,D7,L1,V2,M1} P(110,1033);d(756) { meet(
% 67.27/67.70 converse( Y ), composition( X, complement( converse( composition( Y, X )
% 67.27/67.70 ) ) ) ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := Y
% 67.27/67.70 Y := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147850) {G24,W16,D8,L1,V1,M1} { zero ==> meet( converse(
% 67.27/67.70 converse( skol1 ) ), composition( meet( X, skol1 ), complement( converse
% 67.27/67.70 ( composition( converse( skol1 ), X ) ) ) ) ) }.
% 67.27/67.70 parent0[0]: (53285) {G33,W11,D4,L1,V1,M1} P(53236,8755) { composition(
% 67.27/67.70 converse( skol1 ), meet( X, skol1 ) ) ==> composition( converse( skol1 )
% 67.27/67.70 , X ) }.
% 67.27/67.70 parent1[0; 12]: (147846) {G23,W12,D7,L1,V2,M1} { zero ==> meet( converse(
% 67.27/67.70 X ), composition( Y, complement( converse( composition( X, Y ) ) ) ) )
% 67.27/67.70 }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := converse( skol1 )
% 67.27/67.70 Y := meet( X, skol1 )
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147851) {G1,W14,D8,L1,V1,M1} { zero ==> meet( skol1, composition
% 67.27/67.70 ( meet( X, skol1 ), complement( converse( composition( converse( skol1 )
% 67.27/67.70 , X ) ) ) ) ) }.
% 67.27/67.70 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.27/67.70 parent1[0; 3]: (147850) {G24,W16,D8,L1,V1,M1} { zero ==> meet( converse(
% 67.27/67.70 converse( skol1 ) ), composition( meet( X, skol1 ), complement( converse
% 67.27/67.70 ( composition( converse( skol1 ), X ) ) ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := skol1
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147852) {G2,W12,D7,L1,V1,M1} { zero ==> composition( meet( X,
% 67.27/67.70 skol1 ), complement( converse( composition( converse( skol1 ), X ) ) ) )
% 67.27/67.70 }.
% 67.27/67.70 parent0[0]: (15381) {G34,W13,D5,L1,V2,M1} P(15308,3853);d(13) { meet( skol1
% 67.27/67.70 , composition( meet( X, skol1 ), Y ) ) ==> composition( meet( X, skol1 )
% 67.27/67.70 , Y ) }.
% 67.27/67.70 parent1[0; 2]: (147851) {G1,W14,D8,L1,V1,M1} { zero ==> meet( skol1,
% 67.27/67.70 composition( meet( X, skol1 ), complement( converse( composition(
% 67.27/67.70 converse( skol1 ), X ) ) ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := complement( converse( composition( converse( skol1 ), X ) ) )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147853) {G2,W11,D6,L1,V1,M1} { zero ==> composition( meet( X,
% 67.27/67.70 skol1 ), complement( composition( converse( X ), skol1 ) ) ) }.
% 67.27/67.70 parent0[0]: (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition(
% 67.27/67.70 converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 67.27/67.70 parent1[0; 7]: (147852) {G2,W12,D7,L1,V1,M1} { zero ==> composition( meet
% 67.27/67.70 ( X, skol1 ), complement( converse( composition( converse( skol1 ), X ) )
% 67.27/67.70 ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := skol1
% 67.27/67.70 Y := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147854) {G2,W11,D6,L1,V1,M1} { composition( meet( X, skol1 ),
% 67.27/67.70 complement( composition( converse( X ), skol1 ) ) ) ==> zero }.
% 67.27/67.70 parent0[0]: (147853) {G2,W11,D6,L1,V1,M1} { zero ==> composition( meet( X
% 67.27/67.70 , skol1 ), complement( composition( converse( X ), skol1 ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (53310) {G35,W11,D6,L1,V1,M1} P(53285,1583);d(7);d(15381);d(17
% 67.27/67.70 ) { composition( meet( X, skol1 ), complement( composition( converse( X )
% 67.27/67.70 , skol1 ) ) ) ==> zero }.
% 67.27/67.70 parent0: (147854) {G2,W11,D6,L1,V1,M1} { composition( meet( X, skol1 ),
% 67.27/67.70 complement( composition( converse( X ), skol1 ) ) ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147856) {G29,W11,D6,L1,V2,M1} { zero ==> meet( composition(
% 67.27/67.70 complement( composition( X, Y ) ), converse( Y ) ), X ) }.
% 67.27/67.70 parent0[0]: (3386) {G29,W11,D6,L1,V2,M1} P(110,1104);d(2891);d(2866);d(756)
% 67.27/67.70 ;d(7) { meet( composition( complement( composition( Y, X ) ), converse( X
% 67.27/67.70 ) ), Y ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := Y
% 67.27/67.70 Y := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147863) {G30,W15,D8,L1,V1,M1} { zero ==> meet( composition(
% 67.27/67.70 complement( zero ), converse( complement( composition( converse( X ),
% 67.27/67.70 skol1 ) ) ) ), meet( X, skol1 ) ) }.
% 67.27/67.70 parent0[0]: (53310) {G35,W11,D6,L1,V1,M1} P(53285,1583);d(7);d(15381);d(17)
% 67.27/67.70 { composition( meet( X, skol1 ), complement( composition( converse( X )
% 67.27/67.70 , skol1 ) ) ) ==> zero }.
% 67.27/67.70 parent1[0; 5]: (147856) {G29,W11,D6,L1,V2,M1} { zero ==> meet( composition
% 67.27/67.70 ( complement( composition( X, Y ) ), converse( Y ) ), X ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := meet( X, skol1 )
% 67.27/67.70 Y := complement( composition( converse( X ), skol1 ) )
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147864) {G13,W14,D8,L1,V1,M1} { zero ==> meet( composition( top
% 67.27/67.70 , converse( complement( composition( converse( X ), skol1 ) ) ) ), meet(
% 67.27/67.70 X, skol1 ) ) }.
% 67.27/67.70 parent0[0]: (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) { complement
% 67.27/67.70 ( zero ) ==> top }.
% 67.27/67.70 parent1[0; 4]: (147863) {G30,W15,D8,L1,V1,M1} { zero ==> meet( composition
% 67.27/67.70 ( complement( zero ), converse( complement( composition( converse( X ),
% 67.27/67.70 skol1 ) ) ) ), meet( X, skol1 ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147865) {G12,W14,D8,L1,V1,M1} { zero ==> meet( converse(
% 67.27/67.70 composition( complement( composition( converse( X ), skol1 ) ), top ) ),
% 67.27/67.70 meet( X, skol1 ) ) }.
% 67.27/67.70 parent0[0]: (225) {G11,W9,D4,L1,V1,M1} P(223,16) { composition( top,
% 67.27/67.70 converse( X ) ) ==> converse( composition( X, top ) ) }.
% 67.27/67.70 parent1[0; 3]: (147864) {G13,W14,D8,L1,V1,M1} { zero ==> meet( composition
% 67.27/67.70 ( top, converse( complement( composition( converse( X ), skol1 ) ) ) ),
% 67.27/67.70 meet( X, skol1 ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := complement( composition( converse( X ), skol1 ) )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147866) {G13,W12,D7,L1,V1,M1} { zero ==> meet( converse(
% 67.27/67.70 complement( composition( converse( X ), skol1 ) ) ), meet( X, skol1 ) )
% 67.27/67.70 }.
% 67.27/67.70 parent0[0]: (12548) {G16,W11,D5,L1,V1,M1} P(1414,110);d(776);d(744);d(7);d(
% 67.27/67.70 3681) { composition( complement( composition( X, skol1 ) ), top ) ==>
% 67.27/67.70 complement( composition( X, skol1 ) ) }.
% 67.27/67.70 parent1[0; 4]: (147865) {G12,W14,D8,L1,V1,M1} { zero ==> meet( converse(
% 67.27/67.70 composition( complement( composition( converse( X ), skol1 ) ), top ) ),
% 67.27/67.70 meet( X, skol1 ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := converse( X )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147867) {G14,W12,D7,L1,V1,M1} { zero ==> meet( complement(
% 67.27/67.70 converse( composition( converse( X ), skol1 ) ) ), meet( X, skol1 ) ) }.
% 67.27/67.70 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.70 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.70 parent1[0; 3]: (147866) {G13,W12,D7,L1,V1,M1} { zero ==> meet( converse(
% 67.27/67.70 complement( composition( converse( X ), skol1 ) ) ), meet( X, skol1 ) )
% 67.27/67.70 }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := composition( converse( X ), skol1 )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147868) {G2,W11,D6,L1,V1,M1} { zero ==> meet( complement(
% 67.27/67.70 composition( converse( skol1 ), X ) ), meet( X, skol1 ) ) }.
% 67.27/67.70 parent0[0]: (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition(
% 67.27/67.70 converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 67.27/67.70 parent1[0; 4]: (147867) {G14,W12,D7,L1,V1,M1} { zero ==> meet( complement
% 67.27/67.70 ( converse( composition( converse( X ), skol1 ) ) ), meet( X, skol1 ) )
% 67.27/67.70 }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := skol1
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147869) {G2,W11,D6,L1,V1,M1} { meet( complement( composition(
% 67.27/67.70 converse( skol1 ), X ) ), meet( X, skol1 ) ) ==> zero }.
% 67.27/67.70 parent0[0]: (147868) {G2,W11,D6,L1,V1,M1} { zero ==> meet( complement(
% 67.27/67.70 composition( converse( skol1 ), X ) ), meet( X, skol1 ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (53537) {G36,W11,D6,L1,V1,M1} P(53310,3386);d(744);d(225);d(
% 67.27/67.70 12548);d(2866);d(17) { meet( complement( composition( converse( skol1 ),
% 67.27/67.70 X ) ), meet( X, skol1 ) ) ==> zero }.
% 67.27/67.70 parent0: (147869) {G2,W11,D6,L1,V1,M1} { meet( complement( composition(
% 67.27/67.70 converse( skol1 ), X ) ), meet( X, skol1 ) ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147871) {G35,W11,D6,L1,V1,M1} { zero ==> composition( meet( X,
% 67.27/67.70 skol1 ), complement( composition( converse( X ), skol1 ) ) ) }.
% 67.27/67.70 parent0[0]: (53310) {G35,W11,D6,L1,V1,M1} P(53285,1583);d(7);d(15381);d(17)
% 67.27/67.70 { composition( meet( X, skol1 ), complement( composition( converse( X )
% 67.27/67.70 , skol1 ) ) ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147872) {G1,W11,D5,L1,V1,M1} { zero ==> composition( meet(
% 67.27/67.70 converse( X ), skol1 ), complement( composition( X, skol1 ) ) ) }.
% 67.27/67.70 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.27/67.70 parent1[0; 9]: (147871) {G35,W11,D6,L1,V1,M1} { zero ==> composition( meet
% 67.27/67.70 ( X, skol1 ), complement( composition( converse( X ), skol1 ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := converse( X )
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147873) {G1,W11,D5,L1,V1,M1} { composition( meet( converse( X ),
% 67.27/67.70 skol1 ), complement( composition( X, skol1 ) ) ) ==> zero }.
% 67.27/67.70 parent0[0]: (147872) {G1,W11,D5,L1,V1,M1} { zero ==> composition( meet(
% 67.27/67.70 converse( X ), skol1 ), complement( composition( X, skol1 ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (53545) {G36,W11,D5,L1,V1,M1} P(7,53310) { composition( meet(
% 67.27/67.70 converse( X ), skol1 ), complement( composition( X, skol1 ) ) ) ==> zero
% 67.27/67.70 }.
% 67.27/67.70 parent0: (147873) {G1,W11,D5,L1,V1,M1} { composition( meet( converse( X )
% 67.27/67.70 , skol1 ), complement( composition( X, skol1 ) ) ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147875) {G22,W12,D7,L1,V2,M1} { zero ==> meet( composition( X,
% 67.27/67.70 complement( converse( composition( Y, X ) ) ) ), converse( Y ) ) }.
% 67.27/67.70 parent0[0]: (1582) {G22,W12,D7,L1,V2,M1} P(110,1034);d(756) { meet(
% 67.27/67.70 composition( X, complement( converse( composition( Y, X ) ) ) ), converse
% 67.27/67.70 ( Y ) ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147880) {G23,W16,D6,L1,V1,M1} { zero ==> meet( composition(
% 67.27/67.70 complement( composition( X, skol1 ) ), complement( converse( zero ) ) ),
% 67.27/67.70 converse( meet( converse( X ), skol1 ) ) ) }.
% 67.27/67.70 parent0[0]: (53545) {G36,W11,D5,L1,V1,M1} P(7,53310) { composition( meet(
% 67.27/67.70 converse( X ), skol1 ), complement( composition( X, skol1 ) ) ) ==> zero
% 67.27/67.70 }.
% 67.27/67.70 parent1[0; 10]: (147875) {G22,W12,D7,L1,V2,M1} { zero ==> meet(
% 67.27/67.70 composition( X, complement( converse( composition( Y, X ) ) ) ), converse
% 67.27/67.70 ( Y ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := complement( composition( X, skol1 ) )
% 67.27/67.70 Y := meet( converse( X ), skol1 )
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147881) {G16,W15,D6,L1,V1,M1} { zero ==> meet( composition(
% 67.27/67.70 complement( composition( X, skol1 ) ), complement( zero ) ), converse(
% 67.27/67.70 meet( converse( X ), skol1 ) ) ) }.
% 67.27/67.70 parent0[0]: (776) {G15,W4,D3,L1,V0,M1} P(758,740) { converse( zero ) ==>
% 67.27/67.70 zero }.
% 67.27/67.70 parent1[0; 9]: (147880) {G23,W16,D6,L1,V1,M1} { zero ==> meet( composition
% 67.27/67.70 ( complement( composition( X, skol1 ) ), complement( converse( zero ) ) )
% 67.27/67.70 , converse( meet( converse( X ), skol1 ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147882) {G13,W14,D6,L1,V1,M1} { zero ==> meet( composition(
% 67.27/67.70 complement( composition( X, skol1 ) ), top ), converse( meet( converse( X
% 67.27/67.70 ), skol1 ) ) ) }.
% 67.27/67.70 parent0[0]: (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) { complement
% 67.27/67.70 ( zero ) ==> top }.
% 67.27/67.70 parent1[0; 8]: (147881) {G16,W15,D6,L1,V1,M1} { zero ==> meet( composition
% 67.27/67.70 ( complement( composition( X, skol1 ) ), complement( zero ) ), converse(
% 67.27/67.70 meet( converse( X ), skol1 ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147883) {G14,W12,D6,L1,V1,M1} { zero ==> meet( complement(
% 67.27/67.70 composition( X, skol1 ) ), converse( meet( converse( X ), skol1 ) ) ) }.
% 67.27/67.70 parent0[0]: (12548) {G16,W11,D5,L1,V1,M1} P(1414,110);d(776);d(744);d(7);d(
% 67.27/67.70 3681) { composition( complement( composition( X, skol1 ) ), top ) ==>
% 67.27/67.70 complement( composition( X, skol1 ) ) }.
% 67.27/67.70 parent1[0; 3]: (147882) {G13,W14,D6,L1,V1,M1} { zero ==> meet( composition
% 67.27/67.70 ( complement( composition( X, skol1 ) ), top ), converse( meet( converse
% 67.27/67.70 ( X ), skol1 ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147884) {G15,W11,D5,L1,V1,M1} { zero ==> meet( complement(
% 67.27/67.70 composition( X, skol1 ) ), meet( X, converse( skol1 ) ) ) }.
% 67.27/67.70 parent0[0]: (53040) {G31,W10,D5,L1,V2,M1} P(7,53018) { converse( meet(
% 67.27/67.70 converse( X ), Y ) ) ==> meet( X, converse( Y ) ) }.
% 67.27/67.70 parent1[0; 7]: (147883) {G14,W12,D6,L1,V1,M1} { zero ==> meet( complement
% 67.27/67.70 ( composition( X, skol1 ) ), converse( meet( converse( X ), skol1 ) ) )
% 67.27/67.70 }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := skol1
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147885) {G15,W11,D5,L1,V1,M1} { meet( complement( composition( X
% 67.27/67.70 , skol1 ) ), meet( X, converse( skol1 ) ) ) ==> zero }.
% 67.27/67.70 parent0[0]: (147884) {G15,W11,D5,L1,V1,M1} { zero ==> meet( complement(
% 67.27/67.70 composition( X, skol1 ) ), meet( X, converse( skol1 ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (53555) {G37,W11,D5,L1,V1,M1} P(53545,1582);d(776);d(744);d(
% 67.27/67.70 12548);d(53040) { meet( complement( composition( X, skol1 ) ), meet( X,
% 67.27/67.70 converse( skol1 ) ) ) ==> zero }.
% 67.27/67.70 parent0: (147885) {G15,W11,D5,L1,V1,M1} { meet( complement( composition( X
% 67.27/67.70 , skol1 ) ), meet( X, converse( skol1 ) ) ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147887) {G18,W12,D5,L1,V2,M1} { top ==> join( composition( top,
% 67.27/67.70 meet( X, Y ) ), complement( meet( Y, X ) ) ) }.
% 67.27/67.70 parent0[0]: (3706) {G18,W12,D5,L1,V2,M1} P(972,3671) { join( composition(
% 67.27/67.70 top, meet( X, Y ) ), complement( meet( Y, X ) ) ) ==> top }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147891) {G19,W16,D8,L1,V1,M1} { top ==> join( composition( top,
% 67.27/67.70 zero ), complement( meet( meet( X, skol1 ), complement( composition(
% 67.27/67.70 converse( skol1 ), X ) ) ) ) ) }.
% 67.27/67.70 parent0[0]: (53537) {G36,W11,D6,L1,V1,M1} P(53310,3386);d(744);d(225);d(
% 67.27/67.70 12548);d(2866);d(17) { meet( complement( composition( converse( skol1 ),
% 67.27/67.70 X ) ), meet( X, skol1 ) ) ==> zero }.
% 67.27/67.70 parent1[0; 5]: (147887) {G18,W12,D5,L1,V2,M1} { top ==> join( composition
% 67.27/67.70 ( top, meet( X, Y ) ), complement( meet( Y, X ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := complement( composition( converse( skol1 ), X ) )
% 67.27/67.70 Y := meet( X, skol1 )
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147893) {G20,W14,D8,L1,V1,M1} { top ==> join( zero, complement(
% 67.27/67.70 meet( meet( X, skol1 ), complement( composition( converse( skol1 ), X ) )
% 67.27/67.70 ) ) ) }.
% 67.27/67.70 parent0[0]: (796) {G19,W5,D3,L1,V1,M1} P(795,6);d(749);d(214);d(795) {
% 67.27/67.70 composition( X, zero ) ==> zero }.
% 67.27/67.70 parent1[0; 3]: (147891) {G19,W16,D8,L1,V1,M1} { top ==> join( composition
% 67.27/67.70 ( top, zero ), complement( meet( meet( X, skol1 ), complement(
% 67.27/67.70 composition( converse( skol1 ), X ) ) ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := top
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147894) {G14,W12,D7,L1,V1,M1} { top ==> complement( meet( meet(
% 67.27/67.70 X, skol1 ), complement( composition( converse( skol1 ), X ) ) ) ) }.
% 67.27/67.70 parent0[0]: (749) {G13,W5,D3,L1,V1,M1} P(715,0);d(748) { join( zero, X )
% 67.27/67.70 ==> X }.
% 67.27/67.70 parent1[0; 2]: (147893) {G20,W14,D8,L1,V1,M1} { top ==> join( zero,
% 67.27/67.70 complement( meet( meet( X, skol1 ), complement( composition( converse(
% 67.27/67.70 skol1 ), X ) ) ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := complement( meet( meet( X, skol1 ), complement( composition(
% 67.27/67.70 converse( skol1 ), X ) ) ) )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147895) {G15,W11,D5,L1,V1,M1} { top ==> join( complement( meet(
% 67.27/67.70 X, skol1 ) ), composition( converse( skol1 ), X ) ) }.
% 67.27/67.70 parent0[0]: (951) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet( Y,
% 67.27/67.70 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 67.27/67.70 parent1[0; 2]: (147894) {G14,W12,D7,L1,V1,M1} { top ==> complement( meet(
% 67.27/67.70 meet( X, skol1 ), complement( composition( converse( skol1 ), X ) ) ) )
% 67.27/67.70 }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := composition( converse( skol1 ), X )
% 67.27/67.70 Y := meet( X, skol1 )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147896) {G15,W11,D5,L1,V1,M1} { join( complement( meet( X, skol1
% 67.27/67.70 ) ), composition( converse( skol1 ), X ) ) ==> top }.
% 67.27/67.70 parent0[0]: (147895) {G15,W11,D5,L1,V1,M1} { top ==> join( complement(
% 67.27/67.70 meet( X, skol1 ) ), composition( converse( skol1 ), X ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (54145) {G37,W11,D5,L1,V1,M1} P(53537,3706);d(796);d(749);d(
% 67.27/67.70 951) { join( complement( meet( X, skol1 ) ), composition( converse( skol1
% 67.27/67.70 ), X ) ) ==> top }.
% 67.27/67.70 parent0: (147896) {G15,W11,D5,L1,V1,M1} { join( complement( meet( X, skol1
% 67.27/67.70 ) ), composition( converse( skol1 ), X ) ) ==> top }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147898) {G1,W17,D7,L1,V3,M1} { join( X, complement( Z ) ) ==>
% 67.27/67.70 join( join( X, composition( converse( Y ), complement( composition( Y, Z
% 67.27/67.70 ) ) ) ), complement( Z ) ) }.
% 67.27/67.70 parent0[0]: (108) {G1,W17,D7,L1,V3,M1} P(10,1) { join( join( Z, composition
% 67.27/67.70 ( converse( X ), complement( composition( X, Y ) ) ) ), complement( Y ) )
% 67.27/67.70 ==> join( Z, complement( Y ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := Y
% 67.27/67.70 Y := Z
% 67.27/67.70 Z := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147902) {G2,W15,D7,L1,V1,M1} { join( complement( meet(
% 67.27/67.70 complement( composition( skol1, X ) ), skol1 ) ), complement( X ) ) ==>
% 67.27/67.70 join( top, complement( X ) ) }.
% 67.27/67.70 parent0[0]: (54145) {G37,W11,D5,L1,V1,M1} P(53537,3706);d(796);d(749);d(951
% 67.27/67.70 ) { join( complement( meet( X, skol1 ) ), composition( converse( skol1 )
% 67.27/67.70 , X ) ) ==> top }.
% 67.27/67.70 parent1[0; 12]: (147898) {G1,W17,D7,L1,V3,M1} { join( X, complement( Z ) )
% 67.27/67.70 ==> join( join( X, composition( converse( Y ), complement( composition(
% 67.27/67.70 Y, Z ) ) ) ), complement( Z ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := complement( composition( skol1, X ) )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := complement( meet( complement( composition( skol1, X ) ), skol1 ) )
% 67.27/67.70 Y := skol1
% 67.27/67.70 Z := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147903) {G3,W12,D7,L1,V1,M1} { join( complement( meet(
% 67.27/67.70 complement( composition( skol1, X ) ), skol1 ) ), complement( X ) ) ==>
% 67.27/67.70 top }.
% 67.27/67.70 parent0[0]: (214) {G9,W5,D3,L1,V1,M1} P(199,36);d(209) { join( top, X ) ==>
% 67.27/67.70 top }.
% 67.27/67.70 parent1[0; 11]: (147902) {G2,W15,D7,L1,V1,M1} { join( complement( meet(
% 67.27/67.70 complement( composition( skol1, X ) ), skol1 ) ), complement( X ) ) ==>
% 67.27/67.70 join( top, complement( X ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := complement( X )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147904) {G4,W11,D7,L1,V1,M1} { complement( meet( meet(
% 67.27/67.70 complement( composition( skol1, X ) ), skol1 ), X ) ) ==> top }.
% 67.27/67.70 parent0[0]: (773) {G16,W10,D4,L1,V2,M1} P(3,756) { join( complement( X ),
% 67.27/67.70 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.27/67.70 parent1[0; 1]: (147903) {G3,W12,D7,L1,V1,M1} { join( complement( meet(
% 67.27/67.70 complement( composition( skol1, X ) ), skol1 ) ), complement( X ) ) ==>
% 67.27/67.70 top }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := meet( complement( composition( skol1, X ) ), skol1 )
% 67.27/67.70 Y := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147905) {G5,W10,D5,L1,V1,M1} { join( complement( meet( skol1, X
% 67.27/67.70 ) ), composition( skol1, X ) ) ==> top }.
% 67.27/67.70 parent0[0]: (1470) {G18,W14,D6,L1,V3,M1} P(950,773);d(966) { complement(
% 67.27/67.70 meet( meet( complement( X ), Y ), Z ) ) ==> join( complement( meet( Y, Z
% 67.27/67.70 ) ), X ) }.
% 67.27/67.70 parent1[0; 1]: (147904) {G4,W11,D7,L1,V1,M1} { complement( meet( meet(
% 67.27/67.70 complement( composition( skol1, X ) ), skol1 ), X ) ) ==> top }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := composition( skol1, X )
% 67.27/67.70 Y := skol1
% 67.27/67.70 Z := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (54202) {G38,W10,D5,L1,V1,M1} P(54145,108);d(214);d(773);d(
% 67.27/67.70 1470) { join( complement( meet( skol1, X ) ), composition( skol1, X ) )
% 67.27/67.70 ==> top }.
% 67.27/67.70 parent0: (147905) {G5,W10,D5,L1,V1,M1} { join( complement( meet( skol1, X
% 67.27/67.70 ) ), composition( skol1, X ) ) ==> top }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147908) {G18,W11,D5,L1,V2,M1} { zero ==> meet( meet( X,
% 67.27/67.70 complement( Y ) ), join( complement( X ), Y ) ) }.
% 67.27/67.70 parent0[0]: (1564) {G18,W11,D5,L1,V2,M1} P(951,12) { meet( meet( X,
% 67.27/67.70 complement( Y ) ), join( complement( X ), Y ) ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147910) {G19,W12,D6,L1,V1,M1} { zero ==> meet( meet( meet( skol1
% 67.27/67.70 , X ), complement( composition( skol1, X ) ) ), top ) }.
% 67.27/67.70 parent0[0]: (54202) {G38,W10,D5,L1,V1,M1} P(54145,108);d(214);d(773);d(1470
% 67.27/67.70 ) { join( complement( meet( skol1, X ) ), composition( skol1, X ) ) ==>
% 67.27/67.70 top }.
% 67.27/67.70 parent1[0; 11]: (147908) {G18,W11,D5,L1,V2,M1} { zero ==> meet( meet( X,
% 67.27/67.70 complement( Y ) ), join( complement( X ), Y ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := meet( skol1, X )
% 67.27/67.70 Y := composition( skol1, X )
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147911) {G15,W10,D5,L1,V1,M1} { zero ==> meet( meet( skol1, X )
% 67.27/67.70 , complement( composition( skol1, X ) ) ) }.
% 67.27/67.70 parent0[0]: (752) {G14,W5,D3,L1,V1,M1} P(751,48);d(749);d(79) { meet( X,
% 67.27/67.70 top ) ==> X }.
% 67.27/67.70 parent1[0; 2]: (147910) {G19,W12,D6,L1,V1,M1} { zero ==> meet( meet( meet
% 67.27/67.70 ( skol1, X ), complement( composition( skol1, X ) ) ), top ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := meet( meet( skol1, X ), complement( composition( skol1, X ) ) )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147912) {G15,W10,D5,L1,V1,M1} { meet( meet( skol1, X ),
% 67.27/67.70 complement( composition( skol1, X ) ) ) ==> zero }.
% 67.27/67.70 parent0[0]: (147911) {G15,W10,D5,L1,V1,M1} { zero ==> meet( meet( skol1, X
% 67.27/67.70 ), complement( composition( skol1, X ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (54272) {G39,W10,D5,L1,V1,M1} P(54202,1564);d(752) { meet(
% 67.27/67.70 meet( skol1, X ), complement( composition( skol1, X ) ) ) ==> zero }.
% 67.27/67.70 parent0: (147912) {G15,W10,D5,L1,V1,M1} { meet( meet( skol1, X ),
% 67.27/67.70 complement( composition( skol1, X ) ) ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147914) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement( Y
% 67.27/67.70 ) ), meet( X, Y ) ) }.
% 67.27/67.70 parent0[0]: (722) {G2,W10,D5,L1,V2,M1} P(3,48) { join( meet( X, complement
% 67.27/67.70 ( Y ) ), meet( X, Y ) ) ==> X }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147918) {G3,W15,D7,L1,V1,M1} { meet( skol1, X ) ==> join( meet(
% 67.27/67.70 meet( skol1, X ), complement( complement( composition( skol1, X ) ) ) ),
% 67.27/67.70 zero ) }.
% 67.27/67.70 parent0[0]: (54272) {G39,W10,D5,L1,V1,M1} P(54202,1564);d(752) { meet( meet
% 67.27/67.70 ( skol1, X ), complement( composition( skol1, X ) ) ) ==> zero }.
% 67.27/67.70 parent1[0; 14]: (147914) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X,
% 67.27/67.70 complement( Y ) ), meet( X, Y ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := meet( skol1, X )
% 67.27/67.70 Y := complement( composition( skol1, X ) )
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147919) {G4,W13,D6,L1,V1,M1} { meet( skol1, X ) ==> meet( meet(
% 67.27/67.70 skol1, X ), complement( complement( composition( skol1, X ) ) ) ) }.
% 67.27/67.70 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.27/67.70 }.
% 67.27/67.70 parent1[0; 4]: (147918) {G3,W15,D7,L1,V1,M1} { meet( skol1, X ) ==> join(
% 67.27/67.70 meet( meet( skol1, X ), complement( complement( composition( skol1, X ) )
% 67.27/67.70 ) ), zero ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := meet( meet( skol1, X ), complement( complement( composition( skol1
% 67.27/67.70 , X ) ) ) )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147920) {G5,W11,D4,L1,V1,M1} { meet( skol1, X ) ==> meet( meet(
% 67.27/67.70 skol1, X ), composition( skol1, X ) ) }.
% 67.27/67.70 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.70 complement( X ) ) ==> X }.
% 67.27/67.70 parent1[0; 8]: (147919) {G4,W13,D6,L1,V1,M1} { meet( skol1, X ) ==> meet(
% 67.27/67.70 meet( skol1, X ), complement( complement( composition( skol1, X ) ) ) )
% 67.27/67.70 }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := composition( skol1, X )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147921) {G5,W11,D4,L1,V1,M1} { meet( meet( skol1, X ),
% 67.27/67.70 composition( skol1, X ) ) ==> meet( skol1, X ) }.
% 67.27/67.70 parent0[0]: (147920) {G5,W11,D4,L1,V1,M1} { meet( skol1, X ) ==> meet(
% 67.27/67.70 meet( skol1, X ), composition( skol1, X ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (54528) {G40,W11,D4,L1,V1,M1} P(54272,722);d(740);d(756) {
% 67.27/67.70 meet( meet( skol1, X ), composition( skol1, X ) ) ==> meet( skol1, X )
% 67.27/67.70 }.
% 67.27/67.70 parent0: (147921) {G5,W11,D4,L1,V1,M1} { meet( meet( skol1, X ),
% 67.27/67.70 composition( skol1, X ) ) ==> meet( skol1, X ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147923) {G26,W11,D7,L1,V2,M1} { zero ==> meet( meet( X,
% 67.27/67.70 composition( Y, complement( converse( Y ) ) ) ), one ) }.
% 67.27/67.70 parent0[0]: (7472) {G26,W11,D7,L1,V2,M1} P(1948,1708) { meet( meet( Y,
% 67.27/67.70 composition( X, complement( converse( X ) ) ) ), one ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := Y
% 67.27/67.70 Y := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147924) {G27,W9,D6,L1,V0,M1} { zero ==> meet( meet( skol1,
% 67.27/67.70 complement( converse( skol1 ) ) ), one ) }.
% 67.27/67.70 parent0[0]: (54528) {G40,W11,D4,L1,V1,M1} P(54272,722);d(740);d(756) { meet
% 67.27/67.70 ( meet( skol1, X ), composition( skol1, X ) ) ==> meet( skol1, X ) }.
% 67.27/67.70 parent1[0; 3]: (147923) {G26,W11,D7,L1,V2,M1} { zero ==> meet( meet( X,
% 67.27/67.70 composition( Y, complement( converse( Y ) ) ) ), one ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := complement( converse( skol1 ) )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := meet( skol1, complement( converse( skol1 ) ) )
% 67.27/67.70 Y := skol1
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147925) {G27,W9,D6,L1,V0,M1} { meet( meet( skol1, complement(
% 67.27/67.70 converse( skol1 ) ) ), one ) ==> zero }.
% 67.27/67.70 parent0[0]: (147924) {G27,W9,D6,L1,V0,M1} { zero ==> meet( meet( skol1,
% 67.27/67.70 complement( converse( skol1 ) ) ), one ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (54628) {G41,W9,D6,L1,V0,M1} P(54528,7472) { meet( meet( skol1
% 67.27/67.70 , complement( converse( skol1 ) ) ), one ) ==> zero }.
% 67.27/67.70 parent0: (147925) {G27,W9,D6,L1,V0,M1} { meet( meet( skol1, complement(
% 67.27/67.70 converse( skol1 ) ) ), one ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147927) {G20,W14,D6,L1,V3,M1} { Z ==> join( meet( meet( X, Y ), Z
% 67.27/67.70 ), meet( complement( meet( Y, X ) ), Z ) ) }.
% 67.27/67.70 parent0[0]: (1430) {G20,W14,D6,L1,V3,M1} P(972,1387) { join( meet( meet( X
% 67.27/67.70 , Y ), Z ), meet( complement( meet( Y, X ) ), Z ) ) ==> Z }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 Z := Z
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147930) {G21,W12,D8,L1,V0,M1} { one ==> join( zero, meet(
% 67.27/67.70 complement( meet( complement( converse( skol1 ) ), skol1 ) ), one ) ) }.
% 67.27/67.70 parent0[0]: (54628) {G41,W9,D6,L1,V0,M1} P(54528,7472) { meet( meet( skol1
% 67.27/67.70 , complement( converse( skol1 ) ) ), one ) ==> zero }.
% 67.27/67.70 parent1[0; 3]: (147927) {G20,W14,D6,L1,V3,M1} { Z ==> join( meet( meet( X
% 67.27/67.70 , Y ), Z ), meet( complement( meet( Y, X ) ), Z ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := skol1
% 67.27/67.70 Y := complement( converse( skol1 ) )
% 67.27/67.70 Z := one
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147933) {G14,W10,D7,L1,V0,M1} { one ==> meet( complement( meet(
% 67.27/67.70 complement( converse( skol1 ) ), skol1 ) ), one ) }.
% 67.27/67.70 parent0[0]: (749) {G13,W5,D3,L1,V1,M1} P(715,0);d(748) { join( zero, X )
% 67.27/67.70 ==> X }.
% 67.27/67.70 parent1[0; 2]: (147930) {G21,W12,D8,L1,V0,M1} { one ==> join( zero, meet(
% 67.27/67.70 complement( meet( complement( converse( skol1 ) ), skol1 ) ), one ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := meet( complement( meet( complement( converse( skol1 ) ), skol1 ) )
% 67.27/67.70 , one )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147934) {G15,W9,D5,L1,V0,M1} { one ==> meet( join( converse(
% 67.27/67.70 skol1 ), complement( skol1 ) ), one ) }.
% 67.27/67.70 parent0[0]: (950) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet(
% 67.27/67.70 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.70 parent1[0; 3]: (147933) {G14,W10,D7,L1,V0,M1} { one ==> meet( complement(
% 67.27/67.70 meet( complement( converse( skol1 ) ), skol1 ) ), one ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := converse( skol1 )
% 67.27/67.70 Y := skol1
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147935) {G15,W9,D5,L1,V0,M1} { meet( join( converse( skol1 ),
% 67.27/67.70 complement( skol1 ) ), one ) ==> one }.
% 67.27/67.70 parent0[0]: (147934) {G15,W9,D5,L1,V0,M1} { one ==> meet( join( converse(
% 67.27/67.70 skol1 ), complement( skol1 ) ), one ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (54785) {G42,W9,D5,L1,V0,M1} P(54628,1430);d(749);d(950) {
% 67.27/67.70 meet( join( converse( skol1 ), complement( skol1 ) ), one ) ==> one }.
% 67.27/67.70 parent0: (147935) {G15,W9,D5,L1,V0,M1} { meet( join( converse( skol1 ),
% 67.27/67.70 complement( skol1 ) ), one ) ==> one }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147941) {G28,W11,D6,L1,V0,M1} { converse( meet( one, join(
% 67.27/67.70 converse( skol1 ), complement( skol1 ) ) ) ) = converse( one ) }.
% 67.27/67.70 parent0[0]: (54785) {G42,W9,D5,L1,V0,M1} P(54628,1430);d(749);d(950) { meet
% 67.27/67.70 ( join( converse( skol1 ), complement( skol1 ) ), one ) ==> one }.
% 67.27/67.70 parent1[0; 10]: (2855) {G27,W9,D4,L1,V2,M1} P(972,2796);d(2796) { converse
% 67.27/67.70 ( meet( Y, X ) ) = converse( meet( X, Y ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := join( converse( skol1 ), complement( skol1 ) )
% 67.27/67.70 Y := one
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147942) {G4,W10,D6,L1,V0,M1} { converse( meet( one, join(
% 67.27/67.70 converse( skol1 ), complement( skol1 ) ) ) ) = one }.
% 67.27/67.70 parent0[0]: (186) {G3,W4,D3,L1,V0,M1} P(180,5) { converse( one ) ==> one
% 67.27/67.70 }.
% 67.27/67.70 parent1[0; 9]: (147941) {G28,W11,D6,L1,V0,M1} { converse( meet( one, join
% 67.27/67.70 ( converse( skol1 ), complement( skol1 ) ) ) ) = converse( one ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147943) {G5,W9,D6,L1,V0,M1} { meet( one, join( skol1, converse(
% 67.27/67.70 complement( skol1 ) ) ) ) = one }.
% 67.27/67.70 parent0[0]: (12419) {G32,W14,D6,L1,V2,M1} P(19,12372) { converse( meet( one
% 67.27/67.70 , join( converse( X ), Y ) ) ) ==> meet( one, join( X, converse( Y ) ) )
% 67.27/67.70 }.
% 67.27/67.70 parent1[0; 1]: (147942) {G4,W10,D6,L1,V0,M1} { converse( meet( one, join(
% 67.27/67.70 converse( skol1 ), complement( skol1 ) ) ) ) = one }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := skol1
% 67.27/67.70 Y := complement( skol1 )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147944) {G6,W9,D6,L1,V0,M1} { meet( one, join( skol1, complement
% 67.27/67.70 ( converse( skol1 ) ) ) ) = one }.
% 67.27/67.70 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.70 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.70 parent1[0; 5]: (147943) {G5,W9,D6,L1,V0,M1} { meet( one, join( skol1,
% 67.27/67.70 converse( complement( skol1 ) ) ) ) = one }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := skol1
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (54921) {G43,W9,D6,L1,V0,M1} P(54785,2855);d(186);d(12419);d(
% 67.27/67.70 2866) { meet( one, join( skol1, complement( converse( skol1 ) ) ) ) ==>
% 67.27/67.70 one }.
% 67.27/67.70 parent0: (147944) {G6,W9,D6,L1,V0,M1} { meet( one, join( skol1, complement
% 67.27/67.70 ( converse( skol1 ) ) ) ) = one }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147947) {G21,W14,D6,L1,V4,M1} { zero ==> meet( meet( meet( X,
% 67.27/67.70 join( Y, Z ) ), T ), complement( join( Z, Y ) ) ) }.
% 67.27/67.70 parent0[0]: (2009) {G21,W14,D6,L1,V4,M1} P(1625,1667) { meet( meet( meet( Z
% 67.27/67.70 , join( X, Y ) ), T ), complement( join( Y, X ) ) ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := Y
% 67.27/67.70 Y := Z
% 67.27/67.70 Z := X
% 67.27/67.70 T := T
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147950) {G22,W12,D7,L1,V1,M1} { zero ==> meet( meet( one, X ),
% 67.27/67.70 complement( join( complement( converse( skol1 ) ), skol1 ) ) ) }.
% 67.27/67.70 parent0[0]: (54921) {G43,W9,D6,L1,V0,M1} P(54785,2855);d(186);d(12419);d(
% 67.27/67.70 2866) { meet( one, join( skol1, complement( converse( skol1 ) ) ) ) ==>
% 67.27/67.70 one }.
% 67.27/67.70 parent1[0; 4]: (147947) {G21,W14,D6,L1,V4,M1} { zero ==> meet( meet( meet
% 67.27/67.70 ( X, join( Y, Z ) ), T ), complement( join( Z, Y ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := one
% 67.27/67.70 Y := skol1
% 67.27/67.70 Z := complement( converse( skol1 ) )
% 67.27/67.70 T := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147951) {G17,W11,D5,L1,V1,M1} { zero ==> meet( meet( one, X ),
% 67.27/67.70 meet( converse( skol1 ), complement( skol1 ) ) ) }.
% 67.27/67.70 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.27/67.70 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.27/67.70 parent1[0; 6]: (147950) {G22,W12,D7,L1,V1,M1} { zero ==> meet( meet( one,
% 67.27/67.70 X ), complement( join( complement( converse( skol1 ) ), skol1 ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := skol1
% 67.27/67.70 Y := converse( skol1 )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147952) {G18,W11,D5,L1,V1,M1} { zero ==> meet( meet( converse(
% 67.27/67.70 skol1 ), meet( one, X ) ), complement( skol1 ) ) }.
% 67.27/67.70 parent0[0]: (24022) {G19,W13,D5,L1,V3,M1} P(964,1625);d(772);d(772);d(772)
% 67.27/67.70 { meet( Z, meet( X, complement( Y ) ) ) ==> meet( meet( X, Z ),
% 67.27/67.70 complement( Y ) ) }.
% 67.27/67.70 parent1[0; 2]: (147951) {G17,W11,D5,L1,V1,M1} { zero ==> meet( meet( one,
% 67.27/67.70 X ), meet( converse( skol1 ), complement( skol1 ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := converse( skol1 )
% 67.27/67.70 Y := skol1
% 67.27/67.70 Z := meet( one, X )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147953) {G18,W11,D5,L1,V1,M1} { meet( meet( converse( skol1 ),
% 67.27/67.70 meet( one, X ) ), complement( skol1 ) ) ==> zero }.
% 67.27/67.70 parent0[0]: (147952) {G18,W11,D5,L1,V1,M1} { zero ==> meet( meet( converse
% 67.27/67.70 ( skol1 ), meet( one, X ) ), complement( skol1 ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (54922) {G44,W11,D5,L1,V1,M1} P(54921,2009);d(772);d(24022) {
% 67.27/67.70 meet( meet( converse( skol1 ), meet( one, X ) ), complement( skol1 ) )
% 67.27/67.70 ==> zero }.
% 67.27/67.70 parent0: (147953) {G18,W11,D5,L1,V1,M1} { meet( meet( converse( skol1 ),
% 67.27/67.70 meet( one, X ) ), complement( skol1 ) ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147955) {G23,W11,D4,L1,V2,M1} { join( Y, complement( X ) ) ==>
% 67.27/67.70 join( complement( X ), meet( Y, X ) ) }.
% 67.27/67.70 parent0[0]: (2429) {G23,W11,D4,L1,V2,M1} P(2408,898);d(1);d(870) { join(
% 67.27/67.70 complement( Y ), meet( X, Y ) ) ==> join( X, complement( Y ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := Y
% 67.27/67.70 Y := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147958) {G24,W16,D5,L1,V1,M1} { join( meet( converse( skol1 ),
% 67.27/67.70 meet( one, X ) ), complement( complement( skol1 ) ) ) ==> join(
% 67.27/67.70 complement( complement( skol1 ) ), zero ) }.
% 67.27/67.70 parent0[0]: (54922) {G44,W11,D5,L1,V1,M1} P(54921,2009);d(772);d(24022) {
% 67.27/67.70 meet( meet( converse( skol1 ), meet( one, X ) ), complement( skol1 ) )
% 67.27/67.70 ==> zero }.
% 67.27/67.70 parent1[0; 15]: (147955) {G23,W11,D4,L1,V2,M1} { join( Y, complement( X )
% 67.27/67.70 ) ==> join( complement( X ), meet( Y, X ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := complement( skol1 )
% 67.27/67.70 Y := meet( converse( skol1 ), meet( one, X ) )
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147959) {G12,W14,D5,L1,V1,M1} { join( meet( converse( skol1 ),
% 67.27/67.70 meet( one, X ) ), complement( complement( skol1 ) ) ) ==> complement(
% 67.27/67.70 complement( skol1 ) ) }.
% 67.27/67.70 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.27/67.70 }.
% 67.27/67.70 parent1[0; 11]: (147958) {G24,W16,D5,L1,V1,M1} { join( meet( converse(
% 67.27/67.70 skol1 ), meet( one, X ) ), complement( complement( skol1 ) ) ) ==> join(
% 67.27/67.70 complement( complement( skol1 ) ), zero ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := complement( complement( skol1 ) )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147961) {G13,W12,D5,L1,V1,M1} { join( meet( converse( skol1 ),
% 67.27/67.70 meet( one, X ) ), complement( complement( skol1 ) ) ) ==> skol1 }.
% 67.27/67.70 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.70 complement( X ) ) ==> X }.
% 67.27/67.70 parent1[0; 11]: (147959) {G12,W14,D5,L1,V1,M1} { join( meet( converse(
% 67.27/67.70 skol1 ), meet( one, X ) ), complement( complement( skol1 ) ) ) ==>
% 67.27/67.70 complement( complement( skol1 ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := skol1
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147962) {G14,W10,D5,L1,V1,M1} { join( meet( converse( skol1 ),
% 67.27/67.70 meet( one, X ) ), skol1 ) ==> skol1 }.
% 67.27/67.70 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.27/67.70 complement( X ) ) ==> X }.
% 67.27/67.70 parent1[0; 8]: (147961) {G13,W12,D5,L1,V1,M1} { join( meet( converse(
% 67.27/67.70 skol1 ), meet( one, X ) ), complement( complement( skol1 ) ) ) ==> skol1
% 67.27/67.70 }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := skol1
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (57189) {G45,W10,D5,L1,V1,M1} P(54922,2429);d(740);d(756) {
% 67.27/67.70 join( meet( converse( skol1 ), meet( one, X ) ), skol1 ) ==> skol1 }.
% 67.27/67.70 parent0: (147962) {G14,W10,D5,L1,V1,M1} { join( meet( converse( skol1 ),
% 67.27/67.70 meet( one, X ) ), skol1 ) ==> skol1 }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147966) {G19,W11,D4,L1,V3,M1} { meet( Z, meet( Y, X ) ) = meet(
% 67.27/67.70 meet( X, Y ), Z ) }.
% 67.27/67.70 parent0[0]: (7708) {G19,W11,D4,L1,V3,M1} P(996,75) { meet( meet( Y, X ), Z
% 67.27/67.70 ) = meet( Z, meet( X, Y ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := Y
% 67.27/67.70 Y := X
% 67.27/67.70 Z := Z
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147967) {G45,W10,D5,L1,V1,M1} { skol1 ==> join( meet( converse(
% 67.27/67.70 skol1 ), meet( one, X ) ), skol1 ) }.
% 67.27/67.70 parent0[0]: (57189) {G45,W10,D5,L1,V1,M1} P(54922,2429);d(740);d(756) {
% 67.27/67.70 join( meet( converse( skol1 ), meet( one, X ) ), skol1 ) ==> skol1 }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147968) {G20,W10,D5,L1,V1,M1} { skol1 ==> join( meet( meet( X,
% 67.27/67.70 one ), converse( skol1 ) ), skol1 ) }.
% 67.27/67.70 parent0[0]: (147966) {G19,W11,D4,L1,V3,M1} { meet( Z, meet( Y, X ) ) =
% 67.27/67.70 meet( meet( X, Y ), Z ) }.
% 67.27/67.70 parent1[0; 3]: (147967) {G45,W10,D5,L1,V1,M1} { skol1 ==> join( meet(
% 67.27/67.70 converse( skol1 ), meet( one, X ) ), skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := one
% 67.27/67.70 Z := converse( skol1 )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147971) {G20,W10,D5,L1,V1,M1} { join( meet( meet( X, one ),
% 67.27/67.70 converse( skol1 ) ), skol1 ) ==> skol1 }.
% 67.27/67.70 parent0[0]: (147968) {G20,W10,D5,L1,V1,M1} { skol1 ==> join( meet( meet( X
% 67.27/67.70 , one ), converse( skol1 ) ), skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (57311) {G46,W10,D5,L1,V1,M1} P(7708,57189) { join( meet( meet
% 67.27/67.70 ( X, one ), converse( skol1 ) ), skol1 ) ==> skol1 }.
% 67.27/67.70 parent0: (147971) {G20,W10,D5,L1,V1,M1} { join( meet( meet( X, one ),
% 67.27/67.70 converse( skol1 ) ), skol1 ) ==> skol1 }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147975) {G46,W10,D5,L1,V1,M1} { skol1 ==> join( meet( meet( X,
% 67.27/67.70 one ), converse( skol1 ) ), skol1 ) }.
% 67.27/67.70 parent0[0]: (57311) {G46,W10,D5,L1,V1,M1} P(7708,57189) { join( meet( meet
% 67.27/67.70 ( X, one ), converse( skol1 ) ), skol1 ) ==> skol1 }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147977) {G33,W11,D6,L1,V1,M1} { skol1 ==> join( meet( converse(
% 67.27/67.70 meet( one, X ) ), converse( skol1 ) ), skol1 ) }.
% 67.27/67.70 parent0[0]: (12418) {G32,W9,D4,L1,V1,M1} P(12372,75) { meet( converse( X )
% 67.27/67.70 , one ) ==> converse( meet( one, X ) ) }.
% 67.27/67.70 parent1[0; 4]: (147975) {G46,W10,D5,L1,V1,M1} { skol1 ==> join( meet( meet
% 67.27/67.70 ( X, one ), converse( skol1 ) ), skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := converse( X )
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147978) {G31,W10,D6,L1,V1,M1} { skol1 ==> join( converse( meet(
% 67.27/67.70 meet( one, X ), skol1 ) ), skol1 ) }.
% 67.27/67.70 parent0[0]: (53018) {G30,W10,D4,L1,V2,M1} P(52972,756);d(756) { meet(
% 67.27/67.70 converse( X ), converse( Y ) ) ==> converse( meet( X, Y ) ) }.
% 67.27/67.70 parent1[0; 3]: (147977) {G33,W11,D6,L1,V1,M1} { skol1 ==> join( meet(
% 67.27/67.70 converse( meet( one, X ) ), converse( skol1 ) ), skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := meet( one, X )
% 67.27/67.70 Y := skol1
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147979) {G31,W10,D6,L1,V1,M1} { join( converse( meet( meet( one,
% 67.27/67.70 X ), skol1 ) ), skol1 ) ==> skol1 }.
% 67.27/67.70 parent0[0]: (147978) {G31,W10,D6,L1,V1,M1} { skol1 ==> join( converse(
% 67.27/67.70 meet( meet( one, X ), skol1 ) ), skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (57565) {G47,W10,D6,L1,V1,M1} P(12418,57311);d(53018) { join(
% 67.27/67.70 converse( meet( meet( one, X ), skol1 ) ), skol1 ) ==> skol1 }.
% 67.27/67.70 parent0: (147979) {G31,W10,D6,L1,V1,M1} { join( converse( meet( meet( one
% 67.27/67.70 , X ), skol1 ) ), skol1 ) ==> skol1 }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147981) {G13,W14,D7,L1,V2,M1} { zero ==> composition( join( X,
% 67.27/67.70 converse( Y ) ), complement( composition( join( converse( X ), Y ), top )
% 67.27/67.70 ) ) }.
% 67.27/67.70 parent0[0]: (1496) {G13,W14,D7,L1,V2,M1} P(19,1486) { composition( join( X
% 67.27/67.70 , converse( Y ) ), complement( composition( join( converse( X ), Y ), top
% 67.27/67.70 ) ) ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147984) {G14,W15,D6,L1,V1,M1} { zero ==> composition( join( meet
% 67.27/67.70 ( meet( one, X ), skol1 ), converse( skol1 ) ), complement( composition(
% 67.27/67.70 skol1, top ) ) ) }.
% 67.27/67.70 parent0[0]: (57565) {G47,W10,D6,L1,V1,M1} P(12418,57311);d(53018) { join(
% 67.27/67.70 converse( meet( meet( one, X ), skol1 ) ), skol1 ) ==> skol1 }.
% 67.27/67.70 parent1[0; 13]: (147981) {G13,W14,D7,L1,V2,M1} { zero ==> composition(
% 67.27/67.70 join( X, converse( Y ) ), complement( composition( join( converse( X ), Y
% 67.27/67.70 ), top ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := meet( meet( one, X ), skol1 )
% 67.27/67.70 Y := skol1
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147985) {G1,W13,D6,L1,V1,M1} { zero ==> composition( join( meet
% 67.27/67.70 ( meet( one, X ), skol1 ), converse( skol1 ) ), complement( skol1 ) ) }.
% 67.27/67.70 parent0[0]: (13) {G0,W5,D3,L1,V0,M1} I { composition( skol1, top ) ==>
% 67.27/67.70 skol1 }.
% 67.27/67.70 parent1[0; 12]: (147984) {G14,W15,D6,L1,V1,M1} { zero ==> composition(
% 67.27/67.70 join( meet( meet( one, X ), skol1 ), converse( skol1 ) ), complement(
% 67.27/67.70 composition( skol1, top ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147986) {G2,W10,D5,L1,V1,M1} { zero ==> composition( meet( meet
% 67.27/67.70 ( one, X ), skol1 ), complement( skol1 ) ) }.
% 67.27/67.70 parent0[0]: (785) {G13,W12,D5,L1,V1,M1} P(755,6);d(740) { composition( join
% 67.27/67.70 ( X, converse( skol1 ) ), complement( skol1 ) ) ==> composition( X,
% 67.27/67.70 complement( skol1 ) ) }.
% 67.27/67.70 parent1[0; 2]: (147985) {G1,W13,D6,L1,V1,M1} { zero ==> composition( join
% 67.27/67.70 ( meet( meet( one, X ), skol1 ), converse( skol1 ) ), complement( skol1 )
% 67.27/67.70 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := meet( meet( one, X ), skol1 )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147987) {G2,W10,D5,L1,V1,M1} { composition( meet( meet( one, X )
% 67.27/67.70 , skol1 ), complement( skol1 ) ) ==> zero }.
% 67.27/67.70 parent0[0]: (147986) {G2,W10,D5,L1,V1,M1} { zero ==> composition( meet(
% 67.27/67.70 meet( one, X ), skol1 ), complement( skol1 ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (57760) {G48,W10,D5,L1,V1,M1} P(57565,1496);d(13);d(785) {
% 67.27/67.70 composition( meet( meet( one, X ), skol1 ), complement( skol1 ) ) ==>
% 67.27/67.70 zero }.
% 67.27/67.70 parent0: (147987) {G2,W10,D5,L1,V1,M1} { composition( meet( meet( one, X )
% 67.27/67.70 , skol1 ), complement( skol1 ) ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147989) {G48,W10,D5,L1,V1,M1} { zero ==> composition( meet( meet
% 67.27/67.70 ( one, X ), skol1 ), complement( skol1 ) ) }.
% 67.27/67.70 parent0[0]: (57760) {G48,W10,D5,L1,V1,M1} P(57565,1496);d(13);d(785) {
% 67.27/67.70 composition( meet( meet( one, X ), skol1 ), complement( skol1 ) ) ==>
% 67.27/67.70 zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147990) {G30,W10,D5,L1,V1,M1} { zero ==> composition( meet( meet
% 67.27/67.70 ( X, one ), skol1 ), complement( skol1 ) ) }.
% 67.27/67.70 parent0[0]: (10127) {G29,W10,D5,L1,V2,M1} P(10113,2544);d(3086) { meet( X,
% 67.27/67.70 join( complement( X ), Y ) ) ==> meet( Y, X ) }.
% 67.27/67.70 parent1[0; 4]: (147989) {G48,W10,D5,L1,V1,M1} { zero ==> composition( meet
% 67.27/67.70 ( meet( one, X ), skol1 ), complement( skol1 ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := one
% 67.27/67.70 Y := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := join( complement( one ), X )
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147991) {G30,W10,D5,L1,V1,M1} { composition( meet( meet( X, one )
% 67.27/67.70 , skol1 ), complement( skol1 ) ) ==> zero }.
% 67.27/67.70 parent0[0]: (147990) {G30,W10,D5,L1,V1,M1} { zero ==> composition( meet(
% 67.27/67.70 meet( X, one ), skol1 ), complement( skol1 ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (57835) {G49,W10,D5,L1,V1,M1} P(10127,57760) { composition(
% 67.27/67.70 meet( meet( X, one ), skol1 ), complement( skol1 ) ) ==> zero }.
% 67.27/67.70 parent0: (147991) {G30,W10,D5,L1,V1,M1} { composition( meet( meet( X, one
% 67.27/67.70 ), skol1 ), complement( skol1 ) ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (147993) {G29,W11,D6,L1,V2,M1} { zero ==> meet( composition(
% 67.27/67.70 complement( composition( X, Y ) ), converse( Y ) ), X ) }.
% 67.27/67.70 parent0[0]: (3386) {G29,W11,D6,L1,V2,M1} P(110,1104);d(2891);d(2866);d(756)
% 67.27/67.70 ;d(7) { meet( composition( complement( composition( Y, X ) ), converse( X
% 67.27/67.70 ) ), Y ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := Y
% 67.27/67.70 Y := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (147999) {G30,W14,D6,L1,V1,M1} { zero ==> meet( composition(
% 67.27/67.70 complement( zero ), converse( complement( skol1 ) ) ), meet( meet( X, one
% 67.27/67.70 ), skol1 ) ) }.
% 67.27/67.70 parent0[0]: (57835) {G49,W10,D5,L1,V1,M1} P(10127,57760) { composition(
% 67.27/67.70 meet( meet( X, one ), skol1 ), complement( skol1 ) ) ==> zero }.
% 67.27/67.70 parent1[0; 5]: (147993) {G29,W11,D6,L1,V2,M1} { zero ==> meet( composition
% 67.27/67.70 ( complement( composition( X, Y ) ), converse( Y ) ), X ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := meet( meet( X, one ), skol1 )
% 67.27/67.70 Y := complement( skol1 )
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148000) {G13,W13,D6,L1,V1,M1} { zero ==> meet( composition( top
% 67.27/67.70 , converse( complement( skol1 ) ) ), meet( meet( X, one ), skol1 ) ) }.
% 67.27/67.70 parent0[0]: (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) { complement
% 67.27/67.70 ( zero ) ==> top }.
% 67.27/67.70 parent1[0; 4]: (147999) {G30,W14,D6,L1,V1,M1} { zero ==> meet( composition
% 67.27/67.70 ( complement( zero ), converse( complement( skol1 ) ) ), meet( meet( X,
% 67.27/67.70 one ), skol1 ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148001) {G12,W13,D6,L1,V1,M1} { zero ==> meet( converse(
% 67.27/67.70 composition( complement( skol1 ), top ) ), meet( meet( X, one ), skol1 )
% 67.27/67.70 ) }.
% 67.27/67.70 parent0[0]: (225) {G11,W9,D4,L1,V1,M1} P(223,16) { composition( top,
% 67.27/67.70 converse( X ) ) ==> converse( composition( X, top ) ) }.
% 67.27/67.70 parent1[0; 3]: (148000) {G13,W13,D6,L1,V1,M1} { zero ==> meet( composition
% 67.27/67.70 ( top, converse( complement( skol1 ) ) ), meet( meet( X, one ), skol1 ) )
% 67.27/67.70 }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := complement( skol1 )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148002) {G13,W11,D5,L1,V1,M1} { zero ==> meet( converse(
% 67.27/67.70 complement( skol1 ) ), meet( meet( X, one ), skol1 ) ) }.
% 67.27/67.70 parent0[0]: (2206) {G21,W7,D4,L1,V0,M1} P(2163,756) { composition(
% 67.27/67.70 complement( skol1 ), top ) ==> complement( skol1 ) }.
% 67.27/67.70 parent1[0; 4]: (148001) {G12,W13,D6,L1,V1,M1} { zero ==> meet( converse(
% 67.27/67.70 composition( complement( skol1 ), top ) ), meet( meet( X, one ), skol1 )
% 67.27/67.70 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148003) {G14,W11,D5,L1,V1,M1} { zero ==> meet( complement(
% 67.27/67.70 converse( skol1 ) ), meet( meet( X, one ), skol1 ) ) }.
% 67.27/67.70 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.27/67.70 ( X ) ) ==> complement( converse( X ) ) }.
% 67.27/67.70 parent1[0; 3]: (148002) {G13,W11,D5,L1,V1,M1} { zero ==> meet( converse(
% 67.27/67.70 complement( skol1 ) ), meet( meet( X, one ), skol1 ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := skol1
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (148004) {G14,W11,D5,L1,V1,M1} { meet( complement( converse( skol1
% 67.27/67.70 ) ), meet( meet( X, one ), skol1 ) ) ==> zero }.
% 67.27/67.70 parent0[0]: (148003) {G14,W11,D5,L1,V1,M1} { zero ==> meet( complement(
% 67.27/67.70 converse( skol1 ) ), meet( meet( X, one ), skol1 ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (58070) {G50,W11,D5,L1,V1,M1} P(57835,3386);d(744);d(225);d(
% 67.27/67.70 2206);d(2866) { meet( complement( converse( skol1 ) ), meet( meet( X, one
% 67.27/67.70 ), skol1 ) ) ==> zero }.
% 67.27/67.70 parent0: (148004) {G14,W11,D5,L1,V1,M1} { meet( complement( converse(
% 67.27/67.70 skol1 ) ), meet( meet( X, one ), skol1 ) ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (148005) {G50,W11,D5,L1,V1,M1} { zero ==> meet( complement(
% 67.27/67.70 converse( skol1 ) ), meet( meet( X, one ), skol1 ) ) }.
% 67.27/67.70 parent0[0]: (58070) {G50,W11,D5,L1,V1,M1} P(57835,3386);d(744);d(225);d(
% 67.27/67.70 2206);d(2866) { meet( complement( converse( skol1 ) ), meet( meet( X, one
% 67.27/67.70 ), skol1 ) ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148008) {G27,W9,D6,L1,V0,M1} { zero ==> meet( meet( complement(
% 67.27/67.70 converse( skol1 ) ), one ), skol1 ) }.
% 67.27/67.70 parent0[0]: (1975) {G26,W13,D5,L1,V3,M1} P(1712,1387);d(749);d(756) { meet
% 67.27/67.70 ( X, meet( meet( X, Y ), Z ) ) ==> meet( meet( X, Y ), Z ) }.
% 67.27/67.70 parent1[0; 2]: (148005) {G50,W11,D5,L1,V1,M1} { zero ==> meet( complement
% 67.27/67.70 ( converse( skol1 ) ), meet( meet( X, one ), skol1 ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := complement( converse( skol1 ) )
% 67.27/67.70 Y := one
% 67.27/67.70 Z := skol1
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := complement( converse( skol1 ) )
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148009) {G28,W9,D6,L1,V0,M1} { zero ==> meet( converse( meet(
% 67.27/67.70 one, complement( skol1 ) ) ), skol1 ) }.
% 67.27/67.70 parent0[0]: (12420) {G33,W11,D5,L1,V1,M1} P(2866,12418) { meet( complement
% 67.27/67.70 ( converse( X ) ), one ) ==> converse( meet( one, complement( X ) ) ) }.
% 67.27/67.70 parent1[0; 3]: (148008) {G27,W9,D6,L1,V0,M1} { zero ==> meet( meet(
% 67.27/67.70 complement( converse( skol1 ) ), one ), skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := skol1
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (148010) {G28,W9,D6,L1,V0,M1} { meet( converse( meet( one,
% 67.27/67.70 complement( skol1 ) ) ), skol1 ) ==> zero }.
% 67.27/67.70 parent0[0]: (148009) {G28,W9,D6,L1,V0,M1} { zero ==> meet( converse( meet
% 67.27/67.70 ( one, complement( skol1 ) ) ), skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (60943) {G51,W9,D6,L1,V0,M1} P(58070,1975);d(12420) { meet(
% 67.27/67.70 converse( meet( one, complement( skol1 ) ) ), skol1 ) ==> zero }.
% 67.27/67.70 parent0: (148010) {G28,W9,D6,L1,V0,M1} { meet( converse( meet( one,
% 67.27/67.70 complement( skol1 ) ) ), skol1 ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (148012) {G31,W11,D5,L1,V1,M1} { composition( converse( X ), skol1
% 67.27/67.70 ) ==> composition( converse( meet( X, skol1 ) ), skol1 ) }.
% 67.27/67.70 parent0[0]: (53024) {G31,W11,D5,L1,V1,M1} P(53018,18134) { composition(
% 67.27/67.70 converse( meet( X, skol1 ) ), skol1 ) ==> composition( converse( X ),
% 67.27/67.70 skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148016) {G32,W13,D7,L1,V0,M1} { composition( converse( converse
% 67.27/67.70 ( meet( one, complement( skol1 ) ) ) ), skol1 ) ==> composition( converse
% 67.27/67.70 ( zero ), skol1 ) }.
% 67.27/67.70 parent0[0]: (60943) {G51,W9,D6,L1,V0,M1} P(58070,1975);d(12420) { meet(
% 67.27/67.70 converse( meet( one, complement( skol1 ) ) ), skol1 ) ==> zero }.
% 67.27/67.70 parent1[0; 11]: (148012) {G31,W11,D5,L1,V1,M1} { composition( converse( X
% 67.27/67.70 ), skol1 ) ==> composition( converse( meet( X, skol1 ) ), skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := converse( meet( one, complement( skol1 ) ) )
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148017) {G16,W12,D7,L1,V0,M1} { composition( converse( converse
% 67.27/67.70 ( meet( one, complement( skol1 ) ) ) ), skol1 ) ==> composition( zero,
% 67.27/67.70 skol1 ) }.
% 67.27/67.70 parent0[0]: (776) {G15,W4,D3,L1,V0,M1} P(758,740) { converse( zero ) ==>
% 67.27/67.70 zero }.
% 67.27/67.70 parent1[0; 10]: (148016) {G32,W13,D7,L1,V0,M1} { composition( converse(
% 67.27/67.70 converse( meet( one, complement( skol1 ) ) ) ), skol1 ) ==> composition(
% 67.27/67.70 converse( zero ), skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148018) {G17,W10,D7,L1,V0,M1} { composition( converse( converse
% 67.27/67.70 ( meet( one, complement( skol1 ) ) ) ), skol1 ) ==> zero }.
% 67.27/67.70 parent0[0]: (797) {G20,W5,D3,L1,V1,M1} P(796,17);d(776) { composition( zero
% 67.27/67.70 , X ) ==> zero }.
% 67.27/67.70 parent1[0; 9]: (148017) {G16,W12,D7,L1,V0,M1} { composition( converse(
% 67.27/67.70 converse( meet( one, complement( skol1 ) ) ) ), skol1 ) ==> composition(
% 67.27/67.70 zero, skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := skol1
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148019) {G1,W8,D5,L1,V0,M1} { composition( meet( one, complement
% 67.27/67.70 ( skol1 ) ), skol1 ) ==> zero }.
% 67.27/67.70 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.27/67.70 parent1[0; 2]: (148018) {G17,W10,D7,L1,V0,M1} { composition( converse(
% 67.27/67.70 converse( meet( one, complement( skol1 ) ) ) ), skol1 ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := meet( one, complement( skol1 ) )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (60952) {G52,W8,D5,L1,V0,M1} P(60943,53024);d(776);d(797);d(7)
% 67.27/67.70 { composition( meet( one, complement( skol1 ) ), skol1 ) ==> zero }.
% 67.27/67.70 parent0: (148019) {G1,W8,D5,L1,V0,M1} { composition( meet( one, complement
% 67.27/67.70 ( skol1 ) ), skol1 ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (148022) {G25,W11,D5,L1,V2,M1} { meet( complement( Y ), X ) ==>
% 67.27/67.70 meet( X, complement( meet( X, Y ) ) ) }.
% 67.27/67.70 parent0[0]: (3166) {G25,W11,D5,L1,V2,M1} P(2556,772);d(771);d(950);d(773)
% 67.27/67.70 { meet( X, complement( meet( X, Y ) ) ) ==> meet( complement( Y ), X )
% 67.27/67.70 }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148027) {G26,W17,D6,L1,V0,M1} { meet( complement( skol1 ),
% 67.27/67.70 converse( meet( one, complement( skol1 ) ) ) ) ==> meet( converse( meet(
% 67.27/67.70 one, complement( skol1 ) ) ), complement( zero ) ) }.
% 67.27/67.70 parent0[0]: (60943) {G51,W9,D6,L1,V0,M1} P(58070,1975);d(12420) { meet(
% 67.27/67.70 converse( meet( one, complement( skol1 ) ) ), skol1 ) ==> zero }.
% 67.27/67.70 parent1[0; 16]: (148022) {G25,W11,D5,L1,V2,M1} { meet( complement( Y ), X
% 67.27/67.70 ) ==> meet( X, complement( meet( X, Y ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := converse( meet( one, complement( skol1 ) ) )
% 67.27/67.70 Y := skol1
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148028) {G13,W16,D6,L1,V0,M1} { meet( complement( skol1 ),
% 67.27/67.70 converse( meet( one, complement( skol1 ) ) ) ) ==> meet( converse( meet(
% 67.27/67.70 one, complement( skol1 ) ) ), top ) }.
% 67.27/67.70 parent0[0]: (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) { complement
% 67.27/67.70 ( zero ) ==> top }.
% 67.27/67.70 parent1[0; 15]: (148027) {G26,W17,D6,L1,V0,M1} { meet( complement( skol1 )
% 67.27/67.70 , converse( meet( one, complement( skol1 ) ) ) ) ==> meet( converse( meet
% 67.27/67.70 ( one, complement( skol1 ) ) ), complement( zero ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148029) {G14,W14,D6,L1,V0,M1} { meet( complement( skol1 ),
% 67.27/67.70 converse( meet( one, complement( skol1 ) ) ) ) ==> converse( meet( one,
% 67.27/67.70 complement( skol1 ) ) ) }.
% 67.27/67.70 parent0[0]: (752) {G14,W5,D3,L1,V1,M1} P(751,48);d(749);d(79) { meet( X,
% 67.27/67.70 top ) ==> X }.
% 67.27/67.70 parent1[0; 9]: (148028) {G13,W16,D6,L1,V0,M1} { meet( complement( skol1 )
% 67.27/67.70 , converse( meet( one, complement( skol1 ) ) ) ) ==> meet( converse( meet
% 67.27/67.70 ( one, complement( skol1 ) ) ), top ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := converse( meet( one, complement( skol1 ) ) )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148030) {G15,W14,D6,L1,V0,M1} { meet( meet( complement( skol1 )
% 67.27/67.70 , complement( converse( skol1 ) ) ), one ) ==> converse( meet( one,
% 67.27/67.70 complement( skol1 ) ) ) }.
% 67.27/67.70 parent0[0]: (51593) {G30,W15,D6,L1,V2,M1} P(1940,772);d(1607);d(772);d(2845
% 67.27/67.70 ) { meet( X, converse( meet( one, complement( Y ) ) ) ) ==> meet( meet( X
% 67.27/67.70 , complement( converse( Y ) ) ), one ) }.
% 67.27/67.70 parent1[0; 1]: (148029) {G14,W14,D6,L1,V0,M1} { meet( complement( skol1 )
% 67.27/67.70 , converse( meet( one, complement( skol1 ) ) ) ) ==> converse( meet( one
% 67.27/67.70 , complement( skol1 ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := complement( skol1 )
% 67.27/67.70 Y := skol1
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148031) {G16,W13,D6,L1,V0,M1} { meet( complement( join( skol1,
% 67.27/67.70 converse( skol1 ) ) ), one ) ==> converse( meet( one, complement( skol1 )
% 67.27/67.70 ) ) }.
% 67.27/67.70 parent0[0]: (1598) {G17,W10,D4,L1,V2,M1} P(756,771) { meet( complement( Y )
% 67.27/67.70 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 67.27/67.70 parent1[0; 2]: (148030) {G15,W14,D6,L1,V0,M1} { meet( meet( complement(
% 67.27/67.70 skol1 ), complement( converse( skol1 ) ) ), one ) ==> converse( meet( one
% 67.27/67.70 , complement( skol1 ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := converse( skol1 )
% 67.27/67.70 Y := skol1
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (60959) {G52,W13,D6,L1,V0,M1} P(60943,3166);d(744);d(752);d(
% 67.27/67.70 51593);d(1598) { meet( complement( join( skol1, converse( skol1 ) ) ),
% 67.27/67.70 one ) ==> converse( meet( one, complement( skol1 ) ) ) }.
% 67.27/67.70 parent0: (148031) {G16,W13,D6,L1,V0,M1} { meet( complement( join( skol1,
% 67.27/67.70 converse( skol1 ) ) ), one ) ==> converse( meet( one, complement( skol1 )
% 67.27/67.70 ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (148033) {G51,W9,D6,L1,V0,M1} { zero ==> meet( converse( meet( one
% 67.27/67.70 , complement( skol1 ) ) ), skol1 ) }.
% 67.27/67.70 parent0[0]: (60943) {G51,W9,D6,L1,V0,M1} P(58070,1975);d(12420) { meet(
% 67.27/67.70 converse( meet( one, complement( skol1 ) ) ), skol1 ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148034) {G28,W9,D6,L1,V0,M1} { zero ==> meet( converse( meet(
% 67.27/67.70 complement( skol1 ), one ) ), skol1 ) }.
% 67.27/67.70 parent0[0]: (2855) {G27,W9,D4,L1,V2,M1} P(972,2796);d(2796) { converse(
% 67.27/67.70 meet( Y, X ) ) = converse( meet( X, Y ) ) }.
% 67.27/67.70 parent1[0; 3]: (148033) {G51,W9,D6,L1,V0,M1} { zero ==> meet( converse(
% 67.27/67.70 meet( one, complement( skol1 ) ) ), skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := complement( skol1 )
% 67.27/67.70 Y := one
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (148037) {G28,W9,D6,L1,V0,M1} { meet( converse( meet( complement(
% 67.27/67.70 skol1 ), one ) ), skol1 ) ==> zero }.
% 67.27/67.70 parent0[0]: (148034) {G28,W9,D6,L1,V0,M1} { zero ==> meet( converse( meet
% 67.27/67.70 ( complement( skol1 ), one ) ), skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (60961) {G52,W9,D6,L1,V0,M1} P(2855,60943) { meet( converse(
% 67.27/67.70 meet( complement( skol1 ), one ) ), skol1 ) ==> zero }.
% 67.27/67.70 parent0: (148037) {G28,W9,D6,L1,V0,M1} { meet( converse( meet( complement
% 67.27/67.70 ( skol1 ), one ) ), skol1 ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (148038) {G52,W8,D5,L1,V0,M1} { zero ==> composition( meet( one,
% 67.27/67.70 complement( skol1 ) ), skol1 ) }.
% 67.27/67.70 parent0[0]: (60952) {G52,W8,D5,L1,V0,M1} P(60943,53024);d(776);d(797);d(7)
% 67.27/67.70 { composition( meet( one, complement( skol1 ) ), skol1 ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148039) {G25,W8,D5,L1,V0,M1} { zero ==> composition( meet(
% 67.27/67.70 complement( skol1 ), one ), skol1 ) }.
% 67.27/67.70 parent0[0]: (8758) {G24,W11,D4,L1,V3,M1} P(2544,95);d(2544) { composition(
% 67.27/67.70 meet( X, Y ), Z ) = composition( meet( Y, X ), Z ) }.
% 67.27/67.70 parent1[0; 2]: (148038) {G52,W8,D5,L1,V0,M1} { zero ==> composition( meet
% 67.27/67.70 ( one, complement( skol1 ) ), skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := one
% 67.27/67.70 Y := complement( skol1 )
% 67.27/67.70 Z := skol1
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (148042) {G25,W8,D5,L1,V0,M1} { composition( meet( complement(
% 67.27/67.70 skol1 ), one ), skol1 ) ==> zero }.
% 67.27/67.70 parent0[0]: (148039) {G25,W8,D5,L1,V0,M1} { zero ==> composition( meet(
% 67.27/67.70 complement( skol1 ), one ), skol1 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (60989) {G53,W8,D5,L1,V0,M1} P(60952,8758) { composition( meet
% 67.27/67.70 ( complement( skol1 ), one ), skol1 ) ==> zero }.
% 67.27/67.70 parent0: (148042) {G25,W8,D5,L1,V0,M1} { composition( meet( complement(
% 67.27/67.70 skol1 ), one ), skol1 ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (148044) {G37,W11,D5,L1,V1,M1} { zero ==> meet( complement(
% 67.27/67.70 composition( X, skol1 ) ), meet( X, converse( skol1 ) ) ) }.
% 67.27/67.70 parent0[0]: (53555) {G37,W11,D5,L1,V1,M1} P(53545,1582);d(776);d(744);d(
% 67.27/67.70 12548);d(53040) { meet( complement( composition( X, skol1 ) ), meet( X,
% 67.27/67.70 converse( skol1 ) ) ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148047) {G38,W12,D6,L1,V0,M1} { zero ==> meet( complement( zero
% 67.27/67.70 ), meet( meet( complement( skol1 ), one ), converse( skol1 ) ) ) }.
% 67.27/67.70 parent0[0]: (60989) {G53,W8,D5,L1,V0,M1} P(60952,8758) { composition( meet
% 67.27/67.70 ( complement( skol1 ), one ), skol1 ) ==> zero }.
% 67.27/67.70 parent1[0; 4]: (148044) {G37,W11,D5,L1,V1,M1} { zero ==> meet( complement
% 67.27/67.70 ( composition( X, skol1 ) ), meet( X, converse( skol1 ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := meet( complement( skol1 ), one )
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148048) {G13,W11,D6,L1,V0,M1} { zero ==> meet( top, meet( meet(
% 67.27/67.70 complement( skol1 ), one ), converse( skol1 ) ) ) }.
% 67.27/67.70 parent0[0]: (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) { complement
% 67.27/67.70 ( zero ) ==> top }.
% 67.27/67.70 parent1[0; 3]: (148047) {G38,W12,D6,L1,V0,M1} { zero ==> meet( complement
% 67.27/67.70 ( zero ), meet( meet( complement( skol1 ), one ), converse( skol1 ) ) )
% 67.27/67.70 }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148049) {G13,W9,D5,L1,V0,M1} { zero ==> meet( meet( complement(
% 67.27/67.70 skol1 ), one ), converse( skol1 ) ) }.
% 67.27/67.70 parent0[0]: (747) {G12,W5,D3,L1,V1,M1} P(75,715);d(740) { meet( top, X )
% 67.27/67.70 ==> X }.
% 67.27/67.70 parent1[0; 2]: (148048) {G13,W11,D6,L1,V0,M1} { zero ==> meet( top, meet(
% 67.27/67.70 meet( complement( skol1 ), one ), converse( skol1 ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := meet( meet( complement( skol1 ), one ), converse( skol1 ) )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (148050) {G13,W9,D5,L1,V0,M1} { meet( meet( complement( skol1 ),
% 67.27/67.70 one ), converse( skol1 ) ) ==> zero }.
% 67.27/67.70 parent0[0]: (148049) {G13,W9,D5,L1,V0,M1} { zero ==> meet( meet(
% 67.27/67.70 complement( skol1 ), one ), converse( skol1 ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (61000) {G54,W9,D5,L1,V0,M1} P(60989,53555);d(744);d(747) {
% 67.27/67.70 meet( meet( complement( skol1 ), one ), converse( skol1 ) ) ==> zero }.
% 67.27/67.70 parent0: (148050) {G13,W9,D5,L1,V0,M1} { meet( meet( complement( skol1 ),
% 67.27/67.70 one ), converse( skol1 ) ) ==> zero }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (148052) {G18,W14,D5,L1,V3,M1} { join( Y, X ) ==> join( join( X,
% 67.27/67.70 meet( Y, Z ) ), meet( Y, complement( Z ) ) ) }.
% 67.27/67.70 parent0[0]: (1371) {G18,W14,D5,L1,V3,M1} P(1016,29) { join( join( Z, meet(
% 67.27/67.70 X, Y ) ), meet( X, complement( Y ) ) ) ==> join( X, Z ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := Y
% 67.27/67.70 Y := Z
% 67.27/67.70 Z := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148056) {G19,W19,D6,L1,V1,M1} { join( meet( complement( skol1 )
% 67.27/67.70 , one ), X ) ==> join( join( X, zero ), meet( meet( complement( skol1 ),
% 67.27/67.70 one ), complement( converse( skol1 ) ) ) ) }.
% 67.27/67.70 parent0[0]: (61000) {G54,W9,D5,L1,V0,M1} P(60989,53555);d(744);d(747) {
% 67.27/67.70 meet( meet( complement( skol1 ), one ), converse( skol1 ) ) ==> zero }.
% 67.27/67.70 parent1[0; 10]: (148052) {G18,W14,D5,L1,V3,M1} { join( Y, X ) ==> join(
% 67.27/67.70 join( X, meet( Y, Z ) ), meet( Y, complement( Z ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 Y := meet( complement( skol1 ), one )
% 67.27/67.70 Z := converse( skol1 )
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148057) {G12,W17,D6,L1,V1,M1} { join( meet( complement( skol1 )
% 67.27/67.70 , one ), X ) ==> join( X, meet( meet( complement( skol1 ), one ),
% 67.27/67.70 complement( converse( skol1 ) ) ) ) }.
% 67.27/67.70 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.27/67.70 }.
% 67.27/67.70 parent1[0; 8]: (148056) {G19,W19,D6,L1,V1,M1} { join( meet( complement(
% 67.27/67.70 skol1 ), one ), X ) ==> join( join( X, zero ), meet( meet( complement(
% 67.27/67.70 skol1 ), one ), complement( converse( skol1 ) ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148058) {G13,W16,D7,L1,V1,M1} { join( meet( complement( skol1 )
% 67.27/67.70 , one ), X ) ==> join( X, meet( complement( join( skol1, converse( skol1
% 67.27/67.70 ) ) ), one ) ) }.
% 67.27/67.70 parent0[0]: (1612) {G18,W14,D5,L1,V3,M1} P(771,1598);d(1607) { meet( meet(
% 67.27/67.70 complement( X ), Y ), complement( Z ) ) ==> meet( complement( join( X, Z
% 67.27/67.70 ) ), Y ) }.
% 67.27/67.70 parent1[0; 9]: (148057) {G12,W17,D6,L1,V1,M1} { join( meet( complement(
% 67.27/67.70 skol1 ), one ), X ) ==> join( X, meet( meet( complement( skol1 ), one ),
% 67.27/67.70 complement( converse( skol1 ) ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := skol1
% 67.27/67.70 Y := one
% 67.27/67.70 Z := converse( skol1 )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148059) {G14,W14,D6,L1,V1,M1} { join( meet( complement( skol1 )
% 67.27/67.70 , one ), X ) ==> join( X, converse( meet( one, complement( skol1 ) ) ) )
% 67.27/67.70 }.
% 67.27/67.70 parent0[0]: (60959) {G52,W13,D6,L1,V0,M1} P(60943,3166);d(744);d(752);d(
% 67.27/67.70 51593);d(1598) { meet( complement( join( skol1, converse( skol1 ) ) ),
% 67.27/67.70 one ) ==> converse( meet( one, complement( skol1 ) ) ) }.
% 67.27/67.70 parent1[0; 9]: (148058) {G13,W16,D7,L1,V1,M1} { join( meet( complement(
% 67.27/67.70 skol1 ), one ), X ) ==> join( X, meet( complement( join( skol1, converse
% 67.27/67.70 ( skol1 ) ) ), one ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (148060) {G14,W14,D6,L1,V1,M1} { join( X, converse( meet( one,
% 67.27/67.70 complement( skol1 ) ) ) ) ==> join( meet( complement( skol1 ), one ), X )
% 67.27/67.70 }.
% 67.27/67.70 parent0[0]: (148059) {G14,W14,D6,L1,V1,M1} { join( meet( complement( skol1
% 67.27/67.70 ), one ), X ) ==> join( X, converse( meet( one, complement( skol1 ) ) )
% 67.27/67.70 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (61024) {G55,W14,D6,L1,V1,M1} P(61000,1371);d(740);d(1612);d(
% 67.27/67.70 60959) { join( X, converse( meet( one, complement( skol1 ) ) ) ) ==> join
% 67.27/67.70 ( meet( complement( skol1 ), one ), X ) }.
% 67.27/67.70 parent0: (148060) {G14,W14,D6,L1,V1,M1} { join( X, converse( meet( one,
% 67.27/67.70 complement( skol1 ) ) ) ) ==> join( meet( complement( skol1 ), one ), X )
% 67.27/67.70 }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (148062) {G19,W14,D5,L1,V3,M1} { join( Y, X ) ==> join( join( X,
% 67.27/67.70 meet( Y, Z ) ), meet( complement( Z ), Y ) ) }.
% 67.27/67.70 parent0[0]: (1445) {G19,W14,D5,L1,V3,M1} P(1373,29) { join( join( Z, meet(
% 67.27/67.70 X, Y ) ), meet( complement( Y ), X ) ) ==> join( X, Z ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := Y
% 67.27/67.70 Y := Z
% 67.27/67.70 Z := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148068) {G20,W20,D7,L1,V1,M1} { join( converse( meet( complement
% 67.27/67.70 ( skol1 ), one ) ), X ) ==> join( join( X, zero ), meet( complement(
% 67.27/67.70 skol1 ), converse( meet( complement( skol1 ), one ) ) ) ) }.
% 67.27/67.70 parent0[0]: (60961) {G52,W9,D6,L1,V0,M1} P(2855,60943) { meet( converse(
% 67.27/67.70 meet( complement( skol1 ), one ) ), skol1 ) ==> zero }.
% 67.27/67.70 parent1[0; 11]: (148062) {G19,W14,D5,L1,V3,M1} { join( Y, X ) ==> join(
% 67.27/67.70 join( X, meet( Y, Z ) ), meet( complement( Z ), Y ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 Y := converse( meet( complement( skol1 ), one ) )
% 67.27/67.70 Z := skol1
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148069) {G12,W18,D7,L1,V1,M1} { join( converse( meet( complement
% 67.27/67.70 ( skol1 ), one ) ), X ) ==> join( X, meet( complement( skol1 ), converse
% 67.27/67.70 ( meet( complement( skol1 ), one ) ) ) ) }.
% 67.27/67.70 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.27/67.70 }.
% 67.27/67.70 parent1[0; 9]: (148068) {G20,W20,D7,L1,V1,M1} { join( converse( meet(
% 67.27/67.70 complement( skol1 ), one ) ), X ) ==> join( join( X, zero ), meet(
% 67.27/67.70 complement( skol1 ), converse( meet( complement( skol1 ), one ) ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148070) {G13,W18,D7,L1,V1,M1} { join( converse( meet( complement
% 67.27/67.70 ( skol1 ), one ) ), X ) ==> join( X, meet( meet( complement( skol1 ),
% 67.27/67.70 complement( converse( skol1 ) ) ), one ) ) }.
% 67.27/67.70 parent0[0]: (51733) {G30,W15,D6,L1,V2,M1} P(1941,10143);d(1615);d(1941);d(
% 67.27/67.70 771);d(40507);d(772);d(10143);d(2847) { meet( X, converse( meet(
% 67.27/67.70 complement( Y ), one ) ) ) ==> meet( meet( X, complement( converse( Y ) )
% 67.27/67.70 ), one ) }.
% 67.27/67.70 parent1[0; 10]: (148069) {G12,W18,D7,L1,V1,M1} { join( converse( meet(
% 67.27/67.70 complement( skol1 ), one ) ), X ) ==> join( X, meet( complement( skol1 )
% 67.27/67.70 , converse( meet( complement( skol1 ), one ) ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := complement( skol1 )
% 67.27/67.70 Y := skol1
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148071) {G14,W17,D7,L1,V1,M1} { join( converse( meet( complement
% 67.27/67.70 ( skol1 ), one ) ), X ) ==> join( X, meet( complement( join( skol1,
% 67.27/67.70 converse( skol1 ) ) ), one ) ) }.
% 67.27/67.70 parent0[0]: (1598) {G17,W10,D4,L1,V2,M1} P(756,771) { meet( complement( Y )
% 67.27/67.70 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 67.27/67.70 parent1[0; 11]: (148070) {G13,W18,D7,L1,V1,M1} { join( converse( meet(
% 67.27/67.70 complement( skol1 ), one ) ), X ) ==> join( X, meet( meet( complement(
% 67.27/67.70 skol1 ), complement( converse( skol1 ) ) ), one ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := converse( skol1 )
% 67.27/67.70 Y := skol1
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148072) {G15,W15,D6,L1,V1,M1} { join( converse( meet( complement
% 67.27/67.70 ( skol1 ), one ) ), X ) ==> join( X, converse( meet( one, complement(
% 67.27/67.70 skol1 ) ) ) ) }.
% 67.27/67.70 parent0[0]: (60959) {G52,W13,D6,L1,V0,M1} P(60943,3166);d(744);d(752);d(
% 67.27/67.70 51593);d(1598) { meet( complement( join( skol1, converse( skol1 ) ) ),
% 67.27/67.70 one ) ==> converse( meet( one, complement( skol1 ) ) ) }.
% 67.27/67.70 parent1[0; 10]: (148071) {G14,W17,D7,L1,V1,M1} { join( converse( meet(
% 67.27/67.70 complement( skol1 ), one ) ), X ) ==> join( X, meet( complement( join(
% 67.27/67.70 skol1, converse( skol1 ) ) ), one ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148073) {G16,W14,D6,L1,V1,M1} { join( converse( meet( complement
% 67.27/67.70 ( skol1 ), one ) ), X ) ==> join( meet( complement( skol1 ), one ), X )
% 67.27/67.70 }.
% 67.27/67.70 parent0[0]: (61024) {G55,W14,D6,L1,V1,M1} P(61000,1371);d(740);d(1612);d(
% 67.27/67.70 60959) { join( X, converse( meet( one, complement( skol1 ) ) ) ) ==> join
% 67.27/67.70 ( meet( complement( skol1 ), one ), X ) }.
% 67.27/67.70 parent1[0; 8]: (148072) {G15,W15,D6,L1,V1,M1} { join( converse( meet(
% 67.27/67.70 complement( skol1 ), one ) ), X ) ==> join( X, converse( meet( one,
% 67.27/67.70 complement( skol1 ) ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (61075) {G56,W14,D6,L1,V1,M1} P(60961,1445);d(740);d(51733);d(
% 67.27/67.70 1598);d(60959);d(61024) { join( converse( meet( complement( skol1 ), one
% 67.27/67.70 ) ), X ) ==> join( meet( complement( skol1 ), one ), X ) }.
% 67.27/67.70 parent0: (148073) {G16,W14,D6,L1,V1,M1} { join( converse( meet( complement
% 67.27/67.70 ( skol1 ), one ) ), X ) ==> join( meet( complement( skol1 ), one ), X )
% 67.27/67.70 }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (148076) {G33,W11,D7,L1,V2,M1} { X ==> join( X, complement(
% 67.27/67.70 composition( complement( meet( X, Y ) ), top ) ) ) }.
% 67.27/67.70 parent0[0]: (5567) {G33,W11,D7,L1,V2,M1} P(4962,2741);d(752) { join( X,
% 67.27/67.70 complement( composition( complement( meet( X, Y ) ), top ) ) ) ==> X }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 Y := Y
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148083) {G34,W17,D6,L1,V0,M1} { converse( meet( complement(
% 67.27/67.70 skol1 ), one ) ) ==> join( converse( meet( complement( skol1 ), one ) ),
% 67.27/67.70 complement( composition( complement( zero ), top ) ) ) }.
% 67.27/67.70 parent0[0]: (60961) {G52,W9,D6,L1,V0,M1} P(2855,60943) { meet( converse(
% 67.27/67.70 meet( complement( skol1 ), one ) ), skol1 ) ==> zero }.
% 67.27/67.70 parent1[0; 15]: (148076) {G33,W11,D7,L1,V2,M1} { X ==> join( X, complement
% 67.27/67.70 ( composition( complement( meet( X, Y ) ), top ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 X := converse( meet( complement( skol1 ), one ) )
% 67.27/67.70 Y := skol1
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148084) {G35,W16,D6,L1,V0,M1} { converse( meet( complement(
% 67.27/67.70 skol1 ), one ) ) ==> join( meet( complement( skol1 ), one ), complement(
% 67.27/67.70 composition( complement( zero ), top ) ) ) }.
% 67.27/67.70 parent0[0]: (61075) {G56,W14,D6,L1,V1,M1} P(60961,1445);d(740);d(51733);d(
% 67.27/67.70 1598);d(60959);d(61024) { join( converse( meet( complement( skol1 ), one
% 67.27/67.70 ) ), X ) ==> join( meet( complement( skol1 ), one ), X ) }.
% 67.27/67.70 parent1[0; 6]: (148083) {G34,W17,D6,L1,V0,M1} { converse( meet( complement
% 67.27/67.70 ( skol1 ), one ) ) ==> join( converse( meet( complement( skol1 ), one ) )
% 67.27/67.70 , complement( composition( complement( zero ), top ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := complement( composition( complement( zero ), top ) )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148085) {G19,W16,D6,L1,V0,M1} { converse( meet( complement(
% 67.27/67.70 skol1 ), one ) ) ==> complement( meet( join( skol1, complement( one ) ),
% 67.27/67.70 composition( complement( zero ), top ) ) ) }.
% 67.27/67.70 parent0[0]: (1452) {G18,W15,D6,L1,V3,M1} P(950,950) { join( meet(
% 67.27/67.70 complement( X ), Y ), complement( Z ) ) ==> complement( meet( join( X,
% 67.27/67.70 complement( Y ) ), Z ) ) }.
% 67.27/67.70 parent1[0; 6]: (148084) {G35,W16,D6,L1,V0,M1} { converse( meet( complement
% 67.27/67.70 ( skol1 ), one ) ) ==> join( meet( complement( skol1 ), one ), complement
% 67.27/67.70 ( composition( complement( zero ), top ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := skol1
% 67.27/67.70 Y := one
% 67.27/67.70 Z := composition( complement( zero ), top )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148086) {G13,W15,D6,L1,V0,M1} { converse( meet( complement(
% 67.27/67.70 skol1 ), one ) ) ==> complement( meet( join( skol1, complement( one ) ),
% 67.27/67.70 composition( top, top ) ) ) }.
% 67.27/67.70 parent0[0]: (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) { complement
% 67.27/67.70 ( zero ) ==> top }.
% 67.27/67.70 parent1[0; 13]: (148085) {G19,W16,D6,L1,V0,M1} { converse( meet(
% 67.27/67.70 complement( skol1 ), one ) ) ==> complement( meet( join( skol1,
% 67.27/67.70 complement( one ) ), composition( complement( zero ), top ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148087) {G14,W13,D6,L1,V0,M1} { converse( meet( complement(
% 67.27/67.70 skol1 ), one ) ) ==> complement( meet( join( skol1, complement( one ) ),
% 67.27/67.70 top ) ) }.
% 67.27/67.70 parent0[0]: (1507) {G16,W5,D3,L1,V0,M1} P(1499,756);d(744) { composition(
% 67.27/67.70 top, top ) ==> top }.
% 67.27/67.70 parent1[0; 12]: (148086) {G13,W15,D6,L1,V0,M1} { converse( meet(
% 67.27/67.70 complement( skol1 ), one ) ) ==> complement( meet( join( skol1,
% 67.27/67.70 complement( one ) ), composition( top, top ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148088) {G15,W11,D5,L1,V0,M1} { converse( meet( complement(
% 67.27/67.70 skol1 ), one ) ) ==> complement( join( skol1, complement( one ) ) ) }.
% 67.27/67.70 parent0[0]: (752) {G14,W5,D3,L1,V1,M1} P(751,48);d(749);d(79) { meet( X,
% 67.27/67.70 top ) ==> X }.
% 67.27/67.70 parent1[0; 7]: (148087) {G14,W13,D6,L1,V0,M1} { converse( meet( complement
% 67.27/67.70 ( skol1 ), one ) ) ==> complement( meet( join( skol1, complement( one ) )
% 67.27/67.70 , top ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := join( skol1, complement( one ) )
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148089) {G16,W10,D5,L1,V0,M1} { converse( meet( complement(
% 67.27/67.70 skol1 ), one ) ) ==> meet( complement( skol1 ), one ) }.
% 67.27/67.70 parent0[0]: (771) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join( X,
% 67.27/67.70 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 67.27/67.70 parent1[0; 6]: (148088) {G15,W11,D5,L1,V0,M1} { converse( meet( complement
% 67.27/67.70 ( skol1 ), one ) ) ==> complement( join( skol1, complement( one ) ) ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := skol1
% 67.27/67.70 Y := one
% 67.27/67.70 end
% 67.27/67.70 substitution1:
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 subsumption: (61077) {G57,W10,D5,L1,V0,M1} P(60961,5567);d(61075);d(1452);d
% 67.27/67.70 (744);d(1507);d(752);d(771) { converse( meet( complement( skol1 ), one )
% 67.27/67.70 ) ==> meet( complement( skol1 ), one ) }.
% 67.27/67.70 parent0: (148089) {G16,W10,D5,L1,V0,M1} { converse( meet( complement(
% 67.27/67.70 skol1 ), one ) ) ==> meet( complement( skol1 ), one ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 end
% 67.27/67.70 permutation0:
% 67.27/67.70 0 ==> 0
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 eqswap: (148092) {G32,W11,D5,L1,V1,M1} { converse( meet( one, complement(
% 67.27/67.70 X ) ) ) ==> meet( one, complement( converse( X ) ) ) }.
% 67.27/67.70 parent0[0]: (12392) {G32,W11,D5,L1,V1,M1} P(2866,12372) { meet( one,
% 67.27/67.70 complement( converse( X ) ) ) ==> converse( meet( one, complement( X ) )
% 67.27/67.70 ) }.
% 67.27/67.70 substitution0:
% 67.27/67.70 X := X
% 67.27/67.70 end
% 67.27/67.70
% 67.27/67.70 paramod: (148095) {G33,W16,D7,L1,V0,M1} { converse( meet( one, complement
% 67.27/67.70 ( meet( complement( skol1 ), one ) ) ) ) ==> meet( one, complement( meet
% 67.27/67.70 ( complement( skol1 ), one ) ) ) }.
% 67.27/67.70 parent0[0]: (61077) {G57,W10,D5,L1,V0,M1} P(60961,5567);d(61075);d(1452);d(
% 67.32/67.70 744);d(1507);d(752);d(771) { converse( meet( complement( skol1 ), one ) )
% 67.32/67.70 ==> meet( complement( skol1 ), one ) }.
% 67.32/67.70 parent1[0; 12]: (148092) {G32,W11,D5,L1,V1,M1} { converse( meet( one,
% 67.32/67.70 complement( X ) ) ) ==> meet( one, complement( converse( X ) ) ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 X := meet( complement( skol1 ), one )
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148097) {G22,W14,D7,L1,V0,M1} { converse( meet( one, complement
% 67.32/67.70 ( meet( complement( skol1 ), one ) ) ) ) ==> meet( complement( complement
% 67.32/67.70 ( skol1 ) ), one ) }.
% 67.32/67.70 parent0[0]: (2405) {G21,W11,D5,L1,V2,M1} P(2080,722);d(740);d(2097);d(881)
% 67.32/67.70 { meet( X, complement( meet( Y, X ) ) ) ==> meet( complement( Y ), X )
% 67.32/67.70 }.
% 67.32/67.70 parent1[0; 9]: (148095) {G33,W16,D7,L1,V0,M1} { converse( meet( one,
% 67.32/67.70 complement( meet( complement( skol1 ), one ) ) ) ) ==> meet( one,
% 67.32/67.70 complement( meet( complement( skol1 ), one ) ) ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := one
% 67.32/67.70 Y := complement( skol1 )
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148098) {G22,W12,D6,L1,V0,M1} { converse( meet( complement(
% 67.32/67.70 complement( skol1 ) ), one ) ) ==> meet( complement( complement( skol1 )
% 67.32/67.70 ), one ) }.
% 67.32/67.70 parent0[0]: (2405) {G21,W11,D5,L1,V2,M1} P(2080,722);d(740);d(2097);d(881)
% 67.32/67.70 { meet( X, complement( meet( Y, X ) ) ) ==> meet( complement( Y ), X )
% 67.32/67.70 }.
% 67.32/67.70 parent1[0; 2]: (148097) {G22,W14,D7,L1,V0,M1} { converse( meet( one,
% 67.32/67.70 complement( meet( complement( skol1 ), one ) ) ) ) ==> meet( complement(
% 67.32/67.70 complement( skol1 ) ), one ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := one
% 67.32/67.70 Y := complement( skol1 )
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148102) {G16,W10,D6,L1,V0,M1} { converse( meet( complement(
% 67.32/67.70 complement( skol1 ) ), one ) ) ==> meet( skol1, one ) }.
% 67.32/67.70 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.32/67.70 complement( X ) ) ==> X }.
% 67.32/67.70 parent1[0; 8]: (148098) {G22,W12,D6,L1,V0,M1} { converse( meet( complement
% 67.32/67.70 ( complement( skol1 ) ), one ) ) ==> meet( complement( complement( skol1
% 67.32/67.70 ) ), one ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := skol1
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148103) {G16,W8,D4,L1,V0,M1} { converse( meet( skol1, one ) )
% 67.32/67.70 ==> meet( skol1, one ) }.
% 67.32/67.70 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.32/67.70 complement( X ) ) ==> X }.
% 67.32/67.70 parent1[0; 3]: (148102) {G16,W10,D6,L1,V0,M1} { converse( meet( complement
% 67.32/67.70 ( complement( skol1 ) ), one ) ) ==> meet( skol1, one ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := skol1
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 subsumption: (61258) {G58,W8,D4,L1,V0,M1} P(61077,12392);d(2405);d(756) {
% 67.32/67.70 converse( meet( skol1, one ) ) ==> meet( skol1, one ) }.
% 67.32/67.70 parent0: (148103) {G16,W8,D4,L1,V0,M1} { converse( meet( skol1, one ) )
% 67.32/67.70 ==> meet( skol1, one ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 end
% 67.32/67.70 permutation0:
% 67.32/67.70 0 ==> 0
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 eqswap: (148108) {G31,W11,D5,L1,V1,M1} { composition( converse( X ), skol1
% 67.32/67.70 ) ==> composition( converse( meet( skol1, X ) ), skol1 ) }.
% 67.32/67.70 parent0[0]: (53023) {G31,W11,D5,L1,V1,M1} P(53018,18135) { composition(
% 67.32/67.70 converse( meet( skol1, X ) ), skol1 ) ==> composition( converse( X ),
% 67.32/67.70 skol1 ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := X
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148112) {G32,W10,D4,L1,V0,M1} { composition( converse( one ),
% 67.32/67.70 skol1 ) ==> composition( meet( skol1, one ), skol1 ) }.
% 67.32/67.70 parent0[0]: (61258) {G58,W8,D4,L1,V0,M1} P(61077,12392);d(2405);d(756) {
% 67.32/67.70 converse( meet( skol1, one ) ) ==> meet( skol1, one ) }.
% 67.32/67.70 parent1[0; 6]: (148108) {G31,W11,D5,L1,V1,M1} { composition( converse( X )
% 67.32/67.70 , skol1 ) ==> composition( converse( meet( skol1, X ) ), skol1 ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 X := one
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148113) {G4,W9,D4,L1,V0,M1} { composition( one, skol1 ) ==>
% 67.32/67.70 composition( meet( skol1, one ), skol1 ) }.
% 67.32/67.70 parent0[0]: (186) {G3,W4,D3,L1,V0,M1} P(180,5) { converse( one ) ==> one
% 67.32/67.70 }.
% 67.32/67.70 parent1[0; 2]: (148112) {G32,W10,D4,L1,V0,M1} { composition( converse( one
% 67.32/67.70 ), skol1 ) ==> composition( meet( skol1, one ), skol1 ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148114) {G5,W7,D4,L1,V0,M1} { skol1 ==> composition( meet( skol1
% 67.32/67.70 , one ), skol1 ) }.
% 67.32/67.70 parent0[0]: (187) {G4,W5,D3,L1,V1,M1} P(186,180) { composition( one, X )
% 67.32/67.70 ==> X }.
% 67.32/67.70 parent1[0; 1]: (148113) {G4,W9,D4,L1,V0,M1} { composition( one, skol1 )
% 67.32/67.70 ==> composition( meet( skol1, one ), skol1 ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := skol1
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 eqswap: (148115) {G5,W7,D4,L1,V0,M1} { composition( meet( skol1, one ),
% 67.32/67.70 skol1 ) ==> skol1 }.
% 67.32/67.70 parent0[0]: (148114) {G5,W7,D4,L1,V0,M1} { skol1 ==> composition( meet(
% 67.32/67.70 skol1, one ), skol1 ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 subsumption: (61279) {G59,W7,D4,L1,V0,M1} P(61258,53023);d(186);d(187) {
% 67.32/67.70 composition( meet( skol1, one ), skol1 ) ==> skol1 }.
% 67.32/67.70 parent0: (148115) {G5,W7,D4,L1,V0,M1} { composition( meet( skol1, one ),
% 67.32/67.70 skol1 ) ==> skol1 }.
% 67.32/67.70 substitution0:
% 67.32/67.70 end
% 67.32/67.70 permutation0:
% 67.32/67.70 0 ==> 0
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 eqswap: (148116) {G59,W7,D4,L1,V0,M1} { skol1 ==> composition( meet( skol1
% 67.32/67.70 , one ), skol1 ) }.
% 67.32/67.70 parent0[0]: (61279) {G59,W7,D4,L1,V0,M1} P(61258,53023);d(186);d(187) {
% 67.32/67.70 composition( meet( skol1, one ), skol1 ) ==> skol1 }.
% 67.32/67.70 substitution0:
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148117) {G25,W7,D4,L1,V0,M1} { skol1 ==> composition( meet( one
% 67.32/67.70 , skol1 ), skol1 ) }.
% 67.32/67.70 parent0[0]: (8758) {G24,W11,D4,L1,V3,M1} P(2544,95);d(2544) { composition(
% 67.32/67.70 meet( X, Y ), Z ) = composition( meet( Y, X ), Z ) }.
% 67.32/67.70 parent1[0; 2]: (148116) {G59,W7,D4,L1,V0,M1} { skol1 ==> composition( meet
% 67.32/67.70 ( skol1, one ), skol1 ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := skol1
% 67.32/67.70 Y := one
% 67.32/67.70 Z := skol1
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 eqswap: (148120) {G25,W7,D4,L1,V0,M1} { composition( meet( one, skol1 ),
% 67.32/67.70 skol1 ) ==> skol1 }.
% 67.32/67.70 parent0[0]: (148117) {G25,W7,D4,L1,V0,M1} { skol1 ==> composition( meet(
% 67.32/67.70 one, skol1 ), skol1 ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 subsumption: (61463) {G60,W7,D4,L1,V0,M1} P(61279,8758) { composition( meet
% 67.32/67.70 ( one, skol1 ), skol1 ) ==> skol1 }.
% 67.32/67.70 parent0: (148120) {G25,W7,D4,L1,V0,M1} { composition( meet( one, skol1 ),
% 67.32/67.70 skol1 ) ==> skol1 }.
% 67.32/67.70 substitution0:
% 67.32/67.70 end
% 67.32/67.70 permutation0:
% 67.32/67.70 0 ==> 0
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 eqswap: (148122) {G22,W11,D5,L1,V2,M1} { composition( X, top ) ==>
% 67.32/67.70 composition( join( X, composition( X, Y ) ), top ) }.
% 67.32/67.70 parent0[0]: (10498) {G22,W11,D5,L1,V2,M1} P(10493,111);d(756);d(7);d(744);d
% 67.32/67.70 (6) { composition( join( X, composition( X, Y ) ), top ) ==> composition
% 67.32/67.70 ( X, top ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := X
% 67.32/67.70 Y := Y
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148125) {G23,W13,D5,L1,V0,M1} { composition( meet( one, skol1 )
% 67.32/67.70 , top ) ==> composition( join( meet( one, skol1 ), skol1 ), top ) }.
% 67.32/67.70 parent0[0]: (61463) {G60,W7,D4,L1,V0,M1} P(61279,8758) { composition( meet
% 67.32/67.70 ( one, skol1 ), skol1 ) ==> skol1 }.
% 67.32/67.70 parent1[0; 11]: (148122) {G22,W11,D5,L1,V2,M1} { composition( X, top ) ==>
% 67.32/67.70 composition( join( X, composition( X, Y ) ), top ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 X := meet( one, skol1 )
% 67.32/67.70 Y := skol1
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148126) {G2,W13,D5,L1,V0,M1} { composition( meet( one, skol1 ),
% 67.32/67.70 top ) ==> join( composition( meet( one, skol1 ), top ), skol1 ) }.
% 67.32/67.70 parent0[0]: (97) {G1,W11,D4,L1,V1,M1} P(13,6) { composition( join( X, skol1
% 67.32/67.70 ), top ) ==> join( composition( X, top ), skol1 ) }.
% 67.32/67.70 parent1[0; 6]: (148125) {G23,W13,D5,L1,V0,M1} { composition( meet( one,
% 67.32/67.70 skol1 ), top ) ==> composition( join( meet( one, skol1 ), skol1 ), top )
% 67.32/67.70 }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := meet( one, skol1 )
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148127) {G3,W7,D4,L1,V0,M1} { composition( meet( one, skol1 ),
% 67.32/67.70 top ) ==> skol1 }.
% 67.32/67.70 parent0[0]: (15362) {G34,W9,D5,L1,V2,M1} P(15308,2071);d(1043) { join(
% 67.32/67.70 composition( meet( X, skol1 ), Y ), skol1 ) ==> skol1 }.
% 67.32/67.70 parent1[0; 6]: (148126) {G2,W13,D5,L1,V0,M1} { composition( meet( one,
% 67.32/67.70 skol1 ), top ) ==> join( composition( meet( one, skol1 ), top ), skol1 )
% 67.32/67.70 }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := one
% 67.32/67.70 Y := top
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 subsumption: (61527) {G61,W7,D4,L1,V0,M1} P(61463,10498);d(97);d(15362) {
% 67.32/67.70 composition( meet( one, skol1 ), top ) ==> skol1 }.
% 67.32/67.70 parent0: (148127) {G3,W7,D4,L1,V0,M1} { composition( meet( one, skol1 ),
% 67.32/67.70 top ) ==> skol1 }.
% 67.32/67.70 substitution0:
% 67.32/67.70 end
% 67.32/67.70 permutation0:
% 67.32/67.70 0 ==> 0
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 eqswap: (148130) {G30,W13,D5,L1,V3,M1} { meet( Z, complement( join( Y, X )
% 67.32/67.70 ) ) = meet( complement( join( X, Y ) ), Z ) }.
% 67.32/67.70 parent0[0]: (2229) {G30,W13,D5,L1,V3,M1} P(1812,1387);d(749);d(1589);d(1607
% 67.32/67.70 );d(1);d(775) { meet( complement( join( X, Z ) ), Y ) = meet( Y,
% 67.32/67.70 complement( join( Z, X ) ) ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := X
% 67.32/67.70 Y := Z
% 67.32/67.70 Z := Y
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148140) {G17,W16,D6,L1,V3,M1} { meet( X, complement( join(
% 67.32/67.70 complement( Y ), complement( Z ) ) ) ) = meet( complement( complement(
% 67.32/67.70 meet( Z, Y ) ) ), X ) }.
% 67.32/67.70 parent0[0]: (773) {G16,W10,D4,L1,V2,M1} P(3,756) { join( complement( X ),
% 67.32/67.70 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.32/67.70 parent1[0; 11]: (148130) {G30,W13,D5,L1,V3,M1} { meet( Z, complement( join
% 67.32/67.70 ( Y, X ) ) ) = meet( complement( join( X, Y ) ), Z ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := Z
% 67.32/67.70 Y := Y
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 X := complement( Z )
% 67.32/67.70 Y := complement( Y )
% 67.32/67.70 Z := X
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148142) {G16,W14,D6,L1,V3,M1} { meet( X, complement( join(
% 67.32/67.70 complement( Y ), complement( Z ) ) ) ) = meet( meet( Z, Y ), X ) }.
% 67.32/67.70 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.32/67.70 complement( X ) ) ==> X }.
% 67.32/67.70 parent1[0; 10]: (148140) {G17,W16,D6,L1,V3,M1} { meet( X, complement( join
% 67.32/67.70 ( complement( Y ), complement( Z ) ) ) ) = meet( complement( complement(
% 67.32/67.70 meet( Z, Y ) ) ), X ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := meet( Z, Y )
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 X := X
% 67.32/67.70 Y := Y
% 67.32/67.70 Z := Z
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148143) {G17,W13,D6,L1,V3,M1} { meet( X, meet( Y, complement(
% 67.32/67.70 complement( Z ) ) ) ) = meet( meet( Z, Y ), X ) }.
% 67.32/67.70 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.32/67.70 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.32/67.70 parent1[0; 3]: (148142) {G16,W14,D6,L1,V3,M1} { meet( X, complement( join
% 67.32/67.70 ( complement( Y ), complement( Z ) ) ) ) = meet( meet( Z, Y ), X ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := complement( Z )
% 67.32/67.70 Y := Y
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 X := X
% 67.32/67.70 Y := Y
% 67.32/67.70 Z := Z
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148144) {G18,W13,D5,L1,V3,M1} { meet( meet( Y, X ), complement(
% 67.32/67.70 complement( Z ) ) ) = meet( meet( Z, Y ), X ) }.
% 67.32/67.70 parent0[0]: (24022) {G19,W13,D5,L1,V3,M1} P(964,1625);d(772);d(772);d(772)
% 67.32/67.70 { meet( Z, meet( X, complement( Y ) ) ) ==> meet( meet( X, Z ),
% 67.32/67.70 complement( Y ) ) }.
% 67.32/67.70 parent1[0; 1]: (148143) {G17,W13,D6,L1,V3,M1} { meet( X, meet( Y,
% 67.32/67.70 complement( complement( Z ) ) ) ) = meet( meet( Z, Y ), X ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := Y
% 67.32/67.70 Y := complement( Z )
% 67.32/67.70 Z := X
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 X := X
% 67.32/67.70 Y := Y
% 67.32/67.70 Z := Z
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148145) {G16,W11,D4,L1,V3,M1} { meet( meet( X, Y ), Z ) = meet(
% 67.32/67.70 meet( Z, X ), Y ) }.
% 67.32/67.70 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.32/67.70 complement( X ) ) ==> X }.
% 67.32/67.70 parent1[0; 5]: (148144) {G18,W13,D5,L1,V3,M1} { meet( meet( Y, X ),
% 67.32/67.70 complement( complement( Z ) ) ) = meet( meet( Z, Y ), X ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := Z
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 X := Y
% 67.32/67.70 Y := X
% 67.32/67.70 Z := Z
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 eqswap: (148146) {G16,W11,D4,L1,V3,M1} { meet( meet( Z, X ), Y ) = meet(
% 67.32/67.70 meet( X, Y ), Z ) }.
% 67.32/67.70 parent0[0]: (148145) {G16,W11,D4,L1,V3,M1} { meet( meet( X, Y ), Z ) =
% 67.32/67.70 meet( meet( Z, X ), Y ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := X
% 67.32/67.70 Y := Y
% 67.32/67.70 Z := Z
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 subsumption: (63585) {G31,W11,D4,L1,V3,M1} P(773,2229);d(756);d(772);d(
% 67.32/67.70 24022);d(756) { meet( meet( X, Y ), Z ) = meet( meet( Y, Z ), X ) }.
% 67.32/67.70 parent0: (148146) {G16,W11,D4,L1,V3,M1} { meet( meet( Z, X ), Y ) = meet(
% 67.32/67.70 meet( X, Y ), Z ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := Y
% 67.32/67.70 Y := Z
% 67.32/67.70 Z := X
% 67.32/67.70 end
% 67.32/67.70 permutation0:
% 67.32/67.70 0 ==> 0
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 eqswap: (148147) {G31,W11,D4,L1,V3,M1} { meet( meet( Y, Z ), X ) = meet(
% 67.32/67.70 meet( X, Y ), Z ) }.
% 67.32/67.70 parent0[0]: (63585) {G31,W11,D4,L1,V3,M1} P(773,2229);d(756);d(772);d(24022
% 67.32/67.70 );d(756) { meet( meet( X, Y ), Z ) = meet( meet( Y, Z ), X ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := X
% 67.32/67.70 Y := Y
% 67.32/67.70 Z := Z
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 eqswap: (148148) {G29,W10,D5,L1,V2,M1} { meet( Y, X ) ==> meet( X, join(
% 67.32/67.70 complement( X ), Y ) ) }.
% 67.32/67.70 parent0[0]: (10127) {G29,W10,D5,L1,V2,M1} P(10113,2544);d(3086) { meet( X,
% 67.32/67.70 join( complement( X ), Y ) ) ==> meet( Y, X ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := X
% 67.32/67.70 Y := Y
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148151) {G30,W16,D7,L1,V3,M1} { meet( X, meet( Y, Z ) ) ==> meet
% 67.32/67.70 ( meet( join( complement( meet( Y, Z ) ), X ), Y ), Z ) }.
% 67.32/67.70 parent0[0]: (148147) {G31,W11,D4,L1,V3,M1} { meet( meet( Y, Z ), X ) =
% 67.32/67.70 meet( meet( X, Y ), Z ) }.
% 67.32/67.70 parent1[0; 6]: (148148) {G29,W10,D5,L1,V2,M1} { meet( Y, X ) ==> meet( X,
% 67.32/67.70 join( complement( X ), Y ) ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := join( complement( meet( Y, Z ) ), X )
% 67.32/67.70 Y := Y
% 67.32/67.70 Z := Z
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 X := meet( Y, Z )
% 67.32/67.70 Y := X
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148152) {G31,W16,D7,L1,V3,M1} { meet( X, meet( Y, Z ) ) ==> meet
% 67.32/67.70 ( meet( Z, join( complement( meet( Y, Z ) ), X ) ), Y ) }.
% 67.32/67.70 parent0[0]: (148147) {G31,W11,D4,L1,V3,M1} { meet( meet( Y, Z ), X ) =
% 67.32/67.70 meet( meet( X, Y ), Z ) }.
% 67.32/67.70 parent1[0; 6]: (148151) {G30,W16,D7,L1,V3,M1} { meet( X, meet( Y, Z ) )
% 67.32/67.70 ==> meet( meet( join( complement( meet( Y, Z ) ), X ), Y ), Z ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := Z
% 67.32/67.70 Y := join( complement( meet( Y, Z ) ), X )
% 67.32/67.70 Z := Y
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 X := X
% 67.32/67.70 Y := Y
% 67.32/67.70 Z := Z
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148156) {G29,W14,D6,L1,V3,M1} { meet( X, meet( Y, Z ) ) ==> meet
% 67.32/67.70 ( meet( join( complement( Y ), X ), Z ), Y ) }.
% 67.32/67.70 parent0[0]: (23978) {G28,W15,D6,L1,V3,M1} P(964,10148);d(1614);d(772);d(951
% 67.32/67.70 );d(1613);d(771);d(951) { meet( Z, join( complement( meet( X, Z ) ), Y )
% 67.32/67.70 ) ==> meet( join( complement( X ), Y ), Z ) }.
% 67.32/67.70 parent1[0; 7]: (148152) {G31,W16,D7,L1,V3,M1} { meet( X, meet( Y, Z ) )
% 67.32/67.70 ==> meet( meet( Z, join( complement( meet( Y, Z ) ), X ) ), Y ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := Y
% 67.32/67.70 Y := X
% 67.32/67.70 Z := Z
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 X := X
% 67.32/67.70 Y := Y
% 67.32/67.70 Z := Z
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 eqswap: (148157) {G29,W14,D6,L1,V3,M1} { meet( meet( join( complement( Y )
% 67.32/67.70 , X ), Z ), Y ) ==> meet( X, meet( Y, Z ) ) }.
% 67.32/67.70 parent0[0]: (148156) {G29,W14,D6,L1,V3,M1} { meet( X, meet( Y, Z ) ) ==>
% 67.32/67.70 meet( meet( join( complement( Y ), X ), Z ), Y ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := X
% 67.32/67.70 Y := Y
% 67.32/67.70 Z := Z
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 subsumption: (64457) {G32,W14,D6,L1,V3,M1} P(63585,10127);d(23978) { meet(
% 67.32/67.70 meet( join( complement( X ), Z ), Y ), X ) ==> meet( Z, meet( X, Y ) )
% 67.32/67.70 }.
% 67.32/67.70 parent0: (148157) {G29,W14,D6,L1,V3,M1} { meet( meet( join( complement( Y
% 67.32/67.70 ), X ), Z ), Y ) ==> meet( X, meet( Y, Z ) ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := Z
% 67.32/67.70 Y := X
% 67.32/67.70 Z := Y
% 67.32/67.70 end
% 67.32/67.70 permutation0:
% 67.32/67.70 0 ==> 0
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 eqswap: (148159) {G31,W11,D4,L1,V3,M1} { meet( meet( Y, Z ), X ) = meet(
% 67.32/67.70 meet( X, Y ), Z ) }.
% 67.32/67.70 parent0[0]: (63585) {G31,W11,D4,L1,V3,M1} P(773,2229);d(756);d(772);d(24022
% 67.32/67.70 );d(756) { meet( meet( X, Y ), Z ) = meet( meet( Y, Z ), X ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := X
% 67.32/67.70 Y := Y
% 67.32/67.70 Z := Z
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148176) {G30,W14,D6,L1,V3,M1} { meet( meet( join( complement( X
% 67.32/67.70 ), Y ), Z ), X ) = meet( meet( Y, X ), Z ) }.
% 67.32/67.70 parent0[0]: (10127) {G29,W10,D5,L1,V2,M1} P(10113,2544);d(3086) { meet( X,
% 67.32/67.70 join( complement( X ), Y ) ) ==> meet( Y, X ) }.
% 67.32/67.70 parent1[0; 10]: (148159) {G31,W11,D4,L1,V3,M1} { meet( meet( Y, Z ), X ) =
% 67.32/67.70 meet( meet( X, Y ), Z ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := X
% 67.32/67.70 Y := Y
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 X := X
% 67.32/67.70 Y := join( complement( X ), Y )
% 67.32/67.70 Z := Z
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148177) {G31,W11,D4,L1,V3,M1} { meet( Y, meet( X, Z ) ) = meet(
% 67.32/67.70 meet( Y, X ), Z ) }.
% 67.32/67.70 parent0[0]: (64457) {G32,W14,D6,L1,V3,M1} P(63585,10127);d(23978) { meet(
% 67.32/67.70 meet( join( complement( X ), Z ), Y ), X ) ==> meet( Z, meet( X, Y ) )
% 67.32/67.70 }.
% 67.32/67.70 parent1[0; 1]: (148176) {G30,W14,D6,L1,V3,M1} { meet( meet( join(
% 67.32/67.70 complement( X ), Y ), Z ), X ) = meet( meet( Y, X ), Z ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := X
% 67.32/67.70 Y := Z
% 67.32/67.70 Z := Y
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 X := X
% 67.32/67.70 Y := Y
% 67.32/67.70 Z := Z
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 subsumption: (64458) {G33,W11,D4,L1,V3,M1} P(10127,63585);d(64457) { meet(
% 67.32/67.70 Y, meet( X, Z ) ) ==> meet( meet( Y, X ), Z ) }.
% 67.32/67.70 parent0: (148177) {G31,W11,D4,L1,V3,M1} { meet( Y, meet( X, Z ) ) = meet(
% 67.32/67.70 meet( Y, X ), Z ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := X
% 67.32/67.70 Y := Y
% 67.32/67.70 Z := Z
% 67.32/67.70 end
% 67.32/67.70 permutation0:
% 67.32/67.70 0 ==> 0
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 eqswap: (148179) {G31,W11,D4,L1,V3,M1} { meet( meet( Y, Z ), X ) = meet(
% 67.32/67.70 meet( X, Y ), Z ) }.
% 67.32/67.70 parent0[0]: (63585) {G31,W11,D4,L1,V3,M1} P(773,2229);d(756);d(772);d(24022
% 67.32/67.70 );d(756) { meet( meet( X, Y ), Z ) = meet( meet( Y, Z ), X ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := X
% 67.32/67.70 Y := Y
% 67.32/67.70 Z := Z
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 eqswap: (148180) {G22,W11,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X, Y
% 67.32/67.70 ), composition( top, Y ) ) }.
% 67.32/67.70 parent0[0]: (3919) {G22,W11,D4,L1,V2,M1} P(1387,3874) { meet( meet( X, Y )
% 67.32/67.70 , composition( top, Y ) ) ==> meet( X, Y ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := X
% 67.32/67.70 Y := Y
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 paramod: (148183) {G23,W11,D5,L1,V2,M1} { meet( X, Y ) ==> meet( meet(
% 67.32/67.70 composition( top, Y ), X ), Y ) }.
% 67.32/67.70 parent0[0]: (148179) {G31,W11,D4,L1,V3,M1} { meet( meet( Y, Z ), X ) =
% 67.32/67.70 meet( meet( X, Y ), Z ) }.
% 67.32/67.70 parent1[0; 4]: (148180) {G22,W11,D4,L1,V2,M1} { meet( X, Y ) ==> meet(
% 67.32/67.70 meet( X, Y ), composition( top, Y ) ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := composition( top, Y )
% 67.32/67.70 Y := X
% 67.32/67.70 Z := Y
% 67.32/67.70 end
% 67.32/67.70 substitution1:
% 67.32/67.70 X := X
% 67.32/67.70 Y := Y
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 eqswap: (148214) {G23,W11,D5,L1,V2,M1} { meet( meet( composition( top, Y )
% 67.32/67.70 , X ), Y ) ==> meet( X, Y ) }.
% 67.32/67.70 parent0[0]: (148183) {G23,W11,D5,L1,V2,M1} { meet( X, Y ) ==> meet( meet(
% 67.32/67.70 composition( top, Y ), X ), Y ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := X
% 67.32/67.70 Y := Y
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 subsumption: (64489) {G32,W11,D5,L1,V2,M1} P(63585,3919) { meet( meet(
% 67.32/67.70 composition( top, Y ), X ), Y ) ==> meet( X, Y ) }.
% 67.32/67.70 parent0: (148214) {G23,W11,D5,L1,V2,M1} { meet( meet( composition( top, Y
% 67.32/67.70 ), X ), Y ) ==> meet( X, Y ) }.
% 67.32/67.70 substitution0:
% 67.32/67.70 X := X
% 67.32/67.70 Y := Y
% 67.32/67.70 end
% 67.32/67.70 permutation0:
% 67.32/67.70 0 ==> 0
% 67.32/67.70 end
% 67.32/67.70
% 67.32/67.70 eqswap: (148215) {G31,W11,D4,L1,V3,M1} { meet( meet( Y, Z ), X ) = meet(
% 67.32/67.70 meet( X, Y ), Z ) }.
% 67.32/67.70 parent0[0]: (63585) {G31,W11,D4,L1,V3,M1} P(773,2229);d(756);d(772);d(24022
% 67.32/67.70 );d(756) { meet( meet( X, Y ), Z ) = meet( meet( Y, Z ), X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 Z := Z
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148216) {G22,W11,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X, Y
% 67.32/67.71 ), composition( top, X ) ) }.
% 67.32/67.71 parent0[0]: (3917) {G22,W11,D4,L1,V2,M1} P(1373,3874) { meet( meet( X, Y )
% 67.32/67.71 , composition( top, X ) ) ==> meet( X, Y ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148219) {G23,W11,D5,L1,V2,M1} { meet( X, Y ) ==> meet( meet(
% 67.32/67.71 composition( top, X ), X ), Y ) }.
% 67.32/67.71 parent0[0]: (148215) {G31,W11,D4,L1,V3,M1} { meet( meet( Y, Z ), X ) =
% 67.32/67.71 meet( meet( X, Y ), Z ) }.
% 67.32/67.71 parent1[0; 4]: (148216) {G22,W11,D4,L1,V2,M1} { meet( X, Y ) ==> meet(
% 67.32/67.71 meet( X, Y ), composition( top, X ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := composition( top, X )
% 67.32/67.71 Y := X
% 67.32/67.71 Z := Y
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148220) {G24,W11,D5,L1,V2,M1} { meet( X, Y ) ==> meet( meet( Y,
% 67.32/67.71 composition( top, X ) ), X ) }.
% 67.32/67.71 parent0[0]: (148215) {G31,W11,D4,L1,V3,M1} { meet( meet( Y, Z ), X ) =
% 67.32/67.71 meet( meet( X, Y ), Z ) }.
% 67.32/67.71 parent1[0; 4]: (148219) {G23,W11,D5,L1,V2,M1} { meet( X, Y ) ==> meet(
% 67.32/67.71 meet( composition( top, X ), X ), Y ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := composition( top, X )
% 67.32/67.71 Z := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148249) {G24,W11,D5,L1,V2,M1} { meet( meet( Y, composition( top,
% 67.32/67.71 X ) ), X ) ==> meet( X, Y ) }.
% 67.32/67.71 parent0[0]: (148220) {G24,W11,D5,L1,V2,M1} { meet( X, Y ) ==> meet( meet(
% 67.32/67.71 Y, composition( top, X ) ), X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (64491) {G32,W11,D5,L1,V2,M1} P(63585,3917) { meet( meet( Y,
% 67.32/67.71 composition( top, X ) ), X ) ==> meet( X, Y ) }.
% 67.32/67.71 parent0: (148249) {G24,W11,D5,L1,V2,M1} { meet( meet( Y, composition( top
% 67.32/67.71 , X ) ), X ) ==> meet( X, Y ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148252) {G32,W11,D5,L1,V2,M1} { meet( Y, X ) ==> meet( meet(
% 67.32/67.71 composition( top, X ), Y ), X ) }.
% 67.32/67.71 parent0[0]: (64489) {G32,W11,D5,L1,V2,M1} P(63585,3919) { meet( meet(
% 67.32/67.71 composition( top, Y ), X ), Y ) ==> meet( X, Y ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148256) {G27,W16,D6,L1,V2,M1} { meet( join( X, complement(
% 67.32/67.71 composition( top, Y ) ) ), Y ) ==> meet( meet( X, composition( top, Y ) )
% 67.32/67.71 , Y ) }.
% 67.32/67.71 parent0[0]: (10124) {G26,W10,D5,L1,V2,M1} P(10113,8800) { meet( X, join( Y
% 67.32/67.71 , complement( X ) ) ) ==> meet( Y, X ) }.
% 67.32/67.71 parent1[0; 10]: (148252) {G32,W11,D5,L1,V2,M1} { meet( Y, X ) ==> meet(
% 67.32/67.71 meet( composition( top, X ), Y ), X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := composition( top, Y )
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := join( X, complement( composition( top, Y ) ) )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148257) {G28,W12,D6,L1,V2,M1} { meet( join( X, complement(
% 67.32/67.71 composition( top, Y ) ) ), Y ) ==> meet( Y, X ) }.
% 67.32/67.71 parent0[0]: (64491) {G32,W11,D5,L1,V2,M1} P(63585,3917) { meet( meet( Y,
% 67.32/67.71 composition( top, X ) ), X ) ==> meet( X, Y ) }.
% 67.32/67.71 parent1[0; 9]: (148256) {G27,W16,D6,L1,V2,M1} { meet( join( X, complement
% 67.32/67.71 ( composition( top, Y ) ) ), Y ) ==> meet( meet( X, composition( top, Y )
% 67.32/67.71 ), Y ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (65546) {G33,W12,D6,L1,V2,M1} P(10124,64489);d(64491) { meet(
% 67.32/67.71 join( Y, complement( composition( top, X ) ) ), X ) ==> meet( X, Y ) }.
% 67.32/67.71 parent0: (148257) {G28,W12,D6,L1,V2,M1} { meet( join( X, complement(
% 67.32/67.71 composition( top, Y ) ) ), Y ) ==> meet( Y, X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148260) {G29,W13,D7,L1,V2,M1} { composition( Y, X ) ==>
% 67.32/67.71 composition( join( complement( converse( composition( X, top ) ) ), Y ),
% 67.32/67.71 X ) }.
% 67.32/67.71 parent0[0]: (2971) {G29,W13,D7,L1,V2,M1} P(2873,6);d(749) { composition(
% 67.32/67.71 join( complement( converse( composition( X, top ) ) ), Y ), X ) ==>
% 67.32/67.71 composition( Y, X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148262) {G24,W18,D7,L1,V2,M1} { composition( meet( X, converse(
% 67.32/67.71 composition( Y, top ) ) ), Y ) ==> composition( join( X, complement(
% 67.32/67.71 converse( composition( Y, top ) ) ) ), Y ) }.
% 67.32/67.71 parent0[0]: (2429) {G23,W11,D4,L1,V2,M1} P(2408,898);d(1);d(870) { join(
% 67.32/67.71 complement( Y ), meet( X, Y ) ) ==> join( X, complement( Y ) ) }.
% 67.32/67.71 parent1[0; 10]: (148260) {G29,W13,D7,L1,V2,M1} { composition( Y, X ) ==>
% 67.32/67.71 composition( join( complement( converse( composition( X, top ) ) ), Y ),
% 67.32/67.71 X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := converse( composition( Y, top ) )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := meet( X, converse( composition( Y, top ) ) )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148263) {G25,W12,D6,L1,V2,M1} { composition( meet( X, converse(
% 67.32/67.71 composition( Y, top ) ) ), Y ) ==> composition( X, Y ) }.
% 67.32/67.71 parent0[0]: (2972) {G29,W13,D7,L1,V2,M1} P(2873,6);d(740) { composition(
% 67.32/67.71 join( Y, complement( converse( composition( X, top ) ) ) ), X ) ==>
% 67.32/67.71 composition( Y, X ) }.
% 67.32/67.71 parent1[0; 9]: (148262) {G24,W18,D7,L1,V2,M1} { composition( meet( X,
% 67.32/67.71 converse( composition( Y, top ) ) ), Y ) ==> composition( join( X,
% 67.32/67.71 complement( converse( composition( Y, top ) ) ) ), Y ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (82543) {G30,W12,D6,L1,V2,M1} P(2429,2971);d(2972) {
% 67.32/67.71 composition( meet( Y, converse( composition( X, top ) ) ), X ) ==>
% 67.32/67.71 composition( Y, X ) }.
% 67.32/67.71 parent0: (148263) {G25,W12,D6,L1,V2,M1} { composition( meet( X, converse(
% 67.32/67.71 composition( Y, top ) ) ), Y ) ==> composition( X, Y ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148266) {G29,W13,D7,L1,V2,M1} { composition( Y, X ) ==>
% 67.32/67.71 composition( join( complement( converse( composition( X, top ) ) ), Y ),
% 67.32/67.71 X ) }.
% 67.32/67.71 parent0[0]: (2971) {G29,W13,D7,L1,V2,M1} P(2873,6);d(749) { composition(
% 67.32/67.71 join( complement( converse( composition( X, top ) ) ), Y ), X ) ==>
% 67.32/67.71 composition( Y, X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148268) {G24,W18,D7,L1,V2,M1} { composition( meet( converse(
% 67.32/67.71 composition( X, top ) ), Y ), X ) ==> composition( join( Y, complement(
% 67.32/67.71 converse( composition( X, top ) ) ) ), X ) }.
% 67.32/67.71 parent0[0]: (2464) {G23,W11,D4,L1,V2,M1} P(2431,898);d(1);d(887) { join(
% 67.32/67.71 complement( Y ), meet( Y, X ) ) ==> join( X, complement( Y ) ) }.
% 67.32/67.71 parent1[0; 10]: (148266) {G29,W13,D7,L1,V2,M1} { composition( Y, X ) ==>
% 67.32/67.71 composition( join( complement( converse( composition( X, top ) ) ), Y ),
% 67.32/67.71 X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := converse( composition( X, top ) )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := meet( converse( composition( X, top ) ), Y )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148269) {G25,W12,D6,L1,V2,M1} { composition( meet( converse(
% 67.32/67.71 composition( X, top ) ), Y ), X ) ==> composition( Y, X ) }.
% 67.32/67.71 parent0[0]: (2972) {G29,W13,D7,L1,V2,M1} P(2873,6);d(740) { composition(
% 67.32/67.71 join( Y, complement( converse( composition( X, top ) ) ) ), X ) ==>
% 67.32/67.71 composition( Y, X ) }.
% 67.32/67.71 parent1[0; 9]: (148268) {G24,W18,D7,L1,V2,M1} { composition( meet(
% 67.32/67.71 converse( composition( X, top ) ), Y ), X ) ==> composition( join( Y,
% 67.32/67.71 complement( converse( composition( X, top ) ) ) ), X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (82544) {G30,W12,D6,L1,V2,M1} P(2464,2971);d(2972) {
% 67.32/67.71 composition( meet( converse( composition( X, top ) ), Y ), X ) ==>
% 67.32/67.71 composition( Y, X ) }.
% 67.32/67.71 parent0: (148269) {G25,W12,D6,L1,V2,M1} { composition( meet( converse(
% 67.32/67.71 composition( X, top ) ), Y ), X ) ==> composition( Y, X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148272) {G30,W12,D6,L1,V2,M1} { composition( Y, X ) ==>
% 67.32/67.71 composition( meet( converse( composition( X, top ) ), Y ), X ) }.
% 67.32/67.71 parent0[0]: (82544) {G30,W12,D6,L1,V2,M1} P(2464,2971);d(2972) {
% 67.32/67.71 composition( meet( converse( composition( X, top ) ), Y ), X ) ==>
% 67.32/67.71 composition( Y, X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148274) {G31,W14,D5,L1,V1,M1} { composition( X, meet( one, skol1
% 67.32/67.71 ) ) ==> composition( meet( converse( skol1 ), X ), meet( one, skol1 ) )
% 67.32/67.71 }.
% 67.32/67.71 parent0[0]: (61527) {G61,W7,D4,L1,V0,M1} P(61463,10498);d(97);d(15362) {
% 67.32/67.71 composition( meet( one, skol1 ), top ) ==> skol1 }.
% 67.32/67.71 parent1[0; 9]: (148272) {G30,W12,D6,L1,V2,M1} { composition( Y, X ) ==>
% 67.32/67.71 composition( meet( converse( composition( X, top ) ), Y ), X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := meet( one, skol1 )
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148276) {G31,W14,D5,L1,V1,M1} { composition( meet( converse(
% 67.32/67.71 skol1 ), X ), meet( one, skol1 ) ) ==> composition( X, meet( one, skol1 )
% 67.32/67.71 ) }.
% 67.32/67.71 parent0[0]: (148274) {G31,W14,D5,L1,V1,M1} { composition( X, meet( one,
% 67.32/67.71 skol1 ) ) ==> composition( meet( converse( skol1 ), X ), meet( one, skol1
% 67.32/67.71 ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (89538) {G62,W14,D5,L1,V1,M1} P(61527,82544) { composition(
% 67.32/67.71 meet( converse( skol1 ), X ), meet( one, skol1 ) ) ==> composition( X,
% 67.32/67.71 meet( one, skol1 ) ) }.
% 67.32/67.71 parent0: (148276) {G31,W14,D5,L1,V1,M1} { composition( meet( converse(
% 67.32/67.71 skol1 ), X ), meet( one, skol1 ) ) ==> composition( X, meet( one, skol1 )
% 67.32/67.71 ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148277) {G22,W13,D5,L1,V2,M1} { composition( meet( one, Y ), X )
% 67.32/67.71 ==> meet( X, composition( meet( one, Y ), X ) ) }.
% 67.32/67.71 parent0[0]: (4322) {G22,W13,D5,L1,V2,M1} P(3624,1032) { meet( Y,
% 67.32/67.71 composition( meet( one, X ), Y ) ) ==> composition( meet( one, X ), Y )
% 67.32/67.71 }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148279) {G23,W10,D5,L1,V1,M1} { composition( meet( one, X ),
% 67.32/67.71 complement( composition( X, top ) ) ) ==> zero }.
% 67.32/67.71 parent0[0]: (40136) {G35,W12,D5,L1,V3,M1} S(35053);d(36197) { meet(
% 67.32/67.71 complement( composition( X, top ) ), composition( meet( Y, X ), Z ) ) ==>
% 67.32/67.71 zero }.
% 67.32/67.71 parent1[0; 9]: (148277) {G22,W13,D5,L1,V2,M1} { composition( meet( one, Y
% 67.32/67.71 ), X ) ==> meet( X, composition( meet( one, Y ), X ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := one
% 67.32/67.71 Z := complement( composition( X, top ) )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := complement( composition( X, top ) )
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (115358) {G36,W10,D5,L1,V1,M1} P(4322,40136) { composition(
% 67.32/67.71 meet( one, X ), complement( composition( X, top ) ) ) ==> zero }.
% 67.32/67.71 parent0: (148279) {G23,W10,D5,L1,V1,M1} { composition( meet( one, X ),
% 67.32/67.71 complement( composition( X, top ) ) ) ==> zero }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148282) {G22,W13,D6,L1,V3,M1} { join( Y, Z ) ==> join( join(
% 67.32/67.71 composition( meet( one, X ), Y ), Z ), Y ) }.
% 67.32/67.71 parent0[0]: (4327) {G22,W13,D6,L1,V3,M1} P(3624,30) { join( join(
% 67.32/67.71 composition( meet( one, X ), Y ), Z ), Y ) ==> join( Y, Z ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 Z := Z
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148285) {G23,W15,D5,L1,V1,M1} { join( complement( one ), meet(
% 67.32/67.71 one, X ) ) ==> join( composition( meet( one, X ), top ), complement( one
% 67.32/67.71 ) ) }.
% 67.32/67.71 parent0[0]: (5440) {G28,W10,D5,L1,V1,M1} P(3644,20);d(16);d(223);d(16);d(
% 67.32/67.71 2866);d(186) { join( composition( X, complement( one ) ), X ) ==>
% 67.32/67.71 composition( X, top ) }.
% 67.32/67.71 parent1[0; 8]: (148282) {G22,W13,D6,L1,V3,M1} { join( Y, Z ) ==> join(
% 67.32/67.71 join( composition( meet( one, X ), Y ), Z ), Y ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := meet( one, X )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := complement( one )
% 67.32/67.71 Z := meet( one, X )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148286) {G24,W13,D5,L1,V1,M1} { join( X, complement( one ) ) ==>
% 67.32/67.71 join( composition( meet( one, X ), top ), complement( one ) ) }.
% 67.32/67.71 parent0[0]: (2464) {G23,W11,D4,L1,V2,M1} P(2431,898);d(1);d(887) { join(
% 67.32/67.71 complement( Y ), meet( Y, X ) ) ==> join( X, complement( Y ) ) }.
% 67.32/67.71 parent1[0; 1]: (148285) {G23,W15,D5,L1,V1,M1} { join( complement( one ),
% 67.32/67.71 meet( one, X ) ) ==> join( composition( meet( one, X ), top ), complement
% 67.32/67.71 ( one ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := one
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148287) {G24,W13,D5,L1,V1,M1} { join( composition( meet( one, X )
% 67.32/67.71 , top ), complement( one ) ) ==> join( X, complement( one ) ) }.
% 67.32/67.71 parent0[0]: (148286) {G24,W13,D5,L1,V1,M1} { join( X, complement( one ) )
% 67.32/67.71 ==> join( composition( meet( one, X ), top ), complement( one ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (115728) {G29,W13,D5,L1,V1,M1} P(5440,4327);d(2464) { join(
% 67.32/67.71 composition( meet( one, X ), top ), complement( one ) ) ==> join( X,
% 67.32/67.71 complement( one ) ) }.
% 67.32/67.71 parent0: (148287) {G24,W13,D5,L1,V1,M1} { join( composition( meet( one, X
% 67.32/67.71 ), top ), complement( one ) ) ==> join( X, complement( one ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148288) {G36,W10,D5,L1,V1,M1} { zero ==> composition( meet( one,
% 67.32/67.71 X ), complement( composition( X, top ) ) ) }.
% 67.32/67.71 parent0[0]: (115358) {G36,W10,D5,L1,V1,M1} P(4322,40136) { composition(
% 67.32/67.71 meet( one, X ), complement( composition( X, top ) ) ) ==> zero }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148289) {G25,W10,D5,L1,V1,M1} { zero ==> composition( meet( X,
% 67.32/67.71 one ), complement( composition( X, top ) ) ) }.
% 67.32/67.71 parent0[0]: (8758) {G24,W11,D4,L1,V3,M1} P(2544,95);d(2544) { composition(
% 67.32/67.71 meet( X, Y ), Z ) = composition( meet( Y, X ), Z ) }.
% 67.32/67.71 parent1[0; 2]: (148288) {G36,W10,D5,L1,V1,M1} { zero ==> composition( meet
% 67.32/67.71 ( one, X ), complement( composition( X, top ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := one
% 67.32/67.71 Y := X
% 67.32/67.71 Z := complement( composition( X, top ) )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148295) {G25,W10,D5,L1,V1,M1} { composition( meet( X, one ),
% 67.32/67.71 complement( composition( X, top ) ) ) ==> zero }.
% 67.32/67.71 parent0[0]: (148289) {G25,W10,D5,L1,V1,M1} { zero ==> composition( meet( X
% 67.32/67.71 , one ), complement( composition( X, top ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (115815) {G37,W10,D5,L1,V1,M1} P(115358,8758) { composition(
% 67.32/67.71 meet( X, one ), complement( composition( X, top ) ) ) ==> zero }.
% 67.32/67.71 parent0: (148295) {G25,W10,D5,L1,V1,M1} { composition( meet( X, one ),
% 67.32/67.71 complement( composition( X, top ) ) ) ==> zero }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148299) {G23,W12,D7,L1,V2,M1} { zero ==> meet( converse( X ),
% 67.32/67.71 composition( Y, complement( converse( composition( X, Y ) ) ) ) ) }.
% 67.32/67.71 parent0[0]: (1583) {G23,W12,D7,L1,V2,M1} P(110,1033);d(756) { meet(
% 67.32/67.71 converse( Y ), composition( X, complement( converse( composition( Y, X )
% 67.32/67.71 ) ) ) ) ==> zero }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148303) {G24,W15,D6,L1,V1,M1} { zero ==> meet( converse( meet( X
% 67.32/67.71 , one ) ), composition( complement( composition( X, top ) ), complement(
% 67.32/67.71 converse( zero ) ) ) ) }.
% 67.32/67.71 parent0[0]: (115815) {G37,W10,D5,L1,V1,M1} P(115358,8758) { composition(
% 67.32/67.71 meet( X, one ), complement( composition( X, top ) ) ) ==> zero }.
% 67.32/67.71 parent1[0; 14]: (148299) {G23,W12,D7,L1,V2,M1} { zero ==> meet( converse(
% 67.32/67.71 X ), composition( Y, complement( converse( composition( X, Y ) ) ) ) )
% 67.32/67.71 }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := meet( X, one )
% 67.32/67.71 Y := complement( composition( X, top ) )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148304) {G16,W14,D6,L1,V1,M1} { zero ==> meet( converse( meet( X
% 67.32/67.71 , one ) ), composition( complement( composition( X, top ) ), complement(
% 67.32/67.71 zero ) ) ) }.
% 67.32/67.71 parent0[0]: (776) {G15,W4,D3,L1,V0,M1} P(758,740) { converse( zero ) ==>
% 67.32/67.71 zero }.
% 67.32/67.71 parent1[0; 13]: (148303) {G24,W15,D6,L1,V1,M1} { zero ==> meet( converse(
% 67.32/67.71 meet( X, one ) ), composition( complement( composition( X, top ) ),
% 67.32/67.71 complement( converse( zero ) ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148305) {G13,W13,D6,L1,V1,M1} { zero ==> meet( converse( meet( X
% 67.32/67.71 , one ) ), composition( complement( composition( X, top ) ), top ) ) }.
% 67.32/67.71 parent0[0]: (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) { complement
% 67.32/67.71 ( zero ) ==> top }.
% 67.32/67.71 parent1[0; 12]: (148304) {G16,W14,D6,L1,V1,M1} { zero ==> meet( converse(
% 67.32/67.71 meet( X, one ) ), composition( complement( composition( X, top ) ),
% 67.32/67.71 complement( zero ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148306) {G14,W11,D5,L1,V1,M1} { zero ==> meet( converse( meet( X
% 67.32/67.71 , one ) ), complement( composition( X, top ) ) ) }.
% 67.32/67.71 parent0[0]: (36197) {G34,W11,D5,L1,V1,M1} P(36194,36194);d(1508) {
% 67.32/67.71 composition( complement( composition( X, top ) ), top ) ==> complement(
% 67.32/67.71 composition( X, top ) ) }.
% 67.32/67.71 parent1[0; 7]: (148305) {G13,W13,D6,L1,V1,M1} { zero ==> meet( converse(
% 67.32/67.71 meet( X, one ) ), composition( complement( composition( X, top ) ), top )
% 67.32/67.71 ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148307) {G14,W11,D5,L1,V1,M1} { meet( converse( meet( X, one ) )
% 67.32/67.71 , complement( composition( X, top ) ) ) ==> zero }.
% 67.32/67.71 parent0[0]: (148306) {G14,W11,D5,L1,V1,M1} { zero ==> meet( converse( meet
% 67.32/67.71 ( X, one ) ), complement( composition( X, top ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (115879) {G38,W11,D5,L1,V1,M1} P(115815,1583);d(776);d(744);d(
% 67.32/67.71 36197) { meet( converse( meet( X, one ) ), complement( composition( X,
% 67.32/67.71 top ) ) ) ==> zero }.
% 67.32/67.71 parent0: (148307) {G14,W11,D5,L1,V1,M1} { meet( converse( meet( X, one ) )
% 67.32/67.71 , complement( composition( X, top ) ) ) ==> zero }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148309) {G27,W12,D6,L1,V2,M1} { converse( join( complement( X ),
% 67.32/67.71 Y ) ) ==> complement( converse( meet( X, complement( Y ) ) ) ) }.
% 67.32/67.71 parent0[0]: (2816) {G27,W12,D6,L1,V2,M1} P(772,2796) { complement( converse
% 67.32/67.71 ( meet( X, complement( Y ) ) ) ) ==> converse( join( complement( X ), Y )
% 67.32/67.71 ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148313) {G28,W14,D7,L1,V1,M1} { converse( join( complement(
% 67.32/67.71 converse( meet( X, one ) ) ), composition( X, top ) ) ) ==> complement(
% 67.32/67.71 converse( zero ) ) }.
% 67.32/67.71 parent0[0]: (115879) {G38,W11,D5,L1,V1,M1} P(115815,1583);d(776);d(744);d(
% 67.32/67.71 36197) { meet( converse( meet( X, one ) ), complement( composition( X,
% 67.32/67.71 top ) ) ) ==> zero }.
% 67.32/67.71 parent1[0; 13]: (148309) {G27,W12,D6,L1,V2,M1} { converse( join(
% 67.32/67.71 complement( X ), Y ) ) ==> complement( converse( meet( X, complement( Y )
% 67.32/67.71 ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := converse( meet( X, one ) )
% 67.32/67.71 Y := composition( X, top )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148314) {G16,W13,D7,L1,V1,M1} { converse( join( complement(
% 67.32/67.71 converse( meet( X, one ) ) ), composition( X, top ) ) ) ==> complement(
% 67.32/67.71 zero ) }.
% 67.32/67.71 parent0[0]: (776) {G15,W4,D3,L1,V0,M1} P(758,740) { converse( zero ) ==>
% 67.32/67.71 zero }.
% 67.32/67.71 parent1[0; 12]: (148313) {G28,W14,D7,L1,V1,M1} { converse( join(
% 67.32/67.71 complement( converse( meet( X, one ) ) ), composition( X, top ) ) ) ==>
% 67.32/67.71 complement( converse( zero ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148315) {G13,W12,D7,L1,V1,M1} { converse( join( complement(
% 67.32/67.71 converse( meet( X, one ) ) ), composition( X, top ) ) ) ==> top }.
% 67.32/67.71 parent0[0]: (744) {G12,W4,D3,L1,V0,M1} P(197,715);d(740);d(77) { complement
% 67.32/67.71 ( zero ) ==> top }.
% 67.32/67.71 parent1[0; 11]: (148314) {G16,W13,D7,L1,V1,M1} { converse( join(
% 67.32/67.71 complement( converse( meet( X, one ) ) ), composition( X, top ) ) ) ==>
% 67.32/67.71 complement( zero ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148316) {G14,W11,D5,L1,V1,M1} { join( complement( meet( X, one )
% 67.32/67.71 ), converse( composition( X, top ) ) ) ==> top }.
% 67.32/67.71 parent0[0]: (2893) {G28,W12,D6,L1,V2,M1} P(2866,19) { converse( join(
% 67.32/67.71 complement( converse( X ) ), Y ) ) ==> join( complement( X ), converse( Y
% 67.32/67.71 ) ) }.
% 67.32/67.71 parent1[0; 1]: (148315) {G13,W12,D7,L1,V1,M1} { converse( join( complement
% 67.32/67.71 ( converse( meet( X, one ) ) ), composition( X, top ) ) ) ==> top }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := meet( X, one )
% 67.32/67.71 Y := composition( X, top )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (115917) {G39,W11,D5,L1,V1,M1} P(115879,2816);d(776);d(744);d(
% 67.32/67.71 2893) { join( complement( meet( X, one ) ), converse( composition( X, top
% 67.32/67.71 ) ) ) ==> top }.
% 67.32/67.71 parent0: (148316) {G14,W11,D5,L1,V1,M1} { join( complement( meet( X, one )
% 67.32/67.71 ), converse( composition( X, top ) ) ) ==> top }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148319) {G39,W11,D5,L1,V1,M1} { top ==> join( complement( meet( X
% 67.32/67.71 , one ) ), converse( composition( X, top ) ) ) }.
% 67.32/67.71 parent0[0]: (115917) {G39,W11,D5,L1,V1,M1} P(115879,2816);d(776);d(744);d(
% 67.32/67.71 2893) { join( complement( meet( X, one ) ), converse( composition( X, top
% 67.32/67.71 ) ) ) ==> top }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148323) {G34,W16,D8,L1,V1,M1} { top ==> join( complement( meet(
% 67.32/67.71 one, X ) ), converse( composition( join( X, complement( composition( top
% 67.32/67.71 , one ) ) ), top ) ) ) }.
% 67.32/67.71 parent0[0]: (65546) {G33,W12,D6,L1,V2,M1} P(10124,64489);d(64491) { meet(
% 67.32/67.71 join( Y, complement( composition( top, X ) ) ), X ) ==> meet( X, Y ) }.
% 67.32/67.71 parent1[0; 4]: (148319) {G39,W11,D5,L1,V1,M1} { top ==> join( complement(
% 67.32/67.71 meet( X, one ) ), converse( composition( X, top ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := one
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := join( X, complement( composition( top, one ) ) )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148324) {G1,W14,D7,L1,V1,M1} { top ==> join( complement( meet(
% 67.32/67.71 one, X ) ), converse( composition( join( X, complement( top ) ), top ) )
% 67.32/67.71 ) }.
% 67.32/67.71 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 67.32/67.71 parent1[0; 12]: (148323) {G34,W16,D8,L1,V1,M1} { top ==> join( complement
% 67.32/67.71 ( meet( one, X ) ), converse( composition( join( X, complement(
% 67.32/67.71 composition( top, one ) ) ), top ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := top
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148325) {G2,W13,D6,L1,V1,M1} { top ==> join( complement( meet(
% 67.32/67.71 one, X ) ), converse( composition( join( X, zero ), top ) ) ) }.
% 67.32/67.71 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.32/67.71 zero }.
% 67.32/67.71 parent1[0; 11]: (148324) {G1,W14,D7,L1,V1,M1} { top ==> join( complement(
% 67.32/67.71 meet( one, X ) ), converse( composition( join( X, complement( top ) ),
% 67.32/67.71 top ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148326) {G3,W11,D5,L1,V1,M1} { top ==> join( complement( meet(
% 67.32/67.71 one, X ) ), converse( composition( X, top ) ) ) }.
% 67.32/67.71 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.32/67.71 }.
% 67.32/67.71 parent1[0; 9]: (148325) {G2,W13,D6,L1,V1,M1} { top ==> join( complement(
% 67.32/67.71 meet( one, X ) ), converse( composition( join( X, zero ), top ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148327) {G3,W11,D5,L1,V1,M1} { join( complement( meet( one, X ) )
% 67.32/67.71 , converse( composition( X, top ) ) ) ==> top }.
% 67.32/67.71 parent0[0]: (148326) {G3,W11,D5,L1,V1,M1} { top ==> join( complement( meet
% 67.32/67.71 ( one, X ) ), converse( composition( X, top ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (115979) {G40,W11,D5,L1,V1,M1} P(65546,115917);d(5);d(77);d(
% 67.32/67.71 740) { join( complement( meet( one, X ) ), converse( composition( X, top
% 67.32/67.71 ) ) ) ==> top }.
% 67.32/67.71 parent0: (148327) {G3,W11,D5,L1,V1,M1} { join( complement( meet( one, X )
% 67.32/67.71 ), converse( composition( X, top ) ) ) ==> top }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148329) {G11,W13,D4,L1,V2,M1} { join( composition( top, Y ), X )
% 67.32/67.71 ==> join( join( X, Y ), composition( top, Y ) ) }.
% 67.32/67.71 parent0[0]: (3882) {G11,W13,D4,L1,V2,M1} P(3511,29) { join( join( Y, X ),
% 67.32/67.71 composition( top, X ) ) ==> join( composition( top, X ), Y ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148334) {G12,W20,D6,L1,V1,M1} { join( composition( top, converse
% 67.32/67.71 ( composition( X, top ) ) ), complement( meet( one, X ) ) ) ==> join( top
% 67.32/67.71 , composition( top, converse( composition( X, top ) ) ) ) }.
% 67.32/67.71 parent0[0]: (115979) {G40,W11,D5,L1,V1,M1} P(65546,115917);d(5);d(77);d(740
% 67.32/67.71 ) { join( complement( meet( one, X ) ), converse( composition( X, top ) )
% 67.32/67.71 ) ==> top }.
% 67.32/67.71 parent1[0; 13]: (148329) {G11,W13,D4,L1,V2,M1} { join( composition( top, Y
% 67.32/67.71 ), X ) ==> join( join( X, Y ), composition( top, Y ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := complement( meet( one, X ) )
% 67.32/67.71 Y := converse( composition( X, top ) )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148335) {G10,W13,D6,L1,V1,M1} { join( composition( top, converse
% 67.32/67.71 ( composition( X, top ) ) ), complement( meet( one, X ) ) ) ==> top }.
% 67.32/67.71 parent0[0]: (214) {G9,W5,D3,L1,V1,M1} P(199,36);d(209) { join( top, X ) ==>
% 67.32/67.71 top }.
% 67.32/67.71 parent1[0; 12]: (148334) {G12,W20,D6,L1,V1,M1} { join( composition( top,
% 67.32/67.71 converse( composition( X, top ) ) ), complement( meet( one, X ) ) ) ==>
% 67.32/67.71 join( top, composition( top, converse( composition( X, top ) ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := composition( top, converse( composition( X, top ) ) )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148336) {G11,W13,D5,L1,V1,M1} { join( composition( composition(
% 67.32/67.71 top, top ), converse( X ) ), complement( meet( one, X ) ) ) ==> top }.
% 67.32/67.71 parent0[0]: (267) {G12,W13,D5,L1,V2,M1} P(225,4) { composition( Y, converse
% 67.32/67.71 ( composition( X, top ) ) ) ==> composition( composition( Y, top ),
% 67.32/67.71 converse( X ) ) }.
% 67.32/67.71 parent1[0; 2]: (148335) {G10,W13,D6,L1,V1,M1} { join( composition( top,
% 67.32/67.71 converse( composition( X, top ) ) ), complement( meet( one, X ) ) ) ==>
% 67.32/67.71 top }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := top
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148337) {G12,W11,D5,L1,V1,M1} { join( composition( top, converse
% 67.32/67.71 ( X ) ), complement( meet( one, X ) ) ) ==> top }.
% 67.32/67.71 parent0[0]: (1507) {G16,W5,D3,L1,V0,M1} P(1499,756);d(744) { composition(
% 67.32/67.71 top, top ) ==> top }.
% 67.32/67.71 parent1[0; 3]: (148336) {G11,W13,D5,L1,V1,M1} { join( composition(
% 67.32/67.71 composition( top, top ), converse( X ) ), complement( meet( one, X ) ) )
% 67.32/67.71 ==> top }.
% 67.32/67.71 substitution0:
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148338) {G12,W11,D5,L1,V1,M1} { join( converse( composition( X,
% 67.32/67.71 top ) ), complement( meet( one, X ) ) ) ==> top }.
% 67.32/67.71 parent0[0]: (225) {G11,W9,D4,L1,V1,M1} P(223,16) { composition( top,
% 67.32/67.71 converse( X ) ) ==> converse( composition( X, top ) ) }.
% 67.32/67.71 parent1[0; 2]: (148337) {G12,W11,D5,L1,V1,M1} { join( composition( top,
% 67.32/67.71 converse( X ) ), complement( meet( one, X ) ) ) ==> top }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (116132) {G41,W11,D5,L1,V1,M1} P(115979,3882);d(214);d(267);d(
% 67.32/67.71 1507);d(225) { join( converse( composition( X, top ) ), complement( meet
% 67.32/67.71 ( one, X ) ) ) ==> top }.
% 67.32/67.71 parent0: (148338) {G12,W11,D5,L1,V1,M1} { join( converse( composition( X,
% 67.32/67.71 top ) ), complement( meet( one, X ) ) ) ==> top }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148341) {G41,W11,D5,L1,V1,M1} { top ==> join( converse(
% 67.32/67.71 composition( X, top ) ), complement( meet( one, X ) ) ) }.
% 67.32/67.71 parent0[0]: (116132) {G41,W11,D5,L1,V1,M1} P(115979,3882);d(214);d(267);d(
% 67.32/67.71 1507);d(225) { join( converse( composition( X, top ) ), complement( meet
% 67.32/67.71 ( one, X ) ) ) ==> top }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148346) {G32,W13,D6,L1,V1,M1} { top ==> join( converse(
% 67.32/67.71 composition( converse( X ), top ) ), complement( converse( meet( one, X )
% 67.32/67.71 ) ) ) }.
% 67.32/67.71 parent0[0]: (12372) {G31,W9,D4,L1,V1,M1} P(12278,756);d(756) { meet( one,
% 67.32/67.71 converse( X ) ) ==> converse( meet( one, X ) ) }.
% 67.32/67.71 parent1[0; 9]: (148341) {G41,W11,D5,L1,V1,M1} { top ==> join( converse(
% 67.32/67.71 composition( X, top ) ), complement( meet( one, X ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := converse( X )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148347) {G29,W12,D6,L1,V1,M1} { top ==> converse( join(
% 67.32/67.71 composition( converse( X ), top ), complement( meet( one, X ) ) ) ) }.
% 67.32/67.71 parent0[0]: (2895) {G28,W12,D5,L1,V2,M1} P(2866,8) { join( converse( Y ),
% 67.32/67.71 complement( converse( X ) ) ) ==> converse( join( Y, complement( X ) ) )
% 67.32/67.71 }.
% 67.32/67.71 parent1[0; 2]: (148346) {G32,W13,D6,L1,V1,M1} { top ==> join( converse(
% 67.32/67.71 composition( converse( X ), top ) ), complement( converse( meet( one, X )
% 67.32/67.71 ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := meet( one, X )
% 67.32/67.71 Y := composition( converse( X ), top )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148348) {G12,W12,D6,L1,V1,M1} { top ==> converse( join( converse
% 67.32/67.71 ( composition( top, X ) ), complement( meet( one, X ) ) ) ) }.
% 67.32/67.71 parent0[0]: (224) {G11,W9,D4,L1,V1,M1} P(223,17) { composition( converse( X
% 67.32/67.71 ), top ) ==> converse( composition( top, X ) ) }.
% 67.32/67.71 parent1[0; 4]: (148347) {G29,W12,D6,L1,V1,M1} { top ==> converse( join(
% 67.32/67.71 composition( converse( X ), top ), complement( meet( one, X ) ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148349) {G2,W11,D6,L1,V1,M1} { top ==> join( composition( top, X
% 67.32/67.71 ), converse( complement( meet( one, X ) ) ) ) }.
% 67.32/67.71 parent0[0]: (19) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 67.32/67.71 ), Y ) ) ==> join( X, converse( Y ) ) }.
% 67.32/67.71 parent1[0; 2]: (148348) {G12,W12,D6,L1,V1,M1} { top ==> converse( join(
% 67.32/67.71 converse( composition( top, X ) ), complement( meet( one, X ) ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := composition( top, X )
% 67.32/67.71 Y := complement( meet( one, X ) )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148350) {G3,W11,D6,L1,V1,M1} { top ==> join( composition( top, X
% 67.32/67.71 ), complement( converse( meet( one, X ) ) ) ) }.
% 67.32/67.71 parent0[0]: (2866) {G27,W7,D4,L1,V1,M1} P(2796,756) { converse( complement
% 67.32/67.71 ( X ) ) ==> complement( converse( X ) ) }.
% 67.32/67.71 parent1[0; 6]: (148349) {G2,W11,D6,L1,V1,M1} { top ==> join( composition(
% 67.32/67.71 top, X ), converse( complement( meet( one, X ) ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := meet( one, X )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148351) {G3,W11,D6,L1,V1,M1} { join( composition( top, X ),
% 67.32/67.71 complement( converse( meet( one, X ) ) ) ) ==> top }.
% 67.32/67.71 parent0[0]: (148350) {G3,W11,D6,L1,V1,M1} { top ==> join( composition( top
% 67.32/67.71 , X ), complement( converse( meet( one, X ) ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (116207) {G42,W11,D6,L1,V1,M1} P(12372,116132);d(2895);d(224);
% 67.32/67.71 d(19);d(2866) { join( composition( top, X ), complement( converse( meet(
% 67.32/67.71 one, X ) ) ) ) ==> top }.
% 67.32/67.71 parent0: (148351) {G3,W11,D6,L1,V1,M1} { join( composition( top, X ),
% 67.32/67.71 complement( converse( meet( one, X ) ) ) ) ==> top }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148353) {G28,W12,D6,L1,V2,M1} { join( converse( X ), complement(
% 67.32/67.71 Y ) ) ==> converse( join( X, complement( converse( Y ) ) ) ) }.
% 67.32/67.71 parent0[0]: (2889) {G28,W12,D6,L1,V2,M1} P(2866,20) { converse( join( Y,
% 67.32/67.71 complement( converse( X ) ) ) ) ==> join( converse( Y ), complement( X )
% 67.32/67.71 ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148355) {G29,W12,D5,L1,V1,M1} { join( converse( composition( top
% 67.32/67.71 , X ) ), complement( meet( one, X ) ) ) ==> converse( top ) }.
% 67.32/67.71 parent0[0]: (116207) {G42,W11,D6,L1,V1,M1} P(12372,116132);d(2895);d(224);d
% 67.32/67.71 (19);d(2866) { join( composition( top, X ), complement( converse( meet(
% 67.32/67.71 one, X ) ) ) ) ==> top }.
% 67.32/67.71 parent1[0; 11]: (148353) {G28,W12,D6,L1,V2,M1} { join( converse( X ),
% 67.32/67.71 complement( Y ) ) ==> converse( join( X, complement( converse( Y ) ) ) )
% 67.32/67.71 }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := composition( top, X )
% 67.32/67.71 Y := meet( one, X )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148356) {G11,W11,D5,L1,V1,M1} { join( converse( composition( top
% 67.32/67.71 , X ) ), complement( meet( one, X ) ) ) ==> top }.
% 67.32/67.71 parent0[0]: (223) {G10,W4,D3,L1,V0,M1} P(214,59) { converse( top ) ==> top
% 67.32/67.71 }.
% 67.32/67.71 parent1[0; 10]: (148355) {G29,W12,D5,L1,V1,M1} { join( converse(
% 67.32/67.71 composition( top, X ) ), complement( meet( one, X ) ) ) ==> converse( top
% 67.32/67.71 ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (116360) {G43,W11,D5,L1,V1,M1} P(116207,2889);d(223) { join(
% 67.32/67.71 converse( composition( top, X ) ), complement( meet( one, X ) ) ) ==> top
% 67.32/67.71 }.
% 67.32/67.71 parent0: (148356) {G11,W11,D5,L1,V1,M1} { join( converse( composition( top
% 67.32/67.71 , X ) ), complement( meet( one, X ) ) ) ==> top }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148358) {G43,W11,D5,L1,V1,M1} { top ==> join( converse(
% 67.32/67.71 composition( top, X ) ), complement( meet( one, X ) ) ) }.
% 67.32/67.71 parent0[0]: (116360) {G43,W11,D5,L1,V1,M1} P(116207,2889);d(223) { join(
% 67.32/67.71 converse( composition( top, X ) ), complement( meet( one, X ) ) ) ==> top
% 67.32/67.71 }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148359) {G18,W11,D5,L1,V1,M1} { top ==> join( converse(
% 67.32/67.71 composition( top, X ) ), complement( meet( X, one ) ) ) }.
% 67.32/67.71 parent0[0]: (972) {G17,W9,D4,L1,V2,M1} P(773,0);d(773) { complement( meet(
% 67.32/67.71 X, Y ) ) = complement( meet( Y, X ) ) }.
% 67.32/67.71 parent1[0; 7]: (148358) {G43,W11,D5,L1,V1,M1} { top ==> join( converse(
% 67.32/67.71 composition( top, X ) ), complement( meet( one, X ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := one
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148362) {G18,W11,D5,L1,V1,M1} { join( converse( composition( top
% 67.32/67.71 , X ) ), complement( meet( X, one ) ) ) ==> top }.
% 67.32/67.71 parent0[0]: (148359) {G18,W11,D5,L1,V1,M1} { top ==> join( converse(
% 67.32/67.71 composition( top, X ) ), complement( meet( X, one ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (116459) {G44,W11,D5,L1,V1,M1} P(972,116360) { join( converse
% 67.32/67.71 ( composition( top, X ) ), complement( meet( X, one ) ) ) ==> top }.
% 67.32/67.71 parent0: (148362) {G18,W11,D5,L1,V1,M1} { join( converse( composition( top
% 67.32/67.71 , X ) ), complement( meet( X, one ) ) ) ==> top }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148364) {G44,W11,D5,L1,V1,M1} { top ==> join( converse(
% 67.32/67.71 composition( top, X ) ), complement( meet( X, one ) ) ) }.
% 67.32/67.71 parent0[0]: (116459) {G44,W11,D5,L1,V1,M1} P(972,116360) { join( converse(
% 67.32/67.71 composition( top, X ) ), complement( meet( X, one ) ) ) ==> top }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148368) {G29,W14,D7,L1,V1,M1} { top ==> join( composition(
% 67.32/67.71 complement( X ), converse( top ) ), complement( meet( complement(
% 67.32/67.71 converse( X ) ), one ) ) ) }.
% 67.32/67.71 parent0[0]: (2891) {G28,W12,D6,L1,V2,M1} P(2866,16) { converse( composition
% 67.32/67.71 ( Y, complement( converse( X ) ) ) ) ==> composition( complement( X ),
% 67.32/67.71 converse( Y ) ) }.
% 67.32/67.71 parent1[0; 3]: (148364) {G44,W11,D5,L1,V1,M1} { top ==> join( converse(
% 67.32/67.71 composition( top, X ) ), complement( meet( X, one ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := top
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := complement( converse( X ) )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148369) {G11,W13,D7,L1,V1,M1} { top ==> join( composition(
% 67.32/67.71 complement( X ), top ), complement( meet( complement( converse( X ) ),
% 67.32/67.71 one ) ) ) }.
% 67.32/67.71 parent0[0]: (223) {G10,W4,D3,L1,V0,M1} P(214,59) { converse( top ) ==> top
% 67.32/67.71 }.
% 67.32/67.71 parent1[0; 6]: (148368) {G29,W14,D7,L1,V1,M1} { top ==> join( composition
% 67.32/67.71 ( complement( X ), converse( top ) ), complement( meet( complement(
% 67.32/67.71 converse( X ) ), one ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148370) {G12,W12,D5,L1,V1,M1} { top ==> join( composition(
% 67.32/67.71 complement( X ), top ), join( converse( X ), complement( one ) ) ) }.
% 67.32/67.71 parent0[0]: (950) {G17,W10,D5,L1,V2,M1} P(756,773) { complement( meet(
% 67.32/67.71 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 67.32/67.71 parent1[0; 7]: (148369) {G11,W13,D7,L1,V1,M1} { top ==> join( composition
% 67.32/67.71 ( complement( X ), top ), complement( meet( complement( converse( X ) ),
% 67.32/67.71 one ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := converse( X )
% 67.32/67.71 Y := one
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148371) {G1,W12,D6,L1,V1,M1} { top ==> join( join( composition(
% 67.32/67.71 complement( X ), top ), converse( X ) ), complement( one ) ) }.
% 67.32/67.71 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 67.32/67.71 join( X, Y ), Z ) }.
% 67.32/67.71 parent1[0; 2]: (148370) {G12,W12,D5,L1,V1,M1} { top ==> join( composition
% 67.32/67.71 ( complement( X ), top ), join( converse( X ), complement( one ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := composition( complement( X ), top )
% 67.32/67.71 Y := converse( X )
% 67.32/67.71 Z := complement( one )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148372) {G1,W12,D6,L1,V1,M1} { join( join( composition(
% 67.32/67.71 complement( X ), top ), converse( X ) ), complement( one ) ) ==> top }.
% 67.32/67.71 parent0[0]: (148371) {G1,W12,D6,L1,V1,M1} { top ==> join( join(
% 67.32/67.71 composition( complement( X ), top ), converse( X ) ), complement( one ) )
% 67.32/67.71 }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (116495) {G45,W12,D6,L1,V1,M1} P(2891,116459);d(223);d(950);d(
% 67.32/67.71 1) { join( join( composition( complement( X ), top ), converse( X ) ),
% 67.32/67.71 complement( one ) ) ==> top }.
% 67.32/67.71 parent0: (148372) {G1,W12,D6,L1,V1,M1} { join( join( composition(
% 67.32/67.71 complement( X ), top ), converse( X ) ), complement( one ) ) ==> top }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148374) {G45,W12,D6,L1,V1,M1} { top ==> join( join( composition(
% 67.32/67.71 complement( X ), top ), converse( X ) ), complement( one ) ) }.
% 67.32/67.71 parent0[0]: (116495) {G45,W12,D6,L1,V1,M1} P(2891,116459);d(223);d(950);d(1
% 67.32/67.71 ) { join( join( composition( complement( X ), top ), converse( X ) ),
% 67.32/67.71 complement( one ) ) ==> top }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148380) {G30,W18,D9,L1,V1,M1} { top ==> join( join( join(
% 67.32/67.71 composition( complement( join( complement( one ), X ) ), top ),
% 67.32/67.71 complement( one ) ), converse( X ) ), complement( one ) ) }.
% 67.32/67.71 parent0[0]: (1940) {G29,W15,D6,L1,V2,M1} P(1925,26) { join( X, converse(
% 67.32/67.71 join( complement( one ), Y ) ) ) ==> join( join( X, complement( one ) ),
% 67.32/67.71 converse( Y ) ) }.
% 67.32/67.71 parent1[0; 3]: (148374) {G45,W12,D6,L1,V1,M1} { top ==> join( join(
% 67.32/67.71 composition( complement( X ), top ), converse( X ) ), complement( one ) )
% 67.32/67.71 }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := composition( complement( join( complement( one ), X ) ), top )
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := join( complement( one ), X )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148381) {G19,W15,D8,L1,V1,M1} { top ==> join( join( composition
% 67.32/67.71 ( complement( join( complement( one ), X ) ), top ), complement( one ) )
% 67.32/67.71 , converse( X ) ) }.
% 67.32/67.71 parent0[0]: (848) {G18,W13,D5,L1,V3,M1} P(774,30) { join( join( join( X, Y
% 67.32/67.71 ), Z ), Y ) ==> join( join( X, Y ), Z ) }.
% 67.32/67.71 parent1[0; 2]: (148380) {G30,W18,D9,L1,V1,M1} { top ==> join( join( join(
% 67.32/67.71 composition( complement( join( complement( one ), X ) ), top ),
% 67.32/67.71 complement( one ) ), converse( X ) ), complement( one ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := composition( complement( join( complement( one ), X ) ), top )
% 67.32/67.71 Y := complement( one )
% 67.32/67.71 Z := converse( X )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148382) {G17,W14,D7,L1,V1,M1} { top ==> join( join( composition
% 67.32/67.71 ( meet( one, complement( X ) ), top ), complement( one ) ), converse( X )
% 67.32/67.71 ) }.
% 67.32/67.71 parent0[0]: (772) {G16,W10,D5,L1,V2,M1} P(756,3) { complement( join(
% 67.32/67.71 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 67.32/67.71 parent1[0; 5]: (148381) {G19,W15,D8,L1,V1,M1} { top ==> join( join(
% 67.32/67.71 composition( complement( join( complement( one ), X ) ), top ),
% 67.32/67.71 complement( one ) ), converse( X ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := one
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148383) {G18,W10,D5,L1,V1,M1} { top ==> join( join( complement(
% 67.32/67.71 X ), complement( one ) ), converse( X ) ) }.
% 67.32/67.71 parent0[0]: (115728) {G29,W13,D5,L1,V1,M1} P(5440,4327);d(2464) { join(
% 67.32/67.71 composition( meet( one, X ), top ), complement( one ) ) ==> join( X,
% 67.32/67.71 complement( one ) ) }.
% 67.32/67.71 parent1[0; 3]: (148382) {G17,W14,D7,L1,V1,M1} { top ==> join( join(
% 67.32/67.71 composition( meet( one, complement( X ) ), top ), complement( one ) ),
% 67.32/67.71 converse( X ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := complement( X )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148384) {G17,W9,D5,L1,V1,M1} { top ==> join( complement( meet( X
% 67.32/67.71 , one ) ), converse( X ) ) }.
% 67.32/67.71 parent0[0]: (773) {G16,W10,D4,L1,V2,M1} P(3,756) { join( complement( X ),
% 67.32/67.71 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 67.32/67.71 parent1[0; 3]: (148383) {G18,W10,D5,L1,V1,M1} { top ==> join( join(
% 67.32/67.71 complement( X ), complement( one ) ), converse( X ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := one
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148385) {G17,W9,D5,L1,V1,M1} { join( complement( meet( X, one ) )
% 67.32/67.71 , converse( X ) ) ==> top }.
% 67.32/67.71 parent0[0]: (148384) {G17,W9,D5,L1,V1,M1} { top ==> join( complement( meet
% 67.32/67.71 ( X, one ) ), converse( X ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (130123) {G46,W9,D5,L1,V1,M1} P(1940,116495);d(848);d(772);d(
% 67.32/67.71 115728);d(773) { join( complement( meet( X, one ) ), converse( X ) ) ==>
% 67.32/67.71 top }.
% 67.32/67.71 parent0: (148385) {G17,W9,D5,L1,V1,M1} { join( complement( meet( X, one )
% 67.32/67.71 ), converse( X ) ) ==> top }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148387) {G24,W11,D5,L1,V2,M1} { join( complement( Y ), X ) ==>
% 67.32/67.71 join( X, complement( join( Y, X ) ) ) }.
% 67.32/67.71 parent0[0]: (2730) {G24,W11,D5,L1,V2,M1} P(308,2554);d(747);d(966);d(1032)
% 67.32/67.71 { join( X, complement( join( Y, X ) ) ) ==> join( complement( Y ), X )
% 67.32/67.71 }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148392) {G25,W14,D6,L1,V1,M1} { join( complement( complement(
% 67.32/67.71 meet( X, one ) ) ), converse( X ) ) ==> join( converse( X ), complement(
% 67.32/67.71 top ) ) }.
% 67.32/67.71 parent0[0]: (130123) {G46,W9,D5,L1,V1,M1} P(1940,116495);d(848);d(772);d(
% 67.32/67.71 115728);d(773) { join( complement( meet( X, one ) ), converse( X ) ) ==>
% 67.32/67.71 top }.
% 67.32/67.71 parent1[0; 13]: (148387) {G24,W11,D5,L1,V2,M1} { join( complement( Y ), X
% 67.32/67.71 ) ==> join( X, complement( join( Y, X ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := converse( X )
% 67.32/67.71 Y := complement( meet( X, one ) )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148393) {G2,W13,D6,L1,V1,M1} { join( complement( complement(
% 67.32/67.71 meet( X, one ) ) ), converse( X ) ) ==> join( converse( X ), zero ) }.
% 67.32/67.71 parent0[0]: (77) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 67.32/67.71 zero }.
% 67.32/67.71 parent1[0; 12]: (148392) {G25,W14,D6,L1,V1,M1} { join( complement(
% 67.32/67.71 complement( meet( X, one ) ) ), converse( X ) ) ==> join( converse( X ),
% 67.32/67.71 complement( top ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148394) {G3,W11,D6,L1,V1,M1} { join( complement( complement(
% 67.32/67.71 meet( X, one ) ) ), converse( X ) ) ==> converse( X ) }.
% 67.32/67.71 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.32/67.71 }.
% 67.32/67.71 parent1[0; 9]: (148393) {G2,W13,D6,L1,V1,M1} { join( complement(
% 67.32/67.71 complement( meet( X, one ) ) ), converse( X ) ) ==> join( converse( X ),
% 67.32/67.71 zero ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := converse( X )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148395) {G4,W9,D4,L1,V1,M1} { join( meet( X, one ), converse( X
% 67.32/67.71 ) ) ==> converse( X ) }.
% 67.32/67.71 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.32/67.71 complement( X ) ) ==> X }.
% 67.32/67.71 parent1[0; 2]: (148394) {G3,W11,D6,L1,V1,M1} { join( complement(
% 67.32/67.71 complement( meet( X, one ) ) ), converse( X ) ) ==> converse( X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := meet( X, one )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (130236) {G47,W9,D4,L1,V1,M1} P(130123,2730);d(77);d(740);d(
% 67.32/67.71 756) { join( meet( X, one ), converse( X ) ) ==> converse( X ) }.
% 67.32/67.71 parent0: (148395) {G4,W9,D4,L1,V1,M1} { join( meet( X, one ), converse( X
% 67.32/67.71 ) ) ==> converse( X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148398) {G47,W9,D4,L1,V1,M1} { converse( X ) ==> join( meet( X,
% 67.32/67.71 one ), converse( X ) ) }.
% 67.32/67.71 parent0[0]: (130236) {G47,W9,D4,L1,V1,M1} P(130123,2730);d(77);d(740);d(756
% 67.32/67.71 ) { join( meet( X, one ), converse( X ) ) ==> converse( X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148400) {G25,W19,D6,L1,V1,M1} { converse( composition( meet( X,
% 67.32/67.71 one ), one ) ) ==> join( composition( meet( X, one ), one ), converse(
% 67.32/67.71 composition( meet( X, one ), one ) ) ) }.
% 67.32/67.71 parent0[0]: (4354) {G24,W13,D5,L1,V2,M1} P(3625,1025) { meet( composition(
% 67.32/67.71 meet( X, one ), Y ), Y ) ==> composition( meet( X, one ), Y ) }.
% 67.32/67.71 parent1[0; 8]: (148398) {G47,W9,D4,L1,V1,M1} { converse( X ) ==> join(
% 67.32/67.71 meet( X, one ), converse( X ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := one
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := composition( meet( X, one ), one )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148403) {G1,W17,D5,L1,V1,M1} { converse( composition( meet( X,
% 67.32/67.71 one ), one ) ) ==> join( composition( meet( X, one ), one ), converse(
% 67.32/67.71 meet( X, one ) ) ) }.
% 67.32/67.71 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 67.32/67.71 parent1[0; 14]: (148400) {G25,W19,D6,L1,V1,M1} { converse( composition(
% 67.32/67.71 meet( X, one ), one ) ) ==> join( composition( meet( X, one ), one ),
% 67.32/67.71 converse( composition( meet( X, one ), one ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := meet( X, one )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148405) {G1,W15,D5,L1,V1,M1} { converse( composition( meet( X,
% 67.32/67.71 one ), one ) ) ==> join( meet( X, one ), converse( meet( X, one ) ) ) }.
% 67.32/67.71 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 67.32/67.71 parent1[0; 8]: (148403) {G1,W17,D5,L1,V1,M1} { converse( composition( meet
% 67.32/67.71 ( X, one ), one ) ) ==> join( composition( meet( X, one ), one ),
% 67.32/67.71 converse( meet( X, one ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := meet( X, one )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148406) {G1,W13,D5,L1,V1,M1} { converse( meet( X, one ) ) ==>
% 67.32/67.71 join( meet( X, one ), converse( meet( X, one ) ) ) }.
% 67.32/67.71 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 67.32/67.71 parent1[0; 2]: (148405) {G1,W15,D5,L1,V1,M1} { converse( composition( meet
% 67.32/67.71 ( X, one ), one ) ) ==> join( meet( X, one ), converse( meet( X, one ) )
% 67.32/67.71 ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := meet( X, one )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148412) {G1,W13,D5,L1,V1,M1} { join( meet( X, one ), converse(
% 67.32/67.71 meet( X, one ) ) ) ==> converse( meet( X, one ) ) }.
% 67.32/67.71 parent0[0]: (148406) {G1,W13,D5,L1,V1,M1} { converse( meet( X, one ) ) ==>
% 67.32/67.71 join( meet( X, one ), converse( meet( X, one ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (130266) {G48,W13,D5,L1,V1,M1} P(4354,130236);d(5) { join(
% 67.32/67.71 meet( X, one ), converse( meet( X, one ) ) ) ==> converse( meet( X, one )
% 67.32/67.71 ) }.
% 67.32/67.71 parent0: (148412) {G1,W13,D5,L1,V1,M1} { join( meet( X, one ), converse(
% 67.32/67.71 meet( X, one ) ) ) ==> converse( meet( X, one ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148416) {G47,W9,D4,L1,V1,M1} { converse( X ) ==> join( meet( X,
% 67.32/67.71 one ), converse( X ) ) }.
% 67.32/67.71 parent0[0]: (130236) {G47,W9,D4,L1,V1,M1} P(130123,2730);d(77);d(740);d(756
% 67.32/67.71 ) { join( meet( X, one ), converse( X ) ) ==> converse( X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148418) {G23,W19,D6,L1,V1,M1} { converse( composition( meet( one
% 67.32/67.71 , X ), one ) ) ==> join( composition( meet( one, X ), one ), converse(
% 67.32/67.71 composition( meet( one, X ), one ) ) ) }.
% 67.32/67.71 parent0[0]: (4323) {G22,W13,D5,L1,V2,M1} P(3624,1025) { meet( composition(
% 67.32/67.71 meet( one, X ), Y ), Y ) ==> composition( meet( one, X ), Y ) }.
% 67.32/67.71 parent1[0; 8]: (148416) {G47,W9,D4,L1,V1,M1} { converse( X ) ==> join(
% 67.32/67.71 meet( X, one ), converse( X ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := one
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := composition( meet( one, X ), one )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148421) {G1,W17,D5,L1,V1,M1} { converse( composition( meet( one
% 67.32/67.71 , X ), one ) ) ==> join( composition( meet( one, X ), one ), converse(
% 67.32/67.71 meet( one, X ) ) ) }.
% 67.32/67.71 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 67.32/67.71 parent1[0; 14]: (148418) {G23,W19,D6,L1,V1,M1} { converse( composition(
% 67.32/67.71 meet( one, X ), one ) ) ==> join( composition( meet( one, X ), one ),
% 67.32/67.71 converse( composition( meet( one, X ), one ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := meet( one, X )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148423) {G1,W15,D5,L1,V1,M1} { converse( composition( meet( one
% 67.32/67.71 , X ), one ) ) ==> join( meet( one, X ), converse( meet( one, X ) ) ) }.
% 67.32/67.71 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 67.32/67.71 parent1[0; 8]: (148421) {G1,W17,D5,L1,V1,M1} { converse( composition( meet
% 67.32/67.71 ( one, X ), one ) ) ==> join( composition( meet( one, X ), one ),
% 67.32/67.71 converse( meet( one, X ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := meet( one, X )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148424) {G1,W13,D5,L1,V1,M1} { converse( meet( one, X ) ) ==>
% 67.32/67.71 join( meet( one, X ), converse( meet( one, X ) ) ) }.
% 67.32/67.71 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 67.32/67.71 parent1[0; 2]: (148423) {G1,W15,D5,L1,V1,M1} { converse( composition( meet
% 67.32/67.71 ( one, X ), one ) ) ==> join( meet( one, X ), converse( meet( one, X ) )
% 67.32/67.71 ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := meet( one, X )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148430) {G1,W13,D5,L1,V1,M1} { join( meet( one, X ), converse(
% 67.32/67.71 meet( one, X ) ) ) ==> converse( meet( one, X ) ) }.
% 67.32/67.71 parent0[0]: (148424) {G1,W13,D5,L1,V1,M1} { converse( meet( one, X ) ) ==>
% 67.32/67.71 join( meet( one, X ), converse( meet( one, X ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (130268) {G48,W13,D5,L1,V1,M1} P(4323,130236);d(5) { join(
% 67.32/67.71 meet( one, X ), converse( meet( one, X ) ) ) ==> converse( meet( one, X )
% 67.32/67.71 ) }.
% 67.32/67.71 parent0: (148430) {G1,W13,D5,L1,V1,M1} { join( meet( one, X ), converse(
% 67.32/67.71 meet( one, X ) ) ) ==> converse( meet( one, X ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148441) {G29,W11,D5,L1,V1,M1} { converse( join( meet( one, X ),
% 67.32/67.71 converse( X ) ) ) = converse( converse( X ) ) }.
% 67.32/67.71 parent0[0]: (130236) {G47,W9,D4,L1,V1,M1} P(130123,2730);d(77);d(740);d(756
% 67.32/67.71 ) { join( meet( X, one ), converse( X ) ) ==> converse( X ) }.
% 67.32/67.71 parent1[0; 9]: (2918) {G28,W13,D5,L1,V3,M1} P(2855,8);d(8) { converse( join
% 67.32/67.71 ( meet( Y, X ), Z ) ) = converse( join( meet( X, Y ), Z ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := one
% 67.32/67.71 Z := converse( X )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148442) {G1,W9,D5,L1,V1,M1} { converse( join( meet( one, X ),
% 67.32/67.71 converse( X ) ) ) = X }.
% 67.32/67.71 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.32/67.71 parent1[0; 8]: (148441) {G29,W11,D5,L1,V1,M1} { converse( join( meet( one
% 67.32/67.71 , X ), converse( X ) ) ) = converse( converse( X ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148443) {G2,W8,D5,L1,V1,M1} { join( converse( meet( one, X ) ),
% 67.32/67.71 X ) = X }.
% 67.32/67.71 parent0[0]: (20) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 67.32/67.71 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 67.32/67.71 parent1[0; 1]: (148442) {G1,W9,D5,L1,V1,M1} { converse( join( meet( one, X
% 67.32/67.71 ), converse( X ) ) ) = X }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := meet( one, X )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (130334) {G48,W8,D5,L1,V1,M1} P(130236,2918);d(7);d(20) { join
% 67.32/67.71 ( converse( meet( one, X ) ), X ) ==> X }.
% 67.32/67.71 parent0: (148443) {G2,W8,D5,L1,V1,M1} { join( converse( meet( one, X ) ),
% 67.32/67.71 X ) = X }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148446) {G18,W14,D6,L1,V4,M1} { top ==> join( join( join( meet( X
% 67.32/67.71 , Y ), Z ), T ), complement( meet( Y, X ) ) ) }.
% 67.32/67.71 parent0[0]: (987) {G18,W14,D6,L1,V4,M1} P(972,599) { join( join( join( meet
% 67.32/67.71 ( X, Y ), Z ), T ), complement( meet( Y, X ) ) ) ==> top }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 Z := Z
% 67.32/67.71 T := T
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148447) {G19,W11,D5,L1,V2,M1} { top ==> join( join( converse( X
% 67.32/67.71 ), Y ), complement( meet( one, X ) ) ) }.
% 67.32/67.71 parent0[0]: (130236) {G47,W9,D4,L1,V1,M1} P(130123,2730);d(77);d(740);d(756
% 67.32/67.71 ) { join( meet( X, one ), converse( X ) ) ==> converse( X ) }.
% 67.32/67.71 parent1[0; 4]: (148446) {G18,W14,D6,L1,V4,M1} { top ==> join( join( join(
% 67.32/67.71 meet( X, Y ), Z ), T ), complement( meet( Y, X ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := one
% 67.32/67.71 Z := converse( X )
% 67.32/67.71 T := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148448) {G19,W11,D5,L1,V2,M1} { join( join( converse( X ), Y ),
% 67.32/67.71 complement( meet( one, X ) ) ) ==> top }.
% 67.32/67.71 parent0[0]: (148447) {G19,W11,D5,L1,V2,M1} { top ==> join( join( converse
% 67.32/67.71 ( X ), Y ), complement( meet( one, X ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (130452) {G48,W11,D5,L1,V2,M1} P(130236,987) { join( join(
% 67.32/67.71 converse( X ), Y ), complement( meet( one, X ) ) ) ==> top }.
% 67.32/67.71 parent0: (148448) {G19,W11,D5,L1,V2,M1} { join( join( converse( X ), Y ),
% 67.32/67.71 complement( meet( one, X ) ) ) ==> top }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148450) {G31,W15,D7,L1,V2,M1} { join( Y, X ) ==> join( join( X, Y
% 67.32/67.71 ), complement( composition( complement( join( Y, X ) ), top ) ) ) }.
% 67.32/67.71 parent0[0]: (4558) {G31,W15,D7,L1,V2,M1} P(3735,221) { join( join( Y, X ),
% 67.32/67.71 complement( composition( complement( join( X, Y ) ), top ) ) ) ==> join(
% 67.32/67.71 X, Y ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148453) {G32,W19,D6,L1,V1,M1} { join( converse( meet( one, X ) )
% 67.32/67.71 , X ) ==> join( join( X, converse( meet( one, X ) ) ), complement(
% 67.32/67.71 composition( complement( X ), top ) ) ) }.
% 67.32/67.71 parent0[0]: (130334) {G48,W8,D5,L1,V1,M1} P(130236,2918);d(7);d(20) { join
% 67.32/67.71 ( converse( meet( one, X ) ), X ) ==> X }.
% 67.32/67.71 parent1[0; 17]: (148450) {G31,W15,D7,L1,V2,M1} { join( Y, X ) ==> join(
% 67.32/67.71 join( X, Y ), complement( composition( complement( join( Y, X ) ), top )
% 67.32/67.71 ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := converse( meet( one, X ) )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148455) {G33,W14,D6,L1,V1,M1} { X ==> join( join( X, converse(
% 67.32/67.71 meet( one, X ) ) ), complement( composition( complement( X ), top ) ) )
% 67.32/67.71 }.
% 67.32/67.71 parent0[0]: (130334) {G48,W8,D5,L1,V1,M1} P(130236,2918);d(7);d(20) { join
% 67.32/67.71 ( converse( meet( one, X ) ), X ) ==> X }.
% 67.32/67.71 parent1[0; 1]: (148453) {G32,W19,D6,L1,V1,M1} { join( converse( meet( one
% 67.32/67.71 , X ) ), X ) ==> join( join( X, converse( meet( one, X ) ) ), complement
% 67.32/67.71 ( composition( complement( X ), top ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148458) {G32,W8,D5,L1,V1,M1} { X ==> join( X, converse( meet(
% 67.32/67.71 one, X ) ) ) }.
% 67.32/67.71 parent0[0]: (4555) {G31,W13,D6,L1,V2,M1} P(3734,29) { join( join( X, Y ),
% 67.32/67.71 complement( composition( complement( X ), top ) ) ) ==> join( X, Y ) }.
% 67.32/67.71 parent1[0; 2]: (148455) {G33,W14,D6,L1,V1,M1} { X ==> join( join( X,
% 67.32/67.71 converse( meet( one, X ) ) ), complement( composition( complement( X ),
% 67.32/67.71 top ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := converse( meet( one, X ) )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148459) {G32,W8,D5,L1,V1,M1} { join( X, converse( meet( one, X )
% 67.32/67.71 ) ) ==> X }.
% 67.32/67.71 parent0[0]: (148458) {G32,W8,D5,L1,V1,M1} { X ==> join( X, converse( meet
% 67.32/67.71 ( one, X ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (130516) {G49,W8,D5,L1,V1,M1} P(130334,4558);d(4555) { join( X
% 67.32/67.71 , converse( meet( one, X ) ) ) ==> X }.
% 67.32/67.71 parent0: (148459) {G32,W8,D5,L1,V1,M1} { join( X, converse( meet( one, X )
% 67.32/67.71 ) ) ==> X }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148461) {G49,W8,D5,L1,V1,M1} { X ==> join( X, converse( meet( one
% 67.32/67.71 , X ) ) ) }.
% 67.32/67.71 parent0[0]: (130516) {G49,W8,D5,L1,V1,M1} P(130334,4558);d(4555) { join( X
% 67.32/67.71 , converse( meet( one, X ) ) ) ==> X }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148464) {G25,W18,D6,L1,V1,M1} { composition( meet( X, one ), one
% 67.32/67.71 ) ==> join( composition( meet( X, one ), one ), converse( composition(
% 67.32/67.71 meet( X, one ), one ) ) ) }.
% 67.32/67.71 parent0[0]: (4353) {G24,W13,D5,L1,V2,M1} P(3625,1032) { meet( Y,
% 67.32/67.71 composition( meet( X, one ), Y ) ) ==> composition( meet( X, one ), Y )
% 67.32/67.71 }.
% 67.32/67.71 parent1[0; 13]: (148461) {G49,W8,D5,L1,V1,M1} { X ==> join( X, converse(
% 67.32/67.71 meet( one, X ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := one
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := composition( meet( X, one ), one )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148467) {G1,W16,D5,L1,V1,M1} { composition( meet( X, one ), one
% 67.32/67.71 ) ==> join( composition( meet( X, one ), one ), converse( meet( X, one )
% 67.32/67.71 ) ) }.
% 67.32/67.71 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 67.32/67.71 parent1[0; 13]: (148464) {G25,W18,D6,L1,V1,M1} { composition( meet( X, one
% 67.32/67.71 ), one ) ==> join( composition( meet( X, one ), one ), converse(
% 67.32/67.71 composition( meet( X, one ), one ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := meet( X, one )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148469) {G1,W14,D5,L1,V1,M1} { composition( meet( X, one ), one
% 67.32/67.71 ) ==> join( meet( X, one ), converse( meet( X, one ) ) ) }.
% 67.32/67.71 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 67.32/67.71 parent1[0; 7]: (148467) {G1,W16,D5,L1,V1,M1} { composition( meet( X, one )
% 67.32/67.71 , one ) ==> join( composition( meet( X, one ), one ), converse( meet( X,
% 67.32/67.71 one ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := meet( X, one )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148470) {G1,W12,D5,L1,V1,M1} { meet( X, one ) ==> join( meet( X
% 67.32/67.71 , one ), converse( meet( X, one ) ) ) }.
% 67.32/67.71 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 67.32/67.71 parent1[0; 1]: (148469) {G1,W14,D5,L1,V1,M1} { composition( meet( X, one )
% 67.32/67.71 , one ) ==> join( meet( X, one ), converse( meet( X, one ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := meet( X, one )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148474) {G2,W8,D4,L1,V1,M1} { meet( X, one ) ==> converse( meet
% 67.32/67.71 ( X, one ) ) }.
% 67.32/67.71 parent0[0]: (130266) {G48,W13,D5,L1,V1,M1} P(4354,130236);d(5) { join( meet
% 67.32/67.71 ( X, one ), converse( meet( X, one ) ) ) ==> converse( meet( X, one ) )
% 67.32/67.71 }.
% 67.32/67.71 parent1[0; 4]: (148470) {G1,W12,D5,L1,V1,M1} { meet( X, one ) ==> join(
% 67.32/67.71 meet( X, one ), converse( meet( X, one ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148475) {G2,W8,D4,L1,V1,M1} { converse( meet( X, one ) ) ==> meet
% 67.32/67.71 ( X, one ) }.
% 67.32/67.71 parent0[0]: (148474) {G2,W8,D4,L1,V1,M1} { meet( X, one ) ==> converse(
% 67.32/67.71 meet( X, one ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (130741) {G50,W8,D4,L1,V1,M1} P(4353,130516);d(5);d(130266) {
% 67.32/67.71 converse( meet( X, one ) ) ==> meet( X, one ) }.
% 67.32/67.71 parent0: (148475) {G2,W8,D4,L1,V1,M1} { converse( meet( X, one ) ) ==>
% 67.32/67.71 meet( X, one ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148477) {G49,W8,D5,L1,V1,M1} { X ==> join( X, converse( meet( one
% 67.32/67.71 , X ) ) ) }.
% 67.32/67.71 parent0[0]: (130516) {G49,W8,D5,L1,V1,M1} P(130334,4558);d(4555) { join( X
% 67.32/67.71 , converse( meet( one, X ) ) ) ==> X }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148480) {G23,W18,D6,L1,V1,M1} { composition( meet( one, X ), one
% 67.32/67.71 ) ==> join( composition( meet( one, X ), one ), converse( composition(
% 67.32/67.71 meet( one, X ), one ) ) ) }.
% 67.32/67.71 parent0[0]: (4322) {G22,W13,D5,L1,V2,M1} P(3624,1032) { meet( Y,
% 67.32/67.71 composition( meet( one, X ), Y ) ) ==> composition( meet( one, X ), Y )
% 67.32/67.71 }.
% 67.32/67.71 parent1[0; 13]: (148477) {G49,W8,D5,L1,V1,M1} { X ==> join( X, converse(
% 67.32/67.71 meet( one, X ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := one
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := composition( meet( one, X ), one )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148483) {G1,W16,D5,L1,V1,M1} { composition( meet( one, X ), one
% 67.32/67.71 ) ==> join( composition( meet( one, X ), one ), converse( meet( one, X )
% 67.32/67.71 ) ) }.
% 67.32/67.71 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 67.32/67.71 parent1[0; 13]: (148480) {G23,W18,D6,L1,V1,M1} { composition( meet( one, X
% 67.32/67.71 ), one ) ==> join( composition( meet( one, X ), one ), converse(
% 67.32/67.71 composition( meet( one, X ), one ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := meet( one, X )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148485) {G1,W14,D5,L1,V1,M1} { composition( meet( one, X ), one
% 67.32/67.71 ) ==> join( meet( one, X ), converse( meet( one, X ) ) ) }.
% 67.32/67.71 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 67.32/67.71 parent1[0; 7]: (148483) {G1,W16,D5,L1,V1,M1} { composition( meet( one, X )
% 67.32/67.71 , one ) ==> join( composition( meet( one, X ), one ), converse( meet( one
% 67.32/67.71 , X ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := meet( one, X )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148486) {G1,W12,D5,L1,V1,M1} { meet( one, X ) ==> join( meet(
% 67.32/67.71 one, X ), converse( meet( one, X ) ) ) }.
% 67.32/67.71 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 67.32/67.71 parent1[0; 1]: (148485) {G1,W14,D5,L1,V1,M1} { composition( meet( one, X )
% 67.32/67.71 , one ) ==> join( meet( one, X ), converse( meet( one, X ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := meet( one, X )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148490) {G2,W8,D4,L1,V1,M1} { meet( one, X ) ==> converse( meet
% 67.32/67.71 ( one, X ) ) }.
% 67.32/67.71 parent0[0]: (130268) {G48,W13,D5,L1,V1,M1} P(4323,130236);d(5) { join( meet
% 67.32/67.71 ( one, X ), converse( meet( one, X ) ) ) ==> converse( meet( one, X ) )
% 67.32/67.71 }.
% 67.32/67.71 parent1[0; 4]: (148486) {G1,W12,D5,L1,V1,M1} { meet( one, X ) ==> join(
% 67.32/67.71 meet( one, X ), converse( meet( one, X ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148491) {G2,W8,D4,L1,V1,M1} { converse( meet( one, X ) ) ==> meet
% 67.32/67.71 ( one, X ) }.
% 67.32/67.71 parent0[0]: (148490) {G2,W8,D4,L1,V1,M1} { meet( one, X ) ==> converse(
% 67.32/67.71 meet( one, X ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (130742) {G50,W8,D4,L1,V1,M1} P(4322,130516);d(5);d(130268) {
% 67.32/67.71 converse( meet( one, X ) ) ==> meet( one, X ) }.
% 67.32/67.71 parent0: (148491) {G2,W8,D4,L1,V1,M1} { converse( meet( one, X ) ) ==>
% 67.32/67.71 meet( one, X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148494) {G33,W8,D4,L1,V1,M1} { meet( converse( X ), one ) ==>
% 67.32/67.71 meet( one, X ) }.
% 67.32/67.71 parent0[0]: (130742) {G50,W8,D4,L1,V1,M1} P(4322,130516);d(5);d(130268) {
% 67.32/67.71 converse( meet( one, X ) ) ==> meet( one, X ) }.
% 67.32/67.71 parent1[0; 5]: (12418) {G32,W9,D4,L1,V1,M1} P(12372,75) { meet( converse( X
% 67.32/67.71 ), one ) ==> converse( meet( one, X ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (131159) {G51,W8,D4,L1,V1,M1} S(12418);d(130742) { meet(
% 67.32/67.71 converse( X ), one ) ==> meet( one, X ) }.
% 67.32/67.71 parent0: (148494) {G33,W8,D4,L1,V1,M1} { meet( converse( X ), one ) ==>
% 67.32/67.71 meet( one, X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148498) {G32,W8,D4,L1,V1,M1} { meet( one, converse( X ) ) ==>
% 67.32/67.71 meet( one, X ) }.
% 67.32/67.71 parent0[0]: (130742) {G50,W8,D4,L1,V1,M1} P(4322,130516);d(5);d(130268) {
% 67.32/67.71 converse( meet( one, X ) ) ==> meet( one, X ) }.
% 67.32/67.71 parent1[0; 5]: (12372) {G31,W9,D4,L1,V1,M1} P(12278,756);d(756) { meet( one
% 67.32/67.71 , converse( X ) ) ==> converse( meet( one, X ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (131160) {G51,W8,D4,L1,V1,M1} S(12372);d(130742) { meet( one,
% 67.32/67.71 converse( X ) ) ==> meet( one, X ) }.
% 67.32/67.71 parent0: (148498) {G32,W8,D4,L1,V1,M1} { meet( one, converse( X ) ) ==>
% 67.32/67.71 meet( one, X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148501) {G51,W8,D4,L1,V1,M1} { meet( one, X ) ==> meet( converse
% 67.32/67.71 ( X ), one ) }.
% 67.32/67.71 parent0[0]: (131159) {G51,W8,D4,L1,V1,M1} S(12418);d(130742) { meet(
% 67.32/67.71 converse( X ), one ) ==> meet( one, X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148502) {G2,W13,D5,L1,V2,M1} { meet( one, join( X, converse( Y )
% 67.32/67.71 ) ) ==> meet( join( converse( X ), Y ), one ) }.
% 67.32/67.71 parent0[0]: (20) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 67.32/67.71 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 67.32/67.71 parent1[0; 8]: (148501) {G51,W8,D4,L1,V1,M1} { meet( one, X ) ==> meet(
% 67.32/67.71 converse( X ), one ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := join( X, converse( Y ) )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (131304) {G52,W13,D5,L1,V2,M1} P(20,131159) { meet( one, join
% 67.32/67.71 ( X, converse( Y ) ) ) ==> meet( join( converse( X ), Y ), one ) }.
% 67.32/67.71 parent0: (148502) {G2,W13,D5,L1,V2,M1} { meet( one, join( X, converse( Y )
% 67.32/67.71 ) ) ==> meet( join( converse( X ), Y ), one ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148505) {G51,W8,D4,L1,V1,M1} { meet( one, X ) ==> meet( converse
% 67.32/67.71 ( X ), one ) }.
% 67.32/67.71 parent0[0]: (131159) {G51,W8,D4,L1,V1,M1} S(12418);d(130742) { meet(
% 67.32/67.71 converse( X ), one ) ==> meet( one, X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148506) {G2,W13,D5,L1,V2,M1} { meet( one, join( converse( X ), Y
% 67.32/67.71 ) ) ==> meet( join( X, converse( Y ) ), one ) }.
% 67.32/67.71 parent0[0]: (19) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 67.32/67.71 ), Y ) ) ==> join( X, converse( Y ) ) }.
% 67.32/67.71 parent1[0; 8]: (148505) {G51,W8,D4,L1,V1,M1} { meet( one, X ) ==> meet(
% 67.32/67.71 converse( X ), one ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := join( converse( X ), Y )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (131307) {G52,W13,D5,L1,V2,M1} P(19,131159) { meet( one, join
% 67.32/67.71 ( converse( X ), Y ) ) ==> meet( join( X, converse( Y ) ), one ) }.
% 67.32/67.71 parent0: (148506) {G2,W13,D5,L1,V2,M1} { meet( one, join( converse( X ), Y
% 67.32/67.71 ) ) ==> meet( join( X, converse( Y ) ), one ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148509) {G51,W8,D4,L1,V1,M1} { meet( one, X ) ==> meet( one,
% 67.32/67.71 converse( X ) ) }.
% 67.32/67.71 parent0[0]: (131160) {G51,W8,D4,L1,V1,M1} S(12372);d(130742) { meet( one,
% 67.32/67.71 converse( X ) ) ==> meet( one, X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148512) {G2,W13,D5,L1,V2,M1} { meet( one, join( X, converse( Y )
% 67.32/67.71 ) ) ==> meet( one, join( converse( X ), Y ) ) }.
% 67.32/67.71 parent0[0]: (20) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 67.32/67.71 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 67.32/67.71 parent1[0; 9]: (148509) {G51,W8,D4,L1,V1,M1} { meet( one, X ) ==> meet(
% 67.32/67.71 one, converse( X ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := join( X, converse( Y ) )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148513) {G3,W13,D5,L1,V2,M1} { meet( one, join( X, converse( Y )
% 67.32/67.71 ) ) ==> meet( join( X, converse( Y ) ), one ) }.
% 67.32/67.71 parent0[0]: (131307) {G52,W13,D5,L1,V2,M1} P(19,131159) { meet( one, join(
% 67.32/67.71 converse( X ), Y ) ) ==> meet( join( X, converse( Y ) ), one ) }.
% 67.32/67.71 parent1[0; 7]: (148512) {G2,W13,D5,L1,V2,M1} { meet( one, join( X,
% 67.32/67.71 converse( Y ) ) ) ==> meet( one, join( converse( X ), Y ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148514) {G4,W13,D5,L1,V2,M1} { meet( join( converse( X ), Y ),
% 67.32/67.71 one ) ==> meet( join( X, converse( Y ) ), one ) }.
% 67.32/67.71 parent0[0]: (131304) {G52,W13,D5,L1,V2,M1} P(20,131159) { meet( one, join(
% 67.32/67.71 X, converse( Y ) ) ) ==> meet( join( converse( X ), Y ), one ) }.
% 67.32/67.71 parent1[0; 1]: (148513) {G3,W13,D5,L1,V2,M1} { meet( one, join( X,
% 67.32/67.71 converse( Y ) ) ) ==> meet( join( X, converse( Y ) ), one ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148515) {G4,W13,D5,L1,V2,M1} { meet( join( X, converse( Y ) ),
% 67.32/67.71 one ) ==> meet( join( converse( X ), Y ), one ) }.
% 67.32/67.71 parent0[0]: (148514) {G4,W13,D5,L1,V2,M1} { meet( join( converse( X ), Y )
% 67.32/67.71 , one ) ==> meet( join( X, converse( Y ) ), one ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (131312) {G53,W13,D5,L1,V2,M1} P(20,131160);d(131307);d(131304
% 67.32/67.71 ) { meet( join( X, converse( Y ) ), one ) ==> meet( join( converse( X ),
% 67.32/67.71 Y ), one ) }.
% 67.32/67.71 parent0: (148515) {G4,W13,D5,L1,V2,M1} { meet( join( X, converse( Y ) ),
% 67.32/67.71 one ) ==> meet( join( converse( X ), Y ), one ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148517) {G27,W11,D4,L1,V2,M1} { meet( X, complement( Y ) ) ==>
% 67.32/67.71 meet( join( X, Y ), complement( Y ) ) }.
% 67.32/67.71 parent0[0]: (10143) {G27,W11,D4,L1,V2,M1} P(756,10123) { meet( join( Y, X )
% 67.32/67.71 , complement( X ) ) ==> meet( Y, complement( X ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148521) {G28,W18,D6,L1,V2,M1} { meet( join( converse( X ), Y ),
% 67.32/67.71 complement( complement( meet( one, X ) ) ) ) ==> meet( top, complement(
% 67.32/67.71 complement( meet( one, X ) ) ) ) }.
% 67.32/67.71 parent0[0]: (130452) {G48,W11,D5,L1,V2,M1} P(130236,987) { join( join(
% 67.32/67.71 converse( X ), Y ), complement( meet( one, X ) ) ) ==> top }.
% 67.32/67.71 parent1[0; 12]: (148517) {G27,W11,D4,L1,V2,M1} { meet( X, complement( Y )
% 67.32/67.71 ) ==> meet( join( X, Y ), complement( Y ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := join( converse( X ), Y )
% 67.32/67.71 Y := complement( meet( one, X ) )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148522) {G13,W16,D6,L1,V2,M1} { meet( join( converse( X ), Y ),
% 67.32/67.71 complement( complement( meet( one, X ) ) ) ) ==> complement( complement(
% 67.32/67.71 meet( one, X ) ) ) }.
% 67.32/67.71 parent0[0]: (747) {G12,W5,D3,L1,V1,M1} P(75,715);d(740) { meet( top, X )
% 67.32/67.71 ==> X }.
% 67.32/67.71 parent1[0; 11]: (148521) {G28,W18,D6,L1,V2,M1} { meet( join( converse( X )
% 67.32/67.71 , Y ), complement( complement( meet( one, X ) ) ) ) ==> meet( top,
% 67.32/67.71 complement( complement( meet( one, X ) ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := complement( complement( meet( one, X ) ) )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148524) {G14,W14,D6,L1,V2,M1} { meet( join( converse( X ), Y ),
% 67.32/67.71 complement( complement( meet( one, X ) ) ) ) ==> meet( one, X ) }.
% 67.32/67.71 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.32/67.71 complement( X ) ) ==> X }.
% 67.32/67.71 parent1[0; 11]: (148522) {G13,W16,D6,L1,V2,M1} { meet( join( converse( X )
% 67.32/67.71 , Y ), complement( complement( meet( one, X ) ) ) ) ==> complement(
% 67.32/67.71 complement( meet( one, X ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := meet( one, X )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148525) {G15,W12,D5,L1,V2,M1} { meet( join( converse( X ), Y ),
% 67.32/67.71 meet( one, X ) ) ==> meet( one, X ) }.
% 67.32/67.71 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.32/67.71 complement( X ) ) ==> X }.
% 67.32/67.71 parent1[0; 6]: (148524) {G14,W14,D6,L1,V2,M1} { meet( join( converse( X )
% 67.32/67.71 , Y ), complement( complement( meet( one, X ) ) ) ) ==> meet( one, X )
% 67.32/67.71 }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := meet( one, X )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148526) {G16,W12,D6,L1,V2,M1} { meet( meet( join( converse( X )
% 67.32/67.71 , Y ), one ), X ) ==> meet( one, X ) }.
% 67.32/67.71 parent0[0]: (64458) {G33,W11,D4,L1,V3,M1} P(10127,63585);d(64457) { meet( Y
% 67.32/67.71 , meet( X, Z ) ) ==> meet( meet( Y, X ), Z ) }.
% 67.32/67.71 parent1[0; 1]: (148525) {G15,W12,D5,L1,V2,M1} { meet( join( converse( X )
% 67.32/67.71 , Y ), meet( one, X ) ) ==> meet( one, X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := one
% 67.32/67.71 Y := join( converse( X ), Y )
% 67.32/67.71 Z := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (133490) {G49,W12,D6,L1,V2,M1} P(130452,10143);d(747);d(756);d
% 67.32/67.71 (64458) { meet( meet( join( converse( X ), Y ), one ), X ) ==> meet( one
% 67.32/67.71 , X ) }.
% 67.32/67.71 parent0: (148526) {G16,W12,D6,L1,V2,M1} { meet( meet( join( converse( X )
% 67.32/67.71 , Y ), one ), X ) ==> meet( one, X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148529) {G30,W12,D6,L1,V2,M1} { composition( X, Y ) ==>
% 67.32/67.71 composition( meet( X, converse( composition( Y, top ) ) ), Y ) }.
% 67.32/67.71 parent0[0]: (82543) {G30,W12,D6,L1,V2,M1} P(2429,2971);d(2972) {
% 67.32/67.71 composition( meet( Y, converse( composition( X, top ) ) ), X ) ==>
% 67.32/67.71 composition( Y, X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148533) {G31,W20,D8,L1,V2,M1} { composition( meet( join(
% 67.32/67.71 converse( converse( composition( X, top ) ) ), Y ), one ), X ) ==>
% 67.32/67.71 composition( meet( one, converse( composition( X, top ) ) ), X ) }.
% 67.32/67.71 parent0[0]: (133490) {G49,W12,D6,L1,V2,M1} P(130452,10143);d(747);d(756);d(
% 67.32/67.71 64458) { meet( meet( join( converse( X ), Y ), one ), X ) ==> meet( one,
% 67.32/67.71 X ) }.
% 67.32/67.71 parent1[0; 13]: (148529) {G30,W12,D6,L1,V2,M1} { composition( X, Y ) ==>
% 67.32/67.71 composition( meet( X, converse( composition( Y, top ) ) ), Y ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := converse( composition( X, top ) )
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := meet( join( converse( converse( composition( X, top ) ) ), Y ), one
% 67.32/67.71 )
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148534) {G31,W15,D8,L1,V2,M1} { composition( meet( join(
% 67.32/67.71 converse( converse( composition( X, top ) ) ), Y ), one ), X ) ==>
% 67.32/67.71 composition( one, X ) }.
% 67.32/67.71 parent0[0]: (82543) {G30,W12,D6,L1,V2,M1} P(2429,2971);d(2972) {
% 67.32/67.71 composition( meet( Y, converse( composition( X, top ) ) ), X ) ==>
% 67.32/67.71 composition( Y, X ) }.
% 67.32/67.71 parent1[0; 12]: (148533) {G31,W20,D8,L1,V2,M1} { composition( meet( join(
% 67.32/67.71 converse( converse( composition( X, top ) ) ), Y ), one ), X ) ==>
% 67.32/67.71 composition( meet( one, converse( composition( X, top ) ) ), X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := one
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148535) {G5,W13,D8,L1,V2,M1} { composition( meet( join( converse
% 67.32/67.71 ( converse( composition( X, top ) ) ), Y ), one ), X ) ==> X }.
% 67.32/67.71 parent0[0]: (187) {G4,W5,D3,L1,V1,M1} P(186,180) { composition( one, X )
% 67.32/67.71 ==> X }.
% 67.32/67.71 parent1[0; 12]: (148534) {G31,W15,D8,L1,V2,M1} { composition( meet( join(
% 67.32/67.71 converse( converse( composition( X, top ) ) ), Y ), one ), X ) ==>
% 67.32/67.71 composition( one, X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148536) {G1,W11,D6,L1,V2,M1} { composition( meet( join(
% 67.32/67.71 composition( X, top ), Y ), one ), X ) ==> X }.
% 67.32/67.71 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.32/67.71 parent1[0; 4]: (148535) {G5,W13,D8,L1,V2,M1} { composition( meet( join(
% 67.32/67.71 converse( converse( composition( X, top ) ) ), Y ), one ), X ) ==> X }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := composition( X, top )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (141028) {G50,W11,D6,L1,V2,M1} P(133490,82543);d(82543);d(187)
% 67.32/67.71 ;d(7) { composition( meet( join( composition( X, top ), Y ), one ), X )
% 67.32/67.71 ==> X }.
% 67.32/67.71 parent0: (148536) {G1,W11,D6,L1,V2,M1} { composition( meet( join(
% 67.32/67.71 composition( X, top ), Y ), one ), X ) ==> X }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148539) {G50,W11,D6,L1,V2,M1} { X ==> composition( meet( join(
% 67.32/67.71 composition( X, top ), Y ), one ), X ) }.
% 67.32/67.71 parent0[0]: (141028) {G50,W11,D6,L1,V2,M1} P(133490,82543);d(82543);d(187);
% 67.32/67.71 d(7) { composition( meet( join( composition( X, top ), Y ), one ), X )
% 67.32/67.71 ==> X }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148540) {G31,W11,D6,L1,V2,M1} { X ==> composition( meet( join( Y
% 67.32/67.71 , composition( X, top ) ), one ), X ) }.
% 67.32/67.71 parent0[0]: (34400) {G30,W12,D6,L1,V2,M1} P(6438,1369);d(756) { join( Y,
% 67.32/67.71 meet( X, composition( top, complement( Y ) ) ) ) ==> join( X, Y ) }.
% 67.32/67.71 parent1[0; 4]: (148539) {G50,W11,D6,L1,V2,M1} { X ==> composition( meet(
% 67.32/67.71 join( composition( X, top ), Y ), one ), X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := composition( X, top )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := meet( Y, composition( top, complement( composition( X, top ) ) ) )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148541) {G31,W11,D6,L1,V2,M1} { composition( meet( join( Y,
% 67.32/67.71 composition( X, top ) ), one ), X ) ==> X }.
% 67.32/67.71 parent0[0]: (148540) {G31,W11,D6,L1,V2,M1} { X ==> composition( meet( join
% 67.32/67.71 ( Y, composition( X, top ) ), one ), X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (141075) {G51,W11,D6,L1,V2,M1} P(34400,141028) { composition(
% 67.32/67.71 meet( join( Y, composition( X, top ) ), one ), X ) ==> X }.
% 67.32/67.71 parent0: (148541) {G31,W11,D6,L1,V2,M1} { composition( meet( join( Y,
% 67.32/67.71 composition( X, top ) ), one ), X ) ==> X }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148543) {G1,W10,D5,L1,V2,M1} { composition( Y, converse( X ) )
% 67.32/67.71 ==> converse( composition( X, converse( Y ) ) ) }.
% 67.32/67.71 parent0[0]: (16) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 67.32/67.71 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148549) {G2,W15,D8,L1,V2,M1} { composition( X, converse( meet(
% 67.32/67.71 join( Y, composition( converse( X ), top ) ), one ) ) ) ==> converse(
% 67.32/67.71 converse( X ) ) }.
% 67.32/67.71 parent0[0]: (141075) {G51,W11,D6,L1,V2,M1} P(34400,141028) { composition(
% 67.32/67.71 meet( join( Y, composition( X, top ) ), one ), X ) ==> X }.
% 67.32/67.71 parent1[0; 13]: (148543) {G1,W10,D5,L1,V2,M1} { composition( Y, converse(
% 67.32/67.71 X ) ) ==> converse( composition( X, converse( Y ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := converse( X )
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := meet( join( Y, composition( converse( X ), top ) ), one )
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148550) {G1,W13,D8,L1,V2,M1} { composition( X, converse( meet(
% 67.32/67.71 join( Y, composition( converse( X ), top ) ), one ) ) ) ==> X }.
% 67.32/67.71 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.32/67.71 parent1[0; 12]: (148549) {G2,W15,D8,L1,V2,M1} { composition( X, converse(
% 67.32/67.71 meet( join( Y, composition( converse( X ), top ) ), one ) ) ) ==>
% 67.32/67.71 converse( converse( X ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148551) {G2,W12,D7,L1,V2,M1} { composition( X, meet( join( Y,
% 67.32/67.71 composition( converse( X ), top ) ), one ) ) ==> X }.
% 67.32/67.71 parent0[0]: (130741) {G50,W8,D4,L1,V1,M1} P(4353,130516);d(5);d(130266) {
% 67.32/67.71 converse( meet( X, one ) ) ==> meet( X, one ) }.
% 67.32/67.71 parent1[0; 3]: (148550) {G1,W13,D8,L1,V2,M1} { composition( X, converse(
% 67.32/67.71 meet( join( Y, composition( converse( X ), top ) ), one ) ) ) ==> X }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := join( Y, composition( converse( X ), top ) )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148552) {G3,W12,D7,L1,V2,M1} { composition( X, meet( join( Y,
% 67.32/67.71 converse( composition( top, X ) ) ), one ) ) ==> X }.
% 67.32/67.71 parent0[0]: (224) {G11,W9,D4,L1,V1,M1} P(223,17) { composition( converse( X
% 67.32/67.71 ), top ) ==> converse( composition( top, X ) ) }.
% 67.32/67.71 parent1[0; 6]: (148551) {G2,W12,D7,L1,V2,M1} { composition( X, meet( join
% 67.32/67.71 ( Y, composition( converse( X ), top ) ), one ) ) ==> X }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148553) {G4,W12,D6,L1,V2,M1} { composition( X, meet( join(
% 67.32/67.71 converse( Y ), composition( top, X ) ), one ) ) ==> X }.
% 67.32/67.71 parent0[0]: (131312) {G53,W13,D5,L1,V2,M1} P(20,131160);d(131307);d(131304)
% 67.32/67.71 { meet( join( X, converse( Y ) ), one ) ==> meet( join( converse( X ), Y
% 67.32/67.71 ), one ) }.
% 67.32/67.71 parent1[0; 3]: (148552) {G3,W12,D7,L1,V2,M1} { composition( X, meet( join
% 67.32/67.71 ( Y, converse( composition( top, X ) ) ), one ) ) ==> X }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := composition( top, X )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (141354) {G54,W12,D6,L1,V2,M1} P(141075,16);d(7);d(130741);d(
% 67.32/67.71 224);d(131312) { composition( Y, meet( join( converse( X ), composition(
% 67.32/67.71 top, Y ) ), one ) ) ==> Y }.
% 67.32/67.71 parent0: (148553) {G4,W12,D6,L1,V2,M1} { composition( X, meet( join(
% 67.32/67.71 converse( Y ), composition( top, X ) ), one ) ) ==> X }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148556) {G54,W12,D6,L1,V2,M1} { X ==> composition( X, meet( join
% 67.32/67.71 ( converse( Y ), composition( top, X ) ), one ) ) }.
% 67.32/67.71 parent0[0]: (141354) {G54,W12,D6,L1,V2,M1} P(141075,16);d(7);d(130741);d(
% 67.32/67.71 224);d(131312) { composition( Y, meet( join( converse( X ), composition(
% 67.32/67.71 top, Y ) ), one ) ) ==> Y }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148559) {G38,W14,D5,L1,V1,M1} { meet( converse( skol1 ), X ) ==>
% 67.32/67.71 composition( meet( converse( skol1 ), X ), meet( converse( skol1 ), one
% 67.32/67.71 ) ) }.
% 67.32/67.71 parent0[0]: (28462) {G37,W12,D6,L1,V2,M1} P(28458,928);d(898);d(20) { join
% 67.32/67.71 ( converse( skol1 ), composition( X, meet( converse( skol1 ), Y ) ) ) ==>
% 67.32/67.71 converse( skol1 ) }.
% 67.32/67.71 parent1[0; 11]: (148556) {G54,W12,D6,L1,V2,M1} { X ==> composition( X,
% 67.32/67.71 meet( join( converse( Y ), composition( top, X ) ), one ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := top
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := meet( converse( skol1 ), X )
% 67.32/67.71 Y := skol1
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148560) {G39,W13,D5,L1,V1,M1} { meet( converse( skol1 ), X ) ==>
% 67.32/67.71 composition( meet( converse( skol1 ), X ), meet( one, skol1 ) ) }.
% 67.32/67.71 parent0[0]: (131159) {G51,W8,D4,L1,V1,M1} S(12418);d(130742) { meet(
% 67.32/67.71 converse( X ), one ) ==> meet( one, X ) }.
% 67.32/67.71 parent1[0; 10]: (148559) {G38,W14,D5,L1,V1,M1} { meet( converse( skol1 ),
% 67.32/67.71 X ) ==> composition( meet( converse( skol1 ), X ), meet( converse( skol1
% 67.32/67.71 ), one ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := skol1
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148561) {G40,W10,D4,L1,V1,M1} { meet( converse( skol1 ), X ) ==>
% 67.32/67.71 composition( X, meet( one, skol1 ) ) }.
% 67.32/67.71 parent0[0]: (89538) {G62,W14,D5,L1,V1,M1} P(61527,82544) { composition(
% 67.32/67.71 meet( converse( skol1 ), X ), meet( one, skol1 ) ) ==> composition( X,
% 67.32/67.71 meet( one, skol1 ) ) }.
% 67.32/67.71 parent1[0; 5]: (148560) {G39,W13,D5,L1,V1,M1} { meet( converse( skol1 ), X
% 67.32/67.71 ) ==> composition( meet( converse( skol1 ), X ), meet( one, skol1 ) )
% 67.32/67.71 }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148562) {G40,W10,D4,L1,V1,M1} { composition( X, meet( one, skol1
% 67.32/67.71 ) ) ==> meet( converse( skol1 ), X ) }.
% 67.32/67.71 parent0[0]: (148561) {G40,W10,D4,L1,V1,M1} { meet( converse( skol1 ), X )
% 67.32/67.71 ==> composition( X, meet( one, skol1 ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (142989) {G63,W10,D4,L1,V1,M1} P(28462,141354);d(131159);d(
% 67.32/67.71 89538) { composition( X, meet( one, skol1 ) ) ==> meet( converse( skol1 )
% 67.32/67.71 , X ) }.
% 67.32/67.71 parent0: (148562) {G40,W10,D4,L1,V1,M1} { composition( X, meet( one, skol1
% 67.32/67.71 ) ) ==> meet( converse( skol1 ), X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148564) {G1,W10,D5,L1,V2,M1} { composition( converse( Y ), X )
% 67.32/67.71 ==> converse( composition( converse( X ), Y ) ) }.
% 67.32/67.71 parent0[0]: (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition(
% 67.32/67.71 converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148569) {G2,W13,D5,L1,V1,M1} { composition( converse( meet( one
% 67.32/67.71 , skol1 ) ), X ) ==> converse( meet( converse( skol1 ), converse( X ) ) )
% 67.32/67.71 }.
% 67.32/67.71 parent0[0]: (142989) {G63,W10,D4,L1,V1,M1} P(28462,141354);d(131159);d(
% 67.32/67.71 89538) { composition( X, meet( one, skol1 ) ) ==> meet( converse( skol1 )
% 67.32/67.71 , X ) }.
% 67.32/67.71 parent1[0; 8]: (148564) {G1,W10,D5,L1,V2,M1} { composition( converse( Y )
% 67.32/67.71 , X ) ==> converse( composition( converse( X ), Y ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := converse( X )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := meet( one, skol1 )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148570) {G3,W12,D5,L1,V1,M1} { composition( converse( meet( one
% 67.32/67.71 , skol1 ) ), X ) ==> meet( converse( converse( skol1 ) ), X ) }.
% 67.32/67.71 parent0[0]: (53041) {G31,W10,D5,L1,V2,M1} P(7,53018) { converse( meet( Y,
% 67.32/67.71 converse( X ) ) ) ==> meet( converse( Y ), X ) }.
% 67.32/67.71 parent1[0; 7]: (148569) {G2,W13,D5,L1,V1,M1} { composition( converse( meet
% 67.32/67.71 ( one, skol1 ) ), X ) ==> converse( meet( converse( skol1 ), converse( X
% 67.32/67.71 ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := converse( skol1 )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148571) {G1,W10,D5,L1,V1,M1} { composition( converse( meet( one
% 67.32/67.71 , skol1 ) ), X ) ==> meet( skol1, X ) }.
% 67.32/67.71 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 67.32/67.71 parent1[0; 8]: (148570) {G3,W12,D5,L1,V1,M1} { composition( converse( meet
% 67.32/67.71 ( one, skol1 ) ), X ) ==> meet( converse( converse( skol1 ) ), X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := skol1
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148572) {G2,W9,D4,L1,V1,M1} { composition( meet( one, skol1 ), X
% 67.32/67.71 ) ==> meet( skol1, X ) }.
% 67.32/67.71 parent0[0]: (130742) {G50,W8,D4,L1,V1,M1} P(4322,130516);d(5);d(130268) {
% 67.32/67.71 converse( meet( one, X ) ) ==> meet( one, X ) }.
% 67.32/67.71 parent1[0; 2]: (148571) {G1,W10,D5,L1,V1,M1} { composition( converse( meet
% 67.32/67.71 ( one, skol1 ) ), X ) ==> meet( skol1, X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := skol1
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (143166) {G64,W9,D4,L1,V1,M1} P(142989,17);d(53041);d(7);d(
% 67.32/67.71 130742) { composition( meet( one, skol1 ), X ) ==> meet( skol1, X ) }.
% 67.32/67.71 parent0: (148572) {G2,W9,D4,L1,V1,M1} { composition( meet( one, skol1 ), X
% 67.32/67.71 ) ==> meet( skol1, X ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148575) {G0,W11,D4,L1,V3,M1} { composition( composition( X, Y ),
% 67.32/67.71 Z ) ==> composition( X, composition( Y, Z ) ) }.
% 67.32/67.71 parent0[0]: (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z
% 67.32/67.71 ) ) ==> composition( composition( X, Y ), Z ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 Z := Z
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148580) {G1,W13,D5,L1,V2,M1} { composition( composition( X, meet
% 67.32/67.71 ( one, skol1 ) ), Y ) ==> composition( X, meet( skol1, Y ) ) }.
% 67.32/67.71 parent0[0]: (143166) {G64,W9,D4,L1,V1,M1} P(142989,17);d(53041);d(7);d(
% 67.32/67.71 130742) { composition( meet( one, skol1 ), X ) ==> meet( skol1, X ) }.
% 67.32/67.71 parent1[0; 10]: (148575) {G0,W11,D4,L1,V3,M1} { composition( composition(
% 67.32/67.71 X, Y ), Z ) ==> composition( X, composition( Y, Z ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := meet( one, skol1 )
% 67.32/67.71 Z := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148582) {G2,W12,D5,L1,V2,M1} { composition( meet( converse(
% 67.32/67.71 skol1 ), X ), Y ) ==> composition( X, meet( skol1, Y ) ) }.
% 67.32/67.71 parent0[0]: (142989) {G63,W10,D4,L1,V1,M1} P(28462,141354);d(131159);d(
% 67.32/67.71 89538) { composition( X, meet( one, skol1 ) ) ==> meet( converse( skol1 )
% 67.32/67.71 , X ) }.
% 67.32/67.71 parent1[0; 2]: (148580) {G1,W13,D5,L1,V2,M1} { composition( composition( X
% 67.32/67.71 , meet( one, skol1 ) ), Y ) ==> composition( X, meet( skol1, Y ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (143254) {G65,W12,D5,L1,V2,M1} P(143166,4);d(142989) {
% 67.32/67.71 composition( meet( converse( skol1 ), Y ), X ) ==> composition( Y, meet(
% 67.32/67.71 skol1, X ) ) }.
% 67.32/67.71 parent0: (148582) {G2,W12,D5,L1,V2,M1} { composition( meet( converse(
% 67.32/67.71 skol1 ), X ), Y ) ==> composition( X, meet( skol1, Y ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148585) {G25,W12,D5,L1,V3,M1} { zero ==> meet( composition( meet
% 67.32/67.71 ( X, Y ), Z ), complement( composition( Y, Z ) ) ) }.
% 67.32/67.71 parent0[0]: (25990) {G25,W12,D5,L1,V3,M1} P(1389,1076) { meet( composition
% 67.32/67.71 ( meet( Y, X ), Z ), complement( composition( X, Z ) ) ) ==> zero }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 Z := Z
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148586) {G26,W12,D5,L1,V2,M1} { zero ==> meet( composition( X,
% 67.32/67.71 meet( skol1, Y ) ), complement( composition( X, Y ) ) ) }.
% 67.32/67.71 parent0[0]: (143254) {G65,W12,D5,L1,V2,M1} P(143166,4);d(142989) {
% 67.32/67.71 composition( meet( converse( skol1 ), Y ), X ) ==> composition( Y, meet(
% 67.32/67.71 skol1, X ) ) }.
% 67.32/67.71 parent1[0; 3]: (148585) {G25,W12,D5,L1,V3,M1} { zero ==> meet( composition
% 67.32/67.71 ( meet( X, Y ), Z ), complement( composition( Y, Z ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := converse( skol1 )
% 67.32/67.71 Y := X
% 67.32/67.71 Z := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148588) {G26,W12,D5,L1,V2,M1} { meet( composition( X, meet( skol1
% 67.32/67.71 , Y ) ), complement( composition( X, Y ) ) ) ==> zero }.
% 67.32/67.71 parent0[0]: (148586) {G26,W12,D5,L1,V2,M1} { zero ==> meet( composition( X
% 67.32/67.71 , meet( skol1, Y ) ), complement( composition( X, Y ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (144520) {G66,W12,D5,L1,V2,M1} P(143254,25990) { meet(
% 67.32/67.71 composition( X, meet( skol1, Y ) ), complement( composition( X, Y ) ) )
% 67.32/67.71 ==> zero }.
% 67.32/67.71 parent0: (148588) {G26,W12,D5,L1,V2,M1} { meet( composition( X, meet(
% 67.32/67.71 skol1, Y ) ), complement( composition( X, Y ) ) ) ==> zero }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148591) {G65,W12,D5,L1,V2,M1} { composition( X, meet( skol1, Y )
% 67.32/67.71 ) ==> composition( meet( converse( skol1 ), X ), Y ) }.
% 67.32/67.71 parent0[0]: (143254) {G65,W12,D5,L1,V2,M1} P(143166,4);d(142989) {
% 67.32/67.71 composition( meet( converse( skol1 ), Y ), X ) ==> composition( Y, meet(
% 67.32/67.71 skol1, X ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148594) {G30,W16,D6,L1,V2,M1} { composition( join( complement(
% 67.32/67.71 converse( skol1 ) ), X ), meet( skol1, Y ) ) ==> composition( meet( X,
% 67.32/67.71 converse( skol1 ) ), Y ) }.
% 67.32/67.71 parent0[0]: (10127) {G29,W10,D5,L1,V2,M1} P(10113,2544);d(3086) { meet( X,
% 67.32/67.71 join( complement( X ), Y ) ) ==> meet( Y, X ) }.
% 67.32/67.71 parent1[0; 11]: (148591) {G65,W12,D5,L1,V2,M1} { composition( X, meet(
% 67.32/67.71 skol1, Y ) ) ==> composition( meet( converse( skol1 ), X ), Y ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := converse( skol1 )
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := join( complement( converse( skol1 ) ), X )
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148595) {G30,W12,D5,L1,V2,M1} { composition( X, meet( skol1, Y )
% 67.32/67.71 ) ==> composition( meet( X, converse( skol1 ) ), Y ) }.
% 67.32/67.71 parent0[0]: (20589) {G29,W15,D6,L1,V2,M1} P(20581,6);d(749) { composition(
% 67.32/67.71 join( complement( converse( skol1 ) ), Y ), meet( skol1, X ) ) ==>
% 67.32/67.71 composition( Y, meet( skol1, X ) ) }.
% 67.32/67.71 parent1[0; 1]: (148594) {G30,W16,D6,L1,V2,M1} { composition( join(
% 67.32/67.71 complement( converse( skol1 ) ), X ), meet( skol1, Y ) ) ==> composition
% 67.32/67.71 ( meet( X, converse( skol1 ) ), Y ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148596) {G30,W12,D5,L1,V2,M1} { composition( meet( X, converse(
% 67.32/67.71 skol1 ) ), Y ) ==> composition( X, meet( skol1, Y ) ) }.
% 67.32/67.71 parent0[0]: (148595) {G30,W12,D5,L1,V2,M1} { composition( X, meet( skol1,
% 67.32/67.71 Y ) ) ==> composition( meet( X, converse( skol1 ) ), Y ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (144595) {G66,W12,D5,L1,V2,M1} P(10127,143254);d(20589) {
% 67.32/67.71 composition( meet( X, converse( skol1 ) ), Y ) ==> composition( X, meet(
% 67.32/67.71 skol1, Y ) ) }.
% 67.32/67.71 parent0: (148596) {G30,W12,D5,L1,V2,M1} { composition( meet( X, converse(
% 67.32/67.71 skol1 ) ), Y ) ==> composition( X, meet( skol1, Y ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqswap: (148598) {G23,W11,D4,L1,V2,M1} { join( Y, complement( X ) ) ==>
% 67.32/67.71 join( complement( X ), meet( Y, X ) ) }.
% 67.32/67.71 parent0[0]: (2429) {G23,W11,D4,L1,V2,M1} P(2408,898);d(1);d(870) { join(
% 67.32/67.71 complement( Y ), meet( X, Y ) ) ==> join( X, complement( Y ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := Y
% 67.32/67.71 Y := X
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148601) {G24,W19,D6,L1,V2,M1} { join( composition( X, meet(
% 67.32/67.71 skol1, Y ) ), complement( complement( composition( X, Y ) ) ) ) ==> join
% 67.32/67.71 ( complement( complement( composition( X, Y ) ) ), zero ) }.
% 67.32/67.71 parent0[0]: (144520) {G66,W12,D5,L1,V2,M1} P(143254,25990) { meet(
% 67.32/67.71 composition( X, meet( skol1, Y ) ), complement( composition( X, Y ) ) )
% 67.32/67.71 ==> zero }.
% 67.32/67.71 parent1[0; 18]: (148598) {G23,W11,D4,L1,V2,M1} { join( Y, complement( X )
% 67.32/67.71 ) ==> join( complement( X ), meet( Y, X ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := complement( composition( X, Y ) )
% 67.32/67.71 Y := composition( X, meet( skol1, Y ) )
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148602) {G12,W17,D6,L1,V2,M1} { join( composition( X, meet(
% 67.32/67.71 skol1, Y ) ), complement( complement( composition( X, Y ) ) ) ) ==>
% 67.32/67.71 complement( complement( composition( X, Y ) ) ) }.
% 67.32/67.71 parent0[0]: (740) {G11,W5,D3,L1,V1,M1} P(715,208) { join( X, zero ) ==> X
% 67.32/67.71 }.
% 67.32/67.71 parent1[0; 12]: (148601) {G24,W19,D6,L1,V2,M1} { join( composition( X,
% 67.32/67.71 meet( skol1, Y ) ), complement( complement( composition( X, Y ) ) ) ) ==>
% 67.32/67.71 join( complement( complement( composition( X, Y ) ) ), zero ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := complement( complement( composition( X, Y ) ) )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148604) {G13,W15,D6,L1,V2,M1} { join( composition( X, meet(
% 67.32/67.71 skol1, Y ) ), complement( complement( composition( X, Y ) ) ) ) ==>
% 67.32/67.71 composition( X, Y ) }.
% 67.32/67.71 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.32/67.71 complement( X ) ) ==> X }.
% 67.32/67.71 parent1[0; 12]: (148602) {G12,W17,D6,L1,V2,M1} { join( composition( X,
% 67.32/67.71 meet( skol1, Y ) ), complement( complement( composition( X, Y ) ) ) ) ==>
% 67.32/67.71 complement( complement( composition( X, Y ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := composition( X, Y )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148605) {G14,W13,D5,L1,V2,M1} { join( composition( X, meet(
% 67.32/67.71 skol1, Y ) ), composition( X, Y ) ) ==> composition( X, Y ) }.
% 67.32/67.71 parent0[0]: (756) {G15,W5,D4,L1,V1,M1} P(740,79);d(752) { complement(
% 67.32/67.71 complement( X ) ) ==> X }.
% 67.32/67.71 parent1[0; 7]: (148604) {G13,W15,D6,L1,V2,M1} { join( composition( X, meet
% 67.32/67.71 ( skol1, Y ) ), complement( complement( composition( X, Y ) ) ) ) ==>
% 67.32/67.71 composition( X, Y ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := composition( X, Y )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (144757) {G67,W13,D5,L1,V2,M1} P(144520,2429);d(740);d(756) {
% 67.32/67.71 join( composition( X, meet( skol1, Y ) ), composition( X, Y ) ) ==>
% 67.32/67.71 composition( X, Y ) }.
% 67.32/67.71 parent0: (148605) {G14,W13,D5,L1,V2,M1} { join( composition( X, meet(
% 67.32/67.71 skol1, Y ) ), composition( X, Y ) ) ==> composition( X, Y ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := X
% 67.32/67.71 Y := Y
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 0 ==> 0
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148615) {G2,W15,D5,L1,V0,M1} { ! composition( meet( skol2,
% 67.32/67.71 converse( skol1 ) ), skol3 ) ==> composition( meet( skol2, converse(
% 67.32/67.71 skol1 ) ), meet( skol1, skol3 ) ) }.
% 67.32/67.71 parent0[0]: (144757) {G67,W13,D5,L1,V2,M1} P(144520,2429);d(740);d(756) {
% 67.32/67.71 join( composition( X, meet( skol1, Y ) ), composition( X, Y ) ) ==>
% 67.32/67.71 composition( X, Y ) }.
% 67.32/67.71 parent1[0; 2]: (134) {G1,W24,D6,L1,V0,M1} P(0,14) { ! join( composition(
% 67.32/67.71 meet( skol2, converse( skol1 ) ), meet( skol1, skol3 ) ), composition(
% 67.32/67.71 meet( skol2, converse( skol1 ) ), skol3 ) ) ==> composition( meet( skol2
% 67.32/67.71 , converse( skol1 ) ), meet( skol1, skol3 ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := meet( skol2, converse( skol1 ) )
% 67.32/67.71 Y := skol3
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148617) {G3,W14,D5,L1,V0,M1} { ! composition( meet( skol2,
% 67.32/67.71 converse( skol1 ) ), skol3 ) ==> composition( skol2, meet( skol1, meet(
% 67.32/67.71 skol1, skol3 ) ) ) }.
% 67.32/67.71 parent0[0]: (144595) {G66,W12,D5,L1,V2,M1} P(10127,143254);d(20589) {
% 67.32/67.71 composition( meet( X, converse( skol1 ) ), Y ) ==> composition( X, meet(
% 67.32/67.71 skol1, Y ) ) }.
% 67.32/67.71 parent1[0; 8]: (148615) {G2,W15,D5,L1,V0,M1} { ! composition( meet( skol2
% 67.32/67.71 , converse( skol1 ) ), skol3 ) ==> composition( meet( skol2, converse(
% 67.32/67.71 skol1 ) ), meet( skol1, skol3 ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := skol2
% 67.32/67.71 Y := meet( skol1, skol3 )
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148619) {G4,W13,D5,L1,V0,M1} { ! composition( skol2, meet( skol1
% 67.32/67.71 , skol3 ) ) ==> composition( skol2, meet( skol1, meet( skol1, skol3 ) ) )
% 67.32/67.71 }.
% 67.32/67.71 parent0[0]: (144595) {G66,W12,D5,L1,V2,M1} P(10127,143254);d(20589) {
% 67.32/67.71 composition( meet( X, converse( skol1 ) ), Y ) ==> composition( X, meet(
% 67.32/67.71 skol1, Y ) ) }.
% 67.32/67.71 parent1[0; 2]: (148617) {G3,W14,D5,L1,V0,M1} { ! composition( meet( skol2
% 67.32/67.71 , converse( skol1 ) ), skol3 ) ==> composition( skol2, meet( skol1, meet
% 67.32/67.71 ( skol1, skol3 ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := skol2
% 67.32/67.71 Y := skol3
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148620) {G5,W13,D5,L1,V0,M1} { ! composition( skol2, meet( skol1
% 67.32/67.71 , skol3 ) ) ==> composition( skol2, meet( meet( skol1, skol1 ), skol3 ) )
% 67.32/67.71 }.
% 67.32/67.71 parent0[0]: (64458) {G33,W11,D4,L1,V3,M1} P(10127,63585);d(64457) { meet( Y
% 67.32/67.71 , meet( X, Z ) ) ==> meet( meet( Y, X ), Z ) }.
% 67.32/67.71 parent1[0; 9]: (148619) {G4,W13,D5,L1,V0,M1} { ! composition( skol2, meet
% 67.32/67.71 ( skol1, skol3 ) ) ==> composition( skol2, meet( skol1, meet( skol1,
% 67.32/67.71 skol3 ) ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := skol1
% 67.32/67.71 Y := skol1
% 67.32/67.71 Z := skol3
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 paramod: (148621) {G6,W11,D4,L1,V0,M1} { ! composition( skol2, meet( skol1
% 67.32/67.71 , skol3 ) ) ==> composition( skol2, meet( skol1, skol3 ) ) }.
% 67.32/67.71 parent0[0]: (768) {G16,W5,D3,L1,V1,M1} P(385,756);d(756);d(756) { meet( X,
% 67.32/67.71 X ) ==> X }.
% 67.32/67.71 parent1[0; 10]: (148620) {G5,W13,D5,L1,V0,M1} { ! composition( skol2, meet
% 67.32/67.71 ( skol1, skol3 ) ) ==> composition( skol2, meet( meet( skol1, skol1 ),
% 67.32/67.71 skol3 ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 X := skol1
% 67.32/67.71 end
% 67.32/67.71 substitution1:
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 eqrefl: (148622) {G0,W0,D0,L0,V0,M0} { }.
% 67.32/67.71 parent0[0]: (148621) {G6,W11,D4,L1,V0,M1} { ! composition( skol2, meet(
% 67.32/67.71 skol1, skol3 ) ) ==> composition( skol2, meet( skol1, skol3 ) ) }.
% 67.32/67.71 substitution0:
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 subsumption: (144759) {G68,W0,D0,L0,V0,M0} S(134);d(144757);d(144595);d(
% 67.32/67.71 144595);d(64458);d(768);q { }.
% 67.32/67.71 parent0: (148622) {G0,W0,D0,L0,V0,M0} { }.
% 67.32/67.71 substitution0:
% 67.32/67.71 end
% 67.32/67.71 permutation0:
% 67.32/67.71 end
% 67.32/67.71
% 67.32/67.71 Proof check complete!
% 67.32/67.71
% 67.32/67.71 Memory use:
% 67.32/67.71
% 67.32/67.71 space for terms: 2030185
% 67.32/67.71 space for clauses: 15468034
% 67.32/67.71
% 67.32/67.71
% 67.32/67.71 clauses generated: 12256117
% 67.32/67.71 clauses kept: 144760
% 67.32/67.71 clauses selected: 8215
% 67.32/67.71 clauses deleted: 60804
% 67.32/67.71 clauses inuse deleted: 2674
% 67.32/67.71
% 67.32/67.71 subsentry: 203653
% 67.32/67.71 literals s-matched: 193285
% 67.32/67.71 literals matched: 192216
% 67.32/67.71 full subsumption: 0
% 67.32/67.71
% 67.32/67.71 checksum: -1102207322
% 67.32/67.71
% 67.32/67.71
% 67.32/67.71 Bliksem ended
%------------------------------------------------------------------------------