TSTP Solution File: REL028+2 by Bliksem---1.12
View Problem
- Process Solution
%------------------------------------------------------------------------------
% File : Bliksem---1.12
% Problem : REL028+2 : TPTP v8.1.0. Released v4.0.0.
% Transfm : none
% Format : tptp:raw
% Command : bliksem %s
% Computer : n024.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 19:00:40 EDT 2022
% Result : Theorem 9.24s 9.64s
% Output : Refutation 9.24s
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.11/0.12 % Problem : REL028+2 : TPTP v8.1.0. Released v4.0.0.
% 0.11/0.13 % Command : bliksem %s
% 0.13/0.34 % Computer : n024.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 12:17:59 EDT 2022
% 0.13/0.34 % CPUTime :
% 5.15/5.60 *** allocated 10000 integers for termspace/termends
% 5.15/5.60 *** allocated 10000 integers for clauses
% 5.15/5.60 *** allocated 10000 integers for justifications
% 5.15/5.60 Bliksem 1.12
% 5.15/5.60
% 5.15/5.60
% 5.15/5.60 Automatic Strategy Selection
% 5.15/5.60
% 5.15/5.60
% 5.15/5.60 Clauses:
% 5.15/5.60
% 5.15/5.60 { join( X, Y ) = join( Y, X ) }.
% 5.15/5.60 { join( X, join( Y, Z ) ) = join( join( X, Y ), Z ) }.
% 5.15/5.60 { X = join( complement( join( complement( X ), complement( Y ) ) ),
% 5.15/5.60 complement( join( complement( X ), Y ) ) ) }.
% 5.15/5.60 { meet( X, Y ) = complement( join( complement( X ), complement( Y ) ) ) }.
% 5.15/5.60 { composition( X, composition( Y, Z ) ) = composition( composition( X, Y )
% 5.15/5.60 , Z ) }.
% 5.15/5.60 { composition( X, one ) = X }.
% 5.15/5.60 { composition( join( X, Y ), Z ) = join( composition( X, Z ), composition(
% 5.15/5.60 Y, Z ) ) }.
% 5.15/5.60 { converse( converse( X ) ) = X }.
% 5.15/5.60 { converse( join( X, Y ) ) = join( converse( X ), converse( Y ) ) }.
% 5.15/5.60 { converse( composition( X, Y ) ) = composition( converse( Y ), converse( X
% 5.15/5.60 ) ) }.
% 5.15/5.60 { join( composition( converse( X ), complement( composition( X, Y ) ) ),
% 5.15/5.60 complement( Y ) ) = complement( Y ) }.
% 5.15/5.60 { top = join( X, complement( X ) ) }.
% 5.15/5.60 { zero = meet( X, complement( X ) ) }.
% 5.15/5.60 { join( meet( composition( X, Y ), Z ), composition( meet( X, composition(
% 5.15/5.60 Z, converse( Y ) ) ), meet( Y, composition( converse( X ), Z ) ) ) ) =
% 5.15/5.60 composition( meet( X, composition( Z, converse( Y ) ) ), meet( Y,
% 5.15/5.60 composition( converse( X ), Z ) ) ) }.
% 5.15/5.60 { join( meet( composition( X, Y ), Z ), meet( composition( X, meet( Y,
% 5.15/5.60 composition( converse( X ), Z ) ) ), Z ) ) = meet( composition( X, meet(
% 5.15/5.60 Y, composition( converse( X ), Z ) ) ), Z ) }.
% 5.15/5.60 { join( meet( composition( X, Y ), Z ), meet( composition( meet( X,
% 5.15/5.60 composition( Z, converse( Y ) ) ), Y ), Z ) ) = meet( composition( meet(
% 5.15/5.60 X, composition( Z, converse( Y ) ) ), Y ), Z ) }.
% 5.15/5.60 { join( skol1, one ) = one }.
% 5.15/5.60 { join( skol2, one ) = one }.
% 5.15/5.60 { ! composition( skol1, skol2 ) = meet( skol1, skol2 ) }.
% 5.15/5.60
% 5.15/5.60 percentage equality = 1.000000, percentage horn = 1.000000
% 5.15/5.60 This is a pure equality problem
% 5.15/5.60
% 5.15/5.60
% 5.15/5.60
% 5.15/5.60 Options Used:
% 5.15/5.60
% 5.15/5.60 useres = 1
% 5.15/5.60 useparamod = 1
% 5.15/5.60 useeqrefl = 1
% 5.15/5.60 useeqfact = 1
% 5.15/5.60 usefactor = 1
% 5.15/5.60 usesimpsplitting = 0
% 5.15/5.60 usesimpdemod = 5
% 5.15/5.60 usesimpres = 3
% 5.15/5.60
% 5.15/5.60 resimpinuse = 1000
% 5.15/5.60 resimpclauses = 20000
% 5.15/5.60 substype = eqrewr
% 5.15/5.60 backwardsubs = 1
% 5.15/5.60 selectoldest = 5
% 5.15/5.60
% 5.15/5.60 litorderings [0] = split
% 5.15/5.60 litorderings [1] = extend the termordering, first sorting on arguments
% 5.15/5.60
% 5.15/5.60 termordering = kbo
% 5.15/5.60
% 5.15/5.60 litapriori = 0
% 5.15/5.60 termapriori = 1
% 5.15/5.60 litaposteriori = 0
% 5.15/5.60 termaposteriori = 0
% 5.15/5.60 demodaposteriori = 0
% 5.15/5.60 ordereqreflfact = 0
% 5.15/5.60
% 5.15/5.60 litselect = negord
% 5.15/5.60
% 5.15/5.60 maxweight = 15
% 5.15/5.60 maxdepth = 30000
% 5.15/5.60 maxlength = 115
% 5.15/5.60 maxnrvars = 195
% 5.15/5.60 excuselevel = 1
% 5.15/5.60 increasemaxweight = 1
% 5.15/5.60
% 5.15/5.60 maxselected = 10000000
% 5.15/5.60 maxnrclauses = 10000000
% 5.15/5.60
% 5.15/5.60 showgenerated = 0
% 5.15/5.60 showkept = 0
% 5.15/5.60 showselected = 0
% 5.15/5.60 showdeleted = 0
% 5.15/5.60 showresimp = 1
% 5.15/5.60 showstatus = 2000
% 5.15/5.60
% 5.15/5.60 prologoutput = 0
% 5.15/5.60 nrgoals = 5000000
% 5.15/5.60 totalproof = 1
% 5.15/5.60
% 5.15/5.60 Symbols occurring in the translation:
% 5.15/5.60
% 5.15/5.60 {} [0, 0] (w:1, o:2, a:1, s:1, b:0),
% 5.15/5.60 . [1, 2] (w:1, o:21, a:1, s:1, b:0),
% 5.15/5.60 ! [4, 1] (w:0, o:14, a:1, s:1, b:0),
% 5.15/5.60 = [13, 2] (w:1, o:0, a:0, s:1, b:0),
% 5.15/5.60 ==> [14, 2] (w:1, o:0, a:0, s:1, b:0),
% 5.15/5.60 join [37, 2] (w:1, o:45, a:1, s:1, b:0),
% 5.15/5.60 complement [39, 1] (w:1, o:19, a:1, s:1, b:0),
% 5.15/5.60 meet [40, 2] (w:1, o:46, a:1, s:1, b:0),
% 5.15/5.60 composition [41, 2] (w:1, o:47, a:1, s:1, b:0),
% 5.15/5.60 one [42, 0] (w:1, o:9, a:1, s:1, b:0),
% 5.15/5.60 converse [43, 1] (w:1, o:20, a:1, s:1, b:0),
% 5.15/5.60 top [44, 0] (w:1, o:12, a:1, s:1, b:0),
% 5.15/5.60 zero [45, 0] (w:1, o:13, a:1, s:1, b:0),
% 5.15/5.60 skol1 [46, 0] (w:1, o:10, a:1, s:1, b:1),
% 5.15/5.60 skol2 [47, 0] (w:1, o:11, a:1, s:1, b:1).
% 5.15/5.60
% 5.15/5.60
% 5.15/5.60 Starting Search:
% 5.15/5.60
% 5.15/5.60 *** allocated 15000 integers for clauses
% 5.15/5.60 *** allocated 22500 integers for clauses
% 5.15/5.60 *** allocated 33750 integers for clauses
% 5.15/5.60 *** allocated 50625 integers for clauses
% 5.15/5.60 *** allocated 75937 integers for clauses
% 5.15/5.60 *** allocated 113905 integers for clauses
% 5.15/5.60 *** allocated 15000 integers for termspace/termends
% 5.15/5.60 Resimplifying inuse:
% 5.15/5.60 Done
% 5.15/5.60
% 5.15/5.60 *** allocated 170857 integers for clauses
% 5.15/5.60 *** allocated 22500 integers for termspace/termends
% 9.24/9.64 *** allocated 256285 integers for clauses
% 9.24/9.64 *** allocated 33750 integers for termspace/termends
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 24720
% 9.24/9.64 Kept: 2009
% 9.24/9.64 Inuse: 427
% 9.24/9.64 Deleted: 231
% 9.24/9.64 Deletedinuse: 133
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 *** allocated 384427 integers for clauses
% 9.24/9.64 *** allocated 50625 integers for termspace/termends
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 *** allocated 576640 integers for clauses
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 59549
% 9.24/9.64 Kept: 4019
% 9.24/9.64 Inuse: 654
% 9.24/9.64 Deleted: 379
% 9.24/9.64 Deletedinuse: 207
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 *** allocated 75937 integers for termspace/termends
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 *** allocated 864960 integers for clauses
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 119912
% 9.24/9.64 Kept: 6027
% 9.24/9.64 Inuse: 835
% 9.24/9.64 Deleted: 414
% 9.24/9.64 Deletedinuse: 209
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 *** allocated 113905 integers for termspace/termends
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 182596
% 9.24/9.64 Kept: 8029
% 9.24/9.64 Inuse: 1192
% 9.24/9.64 Deleted: 549
% 9.24/9.64 Deletedinuse: 221
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 *** allocated 1297440 integers for clauses
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 *** allocated 170857 integers for termspace/termends
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 227936
% 9.24/9.64 Kept: 10034
% 9.24/9.64 Inuse: 1368
% 9.24/9.64 Deleted: 600
% 9.24/9.64 Deletedinuse: 233
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 284694
% 9.24/9.64 Kept: 12036
% 9.24/9.64 Inuse: 1492
% 9.24/9.64 Deleted: 655
% 9.24/9.64 Deletedinuse: 253
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 *** allocated 1946160 integers for clauses
% 9.24/9.64 *** allocated 256285 integers for termspace/termends
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 342656
% 9.24/9.64 Kept: 14041
% 9.24/9.64 Inuse: 1665
% 9.24/9.64 Deleted: 721
% 9.24/9.64 Deletedinuse: 278
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 422214
% 9.24/9.64 Kept: 16055
% 9.24/9.64 Inuse: 1933
% 9.24/9.64 Deleted: 865
% 9.24/9.64 Deletedinuse: 278
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 529408
% 9.24/9.64 Kept: 18056
% 9.24/9.64 Inuse: 2059
% 9.24/9.64 Deleted: 905
% 9.24/9.64 Deletedinuse: 282
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 *** allocated 2919240 integers for clauses
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 636524
% 9.24/9.64 Kept: 20193
% 9.24/9.64 Inuse: 2224
% 9.24/9.64 Deleted: 929
% 9.24/9.64 Deletedinuse: 282
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 Resimplifying clauses:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 *** allocated 384427 integers for termspace/termends
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 665127
% 9.24/9.64 Kept: 22216
% 9.24/9.64 Inuse: 2289
% 9.24/9.64 Deleted: 4450
% 9.24/9.64 Deletedinuse: 678
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 724088
% 9.24/9.64 Kept: 24245
% 9.24/9.64 Inuse: 2418
% 9.24/9.64 Deleted: 4538
% 9.24/9.64 Deletedinuse: 695
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 789541
% 9.24/9.64 Kept: 26251
% 9.24/9.64 Inuse: 2581
% 9.24/9.64 Deleted: 4560
% 9.24/9.64 Deletedinuse: 705
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 842252
% 9.24/9.64 Kept: 28291
% 9.24/9.64 Inuse: 2692
% 9.24/9.64 Deleted: 4584
% 9.24/9.64 Deletedinuse: 721
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 *** allocated 4378860 integers for clauses
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 889645
% 9.24/9.64 Kept: 30359
% 9.24/9.64 Inuse: 2737
% 9.24/9.64 Deleted: 4697
% 9.24/9.64 Deletedinuse: 834
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 *** allocated 576640 integers for termspace/termends
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 946421
% 9.24/9.64 Kept: 32371
% 9.24/9.64 Inuse: 2791
% 9.24/9.64 Deleted: 4697
% 9.24/9.64 Deletedinuse: 834
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 1002971
% 9.24/9.64 Kept: 34391
% 9.24/9.64 Inuse: 2861
% 9.24/9.64 Deleted: 4706
% 9.24/9.64 Deletedinuse: 834
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 1090499
% 9.24/9.64 Kept: 36397
% 9.24/9.64 Inuse: 2956
% 9.24/9.64 Deleted: 4756
% 9.24/9.64 Deletedinuse: 876
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
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% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 1170655
% 9.24/9.64 Kept: 38407
% 9.24/9.64 Inuse: 3058
% 9.24/9.64 Deleted: 4805
% 9.24/9.64 Deletedinuse: 900
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 Resimplifying clauses:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 1261756
% 9.24/9.64 Kept: 40732
% 9.24/9.64 Inuse: 3154
% 9.24/9.64 Deleted: 13368
% 9.24/9.64 Deletedinuse: 900
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 1359993
% 9.24/9.64 Kept: 42734
% 9.24/9.64 Inuse: 3282
% 9.24/9.64 Deleted: 13370
% 9.24/9.64 Deletedinuse: 900
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 1538014
% 9.24/9.64 Kept: 44742
% 9.24/9.64 Inuse: 3500
% 9.24/9.64 Deleted: 13374
% 9.24/9.64 Deletedinuse: 904
% 9.24/9.64
% 9.24/9.64 *** allocated 6568290 integers for clauses
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 *** allocated 864960 integers for termspace/termends
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 1686531
% 9.24/9.64 Kept: 46783
% 9.24/9.64 Inuse: 3738
% 9.24/9.64 Deleted: 13378
% 9.24/9.64 Deletedinuse: 904
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 1799654
% 9.24/9.64 Kept: 48787
% 9.24/9.64 Inuse: 3800
% 9.24/9.64 Deleted: 13378
% 9.24/9.64 Deletedinuse: 904
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
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% 9.24/9.64 Resimplifying inuse:
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% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 1902467
% 9.24/9.64 Kept: 50813
% 9.24/9.64 Inuse: 3852
% 9.24/9.64 Deleted: 13397
% 9.24/9.64 Deletedinuse: 923
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 1967978
% 9.24/9.64 Kept: 52867
% 9.24/9.64 Inuse: 3915
% 9.24/9.64 Deleted: 13405
% 9.24/9.64 Deletedinuse: 931
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 2099294
% 9.24/9.64 Kept: 54868
% 9.24/9.64 Inuse: 4034
% 9.24/9.64 Deleted: 13527
% 9.24/9.64 Deletedinuse: 1051
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Intermediate Status:
% 9.24/9.64 Generated: 2210465
% 9.24/9.64 Kept: 56927
% 9.24/9.64 Inuse: 4173
% 9.24/9.64 Deleted: 13673
% 9.24/9.64 Deletedinuse: 1181
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64 Resimplifying inuse:
% 9.24/9.64 Done
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Bliksems!, er is een bewijs:
% 9.24/9.64 % SZS status Theorem
% 9.24/9.64 % SZS output start Refutation
% 9.24/9.64
% 9.24/9.64 (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.64 (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( join( X, Y )
% 9.24/9.64 , Z ) }.
% 9.24/9.64 (2) {G0,W14,D6,L1,V2,M1} I { join( complement( join( complement( X ),
% 9.24/9.64 complement( Y ) ) ), complement( join( complement( X ), Y ) ) ) ==> X }.
% 9.24/9.64 (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X ), complement
% 9.24/9.64 ( Y ) ) ) ==> meet( X, Y ) }.
% 9.24/9.64 (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z ) ) ==>
% 9.24/9.64 composition( composition( X, Y ), Z ) }.
% 9.24/9.64 (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 9.24/9.64 (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ), composition( Y, Z )
% 9.24/9.64 ) ==> composition( join( X, Y ), Z ) }.
% 9.24/9.64 (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 9.24/9.64 (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y ) ) ==>
% 9.24/9.64 converse( join( X, Y ) ) }.
% 9.24/9.64 (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ), converse( X ) )
% 9.24/9.64 ==> converse( composition( X, Y ) ) }.
% 9.24/9.64 (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X ), complement
% 9.24/9.64 ( composition( X, Y ) ) ), complement( Y ) ) ==> complement( Y ) }.
% 9.24/9.64 (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top }.
% 9.24/9.64 (12) {G0,W6,D4,L1,V1,M1} I { meet( X, complement( X ) ) ==> zero }.
% 9.24/9.64 (13) {G0,W33,D7,L1,V3,M1} I { join( meet( composition( X, Y ), Z ),
% 9.24/9.64 composition( meet( X, composition( Z, converse( Y ) ) ), meet( Y,
% 9.24/9.64 composition( converse( X ), Z ) ) ) ) ==> composition( meet( X,
% 9.24/9.64 composition( Z, converse( Y ) ) ), meet( Y, composition( converse( X ), Z
% 9.24/9.64 ) ) ) }.
% 9.24/9.64 (14) {G0,W27,D8,L1,V3,M1} I { join( meet( composition( X, Y ), Z ), meet(
% 9.24/9.64 composition( X, meet( Y, composition( converse( X ), Z ) ) ), Z ) ) ==>
% 9.24/9.64 meet( composition( X, meet( Y, composition( converse( X ), Z ) ) ), Z )
% 9.24/9.64 }.
% 9.24/9.64 (15) {G0,W27,D8,L1,V3,M1} I { join( meet( composition( X, Y ), Z ), meet(
% 9.24/9.64 composition( meet( X, composition( Z, converse( Y ) ) ), Y ), Z ) ) ==>
% 9.24/9.64 meet( composition( meet( X, composition( Z, converse( Y ) ) ), Y ), Z )
% 9.24/9.64 }.
% 9.24/9.64 (16) {G0,W5,D3,L1,V0,M1} I { join( skol1, one ) ==> one }.
% 9.24/9.64 (17) {G0,W5,D3,L1,V0,M1} I { join( skol2, one ) ==> one }.
% 9.24/9.64 (18) {G0,W7,D3,L1,V0,M1} I { ! composition( skol1, skol2 ) ==> meet( skol1
% 9.24/9.64 , skol2 ) }.
% 9.24/9.64 (19) {G1,W5,D3,L1,V0,M1} P(0,16) { join( one, skol1 ) ==> one }.
% 9.24/9.64 (20) {G1,W5,D3,L1,V0,M1} P(0,17) { join( one, skol2 ) ==> one }.
% 9.24/9.64 (21) {G1,W6,D4,L1,V1,M1} P(11,0) { join( complement( X ), X ) ==> top }.
% 9.24/9.64 (22) {G2,W10,D6,L1,V2,M1} P(1,21) { join( join( complement( join( X, Y ) )
% 9.24/9.64 , X ), Y ) ==> top }.
% 9.24/9.64 (23) {G2,W10,D5,L1,V2,M1} P(21,1) { join( join( Y, complement( X ) ), X )
% 9.24/9.64 ==> join( Y, top ) }.
% 9.24/9.64 (24) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ), complement( X ) )
% 9.24/9.64 ==> join( Y, top ) }.
% 9.24/9.64 (25) {G2,W9,D4,L1,V1,M1} P(20,1) { join( join( X, one ), skol2 ) ==> join(
% 9.24/9.64 X, one ) }.
% 9.24/9.64 (26) {G2,W9,D4,L1,V1,M1} P(19,1) { join( join( X, one ), skol1 ) ==> join(
% 9.24/9.64 X, one ) }.
% 9.24/9.64 (27) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) = join( join( Y
% 9.24/9.64 , Z ), X ) }.
% 9.24/9.64 (28) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X ) = join(
% 9.24/9.64 join( Z, X ), Y ) }.
% 9.24/9.64 (29) {G1,W9,D4,L1,V1,M1} P(16,1) { join( join( X, skol1 ), one ) ==> join(
% 9.24/9.64 X, one ) }.
% 9.24/9.64 (30) {G1,W9,D4,L1,V1,M1} P(17,1) { join( join( X, skol2 ), one ) ==> join(
% 9.24/9.64 X, one ) }.
% 9.24/9.64 (31) {G3,W5,D3,L1,V0,M1} P(21,25) { join( top, skol2 ) ==> top }.
% 9.24/9.64 (32) {G3,W9,D4,L1,V1,M1} P(25,0);d(1) { join( join( skol2, X ), one ) ==>
% 9.24/9.64 join( X, one ) }.
% 9.24/9.64 (35) {G4,W5,D3,L1,V0,M1} P(31,0) { join( skol2, top ) ==> top }.
% 9.24/9.64 (36) {G5,W9,D4,L1,V1,M1} P(35,1) { join( join( X, skol2 ), top ) ==> join(
% 9.24/9.64 X, top ) }.
% 9.24/9.64 (37) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ), complement( join
% 9.24/9.64 ( complement( X ), Y ) ) ) ==> X }.
% 9.24/9.64 (39) {G6,W9,D4,L1,V1,M1} P(36,0);d(1) { join( join( top, X ), skol2 ) ==>
% 9.24/9.64 join( X, top ) }.
% 9.24/9.64 (47) {G1,W15,D5,L1,V3,M1} P(3,3) { meet( Z, join( complement( X ),
% 9.24/9.64 complement( Y ) ) ) ==> complement( join( complement( Z ), meet( X, Y ) )
% 9.24/9.64 ) }.
% 9.24/9.64 (49) {G2,W7,D4,L1,V1,M1} P(21,3) { meet( complement( X ), X ) ==>
% 9.24/9.64 complement( top ) }.
% 9.24/9.64 (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==> zero }.
% 9.24/9.64 (52) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X, Y ) }.
% 9.24/9.64 (53) {G2,W9,D5,L1,V1,M1} P(51,3) { complement( join( zero, complement( X )
% 9.24/9.64 ) ) ==> meet( top, X ) }.
% 9.24/9.64 (54) {G2,W9,D5,L1,V1,M1} P(51,3) { complement( join( complement( X ), zero
% 9.24/9.64 ) ) ==> meet( X, top ) }.
% 9.24/9.64 (55) {G2,W5,D3,L1,V0,M1} P(51,21) { join( zero, top ) ==> top }.
% 9.24/9.64 (56) {G2,W5,D3,L1,V0,M1} P(51,11) { join( top, zero ) ==> top }.
% 9.24/9.64 (57) {G2,W5,D3,L1,V0,M1} P(51,12) { meet( top, zero ) ==> zero }.
% 9.24/9.64 (58) {G3,W9,D4,L1,V1,M1} P(55,1) { join( join( X, zero ), top ) ==> join( X
% 9.24/9.64 , top ) }.
% 9.24/9.64 (59) {G3,W9,D4,L1,V1,M1} P(56,1) { join( join( X, top ), zero ) ==> join( X
% 9.24/9.64 , top ) }.
% 9.24/9.64 (60) {G3,W5,D3,L1,V0,M1} P(52,57) { meet( zero, top ) ==> zero }.
% 9.24/9.64 (61) {G3,W6,D4,L1,V1,M1} S(49);d(51) { meet( complement( X ), X ) ==> zero
% 9.24/9.64 }.
% 9.24/9.64 (62) {G1,W17,D5,L1,V4,M1} P(6,1) { join( join( T, composition( X, Y ) ),
% 9.24/9.64 composition( Z, Y ) ) ==> join( T, composition( join( X, Z ), Y ) ) }.
% 9.24/9.64 (64) {G4,W9,D4,L1,V1,M1} P(59,0);d(1) { join( join( zero, X ), top ) ==>
% 9.24/9.64 join( X, top ) }.
% 9.24/9.64 (68) {G5,W8,D4,L1,V0,M1} P(11,64) { join( complement( zero ), top ) ==>
% 9.24/9.64 join( top, top ) }.
% 9.24/9.64 (73) {G1,W9,D4,L1,V2,M1} P(8,0);d(8) { converse( join( X, Y ) ) = converse
% 9.24/9.64 ( join( Y, X ) ) }.
% 9.24/9.64 (74) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X ), Y ) ) ==>
% 9.24/9.64 join( X, converse( Y ) ) }.
% 9.24/9.64 (75) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse( X ) ) ) ==>
% 9.24/9.64 join( converse( Y ), X ) }.
% 9.24/9.64 (88) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y, converse( X )
% 9.24/9.64 ) ) ==> composition( X, converse( Y ) ) }.
% 9.24/9.64 (89) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( converse( X ), Y
% 9.24/9.64 ) ) ==> composition( converse( Y ), X ) }.
% 9.24/9.64 (92) {G4,W8,D4,L1,V0,M1} P(11,32) { join( complement( skol2 ), one ) ==>
% 9.24/9.64 join( top, one ) }.
% 9.24/9.64 (97) {G1,W15,D7,L1,V2,M1} P(9,10);d(7) { join( composition( X, complement(
% 9.24/9.64 converse( composition( Y, X ) ) ) ), complement( converse( Y ) ) ) ==>
% 9.24/9.64 complement( converse( Y ) ) }.
% 9.24/9.64 (109) {G3,W5,D3,L1,V0,M1} P(21,26) { join( top, skol1 ) ==> top }.
% 9.24/9.64 (110) {G3,W9,D4,L1,V1,M1} P(26,0);d(1) { join( join( skol1, X ), one ) ==>
% 9.24/9.64 join( X, one ) }.
% 9.24/9.64 (113) {G7,W5,D3,L1,V0,M1} P(109,39);d(31) { join( skol1, top ) ==> top }.
% 9.24/9.64 (114) {G4,W9,D4,L1,V1,M1} P(109,1) { join( join( X, top ), skol1 ) ==> join
% 9.24/9.64 ( X, top ) }.
% 9.24/9.64 (115) {G8,W9,D4,L1,V1,M1} P(113,1) { join( join( X, skol1 ), top ) ==> join
% 9.24/9.64 ( X, top ) }.
% 9.24/9.64 (123) {G1,W34,D7,L1,V3,M1} P(7,13) { join( meet( composition( Y, converse(
% 9.24/9.64 X ) ), Z ), composition( meet( Y, composition( Z, X ) ), meet( converse(
% 9.24/9.64 X ), composition( converse( Y ), Z ) ) ) ) ==> composition( meet( Y,
% 9.24/9.64 composition( Z, X ) ), meet( converse( X ), composition( converse( Y ), Z
% 9.24/9.64 ) ) ) }.
% 9.24/9.64 (129) {G9,W9,D4,L1,V1,M1} P(115,0);d(1) { join( join( top, X ), skol1 ) ==>
% 9.24/9.64 join( X, top ) }.
% 9.24/9.64 (142) {G1,W28,D7,L1,V3,M1} P(7,14) { join( meet( composition( converse( X )
% 9.24/9.64 , Y ), Z ), meet( composition( converse( X ), meet( Y, composition( X, Z
% 9.24/9.64 ) ) ), Z ) ) ==> meet( composition( converse( X ), meet( Y, composition
% 9.24/9.64 ( X, Z ) ) ), Z ) }.
% 9.24/9.64 (143) {G1,W25,D8,L1,V2,M1} P(5,14) { join( meet( X, Y ), meet( composition
% 9.24/9.64 ( X, meet( one, composition( converse( X ), Y ) ) ), Y ) ) ==> meet(
% 9.24/9.64 composition( X, meet( one, composition( converse( X ), Y ) ) ), Y ) }.
% 9.24/9.64 (144) {G1,W23,D7,L1,V2,M1} P(5,14) { join( meet( composition( X, Y ), one )
% 9.24/9.64 , meet( composition( X, meet( Y, converse( X ) ) ), one ) ) ==> meet(
% 9.24/9.64 composition( X, meet( Y, converse( X ) ) ), one ) }.
% 9.24/9.64 (151) {G4,W8,D4,L1,V0,M1} P(11,110) { join( complement( skol1 ), one ) ==>
% 9.24/9.64 join( top, one ) }.
% 9.24/9.64 (156) {G1,W27,D8,L1,V3,M1} P(15,0) { join( meet( composition( meet( X,
% 9.24/9.64 composition( Z, converse( Y ) ) ), Y ), Z ), meet( composition( X, Y ), Z
% 9.24/9.64 ) ) ==> meet( composition( meet( X, composition( Z, converse( Y ) ) ), Y
% 9.24/9.64 ), Z ) }.
% 9.24/9.64 (158) {G1,W28,D7,L1,V3,M1} P(7,15) { join( meet( composition( Y, converse(
% 9.24/9.64 X ) ), Z ), meet( composition( meet( Y, composition( Z, X ) ), converse(
% 9.24/9.64 X ) ), Z ) ) ==> meet( composition( meet( Y, composition( Z, X ) ),
% 9.24/9.64 converse( X ) ), Z ) }.
% 9.24/9.64 (182) {G3,W8,D4,L1,V0,M1} P(51,53) { complement( join( zero, zero ) ) ==>
% 9.24/9.64 meet( top, top ) }.
% 9.24/9.64 (190) {G4,W9,D4,L1,V0,M1} P(182,11) { join( join( zero, zero ), meet( top,
% 9.24/9.64 top ) ) ==> top }.
% 9.24/9.64 (199) {G3,W9,D5,L1,V1,M1} P(21,23) { join( complement( complement( X ) ),
% 9.24/9.64 top ) ==> join( top, X ) }.
% 9.24/9.64 (208) {G4,W9,D5,L1,V1,M1} P(199,0) { join( top, complement( complement( X )
% 9.24/9.64 ) ) ==> join( top, X ) }.
% 9.24/9.64 (210) {G5,W8,D5,L1,V0,M1} P(190,24);d(58);d(55) { join( top, complement(
% 9.24/9.64 meet( top, top ) ) ) ==> top }.
% 9.24/9.64 (215) {G2,W9,D5,L1,V3,M1} P(15,24);d(11) { join( meet( composition( X, Y )
% 9.24/9.64 , Z ), top ) ==> top }.
% 9.24/9.64 (222) {G6,W9,D4,L1,V0,M1} P(210,24);d(208) { join( top, meet( top, top ) )
% 9.24/9.64 ==> join( top, top ) }.
% 9.24/9.64 (225) {G10,W9,D4,L1,V0,M1} P(222,129);d(114) { join( meet( top, top ), top
% 9.24/9.64 ) ==> join( top, top ) }.
% 9.24/9.64 (234) {G3,W7,D4,L1,V2,M1} P(5,215) { join( meet( X, Y ), top ) ==> top }.
% 9.24/9.64 (269) {G11,W5,D3,L1,V0,M1} P(234,225) { join( top, top ) ==> top }.
% 9.24/9.64 (298) {G4,W5,D3,L1,V1,M1} P(37,23);d(1);d(11);d(234) { join( top, Y ) ==>
% 9.24/9.64 top }.
% 9.24/9.64 (300) {G5,W7,D4,L1,V0,M1} P(151,37);d(298);d(51) { join( meet( skol1, one )
% 9.24/9.64 , zero ) ==> skol1 }.
% 9.24/9.64 (302) {G5,W7,D4,L1,V0,M1} P(92,37);d(298);d(51) { join( meet( skol2, one )
% 9.24/9.64 , zero ) ==> skol2 }.
% 9.24/9.64 (304) {G12,W5,D3,L1,V0,M1} P(68,37);d(60);d(269);d(51) { join( zero, zero )
% 9.24/9.64 ==> zero }.
% 9.24/9.64 (309) {G2,W10,D5,L1,V2,M1} P(3,37) { join( meet( X, complement( Y ) ), meet
% 9.24/9.64 ( X, Y ) ) ==> X }.
% 9.24/9.64 (312) {G2,W7,D4,L1,V1,M1} P(21,37);d(51) { join( meet( X, X ), zero ) ==> X
% 9.24/9.64 }.
% 9.24/9.64 (316) {G2,W7,D4,L1,V1,M1} P(12,37);d(3) { join( zero, meet( X, X ) ) ==> X
% 9.24/9.64 }.
% 9.24/9.64 (319) {G10,W5,D3,L1,V1,M1} P(298,129);d(109) { join( X, top ) ==> top }.
% 9.24/9.64 (320) {G11,W7,D4,L1,V1,M1} P(319,37);d(51) { join( meet( X, top ), zero )
% 9.24/9.64 ==> X }.
% 9.24/9.64 (321) {G13,W9,D4,L1,V1,M1} P(304,28) { join( join( zero, X ), zero ) ==>
% 9.24/9.64 join( zero, X ) }.
% 9.24/9.64 (329) {G12,W6,D4,L1,V1,M1} P(320,24);d(319) { join( X, complement( zero ) )
% 9.24/9.64 ==> top }.
% 9.24/9.64 (331) {G12,W7,D4,L1,V1,M1} P(52,320) { join( meet( top, X ), zero ) ==> X
% 9.24/9.64 }.
% 9.24/9.64 (332) {G12,W7,D4,L1,V1,M1} P(320,0) { join( zero, meet( X, top ) ) ==> X
% 9.24/9.64 }.
% 9.24/9.64 (336) {G13,W4,D3,L1,V0,M1} P(329,10) { complement( zero ) ==> top }.
% 9.24/9.64 (337) {G13,W5,D3,L1,V1,M1} P(329,3);d(51) { meet( X, zero ) ==> zero }.
% 9.24/9.64 (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero, X ) ==> zero
% 9.24/9.64 }.
% 9.24/9.64 (348) {G13,W8,D5,L1,V1,M1} P(332,24);d(319) { join( X, complement( meet( X
% 9.24/9.64 , top ) ) ) ==> top }.
% 9.24/9.64 (363) {G6,W7,D4,L1,V0,M1} P(52,300) { join( meet( one, skol1 ), zero ) ==>
% 9.24/9.64 skol1 }.
% 9.24/9.64 (382) {G6,W7,D4,L1,V0,M1} P(52,302) { join( meet( one, skol2 ), zero ) ==>
% 9.24/9.64 skol2 }.
% 9.24/9.64 (438) {G14,W8,D5,L1,V1,M1} P(348,0) { join( complement( meet( X, top ) ), X
% 9.24/9.64 ) ==> top }.
% 9.24/9.64 (472) {G15,W8,D5,L1,V1,M1} P(52,438) { join( complement( meet( top, X ) ),
% 9.24/9.64 X ) ==> top }.
% 9.24/9.64 (475) {G11,W14,D6,L1,V4,M1} P(62,24);d(319) { join( join( X, composition(
% 9.24/9.64 join( Y, T ), Z ) ), complement( composition( T, Z ) ) ) ==> top }.
% 9.24/9.64 (477) {G5,W12,D5,L1,V3,M1} P(21,62);d(298) { join( complement( composition
% 9.24/9.64 ( X, Y ) ), composition( join( X, Z ), Y ) ) ==> top }.
% 9.24/9.64 (610) {G14,W7,D4,L1,V1,M1} P(329,74);d(336) { join( X, converse( top ) )
% 9.24/9.64 ==> converse( top ) }.
% 9.24/9.64 (614) {G2,W9,D6,L1,V1,M1} P(11,74) { join( X, converse( complement(
% 9.24/9.64 converse( X ) ) ) ) ==> converse( top ) }.
% 9.24/9.64 (616) {G16,W4,D3,L1,V0,M1} P(610,472) { converse( top ) ==> top }.
% 9.24/9.64 (618) {G17,W9,D4,L1,V1,M1} P(616,9) { composition( top, converse( X ) ) ==>
% 9.24/9.64 converse( composition( X, top ) ) }.
% 9.24/9.64 (634) {G17,W8,D6,L1,V1,M1} P(21,75);d(616) { join( converse( complement(
% 9.24/9.64 converse( X ) ) ), X ) ==> top }.
% 9.24/9.64 (641) {G18,W8,D6,L1,V0,M1} P(634,30);d(298) { join( converse( complement(
% 9.24/9.64 converse( skol2 ) ) ), one ) ==> top }.
% 9.24/9.64 (642) {G18,W8,D6,L1,V0,M1} P(634,29);d(298) { join( converse( complement(
% 9.24/9.64 converse( skol1 ) ) ), one ) ==> top }.
% 9.24/9.64 (645) {G19,W8,D5,L1,V0,M1} P(641,74);d(616) { join( complement( converse(
% 9.24/9.64 skol2 ) ), converse( one ) ) ==> top }.
% 9.24/9.64 (668) {G19,W8,D5,L1,V0,M1} P(642,74);d(616) { join( complement( converse(
% 9.24/9.64 skol1 ) ), converse( one ) ) ==> top }.
% 9.24/9.64 (694) {G18,W8,D4,L1,V0,M1} P(616,618) { converse( composition( top, top ) )
% 9.24/9.64 ==> composition( top, top ) }.
% 9.24/9.64 (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X }.
% 9.24/9.64 (713) {G15,W5,D3,L1,V1,M1} P(321,27);d(712);d(712) { join( zero, X ) ==> X
% 9.24/9.64 }.
% 9.24/9.64 (716) {G15,W7,D4,L1,V1,M1} P(712,54) { meet( X, top ) ==> complement(
% 9.24/9.64 complement( X ) ) }.
% 9.24/9.64 (717) {G15,W5,D3,L1,V0,M1} P(712,382) { meet( one, skol2 ) ==> skol2 }.
% 9.24/9.64 (718) {G15,W5,D3,L1,V0,M1} P(712,302) { meet( skol2, one ) ==> skol2 }.
% 9.24/9.64 (719) {G15,W5,D3,L1,V0,M1} P(712,363) { meet( one, skol1 ) ==> skol1 }.
% 9.24/9.64 (720) {G15,W5,D3,L1,V0,M1} P(712,300) { meet( skol1, one ) ==> skol1 }.
% 9.24/9.64 (721) {G15,W5,D3,L1,V1,M1} P(712,312) { meet( X, X ) ==> X }.
% 9.24/9.64 (722) {G15,W5,D3,L1,V1,M1} P(712,331) { meet( top, X ) ==> X }.
% 9.24/9.64 (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement( complement( X )
% 9.24/9.64 ) ==> X }.
% 9.24/9.64 (726) {G16,W10,D4,L1,V2,M1} P(722,47);d(51);d(713) { join( complement( X )
% 9.24/9.64 , complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 9.24/9.64 (727) {G16,W6,D4,L1,V1,M1} P(713,75);d(7) { join( converse( zero ), X ) ==>
% 9.24/9.64 X }.
% 9.24/9.64 (728) {G16,W9,D6,L1,V0,M1} P(717,37) { join( skol2, complement( join(
% 9.24/9.64 complement( one ), skol2 ) ) ) ==> one }.
% 9.24/9.64 (729) {G16,W9,D6,L1,V0,M1} P(719,37) { join( skol1, complement( join(
% 9.24/9.64 complement( one ), skol1 ) ) ) ==> one }.
% 9.24/9.64 (740) {G17,W10,D5,L1,V2,M1} P(723,3) { complement( join( X, complement( Y )
% 9.24/9.64 ) ) ==> meet( complement( X ), Y ) }.
% 9.24/9.64 (741) {G17,W10,D5,L1,V2,M1} P(723,3) { complement( join( complement( Y ), X
% 9.24/9.64 ) ) ==> meet( Y, complement( X ) ) }.
% 9.24/9.64 (742) {G17,W4,D3,L1,V0,M1} P(727,712) { converse( zero ) ==> zero }.
% 9.24/9.64 (748) {G17,W5,D3,L1,V1,M1} S(716);d(723) { meet( X, top ) ==> X }.
% 9.24/9.64 (784) {G17,W8,D6,L1,V1,M1} S(614);d(616) { join( X, converse( complement(
% 9.24/9.64 converse( X ) ) ) ) ==> top }.
% 9.24/9.64 (788) {G18,W9,D7,L1,V1,M1} P(784,37);d(51);d(712) { meet( X, converse(
% 9.24/9.64 complement( converse( complement( X ) ) ) ) ) ==> X }.
% 9.24/9.64 (798) {G2,W6,D4,L1,V1,M1} P(5,89);d(7) { composition( converse( one ), X )
% 9.24/9.64 ==> X }.
% 9.24/9.64 (804) {G3,W4,D3,L1,V0,M1} P(798,5) { converse( one ) ==> one }.
% 9.24/9.64 (805) {G4,W5,D3,L1,V1,M1} P(804,798) { composition( one, X ) ==> X }.
% 9.24/9.64 (808) {G20,W7,D5,L1,V0,M1} P(804,668) { join( complement( converse( skol1 )
% 9.24/9.64 ), one ) ==> top }.
% 9.24/9.64 (810) {G20,W7,D5,L1,V0,M1} P(804,645) { join( complement( converse( skol2 )
% 9.24/9.64 ), one ) ==> top }.
% 9.24/9.64 (818) {G5,W15,D5,L1,V3,M1} P(805,62) { join( join( Y, composition( Z, X ) )
% 9.24/9.64 , X ) = join( Y, composition( join( Z, one ), X ) ) }.
% 9.24/9.64 (833) {G21,W7,D4,L1,V0,M1} P(808,37);d(51);d(712) { meet( converse( skol1 )
% 9.24/9.64 , one ) ==> converse( skol1 ) }.
% 9.24/9.64 (836) {G22,W7,D4,L1,V0,M1} P(833,52) { meet( one, converse( skol1 ) ) ==>
% 9.24/9.64 converse( skol1 ) }.
% 9.24/9.64 (847) {G21,W7,D4,L1,V0,M1} P(810,37);d(51);d(712) { meet( converse( skol2 )
% 9.24/9.64 , one ) ==> converse( skol2 ) }.
% 9.24/9.64 (850) {G22,W7,D4,L1,V0,M1} P(847,52) { meet( one, converse( skol2 ) ) ==>
% 9.24/9.64 converse( skol2 ) }.
% 9.24/9.64 (933) {G17,W9,D6,L1,V1,M1} P(616,97);d(51);d(712) { composition( X,
% 9.24/9.64 complement( converse( composition( top, X ) ) ) ) ==> zero }.
% 9.24/9.64 (954) {G18,W9,D5,L1,V1,M1} P(88,933);d(616) { composition( converse( X ),
% 9.24/9.64 complement( composition( X, top ) ) ) ==> zero }.
% 9.24/9.64 (957) {G19,W8,D5,L1,V0,M1} P(694,933) { composition( top, complement(
% 9.24/9.64 composition( top, top ) ) ) ==> zero }.
% 9.24/9.64 (965) {G20,W8,D5,L1,V1,M1} P(957,6);d(712);d(319);d(957) { composition( X,
% 9.24/9.64 complement( composition( top, top ) ) ) ==> zero }.
% 9.24/9.64 (966) {G21,W5,D3,L1,V1,M1} P(957,4);d(965) { composition( X, zero ) ==>
% 9.24/9.64 zero }.
% 9.24/9.64 (968) {G22,W5,D3,L1,V1,M1} P(966,89);d(742) { composition( zero, X ) ==>
% 9.24/9.64 zero }.
% 9.24/9.64 (985) {G22,W10,D5,L1,V2,M1} P(954,14);d(337);d(966);d(339);d(712) { meet(
% 9.24/9.64 composition( X, Y ), complement( composition( X, top ) ) ) ==> zero }.
% 9.24/9.64 (1001) {G18,W10,D5,L1,V2,M1} S(37);d(741) { join( meet( X, Y ), meet( X,
% 9.24/9.64 complement( Y ) ) ) ==> X }.
% 9.24/9.64 (1003) {G11,W8,D5,L1,V2,M1} S(23);d(319) { join( join( Y, complement( X ) )
% 9.24/9.64 , X ) ==> top }.
% 9.24/9.64 (1039) {G18,W8,D5,L1,V0,M1} S(729);d(741) { join( skol1, meet( one,
% 9.24/9.64 complement( skol1 ) ) ) ==> one }.
% 9.24/9.64 (1054) {G19,W8,D5,L1,V0,M1} P(52,1039) { join( skol1, meet( complement(
% 9.24/9.64 skol1 ), one ) ) ==> one }.
% 9.24/9.64 (1098) {G18,W8,D5,L1,V0,M1} S(728);d(741) { join( skol2, meet( one,
% 9.24/9.64 complement( skol2 ) ) ) ==> one }.
% 9.24/9.64 (1114) {G19,W8,D5,L1,V0,M1} P(1098,0) { join( meet( one, complement( skol2
% 9.24/9.64 ) ), skol2 ) ==> one }.
% 9.24/9.64 (1174) {G19,W9,D7,L1,V1,M1} P(788,52) { meet( converse( complement(
% 9.24/9.64 converse( complement( X ) ) ) ), X ) ==> X }.
% 9.24/9.64 (1175) {G20,W10,D6,L1,V1,M1} P(723,1174) { meet( converse( complement(
% 9.24/9.64 converse( X ) ) ), complement( X ) ) ==> complement( X ) }.
% 9.24/9.64 (1180) {G17,W8,D5,L1,V2,M1} P(726,1003) { join( complement( meet( X, Y ) )
% 9.24/9.64 , Y ) ==> top }.
% 9.24/9.64 (1184) {G17,W10,D5,L1,V2,M1} P(723,726) { complement( meet( complement( X )
% 9.24/9.64 , Y ) ) ==> join( X, complement( Y ) ) }.
% 9.24/9.64 (1185) {G17,W10,D5,L1,V2,M1} P(723,726) { complement( meet( Y, complement(
% 9.24/9.64 X ) ) ) ==> join( complement( Y ), X ) }.
% 9.24/9.64 (1191) {G17,W14,D5,L1,V3,M1} P(726,27) { join( join( Z, complement( X ) ),
% 9.24/9.64 complement( Y ) ) ==> join( complement( meet( X, Y ) ), Z ) }.
% 9.24/9.64 (1192) {G17,W11,D7,L1,V2,M1} P(726,22) { join( complement( meet( join(
% 9.24/9.64 complement( X ), Y ), X ) ), Y ) ==> top }.
% 9.24/9.64 (1195) {G17,W9,D4,L1,V2,M1} P(726,0);d(726) { complement( meet( X, Y ) ) =
% 9.24/9.64 complement( meet( Y, X ) ) }.
% 9.24/9.64 (1215) {G18,W10,D5,L1,V3,M1} P(1180,27);d(298) { join( join( Y, Z ),
% 9.24/9.64 complement( meet( X, Y ) ) ) ==> top }.
% 9.24/9.64 (1221) {G18,W8,D5,L1,V2,M1} P(1180,0) { join( Y, complement( meet( X, Y ) )
% 9.24/9.64 ) ==> top }.
% 9.24/9.64 (1254) {G19,W9,D6,L1,V2,M1} P(1221,726) { complement( meet( X, meet( Y,
% 9.24/9.64 complement( X ) ) ) ) ==> top }.
% 9.24/9.64 (1264) {G19,W10,D5,L1,V3,M1} P(1221,27);d(298) { join( join( Z, X ),
% 9.24/9.64 complement( meet( Y, X ) ) ) ==> top }.
% 9.24/9.64 (1322) {G18,W10,D5,L1,V2,M1} P(1195,12) { meet( meet( X, Y ), complement(
% 9.24/9.64 meet( Y, X ) ) ) ==> zero }.
% 9.24/9.64 (1326) {G20,W8,D5,L1,V2,M1} P(1254,1174);d(616);d(51);d(742);d(339) { meet
% 9.24/9.64 ( X, meet( Y, complement( X ) ) ) ==> zero }.
% 9.24/9.64 (1328) {G21,W8,D4,L1,V2,M1} P(723,1326) { meet( complement( X ), meet( Y, X
% 9.24/9.64 ) ) ==> zero }.
% 9.24/9.64 (1330) {G21,W8,D5,L1,V2,M1} P(52,1326) { meet( Y, meet( complement( Y ), X
% 9.24/9.64 ) ) ==> zero }.
% 9.24/9.64 (1335) {G22,W7,D4,L1,V0,M1} P(847,1328) { meet( complement( one ), converse
% 9.24/9.64 ( skol2 ) ) ==> zero }.
% 9.24/9.64 (1336) {G22,W7,D4,L1,V0,M1} P(833,1328) { meet( complement( one ), converse
% 9.24/9.64 ( skol1 ) ) ==> zero }.
% 9.24/9.64 (1339) {G22,W8,D4,L1,V2,M1} P(1328,52) { meet( meet( Y, X ), complement( X
% 9.24/9.64 ) ) ==> zero }.
% 9.24/9.64 (1349) {G23,W8,D4,L1,V2,M1} P(52,1339) { meet( meet( Y, X ), complement( Y
% 9.24/9.64 ) ) ==> zero }.
% 9.24/9.64 (1351) {G24,W8,D5,L1,V2,M1} P(723,1349) { meet( meet( complement( X ), Y )
% 9.24/9.64 , X ) ==> zero }.
% 9.24/9.64 (1542) {G18,W5,D3,L1,V1,M1} P(721,1184);d(723) { join( X, X ) ==> X }.
% 9.24/9.64 (1551) {G19,W9,D4,L1,V2,M1} P(1542,28) { join( join( X, Y ), X ) ==> join(
% 9.24/9.64 X, Y ) }.
% 9.24/9.64 (1680) {G23,W8,D5,L1,V1,M1} P(954,143);d(985);d(712) { meet( X, complement
% 9.24/9.64 ( composition( X, top ) ) ) ==> zero }.
% 9.24/9.64 (1681) {G23,W15,D6,L1,V0,M1} P(720,143);d(5);d(836) { join( skol1, meet(
% 9.24/9.64 composition( skol1, converse( skol1 ) ), one ) ) ==> meet( composition(
% 9.24/9.64 skol1, converse( skol1 ) ), one ) }.
% 9.24/9.64 (1682) {G23,W15,D6,L1,V0,M1} P(718,143);d(5);d(850) { join( skol2, meet(
% 9.24/9.64 composition( skol2, converse( skol2 ) ), one ) ) ==> meet( composition(
% 9.24/9.64 skol2, converse( skol2 ) ), one ) }.
% 9.24/9.64 (1738) {G23,W8,D5,L1,V0,M1} P(1336,144);d(966);d(339);d(712) { meet(
% 9.24/9.64 composition( skol1, complement( one ) ), one ) ==> zero }.
% 9.24/9.64 (1739) {G23,W8,D5,L1,V0,M1} P(1335,144);d(966);d(339);d(712) { meet(
% 9.24/9.64 composition( skol2, complement( one ) ), one ) ==> zero }.
% 9.24/9.64 (1740) {G22,W9,D6,L1,V1,M1} P(61,144);d(966);d(339);d(712) { meet(
% 9.24/9.64 composition( X, complement( converse( X ) ) ), one ) ==> zero }.
% 9.24/9.64 (1752) {G24,W8,D5,L1,V0,M1} P(1738,1322);d(336);d(748) { meet( one,
% 9.24/9.64 composition( skol1, complement( one ) ) ) ==> zero }.
% 9.24/9.64 (1753) {G25,W7,D5,L1,V0,M1} P(1752,123);d(805);d(968);d(712) { meet(
% 9.24/9.64 converse( complement( one ) ), skol1 ) ==> zero }.
% 9.24/9.64 (1754) {G26,W7,D5,L1,V0,M1} P(1753,1322);d(336);d(748) { meet( skol1,
% 9.24/9.64 converse( complement( one ) ) ) ==> zero }.
% 9.24/9.64 (1755) {G27,W8,D5,L1,V0,M1} P(1754,144);d(966);d(339);d(712) { meet(
% 9.24/9.64 composition( complement( one ), skol1 ), one ) ==> zero }.
% 9.24/9.64 (1756) {G28,W8,D5,L1,V0,M1} P(1755,1322);d(336);d(748) { meet( one,
% 9.24/9.64 composition( complement( one ), skol1 ) ) ==> zero }.
% 9.24/9.64 (1757) {G24,W8,D5,L1,V0,M1} P(1739,1322);d(336);d(748) { meet( one,
% 9.24/9.64 composition( skol2, complement( one ) ) ) ==> zero }.
% 9.24/9.64 (1758) {G25,W7,D5,L1,V0,M1} P(1757,123);d(805);d(968);d(712) { meet(
% 9.24/9.64 converse( complement( one ) ), skol2 ) ==> zero }.
% 9.24/9.64 (1759) {G26,W7,D5,L1,V0,M1} P(1758,1322);d(336);d(748) { meet( skol2,
% 9.24/9.64 converse( complement( one ) ) ) ==> zero }.
% 9.24/9.64 (1760) {G27,W8,D5,L1,V0,M1} P(1759,144);d(966);d(339);d(712) { meet(
% 9.24/9.64 composition( complement( one ), skol2 ), one ) ==> zero }.
% 9.24/9.64 (1761) {G28,W8,D5,L1,V0,M1} P(1760,1322);d(336);d(748) { meet( one,
% 9.24/9.64 composition( complement( one ), skol2 ) ) ==> zero }.
% 9.24/9.64 (1798) {G23,W9,D5,L1,V1,M1} P(7,1740) { meet( composition( converse( X ),
% 9.24/9.64 complement( X ) ), one ) ==> zero }.
% 9.24/9.64 (1813) {G24,W9,D5,L1,V1,M1} P(1798,1322);d(336);d(748) { meet( one,
% 9.24/9.64 composition( converse( X ), complement( X ) ) ) ==> zero }.
% 9.24/9.64 (1818) {G25,W8,D5,L1,V1,M1} P(1813,123);d(805);d(968);d(712) { meet(
% 9.24/9.64 converse( complement( X ) ), converse( X ) ) ==> zero }.
% 9.24/9.64 (1839) {G26,W8,D6,L1,V1,M1} P(7,1818) { meet( converse( complement(
% 9.24/9.64 converse( X ) ) ), X ) ==> zero }.
% 9.24/9.64 (2319) {G27,W7,D5,L1,V1,M1} P(1839,1001);d(713);d(1175) { converse(
% 9.24/9.64 complement( converse( X ) ) ) ==> complement( X ) }.
% 9.24/9.64 (2327) {G29,W9,D6,L1,V0,M1} P(1761,1001);d(713) { meet( one, complement(
% 9.24/9.64 composition( complement( one ), skol2 ) ) ) ==> one }.
% 9.24/9.64 (2333) {G29,W9,D6,L1,V0,M1} P(1756,1001);d(713) { meet( one, complement(
% 9.24/9.64 composition( complement( one ), skol1 ) ) ) ==> one }.
% 9.24/9.64 (2339) {G24,W7,D4,L1,V1,M1} P(1680,1001);d(713);d(723) { meet( X,
% 9.24/9.64 composition( X, top ) ) ==> X }.
% 9.24/9.64 (2342) {G20,W7,D4,L1,V2,M1} P(1001,1551) { join( X, meet( X, Y ) ) ==> X
% 9.24/9.64 }.
% 9.24/9.64 (2348) {G22,W8,D5,L1,V2,M1} P(1330,1001);d(713);d(1184) { meet( X, join( X
% 9.24/9.64 , complement( Y ) ) ) ==> X }.
% 9.24/9.64 (2352) {G25,W9,D4,L1,V2,M1} P(1351,1001);d(712);d(723) { meet( meet( X, Y )
% 9.24/9.64 , X ) ==> meet( X, Y ) }.
% 9.24/9.64 (2364) {G19,W10,D5,L1,V2,M1} P(52,1001) { join( meet( Y, X ), meet( X,
% 9.24/9.64 complement( Y ) ) ) ==> X }.
% 9.24/9.64 (2365) {G19,W10,D5,L1,V2,M1} P(52,1001) { join( meet( X, Y ), meet(
% 9.24/9.64 complement( Y ), X ) ) ==> X }.
% 9.24/9.64 (2393) {G21,W7,D4,L1,V2,M1} P(52,2342) { join( X, meet( Y, X ) ) ==> X }.
% 9.24/9.64 (2394) {G21,W7,D4,L1,V2,M1} P(2342,0) { join( meet( X, Y ), X ) ==> X }.
% 9.24/9.64 (2414) {G22,W9,D6,L1,V2,M1} P(2393,74);d(7) { join( X, converse( meet( Y,
% 9.24/9.64 converse( X ) ) ) ) ==> X }.
% 9.24/9.64 (2425) {G22,W7,D4,L1,V2,M1} P(2393,0) { join( meet( Y, X ), X ) ==> X }.
% 9.24/9.64 (2488) {G25,W7,D4,L1,V1,M1} P(2339,52) { meet( composition( X, top ), X )
% 9.24/9.64 ==> X }.
% 9.24/9.64 (2491) {G26,W9,D6,L1,V1,M1} P(2488,1185);d(723) { join( complement(
% 9.24/9.64 composition( complement( X ), top ) ), X ) ==> X }.
% 9.24/9.64 (2525) {G28,W9,D4,L1,V2,M1} P(73,2319);d(2319) { complement( join( Y, X ) )
% 9.24/9.64 = complement( join( X, Y ) ) }.
% 9.24/9.64 (2528) {G28,W7,D4,L1,V1,M1} P(2319,7) { converse( complement( X ) ) ==>
% 9.24/9.64 complement( converse( X ) ) }.
% 9.24/9.64 (2572) {G23,W7,D4,L1,V2,M1} P(723,2348) { meet( Y, join( Y, X ) ) ==> Y }.
% 9.24/9.64 (2599) {G24,W7,D4,L1,V2,M1} P(2572,52) { meet( join( X, Y ), X ) ==> X }.
% 9.24/9.64 (2607) {G25,W9,D4,L1,V2,M1} P(2425,2599) { meet( Y, meet( X, Y ) ) ==> meet
% 9.24/9.64 ( X, Y ) }.
% 9.24/9.64 (2624) {G25,W7,D4,L1,V2,M1} P(0,2599) { meet( join( Y, X ), X ) ==> X }.
% 9.24/9.64 (2630) {G26,W8,D5,L1,V2,M1} P(2624,1349) { meet( Y, complement( join( X, Y
% 9.24/9.64 ) ) ) ==> zero }.
% 9.24/9.64 (2877) {G29,W10,D5,L1,V3,M1} P(1215,2525);d(51);d(741) { meet( meet( Z, X )
% 9.24/9.64 , complement( join( X, Y ) ) ) ==> zero }.
% 9.24/9.64 (2880) {G29,W10,D5,L1,V3,M1} P(1264,2525);d(51);d(741) { meet( meet( Z, Y )
% 9.24/9.64 , complement( join( X, Y ) ) ) ==> zero }.
% 9.24/9.64 (4371) {G30,W10,D5,L1,V3,M1} P(2394,2877) { meet( meet( Z, meet( X, Y ) ),
% 9.24/9.64 complement( X ) ) ==> zero }.
% 9.24/9.64 (4423) {G31,W10,D5,L1,V3,M1} P(2352,4371) { meet( meet( meet( X, Y ), Z ),
% 9.24/9.64 complement( X ) ) ==> zero }.
% 9.24/9.64 (4519) {G32,W10,D5,L1,V3,M1} P(2607,4423) { meet( meet( meet( Y, X ), Z ),
% 9.24/9.64 complement( X ) ) ==> zero }.
% 9.24/9.64 (4538) {G33,W10,D5,L1,V3,M1} P(4519,1322);d(336);d(748) { meet( complement
% 9.24/9.64 ( Y ), meet( meet( X, Y ), Z ) ) ==> zero }.
% 9.24/9.64 (4578) {G34,W10,D5,L1,V3,M1} P(2607,4538) { meet( complement( Y ), meet( Z
% 9.24/9.64 , meet( X, Y ) ) ) ==> zero }.
% 9.24/9.64 (4595) {G34,W10,D6,L1,V3,M1} P(723,4538) { meet( X, meet( meet( Y,
% 9.24/9.64 complement( X ) ), Z ) ) ==> zero }.
% 9.24/9.64 (4597) {G35,W10,D5,L1,V1,M1} P(2333,4578);d(723) { meet( composition(
% 9.24/9.64 complement( one ), skol1 ), meet( X, one ) ) ==> zero }.
% 9.24/9.64 (4599) {G35,W10,D5,L1,V1,M1} P(2327,4578);d(723) { meet( composition(
% 9.24/9.64 complement( one ), skol2 ), meet( X, one ) ) ==> zero }.
% 9.24/9.64 (5083) {G30,W11,D4,L1,V3,M1} P(2880,1001);d(713);d(723) { meet( meet( X, Y
% 9.24/9.64 ), join( Z, Y ) ) ==> meet( X, Y ) }.
% 9.24/9.64 (5815) {G20,W10,D5,L1,V2,M1} P(2364,0) { join( meet( Y, complement( X ) ),
% 9.24/9.64 meet( X, Y ) ) ==> Y }.
% 9.24/9.64 (6091) {G18,W10,D4,L1,V2,M1} P(723,740) { meet( complement( Y ), complement
% 9.24/9.64 ( X ) ) ==> complement( join( Y, X ) ) }.
% 9.24/9.64 (6092) {G18,W14,D6,L1,V3,M1} P(28,740) { complement( join( join( X,
% 9.24/9.64 complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 9.24/9.64 (6094) {G19,W14,D5,L1,V3,M1} P(740,6091);d(6092) { meet( meet( complement(
% 9.24/9.64 X ), Y ), complement( Z ) ) ==> meet( complement( join( X, Z ) ), Y ) }.
% 9.24/9.64 (6102) {G19,W15,D6,L1,V3,M1} P(1185,6091) { meet( join( complement( X ), Y
% 9.24/9.64 ), complement( Z ) ) ==> complement( join( meet( X, complement( Y ) ), Z
% 9.24/9.64 ) ) }.
% 9.24/9.64 (6736) {G36,W8,D5,L1,V0,M1} P(720,4597) { meet( composition( complement(
% 9.24/9.64 one ), skol1 ), skol1 ) ==> zero }.
% 9.24/9.64 (6737) {G36,W8,D5,L1,V0,M1} P(718,4597) { meet( composition( complement(
% 9.24/9.64 one ), skol1 ), skol2 ) ==> zero }.
% 9.24/9.64 (6742) {G37,W8,D5,L1,V0,M1} P(6736,1322);d(336);d(748) { meet( skol1,
% 9.24/9.64 composition( complement( one ), skol1 ) ) ==> zero }.
% 9.24/9.64 (6743) {G38,W9,D5,L1,V0,M1} P(6742,158);d(968);d(339);d(712) { meet(
% 9.24/9.64 composition( skol1, converse( skol1 ) ), complement( one ) ) ==> zero }.
% 9.24/9.64 (6748) {G37,W8,D5,L1,V0,M1} P(6737,1322);d(336);d(748) { meet( skol2,
% 9.24/9.64 composition( complement( one ), skol1 ) ) ==> zero }.
% 9.24/9.64 (6750) {G38,W8,D5,L1,V0,M1} P(6748,142);d(2528);d(804);d(966);d(339);d(712)
% 9.24/9.64 { meet( composition( complement( one ), skol2 ), skol1 ) ==> zero }.
% 9.24/9.64 (6753) {G39,W9,D6,L1,V0,M1} P(6750,5815);d(712) { meet( skol1, complement(
% 9.24/9.64 composition( complement( one ), skol2 ) ) ) ==> skol1 }.
% 9.24/9.64 (6773) {G39,W11,D5,L1,V0,M1} P(6743,309);d(713) { meet( composition( skol1
% 9.24/9.64 , converse( skol1 ) ), one ) ==> composition( skol1, converse( skol1 ) )
% 9.24/9.64 }.
% 9.24/9.64 (6947) {G40,W10,D5,L1,V0,M1} P(6753,1185) { join( complement( skol1 ),
% 9.24/9.64 composition( complement( one ), skol2 ) ) ==> complement( skol1 ) }.
% 9.24/9.64 (7402) {G36,W8,D5,L1,V0,M1} P(718,4599) { meet( composition( complement(
% 9.24/9.64 one ), skol2 ), skol2 ) ==> zero }.
% 9.24/9.64 (7408) {G37,W8,D5,L1,V0,M1} P(7402,1322);d(336);d(748) { meet( skol2,
% 9.24/9.64 composition( complement( one ), skol2 ) ) ==> zero }.
% 9.24/9.64 (7409) {G38,W9,D5,L1,V0,M1} P(7408,158);d(968);d(339);d(712) { meet(
% 9.24/9.64 composition( skol2, converse( skol2 ) ), complement( one ) ) ==> zero }.
% 9.24/9.64 (7412) {G39,W11,D5,L1,V0,M1} P(7409,309);d(713) { meet( composition( skol2
% 9.24/9.64 , converse( skol2 ) ), one ) ==> composition( skol2, converse( skol2 ) )
% 9.24/9.64 }.
% 9.24/9.64 (8676) {G20,W10,D5,L1,V2,M1} P(1114,475);d(805) { join( join( X, Y ),
% 9.24/9.64 complement( composition( skol2, Y ) ) ) ==> top }.
% 9.24/9.64 (8728) {G27,W8,D5,L1,V1,M1} P(2491,8676) { join( X, complement( composition
% 9.24/9.64 ( skol2, X ) ) ) ==> top }.
% 9.24/9.64 (8781) {G28,W8,D4,L1,V1,M1} P(8728,740);d(51) { meet( complement( X ),
% 9.24/9.64 composition( skol2, X ) ) ==> zero }.
% 9.24/9.64 (8812) {G29,W9,D4,L1,V1,M1} P(8781,2365);d(712) { meet( composition( skol2
% 9.24/9.64 , X ), X ) ==> composition( skol2, X ) }.
% 9.24/9.64 (8871) {G20,W8,D5,L1,V1,M1} P(1054,477);d(805) { join( complement(
% 9.24/9.64 composition( skol1, X ) ), X ) ==> top }.
% 9.24/9.64 (8885) {G21,W8,D4,L1,V1,M1} P(8871,741);d(51) { meet( composition( skol1, X
% 9.24/9.64 ), complement( X ) ) ==> zero }.
% 9.24/9.64 (8908) {G22,W9,D4,L1,V1,M1} P(8885,309);d(713) { meet( composition( skol1,
% 9.24/9.64 X ), X ) ==> composition( skol1, X ) }.
% 9.24/9.64 (9038) {G23,W8,D5,L1,V1,M1} P(8908,2414);d(88) { join( X, composition( X,
% 9.24/9.64 converse( skol1 ) ) ) ==> X }.
% 9.24/9.64 (9283) {G30,W8,D5,L1,V1,M1} P(8812,2414);d(88) { join( X, composition( X,
% 9.24/9.64 converse( skol2 ) ) ) ==> X }.
% 9.24/9.64 (9350) {G31,W9,D5,L1,V1,M1} P(9283,2630) { meet( composition( X, converse(
% 9.24/9.64 skol2 ) ), complement( X ) ) ==> zero }.
% 9.24/9.64 (9419) {G32,W9,D5,L1,V1,M1} P(723,9350) { meet( composition( complement( X
% 9.24/9.64 ), converse( skol2 ) ), X ) ==> zero }.
% 9.24/9.64 (9429) {G33,W9,D5,L1,V1,M1} P(9419,1322);d(336);d(748) { meet( X,
% 9.24/9.64 composition( complement( X ), converse( skol2 ) ) ) ==> zero }.
% 9.24/9.64 (9436) {G34,W8,D4,L1,V1,M1} P(9429,158);d(7);d(968);d(339);d(712) { meet(
% 9.24/9.64 composition( X, skol2 ), complement( X ) ) ==> zero }.
% 9.24/9.64 (9443) {G35,W9,D4,L1,V1,M1} P(9436,309);d(713) { meet( composition( X,
% 9.24/9.64 skol2 ), X ) ==> composition( X, skol2 ) }.
% 9.24/9.64 (19748) {G41,W11,D4,L1,V0,M1} P(6947,818);d(21) { join( complement( skol1 )
% 9.24/9.64 , composition( top, skol2 ) ) ==> join( complement( skol1 ), skol2 ) }.
% 9.24/9.64 (20239) {G40,W6,D4,L1,V0,M1} S(1681);d(6773);d(9038) { composition( skol1,
% 9.24/9.64 converse( skol1 ) ) ==> skol1 }.
% 9.24/9.64 (20240) {G40,W6,D4,L1,V0,M1} S(1682);d(7412);d(9283) { composition( skol2,
% 9.24/9.64 converse( skol2 ) ) ==> skol2 }.
% 9.24/9.64 (20290) {G41,W4,D3,L1,V0,M1} P(20239,88) { converse( skol1 ) ==> skol1 }.
% 9.24/9.64 (20352) {G42,W9,D4,L1,V1,M1} P(20290,88) { composition( skol1, converse( X
% 9.24/9.64 ) ) ==> converse( composition( X, skol1 ) ) }.
% 9.24/9.64 (20664) {G41,W4,D3,L1,V0,M1} P(20240,88) { converse( skol2 ) ==> skol2 }.
% 9.24/9.64 (20671) {G42,W5,D3,L1,V0,M1} P(20664,20240) { composition( skol2, skol2 )
% 9.24/9.64 ==> skol2 }.
% 9.24/9.64 (20721) {G42,W9,D4,L1,V1,M1} P(20664,89) { composition( converse( X ),
% 9.24/9.64 skol2 ) ==> converse( composition( skol2, X ) ) }.
% 9.24/9.64 (21266) {G43,W8,D4,L1,V0,M1} P(20290,20721) { converse( composition( skol2
% 9.24/9.64 , skol1 ) ) ==> composition( skol1, skol2 ) }.
% 9.24/9.64 (28543) {G29,W13,D5,L1,V3,M1} P(1191,2525);d(741);d(741);d(740) { meet( Z,
% 9.24/9.64 meet( complement( X ), Y ) ) ==> meet( meet( Y, Z ), complement( X ) )
% 9.24/9.64 }.
% 9.24/9.64 (28625) {G18,W10,D6,L1,V2,M1} P(1192,740);d(51);d(723);d(726) { meet( meet
% 9.24/9.64 ( complement( meet( X, Y ) ), X ), Y ) ==> zero }.
% 9.24/9.64 (28653) {G23,W11,D5,L1,V2,M1} P(28625,309);d(712);d(6094);d(2425) { meet(
% 9.24/9.64 complement( meet( X, Y ) ), X ) ==> meet( complement( Y ), X ) }.
% 9.24/9.64 (28654) {G31,W10,D5,L1,V2,M1} P(28625,5815);d(713);d(28543);d(1185);d(5083)
% 9.24/9.64 { meet( join( complement( X ), Y ), X ) ==> meet( X, Y ) }.
% 9.24/9.64 (28687) {G32,W10,D5,L1,V2,M1} P(28654,309);d(723);d(2599) { join( meet(
% 9.24/9.64 complement( X ), Y ), X ) ==> join( X, Y ) }.
% 9.24/9.64 (28702) {G32,W11,D4,L1,V2,M1} P(723,28654) { meet( join( X, Y ), complement
% 9.24/9.64 ( X ) ) ==> meet( complement( X ), Y ) }.
% 9.24/9.64 (28762) {G35,W9,D5,L1,V3,M1} P(4595,28687);d(713);d(723) { join( X, meet(
% 9.24/9.64 meet( Y, X ), Z ) ) ==> X }.
% 9.24/9.64 (28991) {G36,W9,D5,L1,V3,M1} P(28762,0) { join( meet( meet( Y, X ), Z ), X
% 9.24/9.64 ) ==> X }.
% 9.24/9.64 (29021) {G37,W9,D5,L1,V2,M1} P(9443,28991) { join( meet( composition( X,
% 9.24/9.64 skol2 ), Y ), X ) ==> X }.
% 9.24/9.64 (58377) {G42,W9,D4,L1,V0,M1} P(19748,28702);d(6102);d(740);d(28653);d(723);
% 9.24/9.64 d(723) { meet( skol1, composition( top, skol2 ) ) ==> meet( skol2, skol1
% 9.24/9.64 ) }.
% 9.24/9.64 (58587) {G44,W9,D4,L1,V0,M1} P(58377,158);d(748);d(20352);d(21266);d(748);d
% 9.24/9.64 (20664);d(6);d(2393) { composition( meet( skol2, skol1 ), skol2 ) ==>
% 9.24/9.64 composition( skol1, skol2 ) }.
% 9.24/9.64 (58592) {G43,W9,D4,L1,V0,M1} P(58377,52) { meet( composition( top, skol2 )
% 9.24/9.64 , skol1 ) ==> meet( skol2, skol1 ) }.
% 9.24/9.64 (58634) {G45,W13,D5,L1,V1,M1} P(58587,29021) { join( meet( composition(
% 9.24/9.64 skol1, skol2 ), X ), meet( skol2, skol1 ) ) ==> meet( skol2, skol1 ) }.
% 9.24/9.64 (58802) {G46,W7,D3,L1,V0,M1} P(58592,156);d(722);d(20352);d(20721);d(4);d(
% 9.24/9.64 20671);d(21266);d(58634);d(9443) { composition( skol1, skol2 ) ==> meet(
% 9.24/9.64 skol2, skol1 ) }.
% 9.24/9.64 (58866) {G47,W7,D3,L1,V0,M1} P(58802,18) { ! meet( skol1, skol2 ) ==> meet
% 9.24/9.64 ( skol2, skol1 ) }.
% 9.24/9.64 (58896) {G48,W0,D0,L0,V0,M0} P(52,58866);q { }.
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 % SZS output end Refutation
% 9.24/9.64 found a proof!
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Unprocessed initial clauses:
% 9.24/9.64
% 9.24/9.64 (58898) {G0,W7,D3,L1,V2,M1} { join( X, Y ) = join( Y, X ) }.
% 9.24/9.64 (58899) {G0,W11,D4,L1,V3,M1} { join( X, join( Y, Z ) ) = join( join( X, Y
% 9.24/9.64 ), Z ) }.
% 9.24/9.64 (58900) {G0,W14,D6,L1,V2,M1} { X = join( complement( join( complement( X )
% 9.24/9.64 , complement( Y ) ) ), complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.64 (58901) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) = complement( join( complement
% 9.24/9.64 ( X ), complement( Y ) ) ) }.
% 9.24/9.64 (58902) {G0,W11,D4,L1,V3,M1} { composition( X, composition( Y, Z ) ) =
% 9.24/9.64 composition( composition( X, Y ), Z ) }.
% 9.24/9.64 (58903) {G0,W5,D3,L1,V1,M1} { composition( X, one ) = X }.
% 9.24/9.64 (58904) {G0,W13,D4,L1,V3,M1} { composition( join( X, Y ), Z ) = join(
% 9.24/9.64 composition( X, Z ), composition( Y, Z ) ) }.
% 9.24/9.64 (58905) {G0,W5,D4,L1,V1,M1} { converse( converse( X ) ) = X }.
% 9.24/9.64 (58906) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) = join( converse(
% 9.24/9.64 X ), converse( Y ) ) }.
% 9.24/9.64 (58907) {G0,W10,D4,L1,V2,M1} { converse( composition( X, Y ) ) =
% 9.24/9.64 composition( converse( Y ), converse( X ) ) }.
% 9.24/9.64 (58908) {G0,W13,D6,L1,V2,M1} { join( composition( converse( X ),
% 9.24/9.64 complement( composition( X, Y ) ) ), complement( Y ) ) = complement( Y )
% 9.24/9.64 }.
% 9.24/9.64 (58909) {G0,W6,D4,L1,V1,M1} { top = join( X, complement( X ) ) }.
% 9.24/9.64 (58910) {G0,W6,D4,L1,V1,M1} { zero = meet( X, complement( X ) ) }.
% 9.24/9.64 (58911) {G0,W33,D7,L1,V3,M1} { join( meet( composition( X, Y ), Z ),
% 9.24/9.64 composition( meet( X, composition( Z, converse( Y ) ) ), meet( Y,
% 9.24/9.64 composition( converse( X ), Z ) ) ) ) = composition( meet( X, composition
% 9.24/9.64 ( Z, converse( Y ) ) ), meet( Y, composition( converse( X ), Z ) ) ) }.
% 9.24/9.64 (58912) {G0,W27,D8,L1,V3,M1} { join( meet( composition( X, Y ), Z ), meet
% 9.24/9.64 ( composition( X, meet( Y, composition( converse( X ), Z ) ) ), Z ) ) =
% 9.24/9.64 meet( composition( X, meet( Y, composition( converse( X ), Z ) ) ), Z )
% 9.24/9.64 }.
% 9.24/9.64 (58913) {G0,W27,D8,L1,V3,M1} { join( meet( composition( X, Y ), Z ), meet
% 9.24/9.64 ( composition( meet( X, composition( Z, converse( Y ) ) ), Y ), Z ) ) =
% 9.24/9.64 meet( composition( meet( X, composition( Z, converse( Y ) ) ), Y ), Z )
% 9.24/9.64 }.
% 9.24/9.64 (58914) {G0,W5,D3,L1,V0,M1} { join( skol1, one ) = one }.
% 9.24/9.64 (58915) {G0,W5,D3,L1,V0,M1} { join( skol2, one ) = one }.
% 9.24/9.64 (58916) {G0,W7,D3,L1,V0,M1} { ! composition( skol1, skol2 ) = meet( skol1
% 9.24/9.64 , skol2 ) }.
% 9.24/9.64
% 9.24/9.64
% 9.24/9.64 Total Proof:
% 9.24/9.64
% 9.24/9.64 subsumption: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.64 parent0: (58898) {G0,W7,D3,L1,V2,M1} { join( X, Y ) = join( Y, X ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join
% 9.24/9.64 ( join( X, Y ), Z ) }.
% 9.24/9.64 parent0: (58899) {G0,W11,D4,L1,V3,M1} { join( X, join( Y, Z ) ) = join(
% 9.24/9.64 join( X, Y ), Z ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (58919) {G0,W14,D6,L1,V2,M1} { join( complement( join( complement
% 9.24/9.64 ( X ), complement( Y ) ) ), complement( join( complement( X ), Y ) ) ) =
% 9.24/9.64 X }.
% 9.24/9.64 parent0[0]: (58900) {G0,W14,D6,L1,V2,M1} { X = join( complement( join(
% 9.24/9.64 complement( X ), complement( Y ) ) ), complement( join( complement( X ),
% 9.24/9.64 Y ) ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (2) {G0,W14,D6,L1,V2,M1} I { join( complement( join(
% 9.24/9.64 complement( X ), complement( Y ) ) ), complement( join( complement( X ),
% 9.24/9.64 Y ) ) ) ==> X }.
% 9.24/9.64 parent0: (58919) {G0,W14,D6,L1,V2,M1} { join( complement( join( complement
% 9.24/9.64 ( X ), complement( Y ) ) ), complement( join( complement( X ), Y ) ) ) =
% 9.24/9.64 X }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (58922) {G0,W10,D5,L1,V2,M1} { complement( join( complement( X ),
% 9.24/9.64 complement( Y ) ) ) = meet( X, Y ) }.
% 9.24/9.64 parent0[0]: (58901) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) = complement( join
% 9.24/9.64 ( complement( X ), complement( Y ) ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 9.24/9.64 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 9.24/9.64 parent0: (58922) {G0,W10,D5,L1,V2,M1} { complement( join( complement( X )
% 9.24/9.64 , complement( Y ) ) ) = meet( X, Y ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z
% 9.24/9.64 ) ) ==> composition( composition( X, Y ), Z ) }.
% 9.24/9.64 parent0: (58902) {G0,W11,D4,L1,V3,M1} { composition( X, composition( Y, Z
% 9.24/9.64 ) ) = composition( composition( X, Y ), Z ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 9.24/9.64 parent0: (58903) {G0,W5,D3,L1,V1,M1} { composition( X, one ) = X }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (58937) {G0,W13,D4,L1,V3,M1} { join( composition( X, Z ),
% 9.24/9.64 composition( Y, Z ) ) = composition( join( X, Y ), Z ) }.
% 9.24/9.64 parent0[0]: (58904) {G0,W13,D4,L1,V3,M1} { composition( join( X, Y ), Z )
% 9.24/9.64 = join( composition( X, Z ), composition( Y, Z ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 9.24/9.64 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 9.24/9.64 parent0: (58937) {G0,W13,D4,L1,V3,M1} { join( composition( X, Z ),
% 9.24/9.64 composition( Y, Z ) ) = composition( join( X, Y ), Z ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X
% 9.24/9.64 }.
% 9.24/9.64 parent0: (58905) {G0,W5,D4,L1,V1,M1} { converse( converse( X ) ) = X }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (58952) {G0,W10,D4,L1,V2,M1} { join( converse( X ), converse( Y )
% 9.24/9.64 ) = converse( join( X, Y ) ) }.
% 9.24/9.64 parent0[0]: (58906) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) = join
% 9.24/9.64 ( converse( X ), converse( Y ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y
% 9.24/9.64 ) ) ==> converse( join( X, Y ) ) }.
% 9.24/9.64 parent0: (58952) {G0,W10,D4,L1,V2,M1} { join( converse( X ), converse( Y )
% 9.24/9.64 ) = converse( join( X, Y ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (58961) {G0,W10,D4,L1,V2,M1} { composition( converse( Y ),
% 9.24/9.64 converse( X ) ) = converse( composition( X, Y ) ) }.
% 9.24/9.64 parent0[0]: (58907) {G0,W10,D4,L1,V2,M1} { converse( composition( X, Y ) )
% 9.24/9.64 = composition( converse( Y ), converse( X ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ),
% 9.24/9.64 converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 9.24/9.64 parent0: (58961) {G0,W10,D4,L1,V2,M1} { composition( converse( Y ),
% 9.24/9.64 converse( X ) ) = converse( composition( X, Y ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 9.24/9.64 , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement(
% 9.24/9.64 Y ) }.
% 9.24/9.64 parent0: (58908) {G0,W13,D6,L1,V2,M1} { join( composition( converse( X ),
% 9.24/9.64 complement( composition( X, Y ) ) ), complement( Y ) ) = complement( Y )
% 9.24/9.64 }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (58982) {G0,W6,D4,L1,V1,M1} { join( X, complement( X ) ) = top }.
% 9.24/9.64 parent0[0]: (58909) {G0,W6,D4,L1,V1,M1} { top = join( X, complement( X ) )
% 9.24/9.64 }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==>
% 9.24/9.64 top }.
% 9.24/9.64 parent0: (58982) {G0,W6,D4,L1,V1,M1} { join( X, complement( X ) ) = top
% 9.24/9.64 }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (58994) {G0,W6,D4,L1,V1,M1} { meet( X, complement( X ) ) = zero
% 9.24/9.64 }.
% 9.24/9.64 parent0[0]: (58910) {G0,W6,D4,L1,V1,M1} { zero = meet( X, complement( X )
% 9.24/9.64 ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (12) {G0,W6,D4,L1,V1,M1} I { meet( X, complement( X ) ) ==>
% 9.24/9.64 zero }.
% 9.24/9.64 parent0: (58994) {G0,W6,D4,L1,V1,M1} { meet( X, complement( X ) ) = zero
% 9.24/9.64 }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (13) {G0,W33,D7,L1,V3,M1} I { join( meet( composition( X, Y )
% 9.24/9.64 , Z ), composition( meet( X, composition( Z, converse( Y ) ) ), meet( Y,
% 9.24/9.64 composition( converse( X ), Z ) ) ) ) ==> composition( meet( X,
% 9.24/9.64 composition( Z, converse( Y ) ) ), meet( Y, composition( converse( X ), Z
% 9.24/9.64 ) ) ) }.
% 9.24/9.64 parent0: (58911) {G0,W33,D7,L1,V3,M1} { join( meet( composition( X, Y ), Z
% 9.24/9.64 ), composition( meet( X, composition( Z, converse( Y ) ) ), meet( Y,
% 9.24/9.64 composition( converse( X ), Z ) ) ) ) = composition( meet( X, composition
% 9.24/9.64 ( Z, converse( Y ) ) ), meet( Y, composition( converse( X ), Z ) ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (14) {G0,W27,D8,L1,V3,M1} I { join( meet( composition( X, Y )
% 9.24/9.64 , Z ), meet( composition( X, meet( Y, composition( converse( X ), Z ) ) )
% 9.24/9.64 , Z ) ) ==> meet( composition( X, meet( Y, composition( converse( X ), Z
% 9.24/9.64 ) ) ), Z ) }.
% 9.24/9.64 parent0: (58912) {G0,W27,D8,L1,V3,M1} { join( meet( composition( X, Y ), Z
% 9.24/9.64 ), meet( composition( X, meet( Y, composition( converse( X ), Z ) ) ), Z
% 9.24/9.64 ) ) = meet( composition( X, meet( Y, composition( converse( X ), Z ) ) )
% 9.24/9.64 , Z ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (15) {G0,W27,D8,L1,V3,M1} I { join( meet( composition( X, Y )
% 9.24/9.64 , Z ), meet( composition( meet( X, composition( Z, converse( Y ) ) ), Y )
% 9.24/9.64 , Z ) ) ==> meet( composition( meet( X, composition( Z, converse( Y ) ) )
% 9.24/9.64 , Y ), Z ) }.
% 9.24/9.64 parent0: (58913) {G0,W27,D8,L1,V3,M1} { join( meet( composition( X, Y ), Z
% 9.24/9.64 ), meet( composition( meet( X, composition( Z, converse( Y ) ) ), Y ), Z
% 9.24/9.64 ) ) = meet( composition( meet( X, composition( Z, converse( Y ) ) ), Y )
% 9.24/9.64 , Z ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (16) {G0,W5,D3,L1,V0,M1} I { join( skol1, one ) ==> one }.
% 9.24/9.64 parent0: (58914) {G0,W5,D3,L1,V0,M1} { join( skol1, one ) = one }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (17) {G0,W5,D3,L1,V0,M1} I { join( skol2, one ) ==> one }.
% 9.24/9.64 parent0: (58915) {G0,W5,D3,L1,V0,M1} { join( skol2, one ) = one }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (18) {G0,W7,D3,L1,V0,M1} I { ! composition( skol1, skol2 ) ==>
% 9.24/9.64 meet( skol1, skol2 ) }.
% 9.24/9.64 parent0: (58916) {G0,W7,D3,L1,V0,M1} { ! composition( skol1, skol2 ) =
% 9.24/9.64 meet( skol1, skol2 ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59088) {G0,W5,D3,L1,V0,M1} { one ==> join( skol1, one ) }.
% 9.24/9.64 parent0[0]: (16) {G0,W5,D3,L1,V0,M1} I { join( skol1, one ) ==> one }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59089) {G1,W5,D3,L1,V0,M1} { one ==> join( one, skol1 ) }.
% 9.24/9.64 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.64 parent1[0; 2]: (59088) {G0,W5,D3,L1,V0,M1} { one ==> join( skol1, one )
% 9.24/9.64 }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := skol1
% 9.24/9.64 Y := one
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59092) {G1,W5,D3,L1,V0,M1} { join( one, skol1 ) ==> one }.
% 9.24/9.64 parent0[0]: (59089) {G1,W5,D3,L1,V0,M1} { one ==> join( one, skol1 ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (19) {G1,W5,D3,L1,V0,M1} P(0,16) { join( one, skol1 ) ==> one
% 9.24/9.64 }.
% 9.24/9.64 parent0: (59092) {G1,W5,D3,L1,V0,M1} { join( one, skol1 ) ==> one }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59093) {G0,W5,D3,L1,V0,M1} { one ==> join( skol2, one ) }.
% 9.24/9.64 parent0[0]: (17) {G0,W5,D3,L1,V0,M1} I { join( skol2, one ) ==> one }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59094) {G1,W5,D3,L1,V0,M1} { one ==> join( one, skol2 ) }.
% 9.24/9.64 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.64 parent1[0; 2]: (59093) {G0,W5,D3,L1,V0,M1} { one ==> join( skol2, one )
% 9.24/9.64 }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := skol2
% 9.24/9.64 Y := one
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59097) {G1,W5,D3,L1,V0,M1} { join( one, skol2 ) ==> one }.
% 9.24/9.64 parent0[0]: (59094) {G1,W5,D3,L1,V0,M1} { one ==> join( one, skol2 ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (20) {G1,W5,D3,L1,V0,M1} P(0,17) { join( one, skol2 ) ==> one
% 9.24/9.64 }.
% 9.24/9.64 parent0: (59097) {G1,W5,D3,L1,V0,M1} { join( one, skol2 ) ==> one }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59098) {G0,W6,D4,L1,V1,M1} { top ==> join( X, complement( X ) )
% 9.24/9.64 }.
% 9.24/9.64 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 9.24/9.64 }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59099) {G1,W6,D4,L1,V1,M1} { top ==> join( complement( X ), X )
% 9.24/9.64 }.
% 9.24/9.64 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.64 parent1[0; 2]: (59098) {G0,W6,D4,L1,V1,M1} { top ==> join( X, complement(
% 9.24/9.64 X ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := complement( X )
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59102) {G1,W6,D4,L1,V1,M1} { join( complement( X ), X ) ==> top
% 9.24/9.64 }.
% 9.24/9.64 parent0[0]: (59099) {G1,W6,D4,L1,V1,M1} { top ==> join( complement( X ), X
% 9.24/9.64 ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (21) {G1,W6,D4,L1,V1,M1} P(11,0) { join( complement( X ), X )
% 9.24/9.64 ==> top }.
% 9.24/9.64 parent0: (59102) {G1,W6,D4,L1,V1,M1} { join( complement( X ), X ) ==> top
% 9.24/9.64 }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59103) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join( X
% 9.24/9.64 , join( Y, Z ) ) }.
% 9.24/9.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.64 join( X, Y ), Z ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59106) {G1,W10,D6,L1,V2,M1} { join( join( complement( join( X, Y
% 9.24/9.64 ) ), X ), Y ) ==> top }.
% 9.24/9.64 parent0[0]: (21) {G1,W6,D4,L1,V1,M1} P(11,0) { join( complement( X ), X )
% 9.24/9.64 ==> top }.
% 9.24/9.64 parent1[0; 9]: (59103) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 9.24/9.64 join( X, join( Y, Z ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := join( X, Y )
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := complement( join( X, Y ) )
% 9.24/9.64 Y := X
% 9.24/9.64 Z := Y
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (22) {G2,W10,D6,L1,V2,M1} P(1,21) { join( join( complement(
% 9.24/9.64 join( X, Y ) ), X ), Y ) ==> top }.
% 9.24/9.64 parent0: (59106) {G1,W10,D6,L1,V2,M1} { join( join( complement( join( X, Y
% 9.24/9.64 ) ), X ), Y ) ==> top }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59112) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join( X
% 9.24/9.64 , join( Y, Z ) ) }.
% 9.24/9.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.64 join( X, Y ), Z ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59117) {G1,W10,D5,L1,V2,M1} { join( join( X, complement( Y ) ),
% 9.24/9.64 Y ) ==> join( X, top ) }.
% 9.24/9.64 parent0[0]: (21) {G1,W6,D4,L1,V1,M1} P(11,0) { join( complement( X ), X )
% 9.24/9.64 ==> top }.
% 9.24/9.64 parent1[0; 9]: (59112) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 9.24/9.64 join( X, join( Y, Z ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := Y
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 Y := complement( Y )
% 9.24/9.64 Z := Y
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (23) {G2,W10,D5,L1,V2,M1} P(21,1) { join( join( Y, complement
% 9.24/9.64 ( X ) ), X ) ==> join( Y, top ) }.
% 9.24/9.64 parent0: (59117) {G1,W10,D5,L1,V2,M1} { join( join( X, complement( Y ) ),
% 9.24/9.64 Y ) ==> join( X, top ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := Y
% 9.24/9.64 Y := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59122) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join( X
% 9.24/9.64 , join( Y, Z ) ) }.
% 9.24/9.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.64 join( X, Y ), Z ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59125) {G1,W10,D4,L1,V2,M1} { join( join( X, Y ), complement( Y
% 9.24/9.64 ) ) ==> join( X, top ) }.
% 9.24/9.64 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 9.24/9.64 }.
% 9.24/9.64 parent1[0; 9]: (59122) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 9.24/9.64 join( X, join( Y, Z ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := Y
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := complement( Y )
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (24) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ),
% 9.24/9.64 complement( X ) ) ==> join( Y, top ) }.
% 9.24/9.64 parent0: (59125) {G1,W10,D4,L1,V2,M1} { join( join( X, Y ), complement( Y
% 9.24/9.64 ) ) ==> join( X, top ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := Y
% 9.24/9.64 Y := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59130) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join( X
% 9.24/9.64 , join( Y, Z ) ) }.
% 9.24/9.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.64 join( X, Y ), Z ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59132) {G1,W9,D4,L1,V1,M1} { join( join( X, one ), skol2 ) ==>
% 9.24/9.64 join( X, one ) }.
% 9.24/9.64 parent0[0]: (20) {G1,W5,D3,L1,V0,M1} P(0,17) { join( one, skol2 ) ==> one
% 9.24/9.64 }.
% 9.24/9.64 parent1[0; 8]: (59130) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 9.24/9.64 join( X, join( Y, Z ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 Y := one
% 9.24/9.64 Z := skol2
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (25) {G2,W9,D4,L1,V1,M1} P(20,1) { join( join( X, one ), skol2
% 9.24/9.64 ) ==> join( X, one ) }.
% 9.24/9.64 parent0: (59132) {G1,W9,D4,L1,V1,M1} { join( join( X, one ), skol2 ) ==>
% 9.24/9.64 join( X, one ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59136) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join( X
% 9.24/9.64 , join( Y, Z ) ) }.
% 9.24/9.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.64 join( X, Y ), Z ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59138) {G1,W9,D4,L1,V1,M1} { join( join( X, one ), skol1 ) ==>
% 9.24/9.64 join( X, one ) }.
% 9.24/9.64 parent0[0]: (19) {G1,W5,D3,L1,V0,M1} P(0,16) { join( one, skol1 ) ==> one
% 9.24/9.64 }.
% 9.24/9.64 parent1[0; 8]: (59136) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 9.24/9.64 join( X, join( Y, Z ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 Y := one
% 9.24/9.64 Z := skol1
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (26) {G2,W9,D4,L1,V1,M1} P(19,1) { join( join( X, one ), skol1
% 9.24/9.64 ) ==> join( X, one ) }.
% 9.24/9.64 parent0: (59138) {G1,W9,D4,L1,V1,M1} { join( join( X, one ), skol1 ) ==>
% 9.24/9.64 join( X, one ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59141) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join( X
% 9.24/9.64 , join( Y, Z ) ) }.
% 9.24/9.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.64 join( X, Y ), Z ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59144) {G1,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 9.24/9.64 join( Y, Z ), X ) }.
% 9.24/9.64 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.64 parent1[0; 6]: (59141) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 9.24/9.64 join( X, join( Y, Z ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := join( Y, Z )
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (27) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 9.24/9.64 join( join( Y, Z ), X ) }.
% 9.24/9.64 parent0: (59144) {G1,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 9.24/9.64 join( Y, Z ), X ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59158) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join( X
% 9.24/9.64 , join( Y, Z ) ) }.
% 9.24/9.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.64 join( X, Y ), Z ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59163) {G1,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 9.24/9.64 X, join( Z, Y ) ) }.
% 9.24/9.64 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.64 parent1[0; 8]: (59158) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 9.24/9.64 join( X, join( Y, Z ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := Y
% 9.24/9.64 Y := Z
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59176) {G1,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 9.24/9.64 join( X, Z ), Y ) }.
% 9.24/9.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.64 join( X, Y ), Z ) }.
% 9.24/9.64 parent1[0; 6]: (59163) {G1,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 9.24/9.64 join( X, join( Z, Y ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Z
% 9.24/9.64 Z := Y
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (28) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X
% 9.24/9.64 ) = join( join( Z, X ), Y ) }.
% 9.24/9.64 parent0: (59176) {G1,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 9.24/9.64 join( X, Z ), Y ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := Z
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59178) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join( X
% 9.24/9.64 , join( Y, Z ) ) }.
% 9.24/9.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.64 join( X, Y ), Z ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59180) {G1,W9,D4,L1,V1,M1} { join( join( X, skol1 ), one ) ==>
% 9.24/9.64 join( X, one ) }.
% 9.24/9.64 parent0[0]: (16) {G0,W5,D3,L1,V0,M1} I { join( skol1, one ) ==> one }.
% 9.24/9.64 parent1[0; 8]: (59178) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 9.24/9.64 join( X, join( Y, Z ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 Y := skol1
% 9.24/9.64 Z := one
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (29) {G1,W9,D4,L1,V1,M1} P(16,1) { join( join( X, skol1 ), one
% 9.24/9.64 ) ==> join( X, one ) }.
% 9.24/9.64 parent0: (59180) {G1,W9,D4,L1,V1,M1} { join( join( X, skol1 ), one ) ==>
% 9.24/9.64 join( X, one ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59184) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join( X
% 9.24/9.64 , join( Y, Z ) ) }.
% 9.24/9.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.64 join( X, Y ), Z ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59186) {G1,W9,D4,L1,V1,M1} { join( join( X, skol2 ), one ) ==>
% 9.24/9.64 join( X, one ) }.
% 9.24/9.64 parent0[0]: (17) {G0,W5,D3,L1,V0,M1} I { join( skol2, one ) ==> one }.
% 9.24/9.64 parent1[0; 8]: (59184) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 9.24/9.64 join( X, join( Y, Z ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 Y := skol2
% 9.24/9.64 Z := one
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (30) {G1,W9,D4,L1,V1,M1} P(17,1) { join( join( X, skol2 ), one
% 9.24/9.64 ) ==> join( X, one ) }.
% 9.24/9.64 parent0: (59186) {G1,W9,D4,L1,V1,M1} { join( join( X, skol2 ), one ) ==>
% 9.24/9.64 join( X, one ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59190) {G2,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join( X,
% 9.24/9.64 one ), skol2 ) }.
% 9.24/9.64 parent0[0]: (25) {G2,W9,D4,L1,V1,M1} P(20,1) { join( join( X, one ), skol2
% 9.24/9.64 ) ==> join( X, one ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59192) {G2,W8,D4,L1,V0,M1} { join( complement( one ), one ) ==>
% 9.24/9.64 join( top, skol2 ) }.
% 9.24/9.64 parent0[0]: (21) {G1,W6,D4,L1,V1,M1} P(11,0) { join( complement( X ), X )
% 9.24/9.64 ==> top }.
% 9.24/9.64 parent1[0; 6]: (59190) {G2,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join
% 9.24/9.64 ( X, one ), skol2 ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := one
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := complement( one )
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59193) {G2,W5,D3,L1,V0,M1} { top ==> join( top, skol2 ) }.
% 9.24/9.64 parent0[0]: (21) {G1,W6,D4,L1,V1,M1} P(11,0) { join( complement( X ), X )
% 9.24/9.64 ==> top }.
% 9.24/9.64 parent1[0; 1]: (59192) {G2,W8,D4,L1,V0,M1} { join( complement( one ), one
% 9.24/9.64 ) ==> join( top, skol2 ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := one
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59195) {G2,W5,D3,L1,V0,M1} { join( top, skol2 ) ==> top }.
% 9.24/9.64 parent0[0]: (59193) {G2,W5,D3,L1,V0,M1} { top ==> join( top, skol2 ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (31) {G3,W5,D3,L1,V0,M1} P(21,25) { join( top, skol2 ) ==> top
% 9.24/9.64 }.
% 9.24/9.64 parent0: (59195) {G2,W5,D3,L1,V0,M1} { join( top, skol2 ) ==> top }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59197) {G2,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join( X,
% 9.24/9.64 one ), skol2 ) }.
% 9.24/9.64 parent0[0]: (25) {G2,W9,D4,L1,V1,M1} P(20,1) { join( join( X, one ), skol2
% 9.24/9.64 ) ==> join( X, one ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59201) {G1,W9,D4,L1,V1,M1} { join( X, one ) ==> join( skol2,
% 9.24/9.64 join( X, one ) ) }.
% 9.24/9.64 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.64 parent1[0; 4]: (59197) {G2,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join
% 9.24/9.64 ( X, one ), skol2 ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := join( X, one )
% 9.24/9.64 Y := skol2
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59207) {G1,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join(
% 9.24/9.64 skol2, X ), one ) }.
% 9.24/9.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.64 join( X, Y ), Z ) }.
% 9.24/9.64 parent1[0; 4]: (59201) {G1,W9,D4,L1,V1,M1} { join( X, one ) ==> join(
% 9.24/9.64 skol2, join( X, one ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := skol2
% 9.24/9.64 Y := X
% 9.24/9.64 Z := one
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59208) {G1,W9,D4,L1,V1,M1} { join( join( skol2, X ), one ) ==>
% 9.24/9.64 join( X, one ) }.
% 9.24/9.64 parent0[0]: (59207) {G1,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join(
% 9.24/9.64 skol2, X ), one ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (32) {G3,W9,D4,L1,V1,M1} P(25,0);d(1) { join( join( skol2, X )
% 9.24/9.64 , one ) ==> join( X, one ) }.
% 9.24/9.64 parent0: (59208) {G1,W9,D4,L1,V1,M1} { join( join( skol2, X ), one ) ==>
% 9.24/9.64 join( X, one ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59209) {G3,W5,D3,L1,V0,M1} { top ==> join( top, skol2 ) }.
% 9.24/9.64 parent0[0]: (31) {G3,W5,D3,L1,V0,M1} P(21,25) { join( top, skol2 ) ==> top
% 9.24/9.64 }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59210) {G1,W5,D3,L1,V0,M1} { top ==> join( skol2, top ) }.
% 9.24/9.64 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.64 parent1[0; 2]: (59209) {G3,W5,D3,L1,V0,M1} { top ==> join( top, skol2 )
% 9.24/9.64 }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := top
% 9.24/9.64 Y := skol2
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59213) {G1,W5,D3,L1,V0,M1} { join( skol2, top ) ==> top }.
% 9.24/9.64 parent0[0]: (59210) {G1,W5,D3,L1,V0,M1} { top ==> join( skol2, top ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (35) {G4,W5,D3,L1,V0,M1} P(31,0) { join( skol2, top ) ==> top
% 9.24/9.64 }.
% 9.24/9.64 parent0: (59213) {G1,W5,D3,L1,V0,M1} { join( skol2, top ) ==> top }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59215) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join( X
% 9.24/9.64 , join( Y, Z ) ) }.
% 9.24/9.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.64 join( X, Y ), Z ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59217) {G1,W9,D4,L1,V1,M1} { join( join( X, skol2 ), top ) ==>
% 9.24/9.64 join( X, top ) }.
% 9.24/9.64 parent0[0]: (35) {G4,W5,D3,L1,V0,M1} P(31,0) { join( skol2, top ) ==> top
% 9.24/9.64 }.
% 9.24/9.64 parent1[0; 8]: (59215) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 9.24/9.64 join( X, join( Y, Z ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 Y := skol2
% 9.24/9.64 Z := top
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (36) {G5,W9,D4,L1,V1,M1} P(35,1) { join( join( X, skol2 ), top
% 9.24/9.64 ) ==> join( X, top ) }.
% 9.24/9.64 parent0: (59217) {G1,W9,D4,L1,V1,M1} { join( join( X, skol2 ), top ) ==>
% 9.24/9.64 join( X, top ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59222) {G1,W11,D6,L1,V2,M1} { join( meet( X, Y ), complement(
% 9.24/9.64 join( complement( X ), Y ) ) ) ==> X }.
% 9.24/9.64 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 9.24/9.64 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 9.24/9.64 parent1[0; 2]: (2) {G0,W14,D6,L1,V2,M1} I { join( complement( join(
% 9.24/9.64 complement( X ), complement( Y ) ) ), complement( join( complement( X ),
% 9.24/9.64 Y ) ) ) ==> X }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (37) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 9.24/9.64 complement( join( complement( X ), Y ) ) ) ==> X }.
% 9.24/9.64 parent0: (59222) {G1,W11,D6,L1,V2,M1} { join( meet( X, Y ), complement(
% 9.24/9.64 join( complement( X ), Y ) ) ) ==> X }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59224) {G5,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join( X,
% 9.24/9.64 skol2 ), top ) }.
% 9.24/9.64 parent0[0]: (36) {G5,W9,D4,L1,V1,M1} P(35,1) { join( join( X, skol2 ), top
% 9.24/9.64 ) ==> join( X, top ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59227) {G1,W9,D4,L1,V1,M1} { join( X, top ) ==> join( top, join
% 9.24/9.64 ( X, skol2 ) ) }.
% 9.24/9.64 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.64 parent1[0; 4]: (59224) {G5,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join
% 9.24/9.64 ( X, skol2 ), top ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := join( X, skol2 )
% 9.24/9.64 Y := top
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59240) {G1,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join( top
% 9.24/9.64 , X ), skol2 ) }.
% 9.24/9.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.64 join( X, Y ), Z ) }.
% 9.24/9.64 parent1[0; 4]: (59227) {G1,W9,D4,L1,V1,M1} { join( X, top ) ==> join( top
% 9.24/9.64 , join( X, skol2 ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := top
% 9.24/9.64 Y := X
% 9.24/9.64 Z := skol2
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59241) {G1,W9,D4,L1,V1,M1} { join( join( top, X ), skol2 ) ==>
% 9.24/9.64 join( X, top ) }.
% 9.24/9.64 parent0[0]: (59240) {G1,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join(
% 9.24/9.64 top, X ), skol2 ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (39) {G6,W9,D4,L1,V1,M1} P(36,0);d(1) { join( join( top, X ),
% 9.24/9.64 skol2 ) ==> join( X, top ) }.
% 9.24/9.64 parent0: (59241) {G1,W9,D4,L1,V1,M1} { join( join( top, X ), skol2 ) ==>
% 9.24/9.64 join( X, top ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59242) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join(
% 9.24/9.64 complement( X ), complement( Y ) ) ) }.
% 9.24/9.64 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 9.24/9.64 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59246) {G1,W15,D5,L1,V3,M1} { meet( X, join( complement( Y ),
% 9.24/9.64 complement( Z ) ) ) ==> complement( join( complement( X ), meet( Y, Z ) )
% 9.24/9.64 ) }.
% 9.24/9.64 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 9.24/9.64 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 9.24/9.64 parent1[0; 12]: (59242) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 9.24/9.64 ( join( complement( X ), complement( Y ) ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := Y
% 9.24/9.64 Y := Z
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 Y := join( complement( Y ), complement( Z ) )
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (47) {G1,W15,D5,L1,V3,M1} P(3,3) { meet( Z, join( complement(
% 9.24/9.64 X ), complement( Y ) ) ) ==> complement( join( complement( Z ), meet( X,
% 9.24/9.64 Y ) ) ) }.
% 9.24/9.64 parent0: (59246) {G1,W15,D5,L1,V3,M1} { meet( X, join( complement( Y ),
% 9.24/9.64 complement( Z ) ) ) ==> complement( join( complement( X ), meet( Y, Z ) )
% 9.24/9.64 ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := Z
% 9.24/9.64 Y := X
% 9.24/9.64 Z := Y
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59250) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join(
% 9.24/9.64 complement( X ), complement( Y ) ) ) }.
% 9.24/9.64 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 9.24/9.64 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59253) {G1,W7,D4,L1,V1,M1} { meet( complement( X ), X ) ==>
% 9.24/9.64 complement( top ) }.
% 9.24/9.64 parent0[0]: (21) {G1,W6,D4,L1,V1,M1} P(11,0) { join( complement( X ), X )
% 9.24/9.64 ==> top }.
% 9.24/9.64 parent1[0; 6]: (59250) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 9.24/9.64 ( join( complement( X ), complement( Y ) ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := complement( X )
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := complement( X )
% 9.24/9.64 Y := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (49) {G2,W7,D4,L1,V1,M1} P(21,3) { meet( complement( X ), X )
% 9.24/9.64 ==> complement( top ) }.
% 9.24/9.64 parent0: (59253) {G1,W7,D4,L1,V1,M1} { meet( complement( X ), X ) ==>
% 9.24/9.64 complement( top ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59256) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join(
% 9.24/9.64 complement( X ), complement( Y ) ) ) }.
% 9.24/9.64 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 9.24/9.64 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59259) {G1,W7,D4,L1,V1,M1} { meet( X, complement( X ) ) ==>
% 9.24/9.64 complement( top ) }.
% 9.24/9.64 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 9.24/9.64 }.
% 9.24/9.64 parent1[0; 6]: (59256) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 9.24/9.64 ( join( complement( X ), complement( Y ) ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := complement( X )
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 Y := complement( X )
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59260) {G1,W4,D3,L1,V0,M1} { zero ==> complement( top ) }.
% 9.24/9.64 parent0[0]: (12) {G0,W6,D4,L1,V1,M1} I { meet( X, complement( X ) ) ==>
% 9.24/9.64 zero }.
% 9.24/9.64 parent1[0; 1]: (59259) {G1,W7,D4,L1,V1,M1} { meet( X, complement( X ) )
% 9.24/9.64 ==> complement( top ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59261) {G1,W4,D3,L1,V0,M1} { complement( top ) ==> zero }.
% 9.24/9.64 parent0[0]: (59260) {G1,W4,D3,L1,V0,M1} { zero ==> complement( top ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.64 zero }.
% 9.24/9.64 parent0: (59261) {G1,W4,D3,L1,V0,M1} { complement( top ) ==> zero }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59262) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join(
% 9.24/9.64 complement( X ), complement( Y ) ) ) }.
% 9.24/9.64 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 9.24/9.64 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59264) {G1,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 9.24/9.64 ( complement( Y ), complement( X ) ) ) }.
% 9.24/9.64 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.64 parent1[0; 5]: (59262) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 9.24/9.64 ( join( complement( X ), complement( Y ) ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := complement( X )
% 9.24/9.64 Y := complement( Y )
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59266) {G1,W7,D3,L1,V2,M1} { meet( X, Y ) ==> meet( Y, X ) }.
% 9.24/9.64 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 9.24/9.64 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 9.24/9.64 parent1[0; 4]: (59264) {G1,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 9.24/9.64 ( join( complement( Y ), complement( X ) ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := Y
% 9.24/9.64 Y := X
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (52) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X
% 9.24/9.64 , Y ) }.
% 9.24/9.64 parent0: (59266) {G1,W7,D3,L1,V2,M1} { meet( X, Y ) ==> meet( Y, X ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := Y
% 9.24/9.64 Y := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59268) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join(
% 9.24/9.64 complement( X ), complement( Y ) ) ) }.
% 9.24/9.64 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 9.24/9.64 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59269) {G1,W9,D5,L1,V1,M1} { meet( top, X ) ==> complement( join
% 9.24/9.64 ( zero, complement( X ) ) ) }.
% 9.24/9.64 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.64 zero }.
% 9.24/9.64 parent1[0; 6]: (59268) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 9.24/9.64 ( join( complement( X ), complement( Y ) ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := top
% 9.24/9.64 Y := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59271) {G1,W9,D5,L1,V1,M1} { complement( join( zero, complement(
% 9.24/9.64 X ) ) ) ==> meet( top, X ) }.
% 9.24/9.64 parent0[0]: (59269) {G1,W9,D5,L1,V1,M1} { meet( top, X ) ==> complement(
% 9.24/9.64 join( zero, complement( X ) ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (53) {G2,W9,D5,L1,V1,M1} P(51,3) { complement( join( zero,
% 9.24/9.64 complement( X ) ) ) ==> meet( top, X ) }.
% 9.24/9.64 parent0: (59271) {G1,W9,D5,L1,V1,M1} { complement( join( zero, complement
% 9.24/9.64 ( X ) ) ) ==> meet( top, X ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59274) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join(
% 9.24/9.64 complement( X ), complement( Y ) ) ) }.
% 9.24/9.64 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 9.24/9.64 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59276) {G1,W9,D5,L1,V1,M1} { meet( X, top ) ==> complement( join
% 9.24/9.64 ( complement( X ), zero ) ) }.
% 9.24/9.64 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.64 zero }.
% 9.24/9.64 parent1[0; 8]: (59274) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 9.24/9.64 ( join( complement( X ), complement( Y ) ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 Y := top
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59278) {G1,W9,D5,L1,V1,M1} { complement( join( complement( X ),
% 9.24/9.64 zero ) ) ==> meet( X, top ) }.
% 9.24/9.64 parent0[0]: (59276) {G1,W9,D5,L1,V1,M1} { meet( X, top ) ==> complement(
% 9.24/9.64 join( complement( X ), zero ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (54) {G2,W9,D5,L1,V1,M1} P(51,3) { complement( join(
% 9.24/9.64 complement( X ), zero ) ) ==> meet( X, top ) }.
% 9.24/9.64 parent0: (59278) {G1,W9,D5,L1,V1,M1} { complement( join( complement( X ),
% 9.24/9.64 zero ) ) ==> meet( X, top ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59280) {G1,W6,D4,L1,V1,M1} { top ==> join( complement( X ), X )
% 9.24/9.64 }.
% 9.24/9.64 parent0[0]: (21) {G1,W6,D4,L1,V1,M1} P(11,0) { join( complement( X ), X )
% 9.24/9.64 ==> top }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59281) {G2,W5,D3,L1,V0,M1} { top ==> join( zero, top ) }.
% 9.24/9.64 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.64 zero }.
% 9.24/9.64 parent1[0; 3]: (59280) {G1,W6,D4,L1,V1,M1} { top ==> join( complement( X )
% 9.24/9.64 , X ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := top
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59282) {G2,W5,D3,L1,V0,M1} { join( zero, top ) ==> top }.
% 9.24/9.64 parent0[0]: (59281) {G2,W5,D3,L1,V0,M1} { top ==> join( zero, top ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (55) {G2,W5,D3,L1,V0,M1} P(51,21) { join( zero, top ) ==> top
% 9.24/9.64 }.
% 9.24/9.64 parent0: (59282) {G2,W5,D3,L1,V0,M1} { join( zero, top ) ==> top }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59284) {G0,W6,D4,L1,V1,M1} { top ==> join( X, complement( X ) )
% 9.24/9.64 }.
% 9.24/9.64 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 9.24/9.64 }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59285) {G1,W5,D3,L1,V0,M1} { top ==> join( top, zero ) }.
% 9.24/9.64 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.64 zero }.
% 9.24/9.64 parent1[0; 4]: (59284) {G0,W6,D4,L1,V1,M1} { top ==> join( X, complement(
% 9.24/9.64 X ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := top
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59286) {G1,W5,D3,L1,V0,M1} { join( top, zero ) ==> top }.
% 9.24/9.64 parent0[0]: (59285) {G1,W5,D3,L1,V0,M1} { top ==> join( top, zero ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (56) {G2,W5,D3,L1,V0,M1} P(51,11) { join( top, zero ) ==> top
% 9.24/9.64 }.
% 9.24/9.64 parent0: (59286) {G1,W5,D3,L1,V0,M1} { join( top, zero ) ==> top }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59288) {G0,W6,D4,L1,V1,M1} { zero ==> meet( X, complement( X ) )
% 9.24/9.64 }.
% 9.24/9.64 parent0[0]: (12) {G0,W6,D4,L1,V1,M1} I { meet( X, complement( X ) ) ==>
% 9.24/9.64 zero }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59289) {G1,W5,D3,L1,V0,M1} { zero ==> meet( top, zero ) }.
% 9.24/9.64 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.64 zero }.
% 9.24/9.64 parent1[0; 4]: (59288) {G0,W6,D4,L1,V1,M1} { zero ==> meet( X, complement
% 9.24/9.64 ( X ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := top
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59290) {G1,W5,D3,L1,V0,M1} { meet( top, zero ) ==> zero }.
% 9.24/9.64 parent0[0]: (59289) {G1,W5,D3,L1,V0,M1} { zero ==> meet( top, zero ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (57) {G2,W5,D3,L1,V0,M1} P(51,12) { meet( top, zero ) ==> zero
% 9.24/9.64 }.
% 9.24/9.64 parent0: (59290) {G1,W5,D3,L1,V0,M1} { meet( top, zero ) ==> zero }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59292) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join( X
% 9.24/9.64 , join( Y, Z ) ) }.
% 9.24/9.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.64 join( X, Y ), Z ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59294) {G1,W9,D4,L1,V1,M1} { join( join( X, zero ), top ) ==>
% 9.24/9.64 join( X, top ) }.
% 9.24/9.64 parent0[0]: (55) {G2,W5,D3,L1,V0,M1} P(51,21) { join( zero, top ) ==> top
% 9.24/9.64 }.
% 9.24/9.64 parent1[0; 8]: (59292) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 9.24/9.64 join( X, join( Y, Z ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 Y := zero
% 9.24/9.64 Z := top
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (58) {G3,W9,D4,L1,V1,M1} P(55,1) { join( join( X, zero ), top
% 9.24/9.64 ) ==> join( X, top ) }.
% 9.24/9.64 parent0: (59294) {G1,W9,D4,L1,V1,M1} { join( join( X, zero ), top ) ==>
% 9.24/9.64 join( X, top ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59298) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join( X
% 9.24/9.64 , join( Y, Z ) ) }.
% 9.24/9.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.64 join( X, Y ), Z ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59300) {G1,W9,D4,L1,V1,M1} { join( join( X, top ), zero ) ==>
% 9.24/9.64 join( X, top ) }.
% 9.24/9.64 parent0[0]: (56) {G2,W5,D3,L1,V0,M1} P(51,11) { join( top, zero ) ==> top
% 9.24/9.64 }.
% 9.24/9.64 parent1[0; 8]: (59298) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 9.24/9.64 join( X, join( Y, Z ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 Y := top
% 9.24/9.64 Z := zero
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (59) {G3,W9,D4,L1,V1,M1} P(56,1) { join( join( X, top ), zero
% 9.24/9.64 ) ==> join( X, top ) }.
% 9.24/9.64 parent0: (59300) {G1,W9,D4,L1,V1,M1} { join( join( X, top ), zero ) ==>
% 9.24/9.64 join( X, top ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59303) {G2,W5,D3,L1,V0,M1} { zero ==> meet( top, zero ) }.
% 9.24/9.64 parent0[0]: (57) {G2,W5,D3,L1,V0,M1} P(51,12) { meet( top, zero ) ==> zero
% 9.24/9.64 }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59304) {G2,W5,D3,L1,V0,M1} { zero ==> meet( zero, top ) }.
% 9.24/9.64 parent0[0]: (52) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 9.24/9.64 Y ) }.
% 9.24/9.64 parent1[0; 2]: (59303) {G2,W5,D3,L1,V0,M1} { zero ==> meet( top, zero )
% 9.24/9.64 }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := zero
% 9.24/9.64 Y := top
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59307) {G2,W5,D3,L1,V0,M1} { meet( zero, top ) ==> zero }.
% 9.24/9.64 parent0[0]: (59304) {G2,W5,D3,L1,V0,M1} { zero ==> meet( zero, top ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (60) {G3,W5,D3,L1,V0,M1} P(52,57) { meet( zero, top ) ==> zero
% 9.24/9.64 }.
% 9.24/9.64 parent0: (59307) {G2,W5,D3,L1,V0,M1} { meet( zero, top ) ==> zero }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59310) {G2,W6,D4,L1,V1,M1} { meet( complement( X ), X ) ==> zero
% 9.24/9.64 }.
% 9.24/9.64 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.64 zero }.
% 9.24/9.64 parent1[0; 5]: (49) {G2,W7,D4,L1,V1,M1} P(21,3) { meet( complement( X ), X
% 9.24/9.64 ) ==> complement( top ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (61) {G3,W6,D4,L1,V1,M1} S(49);d(51) { meet( complement( X ),
% 9.24/9.64 X ) ==> zero }.
% 9.24/9.64 parent0: (59310) {G2,W6,D4,L1,V1,M1} { meet( complement( X ), X ) ==> zero
% 9.24/9.64 }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.64 0 ==> 0
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 eqswap: (59313) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join( X
% 9.24/9.64 , join( Y, Z ) ) }.
% 9.24/9.64 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.64 join( X, Y ), Z ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := X
% 9.24/9.64 Y := Y
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 paramod: (59317) {G1,W17,D5,L1,V4,M1} { join( join( X, composition( Y, Z )
% 9.24/9.64 ), composition( T, Z ) ) ==> join( X, composition( join( Y, T ), Z ) )
% 9.24/9.64 }.
% 9.24/9.64 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 9.24/9.64 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 9.24/9.64 parent1[0; 12]: (59313) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 9.24/9.64 join( X, join( Y, Z ) ) }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := Y
% 9.24/9.64 Y := T
% 9.24/9.64 Z := Z
% 9.24/9.64 end
% 9.24/9.64 substitution1:
% 9.24/9.64 X := X
% 9.24/9.64 Y := composition( Y, Z )
% 9.24/9.64 Z := composition( T, Z )
% 9.24/9.64 end
% 9.24/9.64
% 9.24/9.64 subsumption: (62) {G1,W17,D5,L1,V4,M1} P(6,1) { join( join( T, composition
% 9.24/9.64 ( X, Y ) ), composition( Z, Y ) ) ==> join( T, composition( join( X, Z )
% 9.24/9.64 , Y ) ) }.
% 9.24/9.64 parent0: (59317) {G1,W17,D5,L1,V4,M1} { join( join( X, composition( Y, Z )
% 9.24/9.64 ), composition( T, Z ) ) ==> join( X, composition( join( Y, T ), Z ) )
% 9.24/9.64 }.
% 9.24/9.64 substitution0:
% 9.24/9.64 X := T
% 9.24/9.64 Y := X
% 9.24/9.64 Z := Y
% 9.24/9.64 T := Z
% 9.24/9.64 end
% 9.24/9.64 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59320) {G3,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join( X,
% 9.24/9.65 top ), zero ) }.
% 9.24/9.65 parent0[0]: (59) {G3,W9,D4,L1,V1,M1} P(56,1) { join( join( X, top ), zero )
% 9.24/9.65 ==> join( X, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59324) {G1,W9,D4,L1,V1,M1} { join( X, top ) ==> join( zero, join
% 9.24/9.65 ( X, top ) ) }.
% 9.24/9.65 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.65 parent1[0; 4]: (59320) {G3,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join
% 9.24/9.65 ( X, top ), zero ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := join( X, top )
% 9.24/9.65 Y := zero
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59330) {G1,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join( zero
% 9.24/9.65 , X ), top ) }.
% 9.24/9.65 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.65 join( X, Y ), Z ) }.
% 9.24/9.65 parent1[0; 4]: (59324) {G1,W9,D4,L1,V1,M1} { join( X, top ) ==> join( zero
% 9.24/9.65 , join( X, top ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := zero
% 9.24/9.65 Y := X
% 9.24/9.65 Z := top
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59331) {G1,W9,D4,L1,V1,M1} { join( join( zero, X ), top ) ==>
% 9.24/9.65 join( X, top ) }.
% 9.24/9.65 parent0[0]: (59330) {G1,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join(
% 9.24/9.65 zero, X ), top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (64) {G4,W9,D4,L1,V1,M1} P(59,0);d(1) { join( join( zero, X )
% 9.24/9.65 , top ) ==> join( X, top ) }.
% 9.24/9.65 parent0: (59331) {G1,W9,D4,L1,V1,M1} { join( join( zero, X ), top ) ==>
% 9.24/9.65 join( X, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59333) {G4,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join( zero
% 9.24/9.65 , X ), top ) }.
% 9.24/9.65 parent0[0]: (64) {G4,W9,D4,L1,V1,M1} P(59,0);d(1) { join( join( zero, X ),
% 9.24/9.65 top ) ==> join( X, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59334) {G1,W8,D4,L1,V0,M1} { join( complement( zero ), top ) ==>
% 9.24/9.65 join( top, top ) }.
% 9.24/9.65 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 9.24/9.65 }.
% 9.24/9.65 parent1[0; 6]: (59333) {G4,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join
% 9.24/9.65 ( zero, X ), top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := zero
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := complement( zero )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (68) {G5,W8,D4,L1,V0,M1} P(11,64) { join( complement( zero ),
% 9.24/9.65 top ) ==> join( top, top ) }.
% 9.24/9.65 parent0: (59334) {G1,W8,D4,L1,V0,M1} { join( complement( zero ), top ) ==>
% 9.24/9.65 join( top, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59336) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) ==> join(
% 9.24/9.65 converse( X ), converse( Y ) ) }.
% 9.24/9.65 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 9.24/9.65 ) ==> converse( join( X, Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59338) {G1,W10,D4,L1,V2,M1} { converse( join( Y, X ) ) ==> join
% 9.24/9.65 ( converse( X ), converse( Y ) ) }.
% 9.24/9.65 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.65 parent1[0; 2]: (59336) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) ==>
% 9.24/9.65 join( converse( X ), converse( Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59340) {G1,W9,D4,L1,V2,M1} { converse( join( X, Y ) ) ==>
% 9.24/9.65 converse( join( Y, X ) ) }.
% 9.24/9.65 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 9.24/9.65 ) ==> converse( join( X, Y ) ) }.
% 9.24/9.65 parent1[0; 5]: (59338) {G1,W10,D4,L1,V2,M1} { converse( join( Y, X ) ) ==>
% 9.24/9.65 join( converse( X ), converse( Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (73) {G1,W9,D4,L1,V2,M1} P(8,0);d(8) { converse( join( X, Y )
% 9.24/9.65 ) = converse( join( Y, X ) ) }.
% 9.24/9.65 parent0: (59340) {G1,W9,D4,L1,V2,M1} { converse( join( X, Y ) ) ==>
% 9.24/9.65 converse( join( Y, X ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59342) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) ==> join(
% 9.24/9.65 converse( X ), converse( Y ) ) }.
% 9.24/9.65 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 9.24/9.65 ) ==> converse( join( X, Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59343) {G1,W10,D5,L1,V2,M1} { converse( join( converse( X ), Y )
% 9.24/9.65 ) ==> join( X, converse( Y ) ) }.
% 9.24/9.65 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 9.24/9.65 parent1[0; 7]: (59342) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) ==>
% 9.24/9.65 join( converse( X ), converse( Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := converse( X )
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (74) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 9.24/9.65 ), Y ) ) ==> join( X, converse( Y ) ) }.
% 9.24/9.65 parent0: (59343) {G1,W10,D5,L1,V2,M1} { converse( join( converse( X ), Y )
% 9.24/9.65 ) ==> join( X, converse( Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59348) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) ==> join(
% 9.24/9.65 converse( X ), converse( Y ) ) }.
% 9.24/9.65 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 9.24/9.65 ) ==> converse( join( X, Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59350) {G1,W10,D5,L1,V2,M1} { converse( join( X, converse( Y ) )
% 9.24/9.65 ) ==> join( converse( X ), Y ) }.
% 9.24/9.65 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 9.24/9.65 parent1[0; 9]: (59348) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) ==>
% 9.24/9.65 join( converse( X ), converse( Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := converse( Y )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (75) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 9.24/9.65 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 9.24/9.65 parent0: (59350) {G1,W10,D5,L1,V2,M1} { converse( join( X, converse( Y ) )
% 9.24/9.65 ) ==> join( converse( X ), Y ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59354) {G0,W10,D4,L1,V2,M1} { converse( composition( Y, X ) ) ==>
% 9.24/9.65 composition( converse( X ), converse( Y ) ) }.
% 9.24/9.65 parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ),
% 9.24/9.65 converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59355) {G1,W10,D5,L1,V2,M1} { converse( composition( X, converse
% 9.24/9.65 ( Y ) ) ) ==> composition( Y, converse( X ) ) }.
% 9.24/9.65 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 9.24/9.65 parent1[0; 7]: (59354) {G0,W10,D4,L1,V2,M1} { converse( composition( Y, X
% 9.24/9.65 ) ) ==> composition( converse( X ), converse( Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := converse( Y )
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (88) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 9.24/9.65 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 9.24/9.65 parent0: (59355) {G1,W10,D5,L1,V2,M1} { converse( composition( X, converse
% 9.24/9.65 ( Y ) ) ) ==> composition( Y, converse( X ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59360) {G0,W10,D4,L1,V2,M1} { converse( composition( Y, X ) ) ==>
% 9.24/9.65 composition( converse( X ), converse( Y ) ) }.
% 9.24/9.65 parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ),
% 9.24/9.65 converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59362) {G1,W10,D5,L1,V2,M1} { converse( composition( converse( X
% 9.24/9.65 ), Y ) ) ==> composition( converse( Y ), X ) }.
% 9.24/9.65 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 9.24/9.65 parent1[0; 9]: (59360) {G0,W10,D4,L1,V2,M1} { converse( composition( Y, X
% 9.24/9.65 ) ) ==> composition( converse( X ), converse( Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := converse( X )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (89) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition(
% 9.24/9.65 converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 9.24/9.65 parent0: (59362) {G1,W10,D5,L1,V2,M1} { converse( composition( converse( X
% 9.24/9.65 ), Y ) ) ==> composition( converse( Y ), X ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59366) {G3,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join( skol2
% 9.24/9.65 , X ), one ) }.
% 9.24/9.65 parent0[0]: (32) {G3,W9,D4,L1,V1,M1} P(25,0);d(1) { join( join( skol2, X )
% 9.24/9.65 , one ) ==> join( X, one ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59367) {G1,W8,D4,L1,V0,M1} { join( complement( skol2 ), one )
% 9.24/9.65 ==> join( top, one ) }.
% 9.24/9.65 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 9.24/9.65 }.
% 9.24/9.65 parent1[0; 6]: (59366) {G3,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join
% 9.24/9.65 ( skol2, X ), one ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := skol2
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := complement( skol2 )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (92) {G4,W8,D4,L1,V0,M1} P(11,32) { join( complement( skol2 )
% 9.24/9.65 , one ) ==> join( top, one ) }.
% 9.24/9.65 parent0: (59367) {G1,W8,D4,L1,V0,M1} { join( complement( skol2 ), one )
% 9.24/9.65 ==> join( top, one ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59370) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 9.24/9.65 composition( converse( X ), complement( composition( X, Y ) ) ),
% 9.24/9.65 complement( Y ) ) }.
% 9.24/9.65 parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 9.24/9.65 , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement(
% 9.24/9.65 Y ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59372) {G1,W17,D7,L1,V2,M1} { complement( converse( X ) ) ==>
% 9.24/9.65 join( composition( converse( converse( Y ) ), complement( converse(
% 9.24/9.65 composition( X, Y ) ) ) ), complement( converse( X ) ) ) }.
% 9.24/9.65 parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ),
% 9.24/9.65 converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 9.24/9.65 parent1[0; 10]: (59370) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 9.24/9.65 composition( converse( X ), complement( composition( X, Y ) ) ),
% 9.24/9.65 complement( Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := converse( Y )
% 9.24/9.65 Y := converse( X )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59373) {G1,W15,D7,L1,V2,M1} { complement( converse( X ) ) ==>
% 9.24/9.65 join( composition( Y, complement( converse( composition( X, Y ) ) ) ),
% 9.24/9.65 complement( converse( X ) ) ) }.
% 9.24/9.65 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 9.24/9.65 parent1[0; 6]: (59372) {G1,W17,D7,L1,V2,M1} { complement( converse( X ) )
% 9.24/9.65 ==> join( composition( converse( converse( Y ) ), complement( converse(
% 9.24/9.65 composition( X, Y ) ) ) ), complement( converse( X ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59374) {G1,W15,D7,L1,V2,M1} { join( composition( Y, complement(
% 9.24/9.65 converse( composition( X, Y ) ) ) ), complement( converse( X ) ) ) ==>
% 9.24/9.65 complement( converse( X ) ) }.
% 9.24/9.65 parent0[0]: (59373) {G1,W15,D7,L1,V2,M1} { complement( converse( X ) ) ==>
% 9.24/9.65 join( composition( Y, complement( converse( composition( X, Y ) ) ) ),
% 9.24/9.65 complement( converse( X ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (97) {G1,W15,D7,L1,V2,M1} P(9,10);d(7) { join( composition( X
% 9.24/9.65 , complement( converse( composition( Y, X ) ) ) ), complement( converse(
% 9.24/9.65 Y ) ) ) ==> complement( converse( Y ) ) }.
% 9.24/9.65 parent0: (59374) {G1,W15,D7,L1,V2,M1} { join( composition( Y, complement(
% 9.24/9.65 converse( composition( X, Y ) ) ) ), complement( converse( X ) ) ) ==>
% 9.24/9.65 complement( converse( X ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59376) {G2,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join( X,
% 9.24/9.65 one ), skol1 ) }.
% 9.24/9.65 parent0[0]: (26) {G2,W9,D4,L1,V1,M1} P(19,1) { join( join( X, one ), skol1
% 9.24/9.65 ) ==> join( X, one ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59378) {G2,W8,D4,L1,V0,M1} { join( complement( one ), one ) ==>
% 9.24/9.65 join( top, skol1 ) }.
% 9.24/9.65 parent0[0]: (21) {G1,W6,D4,L1,V1,M1} P(11,0) { join( complement( X ), X )
% 9.24/9.65 ==> top }.
% 9.24/9.65 parent1[0; 6]: (59376) {G2,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join
% 9.24/9.65 ( X, one ), skol1 ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := one
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := complement( one )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59379) {G2,W5,D3,L1,V0,M1} { top ==> join( top, skol1 ) }.
% 9.24/9.65 parent0[0]: (21) {G1,W6,D4,L1,V1,M1} P(11,0) { join( complement( X ), X )
% 9.24/9.65 ==> top }.
% 9.24/9.65 parent1[0; 1]: (59378) {G2,W8,D4,L1,V0,M1} { join( complement( one ), one
% 9.24/9.65 ) ==> join( top, skol1 ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := one
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59381) {G2,W5,D3,L1,V0,M1} { join( top, skol1 ) ==> top }.
% 9.24/9.65 parent0[0]: (59379) {G2,W5,D3,L1,V0,M1} { top ==> join( top, skol1 ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (109) {G3,W5,D3,L1,V0,M1} P(21,26) { join( top, skol1 ) ==>
% 9.24/9.65 top }.
% 9.24/9.65 parent0: (59381) {G2,W5,D3,L1,V0,M1} { join( top, skol1 ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59383) {G2,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join( X,
% 9.24/9.65 one ), skol1 ) }.
% 9.24/9.65 parent0[0]: (26) {G2,W9,D4,L1,V1,M1} P(19,1) { join( join( X, one ), skol1
% 9.24/9.65 ) ==> join( X, one ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59387) {G1,W9,D4,L1,V1,M1} { join( X, one ) ==> join( skol1,
% 9.24/9.65 join( X, one ) ) }.
% 9.24/9.65 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.65 parent1[0; 4]: (59383) {G2,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join
% 9.24/9.65 ( X, one ), skol1 ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := join( X, one )
% 9.24/9.65 Y := skol1
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59393) {G1,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join(
% 9.24/9.65 skol1, X ), one ) }.
% 9.24/9.65 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.65 join( X, Y ), Z ) }.
% 9.24/9.65 parent1[0; 4]: (59387) {G1,W9,D4,L1,V1,M1} { join( X, one ) ==> join(
% 9.24/9.65 skol1, join( X, one ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := skol1
% 9.24/9.65 Y := X
% 9.24/9.65 Z := one
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59394) {G1,W9,D4,L1,V1,M1} { join( join( skol1, X ), one ) ==>
% 9.24/9.65 join( X, one ) }.
% 9.24/9.65 parent0[0]: (59393) {G1,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join(
% 9.24/9.65 skol1, X ), one ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (110) {G3,W9,D4,L1,V1,M1} P(26,0);d(1) { join( join( skol1, X
% 9.24/9.65 ), one ) ==> join( X, one ) }.
% 9.24/9.65 parent0: (59394) {G1,W9,D4,L1,V1,M1} { join( join( skol1, X ), one ) ==>
% 9.24/9.65 join( X, one ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59396) {G6,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join( top,
% 9.24/9.65 X ), skol2 ) }.
% 9.24/9.65 parent0[0]: (39) {G6,W9,D4,L1,V1,M1} P(36,0);d(1) { join( join( top, X ),
% 9.24/9.65 skol2 ) ==> join( X, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59398) {G4,W7,D3,L1,V0,M1} { join( skol1, top ) ==> join( top,
% 9.24/9.65 skol2 ) }.
% 9.24/9.65 parent0[0]: (109) {G3,W5,D3,L1,V0,M1} P(21,26) { join( top, skol1 ) ==> top
% 9.24/9.65 }.
% 9.24/9.65 parent1[0; 5]: (59396) {G6,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join
% 9.24/9.65 ( top, X ), skol2 ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := skol1
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59399) {G4,W5,D3,L1,V0,M1} { join( skol1, top ) ==> top }.
% 9.24/9.65 parent0[0]: (31) {G3,W5,D3,L1,V0,M1} P(21,25) { join( top, skol2 ) ==> top
% 9.24/9.65 }.
% 9.24/9.65 parent1[0; 4]: (59398) {G4,W7,D3,L1,V0,M1} { join( skol1, top ) ==> join(
% 9.24/9.65 top, skol2 ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (113) {G7,W5,D3,L1,V0,M1} P(109,39);d(31) { join( skol1, top )
% 9.24/9.65 ==> top }.
% 9.24/9.65 parent0: (59399) {G4,W5,D3,L1,V0,M1} { join( skol1, top ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59402) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join( X
% 9.24/9.65 , join( Y, Z ) ) }.
% 9.24/9.65 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.65 join( X, Y ), Z ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59404) {G1,W9,D4,L1,V1,M1} { join( join( X, top ), skol1 ) ==>
% 9.24/9.65 join( X, top ) }.
% 9.24/9.65 parent0[0]: (109) {G3,W5,D3,L1,V0,M1} P(21,26) { join( top, skol1 ) ==> top
% 9.24/9.65 }.
% 9.24/9.65 parent1[0; 8]: (59402) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 9.24/9.65 join( X, join( Y, Z ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := top
% 9.24/9.65 Z := skol1
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (114) {G4,W9,D4,L1,V1,M1} P(109,1) { join( join( X, top ),
% 9.24/9.65 skol1 ) ==> join( X, top ) }.
% 9.24/9.65 parent0: (59404) {G1,W9,D4,L1,V1,M1} { join( join( X, top ), skol1 ) ==>
% 9.24/9.65 join( X, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59408) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join( X
% 9.24/9.65 , join( Y, Z ) ) }.
% 9.24/9.65 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.65 join( X, Y ), Z ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59410) {G1,W9,D4,L1,V1,M1} { join( join( X, skol1 ), top ) ==>
% 9.24/9.65 join( X, top ) }.
% 9.24/9.65 parent0[0]: (113) {G7,W5,D3,L1,V0,M1} P(109,39);d(31) { join( skol1, top )
% 9.24/9.65 ==> top }.
% 9.24/9.65 parent1[0; 8]: (59408) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 9.24/9.65 join( X, join( Y, Z ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := skol1
% 9.24/9.65 Z := top
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (115) {G8,W9,D4,L1,V1,M1} P(113,1) { join( join( X, skol1 ),
% 9.24/9.65 top ) ==> join( X, top ) }.
% 9.24/9.65 parent0: (59410) {G1,W9,D4,L1,V1,M1} { join( join( X, skol1 ), top ) ==>
% 9.24/9.65 join( X, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59414) {G0,W33,D7,L1,V3,M1} { composition( meet( X, composition(
% 9.24/9.65 Z, converse( Y ) ) ), meet( Y, composition( converse( X ), Z ) ) ) ==>
% 9.24/9.65 join( meet( composition( X, Y ), Z ), composition( meet( X, composition(
% 9.24/9.65 Z, converse( Y ) ) ), meet( Y, composition( converse( X ), Z ) ) ) ) }.
% 9.24/9.65 parent0[0]: (13) {G0,W33,D7,L1,V3,M1} I { join( meet( composition( X, Y ),
% 9.24/9.65 Z ), composition( meet( X, composition( Z, converse( Y ) ) ), meet( Y,
% 9.24/9.65 composition( converse( X ), Z ) ) ) ) ==> composition( meet( X,
% 9.24/9.65 composition( Z, converse( Y ) ) ), meet( Y, composition( converse( X ), Z
% 9.24/9.65 ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59416) {G1,W36,D7,L1,V3,M1} { composition( meet( X, composition
% 9.24/9.65 ( Y, converse( converse( Z ) ) ) ), meet( converse( Z ), composition(
% 9.24/9.65 converse( X ), Y ) ) ) ==> join( meet( composition( X, converse( Z ) ), Y
% 9.24/9.65 ), composition( meet( X, composition( Y, Z ) ), meet( converse( Z ),
% 9.24/9.65 composition( converse( X ), Y ) ) ) ) }.
% 9.24/9.65 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 9.24/9.65 parent1[0; 28]: (59414) {G0,W33,D7,L1,V3,M1} { composition( meet( X,
% 9.24/9.65 composition( Z, converse( Y ) ) ), meet( Y, composition( converse( X ), Z
% 9.24/9.65 ) ) ) ==> join( meet( composition( X, Y ), Z ), composition( meet( X,
% 9.24/9.65 composition( Z, converse( Y ) ) ), meet( Y, composition( converse( X ), Z
% 9.24/9.65 ) ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Z
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := converse( Z )
% 9.24/9.65 Z := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59420) {G1,W34,D7,L1,V3,M1} { composition( meet( X, composition
% 9.24/9.65 ( Y, Z ) ), meet( converse( Z ), composition( converse( X ), Y ) ) ) ==>
% 9.24/9.65 join( meet( composition( X, converse( Z ) ), Y ), composition( meet( X,
% 9.24/9.65 composition( Y, Z ) ), meet( converse( Z ), composition( converse( X ), Y
% 9.24/9.65 ) ) ) ) }.
% 9.24/9.65 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 9.24/9.65 parent1[0; 6]: (59416) {G1,W36,D7,L1,V3,M1} { composition( meet( X,
% 9.24/9.65 composition( Y, converse( converse( Z ) ) ) ), meet( converse( Z ),
% 9.24/9.65 composition( converse( X ), Y ) ) ) ==> join( meet( composition( X,
% 9.24/9.65 converse( Z ) ), Y ), composition( meet( X, composition( Y, Z ) ), meet(
% 9.24/9.65 converse( Z ), composition( converse( X ), Y ) ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Z
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59422) {G1,W34,D7,L1,V3,M1} { join( meet( composition( X,
% 9.24/9.65 converse( Z ) ), Y ), composition( meet( X, composition( Y, Z ) ), meet(
% 9.24/9.65 converse( Z ), composition( converse( X ), Y ) ) ) ) ==> composition(
% 9.24/9.65 meet( X, composition( Y, Z ) ), meet( converse( Z ), composition(
% 9.24/9.65 converse( X ), Y ) ) ) }.
% 9.24/9.65 parent0[0]: (59420) {G1,W34,D7,L1,V3,M1} { composition( meet( X,
% 9.24/9.65 composition( Y, Z ) ), meet( converse( Z ), composition( converse( X ), Y
% 9.24/9.65 ) ) ) ==> join( meet( composition( X, converse( Z ) ), Y ), composition
% 9.24/9.65 ( meet( X, composition( Y, Z ) ), meet( converse( Z ), composition(
% 9.24/9.65 converse( X ), Y ) ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (123) {G1,W34,D7,L1,V3,M1} P(7,13) { join( meet( composition(
% 9.24/9.65 Y, converse( X ) ), Z ), composition( meet( Y, composition( Z, X ) ),
% 9.24/9.65 meet( converse( X ), composition( converse( Y ), Z ) ) ) ) ==>
% 9.24/9.65 composition( meet( Y, composition( Z, X ) ), meet( converse( X ),
% 9.24/9.65 composition( converse( Y ), Z ) ) ) }.
% 9.24/9.65 parent0: (59422) {G1,W34,D7,L1,V3,M1} { join( meet( composition( X,
% 9.24/9.65 converse( Z ) ), Y ), composition( meet( X, composition( Y, Z ) ), meet(
% 9.24/9.65 converse( Z ), composition( converse( X ), Y ) ) ) ) ==> composition(
% 9.24/9.65 meet( X, composition( Y, Z ) ), meet( converse( Z ), composition(
% 9.24/9.65 converse( X ), Y ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := Z
% 9.24/9.65 Z := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59427) {G8,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join( X,
% 9.24/9.65 skol1 ), top ) }.
% 9.24/9.65 parent0[0]: (115) {G8,W9,D4,L1,V1,M1} P(113,1) { join( join( X, skol1 ),
% 9.24/9.65 top ) ==> join( X, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59430) {G1,W9,D4,L1,V1,M1} { join( X, top ) ==> join( top, join
% 9.24/9.65 ( X, skol1 ) ) }.
% 9.24/9.65 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.65 parent1[0; 4]: (59427) {G8,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join
% 9.24/9.65 ( X, skol1 ), top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := join( X, skol1 )
% 9.24/9.65 Y := top
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59443) {G1,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join( top
% 9.24/9.65 , X ), skol1 ) }.
% 9.24/9.65 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.65 join( X, Y ), Z ) }.
% 9.24/9.65 parent1[0; 4]: (59430) {G1,W9,D4,L1,V1,M1} { join( X, top ) ==> join( top
% 9.24/9.65 , join( X, skol1 ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := top
% 9.24/9.65 Y := X
% 9.24/9.65 Z := skol1
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59444) {G1,W9,D4,L1,V1,M1} { join( join( top, X ), skol1 ) ==>
% 9.24/9.65 join( X, top ) }.
% 9.24/9.65 parent0[0]: (59443) {G1,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join(
% 9.24/9.65 top, X ), skol1 ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (129) {G9,W9,D4,L1,V1,M1} P(115,0);d(1) { join( join( top, X )
% 9.24/9.65 , skol1 ) ==> join( X, top ) }.
% 9.24/9.65 parent0: (59444) {G1,W9,D4,L1,V1,M1} { join( join( top, X ), skol1 ) ==>
% 9.24/9.65 join( X, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59446) {G0,W27,D8,L1,V3,M1} { meet( composition( X, meet( Y,
% 9.24/9.65 composition( converse( X ), Z ) ) ), Z ) ==> join( meet( composition( X,
% 9.24/9.65 Y ), Z ), meet( composition( X, meet( Y, composition( converse( X ), Z )
% 9.24/9.65 ) ), Z ) ) }.
% 9.24/9.65 parent0[0]: (14) {G0,W27,D8,L1,V3,M1} I { join( meet( composition( X, Y ),
% 9.24/9.65 Z ), meet( composition( X, meet( Y, composition( converse( X ), Z ) ) ),
% 9.24/9.65 Z ) ) ==> meet( composition( X, meet( Y, composition( converse( X ), Z )
% 9.24/9.65 ) ), Z ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59448) {G1,W30,D8,L1,V3,M1} { meet( composition( converse( X ),
% 9.24/9.65 meet( Y, composition( converse( converse( X ) ), Z ) ) ), Z ) ==> join(
% 9.24/9.65 meet( composition( converse( X ), Y ), Z ), meet( composition( converse(
% 9.24/9.65 X ), meet( Y, composition( X, Z ) ) ), Z ) ) }.
% 9.24/9.65 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 9.24/9.65 parent1[0; 27]: (59446) {G0,W27,D8,L1,V3,M1} { meet( composition( X, meet
% 9.24/9.65 ( Y, composition( converse( X ), Z ) ) ), Z ) ==> join( meet( composition
% 9.24/9.65 ( X, Y ), Z ), meet( composition( X, meet( Y, composition( converse( X )
% 9.24/9.65 , Z ) ) ), Z ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := converse( X )
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59449) {G1,W28,D7,L1,V3,M1} { meet( composition( converse( X ),
% 9.24/9.65 meet( Y, composition( X, Z ) ) ), Z ) ==> join( meet( composition(
% 9.24/9.65 converse( X ), Y ), Z ), meet( composition( converse( X ), meet( Y,
% 9.24/9.65 composition( X, Z ) ) ), Z ) ) }.
% 9.24/9.65 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 9.24/9.65 parent1[0; 8]: (59448) {G1,W30,D8,L1,V3,M1} { meet( composition( converse
% 9.24/9.65 ( X ), meet( Y, composition( converse( converse( X ) ), Z ) ) ), Z ) ==>
% 9.24/9.65 join( meet( composition( converse( X ), Y ), Z ), meet( composition(
% 9.24/9.65 converse( X ), meet( Y, composition( X, Z ) ) ), Z ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59451) {G1,W28,D7,L1,V3,M1} { join( meet( composition( converse(
% 9.24/9.65 X ), Y ), Z ), meet( composition( converse( X ), meet( Y, composition( X
% 9.24/9.65 , Z ) ) ), Z ) ) ==> meet( composition( converse( X ), meet( Y,
% 9.24/9.65 composition( X, Z ) ) ), Z ) }.
% 9.24/9.65 parent0[0]: (59449) {G1,W28,D7,L1,V3,M1} { meet( composition( converse( X
% 9.24/9.65 ), meet( Y, composition( X, Z ) ) ), Z ) ==> join( meet( composition(
% 9.24/9.65 converse( X ), Y ), Z ), meet( composition( converse( X ), meet( Y,
% 9.24/9.65 composition( X, Z ) ) ), Z ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (142) {G1,W28,D7,L1,V3,M1} P(7,14) { join( meet( composition(
% 9.24/9.65 converse( X ), Y ), Z ), meet( composition( converse( X ), meet( Y,
% 9.24/9.65 composition( X, Z ) ) ), Z ) ) ==> meet( composition( converse( X ), meet
% 9.24/9.65 ( Y, composition( X, Z ) ) ), Z ) }.
% 9.24/9.65 parent0: (59451) {G1,W28,D7,L1,V3,M1} { join( meet( composition( converse
% 9.24/9.65 ( X ), Y ), Z ), meet( composition( converse( X ), meet( Y, composition(
% 9.24/9.65 X, Z ) ) ), Z ) ) ==> meet( composition( converse( X ), meet( Y,
% 9.24/9.65 composition( X, Z ) ) ), Z ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59454) {G0,W27,D8,L1,V3,M1} { meet( composition( X, meet( Y,
% 9.24/9.65 composition( converse( X ), Z ) ) ), Z ) ==> join( meet( composition( X,
% 9.24/9.65 Y ), Z ), meet( composition( X, meet( Y, composition( converse( X ), Z )
% 9.24/9.65 ) ), Z ) ) }.
% 9.24/9.65 parent0[0]: (14) {G0,W27,D8,L1,V3,M1} I { join( meet( composition( X, Y ),
% 9.24/9.65 Z ), meet( composition( X, meet( Y, composition( converse( X ), Z ) ) ),
% 9.24/9.65 Z ) ) ==> meet( composition( X, meet( Y, composition( converse( X ), Z )
% 9.24/9.65 ) ), Z ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59457) {G1,W25,D8,L1,V2,M1} { meet( composition( X, meet( one,
% 9.24/9.65 composition( converse( X ), Y ) ) ), Y ) ==> join( meet( X, Y ), meet(
% 9.24/9.65 composition( X, meet( one, composition( converse( X ), Y ) ) ), Y ) ) }.
% 9.24/9.65 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 9.24/9.65 parent1[0; 13]: (59454) {G0,W27,D8,L1,V3,M1} { meet( composition( X, meet
% 9.24/9.65 ( Y, composition( converse( X ), Z ) ) ), Z ) ==> join( meet( composition
% 9.24/9.65 ( X, Y ), Z ), meet( composition( X, meet( Y, composition( converse( X )
% 9.24/9.65 , Z ) ) ), Z ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := one
% 9.24/9.65 Z := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59462) {G1,W25,D8,L1,V2,M1} { join( meet( X, Y ), meet(
% 9.24/9.65 composition( X, meet( one, composition( converse( X ), Y ) ) ), Y ) ) ==>
% 9.24/9.65 meet( composition( X, meet( one, composition( converse( X ), Y ) ) ), Y
% 9.24/9.65 ) }.
% 9.24/9.65 parent0[0]: (59457) {G1,W25,D8,L1,V2,M1} { meet( composition( X, meet( one
% 9.24/9.65 , composition( converse( X ), Y ) ) ), Y ) ==> join( meet( X, Y ), meet(
% 9.24/9.65 composition( X, meet( one, composition( converse( X ), Y ) ) ), Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (143) {G1,W25,D8,L1,V2,M1} P(5,14) { join( meet( X, Y ), meet
% 9.24/9.65 ( composition( X, meet( one, composition( converse( X ), Y ) ) ), Y ) )
% 9.24/9.65 ==> meet( composition( X, meet( one, composition( converse( X ), Y ) ) )
% 9.24/9.65 , Y ) }.
% 9.24/9.65 parent0: (59462) {G1,W25,D8,L1,V2,M1} { join( meet( X, Y ), meet(
% 9.24/9.65 composition( X, meet( one, composition( converse( X ), Y ) ) ), Y ) ) ==>
% 9.24/9.65 meet( composition( X, meet( one, composition( converse( X ), Y ) ) ), Y
% 9.24/9.65 ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59464) {G0,W27,D8,L1,V3,M1} { meet( composition( X, meet( Y,
% 9.24/9.65 composition( converse( X ), Z ) ) ), Z ) ==> join( meet( composition( X,
% 9.24/9.65 Y ), Z ), meet( composition( X, meet( Y, composition( converse( X ), Z )
% 9.24/9.65 ) ), Z ) ) }.
% 9.24/9.65 parent0[0]: (14) {G0,W27,D8,L1,V3,M1} I { join( meet( composition( X, Y ),
% 9.24/9.65 Z ), meet( composition( X, meet( Y, composition( converse( X ), Z ) ) ),
% 9.24/9.65 Z ) ) ==> meet( composition( X, meet( Y, composition( converse( X ), Z )
% 9.24/9.65 ) ), Z ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59466) {G1,W25,D7,L1,V2,M1} { meet( composition( X, meet( Y,
% 9.24/9.65 composition( converse( X ), one ) ) ), one ) ==> join( meet( composition
% 9.24/9.65 ( X, Y ), one ), meet( composition( X, meet( Y, converse( X ) ) ), one )
% 9.24/9.65 ) }.
% 9.24/9.65 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 9.24/9.65 parent1[0; 22]: (59464) {G0,W27,D8,L1,V3,M1} { meet( composition( X, meet
% 9.24/9.65 ( Y, composition( converse( X ), Z ) ) ), Z ) ==> join( meet( composition
% 9.24/9.65 ( X, Y ), Z ), meet( composition( X, meet( Y, composition( converse( X )
% 9.24/9.65 , Z ) ) ), Z ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := converse( X )
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := one
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59468) {G1,W23,D7,L1,V2,M1} { meet( composition( X, meet( Y,
% 9.24/9.65 converse( X ) ) ), one ) ==> join( meet( composition( X, Y ), one ), meet
% 9.24/9.65 ( composition( X, meet( Y, converse( X ) ) ), one ) ) }.
% 9.24/9.65 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 9.24/9.65 parent1[0; 6]: (59466) {G1,W25,D7,L1,V2,M1} { meet( composition( X, meet(
% 9.24/9.65 Y, composition( converse( X ), one ) ) ), one ) ==> join( meet(
% 9.24/9.65 composition( X, Y ), one ), meet( composition( X, meet( Y, converse( X )
% 9.24/9.65 ) ), one ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := converse( X )
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59470) {G1,W23,D7,L1,V2,M1} { join( meet( composition( X, Y ),
% 9.24/9.65 one ), meet( composition( X, meet( Y, converse( X ) ) ), one ) ) ==> meet
% 9.24/9.65 ( composition( X, meet( Y, converse( X ) ) ), one ) }.
% 9.24/9.65 parent0[0]: (59468) {G1,W23,D7,L1,V2,M1} { meet( composition( X, meet( Y,
% 9.24/9.65 converse( X ) ) ), one ) ==> join( meet( composition( X, Y ), one ), meet
% 9.24/9.65 ( composition( X, meet( Y, converse( X ) ) ), one ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (144) {G1,W23,D7,L1,V2,M1} P(5,14) { join( meet( composition(
% 9.24/9.65 X, Y ), one ), meet( composition( X, meet( Y, converse( X ) ) ), one ) )
% 9.24/9.65 ==> meet( composition( X, meet( Y, converse( X ) ) ), one ) }.
% 9.24/9.65 parent0: (59470) {G1,W23,D7,L1,V2,M1} { join( meet( composition( X, Y ),
% 9.24/9.65 one ), meet( composition( X, meet( Y, converse( X ) ) ), one ) ) ==> meet
% 9.24/9.65 ( composition( X, meet( Y, converse( X ) ) ), one ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59474) {G3,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join( skol1
% 9.24/9.65 , X ), one ) }.
% 9.24/9.65 parent0[0]: (110) {G3,W9,D4,L1,V1,M1} P(26,0);d(1) { join( join( skol1, X )
% 9.24/9.65 , one ) ==> join( X, one ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59475) {G1,W8,D4,L1,V0,M1} { join( complement( skol1 ), one )
% 9.24/9.65 ==> join( top, one ) }.
% 9.24/9.65 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 9.24/9.65 }.
% 9.24/9.65 parent1[0; 6]: (59474) {G3,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join
% 9.24/9.65 ( skol1, X ), one ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := skol1
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := complement( skol1 )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (151) {G4,W8,D4,L1,V0,M1} P(11,110) { join( complement( skol1
% 9.24/9.65 ), one ) ==> join( top, one ) }.
% 9.24/9.65 parent0: (59475) {G1,W8,D4,L1,V0,M1} { join( complement( skol1 ), one )
% 9.24/9.65 ==> join( top, one ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59477) {G0,W27,D8,L1,V3,M1} { meet( composition( meet( X,
% 9.24/9.65 composition( Z, converse( Y ) ) ), Y ), Z ) ==> join( meet( composition(
% 9.24/9.65 X, Y ), Z ), meet( composition( meet( X, composition( Z, converse( Y ) )
% 9.24/9.65 ), Y ), Z ) ) }.
% 9.24/9.65 parent0[0]: (15) {G0,W27,D8,L1,V3,M1} I { join( meet( composition( X, Y ),
% 9.24/9.65 Z ), meet( composition( meet( X, composition( Z, converse( Y ) ) ), Y ),
% 9.24/9.65 Z ) ) ==> meet( composition( meet( X, composition( Z, converse( Y ) ) ),
% 9.24/9.65 Y ), Z ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59478) {G1,W27,D8,L1,V3,M1} { meet( composition( meet( X,
% 9.24/9.65 composition( Y, converse( Z ) ) ), Z ), Y ) ==> join( meet( composition(
% 9.24/9.65 meet( X, composition( Y, converse( Z ) ) ), Z ), Y ), meet( composition(
% 9.24/9.65 X, Z ), Y ) ) }.
% 9.24/9.65 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.65 parent1[0; 11]: (59477) {G0,W27,D8,L1,V3,M1} { meet( composition( meet( X
% 9.24/9.65 , composition( Z, converse( Y ) ) ), Y ), Z ) ==> join( meet( composition
% 9.24/9.65 ( X, Y ), Z ), meet( composition( meet( X, composition( Z, converse( Y )
% 9.24/9.65 ) ), Y ), Z ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := meet( composition( X, Z ), Y )
% 9.24/9.65 Y := meet( composition( meet( X, composition( Y, converse( Z ) ) ), Z )
% 9.24/9.65 , Y )
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Z
% 9.24/9.65 Z := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59481) {G1,W27,D8,L1,V3,M1} { join( meet( composition( meet( X,
% 9.24/9.65 composition( Y, converse( Z ) ) ), Z ), Y ), meet( composition( X, Z ), Y
% 9.24/9.65 ) ) ==> meet( composition( meet( X, composition( Y, converse( Z ) ) ), Z
% 9.24/9.65 ), Y ) }.
% 9.24/9.65 parent0[0]: (59478) {G1,W27,D8,L1,V3,M1} { meet( composition( meet( X,
% 9.24/9.65 composition( Y, converse( Z ) ) ), Z ), Y ) ==> join( meet( composition(
% 9.24/9.65 meet( X, composition( Y, converse( Z ) ) ), Z ), Y ), meet( composition(
% 9.24/9.65 X, Z ), Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (156) {G1,W27,D8,L1,V3,M1} P(15,0) { join( meet( composition(
% 9.24/9.65 meet( X, composition( Z, converse( Y ) ) ), Y ), Z ), meet( composition(
% 9.24/9.65 X, Y ), Z ) ) ==> meet( composition( meet( X, composition( Z, converse( Y
% 9.24/9.65 ) ) ), Y ), Z ) }.
% 9.24/9.65 parent0: (59481) {G1,W27,D8,L1,V3,M1} { join( meet( composition( meet( X,
% 9.24/9.65 composition( Y, converse( Z ) ) ), Z ), Y ), meet( composition( X, Z ), Y
% 9.24/9.65 ) ) ==> meet( composition( meet( X, composition( Y, converse( Z ) ) ), Z
% 9.24/9.65 ), Y ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Z
% 9.24/9.65 Z := Y
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59483) {G0,W27,D8,L1,V3,M1} { meet( composition( meet( X,
% 9.24/9.65 composition( Z, converse( Y ) ) ), Y ), Z ) ==> join( meet( composition(
% 9.24/9.65 X, Y ), Z ), meet( composition( meet( X, composition( Z, converse( Y ) )
% 9.24/9.65 ), Y ), Z ) ) }.
% 9.24/9.65 parent0[0]: (15) {G0,W27,D8,L1,V3,M1} I { join( meet( composition( X, Y ),
% 9.24/9.65 Z ), meet( composition( meet( X, composition( Z, converse( Y ) ) ), Y ),
% 9.24/9.65 Z ) ) ==> meet( composition( meet( X, composition( Z, converse( Y ) ) ),
% 9.24/9.65 Y ), Z ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59485) {G1,W30,D8,L1,V3,M1} { meet( composition( meet( X,
% 9.24/9.65 composition( Y, converse( converse( Z ) ) ) ), converse( Z ) ), Y ) ==>
% 9.24/9.65 join( meet( composition( X, converse( Z ) ), Y ), meet( composition( meet
% 9.24/9.65 ( X, composition( Y, Z ) ), converse( Z ) ), Y ) ) }.
% 9.24/9.65 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 9.24/9.65 parent1[0; 26]: (59483) {G0,W27,D8,L1,V3,M1} { meet( composition( meet( X
% 9.24/9.65 , composition( Z, converse( Y ) ) ), Y ), Z ) ==> join( meet( composition
% 9.24/9.65 ( X, Y ), Z ), meet( composition( meet( X, composition( Z, converse( Y )
% 9.24/9.65 ) ), Y ), Z ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Z
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := converse( Z )
% 9.24/9.65 Z := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59486) {G1,W28,D7,L1,V3,M1} { meet( composition( meet( X,
% 9.24/9.65 composition( Y, Z ) ), converse( Z ) ), Y ) ==> join( meet( composition(
% 9.24/9.65 X, converse( Z ) ), Y ), meet( composition( meet( X, composition( Y, Z )
% 9.24/9.65 ), converse( Z ) ), Y ) ) }.
% 9.24/9.65 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 9.24/9.65 parent1[0; 7]: (59485) {G1,W30,D8,L1,V3,M1} { meet( composition( meet( X,
% 9.24/9.65 composition( Y, converse( converse( Z ) ) ) ), converse( Z ) ), Y ) ==>
% 9.24/9.65 join( meet( composition( X, converse( Z ) ), Y ), meet( composition( meet
% 9.24/9.65 ( X, composition( Y, Z ) ), converse( Z ) ), Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Z
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59488) {G1,W28,D7,L1,V3,M1} { join( meet( composition( X,
% 9.24/9.65 converse( Z ) ), Y ), meet( composition( meet( X, composition( Y, Z ) ),
% 9.24/9.65 converse( Z ) ), Y ) ) ==> meet( composition( meet( X, composition( Y, Z
% 9.24/9.65 ) ), converse( Z ) ), Y ) }.
% 9.24/9.65 parent0[0]: (59486) {G1,W28,D7,L1,V3,M1} { meet( composition( meet( X,
% 9.24/9.65 composition( Y, Z ) ), converse( Z ) ), Y ) ==> join( meet( composition(
% 9.24/9.65 X, converse( Z ) ), Y ), meet( composition( meet( X, composition( Y, Z )
% 9.24/9.65 ), converse( Z ) ), Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (158) {G1,W28,D7,L1,V3,M1} P(7,15) { join( meet( composition(
% 9.24/9.65 Y, converse( X ) ), Z ), meet( composition( meet( Y, composition( Z, X )
% 9.24/9.65 ), converse( X ) ), Z ) ) ==> meet( composition( meet( Y, composition( Z
% 9.24/9.65 , X ) ), converse( X ) ), Z ) }.
% 9.24/9.65 parent0: (59488) {G1,W28,D7,L1,V3,M1} { join( meet( composition( X,
% 9.24/9.65 converse( Z ) ), Y ), meet( composition( meet( X, composition( Y, Z ) ),
% 9.24/9.65 converse( Z ) ), Y ) ) ==> meet( composition( meet( X, composition( Y, Z
% 9.24/9.65 ) ), converse( Z ) ), Y ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := Z
% 9.24/9.65 Z := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59491) {G2,W9,D5,L1,V1,M1} { meet( top, X ) ==> complement( join
% 9.24/9.65 ( zero, complement( X ) ) ) }.
% 9.24/9.65 parent0[0]: (53) {G2,W9,D5,L1,V1,M1} P(51,3) { complement( join( zero,
% 9.24/9.65 complement( X ) ) ) ==> meet( top, X ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59492) {G2,W8,D4,L1,V0,M1} { meet( top, top ) ==> complement(
% 9.24/9.65 join( zero, zero ) ) }.
% 9.24/9.65 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.65 zero }.
% 9.24/9.65 parent1[0; 7]: (59491) {G2,W9,D5,L1,V1,M1} { meet( top, X ) ==> complement
% 9.24/9.65 ( join( zero, complement( X ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := top
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59493) {G2,W8,D4,L1,V0,M1} { complement( join( zero, zero ) ) ==>
% 9.24/9.65 meet( top, top ) }.
% 9.24/9.65 parent0[0]: (59492) {G2,W8,D4,L1,V0,M1} { meet( top, top ) ==> complement
% 9.24/9.65 ( join( zero, zero ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (182) {G3,W8,D4,L1,V0,M1} P(51,53) { complement( join( zero,
% 9.24/9.65 zero ) ) ==> meet( top, top ) }.
% 9.24/9.65 parent0: (59493) {G2,W8,D4,L1,V0,M1} { complement( join( zero, zero ) )
% 9.24/9.65 ==> meet( top, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59495) {G0,W6,D4,L1,V1,M1} { top ==> join( X, complement( X ) )
% 9.24/9.65 }.
% 9.24/9.65 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 9.24/9.65 }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59496) {G1,W9,D4,L1,V0,M1} { top ==> join( join( zero, zero ),
% 9.24/9.65 meet( top, top ) ) }.
% 9.24/9.65 parent0[0]: (182) {G3,W8,D4,L1,V0,M1} P(51,53) { complement( join( zero,
% 9.24/9.65 zero ) ) ==> meet( top, top ) }.
% 9.24/9.65 parent1[0; 6]: (59495) {G0,W6,D4,L1,V1,M1} { top ==> join( X, complement(
% 9.24/9.65 X ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := join( zero, zero )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59497) {G1,W9,D4,L1,V0,M1} { join( join( zero, zero ), meet( top
% 9.24/9.65 , top ) ) ==> top }.
% 9.24/9.65 parent0[0]: (59496) {G1,W9,D4,L1,V0,M1} { top ==> join( join( zero, zero )
% 9.24/9.65 , meet( top, top ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (190) {G4,W9,D4,L1,V0,M1} P(182,11) { join( join( zero, zero )
% 9.24/9.65 , meet( top, top ) ) ==> top }.
% 9.24/9.65 parent0: (59497) {G1,W9,D4,L1,V0,M1} { join( join( zero, zero ), meet( top
% 9.24/9.65 , top ) ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59499) {G2,W10,D5,L1,V2,M1} { join( X, top ) ==> join( join( X,
% 9.24/9.65 complement( Y ) ), Y ) }.
% 9.24/9.65 parent0[0]: (23) {G2,W10,D5,L1,V2,M1} P(21,1) { join( join( Y, complement(
% 9.24/9.65 X ) ), X ) ==> join( Y, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59501) {G2,W9,D5,L1,V1,M1} { join( complement( complement( X ) )
% 9.24/9.65 , top ) ==> join( top, X ) }.
% 9.24/9.65 parent0[0]: (21) {G1,W6,D4,L1,V1,M1} P(11,0) { join( complement( X ), X )
% 9.24/9.65 ==> top }.
% 9.24/9.65 parent1[0; 7]: (59499) {G2,W10,D5,L1,V2,M1} { join( X, top ) ==> join(
% 9.24/9.65 join( X, complement( Y ) ), Y ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := complement( X )
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := complement( complement( X ) )
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (199) {G3,W9,D5,L1,V1,M1} P(21,23) { join( complement(
% 9.24/9.65 complement( X ) ), top ) ==> join( top, X ) }.
% 9.24/9.65 parent0: (59501) {G2,W9,D5,L1,V1,M1} { join( complement( complement( X ) )
% 9.24/9.65 , top ) ==> join( top, X ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59504) {G3,W9,D5,L1,V1,M1} { join( top, X ) ==> join( complement
% 9.24/9.65 ( complement( X ) ), top ) }.
% 9.24/9.65 parent0[0]: (199) {G3,W9,D5,L1,V1,M1} P(21,23) { join( complement(
% 9.24/9.65 complement( X ) ), top ) ==> join( top, X ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59506) {G1,W9,D5,L1,V1,M1} { join( top, X ) ==> join( top,
% 9.24/9.65 complement( complement( X ) ) ) }.
% 9.24/9.65 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.65 parent1[0; 4]: (59504) {G3,W9,D5,L1,V1,M1} { join( top, X ) ==> join(
% 9.24/9.65 complement( complement( X ) ), top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := complement( complement( X ) )
% 9.24/9.65 Y := top
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59512) {G1,W9,D5,L1,V1,M1} { join( top, complement( complement( X
% 9.24/9.65 ) ) ) ==> join( top, X ) }.
% 9.24/9.65 parent0[0]: (59506) {G1,W9,D5,L1,V1,M1} { join( top, X ) ==> join( top,
% 9.24/9.65 complement( complement( X ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (208) {G4,W9,D5,L1,V1,M1} P(199,0) { join( top, complement(
% 9.24/9.65 complement( X ) ) ) ==> join( top, X ) }.
% 9.24/9.65 parent0: (59512) {G1,W9,D5,L1,V1,M1} { join( top, complement( complement(
% 9.24/9.65 X ) ) ) ==> join( top, X ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59514) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join( join( X, Y
% 9.24/9.65 ), complement( Y ) ) }.
% 9.24/9.65 parent0[0]: (24) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ),
% 9.24/9.65 complement( X ) ) ==> join( Y, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59517) {G2,W12,D5,L1,V0,M1} { join( join( zero, zero ), top )
% 9.24/9.65 ==> join( top, complement( meet( top, top ) ) ) }.
% 9.24/9.65 parent0[0]: (190) {G4,W9,D4,L1,V0,M1} P(182,11) { join( join( zero, zero )
% 9.24/9.65 , meet( top, top ) ) ==> top }.
% 9.24/9.65 parent1[0; 7]: (59514) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join(
% 9.24/9.65 join( X, Y ), complement( Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := join( zero, zero )
% 9.24/9.65 Y := meet( top, top )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59518) {G3,W10,D5,L1,V0,M1} { join( zero, top ) ==> join( top,
% 9.24/9.65 complement( meet( top, top ) ) ) }.
% 9.24/9.65 parent0[0]: (58) {G3,W9,D4,L1,V1,M1} P(55,1) { join( join( X, zero ), top )
% 9.24/9.65 ==> join( X, top ) }.
% 9.24/9.65 parent1[0; 1]: (59517) {G2,W12,D5,L1,V0,M1} { join( join( zero, zero ),
% 9.24/9.65 top ) ==> join( top, complement( meet( top, top ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := zero
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59519) {G3,W8,D5,L1,V0,M1} { top ==> join( top, complement( meet
% 9.24/9.65 ( top, top ) ) ) }.
% 9.24/9.65 parent0[0]: (55) {G2,W5,D3,L1,V0,M1} P(51,21) { join( zero, top ) ==> top
% 9.24/9.65 }.
% 9.24/9.65 parent1[0; 1]: (59518) {G3,W10,D5,L1,V0,M1} { join( zero, top ) ==> join(
% 9.24/9.65 top, complement( meet( top, top ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59520) {G3,W8,D5,L1,V0,M1} { join( top, complement( meet( top,
% 9.24/9.65 top ) ) ) ==> top }.
% 9.24/9.65 parent0[0]: (59519) {G3,W8,D5,L1,V0,M1} { top ==> join( top, complement(
% 9.24/9.65 meet( top, top ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (210) {G5,W8,D5,L1,V0,M1} P(190,24);d(58);d(55) { join( top,
% 9.24/9.65 complement( meet( top, top ) ) ) ==> top }.
% 9.24/9.65 parent0: (59520) {G3,W8,D5,L1,V0,M1} { join( top, complement( meet( top,
% 9.24/9.65 top ) ) ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59522) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join( join( X, Y
% 9.24/9.65 ), complement( Y ) ) }.
% 9.24/9.65 parent0[0]: (24) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ),
% 9.24/9.65 complement( X ) ) ==> join( Y, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59524) {G1,W30,D9,L1,V3,M1} { join( meet( composition( X, Y ), Z
% 9.24/9.65 ), top ) ==> join( meet( composition( meet( X, composition( Z, converse
% 9.24/9.65 ( Y ) ) ), Y ), Z ), complement( meet( composition( meet( X, composition
% 9.24/9.65 ( Z, converse( Y ) ) ), Y ), Z ) ) ) }.
% 9.24/9.65 parent0[0]: (15) {G0,W27,D8,L1,V3,M1} I { join( meet( composition( X, Y ),
% 9.24/9.65 Z ), meet( composition( meet( X, composition( Z, converse( Y ) ) ), Y ),
% 9.24/9.65 Z ) ) ==> meet( composition( meet( X, composition( Z, converse( Y ) ) ),
% 9.24/9.65 Y ), Z ) }.
% 9.24/9.65 parent1[0; 9]: (59522) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join(
% 9.24/9.65 join( X, Y ), complement( Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := meet( composition( X, Y ), Z )
% 9.24/9.65 Y := meet( composition( meet( X, composition( Z, converse( Y ) ) ), Y )
% 9.24/9.65 , Z )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59525) {G1,W9,D5,L1,V3,M1} { join( meet( composition( X, Y ), Z
% 9.24/9.65 ), top ) ==> top }.
% 9.24/9.65 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 9.24/9.65 }.
% 9.24/9.65 parent1[0; 8]: (59524) {G1,W30,D9,L1,V3,M1} { join( meet( composition( X,
% 9.24/9.65 Y ), Z ), top ) ==> join( meet( composition( meet( X, composition( Z,
% 9.24/9.65 converse( Y ) ) ), Y ), Z ), complement( meet( composition( meet( X,
% 9.24/9.65 composition( Z, converse( Y ) ) ), Y ), Z ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := meet( composition( meet( X, composition( Z, converse( Y ) ) ), Y )
% 9.24/9.65 , Z )
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (215) {G2,W9,D5,L1,V3,M1} P(15,24);d(11) { join( meet(
% 9.24/9.65 composition( X, Y ), Z ), top ) ==> top }.
% 9.24/9.65 parent0: (59525) {G1,W9,D5,L1,V3,M1} { join( meet( composition( X, Y ), Z
% 9.24/9.65 ), top ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59528) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join( join( X, Y
% 9.24/9.65 ), complement( Y ) ) }.
% 9.24/9.65 parent0[0]: (24) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ),
% 9.24/9.65 complement( X ) ) ==> join( Y, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59530) {G2,W11,D6,L1,V0,M1} { join( top, top ) ==> join( top,
% 9.24/9.65 complement( complement( meet( top, top ) ) ) ) }.
% 9.24/9.65 parent0[0]: (210) {G5,W8,D5,L1,V0,M1} P(190,24);d(58);d(55) { join( top,
% 9.24/9.65 complement( meet( top, top ) ) ) ==> top }.
% 9.24/9.65 parent1[0; 5]: (59528) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join(
% 9.24/9.65 join( X, Y ), complement( Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := top
% 9.24/9.65 Y := complement( meet( top, top ) )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59531) {G3,W9,D4,L1,V0,M1} { join( top, top ) ==> join( top,
% 9.24/9.65 meet( top, top ) ) }.
% 9.24/9.65 parent0[0]: (208) {G4,W9,D5,L1,V1,M1} P(199,0) { join( top, complement(
% 9.24/9.65 complement( X ) ) ) ==> join( top, X ) }.
% 9.24/9.65 parent1[0; 4]: (59530) {G2,W11,D6,L1,V0,M1} { join( top, top ) ==> join(
% 9.24/9.65 top, complement( complement( meet( top, top ) ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := meet( top, top )
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59532) {G3,W9,D4,L1,V0,M1} { join( top, meet( top, top ) ) ==>
% 9.24/9.65 join( top, top ) }.
% 9.24/9.65 parent0[0]: (59531) {G3,W9,D4,L1,V0,M1} { join( top, top ) ==> join( top,
% 9.24/9.65 meet( top, top ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (222) {G6,W9,D4,L1,V0,M1} P(210,24);d(208) { join( top, meet(
% 9.24/9.65 top, top ) ) ==> join( top, top ) }.
% 9.24/9.65 parent0: (59532) {G3,W9,D4,L1,V0,M1} { join( top, meet( top, top ) ) ==>
% 9.24/9.65 join( top, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59534) {G9,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join( top,
% 9.24/9.65 X ), skol1 ) }.
% 9.24/9.65 parent0[0]: (129) {G9,W9,D4,L1,V1,M1} P(115,0);d(1) { join( join( top, X )
% 9.24/9.65 , skol1 ) ==> join( X, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59536) {G7,W11,D4,L1,V0,M1} { join( meet( top, top ), top ) ==>
% 9.24/9.65 join( join( top, top ), skol1 ) }.
% 9.24/9.65 parent0[0]: (222) {G6,W9,D4,L1,V0,M1} P(210,24);d(208) { join( top, meet(
% 9.24/9.65 top, top ) ) ==> join( top, top ) }.
% 9.24/9.65 parent1[0; 7]: (59534) {G9,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join
% 9.24/9.65 ( top, X ), skol1 ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := meet( top, top )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59537) {G5,W9,D4,L1,V0,M1} { join( meet( top, top ), top ) ==>
% 9.24/9.65 join( top, top ) }.
% 9.24/9.65 parent0[0]: (114) {G4,W9,D4,L1,V1,M1} P(109,1) { join( join( X, top ),
% 9.24/9.65 skol1 ) ==> join( X, top ) }.
% 9.24/9.65 parent1[0; 6]: (59536) {G7,W11,D4,L1,V0,M1} { join( meet( top, top ), top
% 9.24/9.65 ) ==> join( join( top, top ), skol1 ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := top
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (225) {G10,W9,D4,L1,V0,M1} P(222,129);d(114) { join( meet( top
% 9.24/9.65 , top ), top ) ==> join( top, top ) }.
% 9.24/9.65 parent0: (59537) {G5,W9,D4,L1,V0,M1} { join( meet( top, top ), top ) ==>
% 9.24/9.65 join( top, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59540) {G2,W9,D5,L1,V3,M1} { top ==> join( meet( composition( X,
% 9.24/9.65 Y ), Z ), top ) }.
% 9.24/9.65 parent0[0]: (215) {G2,W9,D5,L1,V3,M1} P(15,24);d(11) { join( meet(
% 9.24/9.65 composition( X, Y ), Z ), top ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59541) {G1,W7,D4,L1,V2,M1} { top ==> join( meet( X, Y ), top )
% 9.24/9.65 }.
% 9.24/9.65 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 9.24/9.65 parent1[0; 4]: (59540) {G2,W9,D5,L1,V3,M1} { top ==> join( meet(
% 9.24/9.65 composition( X, Y ), Z ), top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := one
% 9.24/9.65 Z := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59542) {G1,W7,D4,L1,V2,M1} { join( meet( X, Y ), top ) ==> top
% 9.24/9.65 }.
% 9.24/9.65 parent0[0]: (59541) {G1,W7,D4,L1,V2,M1} { top ==> join( meet( X, Y ), top
% 9.24/9.65 ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (234) {G3,W7,D4,L1,V2,M1} P(5,215) { join( meet( X, Y ), top )
% 9.24/9.65 ==> top }.
% 9.24/9.65 parent0: (59542) {G1,W7,D4,L1,V2,M1} { join( meet( X, Y ), top ) ==> top
% 9.24/9.65 }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59543) {G3,W7,D4,L1,V2,M1} { top ==> join( meet( X, Y ), top )
% 9.24/9.65 }.
% 9.24/9.65 parent0[0]: (234) {G3,W7,D4,L1,V2,M1} P(5,215) { join( meet( X, Y ), top )
% 9.24/9.65 ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59545) {G4,W5,D3,L1,V0,M1} { top ==> join( top, top ) }.
% 9.24/9.65 parent0[0]: (225) {G10,W9,D4,L1,V0,M1} P(222,129);d(114) { join( meet( top
% 9.24/9.65 , top ), top ) ==> join( top, top ) }.
% 9.24/9.65 parent1[0; 2]: (59543) {G3,W7,D4,L1,V2,M1} { top ==> join( meet( X, Y ),
% 9.24/9.65 top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := top
% 9.24/9.65 Y := top
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59546) {G4,W5,D3,L1,V0,M1} { join( top, top ) ==> top }.
% 9.24/9.65 parent0[0]: (59545) {G4,W5,D3,L1,V0,M1} { top ==> join( top, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (269) {G11,W5,D3,L1,V0,M1} P(234,225) { join( top, top ) ==>
% 9.24/9.65 top }.
% 9.24/9.65 parent0: (59546) {G4,W5,D3,L1,V0,M1} { join( top, top ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59548) {G2,W10,D5,L1,V2,M1} { join( X, top ) ==> join( join( X,
% 9.24/9.65 complement( Y ) ), Y ) }.
% 9.24/9.65 parent0[0]: (23) {G2,W10,D5,L1,V2,M1} P(21,1) { join( join( Y, complement(
% 9.24/9.65 X ) ), X ) ==> join( Y, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59552) {G2,W12,D5,L1,V2,M1} { join( meet( X, Y ), top ) ==> join
% 9.24/9.65 ( X, join( complement( X ), Y ) ) }.
% 9.24/9.65 parent0[0]: (37) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) ==> X }.
% 9.24/9.65 parent1[0; 7]: (59548) {G2,W10,D5,L1,V2,M1} { join( X, top ) ==> join(
% 9.24/9.65 join( X, complement( Y ) ), Y ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := meet( X, Y )
% 9.24/9.65 Y := join( complement( X ), Y )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59553) {G1,W12,D5,L1,V2,M1} { join( meet( X, Y ), top ) ==> join
% 9.24/9.65 ( join( X, complement( X ) ), Y ) }.
% 9.24/9.65 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 9.24/9.65 join( X, Y ), Z ) }.
% 9.24/9.65 parent1[0; 6]: (59552) {G2,W12,D5,L1,V2,M1} { join( meet( X, Y ), top )
% 9.24/9.65 ==> join( X, join( complement( X ), Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := complement( X )
% 9.24/9.65 Z := Y
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59554) {G1,W9,D4,L1,V2,M1} { join( meet( X, Y ), top ) ==> join
% 9.24/9.65 ( top, Y ) }.
% 9.24/9.65 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 9.24/9.65 }.
% 9.24/9.65 parent1[0; 7]: (59553) {G1,W12,D5,L1,V2,M1} { join( meet( X, Y ), top )
% 9.24/9.65 ==> join( join( X, complement( X ) ), Y ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59555) {G2,W5,D3,L1,V1,M1} { top ==> join( top, Y ) }.
% 9.24/9.65 parent0[0]: (234) {G3,W7,D4,L1,V2,M1} P(5,215) { join( meet( X, Y ), top )
% 9.24/9.65 ==> top }.
% 9.24/9.65 parent1[0; 1]: (59554) {G1,W9,D4,L1,V2,M1} { join( meet( X, Y ), top ) ==>
% 9.24/9.65 join( top, Y ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59556) {G2,W5,D3,L1,V1,M1} { join( top, X ) ==> top }.
% 9.24/9.65 parent0[0]: (59555) {G2,W5,D3,L1,V1,M1} { top ==> join( top, Y ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (298) {G4,W5,D3,L1,V1,M1} P(37,23);d(1);d(11);d(234) { join(
% 9.24/9.65 top, Y ) ==> top }.
% 9.24/9.65 parent0: (59556) {G2,W5,D3,L1,V1,M1} { join( top, X ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59558) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.65 parent0[0]: (37) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) ==> X }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59561) {G2,W10,D5,L1,V0,M1} { skol1 ==> join( meet( skol1, one )
% 9.24/9.65 , complement( join( top, one ) ) ) }.
% 9.24/9.65 parent0[0]: (151) {G4,W8,D4,L1,V0,M1} P(11,110) { join( complement( skol1 )
% 9.24/9.65 , one ) ==> join( top, one ) }.
% 9.24/9.65 parent1[0; 7]: (59558) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := skol1
% 9.24/9.65 Y := one
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59562) {G3,W8,D4,L1,V0,M1} { skol1 ==> join( meet( skol1, one )
% 9.24/9.65 , complement( top ) ) }.
% 9.24/9.65 parent0[0]: (298) {G4,W5,D3,L1,V1,M1} P(37,23);d(1);d(11);d(234) { join(
% 9.24/9.65 top, Y ) ==> top }.
% 9.24/9.65 parent1[0; 7]: (59561) {G2,W10,D5,L1,V0,M1} { skol1 ==> join( meet( skol1
% 9.24/9.65 , one ), complement( join( top, one ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := one
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59563) {G2,W7,D4,L1,V0,M1} { skol1 ==> join( meet( skol1, one )
% 9.24/9.65 , zero ) }.
% 9.24/9.65 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.65 zero }.
% 9.24/9.65 parent1[0; 6]: (59562) {G3,W8,D4,L1,V0,M1} { skol1 ==> join( meet( skol1,
% 9.24/9.65 one ), complement( top ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59564) {G2,W7,D4,L1,V0,M1} { join( meet( skol1, one ), zero ) ==>
% 9.24/9.65 skol1 }.
% 9.24/9.65 parent0[0]: (59563) {G2,W7,D4,L1,V0,M1} { skol1 ==> join( meet( skol1, one
% 9.24/9.65 ), zero ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (300) {G5,W7,D4,L1,V0,M1} P(151,37);d(298);d(51) { join( meet
% 9.24/9.65 ( skol1, one ), zero ) ==> skol1 }.
% 9.24/9.65 parent0: (59564) {G2,W7,D4,L1,V0,M1} { join( meet( skol1, one ), zero )
% 9.24/9.65 ==> skol1 }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59566) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.65 parent0[0]: (37) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) ==> X }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59569) {G2,W10,D5,L1,V0,M1} { skol2 ==> join( meet( skol2, one )
% 9.24/9.65 , complement( join( top, one ) ) ) }.
% 9.24/9.65 parent0[0]: (92) {G4,W8,D4,L1,V0,M1} P(11,32) { join( complement( skol2 ),
% 9.24/9.65 one ) ==> join( top, one ) }.
% 9.24/9.65 parent1[0; 7]: (59566) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := skol2
% 9.24/9.65 Y := one
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59570) {G3,W8,D4,L1,V0,M1} { skol2 ==> join( meet( skol2, one )
% 9.24/9.65 , complement( top ) ) }.
% 9.24/9.65 parent0[0]: (298) {G4,W5,D3,L1,V1,M1} P(37,23);d(1);d(11);d(234) { join(
% 9.24/9.65 top, Y ) ==> top }.
% 9.24/9.65 parent1[0; 7]: (59569) {G2,W10,D5,L1,V0,M1} { skol2 ==> join( meet( skol2
% 9.24/9.65 , one ), complement( join( top, one ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := one
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59571) {G2,W7,D4,L1,V0,M1} { skol2 ==> join( meet( skol2, one )
% 9.24/9.65 , zero ) }.
% 9.24/9.65 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.65 zero }.
% 9.24/9.65 parent1[0; 6]: (59570) {G3,W8,D4,L1,V0,M1} { skol2 ==> join( meet( skol2,
% 9.24/9.65 one ), complement( top ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59572) {G2,W7,D4,L1,V0,M1} { join( meet( skol2, one ), zero ) ==>
% 9.24/9.65 skol2 }.
% 9.24/9.65 parent0[0]: (59571) {G2,W7,D4,L1,V0,M1} { skol2 ==> join( meet( skol2, one
% 9.24/9.65 ), zero ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (302) {G5,W7,D4,L1,V0,M1} P(92,37);d(298);d(51) { join( meet(
% 9.24/9.65 skol2, one ), zero ) ==> skol2 }.
% 9.24/9.65 parent0: (59572) {G2,W7,D4,L1,V0,M1} { join( meet( skol2, one ), zero )
% 9.24/9.65 ==> skol2 }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59574) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.65 parent0[0]: (37) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) ==> X }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59578) {G2,W10,D5,L1,V0,M1} { zero ==> join( meet( zero, top ),
% 9.24/9.65 complement( join( top, top ) ) ) }.
% 9.24/9.65 parent0[0]: (68) {G5,W8,D4,L1,V0,M1} P(11,64) { join( complement( zero ),
% 9.24/9.65 top ) ==> join( top, top ) }.
% 9.24/9.65 parent1[0; 7]: (59574) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := zero
% 9.24/9.65 Y := top
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59579) {G3,W8,D5,L1,V0,M1} { zero ==> join( zero, complement(
% 9.24/9.65 join( top, top ) ) ) }.
% 9.24/9.65 parent0[0]: (60) {G3,W5,D3,L1,V0,M1} P(52,57) { meet( zero, top ) ==> zero
% 9.24/9.65 }.
% 9.24/9.65 parent1[0; 3]: (59578) {G2,W10,D5,L1,V0,M1} { zero ==> join( meet( zero,
% 9.24/9.65 top ), complement( join( top, top ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59580) {G4,W6,D4,L1,V0,M1} { zero ==> join( zero, complement(
% 9.24/9.65 top ) ) }.
% 9.24/9.65 parent0[0]: (269) {G11,W5,D3,L1,V0,M1} P(234,225) { join( top, top ) ==>
% 9.24/9.65 top }.
% 9.24/9.65 parent1[0; 5]: (59579) {G3,W8,D5,L1,V0,M1} { zero ==> join( zero,
% 9.24/9.65 complement( join( top, top ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59581) {G2,W5,D3,L1,V0,M1} { zero ==> join( zero, zero ) }.
% 9.24/9.65 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.65 zero }.
% 9.24/9.65 parent1[0; 4]: (59580) {G4,W6,D4,L1,V0,M1} { zero ==> join( zero,
% 9.24/9.65 complement( top ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59582) {G2,W5,D3,L1,V0,M1} { join( zero, zero ) ==> zero }.
% 9.24/9.65 parent0[0]: (59581) {G2,W5,D3,L1,V0,M1} { zero ==> join( zero, zero ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (304) {G12,W5,D3,L1,V0,M1} P(68,37);d(60);d(269);d(51) { join
% 9.24/9.65 ( zero, zero ) ==> zero }.
% 9.24/9.65 parent0: (59582) {G2,W5,D3,L1,V0,M1} { join( zero, zero ) ==> zero }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59584) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.65 parent0[0]: (37) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) ==> X }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59585) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement( Y
% 9.24/9.65 ) ), meet( X, Y ) ) }.
% 9.24/9.65 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 9.24/9.65 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 9.24/9.65 parent1[0; 7]: (59584) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := complement( Y )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59587) {G1,W10,D5,L1,V2,M1} { join( meet( X, complement( Y ) ),
% 9.24/9.65 meet( X, Y ) ) ==> X }.
% 9.24/9.65 parent0[0]: (59585) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement
% 9.24/9.65 ( Y ) ), meet( X, Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (309) {G2,W10,D5,L1,V2,M1} P(3,37) { join( meet( X, complement
% 9.24/9.65 ( Y ) ), meet( X, Y ) ) ==> X }.
% 9.24/9.65 parent0: (59587) {G1,W10,D5,L1,V2,M1} { join( meet( X, complement( Y ) ),
% 9.24/9.65 meet( X, Y ) ) ==> X }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59590) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.65 parent0[0]: (37) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) ==> X }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59592) {G2,W8,D4,L1,V1,M1} { X ==> join( meet( X, X ),
% 9.24/9.65 complement( top ) ) }.
% 9.24/9.65 parent0[0]: (21) {G1,W6,D4,L1,V1,M1} P(11,0) { join( complement( X ), X )
% 9.24/9.65 ==> top }.
% 9.24/9.65 parent1[0; 7]: (59590) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59593) {G2,W7,D4,L1,V1,M1} { X ==> join( meet( X, X ), zero )
% 9.24/9.65 }.
% 9.24/9.65 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.65 zero }.
% 9.24/9.65 parent1[0; 6]: (59592) {G2,W8,D4,L1,V1,M1} { X ==> join( meet( X, X ),
% 9.24/9.65 complement( top ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59594) {G2,W7,D4,L1,V1,M1} { join( meet( X, X ), zero ) ==> X }.
% 9.24/9.65 parent0[0]: (59593) {G2,W7,D4,L1,V1,M1} { X ==> join( meet( X, X ), zero )
% 9.24/9.65 }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (312) {G2,W7,D4,L1,V1,M1} P(21,37);d(51) { join( meet( X, X )
% 9.24/9.65 , zero ) ==> X }.
% 9.24/9.65 parent0: (59594) {G2,W7,D4,L1,V1,M1} { join( meet( X, X ), zero ) ==> X
% 9.24/9.65 }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59596) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.65 parent0[0]: (37) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) ==> X }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59598) {G1,W10,D6,L1,V1,M1} { X ==> join( zero, complement( join
% 9.24/9.65 ( complement( X ), complement( X ) ) ) ) }.
% 9.24/9.65 parent0[0]: (12) {G0,W6,D4,L1,V1,M1} I { meet( X, complement( X ) ) ==>
% 9.24/9.65 zero }.
% 9.24/9.65 parent1[0; 3]: (59596) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := complement( X )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59599) {G1,W7,D4,L1,V1,M1} { X ==> join( zero, meet( X, X ) )
% 9.24/9.65 }.
% 9.24/9.65 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 9.24/9.65 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 9.24/9.65 parent1[0; 4]: (59598) {G1,W10,D6,L1,V1,M1} { X ==> join( zero, complement
% 9.24/9.65 ( join( complement( X ), complement( X ) ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59600) {G1,W7,D4,L1,V1,M1} { join( zero, meet( X, X ) ) ==> X }.
% 9.24/9.65 parent0[0]: (59599) {G1,W7,D4,L1,V1,M1} { X ==> join( zero, meet( X, X ) )
% 9.24/9.65 }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (316) {G2,W7,D4,L1,V1,M1} P(12,37);d(3) { join( zero, meet( X
% 9.24/9.65 , X ) ) ==> X }.
% 9.24/9.65 parent0: (59600) {G1,W7,D4,L1,V1,M1} { join( zero, meet( X, X ) ) ==> X
% 9.24/9.65 }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59602) {G9,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join( top,
% 9.24/9.65 X ), skol1 ) }.
% 9.24/9.65 parent0[0]: (129) {G9,W9,D4,L1,V1,M1} P(115,0);d(1) { join( join( top, X )
% 9.24/9.65 , skol1 ) ==> join( X, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59606) {G5,W7,D3,L1,V1,M1} { join( X, top ) ==> join( top, skol1
% 9.24/9.65 ) }.
% 9.24/9.65 parent0[0]: (298) {G4,W5,D3,L1,V1,M1} P(37,23);d(1);d(11);d(234) { join(
% 9.24/9.65 top, Y ) ==> top }.
% 9.24/9.65 parent1[0; 5]: (59602) {G9,W9,D4,L1,V1,M1} { join( X, top ) ==> join( join
% 9.24/9.65 ( top, X ), skol1 ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59610) {G4,W5,D3,L1,V1,M1} { join( X, top ) ==> top }.
% 9.24/9.65 parent0[0]: (109) {G3,W5,D3,L1,V0,M1} P(21,26) { join( top, skol1 ) ==> top
% 9.24/9.65 }.
% 9.24/9.65 parent1[0; 4]: (59606) {G5,W7,D3,L1,V1,M1} { join( X, top ) ==> join( top
% 9.24/9.65 , skol1 ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (319) {G10,W5,D3,L1,V1,M1} P(298,129);d(109) { join( X, top )
% 9.24/9.65 ==> top }.
% 9.24/9.65 parent0: (59610) {G4,W5,D3,L1,V1,M1} { join( X, top ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59613) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.65 parent0[0]: (37) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) ==> X }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59615) {G2,W8,D4,L1,V1,M1} { X ==> join( meet( X, top ),
% 9.24/9.65 complement( top ) ) }.
% 9.24/9.65 parent0[0]: (319) {G10,W5,D3,L1,V1,M1} P(298,129);d(109) { join( X, top )
% 9.24/9.65 ==> top }.
% 9.24/9.65 parent1[0; 7]: (59613) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.65 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := complement( X )
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := top
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59616) {G2,W7,D4,L1,V1,M1} { X ==> join( meet( X, top ), zero )
% 9.24/9.65 }.
% 9.24/9.65 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.65 zero }.
% 9.24/9.65 parent1[0; 6]: (59615) {G2,W8,D4,L1,V1,M1} { X ==> join( meet( X, top ),
% 9.24/9.65 complement( top ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59617) {G2,W7,D4,L1,V1,M1} { join( meet( X, top ), zero ) ==> X
% 9.24/9.65 }.
% 9.24/9.65 parent0[0]: (59616) {G2,W7,D4,L1,V1,M1} { X ==> join( meet( X, top ), zero
% 9.24/9.65 ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (320) {G11,W7,D4,L1,V1,M1} P(319,37);d(51) { join( meet( X,
% 9.24/9.65 top ), zero ) ==> X }.
% 9.24/9.65 parent0: (59617) {G2,W7,D4,L1,V1,M1} { join( meet( X, top ), zero ) ==> X
% 9.24/9.65 }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59620) {G2,W9,D4,L1,V1,M1} { join( join( zero, X ), zero ) =
% 9.24/9.65 join( zero, X ) }.
% 9.24/9.65 parent0[0]: (304) {G12,W5,D3,L1,V0,M1} P(68,37);d(60);d(269);d(51) { join(
% 9.24/9.65 zero, zero ) ==> zero }.
% 9.24/9.65 parent1[0; 7]: (28) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ),
% 9.24/9.65 X ) = join( join( Z, X ), Y ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := zero
% 9.24/9.65 Y := X
% 9.24/9.65 Z := zero
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (321) {G13,W9,D4,L1,V1,M1} P(304,28) { join( join( zero, X ),
% 9.24/9.65 zero ) ==> join( zero, X ) }.
% 9.24/9.65 parent0: (59620) {G2,W9,D4,L1,V1,M1} { join( join( zero, X ), zero ) =
% 9.24/9.65 join( zero, X ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59622) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join( join( X, Y
% 9.24/9.65 ), complement( Y ) ) }.
% 9.24/9.65 parent0[0]: (24) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ),
% 9.24/9.65 complement( X ) ) ==> join( Y, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59624) {G2,W10,D4,L1,V1,M1} { join( meet( X, top ), top ) ==>
% 9.24/9.65 join( X, complement( zero ) ) }.
% 9.24/9.65 parent0[0]: (320) {G11,W7,D4,L1,V1,M1} P(319,37);d(51) { join( meet( X, top
% 9.24/9.65 ), zero ) ==> X }.
% 9.24/9.65 parent1[0; 7]: (59622) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join(
% 9.24/9.65 join( X, Y ), complement( Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := meet( X, top )
% 9.24/9.65 Y := zero
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59625) {G3,W6,D4,L1,V1,M1} { top ==> join( X, complement( zero )
% 9.24/9.65 ) }.
% 9.24/9.65 parent0[0]: (319) {G10,W5,D3,L1,V1,M1} P(298,129);d(109) { join( X, top )
% 9.24/9.65 ==> top }.
% 9.24/9.65 parent1[0; 1]: (59624) {G2,W10,D4,L1,V1,M1} { join( meet( X, top ), top )
% 9.24/9.65 ==> join( X, complement( zero ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := meet( X, top )
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59626) {G3,W6,D4,L1,V1,M1} { join( X, complement( zero ) ) ==>
% 9.24/9.65 top }.
% 9.24/9.65 parent0[0]: (59625) {G3,W6,D4,L1,V1,M1} { top ==> join( X, complement(
% 9.24/9.65 zero ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (329) {G12,W6,D4,L1,V1,M1} P(320,24);d(319) { join( X,
% 9.24/9.65 complement( zero ) ) ==> top }.
% 9.24/9.65 parent0: (59626) {G3,W6,D4,L1,V1,M1} { join( X, complement( zero ) ) ==>
% 9.24/9.65 top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59627) {G11,W7,D4,L1,V1,M1} { X ==> join( meet( X, top ), zero )
% 9.24/9.65 }.
% 9.24/9.65 parent0[0]: (320) {G11,W7,D4,L1,V1,M1} P(319,37);d(51) { join( meet( X, top
% 9.24/9.65 ), zero ) ==> X }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59628) {G2,W7,D4,L1,V1,M1} { X ==> join( meet( top, X ), zero )
% 9.24/9.65 }.
% 9.24/9.65 parent0[0]: (52) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 9.24/9.65 Y ) }.
% 9.24/9.65 parent1[0; 3]: (59627) {G11,W7,D4,L1,V1,M1} { X ==> join( meet( X, top ),
% 9.24/9.65 zero ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := top
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59631) {G2,W7,D4,L1,V1,M1} { join( meet( top, X ), zero ) ==> X
% 9.24/9.65 }.
% 9.24/9.65 parent0[0]: (59628) {G2,W7,D4,L1,V1,M1} { X ==> join( meet( top, X ), zero
% 9.24/9.65 ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (331) {G12,W7,D4,L1,V1,M1} P(52,320) { join( meet( top, X ),
% 9.24/9.65 zero ) ==> X }.
% 9.24/9.65 parent0: (59631) {G2,W7,D4,L1,V1,M1} { join( meet( top, X ), zero ) ==> X
% 9.24/9.65 }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59632) {G11,W7,D4,L1,V1,M1} { X ==> join( meet( X, top ), zero )
% 9.24/9.65 }.
% 9.24/9.65 parent0[0]: (320) {G11,W7,D4,L1,V1,M1} P(319,37);d(51) { join( meet( X, top
% 9.24/9.65 ), zero ) ==> X }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59633) {G1,W7,D4,L1,V1,M1} { X ==> join( zero, meet( X, top ) )
% 9.24/9.65 }.
% 9.24/9.65 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.65 parent1[0; 2]: (59632) {G11,W7,D4,L1,V1,M1} { X ==> join( meet( X, top ),
% 9.24/9.65 zero ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := meet( X, top )
% 9.24/9.65 Y := zero
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59636) {G1,W7,D4,L1,V1,M1} { join( zero, meet( X, top ) ) ==> X
% 9.24/9.65 }.
% 9.24/9.65 parent0[0]: (59633) {G1,W7,D4,L1,V1,M1} { X ==> join( zero, meet( X, top )
% 9.24/9.65 ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (332) {G12,W7,D4,L1,V1,M1} P(320,0) { join( zero, meet( X, top
% 9.24/9.65 ) ) ==> X }.
% 9.24/9.65 parent0: (59636) {G1,W7,D4,L1,V1,M1} { join( zero, meet( X, top ) ) ==> X
% 9.24/9.65 }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59637) {G12,W6,D4,L1,V1,M1} { top ==> join( X, complement( zero )
% 9.24/9.65 ) }.
% 9.24/9.65 parent0[0]: (329) {G12,W6,D4,L1,V1,M1} P(320,24);d(319) { join( X,
% 9.24/9.65 complement( zero ) ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59639) {G1,W4,D3,L1,V0,M1} { top ==> complement( zero ) }.
% 9.24/9.65 parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 9.24/9.65 , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement(
% 9.24/9.65 Y ) }.
% 9.24/9.65 parent1[0; 2]: (59637) {G12,W6,D4,L1,V1,M1} { top ==> join( X, complement
% 9.24/9.65 ( zero ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := zero
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := composition( converse( X ), complement( composition( X, zero ) ) )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59640) {G1,W4,D3,L1,V0,M1} { complement( zero ) ==> top }.
% 9.24/9.65 parent0[0]: (59639) {G1,W4,D3,L1,V0,M1} { top ==> complement( zero ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (336) {G13,W4,D3,L1,V0,M1} P(329,10) { complement( zero ) ==>
% 9.24/9.65 top }.
% 9.24/9.65 parent0: (59640) {G1,W4,D3,L1,V0,M1} { complement( zero ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59642) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join(
% 9.24/9.65 complement( X ), complement( Y ) ) ) }.
% 9.24/9.65 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 9.24/9.65 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59644) {G1,W6,D3,L1,V1,M1} { meet( X, zero ) ==> complement( top
% 9.24/9.65 ) }.
% 9.24/9.65 parent0[0]: (329) {G12,W6,D4,L1,V1,M1} P(320,24);d(319) { join( X,
% 9.24/9.65 complement( zero ) ) ==> top }.
% 9.24/9.65 parent1[0; 5]: (59642) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 9.24/9.65 ( join( complement( X ), complement( Y ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := complement( X )
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := zero
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59645) {G2,W5,D3,L1,V1,M1} { meet( X, zero ) ==> zero }.
% 9.24/9.65 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.65 zero }.
% 9.24/9.65 parent1[0; 4]: (59644) {G1,W6,D3,L1,V1,M1} { meet( X, zero ) ==>
% 9.24/9.65 complement( top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (337) {G13,W5,D3,L1,V1,M1} P(329,3);d(51) { meet( X, zero )
% 9.24/9.65 ==> zero }.
% 9.24/9.65 parent0: (59645) {G2,W5,D3,L1,V1,M1} { meet( X, zero ) ==> zero }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59648) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join(
% 9.24/9.65 complement( X ), complement( Y ) ) ) }.
% 9.24/9.65 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 9.24/9.65 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59651) {G1,W9,D5,L1,V1,M1} { meet( zero, X ) ==> complement(
% 9.24/9.65 join( top, complement( X ) ) ) }.
% 9.24/9.65 parent0[0]: (336) {G13,W4,D3,L1,V0,M1} P(329,10) { complement( zero ) ==>
% 9.24/9.65 top }.
% 9.24/9.65 parent1[0; 6]: (59648) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 9.24/9.65 ( join( complement( X ), complement( Y ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := zero
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59653) {G2,W6,D3,L1,V1,M1} { meet( zero, X ) ==> complement( top
% 9.24/9.65 ) }.
% 9.24/9.65 parent0[0]: (298) {G4,W5,D3,L1,V1,M1} P(37,23);d(1);d(11);d(234) { join(
% 9.24/9.65 top, Y ) ==> top }.
% 9.24/9.65 parent1[0; 5]: (59651) {G1,W9,D5,L1,V1,M1} { meet( zero, X ) ==>
% 9.24/9.65 complement( join( top, complement( X ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := complement( X )
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59654) {G2,W5,D3,L1,V1,M1} { meet( zero, X ) ==> zero }.
% 9.24/9.65 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.65 zero }.
% 9.24/9.65 parent1[0; 4]: (59653) {G2,W6,D3,L1,V1,M1} { meet( zero, X ) ==>
% 9.24/9.65 complement( top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero
% 9.24/9.65 , X ) ==> zero }.
% 9.24/9.65 parent0: (59654) {G2,W5,D3,L1,V1,M1} { meet( zero, X ) ==> zero }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59657) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join( join( X, Y
% 9.24/9.65 ), complement( Y ) ) }.
% 9.24/9.65 parent0[0]: (24) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ),
% 9.24/9.65 complement( X ) ) ==> join( Y, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59659) {G2,W10,D5,L1,V1,M1} { join( zero, top ) ==> join( X,
% 9.24/9.65 complement( meet( X, top ) ) ) }.
% 9.24/9.65 parent0[0]: (332) {G12,W7,D4,L1,V1,M1} P(320,0) { join( zero, meet( X, top
% 9.24/9.65 ) ) ==> X }.
% 9.24/9.65 parent1[0; 5]: (59657) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join(
% 9.24/9.65 join( X, Y ), complement( Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := zero
% 9.24/9.65 Y := meet( X, top )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59660) {G3,W8,D5,L1,V1,M1} { top ==> join( X, complement( meet(
% 9.24/9.65 X, top ) ) ) }.
% 9.24/9.65 parent0[0]: (319) {G10,W5,D3,L1,V1,M1} P(298,129);d(109) { join( X, top )
% 9.24/9.65 ==> top }.
% 9.24/9.65 parent1[0; 1]: (59659) {G2,W10,D5,L1,V1,M1} { join( zero, top ) ==> join(
% 9.24/9.65 X, complement( meet( X, top ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := zero
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59661) {G3,W8,D5,L1,V1,M1} { join( X, complement( meet( X, top )
% 9.24/9.65 ) ) ==> top }.
% 9.24/9.65 parent0[0]: (59660) {G3,W8,D5,L1,V1,M1} { top ==> join( X, complement(
% 9.24/9.65 meet( X, top ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (348) {G13,W8,D5,L1,V1,M1} P(332,24);d(319) { join( X,
% 9.24/9.65 complement( meet( X, top ) ) ) ==> top }.
% 9.24/9.65 parent0: (59661) {G3,W8,D5,L1,V1,M1} { join( X, complement( meet( X, top )
% 9.24/9.65 ) ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59662) {G5,W7,D4,L1,V0,M1} { skol1 ==> join( meet( skol1, one ),
% 9.24/9.65 zero ) }.
% 9.24/9.65 parent0[0]: (300) {G5,W7,D4,L1,V0,M1} P(151,37);d(298);d(51) { join( meet(
% 9.24/9.65 skol1, one ), zero ) ==> skol1 }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59663) {G2,W7,D4,L1,V0,M1} { skol1 ==> join( meet( one, skol1 )
% 9.24/9.65 , zero ) }.
% 9.24/9.65 parent0[0]: (52) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 9.24/9.65 Y ) }.
% 9.24/9.65 parent1[0; 3]: (59662) {G5,W7,D4,L1,V0,M1} { skol1 ==> join( meet( skol1,
% 9.24/9.65 one ), zero ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := one
% 9.24/9.65 Y := skol1
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59666) {G2,W7,D4,L1,V0,M1} { join( meet( one, skol1 ), zero ) ==>
% 9.24/9.65 skol1 }.
% 9.24/9.65 parent0[0]: (59663) {G2,W7,D4,L1,V0,M1} { skol1 ==> join( meet( one, skol1
% 9.24/9.65 ), zero ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (363) {G6,W7,D4,L1,V0,M1} P(52,300) { join( meet( one, skol1 )
% 9.24/9.65 , zero ) ==> skol1 }.
% 9.24/9.65 parent0: (59666) {G2,W7,D4,L1,V0,M1} { join( meet( one, skol1 ), zero )
% 9.24/9.65 ==> skol1 }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59667) {G5,W7,D4,L1,V0,M1} { skol2 ==> join( meet( skol2, one ),
% 9.24/9.65 zero ) }.
% 9.24/9.65 parent0[0]: (302) {G5,W7,D4,L1,V0,M1} P(92,37);d(298);d(51) { join( meet(
% 9.24/9.65 skol2, one ), zero ) ==> skol2 }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59668) {G2,W7,D4,L1,V0,M1} { skol2 ==> join( meet( one, skol2 )
% 9.24/9.65 , zero ) }.
% 9.24/9.65 parent0[0]: (52) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 9.24/9.65 Y ) }.
% 9.24/9.65 parent1[0; 3]: (59667) {G5,W7,D4,L1,V0,M1} { skol2 ==> join( meet( skol2,
% 9.24/9.65 one ), zero ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := one
% 9.24/9.65 Y := skol2
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59671) {G2,W7,D4,L1,V0,M1} { join( meet( one, skol2 ), zero ) ==>
% 9.24/9.65 skol2 }.
% 9.24/9.65 parent0[0]: (59668) {G2,W7,D4,L1,V0,M1} { skol2 ==> join( meet( one, skol2
% 9.24/9.65 ), zero ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (382) {G6,W7,D4,L1,V0,M1} P(52,302) { join( meet( one, skol2 )
% 9.24/9.65 , zero ) ==> skol2 }.
% 9.24/9.65 parent0: (59671) {G2,W7,D4,L1,V0,M1} { join( meet( one, skol2 ), zero )
% 9.24/9.65 ==> skol2 }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59672) {G13,W8,D5,L1,V1,M1} { top ==> join( X, complement( meet(
% 9.24/9.65 X, top ) ) ) }.
% 9.24/9.65 parent0[0]: (348) {G13,W8,D5,L1,V1,M1} P(332,24);d(319) { join( X,
% 9.24/9.65 complement( meet( X, top ) ) ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59673) {G1,W8,D5,L1,V1,M1} { top ==> join( complement( meet( X,
% 9.24/9.65 top ) ), X ) }.
% 9.24/9.65 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.65 parent1[0; 2]: (59672) {G13,W8,D5,L1,V1,M1} { top ==> join( X, complement
% 9.24/9.65 ( meet( X, top ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := complement( meet( X, top ) )
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59676) {G1,W8,D5,L1,V1,M1} { join( complement( meet( X, top ) ),
% 9.24/9.65 X ) ==> top }.
% 9.24/9.65 parent0[0]: (59673) {G1,W8,D5,L1,V1,M1} { top ==> join( complement( meet(
% 9.24/9.65 X, top ) ), X ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (438) {G14,W8,D5,L1,V1,M1} P(348,0) { join( complement( meet(
% 9.24/9.65 X, top ) ), X ) ==> top }.
% 9.24/9.65 parent0: (59676) {G1,W8,D5,L1,V1,M1} { join( complement( meet( X, top ) )
% 9.24/9.65 , X ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59677) {G14,W8,D5,L1,V1,M1} { top ==> join( complement( meet( X,
% 9.24/9.65 top ) ), X ) }.
% 9.24/9.65 parent0[0]: (438) {G14,W8,D5,L1,V1,M1} P(348,0) { join( complement( meet( X
% 9.24/9.65 , top ) ), X ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59678) {G2,W8,D5,L1,V1,M1} { top ==> join( complement( meet( top
% 9.24/9.65 , X ) ), X ) }.
% 9.24/9.65 parent0[0]: (52) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 9.24/9.65 Y ) }.
% 9.24/9.65 parent1[0; 4]: (59677) {G14,W8,D5,L1,V1,M1} { top ==> join( complement(
% 9.24/9.65 meet( X, top ) ), X ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := top
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59681) {G2,W8,D5,L1,V1,M1} { join( complement( meet( top, X ) ),
% 9.24/9.65 X ) ==> top }.
% 9.24/9.65 parent0[0]: (59678) {G2,W8,D5,L1,V1,M1} { top ==> join( complement( meet(
% 9.24/9.65 top, X ) ), X ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (472) {G15,W8,D5,L1,V1,M1} P(52,438) { join( complement( meet
% 9.24/9.65 ( top, X ) ), X ) ==> top }.
% 9.24/9.65 parent0: (59681) {G2,W8,D5,L1,V1,M1} { join( complement( meet( top, X ) )
% 9.24/9.65 , X ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59683) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join( join( X, Y
% 9.24/9.65 ), complement( Y ) ) }.
% 9.24/9.65 parent0[0]: (24) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ),
% 9.24/9.65 complement( X ) ) ==> join( Y, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59688) {G2,W20,D6,L1,V4,M1} { join( join( X, composition( Y, Z )
% 9.24/9.65 ), top ) ==> join( join( X, composition( join( Y, T ), Z ) ), complement
% 9.24/9.65 ( composition( T, Z ) ) ) }.
% 9.24/9.65 parent0[0]: (62) {G1,W17,D5,L1,V4,M1} P(6,1) { join( join( T, composition(
% 9.24/9.65 X, Y ) ), composition( Z, Y ) ) ==> join( T, composition( join( X, Z ), Y
% 9.24/9.65 ) ) }.
% 9.24/9.65 parent1[0; 9]: (59683) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join(
% 9.24/9.65 join( X, Y ), complement( Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := Z
% 9.24/9.65 Z := T
% 9.24/9.65 T := X
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := join( X, composition( Y, Z ) )
% 9.24/9.65 Y := composition( T, Z )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59689) {G3,W14,D6,L1,V4,M1} { top ==> join( join( X, composition
% 9.24/9.65 ( join( Y, T ), Z ) ), complement( composition( T, Z ) ) ) }.
% 9.24/9.65 parent0[0]: (319) {G10,W5,D3,L1,V1,M1} P(298,129);d(109) { join( X, top )
% 9.24/9.65 ==> top }.
% 9.24/9.65 parent1[0; 1]: (59688) {G2,W20,D6,L1,V4,M1} { join( join( X, composition(
% 9.24/9.65 Y, Z ) ), top ) ==> join( join( X, composition( join( Y, T ), Z ) ),
% 9.24/9.65 complement( composition( T, Z ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := join( X, composition( Y, Z ) )
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 T := T
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59690) {G3,W14,D6,L1,V4,M1} { join( join( X, composition( join( Y
% 9.24/9.65 , Z ), T ) ), complement( composition( Z, T ) ) ) ==> top }.
% 9.24/9.65 parent0[0]: (59689) {G3,W14,D6,L1,V4,M1} { top ==> join( join( X,
% 9.24/9.65 composition( join( Y, T ), Z ) ), complement( composition( T, Z ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := T
% 9.24/9.65 T := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (475) {G11,W14,D6,L1,V4,M1} P(62,24);d(319) { join( join( X,
% 9.24/9.65 composition( join( Y, T ), Z ) ), complement( composition( T, Z ) ) ) ==>
% 9.24/9.65 top }.
% 9.24/9.65 parent0: (59690) {G3,W14,D6,L1,V4,M1} { join( join( X, composition( join(
% 9.24/9.65 Y, Z ), T ) ), complement( composition( Z, T ) ) ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := T
% 9.24/9.65 T := Z
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59692) {G1,W17,D5,L1,V4,M1} { join( X, composition( join( Y, T )
% 9.24/9.65 , Z ) ) ==> join( join( X, composition( Y, Z ) ), composition( T, Z ) )
% 9.24/9.65 }.
% 9.24/9.65 parent0[0]: (62) {G1,W17,D5,L1,V4,M1} P(6,1) { join( join( T, composition(
% 9.24/9.65 X, Y ) ), composition( Z, Y ) ) ==> join( T, composition( join( X, Z ), Y
% 9.24/9.65 ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := Z
% 9.24/9.65 Z := T
% 9.24/9.65 T := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59696) {G2,W16,D5,L1,V3,M1} { join( complement( composition( X,
% 9.24/9.65 Y ) ), composition( join( X, Z ), Y ) ) ==> join( top, composition( Z, Y
% 9.24/9.65 ) ) }.
% 9.24/9.65 parent0[0]: (21) {G1,W6,D4,L1,V1,M1} P(11,0) { join( complement( X ), X )
% 9.24/9.65 ==> top }.
% 9.24/9.65 parent1[0; 12]: (59692) {G1,W17,D5,L1,V4,M1} { join( X, composition( join
% 9.24/9.65 ( Y, T ), Z ) ) ==> join( join( X, composition( Y, Z ) ), composition( T
% 9.24/9.65 , Z ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := composition( X, Y )
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := complement( composition( X, Y ) )
% 9.24/9.65 Y := X
% 9.24/9.65 Z := Y
% 9.24/9.65 T := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59697) {G3,W12,D5,L1,V3,M1} { join( complement( composition( X,
% 9.24/9.65 Y ) ), composition( join( X, Z ), Y ) ) ==> top }.
% 9.24/9.65 parent0[0]: (298) {G4,W5,D3,L1,V1,M1} P(37,23);d(1);d(11);d(234) { join(
% 9.24/9.65 top, Y ) ==> top }.
% 9.24/9.65 parent1[0; 11]: (59696) {G2,W16,D5,L1,V3,M1} { join( complement(
% 9.24/9.65 composition( X, Y ) ), composition( join( X, Z ), Y ) ) ==> join( top,
% 9.24/9.65 composition( Z, Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := T
% 9.24/9.65 Y := composition( Z, Y )
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (477) {G5,W12,D5,L1,V3,M1} P(21,62);d(298) { join( complement
% 9.24/9.65 ( composition( X, Y ) ), composition( join( X, Z ), Y ) ) ==> top }.
% 9.24/9.65 parent0: (59697) {G3,W12,D5,L1,V3,M1} { join( complement( composition( X,
% 9.24/9.65 Y ) ), composition( join( X, Z ), Y ) ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59700) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) ) ==>
% 9.24/9.65 converse( join( converse( X ), Y ) ) }.
% 9.24/9.65 parent0[0]: (74) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 9.24/9.65 ), Y ) ) ==> join( X, converse( Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59702) {G2,W8,D5,L1,V1,M1} { join( X, converse( complement( zero
% 9.24/9.65 ) ) ) ==> converse( top ) }.
% 9.24/9.65 parent0[0]: (329) {G12,W6,D4,L1,V1,M1} P(320,24);d(319) { join( X,
% 9.24/9.65 complement( zero ) ) ==> top }.
% 9.24/9.65 parent1[0; 7]: (59700) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) ) ==>
% 9.24/9.65 converse( join( converse( X ), Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := converse( X )
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := complement( zero )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59703) {G3,W7,D4,L1,V1,M1} { join( X, converse( top ) ) ==>
% 9.24/9.65 converse( top ) }.
% 9.24/9.65 parent0[0]: (336) {G13,W4,D3,L1,V0,M1} P(329,10) { complement( zero ) ==>
% 9.24/9.65 top }.
% 9.24/9.65 parent1[0; 4]: (59702) {G2,W8,D5,L1,V1,M1} { join( X, converse( complement
% 9.24/9.65 ( zero ) ) ) ==> converse( top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (610) {G14,W7,D4,L1,V1,M1} P(329,74);d(336) { join( X,
% 9.24/9.65 converse( top ) ) ==> converse( top ) }.
% 9.24/9.65 parent0: (59703) {G3,W7,D4,L1,V1,M1} { join( X, converse( top ) ) ==>
% 9.24/9.65 converse( top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59706) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) ) ==>
% 9.24/9.65 converse( join( converse( X ), Y ) ) }.
% 9.24/9.65 parent0[0]: (74) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 9.24/9.65 ), Y ) ) ==> join( X, converse( Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59707) {G1,W9,D6,L1,V1,M1} { join( X, converse( complement(
% 9.24/9.65 converse( X ) ) ) ) ==> converse( top ) }.
% 9.24/9.65 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 9.24/9.65 }.
% 9.24/9.65 parent1[0; 8]: (59706) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) ) ==>
% 9.24/9.65 converse( join( converse( X ), Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := converse( X )
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 Y := complement( converse( X ) )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (614) {G2,W9,D6,L1,V1,M1} P(11,74) { join( X, converse(
% 9.24/9.65 complement( converse( X ) ) ) ) ==> converse( top ) }.
% 9.24/9.65 parent0: (59707) {G1,W9,D6,L1,V1,M1} { join( X, converse( complement(
% 9.24/9.65 converse( X ) ) ) ) ==> converse( top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59709) {G14,W7,D4,L1,V1,M1} { converse( top ) ==> join( X,
% 9.24/9.65 converse( top ) ) }.
% 9.24/9.65 parent0[0]: (610) {G14,W7,D4,L1,V1,M1} P(329,74);d(336) { join( X, converse
% 9.24/9.65 ( top ) ) ==> converse( top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59711) {G15,W4,D3,L1,V0,M1} { converse( top ) ==> top }.
% 9.24/9.65 parent0[0]: (472) {G15,W8,D5,L1,V1,M1} P(52,438) { join( complement( meet(
% 9.24/9.65 top, X ) ), X ) ==> top }.
% 9.24/9.65 parent1[0; 3]: (59709) {G14,W7,D4,L1,V1,M1} { converse( top ) ==> join( X
% 9.24/9.65 , converse( top ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := converse( top )
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := complement( meet( top, converse( top ) ) )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (616) {G16,W4,D3,L1,V0,M1} P(610,472) { converse( top ) ==>
% 9.24/9.65 top }.
% 9.24/9.65 parent0: (59711) {G15,W4,D3,L1,V0,M1} { converse( top ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59714) {G0,W10,D4,L1,V2,M1} { converse( composition( Y, X ) ) ==>
% 9.24/9.65 composition( converse( X ), converse( Y ) ) }.
% 9.24/9.65 parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ),
% 9.24/9.65 converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59715) {G1,W9,D4,L1,V1,M1} { converse( composition( X, top ) )
% 9.24/9.65 ==> composition( top, converse( X ) ) }.
% 9.24/9.65 parent0[0]: (616) {G16,W4,D3,L1,V0,M1} P(610,472) { converse( top ) ==> top
% 9.24/9.65 }.
% 9.24/9.65 parent1[0; 6]: (59714) {G0,W10,D4,L1,V2,M1} { converse( composition( Y, X
% 9.24/9.65 ) ) ==> composition( converse( X ), converse( Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := top
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59717) {G1,W9,D4,L1,V1,M1} { composition( top, converse( X ) )
% 9.24/9.65 ==> converse( composition( X, top ) ) }.
% 9.24/9.65 parent0[0]: (59715) {G1,W9,D4,L1,V1,M1} { converse( composition( X, top )
% 9.24/9.65 ) ==> composition( top, converse( X ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (618) {G17,W9,D4,L1,V1,M1} P(616,9) { composition( top,
% 9.24/9.65 converse( X ) ) ==> converse( composition( X, top ) ) }.
% 9.24/9.65 parent0: (59717) {G1,W9,D4,L1,V1,M1} { composition( top, converse( X ) )
% 9.24/9.65 ==> converse( composition( X, top ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59720) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y ) ==>
% 9.24/9.65 converse( join( X, converse( Y ) ) ) }.
% 9.24/9.65 parent0[0]: (75) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 9.24/9.65 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := Y
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59722) {G2,W9,D6,L1,V1,M1} { join( converse( complement(
% 9.24/9.65 converse( X ) ) ), X ) ==> converse( top ) }.
% 9.24/9.65 parent0[0]: (21) {G1,W6,D4,L1,V1,M1} P(11,0) { join( complement( X ), X )
% 9.24/9.65 ==> top }.
% 9.24/9.65 parent1[0; 8]: (59720) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y ) ==>
% 9.24/9.65 converse( join( X, converse( Y ) ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := converse( X )
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := complement( converse( X ) )
% 9.24/9.65 Y := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59723) {G3,W8,D6,L1,V1,M1} { join( converse( complement(
% 9.24/9.65 converse( X ) ) ), X ) ==> top }.
% 9.24/9.65 parent0[0]: (616) {G16,W4,D3,L1,V0,M1} P(610,472) { converse( top ) ==> top
% 9.24/9.65 }.
% 9.24/9.65 parent1[0; 7]: (59722) {G2,W9,D6,L1,V1,M1} { join( converse( complement(
% 9.24/9.65 converse( X ) ) ), X ) ==> converse( top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (634) {G17,W8,D6,L1,V1,M1} P(21,75);d(616) { join( converse(
% 9.24/9.65 complement( converse( X ) ) ), X ) ==> top }.
% 9.24/9.65 parent0: (59723) {G3,W8,D6,L1,V1,M1} { join( converse( complement(
% 9.24/9.65 converse( X ) ) ), X ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59726) {G1,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join( X,
% 9.24/9.65 skol2 ), one ) }.
% 9.24/9.65 parent0[0]: (30) {G1,W9,D4,L1,V1,M1} P(17,1) { join( join( X, skol2 ), one
% 9.24/9.65 ) ==> join( X, one ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59729) {G2,W10,D6,L1,V0,M1} { join( converse( complement(
% 9.24/9.65 converse( skol2 ) ) ), one ) ==> join( top, one ) }.
% 9.24/9.65 parent0[0]: (634) {G17,W8,D6,L1,V1,M1} P(21,75);d(616) { join( converse(
% 9.24/9.65 complement( converse( X ) ) ), X ) ==> top }.
% 9.24/9.65 parent1[0; 8]: (59726) {G1,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join
% 9.24/9.65 ( X, skol2 ), one ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := skol2
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := converse( complement( converse( skol2 ) ) )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59730) {G3,W8,D6,L1,V0,M1} { join( converse( complement(
% 9.24/9.65 converse( skol2 ) ) ), one ) ==> top }.
% 9.24/9.65 parent0[0]: (298) {G4,W5,D3,L1,V1,M1} P(37,23);d(1);d(11);d(234) { join(
% 9.24/9.65 top, Y ) ==> top }.
% 9.24/9.65 parent1[0; 7]: (59729) {G2,W10,D6,L1,V0,M1} { join( converse( complement(
% 9.24/9.65 converse( skol2 ) ) ), one ) ==> join( top, one ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := one
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (641) {G18,W8,D6,L1,V0,M1} P(634,30);d(298) { join( converse(
% 9.24/9.65 complement( converse( skol2 ) ) ), one ) ==> top }.
% 9.24/9.65 parent0: (59730) {G3,W8,D6,L1,V0,M1} { join( converse( complement(
% 9.24/9.65 converse( skol2 ) ) ), one ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59733) {G1,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join( X,
% 9.24/9.65 skol1 ), one ) }.
% 9.24/9.65 parent0[0]: (29) {G1,W9,D4,L1,V1,M1} P(16,1) { join( join( X, skol1 ), one
% 9.24/9.65 ) ==> join( X, one ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59736) {G2,W10,D6,L1,V0,M1} { join( converse( complement(
% 9.24/9.65 converse( skol1 ) ) ), one ) ==> join( top, one ) }.
% 9.24/9.65 parent0[0]: (634) {G17,W8,D6,L1,V1,M1} P(21,75);d(616) { join( converse(
% 9.24/9.65 complement( converse( X ) ) ), X ) ==> top }.
% 9.24/9.65 parent1[0; 8]: (59733) {G1,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join
% 9.24/9.65 ( X, skol1 ), one ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := skol1
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := converse( complement( converse( skol1 ) ) )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59737) {G3,W8,D6,L1,V0,M1} { join( converse( complement(
% 9.24/9.65 converse( skol1 ) ) ), one ) ==> top }.
% 9.24/9.65 parent0[0]: (298) {G4,W5,D3,L1,V1,M1} P(37,23);d(1);d(11);d(234) { join(
% 9.24/9.65 top, Y ) ==> top }.
% 9.24/9.65 parent1[0; 7]: (59736) {G2,W10,D6,L1,V0,M1} { join( converse( complement(
% 9.24/9.65 converse( skol1 ) ) ), one ) ==> join( top, one ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := one
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (642) {G18,W8,D6,L1,V0,M1} P(634,29);d(298) { join( converse(
% 9.24/9.65 complement( converse( skol1 ) ) ), one ) ==> top }.
% 9.24/9.65 parent0: (59737) {G3,W8,D6,L1,V0,M1} { join( converse( complement(
% 9.24/9.65 converse( skol1 ) ) ), one ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59740) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) ) ==>
% 9.24/9.65 converse( join( converse( X ), Y ) ) }.
% 9.24/9.65 parent0[0]: (74) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 9.24/9.65 ), Y ) ) ==> join( X, converse( Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59742) {G2,W9,D5,L1,V0,M1} { join( complement( converse( skol2 )
% 9.24/9.65 ), converse( one ) ) ==> converse( top ) }.
% 9.24/9.65 parent0[0]: (641) {G18,W8,D6,L1,V0,M1} P(634,30);d(298) { join( converse(
% 9.24/9.65 complement( converse( skol2 ) ) ), one ) ==> top }.
% 9.24/9.65 parent1[0; 8]: (59740) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) ) ==>
% 9.24/9.65 converse( join( converse( X ), Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := complement( converse( skol2 ) )
% 9.24/9.65 Y := one
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59743) {G3,W8,D5,L1,V0,M1} { join( complement( converse( skol2 )
% 9.24/9.65 ), converse( one ) ) ==> top }.
% 9.24/9.65 parent0[0]: (616) {G16,W4,D3,L1,V0,M1} P(610,472) { converse( top ) ==> top
% 9.24/9.65 }.
% 9.24/9.65 parent1[0; 7]: (59742) {G2,W9,D5,L1,V0,M1} { join( complement( converse(
% 9.24/9.65 skol2 ) ), converse( one ) ) ==> converse( top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (645) {G19,W8,D5,L1,V0,M1} P(641,74);d(616) { join( complement
% 9.24/9.65 ( converse( skol2 ) ), converse( one ) ) ==> top }.
% 9.24/9.65 parent0: (59743) {G3,W8,D5,L1,V0,M1} { join( complement( converse( skol2 )
% 9.24/9.65 ), converse( one ) ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59746) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) ) ==>
% 9.24/9.65 converse( join( converse( X ), Y ) ) }.
% 9.24/9.65 parent0[0]: (74) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 9.24/9.65 ), Y ) ) ==> join( X, converse( Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59748) {G2,W9,D5,L1,V0,M1} { join( complement( converse( skol1 )
% 9.24/9.65 ), converse( one ) ) ==> converse( top ) }.
% 9.24/9.65 parent0[0]: (642) {G18,W8,D6,L1,V0,M1} P(634,29);d(298) { join( converse(
% 9.24/9.65 complement( converse( skol1 ) ) ), one ) ==> top }.
% 9.24/9.65 parent1[0; 8]: (59746) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) ) ==>
% 9.24/9.65 converse( join( converse( X ), Y ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := complement( converse( skol1 ) )
% 9.24/9.65 Y := one
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59749) {G3,W8,D5,L1,V0,M1} { join( complement( converse( skol1 )
% 9.24/9.65 ), converse( one ) ) ==> top }.
% 9.24/9.65 parent0[0]: (616) {G16,W4,D3,L1,V0,M1} P(610,472) { converse( top ) ==> top
% 9.24/9.65 }.
% 9.24/9.65 parent1[0; 7]: (59748) {G2,W9,D5,L1,V0,M1} { join( complement( converse(
% 9.24/9.65 skol1 ) ), converse( one ) ) ==> converse( top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (668) {G19,W8,D5,L1,V0,M1} P(642,74);d(616) { join( complement
% 9.24/9.65 ( converse( skol1 ) ), converse( one ) ) ==> top }.
% 9.24/9.65 parent0: (59749) {G3,W8,D5,L1,V0,M1} { join( complement( converse( skol1 )
% 9.24/9.65 ), converse( one ) ) ==> top }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59752) {G17,W9,D4,L1,V1,M1} { converse( composition( X, top ) )
% 9.24/9.65 ==> composition( top, converse( X ) ) }.
% 9.24/9.65 parent0[0]: (618) {G17,W9,D4,L1,V1,M1} P(616,9) { composition( top,
% 9.24/9.65 converse( X ) ) ==> converse( composition( X, top ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59753) {G17,W8,D4,L1,V0,M1} { converse( composition( top, top )
% 9.24/9.65 ) ==> composition( top, top ) }.
% 9.24/9.65 parent0[0]: (616) {G16,W4,D3,L1,V0,M1} P(610,472) { converse( top ) ==> top
% 9.24/9.65 }.
% 9.24/9.65 parent1[0; 7]: (59752) {G17,W9,D4,L1,V1,M1} { converse( composition( X,
% 9.24/9.65 top ) ) ==> composition( top, converse( X ) ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := top
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (694) {G18,W8,D4,L1,V0,M1} P(616,618) { converse( composition
% 9.24/9.65 ( top, top ) ) ==> composition( top, top ) }.
% 9.24/9.65 parent0: (59753) {G17,W8,D4,L1,V0,M1} { converse( composition( top, top )
% 9.24/9.65 ) ==> composition( top, top ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59756) {G13,W9,D4,L1,V1,M1} { join( zero, X ) ==> join( join(
% 9.24/9.65 zero, X ), zero ) }.
% 9.24/9.65 parent0[0]: (321) {G13,W9,D4,L1,V1,M1} P(304,28) { join( join( zero, X ),
% 9.24/9.65 zero ) ==> join( zero, X ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59758) {G3,W9,D4,L1,V1,M1} { join( zero, meet( X, X ) ) ==> join
% 9.24/9.65 ( X, zero ) }.
% 9.24/9.65 parent0[0]: (316) {G2,W7,D4,L1,V1,M1} P(12,37);d(3) { join( zero, meet( X,
% 9.24/9.65 X ) ) ==> X }.
% 9.24/9.65 parent1[0; 7]: (59756) {G13,W9,D4,L1,V1,M1} { join( zero, X ) ==> join(
% 9.24/9.65 join( zero, X ), zero ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := meet( X, X )
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59759) {G3,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 9.24/9.65 parent0[0]: (316) {G2,W7,D4,L1,V1,M1} P(12,37);d(3) { join( zero, meet( X,
% 9.24/9.65 X ) ) ==> X }.
% 9.24/9.65 parent1[0; 1]: (59758) {G3,W9,D4,L1,V1,M1} { join( zero, meet( X, X ) )
% 9.24/9.65 ==> join( X, zero ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59761) {G3,W5,D3,L1,V1,M1} { join( X, zero ) ==> X }.
% 9.24/9.65 parent0[0]: (59759) {G3,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 subsumption: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.65 }.
% 9.24/9.65 parent0: (59761) {G3,W5,D3,L1,V1,M1} { join( X, zero ) ==> X }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65 permutation0:
% 9.24/9.65 0 ==> 0
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59763) {G13,W9,D4,L1,V1,M1} { join( zero, X ) ==> join( join(
% 9.24/9.65 zero, X ), zero ) }.
% 9.24/9.65 parent0[0]: (321) {G13,W9,D4,L1,V1,M1} P(304,28) { join( join( zero, X ),
% 9.24/9.65 zero ) ==> join( zero, X ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 eqswap: (59764) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 9.24/9.65 join( X, Y ), Z ) }.
% 9.24/9.65 parent0[0]: (27) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 9.24/9.65 join( join( Y, Z ), X ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := Y
% 9.24/9.65 Z := Z
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59767) {G2,W9,D4,L1,V1,M1} { join( zero, X ) ==> join( join(
% 9.24/9.65 zero, zero ), X ) }.
% 9.24/9.65 parent0[0]: (59764) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join
% 9.24/9.65 ( join( X, Y ), Z ) }.
% 9.24/9.65 parent1[0; 4]: (59763) {G13,W9,D4,L1,V1,M1} { join( zero, X ) ==> join(
% 9.24/9.65 join( zero, X ), zero ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := zero
% 9.24/9.65 Y := zero
% 9.24/9.65 Z := X
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.65 X := X
% 9.24/9.65 end
% 9.24/9.65
% 9.24/9.65 paramod: (59768) {G2,W9,D4,L1,V1,M1} { join( zero, X ) ==> join( join( X,
% 9.24/9.65 zero ), zero ) }.
% 9.24/9.65 parent0[0]: (59764) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join
% 9.24/9.65 ( join( X, Y ), Z ) }.
% 9.24/9.65 parent1[0; 4]: (59767) {G2,W9,D4,L1,V1,M1} { join( zero, X ) ==> join(
% 9.24/9.65 join( zero, zero ), X ) }.
% 9.24/9.65 substitution0:
% 9.24/9.65 X := X
% 9.24/9.65 Y := zero
% 9.24/9.65 Z := zero
% 9.24/9.65 end
% 9.24/9.65 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59771) {G3,W7,D3,L1,V1,M1} { join( zero, X ) ==> join( X, zero )
% 9.24/9.66 }.
% 9.24/9.66 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 parent1[0; 4]: (59768) {G2,W9,D4,L1,V1,M1} { join( zero, X ) ==> join(
% 9.24/9.66 join( X, zero ), zero ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := join( X, zero )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59773) {G4,W5,D3,L1,V1,M1} { join( zero, X ) ==> X }.
% 9.24/9.66 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 parent1[0; 4]: (59771) {G3,W7,D3,L1,V1,M1} { join( zero, X ) ==> join( X,
% 9.24/9.66 zero ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (713) {G15,W5,D3,L1,V1,M1} P(321,27);d(712);d(712) { join(
% 9.24/9.66 zero, X ) ==> X }.
% 9.24/9.66 parent0: (59773) {G4,W5,D3,L1,V1,M1} { join( zero, X ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59776) {G2,W9,D5,L1,V1,M1} { meet( X, top ) ==> complement( join
% 9.24/9.66 ( complement( X ), zero ) ) }.
% 9.24/9.66 parent0[0]: (54) {G2,W9,D5,L1,V1,M1} P(51,3) { complement( join( complement
% 9.24/9.66 ( X ), zero ) ) ==> meet( X, top ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59777) {G3,W7,D4,L1,V1,M1} { meet( X, top ) ==> complement(
% 9.24/9.66 complement( X ) ) }.
% 9.24/9.66 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 parent1[0; 5]: (59776) {G2,W9,D5,L1,V1,M1} { meet( X, top ) ==> complement
% 9.24/9.66 ( join( complement( X ), zero ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := complement( X )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (716) {G15,W7,D4,L1,V1,M1} P(712,54) { meet( X, top ) ==>
% 9.24/9.66 complement( complement( X ) ) }.
% 9.24/9.66 parent0: (59777) {G3,W7,D4,L1,V1,M1} { meet( X, top ) ==> complement(
% 9.24/9.66 complement( X ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59779) {G14,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 9.24/9.66 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59781) {G7,W5,D3,L1,V0,M1} { meet( one, skol2 ) ==> skol2 }.
% 9.24/9.66 parent0[0]: (382) {G6,W7,D4,L1,V0,M1} P(52,302) { join( meet( one, skol2 )
% 9.24/9.66 , zero ) ==> skol2 }.
% 9.24/9.66 parent1[0; 4]: (59779) {G14,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := meet( one, skol2 )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (717) {G15,W5,D3,L1,V0,M1} P(712,382) { meet( one, skol2 ) ==>
% 9.24/9.66 skol2 }.
% 9.24/9.66 parent0: (59781) {G7,W5,D3,L1,V0,M1} { meet( one, skol2 ) ==> skol2 }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59783) {G14,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 9.24/9.66 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59785) {G6,W5,D3,L1,V0,M1} { meet( skol2, one ) ==> skol2 }.
% 9.24/9.66 parent0[0]: (302) {G5,W7,D4,L1,V0,M1} P(92,37);d(298);d(51) { join( meet(
% 9.24/9.66 skol2, one ), zero ) ==> skol2 }.
% 9.24/9.66 parent1[0; 4]: (59783) {G14,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := meet( skol2, one )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (718) {G15,W5,D3,L1,V0,M1} P(712,302) { meet( skol2, one ) ==>
% 9.24/9.66 skol2 }.
% 9.24/9.66 parent0: (59785) {G6,W5,D3,L1,V0,M1} { meet( skol2, one ) ==> skol2 }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59787) {G14,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 9.24/9.66 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59789) {G7,W5,D3,L1,V0,M1} { meet( one, skol1 ) ==> skol1 }.
% 9.24/9.66 parent0[0]: (363) {G6,W7,D4,L1,V0,M1} P(52,300) { join( meet( one, skol1 )
% 9.24/9.66 , zero ) ==> skol1 }.
% 9.24/9.66 parent1[0; 4]: (59787) {G14,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := meet( one, skol1 )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (719) {G15,W5,D3,L1,V0,M1} P(712,363) { meet( one, skol1 ) ==>
% 9.24/9.66 skol1 }.
% 9.24/9.66 parent0: (59789) {G7,W5,D3,L1,V0,M1} { meet( one, skol1 ) ==> skol1 }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59791) {G14,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 9.24/9.66 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59793) {G6,W5,D3,L1,V0,M1} { meet( skol1, one ) ==> skol1 }.
% 9.24/9.66 parent0[0]: (300) {G5,W7,D4,L1,V0,M1} P(151,37);d(298);d(51) { join( meet(
% 9.24/9.66 skol1, one ), zero ) ==> skol1 }.
% 9.24/9.66 parent1[0; 4]: (59791) {G14,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := meet( skol1, one )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (720) {G15,W5,D3,L1,V0,M1} P(712,300) { meet( skol1, one ) ==>
% 9.24/9.66 skol1 }.
% 9.24/9.66 parent0: (59793) {G6,W5,D3,L1,V0,M1} { meet( skol1, one ) ==> skol1 }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59795) {G14,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 9.24/9.66 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59797) {G3,W5,D3,L1,V1,M1} { meet( X, X ) ==> X }.
% 9.24/9.66 parent0[0]: (312) {G2,W7,D4,L1,V1,M1} P(21,37);d(51) { join( meet( X, X ),
% 9.24/9.66 zero ) ==> X }.
% 9.24/9.66 parent1[0; 4]: (59795) {G14,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := meet( X, X )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (721) {G15,W5,D3,L1,V1,M1} P(712,312) { meet( X, X ) ==> X }.
% 9.24/9.66 parent0: (59797) {G3,W5,D3,L1,V1,M1} { meet( X, X ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59799) {G14,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 9.24/9.66 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59801) {G13,W5,D3,L1,V1,M1} { meet( top, X ) ==> X }.
% 9.24/9.66 parent0[0]: (331) {G12,W7,D4,L1,V1,M1} P(52,320) { join( meet( top, X ),
% 9.24/9.66 zero ) ==> X }.
% 9.24/9.66 parent1[0; 4]: (59799) {G14,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := meet( top, X )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (722) {G15,W5,D3,L1,V1,M1} P(712,331) { meet( top, X ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 parent0: (59801) {G13,W5,D3,L1,V1,M1} { meet( top, X ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59803) {G14,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 9.24/9.66 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59806) {G12,W5,D3,L1,V1,M1} { meet( X, top ) ==> X }.
% 9.24/9.66 parent0[0]: (320) {G11,W7,D4,L1,V1,M1} P(319,37);d(51) { join( meet( X, top
% 9.24/9.66 ), zero ) ==> X }.
% 9.24/9.66 parent1[0; 4]: (59803) {G14,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := meet( X, top )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59807) {G13,W5,D4,L1,V1,M1} { complement( complement( X ) ) ==>
% 9.24/9.66 X }.
% 9.24/9.66 parent0[0]: (716) {G15,W7,D4,L1,V1,M1} P(712,54) { meet( X, top ) ==>
% 9.24/9.66 complement( complement( X ) ) }.
% 9.24/9.66 parent1[0; 1]: (59806) {G12,W5,D3,L1,V1,M1} { meet( X, top ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.66 complement( X ) ) ==> X }.
% 9.24/9.66 parent0: (59807) {G13,W5,D4,L1,V1,M1} { complement( complement( X ) ) ==>
% 9.24/9.66 X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59809) {G15,W5,D3,L1,V1,M1} { X ==> meet( top, X ) }.
% 9.24/9.66 parent0[0]: (722) {G15,W5,D3,L1,V1,M1} P(712,331) { meet( top, X ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59813) {G2,W13,D5,L1,V2,M1} { join( complement( X ), complement
% 9.24/9.66 ( Y ) ) ==> complement( join( complement( top ), meet( X, Y ) ) ) }.
% 9.24/9.66 parent0[0]: (47) {G1,W15,D5,L1,V3,M1} P(3,3) { meet( Z, join( complement( X
% 9.24/9.66 ), complement( Y ) ) ) ==> complement( join( complement( Z ), meet( X, Y
% 9.24/9.66 ) ) ) }.
% 9.24/9.66 parent1[0; 6]: (59809) {G15,W5,D3,L1,V1,M1} { X ==> meet( top, X ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 Z := top
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := join( complement( X ), complement( Y ) )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59814) {G2,W12,D5,L1,V2,M1} { join( complement( X ), complement
% 9.24/9.66 ( Y ) ) ==> complement( join( zero, meet( X, Y ) ) ) }.
% 9.24/9.66 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.66 zero }.
% 9.24/9.66 parent1[0; 8]: (59813) {G2,W13,D5,L1,V2,M1} { join( complement( X ),
% 9.24/9.66 complement( Y ) ) ==> complement( join( complement( top ), meet( X, Y ) )
% 9.24/9.66 ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59815) {G3,W10,D4,L1,V2,M1} { join( complement( X ), complement
% 9.24/9.66 ( Y ) ) ==> complement( meet( X, Y ) ) }.
% 9.24/9.66 parent0[0]: (713) {G15,W5,D3,L1,V1,M1} P(321,27);d(712);d(712) { join( zero
% 9.24/9.66 , X ) ==> X }.
% 9.24/9.66 parent1[0; 7]: (59814) {G2,W12,D5,L1,V2,M1} { join( complement( X ),
% 9.24/9.66 complement( Y ) ) ==> complement( join( zero, meet( X, Y ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := meet( X, Y )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (726) {G16,W10,D4,L1,V2,M1} P(722,47);d(51);d(713) { join(
% 9.24/9.66 complement( X ), complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 9.24/9.66 parent0: (59815) {G3,W10,D4,L1,V2,M1} { join( complement( X ), complement
% 9.24/9.66 ( Y ) ) ==> complement( meet( X, Y ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59818) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y ) ==>
% 9.24/9.66 converse( join( X, converse( Y ) ) ) }.
% 9.24/9.66 parent0[0]: (75) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 9.24/9.66 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59820) {G2,W8,D4,L1,V1,M1} { join( converse( zero ), X ) ==>
% 9.24/9.66 converse( converse( X ) ) }.
% 9.24/9.66 parent0[0]: (713) {G15,W5,D3,L1,V1,M1} P(321,27);d(712);d(712) { join( zero
% 9.24/9.66 , X ) ==> X }.
% 9.24/9.66 parent1[0; 6]: (59818) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y ) ==>
% 9.24/9.66 converse( join( X, converse( Y ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := converse( X )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := zero
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59821) {G1,W6,D4,L1,V1,M1} { join( converse( zero ), X ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 9.24/9.66 parent1[0; 5]: (59820) {G2,W8,D4,L1,V1,M1} { join( converse( zero ), X )
% 9.24/9.66 ==> converse( converse( X ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (727) {G16,W6,D4,L1,V1,M1} P(713,75);d(7) { join( converse(
% 9.24/9.66 zero ), X ) ==> X }.
% 9.24/9.66 parent0: (59821) {G1,W6,D4,L1,V1,M1} { join( converse( zero ), X ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59824) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.66 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.66 parent0[0]: (37) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 9.24/9.66 complement( join( complement( X ), Y ) ) ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59825) {G2,W9,D6,L1,V0,M1} { one ==> join( skol2, complement(
% 9.24/9.66 join( complement( one ), skol2 ) ) ) }.
% 9.24/9.66 parent0[0]: (717) {G15,W5,D3,L1,V0,M1} P(712,382) { meet( one, skol2 ) ==>
% 9.24/9.66 skol2 }.
% 9.24/9.66 parent1[0; 3]: (59824) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.66 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := one
% 9.24/9.66 Y := skol2
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59826) {G2,W9,D6,L1,V0,M1} { join( skol2, complement( join(
% 9.24/9.66 complement( one ), skol2 ) ) ) ==> one }.
% 9.24/9.66 parent0[0]: (59825) {G2,W9,D6,L1,V0,M1} { one ==> join( skol2, complement
% 9.24/9.66 ( join( complement( one ), skol2 ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (728) {G16,W9,D6,L1,V0,M1} P(717,37) { join( skol2, complement
% 9.24/9.66 ( join( complement( one ), skol2 ) ) ) ==> one }.
% 9.24/9.66 parent0: (59826) {G2,W9,D6,L1,V0,M1} { join( skol2, complement( join(
% 9.24/9.66 complement( one ), skol2 ) ) ) ==> one }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59828) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.66 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.66 parent0[0]: (37) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 9.24/9.66 complement( join( complement( X ), Y ) ) ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59829) {G2,W9,D6,L1,V0,M1} { one ==> join( skol1, complement(
% 9.24/9.66 join( complement( one ), skol1 ) ) ) }.
% 9.24/9.66 parent0[0]: (719) {G15,W5,D3,L1,V0,M1} P(712,363) { meet( one, skol1 ) ==>
% 9.24/9.66 skol1 }.
% 9.24/9.66 parent1[0; 3]: (59828) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.66 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := one
% 9.24/9.66 Y := skol1
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59830) {G2,W9,D6,L1,V0,M1} { join( skol1, complement( join(
% 9.24/9.66 complement( one ), skol1 ) ) ) ==> one }.
% 9.24/9.66 parent0[0]: (59829) {G2,W9,D6,L1,V0,M1} { one ==> join( skol1, complement
% 9.24/9.66 ( join( complement( one ), skol1 ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (729) {G16,W9,D6,L1,V0,M1} P(719,37) { join( skol1, complement
% 9.24/9.66 ( join( complement( one ), skol1 ) ) ) ==> one }.
% 9.24/9.66 parent0: (59830) {G2,W9,D6,L1,V0,M1} { join( skol1, complement( join(
% 9.24/9.66 complement( one ), skol1 ) ) ) ==> one }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59832) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join(
% 9.24/9.66 complement( X ), complement( Y ) ) ) }.
% 9.24/9.66 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 9.24/9.66 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59835) {G1,W10,D5,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 9.24/9.66 complement( join( X, complement( Y ) ) ) }.
% 9.24/9.66 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.66 complement( X ) ) ==> X }.
% 9.24/9.66 parent1[0; 7]: (59832) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 9.24/9.66 ( join( complement( X ), complement( Y ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := complement( X )
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59837) {G1,W10,D5,L1,V2,M1} { complement( join( X, complement( Y
% 9.24/9.66 ) ) ) ==> meet( complement( X ), Y ) }.
% 9.24/9.66 parent0[0]: (59835) {G1,W10,D5,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 9.24/9.66 complement( join( X, complement( Y ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (740) {G17,W10,D5,L1,V2,M1} P(723,3) { complement( join( X,
% 9.24/9.66 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 9.24/9.66 parent0: (59837) {G1,W10,D5,L1,V2,M1} { complement( join( X, complement( Y
% 9.24/9.66 ) ) ) ==> meet( complement( X ), Y ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59840) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join(
% 9.24/9.66 complement( X ), complement( Y ) ) ) }.
% 9.24/9.66 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 9.24/9.66 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59844) {G1,W10,D5,L1,V2,M1} { meet( X, complement( Y ) ) ==>
% 9.24/9.66 complement( join( complement( X ), Y ) ) }.
% 9.24/9.66 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.66 complement( X ) ) ==> X }.
% 9.24/9.66 parent1[0; 9]: (59840) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 9.24/9.66 ( join( complement( X ), complement( Y ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := complement( Y )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59846) {G1,W10,D5,L1,V2,M1} { complement( join( complement( X ),
% 9.24/9.66 Y ) ) ==> meet( X, complement( Y ) ) }.
% 9.24/9.66 parent0[0]: (59844) {G1,W10,D5,L1,V2,M1} { meet( X, complement( Y ) ) ==>
% 9.24/9.66 complement( join( complement( X ), Y ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (741) {G17,W10,D5,L1,V2,M1} P(723,3) { complement( join(
% 9.24/9.66 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 9.24/9.66 parent0: (59846) {G1,W10,D5,L1,V2,M1} { complement( join( complement( X )
% 9.24/9.66 , Y ) ) ==> meet( X, complement( Y ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59847) {G16,W6,D4,L1,V1,M1} { X ==> join( converse( zero ), X )
% 9.24/9.66 }.
% 9.24/9.66 parent0[0]: (727) {G16,W6,D4,L1,V1,M1} P(713,75);d(7) { join( converse(
% 9.24/9.66 zero ), X ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59849) {G15,W4,D3,L1,V0,M1} { zero ==> converse( zero ) }.
% 9.24/9.66 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 parent1[0; 2]: (59847) {G16,W6,D4,L1,V1,M1} { X ==> join( converse( zero )
% 9.24/9.66 , X ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := converse( zero )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := zero
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59850) {G15,W4,D3,L1,V0,M1} { converse( zero ) ==> zero }.
% 9.24/9.66 parent0[0]: (59849) {G15,W4,D3,L1,V0,M1} { zero ==> converse( zero ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (742) {G17,W4,D3,L1,V0,M1} P(727,712) { converse( zero ) ==>
% 9.24/9.66 zero }.
% 9.24/9.66 parent0: (59850) {G15,W4,D3,L1,V0,M1} { converse( zero ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59853) {G16,W5,D3,L1,V1,M1} { meet( X, top ) ==> X }.
% 9.24/9.66 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.66 complement( X ) ) ==> X }.
% 9.24/9.66 parent1[0; 4]: (716) {G15,W7,D4,L1,V1,M1} P(712,54) { meet( X, top ) ==>
% 9.24/9.66 complement( complement( X ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (748) {G17,W5,D3,L1,V1,M1} S(716);d(723) { meet( X, top ) ==>
% 9.24/9.66 X }.
% 9.24/9.66 parent0: (59853) {G16,W5,D3,L1,V1,M1} { meet( X, top ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59857) {G3,W8,D6,L1,V1,M1} { join( X, converse( complement(
% 9.24/9.66 converse( X ) ) ) ) ==> top }.
% 9.24/9.66 parent0[0]: (616) {G16,W4,D3,L1,V0,M1} P(610,472) { converse( top ) ==> top
% 9.24/9.66 }.
% 9.24/9.66 parent1[0; 7]: (614) {G2,W9,D6,L1,V1,M1} P(11,74) { join( X, converse(
% 9.24/9.66 complement( converse( X ) ) ) ) ==> converse( top ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (784) {G17,W8,D6,L1,V1,M1} S(614);d(616) { join( X, converse(
% 9.24/9.66 complement( converse( X ) ) ) ) ==> top }.
% 9.24/9.66 parent0: (59857) {G3,W8,D6,L1,V1,M1} { join( X, converse( complement(
% 9.24/9.66 converse( X ) ) ) ) ==> top }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59860) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.66 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.66 parent0[0]: (37) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 9.24/9.66 complement( join( complement( X ), Y ) ) ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59863) {G2,W12,D8,L1,V1,M1} { X ==> join( meet( X, converse(
% 9.24/9.66 complement( converse( complement( X ) ) ) ) ), complement( top ) ) }.
% 9.24/9.66 parent0[0]: (784) {G17,W8,D6,L1,V1,M1} S(614);d(616) { join( X, converse(
% 9.24/9.66 complement( converse( X ) ) ) ) ==> top }.
% 9.24/9.66 parent1[0; 11]: (59860) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.66 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := complement( X )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := converse( complement( converse( complement( X ) ) ) )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59864) {G2,W11,D8,L1,V1,M1} { X ==> join( meet( X, converse(
% 9.24/9.66 complement( converse( complement( X ) ) ) ) ), zero ) }.
% 9.24/9.66 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.66 zero }.
% 9.24/9.66 parent1[0; 10]: (59863) {G2,W12,D8,L1,V1,M1} { X ==> join( meet( X,
% 9.24/9.66 converse( complement( converse( complement( X ) ) ) ) ), complement( top
% 9.24/9.66 ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59865) {G3,W9,D7,L1,V1,M1} { X ==> meet( X, converse( complement
% 9.24/9.66 ( converse( complement( X ) ) ) ) ) }.
% 9.24/9.66 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 parent1[0; 2]: (59864) {G2,W11,D8,L1,V1,M1} { X ==> join( meet( X,
% 9.24/9.66 converse( complement( converse( complement( X ) ) ) ) ), zero ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := meet( X, converse( complement( converse( complement( X ) ) ) ) )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59866) {G3,W9,D7,L1,V1,M1} { meet( X, converse( complement(
% 9.24/9.66 converse( complement( X ) ) ) ) ) ==> X }.
% 9.24/9.66 parent0[0]: (59865) {G3,W9,D7,L1,V1,M1} { X ==> meet( X, converse(
% 9.24/9.66 complement( converse( complement( X ) ) ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (788) {G18,W9,D7,L1,V1,M1} P(784,37);d(51);d(712) { meet( X,
% 9.24/9.66 converse( complement( converse( complement( X ) ) ) ) ) ==> X }.
% 9.24/9.66 parent0: (59866) {G3,W9,D7,L1,V1,M1} { meet( X, converse( complement(
% 9.24/9.66 converse( complement( X ) ) ) ) ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59868) {G1,W10,D5,L1,V2,M1} { composition( converse( Y ), X ) ==>
% 9.24/9.66 converse( composition( converse( X ), Y ) ) }.
% 9.24/9.66 parent0[0]: (89) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition(
% 9.24/9.66 converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59871) {G1,W8,D4,L1,V1,M1} { composition( converse( one ), X )
% 9.24/9.66 ==> converse( converse( X ) ) }.
% 9.24/9.66 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 9.24/9.66 parent1[0; 6]: (59868) {G1,W10,D5,L1,V2,M1} { composition( converse( Y ),
% 9.24/9.66 X ) ==> converse( composition( converse( X ), Y ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := converse( X )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := one
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59872) {G1,W6,D4,L1,V1,M1} { composition( converse( one ), X )
% 9.24/9.66 ==> X }.
% 9.24/9.66 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 9.24/9.66 parent1[0; 5]: (59871) {G1,W8,D4,L1,V1,M1} { composition( converse( one )
% 9.24/9.66 , X ) ==> converse( converse( X ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (798) {G2,W6,D4,L1,V1,M1} P(5,89);d(7) { composition( converse
% 9.24/9.66 ( one ), X ) ==> X }.
% 9.24/9.66 parent0: (59872) {G1,W6,D4,L1,V1,M1} { composition( converse( one ), X )
% 9.24/9.66 ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59874) {G2,W6,D4,L1,V1,M1} { X ==> composition( converse( one ),
% 9.24/9.66 X ) }.
% 9.24/9.66 parent0[0]: (798) {G2,W6,D4,L1,V1,M1} P(5,89);d(7) { composition( converse
% 9.24/9.66 ( one ), X ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59876) {G1,W4,D3,L1,V0,M1} { one ==> converse( one ) }.
% 9.24/9.66 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 9.24/9.66 parent1[0; 2]: (59874) {G2,W6,D4,L1,V1,M1} { X ==> composition( converse(
% 9.24/9.66 one ), X ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := converse( one )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := one
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59877) {G1,W4,D3,L1,V0,M1} { converse( one ) ==> one }.
% 9.24/9.66 parent0[0]: (59876) {G1,W4,D3,L1,V0,M1} { one ==> converse( one ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (804) {G3,W4,D3,L1,V0,M1} P(798,5) { converse( one ) ==> one
% 9.24/9.66 }.
% 9.24/9.66 parent0: (59877) {G1,W4,D3,L1,V0,M1} { converse( one ) ==> one }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59879) {G2,W6,D4,L1,V1,M1} { X ==> composition( converse( one ),
% 9.24/9.66 X ) }.
% 9.24/9.66 parent0[0]: (798) {G2,W6,D4,L1,V1,M1} P(5,89);d(7) { composition( converse
% 9.24/9.66 ( one ), X ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59880) {G3,W5,D3,L1,V1,M1} { X ==> composition( one, X ) }.
% 9.24/9.66 parent0[0]: (804) {G3,W4,D3,L1,V0,M1} P(798,5) { converse( one ) ==> one
% 9.24/9.66 }.
% 9.24/9.66 parent1[0; 3]: (59879) {G2,W6,D4,L1,V1,M1} { X ==> composition( converse(
% 9.24/9.66 one ), X ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59881) {G3,W5,D3,L1,V1,M1} { composition( one, X ) ==> X }.
% 9.24/9.66 parent0[0]: (59880) {G3,W5,D3,L1,V1,M1} { X ==> composition( one, X ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (805) {G4,W5,D3,L1,V1,M1} P(804,798) { composition( one, X )
% 9.24/9.66 ==> X }.
% 9.24/9.66 parent0: (59881) {G3,W5,D3,L1,V1,M1} { composition( one, X ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59883) {G19,W8,D5,L1,V0,M1} { top ==> join( complement( converse
% 9.24/9.66 ( skol1 ) ), converse( one ) ) }.
% 9.24/9.66 parent0[0]: (668) {G19,W8,D5,L1,V0,M1} P(642,74);d(616) { join( complement
% 9.24/9.66 ( converse( skol1 ) ), converse( one ) ) ==> top }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59884) {G4,W7,D5,L1,V0,M1} { top ==> join( complement( converse
% 9.24/9.66 ( skol1 ) ), one ) }.
% 9.24/9.66 parent0[0]: (804) {G3,W4,D3,L1,V0,M1} P(798,5) { converse( one ) ==> one
% 9.24/9.66 }.
% 9.24/9.66 parent1[0; 6]: (59883) {G19,W8,D5,L1,V0,M1} { top ==> join( complement(
% 9.24/9.66 converse( skol1 ) ), converse( one ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59885) {G4,W7,D5,L1,V0,M1} { join( complement( converse( skol1 )
% 9.24/9.66 ), one ) ==> top }.
% 9.24/9.66 parent0[0]: (59884) {G4,W7,D5,L1,V0,M1} { top ==> join( complement(
% 9.24/9.66 converse( skol1 ) ), one ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (808) {G20,W7,D5,L1,V0,M1} P(804,668) { join( complement(
% 9.24/9.66 converse( skol1 ) ), one ) ==> top }.
% 9.24/9.66 parent0: (59885) {G4,W7,D5,L1,V0,M1} { join( complement( converse( skol1 )
% 9.24/9.66 ), one ) ==> top }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59887) {G19,W8,D5,L1,V0,M1} { top ==> join( complement( converse
% 9.24/9.66 ( skol2 ) ), converse( one ) ) }.
% 9.24/9.66 parent0[0]: (645) {G19,W8,D5,L1,V0,M1} P(641,74);d(616) { join( complement
% 9.24/9.66 ( converse( skol2 ) ), converse( one ) ) ==> top }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59888) {G4,W7,D5,L1,V0,M1} { top ==> join( complement( converse
% 9.24/9.66 ( skol2 ) ), one ) }.
% 9.24/9.66 parent0[0]: (804) {G3,W4,D3,L1,V0,M1} P(798,5) { converse( one ) ==> one
% 9.24/9.66 }.
% 9.24/9.66 parent1[0; 6]: (59887) {G19,W8,D5,L1,V0,M1} { top ==> join( complement(
% 9.24/9.66 converse( skol2 ) ), converse( one ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59889) {G4,W7,D5,L1,V0,M1} { join( complement( converse( skol2 )
% 9.24/9.66 ), one ) ==> top }.
% 9.24/9.66 parent0[0]: (59888) {G4,W7,D5,L1,V0,M1} { top ==> join( complement(
% 9.24/9.66 converse( skol2 ) ), one ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (810) {G20,W7,D5,L1,V0,M1} P(804,645) { join( complement(
% 9.24/9.66 converse( skol2 ) ), one ) ==> top }.
% 9.24/9.66 parent0: (59889) {G4,W7,D5,L1,V0,M1} { join( complement( converse( skol2 )
% 9.24/9.66 ), one ) ==> top }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59891) {G1,W17,D5,L1,V4,M1} { join( X, composition( join( Y, T )
% 9.24/9.66 , Z ) ) ==> join( join( X, composition( Y, Z ) ), composition( T, Z ) )
% 9.24/9.66 }.
% 9.24/9.66 parent0[0]: (62) {G1,W17,D5,L1,V4,M1} P(6,1) { join( join( T, composition(
% 9.24/9.66 X, Y ) ), composition( Z, Y ) ) ==> join( T, composition( join( X, Z ), Y
% 9.24/9.66 ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := Z
% 9.24/9.66 Z := T
% 9.24/9.66 T := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59893) {G2,W15,D5,L1,V3,M1} { join( X, composition( join( Y, one
% 9.24/9.66 ), Z ) ) ==> join( join( X, composition( Y, Z ) ), Z ) }.
% 9.24/9.66 parent0[0]: (805) {G4,W5,D3,L1,V1,M1} P(804,798) { composition( one, X )
% 9.24/9.66 ==> X }.
% 9.24/9.66 parent1[0; 14]: (59891) {G1,W17,D5,L1,V4,M1} { join( X, composition( join
% 9.24/9.66 ( Y, T ), Z ) ) ==> join( join( X, composition( Y, Z ) ), composition( T
% 9.24/9.66 , Z ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Z
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 Z := Z
% 9.24/9.66 T := one
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59895) {G2,W15,D5,L1,V3,M1} { join( join( X, composition( Y, Z )
% 9.24/9.66 ), Z ) ==> join( X, composition( join( Y, one ), Z ) ) }.
% 9.24/9.66 parent0[0]: (59893) {G2,W15,D5,L1,V3,M1} { join( X, composition( join( Y,
% 9.24/9.66 one ), Z ) ) ==> join( join( X, composition( Y, Z ) ), Z ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 Z := Z
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (818) {G5,W15,D5,L1,V3,M1} P(805,62) { join( join( Y,
% 9.24/9.66 composition( Z, X ) ), X ) = join( Y, composition( join( Z, one ), X ) )
% 9.24/9.66 }.
% 9.24/9.66 parent0: (59895) {G2,W15,D5,L1,V3,M1} { join( join( X, composition( Y, Z )
% 9.24/9.66 ), Z ) ==> join( X, composition( join( Y, one ), Z ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := Z
% 9.24/9.66 Z := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59897) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.66 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.66 parent0[0]: (37) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 9.24/9.66 complement( join( complement( X ), Y ) ) ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59900) {G2,W10,D5,L1,V0,M1} { converse( skol1 ) ==> join( meet(
% 9.24/9.66 converse( skol1 ), one ), complement( top ) ) }.
% 9.24/9.66 parent0[0]: (808) {G20,W7,D5,L1,V0,M1} P(804,668) { join( complement(
% 9.24/9.66 converse( skol1 ) ), one ) ==> top }.
% 9.24/9.66 parent1[0; 9]: (59897) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.66 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := converse( skol1 )
% 9.24/9.66 Y := one
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59901) {G2,W9,D5,L1,V0,M1} { converse( skol1 ) ==> join( meet(
% 9.24/9.66 converse( skol1 ), one ), zero ) }.
% 9.24/9.66 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.66 zero }.
% 9.24/9.66 parent1[0; 8]: (59900) {G2,W10,D5,L1,V0,M1} { converse( skol1 ) ==> join(
% 9.24/9.66 meet( converse( skol1 ), one ), complement( top ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59902) {G3,W7,D4,L1,V0,M1} { converse( skol1 ) ==> meet(
% 9.24/9.66 converse( skol1 ), one ) }.
% 9.24/9.66 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 parent1[0; 3]: (59901) {G2,W9,D5,L1,V0,M1} { converse( skol1 ) ==> join(
% 9.24/9.66 meet( converse( skol1 ), one ), zero ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := meet( converse( skol1 ), one )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59903) {G3,W7,D4,L1,V0,M1} { meet( converse( skol1 ), one ) ==>
% 9.24/9.66 converse( skol1 ) }.
% 9.24/9.66 parent0[0]: (59902) {G3,W7,D4,L1,V0,M1} { converse( skol1 ) ==> meet(
% 9.24/9.66 converse( skol1 ), one ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (833) {G21,W7,D4,L1,V0,M1} P(808,37);d(51);d(712) { meet(
% 9.24/9.66 converse( skol1 ), one ) ==> converse( skol1 ) }.
% 9.24/9.66 parent0: (59903) {G3,W7,D4,L1,V0,M1} { meet( converse( skol1 ), one ) ==>
% 9.24/9.66 converse( skol1 ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59904) {G21,W7,D4,L1,V0,M1} { converse( skol1 ) ==> meet(
% 9.24/9.66 converse( skol1 ), one ) }.
% 9.24/9.66 parent0[0]: (833) {G21,W7,D4,L1,V0,M1} P(808,37);d(51);d(712) { meet(
% 9.24/9.66 converse( skol1 ), one ) ==> converse( skol1 ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59905) {G2,W7,D4,L1,V0,M1} { converse( skol1 ) ==> meet( one,
% 9.24/9.66 converse( skol1 ) ) }.
% 9.24/9.66 parent0[0]: (52) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 9.24/9.66 Y ) }.
% 9.24/9.66 parent1[0; 3]: (59904) {G21,W7,D4,L1,V0,M1} { converse( skol1 ) ==> meet(
% 9.24/9.66 converse( skol1 ), one ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := one
% 9.24/9.66 Y := converse( skol1 )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59908) {G2,W7,D4,L1,V0,M1} { meet( one, converse( skol1 ) ) ==>
% 9.24/9.66 converse( skol1 ) }.
% 9.24/9.66 parent0[0]: (59905) {G2,W7,D4,L1,V0,M1} { converse( skol1 ) ==> meet( one
% 9.24/9.66 , converse( skol1 ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (836) {G22,W7,D4,L1,V0,M1} P(833,52) { meet( one, converse(
% 9.24/9.66 skol1 ) ) ==> converse( skol1 ) }.
% 9.24/9.66 parent0: (59908) {G2,W7,D4,L1,V0,M1} { meet( one, converse( skol1 ) ) ==>
% 9.24/9.66 converse( skol1 ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59910) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.66 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.66 parent0[0]: (37) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 9.24/9.66 complement( join( complement( X ), Y ) ) ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59913) {G2,W10,D5,L1,V0,M1} { converse( skol2 ) ==> join( meet(
% 9.24/9.66 converse( skol2 ), one ), complement( top ) ) }.
% 9.24/9.66 parent0[0]: (810) {G20,W7,D5,L1,V0,M1} P(804,645) { join( complement(
% 9.24/9.66 converse( skol2 ) ), one ) ==> top }.
% 9.24/9.66 parent1[0; 9]: (59910) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.66 complement( join( complement( X ), Y ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := converse( skol2 )
% 9.24/9.66 Y := one
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59914) {G2,W9,D5,L1,V0,M1} { converse( skol2 ) ==> join( meet(
% 9.24/9.66 converse( skol2 ), one ), zero ) }.
% 9.24/9.66 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.66 zero }.
% 9.24/9.66 parent1[0; 8]: (59913) {G2,W10,D5,L1,V0,M1} { converse( skol2 ) ==> join(
% 9.24/9.66 meet( converse( skol2 ), one ), complement( top ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59915) {G3,W7,D4,L1,V0,M1} { converse( skol2 ) ==> meet(
% 9.24/9.66 converse( skol2 ), one ) }.
% 9.24/9.66 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 parent1[0; 3]: (59914) {G2,W9,D5,L1,V0,M1} { converse( skol2 ) ==> join(
% 9.24/9.66 meet( converse( skol2 ), one ), zero ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := meet( converse( skol2 ), one )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59916) {G3,W7,D4,L1,V0,M1} { meet( converse( skol2 ), one ) ==>
% 9.24/9.66 converse( skol2 ) }.
% 9.24/9.66 parent0[0]: (59915) {G3,W7,D4,L1,V0,M1} { converse( skol2 ) ==> meet(
% 9.24/9.66 converse( skol2 ), one ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (847) {G21,W7,D4,L1,V0,M1} P(810,37);d(51);d(712) { meet(
% 9.24/9.66 converse( skol2 ), one ) ==> converse( skol2 ) }.
% 9.24/9.66 parent0: (59916) {G3,W7,D4,L1,V0,M1} { meet( converse( skol2 ), one ) ==>
% 9.24/9.66 converse( skol2 ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59917) {G21,W7,D4,L1,V0,M1} { converse( skol2 ) ==> meet(
% 9.24/9.66 converse( skol2 ), one ) }.
% 9.24/9.66 parent0[0]: (847) {G21,W7,D4,L1,V0,M1} P(810,37);d(51);d(712) { meet(
% 9.24/9.66 converse( skol2 ), one ) ==> converse( skol2 ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59918) {G2,W7,D4,L1,V0,M1} { converse( skol2 ) ==> meet( one,
% 9.24/9.66 converse( skol2 ) ) }.
% 9.24/9.66 parent0[0]: (52) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 9.24/9.66 Y ) }.
% 9.24/9.66 parent1[0; 3]: (59917) {G21,W7,D4,L1,V0,M1} { converse( skol2 ) ==> meet(
% 9.24/9.66 converse( skol2 ), one ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := one
% 9.24/9.66 Y := converse( skol2 )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59921) {G2,W7,D4,L1,V0,M1} { meet( one, converse( skol2 ) ) ==>
% 9.24/9.66 converse( skol2 ) }.
% 9.24/9.66 parent0[0]: (59918) {G2,W7,D4,L1,V0,M1} { converse( skol2 ) ==> meet( one
% 9.24/9.66 , converse( skol2 ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (850) {G22,W7,D4,L1,V0,M1} P(847,52) { meet( one, converse(
% 9.24/9.66 skol2 ) ) ==> converse( skol2 ) }.
% 9.24/9.66 parent0: (59921) {G2,W7,D4,L1,V0,M1} { meet( one, converse( skol2 ) ) ==>
% 9.24/9.66 converse( skol2 ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59923) {G1,W15,D7,L1,V2,M1} { complement( converse( Y ) ) ==>
% 9.24/9.66 join( composition( X, complement( converse( composition( Y, X ) ) ) ),
% 9.24/9.66 complement( converse( Y ) ) ) }.
% 9.24/9.66 parent0[0]: (97) {G1,W15,D7,L1,V2,M1} P(9,10);d(7) { join( composition( X,
% 9.24/9.66 complement( converse( composition( Y, X ) ) ) ), complement( converse( Y
% 9.24/9.66 ) ) ) ==> complement( converse( Y ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59927) {G2,W14,D7,L1,V1,M1} { complement( converse( top ) ) ==>
% 9.24/9.66 join( composition( X, complement( converse( composition( top, X ) ) ) ),
% 9.24/9.66 complement( top ) ) }.
% 9.24/9.66 parent0[0]: (616) {G16,W4,D3,L1,V0,M1} P(610,472) { converse( top ) ==> top
% 9.24/9.66 }.
% 9.24/9.66 parent1[0; 13]: (59923) {G1,W15,D7,L1,V2,M1} { complement( converse( Y ) )
% 9.24/9.66 ==> join( composition( X, complement( converse( composition( Y, X ) ) )
% 9.24/9.66 ), complement( converse( Y ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := top
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59928) {G3,W13,D7,L1,V1,M1} { complement( top ) ==> join(
% 9.24/9.66 composition( X, complement( converse( composition( top, X ) ) ) ),
% 9.24/9.66 complement( top ) ) }.
% 9.24/9.66 parent0[0]: (616) {G16,W4,D3,L1,V0,M1} P(610,472) { converse( top ) ==> top
% 9.24/9.66 }.
% 9.24/9.66 parent1[0; 2]: (59927) {G2,W14,D7,L1,V1,M1} { complement( converse( top )
% 9.24/9.66 ) ==> join( composition( X, complement( converse( composition( top, X )
% 9.24/9.66 ) ) ), complement( top ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59933) {G2,W12,D7,L1,V1,M1} { complement( top ) ==> join(
% 9.24/9.66 composition( X, complement( converse( composition( top, X ) ) ) ), zero )
% 9.24/9.66 }.
% 9.24/9.66 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.66 zero }.
% 9.24/9.66 parent1[0; 11]: (59928) {G3,W13,D7,L1,V1,M1} { complement( top ) ==> join
% 9.24/9.66 ( composition( X, complement( converse( composition( top, X ) ) ) ),
% 9.24/9.66 complement( top ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59934) {G2,W11,D7,L1,V1,M1} { zero ==> join( composition( X,
% 9.24/9.66 complement( converse( composition( top, X ) ) ) ), zero ) }.
% 9.24/9.66 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.66 zero }.
% 9.24/9.66 parent1[0; 1]: (59933) {G2,W12,D7,L1,V1,M1} { complement( top ) ==> join(
% 9.24/9.66 composition( X, complement( converse( composition( top, X ) ) ) ), zero )
% 9.24/9.66 }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59937) {G3,W9,D6,L1,V1,M1} { zero ==> composition( X, complement
% 9.24/9.66 ( converse( composition( top, X ) ) ) ) }.
% 9.24/9.66 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 parent1[0; 2]: (59934) {G2,W11,D7,L1,V1,M1} { zero ==> join( composition(
% 9.24/9.66 X, complement( converse( composition( top, X ) ) ) ), zero ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := composition( X, complement( converse( composition( top, X ) ) ) )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59938) {G3,W9,D6,L1,V1,M1} { composition( X, complement( converse
% 9.24/9.66 ( composition( top, X ) ) ) ) ==> zero }.
% 9.24/9.66 parent0[0]: (59937) {G3,W9,D6,L1,V1,M1} { zero ==> composition( X,
% 9.24/9.66 complement( converse( composition( top, X ) ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (933) {G17,W9,D6,L1,V1,M1} P(616,97);d(51);d(712) {
% 9.24/9.66 composition( X, complement( converse( composition( top, X ) ) ) ) ==>
% 9.24/9.66 zero }.
% 9.24/9.66 parent0: (59938) {G3,W9,D6,L1,V1,M1} { composition( X, complement(
% 9.24/9.66 converse( composition( top, X ) ) ) ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59940) {G17,W9,D6,L1,V1,M1} { zero ==> composition( X, complement
% 9.24/9.66 ( converse( composition( top, X ) ) ) ) }.
% 9.24/9.66 parent0[0]: (933) {G17,W9,D6,L1,V1,M1} P(616,97);d(51);d(712) { composition
% 9.24/9.66 ( X, complement( converse( composition( top, X ) ) ) ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59942) {G2,W10,D6,L1,V1,M1} { zero ==> composition( converse( X
% 9.24/9.66 ), complement( composition( X, converse( top ) ) ) ) }.
% 9.24/9.66 parent0[0]: (88) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 9.24/9.66 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 9.24/9.66 parent1[0; 6]: (59940) {G17,W9,D6,L1,V1,M1} { zero ==> composition( X,
% 9.24/9.66 complement( converse( composition( top, X ) ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := top
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := converse( X )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59943) {G3,W9,D5,L1,V1,M1} { zero ==> composition( converse( X )
% 9.24/9.66 , complement( composition( X, top ) ) ) }.
% 9.24/9.66 parent0[0]: (616) {G16,W4,D3,L1,V0,M1} P(610,472) { converse( top ) ==> top
% 9.24/9.66 }.
% 9.24/9.66 parent1[0; 8]: (59942) {G2,W10,D6,L1,V1,M1} { zero ==> composition(
% 9.24/9.66 converse( X ), complement( composition( X, converse( top ) ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59944) {G3,W9,D5,L1,V1,M1} { composition( converse( X ),
% 9.24/9.66 complement( composition( X, top ) ) ) ==> zero }.
% 9.24/9.66 parent0[0]: (59943) {G3,W9,D5,L1,V1,M1} { zero ==> composition( converse(
% 9.24/9.66 X ), complement( composition( X, top ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (954) {G18,W9,D5,L1,V1,M1} P(88,933);d(616) { composition(
% 9.24/9.66 converse( X ), complement( composition( X, top ) ) ) ==> zero }.
% 9.24/9.66 parent0: (59944) {G3,W9,D5,L1,V1,M1} { composition( converse( X ),
% 9.24/9.66 complement( composition( X, top ) ) ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59946) {G17,W9,D6,L1,V1,M1} { zero ==> composition( X, complement
% 9.24/9.66 ( converse( composition( top, X ) ) ) ) }.
% 9.24/9.66 parent0[0]: (933) {G17,W9,D6,L1,V1,M1} P(616,97);d(51);d(712) { composition
% 9.24/9.66 ( X, complement( converse( composition( top, X ) ) ) ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59947) {G18,W8,D5,L1,V0,M1} { zero ==> composition( top,
% 9.24/9.66 complement( composition( top, top ) ) ) }.
% 9.24/9.66 parent0[0]: (694) {G18,W8,D4,L1,V0,M1} P(616,618) { converse( composition(
% 9.24/9.66 top, top ) ) ==> composition( top, top ) }.
% 9.24/9.66 parent1[0; 5]: (59946) {G17,W9,D6,L1,V1,M1} { zero ==> composition( X,
% 9.24/9.66 complement( converse( composition( top, X ) ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := top
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59948) {G18,W8,D5,L1,V0,M1} { composition( top, complement(
% 9.24/9.66 composition( top, top ) ) ) ==> zero }.
% 9.24/9.66 parent0[0]: (59947) {G18,W8,D5,L1,V0,M1} { zero ==> composition( top,
% 9.24/9.66 complement( composition( top, top ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (957) {G19,W8,D5,L1,V0,M1} P(694,933) { composition( top,
% 9.24/9.66 complement( composition( top, top ) ) ) ==> zero }.
% 9.24/9.66 parent0: (59948) {G18,W8,D5,L1,V0,M1} { composition( top, complement(
% 9.24/9.66 composition( top, top ) ) ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59950) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ), Y ) ==>
% 9.24/9.66 join( composition( X, Y ), composition( Z, Y ) ) }.
% 9.24/9.66 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 9.24/9.66 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Z
% 9.24/9.66 Z := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59955) {G1,W17,D6,L1,V1,M1} { composition( join( X, top ),
% 9.24/9.66 complement( composition( top, top ) ) ) ==> join( composition( X,
% 9.24/9.66 complement( composition( top, top ) ) ), zero ) }.
% 9.24/9.66 parent0[0]: (957) {G19,W8,D5,L1,V0,M1} P(694,933) { composition( top,
% 9.24/9.66 complement( composition( top, top ) ) ) ==> zero }.
% 9.24/9.66 parent1[0; 16]: (59950) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ),
% 9.24/9.66 Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := complement( composition( top, top ) )
% 9.24/9.66 Z := top
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59956) {G2,W15,D5,L1,V1,M1} { composition( join( X, top ),
% 9.24/9.66 complement( composition( top, top ) ) ) ==> composition( X, complement(
% 9.24/9.66 composition( top, top ) ) ) }.
% 9.24/9.66 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 parent1[0; 9]: (59955) {G1,W17,D6,L1,V1,M1} { composition( join( X, top )
% 9.24/9.66 , complement( composition( top, top ) ) ) ==> join( composition( X,
% 9.24/9.66 complement( composition( top, top ) ) ), zero ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := composition( X, complement( composition( top, top ) ) )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59957) {G3,W13,D5,L1,V1,M1} { composition( top, complement(
% 9.24/9.66 composition( top, top ) ) ) ==> composition( X, complement( composition(
% 9.24/9.66 top, top ) ) ) }.
% 9.24/9.66 parent0[0]: (319) {G10,W5,D3,L1,V1,M1} P(298,129);d(109) { join( X, top )
% 9.24/9.66 ==> top }.
% 9.24/9.66 parent1[0; 2]: (59956) {G2,W15,D5,L1,V1,M1} { composition( join( X, top )
% 9.24/9.66 , complement( composition( top, top ) ) ) ==> composition( X, complement
% 9.24/9.66 ( composition( top, top ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59958) {G4,W8,D5,L1,V1,M1} { zero ==> composition( X, complement
% 9.24/9.66 ( composition( top, top ) ) ) }.
% 9.24/9.66 parent0[0]: (957) {G19,W8,D5,L1,V0,M1} P(694,933) { composition( top,
% 9.24/9.66 complement( composition( top, top ) ) ) ==> zero }.
% 9.24/9.66 parent1[0; 1]: (59957) {G3,W13,D5,L1,V1,M1} { composition( top, complement
% 9.24/9.66 ( composition( top, top ) ) ) ==> composition( X, complement( composition
% 9.24/9.66 ( top, top ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59959) {G4,W8,D5,L1,V1,M1} { composition( X, complement(
% 9.24/9.66 composition( top, top ) ) ) ==> zero }.
% 9.24/9.66 parent0[0]: (59958) {G4,W8,D5,L1,V1,M1} { zero ==> composition( X,
% 9.24/9.66 complement( composition( top, top ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (965) {G20,W8,D5,L1,V1,M1} P(957,6);d(712);d(319);d(957) {
% 9.24/9.66 composition( X, complement( composition( top, top ) ) ) ==> zero }.
% 9.24/9.66 parent0: (59959) {G4,W8,D5,L1,V1,M1} { composition( X, complement(
% 9.24/9.66 composition( top, top ) ) ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59961) {G0,W11,D4,L1,V3,M1} { composition( composition( X, Y ), Z
% 9.24/9.66 ) ==> composition( X, composition( Y, Z ) ) }.
% 9.24/9.66 parent0[0]: (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z
% 9.24/9.66 ) ) ==> composition( composition( X, Y ), Z ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 Z := Z
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59964) {G1,W12,D5,L1,V1,M1} { composition( composition( X, top )
% 9.24/9.66 , complement( composition( top, top ) ) ) ==> composition( X, zero ) }.
% 9.24/9.66 parent0[0]: (957) {G19,W8,D5,L1,V0,M1} P(694,933) { composition( top,
% 9.24/9.66 complement( composition( top, top ) ) ) ==> zero }.
% 9.24/9.66 parent1[0; 11]: (59961) {G0,W11,D4,L1,V3,M1} { composition( composition( X
% 9.24/9.66 , Y ), Z ) ==> composition( X, composition( Y, Z ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := top
% 9.24/9.66 Z := complement( composition( top, top ) )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59965) {G2,W5,D3,L1,V1,M1} { zero ==> composition( X, zero ) }.
% 9.24/9.66 parent0[0]: (965) {G20,W8,D5,L1,V1,M1} P(957,6);d(712);d(319);d(957) {
% 9.24/9.66 composition( X, complement( composition( top, top ) ) ) ==> zero }.
% 9.24/9.66 parent1[0; 1]: (59964) {G1,W12,D5,L1,V1,M1} { composition( composition( X
% 9.24/9.66 , top ), complement( composition( top, top ) ) ) ==> composition( X, zero
% 9.24/9.66 ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := composition( X, top )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59966) {G2,W5,D3,L1,V1,M1} { composition( X, zero ) ==> zero }.
% 9.24/9.66 parent0[0]: (59965) {G2,W5,D3,L1,V1,M1} { zero ==> composition( X, zero )
% 9.24/9.66 }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (966) {G21,W5,D3,L1,V1,M1} P(957,4);d(965) { composition( X,
% 9.24/9.66 zero ) ==> zero }.
% 9.24/9.66 parent0: (59966) {G2,W5,D3,L1,V1,M1} { composition( X, zero ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59968) {G1,W10,D5,L1,V2,M1} { composition( converse( Y ), X ) ==>
% 9.24/9.66 converse( composition( converse( X ), Y ) ) }.
% 9.24/9.66 parent0[0]: (89) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition(
% 9.24/9.66 converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59971) {G2,W7,D4,L1,V1,M1} { composition( converse( zero ), X )
% 9.24/9.66 ==> converse( zero ) }.
% 9.24/9.66 parent0[0]: (966) {G21,W5,D3,L1,V1,M1} P(957,4);d(965) { composition( X,
% 9.24/9.66 zero ) ==> zero }.
% 9.24/9.66 parent1[0; 6]: (59968) {G1,W10,D5,L1,V2,M1} { composition( converse( Y ),
% 9.24/9.66 X ) ==> converse( composition( converse( X ), Y ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := converse( X )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := zero
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59973) {G3,W6,D4,L1,V1,M1} { composition( converse( zero ), X )
% 9.24/9.66 ==> zero }.
% 9.24/9.66 parent0[0]: (742) {G17,W4,D3,L1,V0,M1} P(727,712) { converse( zero ) ==>
% 9.24/9.66 zero }.
% 9.24/9.66 parent1[0; 5]: (59971) {G2,W7,D4,L1,V1,M1} { composition( converse( zero )
% 9.24/9.66 , X ) ==> converse( zero ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59974) {G4,W5,D3,L1,V1,M1} { composition( zero, X ) ==> zero }.
% 9.24/9.66 parent0[0]: (742) {G17,W4,D3,L1,V0,M1} P(727,712) { converse( zero ) ==>
% 9.24/9.66 zero }.
% 9.24/9.66 parent1[0; 2]: (59973) {G3,W6,D4,L1,V1,M1} { composition( converse( zero )
% 9.24/9.66 , X ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (968) {G22,W5,D3,L1,V1,M1} P(966,89);d(742) { composition(
% 9.24/9.66 zero, X ) ==> zero }.
% 9.24/9.66 parent0: (59974) {G4,W5,D3,L1,V1,M1} { composition( zero, X ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (59979) {G0,W27,D8,L1,V3,M1} { meet( composition( X, meet( Y,
% 9.24/9.66 composition( converse( X ), Z ) ) ), Z ) ==> join( meet( composition( X,
% 9.24/9.66 Y ), Z ), meet( composition( X, meet( Y, composition( converse( X ), Z )
% 9.24/9.66 ) ), Z ) ) }.
% 9.24/9.66 parent0[0]: (14) {G0,W27,D8,L1,V3,M1} I { join( meet( composition( X, Y ),
% 9.24/9.66 Z ), meet( composition( X, meet( Y, composition( converse( X ), Z ) ) ),
% 9.24/9.66 Z ) ) ==> meet( composition( X, meet( Y, composition( converse( X ), Z )
% 9.24/9.66 ) ), Z ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 Z := Z
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59985) {G1,W36,D8,L1,V2,M1} { meet( composition( X, meet( Y,
% 9.24/9.66 composition( converse( X ), complement( composition( X, top ) ) ) ) ),
% 9.24/9.66 complement( composition( X, top ) ) ) ==> join( meet( composition( X, Y )
% 9.24/9.66 , complement( composition( X, top ) ) ), meet( composition( X, meet( Y,
% 9.24/9.66 zero ) ), complement( composition( X, top ) ) ) ) }.
% 9.24/9.66 parent0[0]: (954) {G18,W9,D5,L1,V1,M1} P(88,933);d(616) { composition(
% 9.24/9.66 converse( X ), complement( composition( X, top ) ) ) ==> zero }.
% 9.24/9.66 parent1[0; 31]: (59979) {G0,W27,D8,L1,V3,M1} { meet( composition( X, meet
% 9.24/9.66 ( Y, composition( converse( X ), Z ) ) ), Z ) ==> join( meet( composition
% 9.24/9.66 ( X, Y ), Z ), meet( composition( X, meet( Y, composition( converse( X )
% 9.24/9.66 , Z ) ) ), Z ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 Z := complement( composition( X, top ) )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59987) {G2,W30,D6,L1,V2,M1} { meet( composition( X, meet( Y,
% 9.24/9.66 zero ) ), complement( composition( X, top ) ) ) ==> join( meet(
% 9.24/9.66 composition( X, Y ), complement( composition( X, top ) ) ), meet(
% 9.24/9.66 composition( X, meet( Y, zero ) ), complement( composition( X, top ) ) )
% 9.24/9.66 ) }.
% 9.24/9.66 parent0[0]: (954) {G18,W9,D5,L1,V1,M1} P(88,933);d(616) { composition(
% 9.24/9.66 converse( X ), complement( composition( X, top ) ) ) ==> zero }.
% 9.24/9.66 parent1[0; 6]: (59985) {G1,W36,D8,L1,V2,M1} { meet( composition( X, meet(
% 9.24/9.66 Y, composition( converse( X ), complement( composition( X, top ) ) ) ) )
% 9.24/9.66 , complement( composition( X, top ) ) ) ==> join( meet( composition( X, Y
% 9.24/9.66 ), complement( composition( X, top ) ) ), meet( composition( X, meet( Y
% 9.24/9.66 , zero ) ), complement( composition( X, top ) ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59994) {G3,W28,D6,L1,V2,M1} { meet( composition( X, meet( Y,
% 9.24/9.66 zero ) ), complement( composition( X, top ) ) ) ==> join( meet(
% 9.24/9.66 composition( X, Y ), complement( composition( X, top ) ) ), meet(
% 9.24/9.66 composition( X, zero ), complement( composition( X, top ) ) ) ) }.
% 9.24/9.66 parent0[0]: (337) {G13,W5,D3,L1,V1,M1} P(329,3);d(51) { meet( X, zero ) ==>
% 9.24/9.66 zero }.
% 9.24/9.66 parent1[0; 23]: (59987) {G2,W30,D6,L1,V2,M1} { meet( composition( X, meet
% 9.24/9.66 ( Y, zero ) ), complement( composition( X, top ) ) ) ==> join( meet(
% 9.24/9.66 composition( X, Y ), complement( composition( X, top ) ) ), meet(
% 9.24/9.66 composition( X, meet( Y, zero ) ), complement( composition( X, top ) ) )
% 9.24/9.66 ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (59995) {G4,W26,D6,L1,V2,M1} { meet( composition( X, zero ),
% 9.24/9.66 complement( composition( X, top ) ) ) ==> join( meet( composition( X, Y )
% 9.24/9.66 , complement( composition( X, top ) ) ), meet( composition( X, zero ),
% 9.24/9.66 complement( composition( X, top ) ) ) ) }.
% 9.24/9.66 parent0[0]: (337) {G13,W5,D3,L1,V1,M1} P(329,3);d(51) { meet( X, zero ) ==>
% 9.24/9.66 zero }.
% 9.24/9.66 parent1[0; 4]: (59994) {G3,W28,D6,L1,V2,M1} { meet( composition( X, meet(
% 9.24/9.66 Y, zero ) ), complement( composition( X, top ) ) ) ==> join( meet(
% 9.24/9.66 composition( X, Y ), complement( composition( X, top ) ) ), meet(
% 9.24/9.66 composition( X, zero ), complement( composition( X, top ) ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60001) {G5,W24,D6,L1,V2,M1} { meet( composition( X, zero ),
% 9.24/9.66 complement( composition( X, top ) ) ) ==> join( meet( composition( X, Y )
% 9.24/9.66 , complement( composition( X, top ) ) ), meet( zero, complement(
% 9.24/9.66 composition( X, top ) ) ) ) }.
% 9.24/9.66 parent0[0]: (966) {G21,W5,D3,L1,V1,M1} P(957,4);d(965) { composition( X,
% 9.24/9.66 zero ) ==> zero }.
% 9.24/9.66 parent1[0; 19]: (59995) {G4,W26,D6,L1,V2,M1} { meet( composition( X, zero
% 9.24/9.66 ), complement( composition( X, top ) ) ) ==> join( meet( composition( X
% 9.24/9.66 , Y ), complement( composition( X, top ) ) ), meet( composition( X, zero
% 9.24/9.66 ), complement( composition( X, top ) ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60002) {G6,W22,D6,L1,V2,M1} { meet( zero, complement(
% 9.24/9.66 composition( X, top ) ) ) ==> join( meet( composition( X, Y ), complement
% 9.24/9.66 ( composition( X, top ) ) ), meet( zero, complement( composition( X, top
% 9.24/9.66 ) ) ) ) }.
% 9.24/9.66 parent0[0]: (966) {G21,W5,D3,L1,V1,M1} P(957,4);d(965) { composition( X,
% 9.24/9.66 zero ) ==> zero }.
% 9.24/9.66 parent1[0; 2]: (60001) {G5,W24,D6,L1,V2,M1} { meet( composition( X, zero )
% 9.24/9.66 , complement( composition( X, top ) ) ) ==> join( meet( composition( X, Y
% 9.24/9.66 ), complement( composition( X, top ) ) ), meet( zero, complement(
% 9.24/9.66 composition( X, top ) ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60007) {G7,W17,D6,L1,V2,M1} { meet( zero, complement(
% 9.24/9.66 composition( X, top ) ) ) ==> join( meet( composition( X, Y ), complement
% 9.24/9.66 ( composition( X, top ) ) ), zero ) }.
% 9.24/9.66 parent0[0]: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero,
% 9.24/9.66 X ) ==> zero }.
% 9.24/9.66 parent1[0; 16]: (60002) {G6,W22,D6,L1,V2,M1} { meet( zero, complement(
% 9.24/9.66 composition( X, top ) ) ) ==> join( meet( composition( X, Y ), complement
% 9.24/9.66 ( composition( X, top ) ) ), meet( zero, complement( composition( X, top
% 9.24/9.66 ) ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := complement( composition( X, top ) )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60008) {G8,W12,D6,L1,V2,M1} { zero ==> join( meet( composition(
% 9.24/9.66 X, Y ), complement( composition( X, top ) ) ), zero ) }.
% 9.24/9.66 parent0[0]: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero,
% 9.24/9.66 X ) ==> zero }.
% 9.24/9.66 parent1[0; 1]: (60007) {G7,W17,D6,L1,V2,M1} { meet( zero, complement(
% 9.24/9.66 composition( X, top ) ) ) ==> join( meet( composition( X, Y ), complement
% 9.24/9.66 ( composition( X, top ) ) ), zero ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := complement( composition( X, top ) )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60011) {G9,W10,D5,L1,V2,M1} { zero ==> meet( composition( X, Y )
% 9.24/9.66 , complement( composition( X, top ) ) ) }.
% 9.24/9.66 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 parent1[0; 2]: (60008) {G8,W12,D6,L1,V2,M1} { zero ==> join( meet(
% 9.24/9.66 composition( X, Y ), complement( composition( X, top ) ) ), zero ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := meet( composition( X, Y ), complement( composition( X, top ) ) )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60012) {G9,W10,D5,L1,V2,M1} { meet( composition( X, Y ),
% 9.24/9.66 complement( composition( X, top ) ) ) ==> zero }.
% 9.24/9.66 parent0[0]: (60011) {G9,W10,D5,L1,V2,M1} { zero ==> meet( composition( X,
% 9.24/9.66 Y ), complement( composition( X, top ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (985) {G22,W10,D5,L1,V2,M1} P(954,14);d(337);d(966);d(339);d(
% 9.24/9.66 712) { meet( composition( X, Y ), complement( composition( X, top ) ) )
% 9.24/9.66 ==> zero }.
% 9.24/9.66 parent0: (60012) {G9,W10,D5,L1,V2,M1} { meet( composition( X, Y ),
% 9.24/9.66 complement( composition( X, top ) ) ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60015) {G2,W10,D5,L1,V2,M1} { join( meet( X, Y ), meet( X,
% 9.24/9.66 complement( Y ) ) ) ==> X }.
% 9.24/9.66 parent0[0]: (741) {G17,W10,D5,L1,V2,M1} P(723,3) { complement( join(
% 9.24/9.66 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 9.24/9.66 parent1[0; 5]: (37) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 9.24/9.66 complement( join( complement( X ), Y ) ) ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1001) {G18,W10,D5,L1,V2,M1} S(37);d(741) { join( meet( X, Y )
% 9.24/9.66 , meet( X, complement( Y ) ) ) ==> X }.
% 9.24/9.66 parent0: (60015) {G2,W10,D5,L1,V2,M1} { join( meet( X, Y ), meet( X,
% 9.24/9.66 complement( Y ) ) ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60019) {G3,W8,D5,L1,V2,M1} { join( join( X, complement( Y ) ), Y
% 9.24/9.66 ) ==> top }.
% 9.24/9.66 parent0[0]: (319) {G10,W5,D3,L1,V1,M1} P(298,129);d(109) { join( X, top )
% 9.24/9.66 ==> top }.
% 9.24/9.66 parent1[0; 7]: (23) {G2,W10,D5,L1,V2,M1} P(21,1) { join( join( Y,
% 9.24/9.66 complement( X ) ), X ) ==> join( Y, top ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1003) {G11,W8,D5,L1,V2,M1} S(23);d(319) { join( join( Y,
% 9.24/9.66 complement( X ) ), X ) ==> top }.
% 9.24/9.66 parent0: (60019) {G3,W8,D5,L1,V2,M1} { join( join( X, complement( Y ) ), Y
% 9.24/9.66 ) ==> top }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60023) {G17,W8,D5,L1,V0,M1} { join( skol1, meet( one, complement
% 9.24/9.66 ( skol1 ) ) ) ==> one }.
% 9.24/9.66 parent0[0]: (741) {G17,W10,D5,L1,V2,M1} P(723,3) { complement( join(
% 9.24/9.66 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 9.24/9.66 parent1[0; 3]: (729) {G16,W9,D6,L1,V0,M1} P(719,37) { join( skol1,
% 9.24/9.66 complement( join( complement( one ), skol1 ) ) ) ==> one }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := skol1
% 9.24/9.66 Y := one
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1039) {G18,W8,D5,L1,V0,M1} S(729);d(741) { join( skol1, meet
% 9.24/9.66 ( one, complement( skol1 ) ) ) ==> one }.
% 9.24/9.66 parent0: (60023) {G17,W8,D5,L1,V0,M1} { join( skol1, meet( one, complement
% 9.24/9.66 ( skol1 ) ) ) ==> one }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60025) {G18,W8,D5,L1,V0,M1} { one ==> join( skol1, meet( one,
% 9.24/9.66 complement( skol1 ) ) ) }.
% 9.24/9.66 parent0[0]: (1039) {G18,W8,D5,L1,V0,M1} S(729);d(741) { join( skol1, meet(
% 9.24/9.66 one, complement( skol1 ) ) ) ==> one }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60026) {G2,W8,D5,L1,V0,M1} { one ==> join( skol1, meet(
% 9.24/9.66 complement( skol1 ), one ) ) }.
% 9.24/9.66 parent0[0]: (52) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 9.24/9.66 Y ) }.
% 9.24/9.66 parent1[0; 4]: (60025) {G18,W8,D5,L1,V0,M1} { one ==> join( skol1, meet(
% 9.24/9.66 one, complement( skol1 ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := complement( skol1 )
% 9.24/9.66 Y := one
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60029) {G2,W8,D5,L1,V0,M1} { join( skol1, meet( complement( skol1
% 9.24/9.66 ), one ) ) ==> one }.
% 9.24/9.66 parent0[0]: (60026) {G2,W8,D5,L1,V0,M1} { one ==> join( skol1, meet(
% 9.24/9.66 complement( skol1 ), one ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1054) {G19,W8,D5,L1,V0,M1} P(52,1039) { join( skol1, meet(
% 9.24/9.66 complement( skol1 ), one ) ) ==> one }.
% 9.24/9.66 parent0: (60029) {G2,W8,D5,L1,V0,M1} { join( skol1, meet( complement(
% 9.24/9.66 skol1 ), one ) ) ==> one }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60032) {G17,W8,D5,L1,V0,M1} { join( skol2, meet( one, complement
% 9.24/9.66 ( skol2 ) ) ) ==> one }.
% 9.24/9.66 parent0[0]: (741) {G17,W10,D5,L1,V2,M1} P(723,3) { complement( join(
% 9.24/9.66 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 9.24/9.66 parent1[0; 3]: (728) {G16,W9,D6,L1,V0,M1} P(717,37) { join( skol2,
% 9.24/9.66 complement( join( complement( one ), skol2 ) ) ) ==> one }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := skol2
% 9.24/9.66 Y := one
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1098) {G18,W8,D5,L1,V0,M1} S(728);d(741) { join( skol2, meet
% 9.24/9.66 ( one, complement( skol2 ) ) ) ==> one }.
% 9.24/9.66 parent0: (60032) {G17,W8,D5,L1,V0,M1} { join( skol2, meet( one, complement
% 9.24/9.66 ( skol2 ) ) ) ==> one }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60034) {G18,W8,D5,L1,V0,M1} { one ==> join( skol2, meet( one,
% 9.24/9.66 complement( skol2 ) ) ) }.
% 9.24/9.66 parent0[0]: (1098) {G18,W8,D5,L1,V0,M1} S(728);d(741) { join( skol2, meet(
% 9.24/9.66 one, complement( skol2 ) ) ) ==> one }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60035) {G1,W8,D5,L1,V0,M1} { one ==> join( meet( one, complement
% 9.24/9.66 ( skol2 ) ), skol2 ) }.
% 9.24/9.66 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.66 parent1[0; 2]: (60034) {G18,W8,D5,L1,V0,M1} { one ==> join( skol2, meet(
% 9.24/9.66 one, complement( skol2 ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := skol2
% 9.24/9.66 Y := meet( one, complement( skol2 ) )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60038) {G1,W8,D5,L1,V0,M1} { join( meet( one, complement( skol2 )
% 9.24/9.66 ), skol2 ) ==> one }.
% 9.24/9.66 parent0[0]: (60035) {G1,W8,D5,L1,V0,M1} { one ==> join( meet( one,
% 9.24/9.66 complement( skol2 ) ), skol2 ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1114) {G19,W8,D5,L1,V0,M1} P(1098,0) { join( meet( one,
% 9.24/9.66 complement( skol2 ) ), skol2 ) ==> one }.
% 9.24/9.66 parent0: (60038) {G1,W8,D5,L1,V0,M1} { join( meet( one, complement( skol2
% 9.24/9.66 ) ), skol2 ) ==> one }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60039) {G18,W9,D7,L1,V1,M1} { X ==> meet( X, converse( complement
% 9.24/9.66 ( converse( complement( X ) ) ) ) ) }.
% 9.24/9.66 parent0[0]: (788) {G18,W9,D7,L1,V1,M1} P(784,37);d(51);d(712) { meet( X,
% 9.24/9.66 converse( complement( converse( complement( X ) ) ) ) ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60040) {G2,W9,D7,L1,V1,M1} { X ==> meet( converse( complement(
% 9.24/9.66 converse( complement( X ) ) ) ), X ) }.
% 9.24/9.66 parent0[0]: (52) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 9.24/9.66 Y ) }.
% 9.24/9.66 parent1[0; 2]: (60039) {G18,W9,D7,L1,V1,M1} { X ==> meet( X, converse(
% 9.24/9.66 complement( converse( complement( X ) ) ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := converse( complement( converse( complement( X ) ) ) )
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60043) {G2,W9,D7,L1,V1,M1} { meet( converse( complement( converse
% 9.24/9.66 ( complement( X ) ) ) ), X ) ==> X }.
% 9.24/9.66 parent0[0]: (60040) {G2,W9,D7,L1,V1,M1} { X ==> meet( converse( complement
% 9.24/9.66 ( converse( complement( X ) ) ) ), X ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1174) {G19,W9,D7,L1,V1,M1} P(788,52) { meet( converse(
% 9.24/9.66 complement( converse( complement( X ) ) ) ), X ) ==> X }.
% 9.24/9.66 parent0: (60043) {G2,W9,D7,L1,V1,M1} { meet( converse( complement(
% 9.24/9.66 converse( complement( X ) ) ) ), X ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60045) {G19,W9,D7,L1,V1,M1} { X ==> meet( converse( complement(
% 9.24/9.66 converse( complement( X ) ) ) ), X ) }.
% 9.24/9.66 parent0[0]: (1174) {G19,W9,D7,L1,V1,M1} P(788,52) { meet( converse(
% 9.24/9.66 complement( converse( complement( X ) ) ) ), X ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60046) {G17,W10,D6,L1,V1,M1} { complement( X ) ==> meet(
% 9.24/9.66 converse( complement( converse( X ) ) ), complement( X ) ) }.
% 9.24/9.66 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.66 complement( X ) ) ==> X }.
% 9.24/9.66 parent1[0; 7]: (60045) {G19,W9,D7,L1,V1,M1} { X ==> meet( converse(
% 9.24/9.66 complement( converse( complement( X ) ) ) ), X ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := complement( X )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60047) {G17,W10,D6,L1,V1,M1} { meet( converse( complement(
% 9.24/9.66 converse( X ) ) ), complement( X ) ) ==> complement( X ) }.
% 9.24/9.66 parent0[0]: (60046) {G17,W10,D6,L1,V1,M1} { complement( X ) ==> meet(
% 9.24/9.66 converse( complement( converse( X ) ) ), complement( X ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1175) {G20,W10,D6,L1,V1,M1} P(723,1174) { meet( converse(
% 9.24/9.66 complement( converse( X ) ) ), complement( X ) ) ==> complement( X ) }.
% 9.24/9.66 parent0: (60047) {G17,W10,D6,L1,V1,M1} { meet( converse( complement(
% 9.24/9.66 converse( X ) ) ), complement( X ) ) ==> complement( X ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60049) {G11,W8,D5,L1,V2,M1} { top ==> join( join( X, complement(
% 9.24/9.66 Y ) ), Y ) }.
% 9.24/9.66 parent0[0]: (1003) {G11,W8,D5,L1,V2,M1} S(23);d(319) { join( join( Y,
% 9.24/9.66 complement( X ) ), X ) ==> top }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60050) {G12,W8,D5,L1,V2,M1} { top ==> join( complement( meet( X
% 9.24/9.66 , Y ) ), Y ) }.
% 9.24/9.66 parent0[0]: (726) {G16,W10,D4,L1,V2,M1} P(722,47);d(51);d(713) { join(
% 9.24/9.66 complement( X ), complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 9.24/9.66 parent1[0; 3]: (60049) {G11,W8,D5,L1,V2,M1} { top ==> join( join( X,
% 9.24/9.66 complement( Y ) ), Y ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := complement( X )
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60051) {G12,W8,D5,L1,V2,M1} { join( complement( meet( X, Y ) ), Y
% 9.24/9.66 ) ==> top }.
% 9.24/9.66 parent0[0]: (60050) {G12,W8,D5,L1,V2,M1} { top ==> join( complement( meet
% 9.24/9.66 ( X, Y ) ), Y ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1180) {G17,W8,D5,L1,V2,M1} P(726,1003) { join( complement(
% 9.24/9.66 meet( X, Y ) ), Y ) ==> top }.
% 9.24/9.66 parent0: (60051) {G12,W8,D5,L1,V2,M1} { join( complement( meet( X, Y ) ),
% 9.24/9.66 Y ) ==> top }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60053) {G16,W10,D4,L1,V2,M1} { complement( meet( X, Y ) ) ==>
% 9.24/9.66 join( complement( X ), complement( Y ) ) }.
% 9.24/9.66 parent0[0]: (726) {G16,W10,D4,L1,V2,M1} P(722,47);d(51);d(713) { join(
% 9.24/9.66 complement( X ), complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60054) {G17,W10,D5,L1,V2,M1} { complement( meet( complement( X )
% 9.24/9.66 , Y ) ) ==> join( X, complement( Y ) ) }.
% 9.24/9.66 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.66 complement( X ) ) ==> X }.
% 9.24/9.66 parent1[0; 7]: (60053) {G16,W10,D4,L1,V2,M1} { complement( meet( X, Y ) )
% 9.24/9.66 ==> join( complement( X ), complement( Y ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := complement( X )
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1184) {G17,W10,D5,L1,V2,M1} P(723,726) { complement( meet(
% 9.24/9.66 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 9.24/9.66 parent0: (60054) {G17,W10,D5,L1,V2,M1} { complement( meet( complement( X )
% 9.24/9.66 , Y ) ) ==> join( X, complement( Y ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60059) {G16,W10,D4,L1,V2,M1} { complement( meet( X, Y ) ) ==>
% 9.24/9.66 join( complement( X ), complement( Y ) ) }.
% 9.24/9.66 parent0[0]: (726) {G16,W10,D4,L1,V2,M1} P(722,47);d(51);d(713) { join(
% 9.24/9.66 complement( X ), complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60061) {G17,W10,D5,L1,V2,M1} { complement( meet( X, complement(
% 9.24/9.66 Y ) ) ) ==> join( complement( X ), Y ) }.
% 9.24/9.66 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.66 complement( X ) ) ==> X }.
% 9.24/9.66 parent1[0; 9]: (60059) {G16,W10,D4,L1,V2,M1} { complement( meet( X, Y ) )
% 9.24/9.66 ==> join( complement( X ), complement( Y ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := complement( Y )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1185) {G17,W10,D5,L1,V2,M1} P(723,726) { complement( meet( Y
% 9.24/9.66 , complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 9.24/9.66 parent0: (60061) {G17,W10,D5,L1,V2,M1} { complement( meet( X, complement(
% 9.24/9.66 Y ) ) ) ==> join( complement( X ), Y ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60065) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 9.24/9.66 join( X, Y ), Z ) }.
% 9.24/9.66 parent0[0]: (27) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 9.24/9.66 join( join( Y, Z ), X ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 Z := Z
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60066) {G2,W14,D5,L1,V3,M1} { join( complement( meet( X, Y ) ),
% 9.24/9.66 Z ) = join( join( Z, complement( X ) ), complement( Y ) ) }.
% 9.24/9.66 parent0[0]: (726) {G16,W10,D4,L1,V2,M1} P(722,47);d(51);d(713) { join(
% 9.24/9.66 complement( X ), complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 9.24/9.66 parent1[0; 2]: (60065) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) =
% 9.24/9.66 join( join( X, Y ), Z ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := Z
% 9.24/9.66 Y := complement( X )
% 9.24/9.66 Z := complement( Y )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60068) {G2,W14,D5,L1,V3,M1} { join( join( Z, complement( X ) ),
% 9.24/9.66 complement( Y ) ) = join( complement( meet( X, Y ) ), Z ) }.
% 9.24/9.66 parent0[0]: (60066) {G2,W14,D5,L1,V3,M1} { join( complement( meet( X, Y )
% 9.24/9.66 ), Z ) = join( join( Z, complement( X ) ), complement( Y ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 Z := Z
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1191) {G17,W14,D5,L1,V3,M1} P(726,27) { join( join( Z,
% 9.24/9.66 complement( X ) ), complement( Y ) ) ==> join( complement( meet( X, Y ) )
% 9.24/9.66 , Z ) }.
% 9.24/9.66 parent0: (60068) {G2,W14,D5,L1,V3,M1} { join( join( Z, complement( X ) ),
% 9.24/9.66 complement( Y ) ) = join( complement( meet( X, Y ) ), Z ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 Z := Z
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60071) {G2,W10,D6,L1,V2,M1} { top ==> join( join( complement(
% 9.24/9.66 join( X, Y ) ), X ), Y ) }.
% 9.24/9.66 parent0[0]: (22) {G2,W10,D6,L1,V2,M1} P(1,21) { join( join( complement(
% 9.24/9.66 join( X, Y ) ), X ), Y ) ==> top }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60072) {G3,W11,D7,L1,V2,M1} { top ==> join( complement( meet(
% 9.24/9.66 join( complement( X ), Y ), X ) ), Y ) }.
% 9.24/9.66 parent0[0]: (726) {G16,W10,D4,L1,V2,M1} P(722,47);d(51);d(713) { join(
% 9.24/9.66 complement( X ), complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 9.24/9.66 parent1[0; 3]: (60071) {G2,W10,D6,L1,V2,M1} { top ==> join( join(
% 9.24/9.66 complement( join( X, Y ) ), X ), Y ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := join( complement( X ), Y )
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := complement( X )
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60076) {G3,W11,D7,L1,V2,M1} { join( complement( meet( join(
% 9.24/9.66 complement( X ), Y ), X ) ), Y ) ==> top }.
% 9.24/9.66 parent0[0]: (60072) {G3,W11,D7,L1,V2,M1} { top ==> join( complement( meet
% 9.24/9.66 ( join( complement( X ), Y ), X ) ), Y ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1192) {G17,W11,D7,L1,V2,M1} P(726,22) { join( complement(
% 9.24/9.66 meet( join( complement( X ), Y ), X ) ), Y ) ==> top }.
% 9.24/9.66 parent0: (60076) {G3,W11,D7,L1,V2,M1} { join( complement( meet( join(
% 9.24/9.66 complement( X ), Y ), X ) ), Y ) ==> top }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60080) {G16,W10,D4,L1,V2,M1} { complement( meet( X, Y ) ) ==>
% 9.24/9.66 join( complement( X ), complement( Y ) ) }.
% 9.24/9.66 parent0[0]: (726) {G16,W10,D4,L1,V2,M1} P(722,47);d(51);d(713) { join(
% 9.24/9.66 complement( X ), complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60082) {G1,W10,D4,L1,V2,M1} { complement( meet( X, Y ) ) ==>
% 9.24/9.66 join( complement( Y ), complement( X ) ) }.
% 9.24/9.66 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.66 parent1[0; 5]: (60080) {G16,W10,D4,L1,V2,M1} { complement( meet( X, Y ) )
% 9.24/9.66 ==> join( complement( X ), complement( Y ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := complement( X )
% 9.24/9.66 Y := complement( Y )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60084) {G2,W9,D4,L1,V2,M1} { complement( meet( X, Y ) ) ==>
% 9.24/9.66 complement( meet( Y, X ) ) }.
% 9.24/9.66 parent0[0]: (726) {G16,W10,D4,L1,V2,M1} P(722,47);d(51);d(713) { join(
% 9.24/9.66 complement( X ), complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 9.24/9.66 parent1[0; 5]: (60082) {G1,W10,D4,L1,V2,M1} { complement( meet( X, Y ) )
% 9.24/9.66 ==> join( complement( Y ), complement( X ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1195) {G17,W9,D4,L1,V2,M1} P(726,0);d(726) { complement( meet
% 9.24/9.66 ( X, Y ) ) = complement( meet( Y, X ) ) }.
% 9.24/9.66 parent0: (60084) {G2,W9,D4,L1,V2,M1} { complement( meet( X, Y ) ) ==>
% 9.24/9.66 complement( meet( Y, X ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60086) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 9.24/9.66 join( X, Y ), Z ) }.
% 9.24/9.66 parent0[0]: (27) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 9.24/9.66 join( join( Y, Z ), X ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 Z := Z
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60089) {G2,W12,D5,L1,V3,M1} { join( join( X, Y ), complement(
% 9.24/9.66 meet( Z, X ) ) ) = join( top, Y ) }.
% 9.24/9.66 parent0[0]: (1180) {G17,W8,D5,L1,V2,M1} P(726,1003) { join( complement(
% 9.24/9.66 meet( X, Y ) ), Y ) ==> top }.
% 9.24/9.66 parent1[0; 10]: (60086) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) =
% 9.24/9.66 join( join( X, Y ), Z ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Z
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := complement( meet( Z, X ) )
% 9.24/9.66 Y := X
% 9.24/9.66 Z := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60090) {G3,W10,D5,L1,V3,M1} { join( join( X, Y ), complement(
% 9.24/9.66 meet( Z, X ) ) ) = top }.
% 9.24/9.66 parent0[0]: (298) {G4,W5,D3,L1,V1,M1} P(37,23);d(1);d(11);d(234) { join(
% 9.24/9.66 top, Y ) ==> top }.
% 9.24/9.66 parent1[0; 9]: (60089) {G2,W12,D5,L1,V3,M1} { join( join( X, Y ),
% 9.24/9.66 complement( meet( Z, X ) ) ) = join( top, Y ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := T
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 Z := Z
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1215) {G18,W10,D5,L1,V3,M1} P(1180,27);d(298) { join( join( Y
% 9.24/9.66 , Z ), complement( meet( X, Y ) ) ) ==> top }.
% 9.24/9.66 parent0: (60090) {G3,W10,D5,L1,V3,M1} { join( join( X, Y ), complement(
% 9.24/9.66 meet( Z, X ) ) ) = top }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := Z
% 9.24/9.66 Z := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60092) {G17,W8,D5,L1,V2,M1} { top ==> join( complement( meet( X,
% 9.24/9.66 Y ) ), Y ) }.
% 9.24/9.66 parent0[0]: (1180) {G17,W8,D5,L1,V2,M1} P(726,1003) { join( complement(
% 9.24/9.66 meet( X, Y ) ), Y ) ==> top }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60093) {G1,W8,D5,L1,V2,M1} { top ==> join( Y, complement( meet(
% 9.24/9.66 X, Y ) ) ) }.
% 9.24/9.66 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.66 parent1[0; 2]: (60092) {G17,W8,D5,L1,V2,M1} { top ==> join( complement(
% 9.24/9.66 meet( X, Y ) ), Y ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := complement( meet( X, Y ) )
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60096) {G1,W8,D5,L1,V2,M1} { join( X, complement( meet( Y, X ) )
% 9.24/9.66 ) ==> top }.
% 9.24/9.66 parent0[0]: (60093) {G1,W8,D5,L1,V2,M1} { top ==> join( Y, complement(
% 9.24/9.66 meet( X, Y ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1221) {G18,W8,D5,L1,V2,M1} P(1180,0) { join( Y, complement(
% 9.24/9.66 meet( X, Y ) ) ) ==> top }.
% 9.24/9.66 parent0: (60096) {G1,W8,D5,L1,V2,M1} { join( X, complement( meet( Y, X ) )
% 9.24/9.66 ) ==> top }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60097) {G18,W8,D5,L1,V2,M1} { top ==> join( X, complement( meet(
% 9.24/9.66 Y, X ) ) ) }.
% 9.24/9.66 parent0[0]: (1221) {G18,W8,D5,L1,V2,M1} P(1180,0) { join( Y, complement(
% 9.24/9.66 meet( X, Y ) ) ) ==> top }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60099) {G17,W9,D6,L1,V2,M1} { top ==> complement( meet( X, meet
% 9.24/9.66 ( Y, complement( X ) ) ) ) }.
% 9.24/9.66 parent0[0]: (726) {G16,W10,D4,L1,V2,M1} P(722,47);d(51);d(713) { join(
% 9.24/9.66 complement( X ), complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 9.24/9.66 parent1[0; 2]: (60097) {G18,W8,D5,L1,V2,M1} { top ==> join( X, complement
% 9.24/9.66 ( meet( Y, X ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := meet( Y, complement( X ) )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := complement( X )
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60100) {G17,W9,D6,L1,V2,M1} { complement( meet( X, meet( Y,
% 9.24/9.66 complement( X ) ) ) ) ==> top }.
% 9.24/9.66 parent0[0]: (60099) {G17,W9,D6,L1,V2,M1} { top ==> complement( meet( X,
% 9.24/9.66 meet( Y, complement( X ) ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1254) {G19,W9,D6,L1,V2,M1} P(1221,726) { complement( meet( X
% 9.24/9.66 , meet( Y, complement( X ) ) ) ) ==> top }.
% 9.24/9.66 parent0: (60100) {G17,W9,D6,L1,V2,M1} { complement( meet( X, meet( Y,
% 9.24/9.66 complement( X ) ) ) ) ==> top }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60102) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 9.24/9.66 join( X, Y ), Z ) }.
% 9.24/9.66 parent0[0]: (27) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 9.24/9.66 join( join( Y, Z ), X ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 Z := Z
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60111) {G2,W12,D5,L1,V3,M1} { join( top, Z ) = join( join( Z, X
% 9.24/9.66 ), complement( meet( Y, X ) ) ) }.
% 9.24/9.66 parent0[0]: (1221) {G18,W8,D5,L1,V2,M1} P(1180,0) { join( Y, complement(
% 9.24/9.66 meet( X, Y ) ) ) ==> top }.
% 9.24/9.66 parent1[0; 2]: (60102) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) =
% 9.24/9.66 join( join( X, Y ), Z ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := Z
% 9.24/9.66 Y := X
% 9.24/9.66 Z := complement( meet( Y, X ) )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60116) {G3,W10,D5,L1,V3,M1} { top = join( join( X, Y ),
% 9.24/9.66 complement( meet( Z, Y ) ) ) }.
% 9.24/9.66 parent0[0]: (298) {G4,W5,D3,L1,V1,M1} P(37,23);d(1);d(11);d(234) { join(
% 9.24/9.66 top, Y ) ==> top }.
% 9.24/9.66 parent1[0; 1]: (60111) {G2,W12,D5,L1,V3,M1} { join( top, Z ) = join( join
% 9.24/9.66 ( Z, X ), complement( meet( Y, X ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := T
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := Z
% 9.24/9.66 Z := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60117) {G3,W10,D5,L1,V3,M1} { join( join( X, Y ), complement(
% 9.24/9.66 meet( Z, Y ) ) ) = top }.
% 9.24/9.66 parent0[0]: (60116) {G3,W10,D5,L1,V3,M1} { top = join( join( X, Y ),
% 9.24/9.66 complement( meet( Z, Y ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 Z := Z
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1264) {G19,W10,D5,L1,V3,M1} P(1221,27);d(298) { join( join( Z
% 9.24/9.66 , X ), complement( meet( Y, X ) ) ) ==> top }.
% 9.24/9.66 parent0: (60117) {G3,W10,D5,L1,V3,M1} { join( join( X, Y ), complement(
% 9.24/9.66 meet( Z, Y ) ) ) = top }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Z
% 9.24/9.66 Y := X
% 9.24/9.66 Z := Y
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60118) {G0,W6,D4,L1,V1,M1} { zero ==> meet( X, complement( X ) )
% 9.24/9.66 }.
% 9.24/9.66 parent0[0]: (12) {G0,W6,D4,L1,V1,M1} I { meet( X, complement( X ) ) ==>
% 9.24/9.66 zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60119) {G1,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 9.24/9.66 complement( meet( Y, X ) ) ) }.
% 9.24/9.66 parent0[0]: (1195) {G17,W9,D4,L1,V2,M1} P(726,0);d(726) { complement( meet
% 9.24/9.66 ( X, Y ) ) = complement( meet( Y, X ) ) }.
% 9.24/9.66 parent1[0; 6]: (60118) {G0,W6,D4,L1,V1,M1} { zero ==> meet( X, complement
% 9.24/9.66 ( X ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := meet( X, Y )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60122) {G1,W10,D5,L1,V2,M1} { meet( meet( X, Y ), complement(
% 9.24/9.66 meet( Y, X ) ) ) ==> zero }.
% 9.24/9.66 parent0[0]: (60119) {G1,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 9.24/9.66 complement( meet( Y, X ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1322) {G18,W10,D5,L1,V2,M1} P(1195,12) { meet( meet( X, Y ),
% 9.24/9.66 complement( meet( Y, X ) ) ) ==> zero }.
% 9.24/9.66 parent0: (60122) {G1,W10,D5,L1,V2,M1} { meet( meet( X, Y ), complement(
% 9.24/9.66 meet( Y, X ) ) ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60124) {G19,W9,D7,L1,V1,M1} { X ==> meet( converse( complement(
% 9.24/9.66 converse( complement( X ) ) ) ), X ) }.
% 9.24/9.66 parent0[0]: (1174) {G19,W9,D7,L1,V1,M1} P(788,52) { meet( converse(
% 9.24/9.66 complement( converse( complement( X ) ) ) ), X ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60130) {G20,W18,D6,L1,V2,M1} { meet( X, meet( Y, complement( X )
% 9.24/9.66 ) ) ==> meet( converse( complement( converse( top ) ) ), meet( X, meet(
% 9.24/9.66 Y, complement( X ) ) ) ) }.
% 9.24/9.66 parent0[0]: (1254) {G19,W9,D6,L1,V2,M1} P(1221,726) { complement( meet( X,
% 9.24/9.66 meet( Y, complement( X ) ) ) ) ==> top }.
% 9.24/9.66 parent1[0; 11]: (60124) {G19,W9,D7,L1,V1,M1} { X ==> meet( converse(
% 9.24/9.66 complement( converse( complement( X ) ) ) ), X ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := meet( X, meet( Y, complement( X ) ) )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60131) {G17,W17,D6,L1,V2,M1} { meet( X, meet( Y, complement( X )
% 9.24/9.66 ) ) ==> meet( converse( complement( top ) ), meet( X, meet( Y,
% 9.24/9.66 complement( X ) ) ) ) }.
% 9.24/9.66 parent0[0]: (616) {G16,W4,D3,L1,V0,M1} P(610,472) { converse( top ) ==> top
% 9.24/9.66 }.
% 9.24/9.66 parent1[0; 10]: (60130) {G20,W18,D6,L1,V2,M1} { meet( X, meet( Y,
% 9.24/9.66 complement( X ) ) ) ==> meet( converse( complement( converse( top ) ) ),
% 9.24/9.66 meet( X, meet( Y, complement( X ) ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60132) {G2,W16,D6,L1,V2,M1} { meet( X, meet( Y, complement( X )
% 9.24/9.66 ) ) ==> meet( converse( zero ), meet( X, meet( Y, complement( X ) ) ) )
% 9.24/9.66 }.
% 9.24/9.66 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.66 zero }.
% 9.24/9.66 parent1[0; 9]: (60131) {G17,W17,D6,L1,V2,M1} { meet( X, meet( Y,
% 9.24/9.66 complement( X ) ) ) ==> meet( converse( complement( top ) ), meet( X,
% 9.24/9.66 meet( Y, complement( X ) ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60133) {G3,W15,D6,L1,V2,M1} { meet( X, meet( Y, complement( X )
% 9.24/9.66 ) ) ==> meet( zero, meet( X, meet( Y, complement( X ) ) ) ) }.
% 9.24/9.66 parent0[0]: (742) {G17,W4,D3,L1,V0,M1} P(727,712) { converse( zero ) ==>
% 9.24/9.66 zero }.
% 9.24/9.66 parent1[0; 8]: (60132) {G2,W16,D6,L1,V2,M1} { meet( X, meet( Y, complement
% 9.24/9.66 ( X ) ) ) ==> meet( converse( zero ), meet( X, meet( Y, complement( X ) )
% 9.24/9.66 ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60134) {G4,W8,D5,L1,V2,M1} { meet( X, meet( Y, complement( X ) )
% 9.24/9.66 ) ==> zero }.
% 9.24/9.66 parent0[0]: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero,
% 9.24/9.66 X ) ==> zero }.
% 9.24/9.66 parent1[0; 7]: (60133) {G3,W15,D6,L1,V2,M1} { meet( X, meet( Y, complement
% 9.24/9.66 ( X ) ) ) ==> meet( zero, meet( X, meet( Y, complement( X ) ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := meet( X, meet( Y, complement( X ) ) )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1326) {G20,W8,D5,L1,V2,M1} P(1254,1174);d(616);d(51);d(742);d
% 9.24/9.66 (339) { meet( X, meet( Y, complement( X ) ) ) ==> zero }.
% 9.24/9.66 parent0: (60134) {G4,W8,D5,L1,V2,M1} { meet( X, meet( Y, complement( X ) )
% 9.24/9.66 ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60137) {G20,W8,D5,L1,V2,M1} { zero ==> meet( X, meet( Y,
% 9.24/9.66 complement( X ) ) ) }.
% 9.24/9.66 parent0[0]: (1326) {G20,W8,D5,L1,V2,M1} P(1254,1174);d(616);d(51);d(742);d(
% 9.24/9.66 339) { meet( X, meet( Y, complement( X ) ) ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60138) {G17,W8,D4,L1,V2,M1} { zero ==> meet( complement( X ),
% 9.24/9.66 meet( Y, X ) ) }.
% 9.24/9.66 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.66 complement( X ) ) ==> X }.
% 9.24/9.66 parent1[0; 7]: (60137) {G20,W8,D5,L1,V2,M1} { zero ==> meet( X, meet( Y,
% 9.24/9.66 complement( X ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := complement( X )
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60139) {G17,W8,D4,L1,V2,M1} { meet( complement( X ), meet( Y, X )
% 9.24/9.66 ) ==> zero }.
% 9.24/9.66 parent0[0]: (60138) {G17,W8,D4,L1,V2,M1} { zero ==> meet( complement( X )
% 9.24/9.66 , meet( Y, X ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1328) {G21,W8,D4,L1,V2,M1} P(723,1326) { meet( complement( X
% 9.24/9.66 ), meet( Y, X ) ) ==> zero }.
% 9.24/9.66 parent0: (60139) {G17,W8,D4,L1,V2,M1} { meet( complement( X ), meet( Y, X
% 9.24/9.66 ) ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60140) {G20,W8,D5,L1,V2,M1} { zero ==> meet( X, meet( Y,
% 9.24/9.66 complement( X ) ) ) }.
% 9.24/9.66 parent0[0]: (1326) {G20,W8,D5,L1,V2,M1} P(1254,1174);d(616);d(51);d(742);d(
% 9.24/9.66 339) { meet( X, meet( Y, complement( X ) ) ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60142) {G2,W8,D5,L1,V2,M1} { zero ==> meet( X, meet( complement
% 9.24/9.66 ( X ), Y ) ) }.
% 9.24/9.66 parent0[0]: (52) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 9.24/9.66 Y ) }.
% 9.24/9.66 parent1[0; 4]: (60140) {G20,W8,D5,L1,V2,M1} { zero ==> meet( X, meet( Y,
% 9.24/9.66 complement( X ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := complement( X )
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60148) {G2,W8,D5,L1,V2,M1} { meet( X, meet( complement( X ), Y )
% 9.24/9.66 ) ==> zero }.
% 9.24/9.66 parent0[0]: (60142) {G2,W8,D5,L1,V2,M1} { zero ==> meet( X, meet(
% 9.24/9.66 complement( X ), Y ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1330) {G21,W8,D5,L1,V2,M1} P(52,1326) { meet( Y, meet(
% 9.24/9.66 complement( Y ), X ) ) ==> zero }.
% 9.24/9.66 parent0: (60148) {G2,W8,D5,L1,V2,M1} { meet( X, meet( complement( X ), Y )
% 9.24/9.66 ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60150) {G21,W8,D4,L1,V2,M1} { zero ==> meet( complement( X ),
% 9.24/9.66 meet( Y, X ) ) }.
% 9.24/9.66 parent0[0]: (1328) {G21,W8,D4,L1,V2,M1} P(723,1326) { meet( complement( X )
% 9.24/9.66 , meet( Y, X ) ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60151) {G22,W7,D4,L1,V0,M1} { zero ==> meet( complement( one ),
% 9.24/9.66 converse( skol2 ) ) }.
% 9.24/9.66 parent0[0]: (847) {G21,W7,D4,L1,V0,M1} P(810,37);d(51);d(712) { meet(
% 9.24/9.66 converse( skol2 ), one ) ==> converse( skol2 ) }.
% 9.24/9.66 parent1[0; 5]: (60150) {G21,W8,D4,L1,V2,M1} { zero ==> meet( complement( X
% 9.24/9.66 ), meet( Y, X ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := one
% 9.24/9.66 Y := converse( skol2 )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60152) {G22,W7,D4,L1,V0,M1} { meet( complement( one ), converse(
% 9.24/9.66 skol2 ) ) ==> zero }.
% 9.24/9.66 parent0[0]: (60151) {G22,W7,D4,L1,V0,M1} { zero ==> meet( complement( one
% 9.24/9.66 ), converse( skol2 ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1335) {G22,W7,D4,L1,V0,M1} P(847,1328) { meet( complement(
% 9.24/9.66 one ), converse( skol2 ) ) ==> zero }.
% 9.24/9.66 parent0: (60152) {G22,W7,D4,L1,V0,M1} { meet( complement( one ), converse
% 9.24/9.66 ( skol2 ) ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60154) {G21,W8,D4,L1,V2,M1} { zero ==> meet( complement( X ),
% 9.24/9.66 meet( Y, X ) ) }.
% 9.24/9.66 parent0[0]: (1328) {G21,W8,D4,L1,V2,M1} P(723,1326) { meet( complement( X )
% 9.24/9.66 , meet( Y, X ) ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60155) {G22,W7,D4,L1,V0,M1} { zero ==> meet( complement( one ),
% 9.24/9.66 converse( skol1 ) ) }.
% 9.24/9.66 parent0[0]: (833) {G21,W7,D4,L1,V0,M1} P(808,37);d(51);d(712) { meet(
% 9.24/9.66 converse( skol1 ), one ) ==> converse( skol1 ) }.
% 9.24/9.66 parent1[0; 5]: (60154) {G21,W8,D4,L1,V2,M1} { zero ==> meet( complement( X
% 9.24/9.66 ), meet( Y, X ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := one
% 9.24/9.66 Y := converse( skol1 )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60156) {G22,W7,D4,L1,V0,M1} { meet( complement( one ), converse(
% 9.24/9.66 skol1 ) ) ==> zero }.
% 9.24/9.66 parent0[0]: (60155) {G22,W7,D4,L1,V0,M1} { zero ==> meet( complement( one
% 9.24/9.66 ), converse( skol1 ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1336) {G22,W7,D4,L1,V0,M1} P(833,1328) { meet( complement(
% 9.24/9.66 one ), converse( skol1 ) ) ==> zero }.
% 9.24/9.66 parent0: (60156) {G22,W7,D4,L1,V0,M1} { meet( complement( one ), converse
% 9.24/9.66 ( skol1 ) ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60157) {G21,W8,D4,L1,V2,M1} { zero ==> meet( complement( X ),
% 9.24/9.66 meet( Y, X ) ) }.
% 9.24/9.66 parent0[0]: (1328) {G21,W8,D4,L1,V2,M1} P(723,1326) { meet( complement( X )
% 9.24/9.66 , meet( Y, X ) ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60158) {G2,W8,D4,L1,V2,M1} { zero ==> meet( meet( Y, X ),
% 9.24/9.66 complement( X ) ) }.
% 9.24/9.66 parent0[0]: (52) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 9.24/9.66 Y ) }.
% 9.24/9.66 parent1[0; 2]: (60157) {G21,W8,D4,L1,V2,M1} { zero ==> meet( complement( X
% 9.24/9.66 ), meet( Y, X ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := meet( Y, X )
% 9.24/9.66 Y := complement( X )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60162) {G2,W8,D4,L1,V2,M1} { meet( meet( X, Y ), complement( Y )
% 9.24/9.66 ) ==> zero }.
% 9.24/9.66 parent0[0]: (60158) {G2,W8,D4,L1,V2,M1} { zero ==> meet( meet( Y, X ),
% 9.24/9.66 complement( X ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1339) {G22,W8,D4,L1,V2,M1} P(1328,52) { meet( meet( Y, X ),
% 9.24/9.66 complement( X ) ) ==> zero }.
% 9.24/9.66 parent0: (60162) {G2,W8,D4,L1,V2,M1} { meet( meet( X, Y ), complement( Y )
% 9.24/9.66 ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60166) {G22,W8,D4,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 9.24/9.66 complement( Y ) ) }.
% 9.24/9.66 parent0[0]: (1339) {G22,W8,D4,L1,V2,M1} P(1328,52) { meet( meet( Y, X ),
% 9.24/9.66 complement( X ) ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60168) {G2,W8,D4,L1,V2,M1} { zero ==> meet( meet( Y, X ),
% 9.24/9.66 complement( Y ) ) }.
% 9.24/9.66 parent0[0]: (52) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 9.24/9.66 Y ) }.
% 9.24/9.66 parent1[0; 3]: (60166) {G22,W8,D4,L1,V2,M1} { zero ==> meet( meet( X, Y )
% 9.24/9.66 , complement( Y ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60174) {G2,W8,D4,L1,V2,M1} { meet( meet( X, Y ), complement( X )
% 9.24/9.66 ) ==> zero }.
% 9.24/9.66 parent0[0]: (60168) {G2,W8,D4,L1,V2,M1} { zero ==> meet( meet( Y, X ),
% 9.24/9.66 complement( Y ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1349) {G23,W8,D4,L1,V2,M1} P(52,1339) { meet( meet( Y, X ),
% 9.24/9.66 complement( Y ) ) ==> zero }.
% 9.24/9.66 parent0: (60174) {G2,W8,D4,L1,V2,M1} { meet( meet( X, Y ), complement( X )
% 9.24/9.66 ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60176) {G23,W8,D4,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 9.24/9.66 complement( X ) ) }.
% 9.24/9.66 parent0[0]: (1349) {G23,W8,D4,L1,V2,M1} P(52,1339) { meet( meet( Y, X ),
% 9.24/9.66 complement( Y ) ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := Y
% 9.24/9.66 Y := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60177) {G17,W8,D5,L1,V2,M1} { zero ==> meet( meet( complement( X
% 9.24/9.66 ), Y ), X ) }.
% 9.24/9.66 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.66 complement( X ) ) ==> X }.
% 9.24/9.66 parent1[0; 7]: (60176) {G23,W8,D4,L1,V2,M1} { zero ==> meet( meet( X, Y )
% 9.24/9.66 , complement( X ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := complement( X )
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60178) {G17,W8,D5,L1,V2,M1} { meet( meet( complement( X ), Y ), X
% 9.24/9.66 ) ==> zero }.
% 9.24/9.66 parent0[0]: (60177) {G17,W8,D5,L1,V2,M1} { zero ==> meet( meet( complement
% 9.24/9.66 ( X ), Y ), X ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1351) {G24,W8,D5,L1,V2,M1} P(723,1349) { meet( meet(
% 9.24/9.66 complement( X ), Y ), X ) ==> zero }.
% 9.24/9.66 parent0: (60178) {G17,W8,D5,L1,V2,M1} { meet( meet( complement( X ), Y ),
% 9.24/9.66 X ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60180) {G17,W10,D5,L1,V2,M1} { join( X, complement( Y ) ) ==>
% 9.24/9.66 complement( meet( complement( X ), Y ) ) }.
% 9.24/9.66 parent0[0]: (1184) {G17,W10,D5,L1,V2,M1} P(723,726) { complement( meet(
% 9.24/9.66 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60182) {G16,W9,D5,L1,V1,M1} { join( X, complement( complement( X
% 9.24/9.66 ) ) ) ==> complement( complement( X ) ) }.
% 9.24/9.66 parent0[0]: (721) {G15,W5,D3,L1,V1,M1} P(712,312) { meet( X, X ) ==> X }.
% 9.24/9.66 parent1[0; 7]: (60180) {G17,W10,D5,L1,V2,M1} { join( X, complement( Y ) )
% 9.24/9.66 ==> complement( meet( complement( X ), Y ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := complement( X )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := complement( X )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60184) {G17,W7,D5,L1,V1,M1} { join( X, complement( complement( X
% 9.24/9.66 ) ) ) ==> X }.
% 9.24/9.66 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.66 complement( X ) ) ==> X }.
% 9.24/9.66 parent1[0; 6]: (60182) {G16,W9,D5,L1,V1,M1} { join( X, complement(
% 9.24/9.66 complement( X ) ) ) ==> complement( complement( X ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60185) {G17,W5,D3,L1,V1,M1} { join( X, X ) ==> X }.
% 9.24/9.66 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.66 complement( X ) ) ==> X }.
% 9.24/9.66 parent1[0; 3]: (60184) {G17,W7,D5,L1,V1,M1} { join( X, complement(
% 9.24/9.66 complement( X ) ) ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1542) {G18,W5,D3,L1,V1,M1} P(721,1184);d(723) { join( X, X )
% 9.24/9.66 ==> X }.
% 9.24/9.66 parent0: (60185) {G17,W5,D3,L1,V1,M1} { join( X, X ) ==> X }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60197) {G2,W9,D4,L1,V2,M1} { join( join( X, Y ), X ) = join( X,
% 9.24/9.66 Y ) }.
% 9.24/9.66 parent0[0]: (1542) {G18,W5,D3,L1,V1,M1} P(721,1184);d(723) { join( X, X )
% 9.24/9.66 ==> X }.
% 9.24/9.66 parent1[0; 7]: (28) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ),
% 9.24/9.66 X ) = join( join( Z, X ), Y ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 Z := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1551) {G19,W9,D4,L1,V2,M1} P(1542,28) { join( join( X, Y ), X
% 9.24/9.66 ) ==> join( X, Y ) }.
% 9.24/9.66 parent0: (60197) {G2,W9,D4,L1,V2,M1} { join( join( X, Y ), X ) = join( X,
% 9.24/9.66 Y ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60199) {G1,W25,D8,L1,V2,M1} { meet( composition( X, meet( one,
% 9.24/9.66 composition( converse( X ), Y ) ) ), Y ) ==> join( meet( X, Y ), meet(
% 9.24/9.66 composition( X, meet( one, composition( converse( X ), Y ) ) ), Y ) ) }.
% 9.24/9.66 parent0[0]: (143) {G1,W25,D8,L1,V2,M1} P(5,14) { join( meet( X, Y ), meet(
% 9.24/9.66 composition( X, meet( one, composition( converse( X ), Y ) ) ), Y ) ) ==>
% 9.24/9.66 meet( composition( X, meet( one, composition( converse( X ), Y ) ) ), Y
% 9.24/9.66 ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60203) {G2,W34,D8,L1,V1,M1} { meet( composition( X, meet( one,
% 9.24/9.66 composition( converse( X ), complement( composition( X, top ) ) ) ) ),
% 9.24/9.66 complement( composition( X, top ) ) ) ==> join( meet( X, complement(
% 9.24/9.66 composition( X, top ) ) ), meet( composition( X, meet( one, zero ) ),
% 9.24/9.66 complement( composition( X, top ) ) ) ) }.
% 9.24/9.66 parent0[0]: (954) {G18,W9,D5,L1,V1,M1} P(88,933);d(616) { composition(
% 9.24/9.66 converse( X ), complement( composition( X, top ) ) ) ==> zero }.
% 9.24/9.66 parent1[0; 29]: (60199) {G1,W25,D8,L1,V2,M1} { meet( composition( X, meet
% 9.24/9.66 ( one, composition( converse( X ), Y ) ) ), Y ) ==> join( meet( X, Y ),
% 9.24/9.66 meet( composition( X, meet( one, composition( converse( X ), Y ) ) ), Y )
% 9.24/9.66 ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 Y := complement( composition( X, top ) )
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60206) {G3,W25,D8,L1,V1,M1} { meet( composition( X, meet( one,
% 9.24/9.66 composition( converse( X ), complement( composition( X, top ) ) ) ) ),
% 9.24/9.66 complement( composition( X, top ) ) ) ==> join( meet( X, complement(
% 9.24/9.66 composition( X, top ) ) ), zero ) }.
% 9.24/9.66 parent0[0]: (985) {G22,W10,D5,L1,V2,M1} P(954,14);d(337);d(966);d(339);d(
% 9.24/9.66 712) { meet( composition( X, Y ), complement( composition( X, top ) ) )
% 9.24/9.66 ==> zero }.
% 9.24/9.66 parent1[0; 24]: (60203) {G2,W34,D8,L1,V1,M1} { meet( composition( X, meet
% 9.24/9.66 ( one, composition( converse( X ), complement( composition( X, top ) ) )
% 9.24/9.66 ) ), complement( composition( X, top ) ) ) ==> join( meet( X, complement
% 9.24/9.66 ( composition( X, top ) ) ), meet( composition( X, meet( one, zero ) ),
% 9.24/9.66 complement( composition( X, top ) ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := meet( one, zero )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60207) {G4,W10,D6,L1,V1,M1} { zero ==> join( meet( X, complement
% 9.24/9.66 ( composition( X, top ) ) ), zero ) }.
% 9.24/9.66 parent0[0]: (985) {G22,W10,D5,L1,V2,M1} P(954,14);d(337);d(966);d(339);d(
% 9.24/9.66 712) { meet( composition( X, Y ), complement( composition( X, top ) ) )
% 9.24/9.66 ==> zero }.
% 9.24/9.66 parent1[0; 1]: (60206) {G3,W25,D8,L1,V1,M1} { meet( composition( X, meet(
% 9.24/9.66 one, composition( converse( X ), complement( composition( X, top ) ) ) )
% 9.24/9.66 ), complement( composition( X, top ) ) ) ==> join( meet( X, complement(
% 9.24/9.66 composition( X, top ) ) ), zero ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := meet( one, composition( converse( X ), complement( composition( X,
% 9.24/9.66 top ) ) ) )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60210) {G5,W8,D5,L1,V1,M1} { zero ==> meet( X, complement(
% 9.24/9.66 composition( X, top ) ) ) }.
% 9.24/9.66 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.66 }.
% 9.24/9.66 parent1[0; 2]: (60207) {G4,W10,D6,L1,V1,M1} { zero ==> join( meet( X,
% 9.24/9.66 complement( composition( X, top ) ) ), zero ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := meet( X, complement( composition( X, top ) ) )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60211) {G5,W8,D5,L1,V1,M1} { meet( X, complement( composition( X
% 9.24/9.66 , top ) ) ) ==> zero }.
% 9.24/9.66 parent0[0]: (60210) {G5,W8,D5,L1,V1,M1} { zero ==> meet( X, complement(
% 9.24/9.66 composition( X, top ) ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1680) {G23,W8,D5,L1,V1,M1} P(954,143);d(985);d(712) { meet( X
% 9.24/9.66 , complement( composition( X, top ) ) ) ==> zero }.
% 9.24/9.66 parent0: (60211) {G5,W8,D5,L1,V1,M1} { meet( X, complement( composition( X
% 9.24/9.66 , top ) ) ) ==> zero }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60213) {G1,W25,D8,L1,V2,M1} { meet( composition( X, meet( one,
% 9.24/9.66 composition( converse( X ), Y ) ) ), Y ) ==> join( meet( X, Y ), meet(
% 9.24/9.66 composition( X, meet( one, composition( converse( X ), Y ) ) ), Y ) ) }.
% 9.24/9.66 parent0[0]: (143) {G1,W25,D8,L1,V2,M1} P(5,14) { join( meet( X, Y ), meet(
% 9.24/9.66 composition( X, meet( one, composition( converse( X ), Y ) ) ), Y ) ) ==>
% 9.24/9.66 meet( composition( X, meet( one, composition( converse( X ), Y ) ) ), Y
% 9.24/9.66 ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60216) {G2,W23,D8,L1,V0,M1} { meet( composition( skol1, meet(
% 9.24/9.66 one, composition( converse( skol1 ), one ) ) ), one ) ==> join( skol1,
% 9.24/9.66 meet( composition( skol1, meet( one, composition( converse( skol1 ), one
% 9.24/9.66 ) ) ), one ) ) }.
% 9.24/9.66 parent0[0]: (720) {G15,W5,D3,L1,V0,M1} P(712,300) { meet( skol1, one ) ==>
% 9.24/9.66 skol1 }.
% 9.24/9.66 parent1[0; 12]: (60213) {G1,W25,D8,L1,V2,M1} { meet( composition( X, meet
% 9.24/9.66 ( one, composition( converse( X ), Y ) ) ), Y ) ==> join( meet( X, Y ),
% 9.24/9.66 meet( composition( X, meet( one, composition( converse( X ), Y ) ) ), Y )
% 9.24/9.66 ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := skol1
% 9.24/9.66 Y := one
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60218) {G1,W21,D7,L1,V0,M1} { meet( composition( skol1, meet(
% 9.24/9.66 one, composition( converse( skol1 ), one ) ) ), one ) ==> join( skol1,
% 9.24/9.66 meet( composition( skol1, meet( one, converse( skol1 ) ) ), one ) ) }.
% 9.24/9.66 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 9.24/9.66 parent1[0; 18]: (60216) {G2,W23,D8,L1,V0,M1} { meet( composition( skol1,
% 9.24/9.66 meet( one, composition( converse( skol1 ), one ) ) ), one ) ==> join(
% 9.24/9.66 skol1, meet( composition( skol1, meet( one, composition( converse( skol1
% 9.24/9.66 ), one ) ) ), one ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := converse( skol1 )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60219) {G1,W19,D7,L1,V0,M1} { meet( composition( skol1, meet(
% 9.24/9.66 one, converse( skol1 ) ) ), one ) ==> join( skol1, meet( composition(
% 9.24/9.66 skol1, meet( one, converse( skol1 ) ) ), one ) ) }.
% 9.24/9.66 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 9.24/9.66 parent1[0; 6]: (60218) {G1,W21,D7,L1,V0,M1} { meet( composition( skol1,
% 9.24/9.66 meet( one, composition( converse( skol1 ), one ) ) ), one ) ==> join(
% 9.24/9.66 skol1, meet( composition( skol1, meet( one, converse( skol1 ) ) ), one )
% 9.24/9.66 ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := converse( skol1 )
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60223) {G2,W17,D6,L1,V0,M1} { meet( composition( skol1, meet(
% 9.24/9.66 one, converse( skol1 ) ) ), one ) ==> join( skol1, meet( composition(
% 9.24/9.66 skol1, converse( skol1 ) ), one ) ) }.
% 9.24/9.66 parent0[0]: (836) {G22,W7,D4,L1,V0,M1} P(833,52) { meet( one, converse(
% 9.24/9.66 skol1 ) ) ==> converse( skol1 ) }.
% 9.24/9.66 parent1[0; 14]: (60219) {G1,W19,D7,L1,V0,M1} { meet( composition( skol1,
% 9.24/9.66 meet( one, converse( skol1 ) ) ), one ) ==> join( skol1, meet(
% 9.24/9.66 composition( skol1, meet( one, converse( skol1 ) ) ), one ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60224) {G3,W15,D6,L1,V0,M1} { meet( composition( skol1, converse
% 9.24/9.66 ( skol1 ) ), one ) ==> join( skol1, meet( composition( skol1, converse(
% 9.24/9.66 skol1 ) ), one ) ) }.
% 9.24/9.66 parent0[0]: (836) {G22,W7,D4,L1,V0,M1} P(833,52) { meet( one, converse(
% 9.24/9.66 skol1 ) ) ==> converse( skol1 ) }.
% 9.24/9.66 parent1[0; 4]: (60223) {G2,W17,D6,L1,V0,M1} { meet( composition( skol1,
% 9.24/9.66 meet( one, converse( skol1 ) ) ), one ) ==> join( skol1, meet(
% 9.24/9.66 composition( skol1, converse( skol1 ) ), one ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60226) {G3,W15,D6,L1,V0,M1} { join( skol1, meet( composition(
% 9.24/9.66 skol1, converse( skol1 ) ), one ) ) ==> meet( composition( skol1,
% 9.24/9.66 converse( skol1 ) ), one ) }.
% 9.24/9.66 parent0[0]: (60224) {G3,W15,D6,L1,V0,M1} { meet( composition( skol1,
% 9.24/9.66 converse( skol1 ) ), one ) ==> join( skol1, meet( composition( skol1,
% 9.24/9.66 converse( skol1 ) ), one ) ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 subsumption: (1681) {G23,W15,D6,L1,V0,M1} P(720,143);d(5);d(836) { join(
% 9.24/9.66 skol1, meet( composition( skol1, converse( skol1 ) ), one ) ) ==> meet(
% 9.24/9.66 composition( skol1, converse( skol1 ) ), one ) }.
% 9.24/9.66 parent0: (60226) {G3,W15,D6,L1,V0,M1} { join( skol1, meet( composition(
% 9.24/9.66 skol1, converse( skol1 ) ), one ) ) ==> meet( composition( skol1,
% 9.24/9.66 converse( skol1 ) ), one ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 permutation0:
% 9.24/9.66 0 ==> 0
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 eqswap: (60229) {G1,W25,D8,L1,V2,M1} { meet( composition( X, meet( one,
% 9.24/9.66 composition( converse( X ), Y ) ) ), Y ) ==> join( meet( X, Y ), meet(
% 9.24/9.66 composition( X, meet( one, composition( converse( X ), Y ) ) ), Y ) ) }.
% 9.24/9.66 parent0[0]: (143) {G1,W25,D8,L1,V2,M1} P(5,14) { join( meet( X, Y ), meet(
% 9.24/9.66 composition( X, meet( one, composition( converse( X ), Y ) ) ), Y ) ) ==>
% 9.24/9.66 meet( composition( X, meet( one, composition( converse( X ), Y ) ) ), Y
% 9.24/9.66 ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 X := X
% 9.24/9.66 Y := Y
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60232) {G2,W23,D8,L1,V0,M1} { meet( composition( skol2, meet(
% 9.24/9.66 one, composition( converse( skol2 ), one ) ) ), one ) ==> join( skol2,
% 9.24/9.66 meet( composition( skol2, meet( one, composition( converse( skol2 ), one
% 9.24/9.66 ) ) ), one ) ) }.
% 9.24/9.66 parent0[0]: (718) {G15,W5,D3,L1,V0,M1} P(712,302) { meet( skol2, one ) ==>
% 9.24/9.66 skol2 }.
% 9.24/9.66 parent1[0; 12]: (60229) {G1,W25,D8,L1,V2,M1} { meet( composition( X, meet
% 9.24/9.66 ( one, composition( converse( X ), Y ) ) ), Y ) ==> join( meet( X, Y ),
% 9.24/9.66 meet( composition( X, meet( one, composition( converse( X ), Y ) ) ), Y )
% 9.24/9.66 ) }.
% 9.24/9.66 substitution0:
% 9.24/9.66 end
% 9.24/9.66 substitution1:
% 9.24/9.66 X := skol2
% 9.24/9.66 Y := one
% 9.24/9.66 end
% 9.24/9.66
% 9.24/9.66 paramod: (60234) {G1,W21,D7,L1,V0,M1} { meet( composition( skol2, meet(
% 9.24/9.66 one, composition( converse( skol2 ), one ) ) ), one ) ==> join( skol2,
% 9.24/9.66 meet( composition( skol2, meet( one, converse( skol2 ) ) ), one ) ) }.
% 9.24/9.66 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 9.24/9.67 parent1[0; 18]: (60232) {G2,W23,D8,L1,V0,M1} { meet( composition( skol2,
% 9.24/9.67 meet( one, composition( converse( skol2 ), one ) ) ), one ) ==> join(
% 9.24/9.67 skol2, meet( composition( skol2, meet( one, composition( converse( skol2
% 9.24/9.67 ), one ) ) ), one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := converse( skol2 )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60235) {G1,W19,D7,L1,V0,M1} { meet( composition( skol2, meet(
% 9.24/9.67 one, converse( skol2 ) ) ), one ) ==> join( skol2, meet( composition(
% 9.24/9.67 skol2, meet( one, converse( skol2 ) ) ), one ) ) }.
% 9.24/9.67 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 9.24/9.67 parent1[0; 6]: (60234) {G1,W21,D7,L1,V0,M1} { meet( composition( skol2,
% 9.24/9.67 meet( one, composition( converse( skol2 ), one ) ) ), one ) ==> join(
% 9.24/9.67 skol2, meet( composition( skol2, meet( one, converse( skol2 ) ) ), one )
% 9.24/9.67 ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := converse( skol2 )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60239) {G2,W17,D6,L1,V0,M1} { meet( composition( skol2, meet(
% 9.24/9.67 one, converse( skol2 ) ) ), one ) ==> join( skol2, meet( composition(
% 9.24/9.67 skol2, converse( skol2 ) ), one ) ) }.
% 9.24/9.67 parent0[0]: (850) {G22,W7,D4,L1,V0,M1} P(847,52) { meet( one, converse(
% 9.24/9.67 skol2 ) ) ==> converse( skol2 ) }.
% 9.24/9.67 parent1[0; 14]: (60235) {G1,W19,D7,L1,V0,M1} { meet( composition( skol2,
% 9.24/9.67 meet( one, converse( skol2 ) ) ), one ) ==> join( skol2, meet(
% 9.24/9.67 composition( skol2, meet( one, converse( skol2 ) ) ), one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60240) {G3,W15,D6,L1,V0,M1} { meet( composition( skol2, converse
% 9.24/9.67 ( skol2 ) ), one ) ==> join( skol2, meet( composition( skol2, converse(
% 9.24/9.67 skol2 ) ), one ) ) }.
% 9.24/9.67 parent0[0]: (850) {G22,W7,D4,L1,V0,M1} P(847,52) { meet( one, converse(
% 9.24/9.67 skol2 ) ) ==> converse( skol2 ) }.
% 9.24/9.67 parent1[0; 4]: (60239) {G2,W17,D6,L1,V0,M1} { meet( composition( skol2,
% 9.24/9.67 meet( one, converse( skol2 ) ) ), one ) ==> join( skol2, meet(
% 9.24/9.67 composition( skol2, converse( skol2 ) ), one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60242) {G3,W15,D6,L1,V0,M1} { join( skol2, meet( composition(
% 9.24/9.67 skol2, converse( skol2 ) ), one ) ) ==> meet( composition( skol2,
% 9.24/9.67 converse( skol2 ) ), one ) }.
% 9.24/9.67 parent0[0]: (60240) {G3,W15,D6,L1,V0,M1} { meet( composition( skol2,
% 9.24/9.67 converse( skol2 ) ), one ) ==> join( skol2, meet( composition( skol2,
% 9.24/9.67 converse( skol2 ) ), one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (1682) {G23,W15,D6,L1,V0,M1} P(718,143);d(5);d(850) { join(
% 9.24/9.67 skol2, meet( composition( skol2, converse( skol2 ) ), one ) ) ==> meet(
% 9.24/9.67 composition( skol2, converse( skol2 ) ), one ) }.
% 9.24/9.67 parent0: (60242) {G3,W15,D6,L1,V0,M1} { join( skol2, meet( composition(
% 9.24/9.67 skol2, converse( skol2 ) ), one ) ) ==> meet( composition( skol2,
% 9.24/9.67 converse( skol2 ) ), one ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60245) {G1,W23,D7,L1,V2,M1} { meet( composition( X, meet( Y,
% 9.24/9.67 converse( X ) ) ), one ) ==> join( meet( composition( X, Y ), one ), meet
% 9.24/9.67 ( composition( X, meet( Y, converse( X ) ) ), one ) ) }.
% 9.24/9.67 parent0[0]: (144) {G1,W23,D7,L1,V2,M1} P(5,14) { join( meet( composition( X
% 9.24/9.67 , Y ), one ), meet( composition( X, meet( Y, converse( X ) ) ), one ) )
% 9.24/9.67 ==> meet( composition( X, meet( Y, converse( X ) ) ), one ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60250) {G2,W22,D6,L1,V0,M1} { meet( composition( skol1, meet(
% 9.24/9.67 complement( one ), converse( skol1 ) ) ), one ) ==> join( meet(
% 9.24/9.67 composition( skol1, complement( one ) ), one ), meet( composition( skol1
% 9.24/9.67 , zero ), one ) ) }.
% 9.24/9.67 parent0[0]: (1336) {G22,W7,D4,L1,V0,M1} P(833,1328) { meet( complement( one
% 9.24/9.67 ), converse( skol1 ) ) ==> zero }.
% 9.24/9.67 parent1[0; 20]: (60245) {G1,W23,D7,L1,V2,M1} { meet( composition( X, meet
% 9.24/9.67 ( Y, converse( X ) ) ), one ) ==> join( meet( composition( X, Y ), one )
% 9.24/9.67 , meet( composition( X, meet( Y, converse( X ) ) ), one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := skol1
% 9.24/9.67 Y := complement( one )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60251) {G3,W18,D6,L1,V0,M1} { meet( composition( skol1, zero ),
% 9.24/9.67 one ) ==> join( meet( composition( skol1, complement( one ) ), one ),
% 9.24/9.67 meet( composition( skol1, zero ), one ) ) }.
% 9.24/9.67 parent0[0]: (1336) {G22,W7,D4,L1,V0,M1} P(833,1328) { meet( complement( one
% 9.24/9.67 ), converse( skol1 ) ) ==> zero }.
% 9.24/9.67 parent1[0; 4]: (60250) {G2,W22,D6,L1,V0,M1} { meet( composition( skol1,
% 9.24/9.67 meet( complement( one ), converse( skol1 ) ) ), one ) ==> join( meet(
% 9.24/9.67 composition( skol1, complement( one ) ), one ), meet( composition( skol1
% 9.24/9.67 , zero ), one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60257) {G4,W16,D6,L1,V0,M1} { meet( composition( skol1, zero ),
% 9.24/9.67 one ) ==> join( meet( composition( skol1, complement( one ) ), one ),
% 9.24/9.67 meet( zero, one ) ) }.
% 9.24/9.67 parent0[0]: (966) {G21,W5,D3,L1,V1,M1} P(957,4);d(965) { composition( X,
% 9.24/9.67 zero ) ==> zero }.
% 9.24/9.67 parent1[0; 14]: (60251) {G3,W18,D6,L1,V0,M1} { meet( composition( skol1,
% 9.24/9.67 zero ), one ) ==> join( meet( composition( skol1, complement( one ) ),
% 9.24/9.67 one ), meet( composition( skol1, zero ), one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := skol1
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60258) {G5,W14,D6,L1,V0,M1} { meet( zero, one ) ==> join( meet(
% 9.24/9.67 composition( skol1, complement( one ) ), one ), meet( zero, one ) ) }.
% 9.24/9.67 parent0[0]: (966) {G21,W5,D3,L1,V1,M1} P(957,4);d(965) { composition( X,
% 9.24/9.67 zero ) ==> zero }.
% 9.24/9.67 parent1[0; 2]: (60257) {G4,W16,D6,L1,V0,M1} { meet( composition( skol1,
% 9.24/9.67 zero ), one ) ==> join( meet( composition( skol1, complement( one ) ),
% 9.24/9.67 one ), meet( zero, one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := skol1
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60263) {G6,W12,D6,L1,V0,M1} { meet( zero, one ) ==> join( meet(
% 9.24/9.67 composition( skol1, complement( one ) ), one ), zero ) }.
% 9.24/9.67 parent0[0]: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero,
% 9.24/9.67 X ) ==> zero }.
% 9.24/9.67 parent1[0; 11]: (60258) {G5,W14,D6,L1,V0,M1} { meet( zero, one ) ==> join
% 9.24/9.67 ( meet( composition( skol1, complement( one ) ), one ), meet( zero, one )
% 9.24/9.67 ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := one
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60264) {G7,W10,D6,L1,V0,M1} { zero ==> join( meet( composition(
% 9.24/9.67 skol1, complement( one ) ), one ), zero ) }.
% 9.24/9.67 parent0[0]: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero,
% 9.24/9.67 X ) ==> zero }.
% 9.24/9.67 parent1[0; 1]: (60263) {G6,W12,D6,L1,V0,M1} { meet( zero, one ) ==> join(
% 9.24/9.67 meet( composition( skol1, complement( one ) ), one ), zero ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := one
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60267) {G8,W8,D5,L1,V0,M1} { zero ==> meet( composition( skol1,
% 9.24/9.67 complement( one ) ), one ) }.
% 9.24/9.67 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.67 }.
% 9.24/9.67 parent1[0; 2]: (60264) {G7,W10,D6,L1,V0,M1} { zero ==> join( meet(
% 9.24/9.67 composition( skol1, complement( one ) ), one ), zero ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( composition( skol1, complement( one ) ), one )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60268) {G8,W8,D5,L1,V0,M1} { meet( composition( skol1, complement
% 9.24/9.67 ( one ) ), one ) ==> zero }.
% 9.24/9.67 parent0[0]: (60267) {G8,W8,D5,L1,V0,M1} { zero ==> meet( composition(
% 9.24/9.67 skol1, complement( one ) ), one ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (1738) {G23,W8,D5,L1,V0,M1} P(1336,144);d(966);d(339);d(712)
% 9.24/9.67 { meet( composition( skol1, complement( one ) ), one ) ==> zero }.
% 9.24/9.67 parent0: (60268) {G8,W8,D5,L1,V0,M1} { meet( composition( skol1,
% 9.24/9.67 complement( one ) ), one ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60270) {G1,W23,D7,L1,V2,M1} { meet( composition( X, meet( Y,
% 9.24/9.67 converse( X ) ) ), one ) ==> join( meet( composition( X, Y ), one ), meet
% 9.24/9.67 ( composition( X, meet( Y, converse( X ) ) ), one ) ) }.
% 9.24/9.67 parent0[0]: (144) {G1,W23,D7,L1,V2,M1} P(5,14) { join( meet( composition( X
% 9.24/9.67 , Y ), one ), meet( composition( X, meet( Y, converse( X ) ) ), one ) )
% 9.24/9.67 ==> meet( composition( X, meet( Y, converse( X ) ) ), one ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60275) {G2,W22,D6,L1,V0,M1} { meet( composition( skol2, meet(
% 9.24/9.67 complement( one ), converse( skol2 ) ) ), one ) ==> join( meet(
% 9.24/9.67 composition( skol2, complement( one ) ), one ), meet( composition( skol2
% 9.24/9.67 , zero ), one ) ) }.
% 9.24/9.67 parent0[0]: (1335) {G22,W7,D4,L1,V0,M1} P(847,1328) { meet( complement( one
% 9.24/9.67 ), converse( skol2 ) ) ==> zero }.
% 9.24/9.67 parent1[0; 20]: (60270) {G1,W23,D7,L1,V2,M1} { meet( composition( X, meet
% 9.24/9.67 ( Y, converse( X ) ) ), one ) ==> join( meet( composition( X, Y ), one )
% 9.24/9.67 , meet( composition( X, meet( Y, converse( X ) ) ), one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := skol2
% 9.24/9.67 Y := complement( one )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60276) {G3,W18,D6,L1,V0,M1} { meet( composition( skol2, zero ),
% 9.24/9.67 one ) ==> join( meet( composition( skol2, complement( one ) ), one ),
% 9.24/9.67 meet( composition( skol2, zero ), one ) ) }.
% 9.24/9.67 parent0[0]: (1335) {G22,W7,D4,L1,V0,M1} P(847,1328) { meet( complement( one
% 9.24/9.67 ), converse( skol2 ) ) ==> zero }.
% 9.24/9.67 parent1[0; 4]: (60275) {G2,W22,D6,L1,V0,M1} { meet( composition( skol2,
% 9.24/9.67 meet( complement( one ), converse( skol2 ) ) ), one ) ==> join( meet(
% 9.24/9.67 composition( skol2, complement( one ) ), one ), meet( composition( skol2
% 9.24/9.67 , zero ), one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60282) {G4,W16,D6,L1,V0,M1} { meet( composition( skol2, zero ),
% 9.24/9.67 one ) ==> join( meet( composition( skol2, complement( one ) ), one ),
% 9.24/9.67 meet( zero, one ) ) }.
% 9.24/9.67 parent0[0]: (966) {G21,W5,D3,L1,V1,M1} P(957,4);d(965) { composition( X,
% 9.24/9.67 zero ) ==> zero }.
% 9.24/9.67 parent1[0; 14]: (60276) {G3,W18,D6,L1,V0,M1} { meet( composition( skol2,
% 9.24/9.67 zero ), one ) ==> join( meet( composition( skol2, complement( one ) ),
% 9.24/9.67 one ), meet( composition( skol2, zero ), one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := skol2
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60283) {G5,W14,D6,L1,V0,M1} { meet( zero, one ) ==> join( meet(
% 9.24/9.67 composition( skol2, complement( one ) ), one ), meet( zero, one ) ) }.
% 9.24/9.67 parent0[0]: (966) {G21,W5,D3,L1,V1,M1} P(957,4);d(965) { composition( X,
% 9.24/9.67 zero ) ==> zero }.
% 9.24/9.67 parent1[0; 2]: (60282) {G4,W16,D6,L1,V0,M1} { meet( composition( skol2,
% 9.24/9.67 zero ), one ) ==> join( meet( composition( skol2, complement( one ) ),
% 9.24/9.67 one ), meet( zero, one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := skol2
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60288) {G6,W12,D6,L1,V0,M1} { meet( zero, one ) ==> join( meet(
% 9.24/9.67 composition( skol2, complement( one ) ), one ), zero ) }.
% 9.24/9.67 parent0[0]: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero,
% 9.24/9.67 X ) ==> zero }.
% 9.24/9.67 parent1[0; 11]: (60283) {G5,W14,D6,L1,V0,M1} { meet( zero, one ) ==> join
% 9.24/9.67 ( meet( composition( skol2, complement( one ) ), one ), meet( zero, one )
% 9.24/9.67 ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := one
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60289) {G7,W10,D6,L1,V0,M1} { zero ==> join( meet( composition(
% 9.24/9.67 skol2, complement( one ) ), one ), zero ) }.
% 9.24/9.67 parent0[0]: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero,
% 9.24/9.67 X ) ==> zero }.
% 9.24/9.67 parent1[0; 1]: (60288) {G6,W12,D6,L1,V0,M1} { meet( zero, one ) ==> join(
% 9.24/9.67 meet( composition( skol2, complement( one ) ), one ), zero ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := one
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60292) {G8,W8,D5,L1,V0,M1} { zero ==> meet( composition( skol2,
% 9.24/9.67 complement( one ) ), one ) }.
% 9.24/9.67 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.67 }.
% 9.24/9.67 parent1[0; 2]: (60289) {G7,W10,D6,L1,V0,M1} { zero ==> join( meet(
% 9.24/9.67 composition( skol2, complement( one ) ), one ), zero ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( composition( skol2, complement( one ) ), one )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60293) {G8,W8,D5,L1,V0,M1} { meet( composition( skol2, complement
% 9.24/9.67 ( one ) ), one ) ==> zero }.
% 9.24/9.67 parent0[0]: (60292) {G8,W8,D5,L1,V0,M1} { zero ==> meet( composition(
% 9.24/9.67 skol2, complement( one ) ), one ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (1739) {G23,W8,D5,L1,V0,M1} P(1335,144);d(966);d(339);d(712)
% 9.24/9.67 { meet( composition( skol2, complement( one ) ), one ) ==> zero }.
% 9.24/9.67 parent0: (60293) {G8,W8,D5,L1,V0,M1} { meet( composition( skol2,
% 9.24/9.67 complement( one ) ), one ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60295) {G1,W23,D7,L1,V2,M1} { meet( composition( X, meet( Y,
% 9.24/9.67 converse( X ) ) ), one ) ==> join( meet( composition( X, Y ), one ), meet
% 9.24/9.67 ( composition( X, meet( Y, converse( X ) ) ), one ) ) }.
% 9.24/9.67 parent0[0]: (144) {G1,W23,D7,L1,V2,M1} P(5,14) { join( meet( composition( X
% 9.24/9.67 , Y ), one ), meet( composition( X, meet( Y, converse( X ) ) ), one ) )
% 9.24/9.67 ==> meet( composition( X, meet( Y, converse( X ) ) ), one ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60300) {G2,W24,D7,L1,V1,M1} { meet( composition( X, meet(
% 9.24/9.67 complement( converse( X ) ), converse( X ) ) ), one ) ==> join( meet(
% 9.24/9.67 composition( X, complement( converse( X ) ) ), one ), meet( composition(
% 9.24/9.67 X, zero ), one ) ) }.
% 9.24/9.67 parent0[0]: (61) {G3,W6,D4,L1,V1,M1} S(49);d(51) { meet( complement( X ), X
% 9.24/9.67 ) ==> zero }.
% 9.24/9.67 parent1[0; 22]: (60295) {G1,W23,D7,L1,V2,M1} { meet( composition( X, meet
% 9.24/9.67 ( Y, converse( X ) ) ), one ) ==> join( meet( composition( X, Y ), one )
% 9.24/9.67 , meet( composition( X, meet( Y, converse( X ) ) ), one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := converse( X )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := complement( converse( X ) )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60301) {G3,W19,D7,L1,V1,M1} { meet( composition( X, zero ), one
% 9.24/9.67 ) ==> join( meet( composition( X, complement( converse( X ) ) ), one ),
% 9.24/9.67 meet( composition( X, zero ), one ) ) }.
% 9.24/9.67 parent0[0]: (61) {G3,W6,D4,L1,V1,M1} S(49);d(51) { meet( complement( X ), X
% 9.24/9.67 ) ==> zero }.
% 9.24/9.67 parent1[0; 4]: (60300) {G2,W24,D7,L1,V1,M1} { meet( composition( X, meet(
% 9.24/9.67 complement( converse( X ) ), converse( X ) ) ), one ) ==> join( meet(
% 9.24/9.67 composition( X, complement( converse( X ) ) ), one ), meet( composition(
% 9.24/9.67 X, zero ), one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := converse( X )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60307) {G4,W17,D7,L1,V1,M1} { meet( composition( X, zero ), one
% 9.24/9.67 ) ==> join( meet( composition( X, complement( converse( X ) ) ), one ),
% 9.24/9.67 meet( zero, one ) ) }.
% 9.24/9.67 parent0[0]: (966) {G21,W5,D3,L1,V1,M1} P(957,4);d(965) { composition( X,
% 9.24/9.67 zero ) ==> zero }.
% 9.24/9.67 parent1[0; 15]: (60301) {G3,W19,D7,L1,V1,M1} { meet( composition( X, zero
% 9.24/9.67 ), one ) ==> join( meet( composition( X, complement( converse( X ) ) ),
% 9.24/9.67 one ), meet( composition( X, zero ), one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60308) {G5,W15,D7,L1,V1,M1} { meet( zero, one ) ==> join( meet(
% 9.24/9.67 composition( X, complement( converse( X ) ) ), one ), meet( zero, one ) )
% 9.24/9.67 }.
% 9.24/9.67 parent0[0]: (966) {G21,W5,D3,L1,V1,M1} P(957,4);d(965) { composition( X,
% 9.24/9.67 zero ) ==> zero }.
% 9.24/9.67 parent1[0; 2]: (60307) {G4,W17,D7,L1,V1,M1} { meet( composition( X, zero )
% 9.24/9.67 , one ) ==> join( meet( composition( X, complement( converse( X ) ) ),
% 9.24/9.67 one ), meet( zero, one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60313) {G6,W13,D7,L1,V1,M1} { meet( zero, one ) ==> join( meet(
% 9.24/9.67 composition( X, complement( converse( X ) ) ), one ), zero ) }.
% 9.24/9.67 parent0[0]: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero,
% 9.24/9.67 X ) ==> zero }.
% 9.24/9.67 parent1[0; 12]: (60308) {G5,W15,D7,L1,V1,M1} { meet( zero, one ) ==> join
% 9.24/9.67 ( meet( composition( X, complement( converse( X ) ) ), one ), meet( zero
% 9.24/9.67 , one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := one
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60314) {G7,W11,D7,L1,V1,M1} { zero ==> join( meet( composition(
% 9.24/9.67 X, complement( converse( X ) ) ), one ), zero ) }.
% 9.24/9.67 parent0[0]: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero,
% 9.24/9.67 X ) ==> zero }.
% 9.24/9.67 parent1[0; 1]: (60313) {G6,W13,D7,L1,V1,M1} { meet( zero, one ) ==> join(
% 9.24/9.67 meet( composition( X, complement( converse( X ) ) ), one ), zero ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := one
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60317) {G8,W9,D6,L1,V1,M1} { zero ==> meet( composition( X,
% 9.24/9.67 complement( converse( X ) ) ), one ) }.
% 9.24/9.67 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.67 }.
% 9.24/9.67 parent1[0; 2]: (60314) {G7,W11,D7,L1,V1,M1} { zero ==> join( meet(
% 9.24/9.67 composition( X, complement( converse( X ) ) ), one ), zero ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( composition( X, complement( converse( X ) ) ), one )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60318) {G8,W9,D6,L1,V1,M1} { meet( composition( X, complement(
% 9.24/9.67 converse( X ) ) ), one ) ==> zero }.
% 9.24/9.67 parent0[0]: (60317) {G8,W9,D6,L1,V1,M1} { zero ==> meet( composition( X,
% 9.24/9.67 complement( converse( X ) ) ), one ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (1740) {G22,W9,D6,L1,V1,M1} P(61,144);d(966);d(339);d(712) {
% 9.24/9.67 meet( composition( X, complement( converse( X ) ) ), one ) ==> zero }.
% 9.24/9.67 parent0: (60318) {G8,W9,D6,L1,V1,M1} { meet( composition( X, complement(
% 9.24/9.67 converse( X ) ) ), one ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60320) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 9.24/9.67 complement( meet( Y, X ) ) ) }.
% 9.24/9.67 parent0[0]: (1322) {G18,W10,D5,L1,V2,M1} P(1195,12) { meet( meet( X, Y ),
% 9.24/9.67 complement( meet( Y, X ) ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60324) {G19,W11,D6,L1,V0,M1} { zero ==> meet( meet( one,
% 9.24/9.67 composition( skol1, complement( one ) ) ), complement( zero ) ) }.
% 9.24/9.67 parent0[0]: (1738) {G23,W8,D5,L1,V0,M1} P(1336,144);d(966);d(339);d(712) {
% 9.24/9.67 meet( composition( skol1, complement( one ) ), one ) ==> zero }.
% 9.24/9.67 parent1[0; 10]: (60320) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y
% 9.24/9.67 ), complement( meet( Y, X ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := one
% 9.24/9.67 Y := composition( skol1, complement( one ) )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60325) {G14,W10,D6,L1,V0,M1} { zero ==> meet( meet( one,
% 9.24/9.67 composition( skol1, complement( one ) ) ), top ) }.
% 9.24/9.67 parent0[0]: (336) {G13,W4,D3,L1,V0,M1} P(329,10) { complement( zero ) ==>
% 9.24/9.67 top }.
% 9.24/9.67 parent1[0; 9]: (60324) {G19,W11,D6,L1,V0,M1} { zero ==> meet( meet( one,
% 9.24/9.67 composition( skol1, complement( one ) ) ), complement( zero ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60326) {G15,W8,D5,L1,V0,M1} { zero ==> meet( one, composition(
% 9.24/9.67 skol1, complement( one ) ) ) }.
% 9.24/9.67 parent0[0]: (748) {G17,W5,D3,L1,V1,M1} S(716);d(723) { meet( X, top ) ==> X
% 9.24/9.67 }.
% 9.24/9.67 parent1[0; 2]: (60325) {G14,W10,D6,L1,V0,M1} { zero ==> meet( meet( one,
% 9.24/9.67 composition( skol1, complement( one ) ) ), top ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( one, composition( skol1, complement( one ) ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60327) {G15,W8,D5,L1,V0,M1} { meet( one, composition( skol1,
% 9.24/9.67 complement( one ) ) ) ==> zero }.
% 9.24/9.67 parent0[0]: (60326) {G15,W8,D5,L1,V0,M1} { zero ==> meet( one, composition
% 9.24/9.67 ( skol1, complement( one ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (1752) {G24,W8,D5,L1,V0,M1} P(1738,1322);d(336);d(748) { meet
% 9.24/9.67 ( one, composition( skol1, complement( one ) ) ) ==> zero }.
% 9.24/9.67 parent0: (60327) {G15,W8,D5,L1,V0,M1} { meet( one, composition( skol1,
% 9.24/9.67 complement( one ) ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60329) {G1,W34,D7,L1,V3,M1} { composition( meet( X, composition(
% 9.24/9.67 Z, Y ) ), meet( converse( Y ), composition( converse( X ), Z ) ) ) ==>
% 9.24/9.67 join( meet( composition( X, converse( Y ) ), Z ), composition( meet( X,
% 9.24/9.67 composition( Z, Y ) ), meet( converse( Y ), composition( converse( X ), Z
% 9.24/9.67 ) ) ) ) }.
% 9.24/9.67 parent0[0]: (123) {G1,W34,D7,L1,V3,M1} P(7,13) { join( meet( composition( Y
% 9.24/9.67 , converse( X ) ), Z ), composition( meet( Y, composition( Z, X ) ), meet
% 9.24/9.67 ( converse( X ), composition( converse( Y ), Z ) ) ) ) ==> composition(
% 9.24/9.67 meet( Y, composition( Z, X ) ), meet( converse( X ), composition(
% 9.24/9.67 converse( Y ), Z ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60334) {G2,W34,D7,L1,V0,M1} { composition( meet( one,
% 9.24/9.67 composition( skol1, complement( one ) ) ), meet( converse( complement(
% 9.24/9.67 one ) ), composition( converse( one ), skol1 ) ) ) ==> join( meet(
% 9.24/9.67 composition( one, converse( complement( one ) ) ), skol1 ), composition(
% 9.24/9.67 zero, meet( converse( complement( one ) ), composition( converse( one ),
% 9.24/9.67 skol1 ) ) ) ) }.
% 9.24/9.67 parent0[0]: (1752) {G24,W8,D5,L1,V0,M1} P(1738,1322);d(336);d(748) { meet(
% 9.24/9.67 one, composition( skol1, complement( one ) ) ) ==> zero }.
% 9.24/9.67 parent1[0; 25]: (60329) {G1,W34,D7,L1,V3,M1} { composition( meet( X,
% 9.24/9.67 composition( Z, Y ) ), meet( converse( Y ), composition( converse( X ), Z
% 9.24/9.67 ) ) ) ==> join( meet( composition( X, converse( Y ) ), Z ), composition
% 9.24/9.67 ( meet( X, composition( Z, Y ) ), meet( converse( Y ), composition(
% 9.24/9.67 converse( X ), Z ) ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := one
% 9.24/9.67 Y := complement( one )
% 9.24/9.67 Z := skol1
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60335) {G3,W29,D7,L1,V0,M1} { composition( zero, meet( converse
% 9.24/9.67 ( complement( one ) ), composition( converse( one ), skol1 ) ) ) ==> join
% 9.24/9.67 ( meet( composition( one, converse( complement( one ) ) ), skol1 ),
% 9.24/9.67 composition( zero, meet( converse( complement( one ) ), composition(
% 9.24/9.67 converse( one ), skol1 ) ) ) ) }.
% 9.24/9.67 parent0[0]: (1752) {G24,W8,D5,L1,V0,M1} P(1738,1322);d(336);d(748) { meet(
% 9.24/9.67 one, composition( skol1, complement( one ) ) ) ==> zero }.
% 9.24/9.67 parent1[0; 2]: (60334) {G2,W34,D7,L1,V0,M1} { composition( meet( one,
% 9.24/9.67 composition( skol1, complement( one ) ) ), meet( converse( complement(
% 9.24/9.67 one ) ), composition( converse( one ), skol1 ) ) ) ==> join( meet(
% 9.24/9.67 composition( one, converse( complement( one ) ) ), skol1 ), composition(
% 9.24/9.67 zero, meet( converse( complement( one ) ), composition( converse( one ),
% 9.24/9.67 skol1 ) ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60340) {G4,W27,D7,L1,V0,M1} { composition( zero, meet( converse
% 9.24/9.67 ( complement( one ) ), composition( converse( one ), skol1 ) ) ) ==> join
% 9.24/9.67 ( meet( converse( complement( one ) ), skol1 ), composition( zero, meet(
% 9.24/9.67 converse( complement( one ) ), composition( converse( one ), skol1 ) ) )
% 9.24/9.67 ) }.
% 9.24/9.67 parent0[0]: (805) {G4,W5,D3,L1,V1,M1} P(804,798) { composition( one, X )
% 9.24/9.67 ==> X }.
% 9.24/9.67 parent1[0; 13]: (60335) {G3,W29,D7,L1,V0,M1} { composition( zero, meet(
% 9.24/9.67 converse( complement( one ) ), composition( converse( one ), skol1 ) ) )
% 9.24/9.67 ==> join( meet( composition( one, converse( complement( one ) ) ), skol1
% 9.24/9.67 ), composition( zero, meet( converse( complement( one ) ), composition(
% 9.24/9.67 converse( one ), skol1 ) ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := converse( complement( one ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60342) {G5,W18,D6,L1,V0,M1} { composition( zero, meet( converse
% 9.24/9.67 ( complement( one ) ), composition( converse( one ), skol1 ) ) ) ==> join
% 9.24/9.67 ( meet( converse( complement( one ) ), skol1 ), zero ) }.
% 9.24/9.67 parent0[0]: (968) {G22,W5,D3,L1,V1,M1} P(966,89);d(742) { composition( zero
% 9.24/9.67 , X ) ==> zero }.
% 9.24/9.67 parent1[0; 17]: (60340) {G4,W27,D7,L1,V0,M1} { composition( zero, meet(
% 9.24/9.67 converse( complement( one ) ), composition( converse( one ), skol1 ) ) )
% 9.24/9.67 ==> join( meet( converse( complement( one ) ), skol1 ), composition( zero
% 9.24/9.67 , meet( converse( complement( one ) ), composition( converse( one ),
% 9.24/9.67 skol1 ) ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( converse( complement( one ) ), composition( converse( one ),
% 9.24/9.67 skol1 ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60343) {G6,W9,D6,L1,V0,M1} { zero ==> join( meet( converse(
% 9.24/9.67 complement( one ) ), skol1 ), zero ) }.
% 9.24/9.67 parent0[0]: (968) {G22,W5,D3,L1,V1,M1} P(966,89);d(742) { composition( zero
% 9.24/9.67 , X ) ==> zero }.
% 9.24/9.67 parent1[0; 1]: (60342) {G5,W18,D6,L1,V0,M1} { composition( zero, meet(
% 9.24/9.67 converse( complement( one ) ), composition( converse( one ), skol1 ) ) )
% 9.24/9.67 ==> join( meet( converse( complement( one ) ), skol1 ), zero ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( converse( complement( one ) ), composition( converse( one ),
% 9.24/9.67 skol1 ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60346) {G7,W7,D5,L1,V0,M1} { zero ==> meet( converse( complement
% 9.24/9.67 ( one ) ), skol1 ) }.
% 9.24/9.67 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.67 }.
% 9.24/9.67 parent1[0; 2]: (60343) {G6,W9,D6,L1,V0,M1} { zero ==> join( meet( converse
% 9.24/9.67 ( complement( one ) ), skol1 ), zero ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( converse( complement( one ) ), skol1 )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60347) {G7,W7,D5,L1,V0,M1} { meet( converse( complement( one ) )
% 9.24/9.67 , skol1 ) ==> zero }.
% 9.24/9.67 parent0[0]: (60346) {G7,W7,D5,L1,V0,M1} { zero ==> meet( converse(
% 9.24/9.67 complement( one ) ), skol1 ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (1753) {G25,W7,D5,L1,V0,M1} P(1752,123);d(805);d(968);d(712)
% 9.24/9.67 { meet( converse( complement( one ) ), skol1 ) ==> zero }.
% 9.24/9.67 parent0: (60347) {G7,W7,D5,L1,V0,M1} { meet( converse( complement( one ) )
% 9.24/9.67 , skol1 ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60349) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 9.24/9.67 complement( meet( Y, X ) ) ) }.
% 9.24/9.67 parent0[0]: (1322) {G18,W10,D5,L1,V2,M1} P(1195,12) { meet( meet( X, Y ),
% 9.24/9.67 complement( meet( Y, X ) ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60353) {G19,W10,D6,L1,V0,M1} { zero ==> meet( meet( skol1,
% 9.24/9.67 converse( complement( one ) ) ), complement( zero ) ) }.
% 9.24/9.67 parent0[0]: (1753) {G25,W7,D5,L1,V0,M1} P(1752,123);d(805);d(968);d(712) {
% 9.24/9.67 meet( converse( complement( one ) ), skol1 ) ==> zero }.
% 9.24/9.67 parent1[0; 9]: (60349) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y )
% 9.24/9.67 , complement( meet( Y, X ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := skol1
% 9.24/9.67 Y := converse( complement( one ) )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60354) {G14,W9,D6,L1,V0,M1} { zero ==> meet( meet( skol1,
% 9.24/9.67 converse( complement( one ) ) ), top ) }.
% 9.24/9.67 parent0[0]: (336) {G13,W4,D3,L1,V0,M1} P(329,10) { complement( zero ) ==>
% 9.24/9.67 top }.
% 9.24/9.67 parent1[0; 8]: (60353) {G19,W10,D6,L1,V0,M1} { zero ==> meet( meet( skol1
% 9.24/9.67 , converse( complement( one ) ) ), complement( zero ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60355) {G15,W7,D5,L1,V0,M1} { zero ==> meet( skol1, converse(
% 9.24/9.67 complement( one ) ) ) }.
% 9.24/9.67 parent0[0]: (748) {G17,W5,D3,L1,V1,M1} S(716);d(723) { meet( X, top ) ==> X
% 9.24/9.67 }.
% 9.24/9.67 parent1[0; 2]: (60354) {G14,W9,D6,L1,V0,M1} { zero ==> meet( meet( skol1,
% 9.24/9.67 converse( complement( one ) ) ), top ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( skol1, converse( complement( one ) ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60356) {G15,W7,D5,L1,V0,M1} { meet( skol1, converse( complement(
% 9.24/9.67 one ) ) ) ==> zero }.
% 9.24/9.67 parent0[0]: (60355) {G15,W7,D5,L1,V0,M1} { zero ==> meet( skol1, converse
% 9.24/9.67 ( complement( one ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (1754) {G26,W7,D5,L1,V0,M1} P(1753,1322);d(336);d(748) { meet
% 9.24/9.67 ( skol1, converse( complement( one ) ) ) ==> zero }.
% 9.24/9.67 parent0: (60356) {G15,W7,D5,L1,V0,M1} { meet( skol1, converse( complement
% 9.24/9.67 ( one ) ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60358) {G1,W23,D7,L1,V2,M1} { meet( composition( X, meet( Y,
% 9.24/9.67 converse( X ) ) ), one ) ==> join( meet( composition( X, Y ), one ), meet
% 9.24/9.67 ( composition( X, meet( Y, converse( X ) ) ), one ) ) }.
% 9.24/9.67 parent0[0]: (144) {G1,W23,D7,L1,V2,M1} P(5,14) { join( meet( composition( X
% 9.24/9.67 , Y ), one ), meet( composition( X, meet( Y, converse( X ) ) ), one ) )
% 9.24/9.67 ==> meet( composition( X, meet( Y, converse( X ) ) ), one ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60363) {G2,W24,D7,L1,V0,M1} { meet( composition( complement( one
% 9.24/9.67 ), meet( skol1, converse( complement( one ) ) ) ), one ) ==> join( meet
% 9.24/9.67 ( composition( complement( one ), skol1 ), one ), meet( composition(
% 9.24/9.67 complement( one ), zero ), one ) ) }.
% 9.24/9.67 parent0[0]: (1754) {G26,W7,D5,L1,V0,M1} P(1753,1322);d(336);d(748) { meet(
% 9.24/9.67 skol1, converse( complement( one ) ) ) ==> zero }.
% 9.24/9.67 parent1[0; 22]: (60358) {G1,W23,D7,L1,V2,M1} { meet( composition( X, meet
% 9.24/9.67 ( Y, converse( X ) ) ), one ) ==> join( meet( composition( X, Y ), one )
% 9.24/9.67 , meet( composition( X, meet( Y, converse( X ) ) ), one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := complement( one )
% 9.24/9.67 Y := skol1
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60364) {G3,W20,D6,L1,V0,M1} { meet( composition( complement( one
% 9.24/9.67 ), zero ), one ) ==> join( meet( composition( complement( one ), skol1 )
% 9.24/9.67 , one ), meet( composition( complement( one ), zero ), one ) ) }.
% 9.24/9.67 parent0[0]: (1754) {G26,W7,D5,L1,V0,M1} P(1753,1322);d(336);d(748) { meet(
% 9.24/9.67 skol1, converse( complement( one ) ) ) ==> zero }.
% 9.24/9.67 parent1[0; 5]: (60363) {G2,W24,D7,L1,V0,M1} { meet( composition(
% 9.24/9.67 complement( one ), meet( skol1, converse( complement( one ) ) ) ), one )
% 9.24/9.67 ==> join( meet( composition( complement( one ), skol1 ), one ), meet(
% 9.24/9.67 composition( complement( one ), zero ), one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60370) {G4,W17,D6,L1,V0,M1} { meet( composition( complement( one
% 9.24/9.67 ), zero ), one ) ==> join( meet( composition( complement( one ), skol1 )
% 9.24/9.67 , one ), meet( zero, one ) ) }.
% 9.24/9.67 parent0[0]: (966) {G21,W5,D3,L1,V1,M1} P(957,4);d(965) { composition( X,
% 9.24/9.67 zero ) ==> zero }.
% 9.24/9.67 parent1[0; 15]: (60364) {G3,W20,D6,L1,V0,M1} { meet( composition(
% 9.24/9.67 complement( one ), zero ), one ) ==> join( meet( composition( complement
% 9.24/9.67 ( one ), skol1 ), one ), meet( composition( complement( one ), zero ),
% 9.24/9.67 one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := complement( one )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60371) {G5,W14,D6,L1,V0,M1} { meet( zero, one ) ==> join( meet(
% 9.24/9.67 composition( complement( one ), skol1 ), one ), meet( zero, one ) ) }.
% 9.24/9.67 parent0[0]: (966) {G21,W5,D3,L1,V1,M1} P(957,4);d(965) { composition( X,
% 9.24/9.67 zero ) ==> zero }.
% 9.24/9.67 parent1[0; 2]: (60370) {G4,W17,D6,L1,V0,M1} { meet( composition(
% 9.24/9.67 complement( one ), zero ), one ) ==> join( meet( composition( complement
% 9.24/9.67 ( one ), skol1 ), one ), meet( zero, one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := complement( one )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60376) {G6,W12,D6,L1,V0,M1} { meet( zero, one ) ==> join( meet(
% 9.24/9.67 composition( complement( one ), skol1 ), one ), zero ) }.
% 9.24/9.67 parent0[0]: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero,
% 9.24/9.67 X ) ==> zero }.
% 9.24/9.67 parent1[0; 11]: (60371) {G5,W14,D6,L1,V0,M1} { meet( zero, one ) ==> join
% 9.24/9.67 ( meet( composition( complement( one ), skol1 ), one ), meet( zero, one )
% 9.24/9.67 ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := one
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60377) {G7,W10,D6,L1,V0,M1} { zero ==> join( meet( composition(
% 9.24/9.67 complement( one ), skol1 ), one ), zero ) }.
% 9.24/9.67 parent0[0]: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero,
% 9.24/9.67 X ) ==> zero }.
% 9.24/9.67 parent1[0; 1]: (60376) {G6,W12,D6,L1,V0,M1} { meet( zero, one ) ==> join(
% 9.24/9.67 meet( composition( complement( one ), skol1 ), one ), zero ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := one
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60380) {G8,W8,D5,L1,V0,M1} { zero ==> meet( composition(
% 9.24/9.67 complement( one ), skol1 ), one ) }.
% 9.24/9.67 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.67 }.
% 9.24/9.67 parent1[0; 2]: (60377) {G7,W10,D6,L1,V0,M1} { zero ==> join( meet(
% 9.24/9.67 composition( complement( one ), skol1 ), one ), zero ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( composition( complement( one ), skol1 ), one )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60381) {G8,W8,D5,L1,V0,M1} { meet( composition( complement( one )
% 9.24/9.67 , skol1 ), one ) ==> zero }.
% 9.24/9.67 parent0[0]: (60380) {G8,W8,D5,L1,V0,M1} { zero ==> meet( composition(
% 9.24/9.67 complement( one ), skol1 ), one ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (1755) {G27,W8,D5,L1,V0,M1} P(1754,144);d(966);d(339);d(712)
% 9.24/9.67 { meet( composition( complement( one ), skol1 ), one ) ==> zero }.
% 9.24/9.67 parent0: (60381) {G8,W8,D5,L1,V0,M1} { meet( composition( complement( one
% 9.24/9.67 ), skol1 ), one ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60383) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 9.24/9.67 complement( meet( Y, X ) ) ) }.
% 9.24/9.67 parent0[0]: (1322) {G18,W10,D5,L1,V2,M1} P(1195,12) { meet( meet( X, Y ),
% 9.24/9.67 complement( meet( Y, X ) ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60387) {G19,W11,D6,L1,V0,M1} { zero ==> meet( meet( one,
% 9.24/9.67 composition( complement( one ), skol1 ) ), complement( zero ) ) }.
% 9.24/9.67 parent0[0]: (1755) {G27,W8,D5,L1,V0,M1} P(1754,144);d(966);d(339);d(712) {
% 9.24/9.67 meet( composition( complement( one ), skol1 ), one ) ==> zero }.
% 9.24/9.67 parent1[0; 10]: (60383) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y
% 9.24/9.67 ), complement( meet( Y, X ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := one
% 9.24/9.67 Y := composition( complement( one ), skol1 )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60388) {G14,W10,D6,L1,V0,M1} { zero ==> meet( meet( one,
% 9.24/9.67 composition( complement( one ), skol1 ) ), top ) }.
% 9.24/9.67 parent0[0]: (336) {G13,W4,D3,L1,V0,M1} P(329,10) { complement( zero ) ==>
% 9.24/9.67 top }.
% 9.24/9.67 parent1[0; 9]: (60387) {G19,W11,D6,L1,V0,M1} { zero ==> meet( meet( one,
% 9.24/9.67 composition( complement( one ), skol1 ) ), complement( zero ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60389) {G15,W8,D5,L1,V0,M1} { zero ==> meet( one, composition(
% 9.24/9.67 complement( one ), skol1 ) ) }.
% 9.24/9.67 parent0[0]: (748) {G17,W5,D3,L1,V1,M1} S(716);d(723) { meet( X, top ) ==> X
% 9.24/9.67 }.
% 9.24/9.67 parent1[0; 2]: (60388) {G14,W10,D6,L1,V0,M1} { zero ==> meet( meet( one,
% 9.24/9.67 composition( complement( one ), skol1 ) ), top ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( one, composition( complement( one ), skol1 ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60390) {G15,W8,D5,L1,V0,M1} { meet( one, composition( complement
% 9.24/9.67 ( one ), skol1 ) ) ==> zero }.
% 9.24/9.67 parent0[0]: (60389) {G15,W8,D5,L1,V0,M1} { zero ==> meet( one, composition
% 9.24/9.67 ( complement( one ), skol1 ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (1756) {G28,W8,D5,L1,V0,M1} P(1755,1322);d(336);d(748) { meet
% 9.24/9.67 ( one, composition( complement( one ), skol1 ) ) ==> zero }.
% 9.24/9.67 parent0: (60390) {G15,W8,D5,L1,V0,M1} { meet( one, composition( complement
% 9.24/9.67 ( one ), skol1 ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60392) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 9.24/9.67 complement( meet( Y, X ) ) ) }.
% 9.24/9.67 parent0[0]: (1322) {G18,W10,D5,L1,V2,M1} P(1195,12) { meet( meet( X, Y ),
% 9.24/9.67 complement( meet( Y, X ) ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60396) {G19,W11,D6,L1,V0,M1} { zero ==> meet( meet( one,
% 9.24/9.67 composition( skol2, complement( one ) ) ), complement( zero ) ) }.
% 9.24/9.67 parent0[0]: (1739) {G23,W8,D5,L1,V0,M1} P(1335,144);d(966);d(339);d(712) {
% 9.24/9.67 meet( composition( skol2, complement( one ) ), one ) ==> zero }.
% 9.24/9.67 parent1[0; 10]: (60392) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y
% 9.24/9.67 ), complement( meet( Y, X ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := one
% 9.24/9.67 Y := composition( skol2, complement( one ) )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60397) {G14,W10,D6,L1,V0,M1} { zero ==> meet( meet( one,
% 9.24/9.67 composition( skol2, complement( one ) ) ), top ) }.
% 9.24/9.67 parent0[0]: (336) {G13,W4,D3,L1,V0,M1} P(329,10) { complement( zero ) ==>
% 9.24/9.67 top }.
% 9.24/9.67 parent1[0; 9]: (60396) {G19,W11,D6,L1,V0,M1} { zero ==> meet( meet( one,
% 9.24/9.67 composition( skol2, complement( one ) ) ), complement( zero ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60398) {G15,W8,D5,L1,V0,M1} { zero ==> meet( one, composition(
% 9.24/9.67 skol2, complement( one ) ) ) }.
% 9.24/9.67 parent0[0]: (748) {G17,W5,D3,L1,V1,M1} S(716);d(723) { meet( X, top ) ==> X
% 9.24/9.67 }.
% 9.24/9.67 parent1[0; 2]: (60397) {G14,W10,D6,L1,V0,M1} { zero ==> meet( meet( one,
% 9.24/9.67 composition( skol2, complement( one ) ) ), top ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( one, composition( skol2, complement( one ) ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60399) {G15,W8,D5,L1,V0,M1} { meet( one, composition( skol2,
% 9.24/9.67 complement( one ) ) ) ==> zero }.
% 9.24/9.67 parent0[0]: (60398) {G15,W8,D5,L1,V0,M1} { zero ==> meet( one, composition
% 9.24/9.67 ( skol2, complement( one ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (1757) {G24,W8,D5,L1,V0,M1} P(1739,1322);d(336);d(748) { meet
% 9.24/9.67 ( one, composition( skol2, complement( one ) ) ) ==> zero }.
% 9.24/9.67 parent0: (60399) {G15,W8,D5,L1,V0,M1} { meet( one, composition( skol2,
% 9.24/9.67 complement( one ) ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60401) {G1,W34,D7,L1,V3,M1} { composition( meet( X, composition(
% 9.24/9.67 Z, Y ) ), meet( converse( Y ), composition( converse( X ), Z ) ) ) ==>
% 9.24/9.67 join( meet( composition( X, converse( Y ) ), Z ), composition( meet( X,
% 9.24/9.67 composition( Z, Y ) ), meet( converse( Y ), composition( converse( X ), Z
% 9.24/9.67 ) ) ) ) }.
% 9.24/9.67 parent0[0]: (123) {G1,W34,D7,L1,V3,M1} P(7,13) { join( meet( composition( Y
% 9.24/9.67 , converse( X ) ), Z ), composition( meet( Y, composition( Z, X ) ), meet
% 9.24/9.67 ( converse( X ), composition( converse( Y ), Z ) ) ) ) ==> composition(
% 9.24/9.67 meet( Y, composition( Z, X ) ), meet( converse( X ), composition(
% 9.24/9.67 converse( Y ), Z ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60406) {G2,W34,D7,L1,V0,M1} { composition( meet( one,
% 9.24/9.67 composition( skol2, complement( one ) ) ), meet( converse( complement(
% 9.24/9.67 one ) ), composition( converse( one ), skol2 ) ) ) ==> join( meet(
% 9.24/9.67 composition( one, converse( complement( one ) ) ), skol2 ), composition(
% 9.24/9.67 zero, meet( converse( complement( one ) ), composition( converse( one ),
% 9.24/9.67 skol2 ) ) ) ) }.
% 9.24/9.67 parent0[0]: (1757) {G24,W8,D5,L1,V0,M1} P(1739,1322);d(336);d(748) { meet(
% 9.24/9.67 one, composition( skol2, complement( one ) ) ) ==> zero }.
% 9.24/9.67 parent1[0; 25]: (60401) {G1,W34,D7,L1,V3,M1} { composition( meet( X,
% 9.24/9.67 composition( Z, Y ) ), meet( converse( Y ), composition( converse( X ), Z
% 9.24/9.67 ) ) ) ==> join( meet( composition( X, converse( Y ) ), Z ), composition
% 9.24/9.67 ( meet( X, composition( Z, Y ) ), meet( converse( Y ), composition(
% 9.24/9.67 converse( X ), Z ) ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := one
% 9.24/9.67 Y := complement( one )
% 9.24/9.67 Z := skol2
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60407) {G3,W29,D7,L1,V0,M1} { composition( zero, meet( converse
% 9.24/9.67 ( complement( one ) ), composition( converse( one ), skol2 ) ) ) ==> join
% 9.24/9.67 ( meet( composition( one, converse( complement( one ) ) ), skol2 ),
% 9.24/9.67 composition( zero, meet( converse( complement( one ) ), composition(
% 9.24/9.67 converse( one ), skol2 ) ) ) ) }.
% 9.24/9.67 parent0[0]: (1757) {G24,W8,D5,L1,V0,M1} P(1739,1322);d(336);d(748) { meet(
% 9.24/9.67 one, composition( skol2, complement( one ) ) ) ==> zero }.
% 9.24/9.67 parent1[0; 2]: (60406) {G2,W34,D7,L1,V0,M1} { composition( meet( one,
% 9.24/9.67 composition( skol2, complement( one ) ) ), meet( converse( complement(
% 9.24/9.67 one ) ), composition( converse( one ), skol2 ) ) ) ==> join( meet(
% 9.24/9.67 composition( one, converse( complement( one ) ) ), skol2 ), composition(
% 9.24/9.67 zero, meet( converse( complement( one ) ), composition( converse( one ),
% 9.24/9.67 skol2 ) ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60412) {G4,W27,D7,L1,V0,M1} { composition( zero, meet( converse
% 9.24/9.67 ( complement( one ) ), composition( converse( one ), skol2 ) ) ) ==> join
% 9.24/9.67 ( meet( converse( complement( one ) ), skol2 ), composition( zero, meet(
% 9.24/9.67 converse( complement( one ) ), composition( converse( one ), skol2 ) ) )
% 9.24/9.67 ) }.
% 9.24/9.67 parent0[0]: (805) {G4,W5,D3,L1,V1,M1} P(804,798) { composition( one, X )
% 9.24/9.67 ==> X }.
% 9.24/9.67 parent1[0; 13]: (60407) {G3,W29,D7,L1,V0,M1} { composition( zero, meet(
% 9.24/9.67 converse( complement( one ) ), composition( converse( one ), skol2 ) ) )
% 9.24/9.67 ==> join( meet( composition( one, converse( complement( one ) ) ), skol2
% 9.24/9.67 ), composition( zero, meet( converse( complement( one ) ), composition(
% 9.24/9.67 converse( one ), skol2 ) ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := converse( complement( one ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60414) {G5,W18,D6,L1,V0,M1} { composition( zero, meet( converse
% 9.24/9.67 ( complement( one ) ), composition( converse( one ), skol2 ) ) ) ==> join
% 9.24/9.67 ( meet( converse( complement( one ) ), skol2 ), zero ) }.
% 9.24/9.67 parent0[0]: (968) {G22,W5,D3,L1,V1,M1} P(966,89);d(742) { composition( zero
% 9.24/9.67 , X ) ==> zero }.
% 9.24/9.67 parent1[0; 17]: (60412) {G4,W27,D7,L1,V0,M1} { composition( zero, meet(
% 9.24/9.67 converse( complement( one ) ), composition( converse( one ), skol2 ) ) )
% 9.24/9.67 ==> join( meet( converse( complement( one ) ), skol2 ), composition( zero
% 9.24/9.67 , meet( converse( complement( one ) ), composition( converse( one ),
% 9.24/9.67 skol2 ) ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( converse( complement( one ) ), composition( converse( one ),
% 9.24/9.67 skol2 ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60415) {G6,W9,D6,L1,V0,M1} { zero ==> join( meet( converse(
% 9.24/9.67 complement( one ) ), skol2 ), zero ) }.
% 9.24/9.67 parent0[0]: (968) {G22,W5,D3,L1,V1,M1} P(966,89);d(742) { composition( zero
% 9.24/9.67 , X ) ==> zero }.
% 9.24/9.67 parent1[0; 1]: (60414) {G5,W18,D6,L1,V0,M1} { composition( zero, meet(
% 9.24/9.67 converse( complement( one ) ), composition( converse( one ), skol2 ) ) )
% 9.24/9.67 ==> join( meet( converse( complement( one ) ), skol2 ), zero ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( converse( complement( one ) ), composition( converse( one ),
% 9.24/9.67 skol2 ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60418) {G7,W7,D5,L1,V0,M1} { zero ==> meet( converse( complement
% 9.24/9.67 ( one ) ), skol2 ) }.
% 9.24/9.67 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.67 }.
% 9.24/9.67 parent1[0; 2]: (60415) {G6,W9,D6,L1,V0,M1} { zero ==> join( meet( converse
% 9.24/9.67 ( complement( one ) ), skol2 ), zero ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( converse( complement( one ) ), skol2 )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60419) {G7,W7,D5,L1,V0,M1} { meet( converse( complement( one ) )
% 9.24/9.67 , skol2 ) ==> zero }.
% 9.24/9.67 parent0[0]: (60418) {G7,W7,D5,L1,V0,M1} { zero ==> meet( converse(
% 9.24/9.67 complement( one ) ), skol2 ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (1758) {G25,W7,D5,L1,V0,M1} P(1757,123);d(805);d(968);d(712)
% 9.24/9.67 { meet( converse( complement( one ) ), skol2 ) ==> zero }.
% 9.24/9.67 parent0: (60419) {G7,W7,D5,L1,V0,M1} { meet( converse( complement( one ) )
% 9.24/9.67 , skol2 ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60421) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 9.24/9.67 complement( meet( Y, X ) ) ) }.
% 9.24/9.67 parent0[0]: (1322) {G18,W10,D5,L1,V2,M1} P(1195,12) { meet( meet( X, Y ),
% 9.24/9.67 complement( meet( Y, X ) ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60425) {G19,W10,D6,L1,V0,M1} { zero ==> meet( meet( skol2,
% 9.24/9.67 converse( complement( one ) ) ), complement( zero ) ) }.
% 9.24/9.67 parent0[0]: (1758) {G25,W7,D5,L1,V0,M1} P(1757,123);d(805);d(968);d(712) {
% 9.24/9.67 meet( converse( complement( one ) ), skol2 ) ==> zero }.
% 9.24/9.67 parent1[0; 9]: (60421) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y )
% 9.24/9.67 , complement( meet( Y, X ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := skol2
% 9.24/9.67 Y := converse( complement( one ) )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60426) {G14,W9,D6,L1,V0,M1} { zero ==> meet( meet( skol2,
% 9.24/9.67 converse( complement( one ) ) ), top ) }.
% 9.24/9.67 parent0[0]: (336) {G13,W4,D3,L1,V0,M1} P(329,10) { complement( zero ) ==>
% 9.24/9.67 top }.
% 9.24/9.67 parent1[0; 8]: (60425) {G19,W10,D6,L1,V0,M1} { zero ==> meet( meet( skol2
% 9.24/9.67 , converse( complement( one ) ) ), complement( zero ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60427) {G15,W7,D5,L1,V0,M1} { zero ==> meet( skol2, converse(
% 9.24/9.67 complement( one ) ) ) }.
% 9.24/9.67 parent0[0]: (748) {G17,W5,D3,L1,V1,M1} S(716);d(723) { meet( X, top ) ==> X
% 9.24/9.67 }.
% 9.24/9.67 parent1[0; 2]: (60426) {G14,W9,D6,L1,V0,M1} { zero ==> meet( meet( skol2,
% 9.24/9.67 converse( complement( one ) ) ), top ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( skol2, converse( complement( one ) ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60428) {G15,W7,D5,L1,V0,M1} { meet( skol2, converse( complement(
% 9.24/9.67 one ) ) ) ==> zero }.
% 9.24/9.67 parent0[0]: (60427) {G15,W7,D5,L1,V0,M1} { zero ==> meet( skol2, converse
% 9.24/9.67 ( complement( one ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (1759) {G26,W7,D5,L1,V0,M1} P(1758,1322);d(336);d(748) { meet
% 9.24/9.67 ( skol2, converse( complement( one ) ) ) ==> zero }.
% 9.24/9.67 parent0: (60428) {G15,W7,D5,L1,V0,M1} { meet( skol2, converse( complement
% 9.24/9.67 ( one ) ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60430) {G1,W23,D7,L1,V2,M1} { meet( composition( X, meet( Y,
% 9.24/9.67 converse( X ) ) ), one ) ==> join( meet( composition( X, Y ), one ), meet
% 9.24/9.67 ( composition( X, meet( Y, converse( X ) ) ), one ) ) }.
% 9.24/9.67 parent0[0]: (144) {G1,W23,D7,L1,V2,M1} P(5,14) { join( meet( composition( X
% 9.24/9.67 , Y ), one ), meet( composition( X, meet( Y, converse( X ) ) ), one ) )
% 9.24/9.67 ==> meet( composition( X, meet( Y, converse( X ) ) ), one ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60435) {G2,W24,D7,L1,V0,M1} { meet( composition( complement( one
% 9.24/9.67 ), meet( skol2, converse( complement( one ) ) ) ), one ) ==> join( meet
% 9.24/9.67 ( composition( complement( one ), skol2 ), one ), meet( composition(
% 9.24/9.67 complement( one ), zero ), one ) ) }.
% 9.24/9.67 parent0[0]: (1759) {G26,W7,D5,L1,V0,M1} P(1758,1322);d(336);d(748) { meet(
% 9.24/9.67 skol2, converse( complement( one ) ) ) ==> zero }.
% 9.24/9.67 parent1[0; 22]: (60430) {G1,W23,D7,L1,V2,M1} { meet( composition( X, meet
% 9.24/9.67 ( Y, converse( X ) ) ), one ) ==> join( meet( composition( X, Y ), one )
% 9.24/9.67 , meet( composition( X, meet( Y, converse( X ) ) ), one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := complement( one )
% 9.24/9.67 Y := skol2
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60436) {G3,W20,D6,L1,V0,M1} { meet( composition( complement( one
% 9.24/9.67 ), zero ), one ) ==> join( meet( composition( complement( one ), skol2 )
% 9.24/9.67 , one ), meet( composition( complement( one ), zero ), one ) ) }.
% 9.24/9.67 parent0[0]: (1759) {G26,W7,D5,L1,V0,M1} P(1758,1322);d(336);d(748) { meet(
% 9.24/9.67 skol2, converse( complement( one ) ) ) ==> zero }.
% 9.24/9.67 parent1[0; 5]: (60435) {G2,W24,D7,L1,V0,M1} { meet( composition(
% 9.24/9.67 complement( one ), meet( skol2, converse( complement( one ) ) ) ), one )
% 9.24/9.67 ==> join( meet( composition( complement( one ), skol2 ), one ), meet(
% 9.24/9.67 composition( complement( one ), zero ), one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60442) {G4,W17,D6,L1,V0,M1} { meet( composition( complement( one
% 9.24/9.67 ), zero ), one ) ==> join( meet( composition( complement( one ), skol2 )
% 9.24/9.67 , one ), meet( zero, one ) ) }.
% 9.24/9.67 parent0[0]: (966) {G21,W5,D3,L1,V1,M1} P(957,4);d(965) { composition( X,
% 9.24/9.67 zero ) ==> zero }.
% 9.24/9.67 parent1[0; 15]: (60436) {G3,W20,D6,L1,V0,M1} { meet( composition(
% 9.24/9.67 complement( one ), zero ), one ) ==> join( meet( composition( complement
% 9.24/9.67 ( one ), skol2 ), one ), meet( composition( complement( one ), zero ),
% 9.24/9.67 one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := complement( one )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60443) {G5,W14,D6,L1,V0,M1} { meet( zero, one ) ==> join( meet(
% 9.24/9.67 composition( complement( one ), skol2 ), one ), meet( zero, one ) ) }.
% 9.24/9.67 parent0[0]: (966) {G21,W5,D3,L1,V1,M1} P(957,4);d(965) { composition( X,
% 9.24/9.67 zero ) ==> zero }.
% 9.24/9.67 parent1[0; 2]: (60442) {G4,W17,D6,L1,V0,M1} { meet( composition(
% 9.24/9.67 complement( one ), zero ), one ) ==> join( meet( composition( complement
% 9.24/9.67 ( one ), skol2 ), one ), meet( zero, one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := complement( one )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60448) {G6,W12,D6,L1,V0,M1} { meet( zero, one ) ==> join( meet(
% 9.24/9.67 composition( complement( one ), skol2 ), one ), zero ) }.
% 9.24/9.67 parent0[0]: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero,
% 9.24/9.67 X ) ==> zero }.
% 9.24/9.67 parent1[0; 11]: (60443) {G5,W14,D6,L1,V0,M1} { meet( zero, one ) ==> join
% 9.24/9.67 ( meet( composition( complement( one ), skol2 ), one ), meet( zero, one )
% 9.24/9.67 ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := one
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60449) {G7,W10,D6,L1,V0,M1} { zero ==> join( meet( composition(
% 9.24/9.67 complement( one ), skol2 ), one ), zero ) }.
% 9.24/9.67 parent0[0]: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero,
% 9.24/9.67 X ) ==> zero }.
% 9.24/9.67 parent1[0; 1]: (60448) {G6,W12,D6,L1,V0,M1} { meet( zero, one ) ==> join(
% 9.24/9.67 meet( composition( complement( one ), skol2 ), one ), zero ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := one
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60452) {G8,W8,D5,L1,V0,M1} { zero ==> meet( composition(
% 9.24/9.67 complement( one ), skol2 ), one ) }.
% 9.24/9.67 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.67 }.
% 9.24/9.67 parent1[0; 2]: (60449) {G7,W10,D6,L1,V0,M1} { zero ==> join( meet(
% 9.24/9.67 composition( complement( one ), skol2 ), one ), zero ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( composition( complement( one ), skol2 ), one )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60453) {G8,W8,D5,L1,V0,M1} { meet( composition( complement( one )
% 9.24/9.67 , skol2 ), one ) ==> zero }.
% 9.24/9.67 parent0[0]: (60452) {G8,W8,D5,L1,V0,M1} { zero ==> meet( composition(
% 9.24/9.67 complement( one ), skol2 ), one ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (1760) {G27,W8,D5,L1,V0,M1} P(1759,144);d(966);d(339);d(712)
% 9.24/9.67 { meet( composition( complement( one ), skol2 ), one ) ==> zero }.
% 9.24/9.67 parent0: (60453) {G8,W8,D5,L1,V0,M1} { meet( composition( complement( one
% 9.24/9.67 ), skol2 ), one ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60455) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 9.24/9.67 complement( meet( Y, X ) ) ) }.
% 9.24/9.67 parent0[0]: (1322) {G18,W10,D5,L1,V2,M1} P(1195,12) { meet( meet( X, Y ),
% 9.24/9.67 complement( meet( Y, X ) ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60459) {G19,W11,D6,L1,V0,M1} { zero ==> meet( meet( one,
% 9.24/9.67 composition( complement( one ), skol2 ) ), complement( zero ) ) }.
% 9.24/9.67 parent0[0]: (1760) {G27,W8,D5,L1,V0,M1} P(1759,144);d(966);d(339);d(712) {
% 9.24/9.67 meet( composition( complement( one ), skol2 ), one ) ==> zero }.
% 9.24/9.67 parent1[0; 10]: (60455) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y
% 9.24/9.67 ), complement( meet( Y, X ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := one
% 9.24/9.67 Y := composition( complement( one ), skol2 )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60460) {G14,W10,D6,L1,V0,M1} { zero ==> meet( meet( one,
% 9.24/9.67 composition( complement( one ), skol2 ) ), top ) }.
% 9.24/9.67 parent0[0]: (336) {G13,W4,D3,L1,V0,M1} P(329,10) { complement( zero ) ==>
% 9.24/9.67 top }.
% 9.24/9.67 parent1[0; 9]: (60459) {G19,W11,D6,L1,V0,M1} { zero ==> meet( meet( one,
% 9.24/9.67 composition( complement( one ), skol2 ) ), complement( zero ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60461) {G15,W8,D5,L1,V0,M1} { zero ==> meet( one, composition(
% 9.24/9.67 complement( one ), skol2 ) ) }.
% 9.24/9.67 parent0[0]: (748) {G17,W5,D3,L1,V1,M1} S(716);d(723) { meet( X, top ) ==> X
% 9.24/9.67 }.
% 9.24/9.67 parent1[0; 2]: (60460) {G14,W10,D6,L1,V0,M1} { zero ==> meet( meet( one,
% 9.24/9.67 composition( complement( one ), skol2 ) ), top ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( one, composition( complement( one ), skol2 ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60462) {G15,W8,D5,L1,V0,M1} { meet( one, composition( complement
% 9.24/9.67 ( one ), skol2 ) ) ==> zero }.
% 9.24/9.67 parent0[0]: (60461) {G15,W8,D5,L1,V0,M1} { zero ==> meet( one, composition
% 9.24/9.67 ( complement( one ), skol2 ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (1761) {G28,W8,D5,L1,V0,M1} P(1760,1322);d(336);d(748) { meet
% 9.24/9.67 ( one, composition( complement( one ), skol2 ) ) ==> zero }.
% 9.24/9.67 parent0: (60462) {G15,W8,D5,L1,V0,M1} { meet( one, composition( complement
% 9.24/9.67 ( one ), skol2 ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60464) {G22,W9,D6,L1,V1,M1} { zero ==> meet( composition( X,
% 9.24/9.67 complement( converse( X ) ) ), one ) }.
% 9.24/9.67 parent0[0]: (1740) {G22,W9,D6,L1,V1,M1} P(61,144);d(966);d(339);d(712) {
% 9.24/9.67 meet( composition( X, complement( converse( X ) ) ), one ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60465) {G1,W9,D5,L1,V1,M1} { zero ==> meet( composition(
% 9.24/9.67 converse( X ), complement( X ) ), one ) }.
% 9.24/9.67 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 9.24/9.67 parent1[0; 7]: (60464) {G22,W9,D6,L1,V1,M1} { zero ==> meet( composition(
% 9.24/9.67 X, complement( converse( X ) ) ), one ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := converse( X )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60466) {G1,W9,D5,L1,V1,M1} { meet( composition( converse( X ),
% 9.24/9.67 complement( X ) ), one ) ==> zero }.
% 9.24/9.67 parent0[0]: (60465) {G1,W9,D5,L1,V1,M1} { zero ==> meet( composition(
% 9.24/9.67 converse( X ), complement( X ) ), one ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (1798) {G23,W9,D5,L1,V1,M1} P(7,1740) { meet( composition(
% 9.24/9.67 converse( X ), complement( X ) ), one ) ==> zero }.
% 9.24/9.67 parent0: (60466) {G1,W9,D5,L1,V1,M1} { meet( composition( converse( X ),
% 9.24/9.67 complement( X ) ), one ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60468) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 9.24/9.67 complement( meet( Y, X ) ) ) }.
% 9.24/9.67 parent0[0]: (1322) {G18,W10,D5,L1,V2,M1} P(1195,12) { meet( meet( X, Y ),
% 9.24/9.67 complement( meet( Y, X ) ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60472) {G19,W12,D6,L1,V1,M1} { zero ==> meet( meet( one,
% 9.24/9.67 composition( converse( X ), complement( X ) ) ), complement( zero ) ) }.
% 9.24/9.67 parent0[0]: (1798) {G23,W9,D5,L1,V1,M1} P(7,1740) { meet( composition(
% 9.24/9.67 converse( X ), complement( X ) ), one ) ==> zero }.
% 9.24/9.67 parent1[0; 11]: (60468) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y
% 9.24/9.67 ), complement( meet( Y, X ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := one
% 9.24/9.67 Y := composition( converse( X ), complement( X ) )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60473) {G14,W11,D6,L1,V1,M1} { zero ==> meet( meet( one,
% 9.24/9.67 composition( converse( X ), complement( X ) ) ), top ) }.
% 9.24/9.67 parent0[0]: (336) {G13,W4,D3,L1,V0,M1} P(329,10) { complement( zero ) ==>
% 9.24/9.67 top }.
% 9.24/9.67 parent1[0; 10]: (60472) {G19,W12,D6,L1,V1,M1} { zero ==> meet( meet( one,
% 9.24/9.67 composition( converse( X ), complement( X ) ) ), complement( zero ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60474) {G15,W9,D5,L1,V1,M1} { zero ==> meet( one, composition(
% 9.24/9.67 converse( X ), complement( X ) ) ) }.
% 9.24/9.67 parent0[0]: (748) {G17,W5,D3,L1,V1,M1} S(716);d(723) { meet( X, top ) ==> X
% 9.24/9.67 }.
% 9.24/9.67 parent1[0; 2]: (60473) {G14,W11,D6,L1,V1,M1} { zero ==> meet( meet( one,
% 9.24/9.67 composition( converse( X ), complement( X ) ) ), top ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( one, composition( converse( X ), complement( X ) ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60475) {G15,W9,D5,L1,V1,M1} { meet( one, composition( converse( X
% 9.24/9.67 ), complement( X ) ) ) ==> zero }.
% 9.24/9.67 parent0[0]: (60474) {G15,W9,D5,L1,V1,M1} { zero ==> meet( one, composition
% 9.24/9.67 ( converse( X ), complement( X ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (1813) {G24,W9,D5,L1,V1,M1} P(1798,1322);d(336);d(748) { meet
% 9.24/9.67 ( one, composition( converse( X ), complement( X ) ) ) ==> zero }.
% 9.24/9.67 parent0: (60475) {G15,W9,D5,L1,V1,M1} { meet( one, composition( converse(
% 9.24/9.67 X ), complement( X ) ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60477) {G1,W34,D7,L1,V3,M1} { composition( meet( X, composition(
% 9.24/9.67 Z, Y ) ), meet( converse( Y ), composition( converse( X ), Z ) ) ) ==>
% 9.24/9.67 join( meet( composition( X, converse( Y ) ), Z ), composition( meet( X,
% 9.24/9.67 composition( Z, Y ) ), meet( converse( Y ), composition( converse( X ), Z
% 9.24/9.67 ) ) ) ) }.
% 9.24/9.67 parent0[0]: (123) {G1,W34,D7,L1,V3,M1} P(7,13) { join( meet( composition( Y
% 9.24/9.67 , converse( X ) ), Z ), composition( meet( Y, composition( Z, X ) ), meet
% 9.24/9.67 ( converse( X ), composition( converse( Y ), Z ) ) ) ) ==> composition(
% 9.24/9.67 meet( Y, composition( Z, X ) ), meet( converse( X ), composition(
% 9.24/9.67 converse( Y ), Z ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60482) {G2,W38,D7,L1,V1,M1} { composition( meet( one,
% 9.24/9.67 composition( converse( X ), complement( X ) ) ), meet( converse(
% 9.24/9.67 complement( X ) ), composition( converse( one ), converse( X ) ) ) ) ==>
% 9.24/9.67 join( meet( composition( one, converse( complement( X ) ) ), converse( X
% 9.24/9.67 ) ), composition( zero, meet( converse( complement( X ) ), composition(
% 9.24/9.67 converse( one ), converse( X ) ) ) ) ) }.
% 9.24/9.67 parent0[0]: (1813) {G24,W9,D5,L1,V1,M1} P(1798,1322);d(336);d(748) { meet(
% 9.24/9.67 one, composition( converse( X ), complement( X ) ) ) ==> zero }.
% 9.24/9.67 parent1[0; 28]: (60477) {G1,W34,D7,L1,V3,M1} { composition( meet( X,
% 9.24/9.67 composition( Z, Y ) ), meet( converse( Y ), composition( converse( X ), Z
% 9.24/9.67 ) ) ) ==> join( meet( composition( X, converse( Y ) ), Z ), composition
% 9.24/9.67 ( meet( X, composition( Z, Y ) ), meet( converse( Y ), composition(
% 9.24/9.67 converse( X ), Z ) ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := one
% 9.24/9.67 Y := complement( X )
% 9.24/9.67 Z := converse( X )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60483) {G3,W32,D7,L1,V1,M1} { composition( zero, meet( converse
% 9.24/9.67 ( complement( X ) ), composition( converse( one ), converse( X ) ) ) )
% 9.24/9.67 ==> join( meet( composition( one, converse( complement( X ) ) ), converse
% 9.24/9.67 ( X ) ), composition( zero, meet( converse( complement( X ) ),
% 9.24/9.67 composition( converse( one ), converse( X ) ) ) ) ) }.
% 9.24/9.67 parent0[0]: (1813) {G24,W9,D5,L1,V1,M1} P(1798,1322);d(336);d(748) { meet(
% 9.24/9.67 one, composition( converse( X ), complement( X ) ) ) ==> zero }.
% 9.24/9.67 parent1[0; 2]: (60482) {G2,W38,D7,L1,V1,M1} { composition( meet( one,
% 9.24/9.67 composition( converse( X ), complement( X ) ) ), meet( converse(
% 9.24/9.67 complement( X ) ), composition( converse( one ), converse( X ) ) ) ) ==>
% 9.24/9.67 join( meet( composition( one, converse( complement( X ) ) ), converse( X
% 9.24/9.67 ) ), composition( zero, meet( converse( complement( X ) ), composition(
% 9.24/9.67 converse( one ), converse( X ) ) ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60488) {G4,W30,D7,L1,V1,M1} { composition( zero, meet( converse
% 9.24/9.67 ( complement( X ) ), composition( converse( one ), converse( X ) ) ) )
% 9.24/9.67 ==> join( meet( converse( complement( X ) ), converse( X ) ), composition
% 9.24/9.67 ( zero, meet( converse( complement( X ) ), composition( converse( one ),
% 9.24/9.67 converse( X ) ) ) ) ) }.
% 9.24/9.67 parent0[0]: (805) {G4,W5,D3,L1,V1,M1} P(804,798) { composition( one, X )
% 9.24/9.67 ==> X }.
% 9.24/9.67 parent1[0; 14]: (60483) {G3,W32,D7,L1,V1,M1} { composition( zero, meet(
% 9.24/9.67 converse( complement( X ) ), composition( converse( one ), converse( X )
% 9.24/9.67 ) ) ) ==> join( meet( composition( one, converse( complement( X ) ) ),
% 9.24/9.67 converse( X ) ), composition( zero, meet( converse( complement( X ) ),
% 9.24/9.67 composition( converse( one ), converse( X ) ) ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := converse( complement( X ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60490) {G5,W20,D6,L1,V1,M1} { composition( zero, meet( converse
% 9.24/9.67 ( complement( X ) ), composition( converse( one ), converse( X ) ) ) )
% 9.24/9.67 ==> join( meet( converse( complement( X ) ), converse( X ) ), zero ) }.
% 9.24/9.67 parent0[0]: (968) {G22,W5,D3,L1,V1,M1} P(966,89);d(742) { composition( zero
% 9.24/9.67 , X ) ==> zero }.
% 9.24/9.67 parent1[0; 19]: (60488) {G4,W30,D7,L1,V1,M1} { composition( zero, meet(
% 9.24/9.67 converse( complement( X ) ), composition( converse( one ), converse( X )
% 9.24/9.67 ) ) ) ==> join( meet( converse( complement( X ) ), converse( X ) ),
% 9.24/9.67 composition( zero, meet( converse( complement( X ) ), composition(
% 9.24/9.67 converse( one ), converse( X ) ) ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( converse( complement( X ) ), composition( converse( one ),
% 9.24/9.67 converse( X ) ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60491) {G6,W10,D6,L1,V1,M1} { zero ==> join( meet( converse(
% 9.24/9.67 complement( X ) ), converse( X ) ), zero ) }.
% 9.24/9.67 parent0[0]: (968) {G22,W5,D3,L1,V1,M1} P(966,89);d(742) { composition( zero
% 9.24/9.67 , X ) ==> zero }.
% 9.24/9.67 parent1[0; 1]: (60490) {G5,W20,D6,L1,V1,M1} { composition( zero, meet(
% 9.24/9.67 converse( complement( X ) ), composition( converse( one ), converse( X )
% 9.24/9.67 ) ) ) ==> join( meet( converse( complement( X ) ), converse( X ) ), zero
% 9.24/9.67 ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( converse( complement( X ) ), composition( converse( one ),
% 9.24/9.67 converse( X ) ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60494) {G7,W8,D5,L1,V1,M1} { zero ==> meet( converse( complement
% 9.24/9.67 ( X ) ), converse( X ) ) }.
% 9.24/9.67 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.67 }.
% 9.24/9.67 parent1[0; 2]: (60491) {G6,W10,D6,L1,V1,M1} { zero ==> join( meet(
% 9.24/9.67 converse( complement( X ) ), converse( X ) ), zero ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( converse( complement( X ) ), converse( X ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60495) {G7,W8,D5,L1,V1,M1} { meet( converse( complement( X ) ),
% 9.24/9.67 converse( X ) ) ==> zero }.
% 9.24/9.67 parent0[0]: (60494) {G7,W8,D5,L1,V1,M1} { zero ==> meet( converse(
% 9.24/9.67 complement( X ) ), converse( X ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (1818) {G25,W8,D5,L1,V1,M1} P(1813,123);d(805);d(968);d(712)
% 9.24/9.67 { meet( converse( complement( X ) ), converse( X ) ) ==> zero }.
% 9.24/9.67 parent0: (60495) {G7,W8,D5,L1,V1,M1} { meet( converse( complement( X ) ),
% 9.24/9.67 converse( X ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60497) {G25,W8,D5,L1,V1,M1} { zero ==> meet( converse( complement
% 9.24/9.67 ( X ) ), converse( X ) ) }.
% 9.24/9.67 parent0[0]: (1818) {G25,W8,D5,L1,V1,M1} P(1813,123);d(805);d(968);d(712) {
% 9.24/9.67 meet( converse( complement( X ) ), converse( X ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60498) {G1,W8,D6,L1,V1,M1} { zero ==> meet( converse( complement
% 9.24/9.67 ( converse( X ) ) ), X ) }.
% 9.24/9.67 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 9.24/9.67 parent1[0; 7]: (60497) {G25,W8,D5,L1,V1,M1} { zero ==> meet( converse(
% 9.24/9.67 complement( X ) ), converse( X ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := converse( X )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60499) {G1,W8,D6,L1,V1,M1} { meet( converse( complement( converse
% 9.24/9.67 ( X ) ) ), X ) ==> zero }.
% 9.24/9.67 parent0[0]: (60498) {G1,W8,D6,L1,V1,M1} { zero ==> meet( converse(
% 9.24/9.67 complement( converse( X ) ) ), X ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (1839) {G26,W8,D6,L1,V1,M1} P(7,1818) { meet( converse(
% 9.24/9.67 complement( converse( X ) ) ), X ) ==> zero }.
% 9.24/9.67 parent0: (60499) {G1,W8,D6,L1,V1,M1} { meet( converse( complement(
% 9.24/9.67 converse( X ) ) ), X ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60501) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet( X
% 9.24/9.67 , complement( Y ) ) ) }.
% 9.24/9.67 parent0[0]: (1001) {G18,W10,D5,L1,V2,M1} S(37);d(741) { join( meet( X, Y )
% 9.24/9.67 , meet( X, complement( Y ) ) ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60504) {G19,W14,D7,L1,V1,M1} { converse( complement( converse( X
% 9.24/9.67 ) ) ) ==> join( zero, meet( converse( complement( converse( X ) ) ),
% 9.24/9.67 complement( X ) ) ) }.
% 9.24/9.67 parent0[0]: (1839) {G26,W8,D6,L1,V1,M1} P(7,1818) { meet( converse(
% 9.24/9.67 complement( converse( X ) ) ), X ) ==> zero }.
% 9.24/9.67 parent1[0; 6]: (60501) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.67 meet( X, complement( Y ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := converse( complement( converse( X ) ) )
% 9.24/9.67 Y := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60506) {G16,W12,D6,L1,V1,M1} { converse( complement( converse( X
% 9.24/9.67 ) ) ) ==> meet( converse( complement( converse( X ) ) ), complement( X )
% 9.24/9.67 ) }.
% 9.24/9.67 parent0[0]: (713) {G15,W5,D3,L1,V1,M1} P(321,27);d(712);d(712) { join( zero
% 9.24/9.67 , X ) ==> X }.
% 9.24/9.67 parent1[0; 5]: (60504) {G19,W14,D7,L1,V1,M1} { converse( complement(
% 9.24/9.67 converse( X ) ) ) ==> join( zero, meet( converse( complement( converse( X
% 9.24/9.67 ) ) ), complement( X ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( converse( complement( converse( X ) ) ), complement( X ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60507) {G17,W7,D5,L1,V1,M1} { converse( complement( converse( X
% 9.24/9.67 ) ) ) ==> complement( X ) }.
% 9.24/9.67 parent0[0]: (1175) {G20,W10,D6,L1,V1,M1} P(723,1174) { meet( converse(
% 9.24/9.67 complement( converse( X ) ) ), complement( X ) ) ==> complement( X ) }.
% 9.24/9.67 parent1[0; 5]: (60506) {G16,W12,D6,L1,V1,M1} { converse( complement(
% 9.24/9.67 converse( X ) ) ) ==> meet( converse( complement( converse( X ) ) ),
% 9.24/9.67 complement( X ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2319) {G27,W7,D5,L1,V1,M1} P(1839,1001);d(713);d(1175) {
% 9.24/9.67 converse( complement( converse( X ) ) ) ==> complement( X ) }.
% 9.24/9.67 parent0: (60507) {G17,W7,D5,L1,V1,M1} { converse( complement( converse( X
% 9.24/9.67 ) ) ) ==> complement( X ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60510) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet( X
% 9.24/9.67 , complement( Y ) ) ) }.
% 9.24/9.67 parent0[0]: (1001) {G18,W10,D5,L1,V2,M1} S(37);d(741) { join( meet( X, Y )
% 9.24/9.67 , meet( X, complement( Y ) ) ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60512) {G19,W11,D7,L1,V0,M1} { one ==> join( zero, meet( one,
% 9.24/9.67 complement( composition( complement( one ), skol2 ) ) ) ) }.
% 9.24/9.67 parent0[0]: (1761) {G28,W8,D5,L1,V0,M1} P(1760,1322);d(336);d(748) { meet(
% 9.24/9.67 one, composition( complement( one ), skol2 ) ) ==> zero }.
% 9.24/9.67 parent1[0; 3]: (60510) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.67 meet( X, complement( Y ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := one
% 9.24/9.67 Y := composition( complement( one ), skol2 )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60513) {G16,W9,D6,L1,V0,M1} { one ==> meet( one, complement(
% 9.24/9.67 composition( complement( one ), skol2 ) ) ) }.
% 9.24/9.67 parent0[0]: (713) {G15,W5,D3,L1,V1,M1} P(321,27);d(712);d(712) { join( zero
% 9.24/9.67 , X ) ==> X }.
% 9.24/9.67 parent1[0; 2]: (60512) {G19,W11,D7,L1,V0,M1} { one ==> join( zero, meet(
% 9.24/9.67 one, complement( composition( complement( one ), skol2 ) ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( one, complement( composition( complement( one ), skol2 ) ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60514) {G16,W9,D6,L1,V0,M1} { meet( one, complement( composition
% 9.24/9.67 ( complement( one ), skol2 ) ) ) ==> one }.
% 9.24/9.67 parent0[0]: (60513) {G16,W9,D6,L1,V0,M1} { one ==> meet( one, complement(
% 9.24/9.67 composition( complement( one ), skol2 ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2327) {G29,W9,D6,L1,V0,M1} P(1761,1001);d(713) { meet( one,
% 9.24/9.67 complement( composition( complement( one ), skol2 ) ) ) ==> one }.
% 9.24/9.67 parent0: (60514) {G16,W9,D6,L1,V0,M1} { meet( one, complement( composition
% 9.24/9.67 ( complement( one ), skol2 ) ) ) ==> one }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60516) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet( X
% 9.24/9.67 , complement( Y ) ) ) }.
% 9.24/9.67 parent0[0]: (1001) {G18,W10,D5,L1,V2,M1} S(37);d(741) { join( meet( X, Y )
% 9.24/9.67 , meet( X, complement( Y ) ) ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60518) {G19,W11,D7,L1,V0,M1} { one ==> join( zero, meet( one,
% 9.24/9.67 complement( composition( complement( one ), skol1 ) ) ) ) }.
% 9.24/9.67 parent0[0]: (1756) {G28,W8,D5,L1,V0,M1} P(1755,1322);d(336);d(748) { meet(
% 9.24/9.67 one, composition( complement( one ), skol1 ) ) ==> zero }.
% 9.24/9.67 parent1[0; 3]: (60516) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.67 meet( X, complement( Y ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := one
% 9.24/9.67 Y := composition( complement( one ), skol1 )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60519) {G16,W9,D6,L1,V0,M1} { one ==> meet( one, complement(
% 9.24/9.67 composition( complement( one ), skol1 ) ) ) }.
% 9.24/9.67 parent0[0]: (713) {G15,W5,D3,L1,V1,M1} P(321,27);d(712);d(712) { join( zero
% 9.24/9.67 , X ) ==> X }.
% 9.24/9.67 parent1[0; 2]: (60518) {G19,W11,D7,L1,V0,M1} { one ==> join( zero, meet(
% 9.24/9.67 one, complement( composition( complement( one ), skol1 ) ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( one, complement( composition( complement( one ), skol1 ) ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60520) {G16,W9,D6,L1,V0,M1} { meet( one, complement( composition
% 9.24/9.67 ( complement( one ), skol1 ) ) ) ==> one }.
% 9.24/9.67 parent0[0]: (60519) {G16,W9,D6,L1,V0,M1} { one ==> meet( one, complement(
% 9.24/9.67 composition( complement( one ), skol1 ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2333) {G29,W9,D6,L1,V0,M1} P(1756,1001);d(713) { meet( one,
% 9.24/9.67 complement( composition( complement( one ), skol1 ) ) ) ==> one }.
% 9.24/9.67 parent0: (60520) {G16,W9,D6,L1,V0,M1} { meet( one, complement( composition
% 9.24/9.67 ( complement( one ), skol1 ) ) ) ==> one }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60522) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet( X
% 9.24/9.67 , complement( Y ) ) ) }.
% 9.24/9.67 parent0[0]: (1001) {G18,W10,D5,L1,V2,M1} S(37);d(741) { join( meet( X, Y )
% 9.24/9.67 , meet( X, complement( Y ) ) ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60525) {G19,W11,D7,L1,V1,M1} { X ==> join( zero, meet( X,
% 9.24/9.67 complement( complement( composition( X, top ) ) ) ) ) }.
% 9.24/9.67 parent0[0]: (1680) {G23,W8,D5,L1,V1,M1} P(954,143);d(985);d(712) { meet( X
% 9.24/9.67 , complement( composition( X, top ) ) ) ==> zero }.
% 9.24/9.67 parent1[0; 3]: (60522) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.67 meet( X, complement( Y ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := complement( composition( X, top ) )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60527) {G16,W9,D6,L1,V1,M1} { X ==> meet( X, complement(
% 9.24/9.67 complement( composition( X, top ) ) ) ) }.
% 9.24/9.67 parent0[0]: (713) {G15,W5,D3,L1,V1,M1} P(321,27);d(712);d(712) { join( zero
% 9.24/9.67 , X ) ==> X }.
% 9.24/9.67 parent1[0; 2]: (60525) {G19,W11,D7,L1,V1,M1} { X ==> join( zero, meet( X,
% 9.24/9.67 complement( complement( composition( X, top ) ) ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( X, complement( complement( composition( X, top ) ) ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60528) {G17,W7,D4,L1,V1,M1} { X ==> meet( X, composition( X, top
% 9.24/9.67 ) ) }.
% 9.24/9.67 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.67 complement( X ) ) ==> X }.
% 9.24/9.67 parent1[0; 4]: (60527) {G16,W9,D6,L1,V1,M1} { X ==> meet( X, complement(
% 9.24/9.67 complement( composition( X, top ) ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := composition( X, top )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60529) {G17,W7,D4,L1,V1,M1} { meet( X, composition( X, top ) )
% 9.24/9.67 ==> X }.
% 9.24/9.67 parent0[0]: (60528) {G17,W7,D4,L1,V1,M1} { X ==> meet( X, composition( X,
% 9.24/9.67 top ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2339) {G24,W7,D4,L1,V1,M1} P(1680,1001);d(713);d(723) { meet
% 9.24/9.67 ( X, composition( X, top ) ) ==> X }.
% 9.24/9.67 parent0: (60529) {G17,W7,D4,L1,V1,M1} { meet( X, composition( X, top ) )
% 9.24/9.67 ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60531) {G19,W9,D4,L1,V2,M1} { join( X, Y ) ==> join( join( X, Y )
% 9.24/9.67 , X ) }.
% 9.24/9.67 parent0[0]: (1551) {G19,W9,D4,L1,V2,M1} P(1542,28) { join( join( X, Y ), X
% 9.24/9.67 ) ==> join( X, Y ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60533) {G19,W14,D5,L1,V2,M1} { join( meet( X, Y ), meet( X,
% 9.24/9.67 complement( Y ) ) ) ==> join( X, meet( X, Y ) ) }.
% 9.24/9.67 parent0[0]: (1001) {G18,W10,D5,L1,V2,M1} S(37);d(741) { join( meet( X, Y )
% 9.24/9.67 , meet( X, complement( Y ) ) ) ==> X }.
% 9.24/9.67 parent1[0; 10]: (60531) {G19,W9,D4,L1,V2,M1} { join( X, Y ) ==> join( join
% 9.24/9.67 ( X, Y ), X ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := meet( X, Y )
% 9.24/9.67 Y := meet( X, complement( Y ) )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60534) {G19,W7,D4,L1,V2,M1} { X ==> join( X, meet( X, Y ) ) }.
% 9.24/9.67 parent0[0]: (1001) {G18,W10,D5,L1,V2,M1} S(37);d(741) { join( meet( X, Y )
% 9.24/9.67 , meet( X, complement( Y ) ) ) ==> X }.
% 9.24/9.67 parent1[0; 1]: (60533) {G19,W14,D5,L1,V2,M1} { join( meet( X, Y ), meet( X
% 9.24/9.67 , complement( Y ) ) ) ==> join( X, meet( X, Y ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60536) {G19,W7,D4,L1,V2,M1} { join( X, meet( X, Y ) ) ==> X }.
% 9.24/9.67 parent0[0]: (60534) {G19,W7,D4,L1,V2,M1} { X ==> join( X, meet( X, Y ) )
% 9.24/9.67 }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2342) {G20,W7,D4,L1,V2,M1} P(1001,1551) { join( X, meet( X, Y
% 9.24/9.67 ) ) ==> X }.
% 9.24/9.67 parent0: (60536) {G19,W7,D4,L1,V2,M1} { join( X, meet( X, Y ) ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60539) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet( X
% 9.24/9.67 , complement( Y ) ) ) }.
% 9.24/9.67 parent0[0]: (1001) {G18,W10,D5,L1,V2,M1} S(37);d(741) { join( meet( X, Y )
% 9.24/9.67 , meet( X, complement( Y ) ) ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60542) {G19,W11,D7,L1,V2,M1} { X ==> join( zero, meet( X,
% 9.24/9.67 complement( meet( complement( X ), Y ) ) ) ) }.
% 9.24/9.67 parent0[0]: (1330) {G21,W8,D5,L1,V2,M1} P(52,1326) { meet( Y, meet(
% 9.24/9.67 complement( Y ), X ) ) ==> zero }.
% 9.24/9.67 parent1[0; 3]: (60539) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.67 meet( X, complement( Y ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := meet( complement( X ), Y )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60543) {G16,W9,D6,L1,V2,M1} { X ==> meet( X, complement( meet(
% 9.24/9.67 complement( X ), Y ) ) ) }.
% 9.24/9.67 parent0[0]: (713) {G15,W5,D3,L1,V1,M1} P(321,27);d(712);d(712) { join( zero
% 9.24/9.67 , X ) ==> X }.
% 9.24/9.67 parent1[0; 2]: (60542) {G19,W11,D7,L1,V2,M1} { X ==> join( zero, meet( X,
% 9.24/9.67 complement( meet( complement( X ), Y ) ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( X, complement( meet( complement( X ), Y ) ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60544) {G17,W8,D5,L1,V2,M1} { X ==> meet( X, join( X, complement
% 9.24/9.67 ( Y ) ) ) }.
% 9.24/9.67 parent0[0]: (1184) {G17,W10,D5,L1,V2,M1} P(723,726) { complement( meet(
% 9.24/9.67 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 9.24/9.67 parent1[0; 4]: (60543) {G16,W9,D6,L1,V2,M1} { X ==> meet( X, complement(
% 9.24/9.67 meet( complement( X ), Y ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60545) {G17,W8,D5,L1,V2,M1} { meet( X, join( X, complement( Y ) )
% 9.24/9.67 ) ==> X }.
% 9.24/9.67 parent0[0]: (60544) {G17,W8,D5,L1,V2,M1} { X ==> meet( X, join( X,
% 9.24/9.67 complement( Y ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2348) {G22,W8,D5,L1,V2,M1} P(1330,1001);d(713);d(1184) { meet
% 9.24/9.67 ( X, join( X, complement( Y ) ) ) ==> X }.
% 9.24/9.67 parent0: (60545) {G17,W8,D5,L1,V2,M1} { meet( X, join( X, complement( Y )
% 9.24/9.67 ) ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60547) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet( X
% 9.24/9.67 , complement( Y ) ) ) }.
% 9.24/9.67 parent0[0]: (1001) {G18,W10,D5,L1,V2,M1} S(37);d(741) { join( meet( X, Y )
% 9.24/9.67 , meet( X, complement( Y ) ) ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60551) {G19,W15,D7,L1,V2,M1} { meet( complement( complement( X )
% 9.24/9.67 ), Y ) ==> join( meet( meet( complement( complement( X ) ), Y ), X ),
% 9.24/9.67 zero ) }.
% 9.24/9.67 parent0[0]: (1351) {G24,W8,D5,L1,V2,M1} P(723,1349) { meet( meet(
% 9.24/9.67 complement( X ), Y ), X ) ==> zero }.
% 9.24/9.67 parent1[0; 14]: (60547) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.67 meet( X, complement( Y ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := complement( X )
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := meet( complement( complement( X ) ), Y )
% 9.24/9.67 Y := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60552) {G15,W13,D6,L1,V2,M1} { meet( complement( complement( X )
% 9.24/9.67 ), Y ) ==> meet( meet( complement( complement( X ) ), Y ), X ) }.
% 9.24/9.67 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.67 }.
% 9.24/9.67 parent1[0; 6]: (60551) {G19,W15,D7,L1,V2,M1} { meet( complement(
% 9.24/9.67 complement( X ) ), Y ) ==> join( meet( meet( complement( complement( X )
% 9.24/9.67 ), Y ), X ), zero ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( meet( complement( complement( X ) ), Y ), X )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60554) {G16,W11,D5,L1,V2,M1} { meet( complement( complement( X )
% 9.24/9.67 ), Y ) ==> meet( meet( X, Y ), X ) }.
% 9.24/9.67 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.67 complement( X ) ) ==> X }.
% 9.24/9.67 parent1[0; 8]: (60552) {G15,W13,D6,L1,V2,M1} { meet( complement(
% 9.24/9.67 complement( X ) ), Y ) ==> meet( meet( complement( complement( X ) ), Y )
% 9.24/9.67 , X ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60555) {G17,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X, Y
% 9.24/9.67 ), X ) }.
% 9.24/9.67 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.67 complement( X ) ) ==> X }.
% 9.24/9.67 parent1[0; 2]: (60554) {G16,W11,D5,L1,V2,M1} { meet( complement(
% 9.24/9.67 complement( X ) ), Y ) ==> meet( meet( X, Y ), X ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60557) {G17,W9,D4,L1,V2,M1} { meet( meet( X, Y ), X ) ==> meet( X
% 9.24/9.67 , Y ) }.
% 9.24/9.67 parent0[0]: (60555) {G17,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X
% 9.24/9.67 , Y ), X ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2352) {G25,W9,D4,L1,V2,M1} P(1351,1001);d(712);d(723) { meet
% 9.24/9.67 ( meet( X, Y ), X ) ==> meet( X, Y ) }.
% 9.24/9.67 parent0: (60557) {G17,W9,D4,L1,V2,M1} { meet( meet( X, Y ), X ) ==> meet(
% 9.24/9.67 X, Y ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60559) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet( X
% 9.24/9.67 , complement( Y ) ) ) }.
% 9.24/9.67 parent0[0]: (1001) {G18,W10,D5,L1,V2,M1} S(37);d(741) { join( meet( X, Y )
% 9.24/9.67 , meet( X, complement( Y ) ) ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60560) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( Y, X ), meet( X
% 9.24/9.67 , complement( Y ) ) ) }.
% 9.24/9.67 parent0[0]: (52) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 9.24/9.67 Y ) }.
% 9.24/9.67 parent1[0; 3]: (60559) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.67 meet( X, complement( Y ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60564) {G2,W10,D5,L1,V2,M1} { join( meet( Y, X ), meet( X,
% 9.24/9.67 complement( Y ) ) ) ==> X }.
% 9.24/9.67 parent0[0]: (60560) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( Y, X ), meet
% 9.24/9.67 ( X, complement( Y ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2364) {G19,W10,D5,L1,V2,M1} P(52,1001) { join( meet( Y, X ),
% 9.24/9.67 meet( X, complement( Y ) ) ) ==> X }.
% 9.24/9.67 parent0: (60564) {G2,W10,D5,L1,V2,M1} { join( meet( Y, X ), meet( X,
% 9.24/9.67 complement( Y ) ) ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60568) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet( X
% 9.24/9.67 , complement( Y ) ) ) }.
% 9.24/9.67 parent0[0]: (1001) {G18,W10,D5,L1,V2,M1} S(37);d(741) { join( meet( X, Y )
% 9.24/9.67 , meet( X, complement( Y ) ) ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60570) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet(
% 9.24/9.67 complement( Y ), X ) ) }.
% 9.24/9.67 parent0[0]: (52) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 9.24/9.67 Y ) }.
% 9.24/9.67 parent1[0; 6]: (60568) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.67 meet( X, complement( Y ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := complement( Y )
% 9.24/9.67 Y := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60576) {G2,W10,D5,L1,V2,M1} { join( meet( X, Y ), meet(
% 9.24/9.67 complement( Y ), X ) ) ==> X }.
% 9.24/9.67 parent0[0]: (60570) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet
% 9.24/9.67 ( complement( Y ), X ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2365) {G19,W10,D5,L1,V2,M1} P(52,1001) { join( meet( X, Y ),
% 9.24/9.67 meet( complement( Y ), X ) ) ==> X }.
% 9.24/9.67 parent0: (60576) {G2,W10,D5,L1,V2,M1} { join( meet( X, Y ), meet(
% 9.24/9.67 complement( Y ), X ) ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60577) {G20,W7,D4,L1,V2,M1} { X ==> join( X, meet( X, Y ) ) }.
% 9.24/9.67 parent0[0]: (2342) {G20,W7,D4,L1,V2,M1} P(1001,1551) { join( X, meet( X, Y
% 9.24/9.67 ) ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60578) {G2,W7,D4,L1,V2,M1} { X ==> join( X, meet( Y, X ) ) }.
% 9.24/9.67 parent0[0]: (52) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 9.24/9.67 Y ) }.
% 9.24/9.67 parent1[0; 4]: (60577) {G20,W7,D4,L1,V2,M1} { X ==> join( X, meet( X, Y )
% 9.24/9.67 ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60581) {G2,W7,D4,L1,V2,M1} { join( X, meet( Y, X ) ) ==> X }.
% 9.24/9.67 parent0[0]: (60578) {G2,W7,D4,L1,V2,M1} { X ==> join( X, meet( Y, X ) )
% 9.24/9.67 }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2393) {G21,W7,D4,L1,V2,M1} P(52,2342) { join( X, meet( Y, X )
% 9.24/9.67 ) ==> X }.
% 9.24/9.67 parent0: (60581) {G2,W7,D4,L1,V2,M1} { join( X, meet( Y, X ) ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60582) {G20,W7,D4,L1,V2,M1} { X ==> join( X, meet( X, Y ) ) }.
% 9.24/9.67 parent0[0]: (2342) {G20,W7,D4,L1,V2,M1} P(1001,1551) { join( X, meet( X, Y
% 9.24/9.67 ) ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60583) {G1,W7,D4,L1,V2,M1} { X ==> join( meet( X, Y ), X ) }.
% 9.24/9.67 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.67 parent1[0; 2]: (60582) {G20,W7,D4,L1,V2,M1} { X ==> join( X, meet( X, Y )
% 9.24/9.67 ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := meet( X, Y )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60586) {G1,W7,D4,L1,V2,M1} { join( meet( X, Y ), X ) ==> X }.
% 9.24/9.67 parent0[0]: (60583) {G1,W7,D4,L1,V2,M1} { X ==> join( meet( X, Y ), X )
% 9.24/9.67 }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2394) {G21,W7,D4,L1,V2,M1} P(2342,0) { join( meet( X, Y ), X
% 9.24/9.67 ) ==> X }.
% 9.24/9.67 parent0: (60586) {G1,W7,D4,L1,V2,M1} { join( meet( X, Y ), X ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60588) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) ) ==>
% 9.24/9.67 converse( join( converse( X ), Y ) ) }.
% 9.24/9.67 parent0[0]: (74) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 9.24/9.67 ), Y ) ) ==> join( X, converse( Y ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60590) {G2,W11,D6,L1,V2,M1} { join( X, converse( meet( Y,
% 9.24/9.67 converse( X ) ) ) ) ==> converse( converse( X ) ) }.
% 9.24/9.67 parent0[0]: (2393) {G21,W7,D4,L1,V2,M1} P(52,2342) { join( X, meet( Y, X )
% 9.24/9.67 ) ==> X }.
% 9.24/9.67 parent1[0; 9]: (60588) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) ) ==>
% 9.24/9.67 converse( join( converse( X ), Y ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := converse( X )
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := meet( Y, converse( X ) )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60591) {G1,W9,D6,L1,V2,M1} { join( X, converse( meet( Y,
% 9.24/9.67 converse( X ) ) ) ) ==> X }.
% 9.24/9.67 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 9.24/9.67 parent1[0; 8]: (60590) {G2,W11,D6,L1,V2,M1} { join( X, converse( meet( Y,
% 9.24/9.67 converse( X ) ) ) ) ==> converse( converse( X ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2414) {G22,W9,D6,L1,V2,M1} P(2393,74);d(7) { join( X,
% 9.24/9.67 converse( meet( Y, converse( X ) ) ) ) ==> X }.
% 9.24/9.67 parent0: (60591) {G1,W9,D6,L1,V2,M1} { join( X, converse( meet( Y,
% 9.24/9.67 converse( X ) ) ) ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60593) {G21,W7,D4,L1,V2,M1} { X ==> join( X, meet( Y, X ) ) }.
% 9.24/9.67 parent0[0]: (2393) {G21,W7,D4,L1,V2,M1} P(52,2342) { join( X, meet( Y, X )
% 9.24/9.67 ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60594) {G1,W7,D4,L1,V2,M1} { X ==> join( meet( Y, X ), X ) }.
% 9.24/9.67 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.67 parent1[0; 2]: (60593) {G21,W7,D4,L1,V2,M1} { X ==> join( X, meet( Y, X )
% 9.24/9.67 ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := meet( Y, X )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60597) {G1,W7,D4,L1,V2,M1} { join( meet( Y, X ), X ) ==> X }.
% 9.24/9.67 parent0[0]: (60594) {G1,W7,D4,L1,V2,M1} { X ==> join( meet( Y, X ), X )
% 9.24/9.67 }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2425) {G22,W7,D4,L1,V2,M1} P(2393,0) { join( meet( Y, X ), X
% 9.24/9.67 ) ==> X }.
% 9.24/9.67 parent0: (60597) {G1,W7,D4,L1,V2,M1} { join( meet( Y, X ), X ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60598) {G24,W7,D4,L1,V1,M1} { X ==> meet( X, composition( X, top
% 9.24/9.67 ) ) }.
% 9.24/9.67 parent0[0]: (2339) {G24,W7,D4,L1,V1,M1} P(1680,1001);d(713);d(723) { meet(
% 9.24/9.67 X, composition( X, top ) ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60599) {G2,W7,D4,L1,V1,M1} { X ==> meet( composition( X, top ),
% 9.24/9.67 X ) }.
% 9.24/9.67 parent0[0]: (52) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 9.24/9.67 Y ) }.
% 9.24/9.67 parent1[0; 2]: (60598) {G24,W7,D4,L1,V1,M1} { X ==> meet( X, composition(
% 9.24/9.67 X, top ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := composition( X, top )
% 9.24/9.67 Y := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60602) {G2,W7,D4,L1,V1,M1} { meet( composition( X, top ), X ) ==>
% 9.24/9.67 X }.
% 9.24/9.67 parent0[0]: (60599) {G2,W7,D4,L1,V1,M1} { X ==> meet( composition( X, top
% 9.24/9.67 ), X ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2488) {G25,W7,D4,L1,V1,M1} P(2339,52) { meet( composition( X
% 9.24/9.67 , top ), X ) ==> X }.
% 9.24/9.67 parent0: (60602) {G2,W7,D4,L1,V1,M1} { meet( composition( X, top ), X )
% 9.24/9.67 ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60604) {G17,W10,D5,L1,V2,M1} { join( complement( X ), Y ) ==>
% 9.24/9.67 complement( meet( X, complement( Y ) ) ) }.
% 9.24/9.67 parent0[0]: (1185) {G17,W10,D5,L1,V2,M1} P(723,726) { complement( meet( Y,
% 9.24/9.67 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60606) {G18,W11,D6,L1,V1,M1} { join( complement( composition(
% 9.24/9.67 complement( X ), top ) ), X ) ==> complement( complement( X ) ) }.
% 9.24/9.67 parent0[0]: (2488) {G25,W7,D4,L1,V1,M1} P(2339,52) { meet( composition( X,
% 9.24/9.67 top ), X ) ==> X }.
% 9.24/9.67 parent1[0; 9]: (60604) {G17,W10,D5,L1,V2,M1} { join( complement( X ), Y )
% 9.24/9.67 ==> complement( meet( X, complement( Y ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := complement( X )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := composition( complement( X ), top )
% 9.24/9.67 Y := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60607) {G17,W9,D6,L1,V1,M1} { join( complement( composition(
% 9.24/9.67 complement( X ), top ) ), X ) ==> X }.
% 9.24/9.67 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.67 complement( X ) ) ==> X }.
% 9.24/9.67 parent1[0; 8]: (60606) {G18,W11,D6,L1,V1,M1} { join( complement(
% 9.24/9.67 composition( complement( X ), top ) ), X ) ==> complement( complement( X
% 9.24/9.67 ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2491) {G26,W9,D6,L1,V1,M1} P(2488,1185);d(723) { join(
% 9.24/9.67 complement( composition( complement( X ), top ) ), X ) ==> X }.
% 9.24/9.67 parent0: (60607) {G17,W9,D6,L1,V1,M1} { join( complement( composition(
% 9.24/9.67 complement( X ), top ) ), X ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60609) {G27,W7,D5,L1,V1,M1} { complement( X ) ==> converse(
% 9.24/9.67 complement( converse( X ) ) ) }.
% 9.24/9.67 parent0[0]: (2319) {G27,W7,D5,L1,V1,M1} P(1839,1001);d(713);d(1175) {
% 9.24/9.67 converse( complement( converse( X ) ) ) ==> complement( X ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60611) {G2,W11,D6,L1,V2,M1} { complement( join( X, Y ) ) ==>
% 9.24/9.67 converse( complement( converse( join( Y, X ) ) ) ) }.
% 9.24/9.67 parent0[0]: (73) {G1,W9,D4,L1,V2,M1} P(8,0);d(8) { converse( join( X, Y ) )
% 9.24/9.67 = converse( join( Y, X ) ) }.
% 9.24/9.67 parent1[0; 7]: (60609) {G27,W7,D5,L1,V1,M1} { complement( X ) ==> converse
% 9.24/9.67 ( complement( converse( X ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := join( X, Y )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60613) {G3,W9,D4,L1,V2,M1} { complement( join( X, Y ) ) ==>
% 9.24/9.67 complement( join( Y, X ) ) }.
% 9.24/9.67 parent0[0]: (2319) {G27,W7,D5,L1,V1,M1} P(1839,1001);d(713);d(1175) {
% 9.24/9.67 converse( complement( converse( X ) ) ) ==> complement( X ) }.
% 9.24/9.67 parent1[0; 5]: (60611) {G2,W11,D6,L1,V2,M1} { complement( join( X, Y ) )
% 9.24/9.67 ==> converse( complement( converse( join( Y, X ) ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := join( Y, X )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2525) {G28,W9,D4,L1,V2,M1} P(73,2319);d(2319) { complement(
% 9.24/9.67 join( Y, X ) ) = complement( join( X, Y ) ) }.
% 9.24/9.67 parent0: (60613) {G3,W9,D4,L1,V2,M1} { complement( join( X, Y ) ) ==>
% 9.24/9.67 complement( join( Y, X ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60614) {G27,W7,D5,L1,V1,M1} { complement( X ) ==> converse(
% 9.24/9.67 complement( converse( X ) ) ) }.
% 9.24/9.67 parent0[0]: (2319) {G27,W7,D5,L1,V1,M1} P(1839,1001);d(713);d(1175) {
% 9.24/9.67 converse( complement( converse( X ) ) ) ==> complement( X ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60616) {G1,W7,D4,L1,V1,M1} { complement( converse( X ) ) ==>
% 9.24/9.67 converse( complement( X ) ) }.
% 9.24/9.67 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 9.24/9.67 parent1[0; 6]: (60614) {G27,W7,D5,L1,V1,M1} { complement( X ) ==> converse
% 9.24/9.67 ( complement( converse( X ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := converse( X )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60617) {G1,W7,D4,L1,V1,M1} { converse( complement( X ) ) ==>
% 9.24/9.67 complement( converse( X ) ) }.
% 9.24/9.67 parent0[0]: (60616) {G1,W7,D4,L1,V1,M1} { complement( converse( X ) ) ==>
% 9.24/9.67 converse( complement( X ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2528) {G28,W7,D4,L1,V1,M1} P(2319,7) { converse( complement(
% 9.24/9.67 X ) ) ==> complement( converse( X ) ) }.
% 9.24/9.67 parent0: (60617) {G1,W7,D4,L1,V1,M1} { converse( complement( X ) ) ==>
% 9.24/9.67 complement( converse( X ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60619) {G22,W8,D5,L1,V2,M1} { X ==> meet( X, join( X, complement
% 9.24/9.67 ( Y ) ) ) }.
% 9.24/9.67 parent0[0]: (2348) {G22,W8,D5,L1,V2,M1} P(1330,1001);d(713);d(1184) { meet
% 9.24/9.67 ( X, join( X, complement( Y ) ) ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60620) {G17,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y ) ) }.
% 9.24/9.67 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.67 complement( X ) ) ==> X }.
% 9.24/9.67 parent1[0; 6]: (60619) {G22,W8,D5,L1,V2,M1} { X ==> meet( X, join( X,
% 9.24/9.67 complement( Y ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := complement( Y )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60621) {G17,W7,D4,L1,V2,M1} { meet( X, join( X, Y ) ) ==> X }.
% 9.24/9.67 parent0[0]: (60620) {G17,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y ) )
% 9.24/9.67 }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2572) {G23,W7,D4,L1,V2,M1} P(723,2348) { meet( Y, join( Y, X
% 9.24/9.67 ) ) ==> Y }.
% 9.24/9.67 parent0: (60621) {G17,W7,D4,L1,V2,M1} { meet( X, join( X, Y ) ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60622) {G23,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y ) ) }.
% 9.24/9.67 parent0[0]: (2572) {G23,W7,D4,L1,V2,M1} P(723,2348) { meet( Y, join( Y, X )
% 9.24/9.67 ) ==> Y }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60623) {G2,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X ) }.
% 9.24/9.67 parent0[0]: (52) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 9.24/9.67 Y ) }.
% 9.24/9.67 parent1[0; 2]: (60622) {G23,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y )
% 9.24/9.67 ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := join( X, Y )
% 9.24/9.67 Y := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60626) {G2,W7,D4,L1,V2,M1} { meet( join( X, Y ), X ) ==> X }.
% 9.24/9.67 parent0[0]: (60623) {G2,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X )
% 9.24/9.67 }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2599) {G24,W7,D4,L1,V2,M1} P(2572,52) { meet( join( X, Y ), X
% 9.24/9.67 ) ==> X }.
% 9.24/9.67 parent0: (60626) {G2,W7,D4,L1,V2,M1} { meet( join( X, Y ), X ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60628) {G24,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X ) }.
% 9.24/9.67 parent0[0]: (2599) {G24,W7,D4,L1,V2,M1} P(2572,52) { meet( join( X, Y ), X
% 9.24/9.67 ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60631) {G23,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( Y, meet( X
% 9.24/9.67 , Y ) ) }.
% 9.24/9.67 parent0[0]: (2425) {G22,W7,D4,L1,V2,M1} P(2393,0) { join( meet( Y, X ), X )
% 9.24/9.67 ==> X }.
% 9.24/9.67 parent1[0; 5]: (60628) {G24,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X
% 9.24/9.67 ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := meet( X, Y )
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60632) {G23,W9,D4,L1,V2,M1} { meet( Y, meet( X, Y ) ) ==> meet( X
% 9.24/9.67 , Y ) }.
% 9.24/9.67 parent0[0]: (60631) {G23,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( Y, meet
% 9.24/9.67 ( X, Y ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2607) {G25,W9,D4,L1,V2,M1} P(2425,2599) { meet( Y, meet( X, Y
% 9.24/9.67 ) ) ==> meet( X, Y ) }.
% 9.24/9.67 parent0: (60632) {G23,W9,D4,L1,V2,M1} { meet( Y, meet( X, Y ) ) ==> meet(
% 9.24/9.67 X, Y ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60633) {G24,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X ) }.
% 9.24/9.67 parent0[0]: (2599) {G24,W7,D4,L1,V2,M1} P(2572,52) { meet( join( X, Y ), X
% 9.24/9.67 ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60634) {G1,W7,D4,L1,V2,M1} { X ==> meet( join( Y, X ), X ) }.
% 9.24/9.67 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.67 parent1[0; 3]: (60633) {G24,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X
% 9.24/9.67 ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60637) {G1,W7,D4,L1,V2,M1} { meet( join( Y, X ), X ) ==> X }.
% 9.24/9.67 parent0[0]: (60634) {G1,W7,D4,L1,V2,M1} { X ==> meet( join( Y, X ), X )
% 9.24/9.67 }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2624) {G25,W7,D4,L1,V2,M1} P(0,2599) { meet( join( Y, X ), X
% 9.24/9.67 ) ==> X }.
% 9.24/9.67 parent0: (60637) {G1,W7,D4,L1,V2,M1} { meet( join( Y, X ), X ) ==> X }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60639) {G23,W8,D4,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 9.24/9.67 complement( X ) ) }.
% 9.24/9.67 parent0[0]: (1349) {G23,W8,D4,L1,V2,M1} P(52,1339) { meet( meet( Y, X ),
% 9.24/9.67 complement( Y ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60640) {G24,W8,D5,L1,V2,M1} { zero ==> meet( Y, complement( join
% 9.24/9.67 ( X, Y ) ) ) }.
% 9.24/9.67 parent0[0]: (2624) {G25,W7,D4,L1,V2,M1} P(0,2599) { meet( join( Y, X ), X )
% 9.24/9.67 ==> X }.
% 9.24/9.67 parent1[0; 3]: (60639) {G23,W8,D4,L1,V2,M1} { zero ==> meet( meet( X, Y )
% 9.24/9.67 , complement( X ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := join( X, Y )
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60641) {G24,W8,D5,L1,V2,M1} { meet( X, complement( join( Y, X ) )
% 9.24/9.67 ) ==> zero }.
% 9.24/9.67 parent0[0]: (60640) {G24,W8,D5,L1,V2,M1} { zero ==> meet( Y, complement(
% 9.24/9.67 join( X, Y ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2630) {G26,W8,D5,L1,V2,M1} P(2624,1349) { meet( Y, complement
% 9.24/9.67 ( join( X, Y ) ) ) ==> zero }.
% 9.24/9.67 parent0: (60641) {G24,W8,D5,L1,V2,M1} { meet( X, complement( join( Y, X )
% 9.24/9.67 ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60646) {G19,W12,D6,L1,V3,M1} { complement( join( complement(
% 9.24/9.67 meet( X, Y ) ), join( Y, Z ) ) ) = complement( top ) }.
% 9.24/9.67 parent0[0]: (1215) {G18,W10,D5,L1,V3,M1} P(1180,27);d(298) { join( join( Y
% 9.24/9.67 , Z ), complement( meet( X, Y ) ) ) ==> top }.
% 9.24/9.67 parent1[0; 11]: (2525) {G28,W9,D4,L1,V2,M1} P(73,2319);d(2319) { complement
% 9.24/9.67 ( join( Y, X ) ) = complement( join( X, Y ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := join( Y, Z )
% 9.24/9.67 Y := complement( meet( X, Y ) )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60647) {G2,W11,D6,L1,V3,M1} { complement( join( complement( meet
% 9.24/9.67 ( X, Y ) ), join( Y, Z ) ) ) = zero }.
% 9.24/9.67 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.67 zero }.
% 9.24/9.67 parent1[0; 10]: (60646) {G19,W12,D6,L1,V3,M1} { complement( join(
% 9.24/9.67 complement( meet( X, Y ) ), join( Y, Z ) ) ) = complement( top ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60648) {G3,W10,D5,L1,V3,M1} { meet( meet( X, Y ), complement(
% 9.24/9.67 join( Y, Z ) ) ) = zero }.
% 9.24/9.67 parent0[0]: (741) {G17,W10,D5,L1,V2,M1} P(723,3) { complement( join(
% 9.24/9.67 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 9.24/9.67 parent1[0; 1]: (60647) {G2,W11,D6,L1,V3,M1} { complement( join( complement
% 9.24/9.67 ( meet( X, Y ) ), join( Y, Z ) ) ) = zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := join( Y, Z )
% 9.24/9.67 Y := meet( X, Y )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2877) {G29,W10,D5,L1,V3,M1} P(1215,2525);d(51);d(741) { meet
% 9.24/9.67 ( meet( Z, X ), complement( join( X, Y ) ) ) ==> zero }.
% 9.24/9.67 parent0: (60648) {G3,W10,D5,L1,V3,M1} { meet( meet( X, Y ), complement(
% 9.24/9.67 join( Y, Z ) ) ) = zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Z
% 9.24/9.67 Y := X
% 9.24/9.67 Z := Y
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60654) {G20,W12,D6,L1,V3,M1} { complement( join( complement(
% 9.24/9.67 meet( X, Y ) ), join( Z, Y ) ) ) = complement( top ) }.
% 9.24/9.67 parent0[0]: (1264) {G19,W10,D5,L1,V3,M1} P(1221,27);d(298) { join( join( Z
% 9.24/9.67 , X ), complement( meet( Y, X ) ) ) ==> top }.
% 9.24/9.67 parent1[0; 11]: (2525) {G28,W9,D4,L1,V2,M1} P(73,2319);d(2319) { complement
% 9.24/9.67 ( join( Y, X ) ) = complement( join( X, Y ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := join( Z, Y )
% 9.24/9.67 Y := complement( meet( X, Y ) )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60655) {G2,W11,D6,L1,V3,M1} { complement( join( complement( meet
% 9.24/9.67 ( X, Y ) ), join( Z, Y ) ) ) = zero }.
% 9.24/9.67 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.67 zero }.
% 9.24/9.67 parent1[0; 10]: (60654) {G20,W12,D6,L1,V3,M1} { complement( join(
% 9.24/9.67 complement( meet( X, Y ) ), join( Z, Y ) ) ) = complement( top ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60656) {G3,W10,D5,L1,V3,M1} { meet( meet( X, Y ), complement(
% 9.24/9.67 join( Z, Y ) ) ) = zero }.
% 9.24/9.67 parent0[0]: (741) {G17,W10,D5,L1,V2,M1} P(723,3) { complement( join(
% 9.24/9.67 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 9.24/9.67 parent1[0; 1]: (60655) {G2,W11,D6,L1,V3,M1} { complement( join( complement
% 9.24/9.67 ( meet( X, Y ) ), join( Z, Y ) ) ) = zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := join( Z, Y )
% 9.24/9.67 Y := meet( X, Y )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (2880) {G29,W10,D5,L1,V3,M1} P(1264,2525);d(51);d(741) { meet
% 9.24/9.67 ( meet( Z, Y ), complement( join( X, Y ) ) ) ==> zero }.
% 9.24/9.67 parent0: (60656) {G3,W10,D5,L1,V3,M1} { meet( meet( X, Y ), complement(
% 9.24/9.67 join( Z, Y ) ) ) = zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Z
% 9.24/9.67 Y := Y
% 9.24/9.67 Z := X
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60659) {G29,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, Y ),
% 9.24/9.67 complement( join( Y, Z ) ) ) }.
% 9.24/9.67 parent0[0]: (2877) {G29,W10,D5,L1,V3,M1} P(1215,2525);d(51);d(741) { meet(
% 9.24/9.67 meet( Z, X ), complement( join( X, Y ) ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := Z
% 9.24/9.67 Z := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60662) {G22,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, meet( Y,
% 9.24/9.67 Z ) ), complement( Y ) ) }.
% 9.24/9.67 parent0[0]: (2394) {G21,W7,D4,L1,V2,M1} P(2342,0) { join( meet( X, Y ), X )
% 9.24/9.67 ==> X }.
% 9.24/9.67 parent1[0; 9]: (60659) {G29,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, Y )
% 9.24/9.67 , complement( join( Y, Z ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := Z
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := meet( Y, Z )
% 9.24/9.67 Z := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60663) {G22,W10,D5,L1,V3,M1} { meet( meet( X, meet( Y, Z ) ),
% 9.24/9.67 complement( Y ) ) ==> zero }.
% 9.24/9.67 parent0[0]: (60662) {G22,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, meet(
% 9.24/9.67 Y, Z ) ), complement( Y ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (4371) {G30,W10,D5,L1,V3,M1} P(2394,2877) { meet( meet( Z,
% 9.24/9.67 meet( X, Y ) ), complement( X ) ) ==> zero }.
% 9.24/9.67 parent0: (60663) {G22,W10,D5,L1,V3,M1} { meet( meet( X, meet( Y, Z ) ),
% 9.24/9.67 complement( Y ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Z
% 9.24/9.67 Y := X
% 9.24/9.67 Z := Y
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60665) {G30,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, meet( Y, Z
% 9.24/9.67 ) ), complement( Y ) ) }.
% 9.24/9.67 parent0[0]: (4371) {G30,W10,D5,L1,V3,M1} P(2394,2877) { meet( meet( Z, meet
% 9.24/9.67 ( X, Y ) ), complement( X ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := Z
% 9.24/9.67 Z := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60675) {G26,W10,D5,L1,V3,M1} { zero ==> meet( meet( meet( X, Y )
% 9.24/9.67 , Z ), complement( X ) ) }.
% 9.24/9.67 parent0[0]: (2352) {G25,W9,D4,L1,V2,M1} P(1351,1001);d(712);d(723) { meet(
% 9.24/9.67 meet( X, Y ), X ) ==> meet( X, Y ) }.
% 9.24/9.67 parent1[0; 3]: (60665) {G30,W10,D5,L1,V3,M1} { zero ==> meet( meet( X,
% 9.24/9.67 meet( Y, Z ) ), complement( Y ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( X, Y )
% 9.24/9.67 Y := Z
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := meet( meet( X, Y ), Z )
% 9.24/9.67 Y := X
% 9.24/9.67 Z := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60678) {G26,W10,D5,L1,V3,M1} { meet( meet( meet( X, Y ), Z ),
% 9.24/9.67 complement( X ) ) ==> zero }.
% 9.24/9.67 parent0[0]: (60675) {G26,W10,D5,L1,V3,M1} { zero ==> meet( meet( meet( X,
% 9.24/9.67 Y ), Z ), complement( X ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (4423) {G31,W10,D5,L1,V3,M1} P(2352,4371) { meet( meet( meet(
% 9.24/9.67 X, Y ), Z ), complement( X ) ) ==> zero }.
% 9.24/9.67 parent0: (60678) {G26,W10,D5,L1,V3,M1} { meet( meet( meet( X, Y ), Z ),
% 9.24/9.67 complement( X ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60681) {G31,W10,D5,L1,V3,M1} { zero ==> meet( meet( meet( X, Y )
% 9.24/9.67 , Z ), complement( X ) ) }.
% 9.24/9.67 parent0[0]: (4423) {G31,W10,D5,L1,V3,M1} P(2352,4371) { meet( meet( meet( X
% 9.24/9.67 , Y ), Z ), complement( X ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60689) {G26,W10,D5,L1,V3,M1} { zero ==> meet( meet( meet( Y, X )
% 9.24/9.67 , Z ), complement( X ) ) }.
% 9.24/9.67 parent0[0]: (2607) {G25,W9,D4,L1,V2,M1} P(2425,2599) { meet( Y, meet( X, Y
% 9.24/9.67 ) ) ==> meet( X, Y ) }.
% 9.24/9.67 parent1[0; 4]: (60681) {G31,W10,D5,L1,V3,M1} { zero ==> meet( meet( meet(
% 9.24/9.67 X, Y ), Z ), complement( X ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := meet( Y, X )
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60691) {G26,W10,D5,L1,V3,M1} { meet( meet( meet( X, Y ), Z ),
% 9.24/9.67 complement( Y ) ) ==> zero }.
% 9.24/9.67 parent0[0]: (60689) {G26,W10,D5,L1,V3,M1} { zero ==> meet( meet( meet( Y,
% 9.24/9.67 X ), Z ), complement( X ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (4519) {G32,W10,D5,L1,V3,M1} P(2607,4423) { meet( meet( meet(
% 9.24/9.67 Y, X ), Z ), complement( X ) ) ==> zero }.
% 9.24/9.67 parent0: (60691) {G26,W10,D5,L1,V3,M1} { meet( meet( meet( X, Y ), Z ),
% 9.24/9.67 complement( Y ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60693) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 9.24/9.67 complement( meet( Y, X ) ) ) }.
% 9.24/9.67 parent0[0]: (1322) {G18,W10,D5,L1,V2,M1} P(1195,12) { meet( meet( X, Y ),
% 9.24/9.67 complement( meet( Y, X ) ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60699) {G19,W13,D6,L1,V3,M1} { zero ==> meet( meet( complement(
% 9.24/9.67 X ), meet( meet( Y, X ), Z ) ), complement( zero ) ) }.
% 9.24/9.67 parent0[0]: (4519) {G32,W10,D5,L1,V3,M1} P(2607,4423) { meet( meet( meet( Y
% 9.24/9.67 , X ), Z ), complement( X ) ) ==> zero }.
% 9.24/9.67 parent1[0; 12]: (60693) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y
% 9.24/9.67 ), complement( meet( Y, X ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := complement( X )
% 9.24/9.67 Y := meet( meet( Y, X ), Z )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60700) {G14,W12,D6,L1,V3,M1} { zero ==> meet( meet( complement(
% 9.24/9.67 X ), meet( meet( Y, X ), Z ) ), top ) }.
% 9.24/9.67 parent0[0]: (336) {G13,W4,D3,L1,V0,M1} P(329,10) { complement( zero ) ==>
% 9.24/9.67 top }.
% 9.24/9.67 parent1[0; 11]: (60699) {G19,W13,D6,L1,V3,M1} { zero ==> meet( meet(
% 9.24/9.67 complement( X ), meet( meet( Y, X ), Z ) ), complement( zero ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60701) {G15,W10,D5,L1,V3,M1} { zero ==> meet( complement( X ),
% 9.24/9.67 meet( meet( Y, X ), Z ) ) }.
% 9.24/9.67 parent0[0]: (748) {G17,W5,D3,L1,V1,M1} S(716);d(723) { meet( X, top ) ==> X
% 9.24/9.67 }.
% 9.24/9.67 parent1[0; 2]: (60700) {G14,W12,D6,L1,V3,M1} { zero ==> meet( meet(
% 9.24/9.67 complement( X ), meet( meet( Y, X ), Z ) ), top ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := meet( complement( X ), meet( meet( Y, X ), Z ) )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60702) {G15,W10,D5,L1,V3,M1} { meet( complement( X ), meet( meet
% 9.24/9.67 ( Y, X ), Z ) ) ==> zero }.
% 9.24/9.67 parent0[0]: (60701) {G15,W10,D5,L1,V3,M1} { zero ==> meet( complement( X )
% 9.24/9.67 , meet( meet( Y, X ), Z ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (4538) {G33,W10,D5,L1,V3,M1} P(4519,1322);d(336);d(748) { meet
% 9.24/9.67 ( complement( Y ), meet( meet( X, Y ), Z ) ) ==> zero }.
% 9.24/9.67 parent0: (60702) {G15,W10,D5,L1,V3,M1} { meet( complement( X ), meet( meet
% 9.24/9.67 ( Y, X ), Z ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60704) {G33,W10,D5,L1,V3,M1} { zero ==> meet( complement( X ),
% 9.24/9.67 meet( meet( Y, X ), Z ) ) }.
% 9.24/9.67 parent0[0]: (4538) {G33,W10,D5,L1,V3,M1} P(4519,1322);d(336);d(748) { meet
% 9.24/9.67 ( complement( Y ), meet( meet( X, Y ), Z ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60714) {G26,W10,D5,L1,V3,M1} { zero ==> meet( complement( X ),
% 9.24/9.67 meet( Z, meet( Y, X ) ) ) }.
% 9.24/9.67 parent0[0]: (2607) {G25,W9,D4,L1,V2,M1} P(2425,2599) { meet( Y, meet( X, Y
% 9.24/9.67 ) ) ==> meet( X, Y ) }.
% 9.24/9.67 parent1[0; 5]: (60704) {G33,W10,D5,L1,V3,M1} { zero ==> meet( complement(
% 9.24/9.67 X ), meet( meet( Y, X ), Z ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Z
% 9.24/9.67 Y := meet( Y, X )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 Z := meet( Z, meet( Y, X ) )
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60717) {G26,W10,D5,L1,V3,M1} { meet( complement( X ), meet( Y,
% 9.24/9.67 meet( Z, X ) ) ) ==> zero }.
% 9.24/9.67 parent0[0]: (60714) {G26,W10,D5,L1,V3,M1} { zero ==> meet( complement( X )
% 9.24/9.67 , meet( Z, meet( Y, X ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Z
% 9.24/9.67 Z := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (4578) {G34,W10,D5,L1,V3,M1} P(2607,4538) { meet( complement(
% 9.24/9.67 Y ), meet( Z, meet( X, Y ) ) ) ==> zero }.
% 9.24/9.67 parent0: (60717) {G26,W10,D5,L1,V3,M1} { meet( complement( X ), meet( Y,
% 9.24/9.67 meet( Z, X ) ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := Z
% 9.24/9.67 Z := X
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60720) {G33,W10,D5,L1,V3,M1} { zero ==> meet( complement( X ),
% 9.24/9.67 meet( meet( Y, X ), Z ) ) }.
% 9.24/9.67 parent0[0]: (4538) {G33,W10,D5,L1,V3,M1} P(4519,1322);d(336);d(748) { meet
% 9.24/9.67 ( complement( Y ), meet( meet( X, Y ), Z ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Y
% 9.24/9.67 Y := X
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60721) {G17,W10,D6,L1,V3,M1} { zero ==> meet( X, meet( meet( Y,
% 9.24/9.67 complement( X ) ), Z ) ) }.
% 9.24/9.67 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.67 complement( X ) ) ==> X }.
% 9.24/9.67 parent1[0; 3]: (60720) {G33,W10,D5,L1,V3,M1} { zero ==> meet( complement(
% 9.24/9.67 X ), meet( meet( Y, X ), Z ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := complement( X )
% 9.24/9.67 Y := Y
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60722) {G17,W10,D6,L1,V3,M1} { meet( X, meet( meet( Y, complement
% 9.24/9.67 ( X ) ), Z ) ) ==> zero }.
% 9.24/9.67 parent0[0]: (60721) {G17,W10,D6,L1,V3,M1} { zero ==> meet( X, meet( meet(
% 9.24/9.67 Y, complement( X ) ), Z ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (4595) {G34,W10,D6,L1,V3,M1} P(723,4538) { meet( X, meet( meet
% 9.24/9.67 ( Y, complement( X ) ), Z ) ) ==> zero }.
% 9.24/9.67 parent0: (60722) {G17,W10,D6,L1,V3,M1} { meet( X, meet( meet( Y,
% 9.24/9.67 complement( X ) ), Z ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 Y := Y
% 9.24/9.67 Z := Z
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60724) {G34,W10,D5,L1,V3,M1} { zero ==> meet( complement( X ),
% 9.24/9.67 meet( Y, meet( Z, X ) ) ) }.
% 9.24/9.67 parent0[0]: (4578) {G34,W10,D5,L1,V3,M1} P(2607,4538) { meet( complement( Y
% 9.24/9.67 ), meet( Z, meet( X, Y ) ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := Z
% 9.24/9.67 Y := X
% 9.24/9.67 Z := Y
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60726) {G30,W12,D7,L1,V1,M1} { zero ==> meet( complement(
% 9.24/9.67 complement( composition( complement( one ), skol1 ) ) ), meet( X, one ) )
% 9.24/9.67 }.
% 9.24/9.67 parent0[0]: (2333) {G29,W9,D6,L1,V0,M1} P(1756,1001);d(713) { meet( one,
% 9.24/9.67 complement( composition( complement( one ), skol1 ) ) ) ==> one }.
% 9.24/9.67 parent1[0; 11]: (60724) {G34,W10,D5,L1,V3,M1} { zero ==> meet( complement
% 9.24/9.67 ( X ), meet( Y, meet( Z, X ) ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := complement( composition( complement( one ), skol1 ) )
% 9.24/9.67 Y := X
% 9.24/9.67 Z := one
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 paramod: (60727) {G17,W10,D5,L1,V1,M1} { zero ==> meet( composition(
% 9.24/9.67 complement( one ), skol1 ), meet( X, one ) ) }.
% 9.24/9.67 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.67 complement( X ) ) ==> X }.
% 9.24/9.67 parent1[0; 3]: (60726) {G30,W12,D7,L1,V1,M1} { zero ==> meet( complement(
% 9.24/9.67 complement( composition( complement( one ), skol1 ) ) ), meet( X, one ) )
% 9.24/9.67 }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := composition( complement( one ), skol1 )
% 9.24/9.67 end
% 9.24/9.67 substitution1:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60728) {G17,W10,D5,L1,V1,M1} { meet( composition( complement( one
% 9.24/9.67 ), skol1 ), meet( X, one ) ) ==> zero }.
% 9.24/9.67 parent0[0]: (60727) {G17,W10,D5,L1,V1,M1} { zero ==> meet( composition(
% 9.24/9.67 complement( one ), skol1 ), meet( X, one ) ) }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 subsumption: (4597) {G35,W10,D5,L1,V1,M1} P(2333,4578);d(723) { meet(
% 9.24/9.67 composition( complement( one ), skol1 ), meet( X, one ) ) ==> zero }.
% 9.24/9.67 parent0: (60728) {G17,W10,D5,L1,V1,M1} { meet( composition( complement(
% 9.24/9.67 one ), skol1 ), meet( X, one ) ) ==> zero }.
% 9.24/9.67 substitution0:
% 9.24/9.67 X := X
% 9.24/9.67 end
% 9.24/9.67 permutation0:
% 9.24/9.67 0 ==> 0
% 9.24/9.67 end
% 9.24/9.67
% 9.24/9.67 eqswap: (60730) {G34,W10,D5,L1,V3,M1} { zero ==> meet( complement( X ),
% 9.24/9.67 meet( Y, meet( Z, X ) ) ) }.
% 9.24/9.67 parent0[0]: (4578) {G34,W10,D5,L1,V3,M1} P(2607,4538) { meet( complement( Y
% 9.24/9.68 ), meet( Z, meet( X, Y ) ) ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Z
% 9.24/9.68 Y := X
% 9.24/9.68 Z := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60732) {G30,W12,D7,L1,V1,M1} { zero ==> meet( complement(
% 9.24/9.68 complement( composition( complement( one ), skol2 ) ) ), meet( X, one ) )
% 9.24/9.68 }.
% 9.24/9.68 parent0[0]: (2327) {G29,W9,D6,L1,V0,M1} P(1761,1001);d(713) { meet( one,
% 9.24/9.68 complement( composition( complement( one ), skol2 ) ) ) ==> one }.
% 9.24/9.68 parent1[0; 11]: (60730) {G34,W10,D5,L1,V3,M1} { zero ==> meet( complement
% 9.24/9.68 ( X ), meet( Y, meet( Z, X ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := complement( composition( complement( one ), skol2 ) )
% 9.24/9.68 Y := X
% 9.24/9.68 Z := one
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60733) {G17,W10,D5,L1,V1,M1} { zero ==> meet( composition(
% 9.24/9.68 complement( one ), skol2 ), meet( X, one ) ) }.
% 9.24/9.68 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.68 complement( X ) ) ==> X }.
% 9.24/9.68 parent1[0; 3]: (60732) {G30,W12,D7,L1,V1,M1} { zero ==> meet( complement(
% 9.24/9.68 complement( composition( complement( one ), skol2 ) ) ), meet( X, one ) )
% 9.24/9.68 }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := composition( complement( one ), skol2 )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60734) {G17,W10,D5,L1,V1,M1} { meet( composition( complement( one
% 9.24/9.68 ), skol2 ), meet( X, one ) ) ==> zero }.
% 9.24/9.68 parent0[0]: (60733) {G17,W10,D5,L1,V1,M1} { zero ==> meet( composition(
% 9.24/9.68 complement( one ), skol2 ), meet( X, one ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (4599) {G35,W10,D5,L1,V1,M1} P(2327,4578);d(723) { meet(
% 9.24/9.68 composition( complement( one ), skol2 ), meet( X, one ) ) ==> zero }.
% 9.24/9.68 parent0: (60734) {G17,W10,D5,L1,V1,M1} { meet( composition( complement(
% 9.24/9.68 one ), skol2 ), meet( X, one ) ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60736) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet( X
% 9.24/9.68 , complement( Y ) ) ) }.
% 9.24/9.68 parent0[0]: (1001) {G18,W10,D5,L1,V2,M1} S(37);d(741) { join( meet( X, Y )
% 9.24/9.68 , meet( X, complement( Y ) ) ) ==> X }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60740) {G19,W15,D7,L1,V3,M1} { meet( X, Y ) ==> join( zero, meet
% 9.24/9.68 ( meet( X, Y ), complement( complement( join( Z, Y ) ) ) ) ) }.
% 9.24/9.68 parent0[0]: (2880) {G29,W10,D5,L1,V3,M1} P(1264,2525);d(51);d(741) { meet(
% 9.24/9.68 meet( Z, Y ), complement( join( X, Y ) ) ) ==> zero }.
% 9.24/9.68 parent1[0; 5]: (60736) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.68 meet( X, complement( Y ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Z
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := meet( X, Y )
% 9.24/9.68 Y := complement( join( Z, Y ) )
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60742) {G16,W13,D6,L1,V3,M1} { meet( X, Y ) ==> meet( meet( X, Y
% 9.24/9.68 ), complement( complement( join( Z, Y ) ) ) ) }.
% 9.24/9.68 parent0[0]: (713) {G15,W5,D3,L1,V1,M1} P(321,27);d(712);d(712) { join( zero
% 9.24/9.68 , X ) ==> X }.
% 9.24/9.68 parent1[0; 4]: (60740) {G19,W15,D7,L1,V3,M1} { meet( X, Y ) ==> join( zero
% 9.24/9.68 , meet( meet( X, Y ), complement( complement( join( Z, Y ) ) ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := meet( meet( X, Y ), complement( complement( join( Z, Y ) ) ) )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60743) {G17,W11,D4,L1,V3,M1} { meet( X, Y ) ==> meet( meet( X, Y
% 9.24/9.68 ), join( Z, Y ) ) }.
% 9.24/9.68 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.68 complement( X ) ) ==> X }.
% 9.24/9.68 parent1[0; 8]: (60742) {G16,W13,D6,L1,V3,M1} { meet( X, Y ) ==> meet( meet
% 9.24/9.68 ( X, Y ), complement( complement( join( Z, Y ) ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := join( Z, Y )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60744) {G17,W11,D4,L1,V3,M1} { meet( meet( X, Y ), join( Z, Y ) )
% 9.24/9.68 ==> meet( X, Y ) }.
% 9.24/9.68 parent0[0]: (60743) {G17,W11,D4,L1,V3,M1} { meet( X, Y ) ==> meet( meet( X
% 9.24/9.68 , Y ), join( Z, Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (5083) {G30,W11,D4,L1,V3,M1} P(2880,1001);d(713);d(723) { meet
% 9.24/9.68 ( meet( X, Y ), join( Z, Y ) ) ==> meet( X, Y ) }.
% 9.24/9.68 parent0: (60744) {G17,W11,D4,L1,V3,M1} { meet( meet( X, Y ), join( Z, Y )
% 9.24/9.68 ) ==> meet( X, Y ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60745) {G19,W10,D5,L1,V2,M1} { Y ==> join( meet( X, Y ), meet( Y
% 9.24/9.68 , complement( X ) ) ) }.
% 9.24/9.68 parent0[0]: (2364) {G19,W10,D5,L1,V2,M1} P(52,1001) { join( meet( Y, X ),
% 9.24/9.68 meet( X, complement( Y ) ) ) ==> X }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60746) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement( Y
% 9.24/9.68 ) ), meet( Y, X ) ) }.
% 9.24/9.68 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.68 parent1[0; 2]: (60745) {G19,W10,D5,L1,V2,M1} { Y ==> join( meet( X, Y ),
% 9.24/9.68 meet( Y, complement( X ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := meet( Y, X )
% 9.24/9.68 Y := meet( X, complement( Y ) )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60749) {G1,W10,D5,L1,V2,M1} { join( meet( X, complement( Y ) ),
% 9.24/9.68 meet( Y, X ) ) ==> X }.
% 9.24/9.68 parent0[0]: (60746) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement
% 9.24/9.68 ( Y ) ), meet( Y, X ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (5815) {G20,W10,D5,L1,V2,M1} P(2364,0) { join( meet( Y,
% 9.24/9.68 complement( X ) ), meet( X, Y ) ) ==> Y }.
% 9.24/9.68 parent0: (60749) {G1,W10,D5,L1,V2,M1} { join( meet( X, complement( Y ) ),
% 9.24/9.68 meet( Y, X ) ) ==> X }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60751) {G17,W10,D5,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 9.24/9.68 complement( join( X, complement( Y ) ) ) }.
% 9.24/9.68 parent0[0]: (740) {G17,W10,D5,L1,V2,M1} P(723,3) { complement( join( X,
% 9.24/9.68 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60755) {G17,W10,D4,L1,V2,M1} { meet( complement( X ), complement
% 9.24/9.68 ( Y ) ) ==> complement( join( X, Y ) ) }.
% 9.24/9.68 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.68 complement( X ) ) ==> X }.
% 9.24/9.68 parent1[0; 9]: (60751) {G17,W10,D5,L1,V2,M1} { meet( complement( X ), Y )
% 9.24/9.68 ==> complement( join( X, complement( Y ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := complement( Y )
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (6091) {G18,W10,D4,L1,V2,M1} P(723,740) { meet( complement( Y
% 9.24/9.68 ), complement( X ) ) ==> complement( join( Y, X ) ) }.
% 9.24/9.68 parent0: (60755) {G17,W10,D4,L1,V2,M1} { meet( complement( X ), complement
% 9.24/9.68 ( Y ) ) ==> complement( join( X, Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60758) {G17,W10,D5,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 9.24/9.68 complement( join( X, complement( Y ) ) ) }.
% 9.24/9.68 parent0[0]: (740) {G17,W10,D5,L1,V2,M1} P(723,3) { complement( join( X,
% 9.24/9.68 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60759) {G2,W14,D6,L1,V3,M1} { meet( complement( join( X, Y ) ),
% 9.24/9.68 Z ) ==> complement( join( join( X, complement( Z ) ), Y ) ) }.
% 9.24/9.68 parent0[0]: (28) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X )
% 9.24/9.68 = join( join( Z, X ), Y ) }.
% 9.24/9.68 parent1[0; 8]: (60758) {G17,W10,D5,L1,V2,M1} { meet( complement( X ), Y )
% 9.24/9.68 ==> complement( join( X, complement( Y ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := complement( Z )
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := join( X, Y )
% 9.24/9.68 Y := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60762) {G2,W14,D6,L1,V3,M1} { complement( join( join( X,
% 9.24/9.68 complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 9.24/9.68 parent0[0]: (60759) {G2,W14,D6,L1,V3,M1} { meet( complement( join( X, Y )
% 9.24/9.68 ), Z ) ==> complement( join( join( X, complement( Z ) ), Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (6092) {G18,W14,D6,L1,V3,M1} P(28,740) { complement( join(
% 9.24/9.68 join( X, complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z
% 9.24/9.68 ) }.
% 9.24/9.68 parent0: (60762) {G2,W14,D6,L1,V3,M1} { complement( join( join( X,
% 9.24/9.68 complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60764) {G18,W10,D4,L1,V2,M1} { complement( join( X, Y ) ) ==>
% 9.24/9.68 meet( complement( X ), complement( Y ) ) }.
% 9.24/9.68 parent0[0]: (6091) {G18,W10,D4,L1,V2,M1} P(723,740) { meet( complement( Y )
% 9.24/9.68 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60768) {G18,W15,D6,L1,V3,M1} { complement( join( join( X,
% 9.24/9.68 complement( Y ) ), Z ) ) ==> meet( meet( complement( X ), Y ), complement
% 9.24/9.68 ( Z ) ) }.
% 9.24/9.68 parent0[0]: (740) {G17,W10,D5,L1,V2,M1} P(723,3) { complement( join( X,
% 9.24/9.68 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 9.24/9.68 parent1[0; 9]: (60764) {G18,W10,D4,L1,V2,M1} { complement( join( X, Y ) )
% 9.24/9.68 ==> meet( complement( X ), complement( Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := join( X, complement( Y ) )
% 9.24/9.68 Y := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60770) {G19,W14,D5,L1,V3,M1} { meet( complement( join( X, Z ) )
% 9.24/9.68 , Y ) ==> meet( meet( complement( X ), Y ), complement( Z ) ) }.
% 9.24/9.68 parent0[0]: (6092) {G18,W14,D6,L1,V3,M1} P(28,740) { complement( join( join
% 9.24/9.68 ( X, complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z )
% 9.24/9.68 }.
% 9.24/9.68 parent1[0; 1]: (60768) {G18,W15,D6,L1,V3,M1} { complement( join( join( X,
% 9.24/9.68 complement( Y ) ), Z ) ) ==> meet( meet( complement( X ), Y ), complement
% 9.24/9.68 ( Z ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Z
% 9.24/9.68 Z := Y
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60771) {G19,W14,D5,L1,V3,M1} { meet( meet( complement( X ), Z ),
% 9.24/9.68 complement( Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 9.24/9.68 parent0[0]: (60770) {G19,W14,D5,L1,V3,M1} { meet( complement( join( X, Z )
% 9.24/9.68 ), Y ) ==> meet( meet( complement( X ), Y ), complement( Z ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Z
% 9.24/9.68 Z := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (6094) {G19,W14,D5,L1,V3,M1} P(740,6091);d(6092) { meet( meet
% 9.24/9.68 ( complement( X ), Y ), complement( Z ) ) ==> meet( complement( join( X,
% 9.24/9.68 Z ) ), Y ) }.
% 9.24/9.68 parent0: (60771) {G19,W14,D5,L1,V3,M1} { meet( meet( complement( X ), Z )
% 9.24/9.68 , complement( Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Z
% 9.24/9.68 Z := Y
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60773) {G18,W10,D4,L1,V2,M1} { complement( join( X, Y ) ) ==>
% 9.24/9.68 meet( complement( X ), complement( Y ) ) }.
% 9.24/9.68 parent0[0]: (6091) {G18,W10,D4,L1,V2,M1} P(723,740) { meet( complement( Y )
% 9.24/9.68 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60776) {G18,W15,D6,L1,V3,M1} { complement( join( meet( X,
% 9.24/9.68 complement( Y ) ), Z ) ) ==> meet( join( complement( X ), Y ), complement
% 9.24/9.68 ( Z ) ) }.
% 9.24/9.68 parent0[0]: (1185) {G17,W10,D5,L1,V2,M1} P(723,726) { complement( meet( Y,
% 9.24/9.68 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 9.24/9.68 parent1[0; 9]: (60773) {G18,W10,D4,L1,V2,M1} { complement( join( X, Y ) )
% 9.24/9.68 ==> meet( complement( X ), complement( Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := meet( X, complement( Y ) )
% 9.24/9.68 Y := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60778) {G18,W15,D6,L1,V3,M1} { meet( join( complement( X ), Y ),
% 9.24/9.68 complement( Z ) ) ==> complement( join( meet( X, complement( Y ) ), Z ) )
% 9.24/9.68 }.
% 9.24/9.68 parent0[0]: (60776) {G18,W15,D6,L1,V3,M1} { complement( join( meet( X,
% 9.24/9.68 complement( Y ) ), Z ) ) ==> meet( join( complement( X ), Y ), complement
% 9.24/9.68 ( Z ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (6102) {G19,W15,D6,L1,V3,M1} P(1185,6091) { meet( join(
% 9.24/9.68 complement( X ), Y ), complement( Z ) ) ==> complement( join( meet( X,
% 9.24/9.68 complement( Y ) ), Z ) ) }.
% 9.24/9.68 parent0: (60778) {G18,W15,D6,L1,V3,M1} { meet( join( complement( X ), Y )
% 9.24/9.68 , complement( Z ) ) ==> complement( join( meet( X, complement( Y ) ), Z )
% 9.24/9.68 ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60781) {G35,W10,D5,L1,V1,M1} { zero ==> meet( composition(
% 9.24/9.68 complement( one ), skol1 ), meet( X, one ) ) }.
% 9.24/9.68 parent0[0]: (4597) {G35,W10,D5,L1,V1,M1} P(2333,4578);d(723) { meet(
% 9.24/9.68 composition( complement( one ), skol1 ), meet( X, one ) ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60782) {G16,W8,D5,L1,V0,M1} { zero ==> meet( composition(
% 9.24/9.68 complement( one ), skol1 ), skol1 ) }.
% 9.24/9.68 parent0[0]: (720) {G15,W5,D3,L1,V0,M1} P(712,300) { meet( skol1, one ) ==>
% 9.24/9.68 skol1 }.
% 9.24/9.68 parent1[0; 7]: (60781) {G35,W10,D5,L1,V1,M1} { zero ==> meet( composition
% 9.24/9.68 ( complement( one ), skol1 ), meet( X, one ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := skol1
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60783) {G16,W8,D5,L1,V0,M1} { meet( composition( complement( one
% 9.24/9.68 ), skol1 ), skol1 ) ==> zero }.
% 9.24/9.68 parent0[0]: (60782) {G16,W8,D5,L1,V0,M1} { zero ==> meet( composition(
% 9.24/9.68 complement( one ), skol1 ), skol1 ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (6736) {G36,W8,D5,L1,V0,M1} P(720,4597) { meet( composition(
% 9.24/9.68 complement( one ), skol1 ), skol1 ) ==> zero }.
% 9.24/9.68 parent0: (60783) {G16,W8,D5,L1,V0,M1} { meet( composition( complement( one
% 9.24/9.68 ), skol1 ), skol1 ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60785) {G35,W10,D5,L1,V1,M1} { zero ==> meet( composition(
% 9.24/9.68 complement( one ), skol1 ), meet( X, one ) ) }.
% 9.24/9.68 parent0[0]: (4597) {G35,W10,D5,L1,V1,M1} P(2333,4578);d(723) { meet(
% 9.24/9.68 composition( complement( one ), skol1 ), meet( X, one ) ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60786) {G16,W8,D5,L1,V0,M1} { zero ==> meet( composition(
% 9.24/9.68 complement( one ), skol1 ), skol2 ) }.
% 9.24/9.68 parent0[0]: (718) {G15,W5,D3,L1,V0,M1} P(712,302) { meet( skol2, one ) ==>
% 9.24/9.68 skol2 }.
% 9.24/9.68 parent1[0; 7]: (60785) {G35,W10,D5,L1,V1,M1} { zero ==> meet( composition
% 9.24/9.68 ( complement( one ), skol1 ), meet( X, one ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := skol2
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60787) {G16,W8,D5,L1,V0,M1} { meet( composition( complement( one
% 9.24/9.68 ), skol1 ), skol2 ) ==> zero }.
% 9.24/9.68 parent0[0]: (60786) {G16,W8,D5,L1,V0,M1} { zero ==> meet( composition(
% 9.24/9.68 complement( one ), skol1 ), skol2 ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (6737) {G36,W8,D5,L1,V0,M1} P(718,4597) { meet( composition(
% 9.24/9.68 complement( one ), skol1 ), skol2 ) ==> zero }.
% 9.24/9.68 parent0: (60787) {G16,W8,D5,L1,V0,M1} { meet( composition( complement( one
% 9.24/9.68 ), skol1 ), skol2 ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60789) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 9.24/9.68 complement( meet( Y, X ) ) ) }.
% 9.24/9.68 parent0[0]: (1322) {G18,W10,D5,L1,V2,M1} P(1195,12) { meet( meet( X, Y ),
% 9.24/9.68 complement( meet( Y, X ) ) ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60793) {G19,W11,D6,L1,V0,M1} { zero ==> meet( meet( skol1,
% 9.24/9.68 composition( complement( one ), skol1 ) ), complement( zero ) ) }.
% 9.24/9.68 parent0[0]: (6736) {G36,W8,D5,L1,V0,M1} P(720,4597) { meet( composition(
% 9.24/9.68 complement( one ), skol1 ), skol1 ) ==> zero }.
% 9.24/9.68 parent1[0; 10]: (60789) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y
% 9.24/9.68 ), complement( meet( Y, X ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := skol1
% 9.24/9.68 Y := composition( complement( one ), skol1 )
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60794) {G14,W10,D6,L1,V0,M1} { zero ==> meet( meet( skol1,
% 9.24/9.68 composition( complement( one ), skol1 ) ), top ) }.
% 9.24/9.68 parent0[0]: (336) {G13,W4,D3,L1,V0,M1} P(329,10) { complement( zero ) ==>
% 9.24/9.68 top }.
% 9.24/9.68 parent1[0; 9]: (60793) {G19,W11,D6,L1,V0,M1} { zero ==> meet( meet( skol1
% 9.24/9.68 , composition( complement( one ), skol1 ) ), complement( zero ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60795) {G15,W8,D5,L1,V0,M1} { zero ==> meet( skol1, composition
% 9.24/9.68 ( complement( one ), skol1 ) ) }.
% 9.24/9.68 parent0[0]: (748) {G17,W5,D3,L1,V1,M1} S(716);d(723) { meet( X, top ) ==> X
% 9.24/9.68 }.
% 9.24/9.68 parent1[0; 2]: (60794) {G14,W10,D6,L1,V0,M1} { zero ==> meet( meet( skol1
% 9.24/9.68 , composition( complement( one ), skol1 ) ), top ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := meet( skol1, composition( complement( one ), skol1 ) )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60796) {G15,W8,D5,L1,V0,M1} { meet( skol1, composition(
% 9.24/9.68 complement( one ), skol1 ) ) ==> zero }.
% 9.24/9.68 parent0[0]: (60795) {G15,W8,D5,L1,V0,M1} { zero ==> meet( skol1,
% 9.24/9.68 composition( complement( one ), skol1 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (6742) {G37,W8,D5,L1,V0,M1} P(6736,1322);d(336);d(748) { meet
% 9.24/9.68 ( skol1, composition( complement( one ), skol1 ) ) ==> zero }.
% 9.24/9.68 parent0: (60796) {G15,W8,D5,L1,V0,M1} { meet( skol1, composition(
% 9.24/9.68 complement( one ), skol1 ) ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60798) {G1,W28,D7,L1,V3,M1} { meet( composition( meet( X,
% 9.24/9.68 composition( Z, Y ) ), converse( Y ) ), Z ) ==> join( meet( composition(
% 9.24/9.68 X, converse( Y ) ), Z ), meet( composition( meet( X, composition( Z, Y )
% 9.24/9.68 ), converse( Y ) ), Z ) ) }.
% 9.24/9.68 parent0[0]: (158) {G1,W28,D7,L1,V3,M1} P(7,15) { join( meet( composition( Y
% 9.24/9.68 , converse( X ) ), Z ), meet( composition( meet( Y, composition( Z, X ) )
% 9.24/9.68 , converse( X ) ), Z ) ) ==> meet( composition( meet( Y, composition( Z,
% 9.24/9.68 X ) ), converse( X ) ), Z ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := X
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60803) {G2,W28,D7,L1,V0,M1} { meet( composition( meet( skol1,
% 9.24/9.68 composition( complement( one ), skol1 ) ), converse( skol1 ) ),
% 9.24/9.68 complement( one ) ) ==> join( meet( composition( skol1, converse( skol1 )
% 9.24/9.68 ), complement( one ) ), meet( composition( zero, converse( skol1 ) ),
% 9.24/9.68 complement( one ) ) ) }.
% 9.24/9.68 parent0[0]: (6742) {G37,W8,D5,L1,V0,M1} P(6736,1322);d(336);d(748) { meet(
% 9.24/9.68 skol1, composition( complement( one ), skol1 ) ) ==> zero }.
% 9.24/9.68 parent1[0; 23]: (60798) {G1,W28,D7,L1,V3,M1} { meet( composition( meet( X
% 9.24/9.68 , composition( Z, Y ) ), converse( Y ) ), Z ) ==> join( meet( composition
% 9.24/9.68 ( X, converse( Y ) ), Z ), meet( composition( meet( X, composition( Z, Y
% 9.24/9.68 ) ), converse( Y ) ), Z ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := skol1
% 9.24/9.68 Y := skol1
% 9.24/9.68 Z := complement( one )
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60804) {G3,W23,D6,L1,V0,M1} { meet( composition( zero, converse
% 9.24/9.68 ( skol1 ) ), complement( one ) ) ==> join( meet( composition( skol1,
% 9.24/9.68 converse( skol1 ) ), complement( one ) ), meet( composition( zero,
% 9.24/9.68 converse( skol1 ) ), complement( one ) ) ) }.
% 9.24/9.68 parent0[0]: (6742) {G37,W8,D5,L1,V0,M1} P(6736,1322);d(336);d(748) { meet(
% 9.24/9.68 skol1, composition( complement( one ), skol1 ) ) ==> zero }.
% 9.24/9.68 parent1[0; 3]: (60803) {G2,W28,D7,L1,V0,M1} { meet( composition( meet(
% 9.24/9.68 skol1, composition( complement( one ), skol1 ) ), converse( skol1 ) ),
% 9.24/9.68 complement( one ) ) ==> join( meet( composition( skol1, converse( skol1 )
% 9.24/9.68 ), complement( one ) ), meet( composition( zero, converse( skol1 ) ),
% 9.24/9.68 complement( one ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60810) {G4,W20,D6,L1,V0,M1} { meet( composition( zero, converse
% 9.24/9.68 ( skol1 ) ), complement( one ) ) ==> join( meet( composition( skol1,
% 9.24/9.68 converse( skol1 ) ), complement( one ) ), meet( zero, complement( one ) )
% 9.24/9.68 ) }.
% 9.24/9.68 parent0[0]: (968) {G22,W5,D3,L1,V1,M1} P(966,89);d(742) { composition( zero
% 9.24/9.68 , X ) ==> zero }.
% 9.24/9.68 parent1[0; 17]: (60804) {G3,W23,D6,L1,V0,M1} { meet( composition( zero,
% 9.24/9.68 converse( skol1 ) ), complement( one ) ) ==> join( meet( composition(
% 9.24/9.68 skol1, converse( skol1 ) ), complement( one ) ), meet( composition( zero
% 9.24/9.68 , converse( skol1 ) ), complement( one ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := converse( skol1 )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60811) {G5,W17,D6,L1,V0,M1} { meet( zero, complement( one ) )
% 9.24/9.68 ==> join( meet( composition( skol1, converse( skol1 ) ), complement( one
% 9.24/9.68 ) ), meet( zero, complement( one ) ) ) }.
% 9.24/9.68 parent0[0]: (968) {G22,W5,D3,L1,V1,M1} P(966,89);d(742) { composition( zero
% 9.24/9.68 , X ) ==> zero }.
% 9.24/9.68 parent1[0; 2]: (60810) {G4,W20,D6,L1,V0,M1} { meet( composition( zero,
% 9.24/9.68 converse( skol1 ) ), complement( one ) ) ==> join( meet( composition(
% 9.24/9.68 skol1, converse( skol1 ) ), complement( one ) ), meet( zero, complement(
% 9.24/9.68 one ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := converse( skol1 )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60816) {G6,W14,D6,L1,V0,M1} { meet( zero, complement( one ) )
% 9.24/9.68 ==> join( meet( composition( skol1, converse( skol1 ) ), complement( one
% 9.24/9.68 ) ), zero ) }.
% 9.24/9.68 parent0[0]: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero,
% 9.24/9.68 X ) ==> zero }.
% 9.24/9.68 parent1[0; 13]: (60811) {G5,W17,D6,L1,V0,M1} { meet( zero, complement( one
% 9.24/9.68 ) ) ==> join( meet( composition( skol1, converse( skol1 ) ), complement
% 9.24/9.68 ( one ) ), meet( zero, complement( one ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := complement( one )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60817) {G7,W11,D6,L1,V0,M1} { zero ==> join( meet( composition(
% 9.24/9.68 skol1, converse( skol1 ) ), complement( one ) ), zero ) }.
% 9.24/9.68 parent0[0]: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero,
% 9.24/9.68 X ) ==> zero }.
% 9.24/9.68 parent1[0; 1]: (60816) {G6,W14,D6,L1,V0,M1} { meet( zero, complement( one
% 9.24/9.68 ) ) ==> join( meet( composition( skol1, converse( skol1 ) ), complement
% 9.24/9.68 ( one ) ), zero ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := complement( one )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60820) {G8,W9,D5,L1,V0,M1} { zero ==> meet( composition( skol1,
% 9.24/9.68 converse( skol1 ) ), complement( one ) ) }.
% 9.24/9.68 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.68 }.
% 9.24/9.68 parent1[0; 2]: (60817) {G7,W11,D6,L1,V0,M1} { zero ==> join( meet(
% 9.24/9.68 composition( skol1, converse( skol1 ) ), complement( one ) ), zero ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := meet( composition( skol1, converse( skol1 ) ), complement( one ) )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60821) {G8,W9,D5,L1,V0,M1} { meet( composition( skol1, converse(
% 9.24/9.68 skol1 ) ), complement( one ) ) ==> zero }.
% 9.24/9.68 parent0[0]: (60820) {G8,W9,D5,L1,V0,M1} { zero ==> meet( composition(
% 9.24/9.68 skol1, converse( skol1 ) ), complement( one ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (6743) {G38,W9,D5,L1,V0,M1} P(6742,158);d(968);d(339);d(712)
% 9.24/9.68 { meet( composition( skol1, converse( skol1 ) ), complement( one ) ) ==>
% 9.24/9.68 zero }.
% 9.24/9.68 parent0: (60821) {G8,W9,D5,L1,V0,M1} { meet( composition( skol1, converse
% 9.24/9.68 ( skol1 ) ), complement( one ) ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60823) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 9.24/9.68 complement( meet( Y, X ) ) ) }.
% 9.24/9.68 parent0[0]: (1322) {G18,W10,D5,L1,V2,M1} P(1195,12) { meet( meet( X, Y ),
% 9.24/9.68 complement( meet( Y, X ) ) ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60827) {G19,W11,D6,L1,V0,M1} { zero ==> meet( meet( skol2,
% 9.24/9.68 composition( complement( one ), skol1 ) ), complement( zero ) ) }.
% 9.24/9.68 parent0[0]: (6737) {G36,W8,D5,L1,V0,M1} P(718,4597) { meet( composition(
% 9.24/9.68 complement( one ), skol1 ), skol2 ) ==> zero }.
% 9.24/9.68 parent1[0; 10]: (60823) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y
% 9.24/9.68 ), complement( meet( Y, X ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := skol2
% 9.24/9.68 Y := composition( complement( one ), skol1 )
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60828) {G14,W10,D6,L1,V0,M1} { zero ==> meet( meet( skol2,
% 9.24/9.68 composition( complement( one ), skol1 ) ), top ) }.
% 9.24/9.68 parent0[0]: (336) {G13,W4,D3,L1,V0,M1} P(329,10) { complement( zero ) ==>
% 9.24/9.68 top }.
% 9.24/9.68 parent1[0; 9]: (60827) {G19,W11,D6,L1,V0,M1} { zero ==> meet( meet( skol2
% 9.24/9.68 , composition( complement( one ), skol1 ) ), complement( zero ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60829) {G15,W8,D5,L1,V0,M1} { zero ==> meet( skol2, composition
% 9.24/9.68 ( complement( one ), skol1 ) ) }.
% 9.24/9.68 parent0[0]: (748) {G17,W5,D3,L1,V1,M1} S(716);d(723) { meet( X, top ) ==> X
% 9.24/9.68 }.
% 9.24/9.68 parent1[0; 2]: (60828) {G14,W10,D6,L1,V0,M1} { zero ==> meet( meet( skol2
% 9.24/9.68 , composition( complement( one ), skol1 ) ), top ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := meet( skol2, composition( complement( one ), skol1 ) )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60830) {G15,W8,D5,L1,V0,M1} { meet( skol2, composition(
% 9.24/9.68 complement( one ), skol1 ) ) ==> zero }.
% 9.24/9.68 parent0[0]: (60829) {G15,W8,D5,L1,V0,M1} { zero ==> meet( skol2,
% 9.24/9.68 composition( complement( one ), skol1 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (6748) {G37,W8,D5,L1,V0,M1} P(6737,1322);d(336);d(748) { meet
% 9.24/9.68 ( skol2, composition( complement( one ), skol1 ) ) ==> zero }.
% 9.24/9.68 parent0: (60830) {G15,W8,D5,L1,V0,M1} { meet( skol2, composition(
% 9.24/9.68 complement( one ), skol1 ) ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60832) {G1,W28,D7,L1,V3,M1} { meet( composition( converse( X ),
% 9.24/9.68 meet( Y, composition( X, Z ) ) ), Z ) ==> join( meet( composition(
% 9.24/9.68 converse( X ), Y ), Z ), meet( composition( converse( X ), meet( Y,
% 9.24/9.68 composition( X, Z ) ) ), Z ) ) }.
% 9.24/9.68 parent0[0]: (142) {G1,W28,D7,L1,V3,M1} P(7,14) { join( meet( composition(
% 9.24/9.68 converse( X ), Y ), Z ), meet( composition( converse( X ), meet( Y,
% 9.24/9.68 composition( X, Z ) ) ), Z ) ) ==> meet( composition( converse( X ), meet
% 9.24/9.68 ( Y, composition( X, Z ) ) ), Z ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60839) {G2,W28,D7,L1,V0,M1} { meet( composition( converse(
% 9.24/9.68 complement( one ) ), meet( skol2, composition( complement( one ), skol1 )
% 9.24/9.68 ) ), skol1 ) ==> join( meet( composition( converse( complement( one ) )
% 9.24/9.68 , skol2 ), skol1 ), meet( composition( converse( complement( one ) ),
% 9.24/9.68 zero ), skol1 ) ) }.
% 9.24/9.68 parent0[0]: (6748) {G37,W8,D5,L1,V0,M1} P(6737,1322);d(336);d(748) { meet(
% 9.24/9.68 skol2, composition( complement( one ), skol1 ) ) ==> zero }.
% 9.24/9.68 parent1[0; 26]: (60832) {G1,W28,D7,L1,V3,M1} { meet( composition( converse
% 9.24/9.68 ( X ), meet( Y, composition( X, Z ) ) ), Z ) ==> join( meet( composition
% 9.24/9.68 ( converse( X ), Y ), Z ), meet( composition( converse( X ), meet( Y,
% 9.24/9.68 composition( X, Z ) ) ), Z ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := complement( one )
% 9.24/9.68 Y := skol2
% 9.24/9.68 Z := skol1
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60840) {G3,W23,D7,L1,V0,M1} { meet( composition( converse(
% 9.24/9.68 complement( one ) ), zero ), skol1 ) ==> join( meet( composition(
% 9.24/9.68 converse( complement( one ) ), skol2 ), skol1 ), meet( composition(
% 9.24/9.68 converse( complement( one ) ), zero ), skol1 ) ) }.
% 9.24/9.68 parent0[0]: (6748) {G37,W8,D5,L1,V0,M1} P(6737,1322);d(336);d(748) { meet(
% 9.24/9.68 skol2, composition( complement( one ), skol1 ) ) ==> zero }.
% 9.24/9.68 parent1[0; 6]: (60839) {G2,W28,D7,L1,V0,M1} { meet( composition( converse
% 9.24/9.68 ( complement( one ) ), meet( skol2, composition( complement( one ), skol1
% 9.24/9.68 ) ) ), skol1 ) ==> join( meet( composition( converse( complement( one )
% 9.24/9.68 ), skol2 ), skol1 ), meet( composition( converse( complement( one ) ),
% 9.24/9.68 zero ), skol1 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60945) {G4,W23,D7,L1,V0,M1} { meet( composition( converse(
% 9.24/9.68 complement( one ) ), zero ), skol1 ) ==> join( meet( composition(
% 9.24/9.68 converse( complement( one ) ), skol2 ), skol1 ), meet( composition(
% 9.24/9.68 complement( converse( one ) ), zero ), skol1 ) ) }.
% 9.24/9.68 parent0[0]: (2528) {G28,W7,D4,L1,V1,M1} P(2319,7) { converse( complement( X
% 9.24/9.68 ) ) ==> complement( converse( X ) ) }.
% 9.24/9.68 parent1[0; 18]: (60840) {G3,W23,D7,L1,V0,M1} { meet( composition( converse
% 9.24/9.68 ( complement( one ) ), zero ), skol1 ) ==> join( meet( composition(
% 9.24/9.68 converse( complement( one ) ), skol2 ), skol1 ), meet( composition(
% 9.24/9.68 converse( complement( one ) ), zero ), skol1 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := one
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60947) {G5,W23,D7,L1,V0,M1} { meet( composition( converse(
% 9.24/9.68 complement( one ) ), zero ), skol1 ) ==> join( meet( composition(
% 9.24/9.68 complement( converse( one ) ), skol2 ), skol1 ), meet( composition(
% 9.24/9.68 complement( converse( one ) ), zero ), skol1 ) ) }.
% 9.24/9.68 parent0[0]: (2528) {G28,W7,D4,L1,V1,M1} P(2319,7) { converse( complement( X
% 9.24/9.68 ) ) ==> complement( converse( X ) ) }.
% 9.24/9.68 parent1[0; 11]: (60945) {G4,W23,D7,L1,V0,M1} { meet( composition( converse
% 9.24/9.68 ( complement( one ) ), zero ), skol1 ) ==> join( meet( composition(
% 9.24/9.68 converse( complement( one ) ), skol2 ), skol1 ), meet( composition(
% 9.24/9.68 complement( converse( one ) ), zero ), skol1 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := one
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60966) {G4,W22,D7,L1,V0,M1} { meet( composition( converse(
% 9.24/9.68 complement( one ) ), zero ), skol1 ) ==> join( meet( composition(
% 9.24/9.68 complement( converse( one ) ), skol2 ), skol1 ), meet( composition(
% 9.24/9.68 complement( one ), zero ), skol1 ) ) }.
% 9.24/9.68 parent0[0]: (804) {G3,W4,D3,L1,V0,M1} P(798,5) { converse( one ) ==> one
% 9.24/9.68 }.
% 9.24/9.68 parent1[0; 19]: (60947) {G5,W23,D7,L1,V0,M1} { meet( composition( converse
% 9.24/9.68 ( complement( one ) ), zero ), skol1 ) ==> join( meet( composition(
% 9.24/9.68 complement( converse( one ) ), skol2 ), skol1 ), meet( composition(
% 9.24/9.68 complement( converse( one ) ), zero ), skol1 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60967) {G4,W21,D6,L1,V0,M1} { meet( composition( converse(
% 9.24/9.68 complement( one ) ), zero ), skol1 ) ==> join( meet( composition(
% 9.24/9.68 complement( one ), skol2 ), skol1 ), meet( composition( complement( one )
% 9.24/9.68 , zero ), skol1 ) ) }.
% 9.24/9.68 parent0[0]: (804) {G3,W4,D3,L1,V0,M1} P(798,5) { converse( one ) ==> one
% 9.24/9.68 }.
% 9.24/9.68 parent1[0; 12]: (60966) {G4,W22,D7,L1,V0,M1} { meet( composition( converse
% 9.24/9.68 ( complement( one ) ), zero ), skol1 ) ==> join( meet( composition(
% 9.24/9.68 complement( converse( one ) ), skol2 ), skol1 ), meet( composition(
% 9.24/9.68 complement( one ), zero ), skol1 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60983) {G5,W18,D6,L1,V0,M1} { meet( composition( converse(
% 9.24/9.68 complement( one ) ), zero ), skol1 ) ==> join( meet( composition(
% 9.24/9.68 complement( one ), skol2 ), skol1 ), meet( zero, skol1 ) ) }.
% 9.24/9.68 parent0[0]: (966) {G21,W5,D3,L1,V1,M1} P(957,4);d(965) { composition( X,
% 9.24/9.68 zero ) ==> zero }.
% 9.24/9.68 parent1[0; 16]: (60967) {G4,W21,D6,L1,V0,M1} { meet( composition( converse
% 9.24/9.68 ( complement( one ) ), zero ), skol1 ) ==> join( meet( composition(
% 9.24/9.68 complement( one ), skol2 ), skol1 ), meet( composition( complement( one )
% 9.24/9.68 , zero ), skol1 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := complement( one )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60984) {G6,W14,D6,L1,V0,M1} { meet( zero, skol1 ) ==> join( meet
% 9.24/9.68 ( composition( complement( one ), skol2 ), skol1 ), meet( zero, skol1 ) )
% 9.24/9.68 }.
% 9.24/9.68 parent0[0]: (966) {G21,W5,D3,L1,V1,M1} P(957,4);d(965) { composition( X,
% 9.24/9.68 zero ) ==> zero }.
% 9.24/9.68 parent1[0; 2]: (60983) {G5,W18,D6,L1,V0,M1} { meet( composition( converse
% 9.24/9.68 ( complement( one ) ), zero ), skol1 ) ==> join( meet( composition(
% 9.24/9.68 complement( one ), skol2 ), skol1 ), meet( zero, skol1 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := converse( complement( one ) )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60989) {G7,W12,D6,L1,V0,M1} { meet( zero, skol1 ) ==> join( meet
% 9.24/9.68 ( composition( complement( one ), skol2 ), skol1 ), zero ) }.
% 9.24/9.68 parent0[0]: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero,
% 9.24/9.68 X ) ==> zero }.
% 9.24/9.68 parent1[0; 11]: (60984) {G6,W14,D6,L1,V0,M1} { meet( zero, skol1 ) ==>
% 9.24/9.68 join( meet( composition( complement( one ), skol2 ), skol1 ), meet( zero
% 9.24/9.68 , skol1 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := skol1
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60990) {G8,W10,D6,L1,V0,M1} { zero ==> join( meet( composition(
% 9.24/9.68 complement( one ), skol2 ), skol1 ), zero ) }.
% 9.24/9.68 parent0[0]: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero,
% 9.24/9.68 X ) ==> zero }.
% 9.24/9.68 parent1[0; 1]: (60989) {G7,W12,D6,L1,V0,M1} { meet( zero, skol1 ) ==> join
% 9.24/9.68 ( meet( composition( complement( one ), skol2 ), skol1 ), zero ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := skol1
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60993) {G9,W8,D5,L1,V0,M1} { zero ==> meet( composition(
% 9.24/9.68 complement( one ), skol2 ), skol1 ) }.
% 9.24/9.68 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.68 }.
% 9.24/9.68 parent1[0; 2]: (60990) {G8,W10,D6,L1,V0,M1} { zero ==> join( meet(
% 9.24/9.68 composition( complement( one ), skol2 ), skol1 ), zero ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := meet( composition( complement( one ), skol2 ), skol1 )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60994) {G9,W8,D5,L1,V0,M1} { meet( composition( complement( one )
% 9.24/9.68 , skol2 ), skol1 ) ==> zero }.
% 9.24/9.68 parent0[0]: (60993) {G9,W8,D5,L1,V0,M1} { zero ==> meet( composition(
% 9.24/9.68 complement( one ), skol2 ), skol1 ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (6750) {G38,W8,D5,L1,V0,M1} P(6748,142);d(2528);d(804);d(966);
% 9.24/9.68 d(339);d(712) { meet( composition( complement( one ), skol2 ), skol1 )
% 9.24/9.68 ==> zero }.
% 9.24/9.68 parent0: (60994) {G9,W8,D5,L1,V0,M1} { meet( composition( complement( one
% 9.24/9.68 ), skol2 ), skol1 ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (60996) {G20,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement( Y
% 9.24/9.68 ) ), meet( Y, X ) ) }.
% 9.24/9.68 parent0[0]: (5815) {G20,W10,D5,L1,V2,M1} P(2364,0) { join( meet( Y,
% 9.24/9.68 complement( X ) ), meet( X, Y ) ) ==> Y }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60998) {G21,W11,D7,L1,V0,M1} { skol1 ==> join( meet( skol1,
% 9.24/9.68 complement( composition( complement( one ), skol2 ) ) ), zero ) }.
% 9.24/9.68 parent0[0]: (6750) {G38,W8,D5,L1,V0,M1} P(6748,142);d(2528);d(804);d(966);d
% 9.24/9.68 (339);d(712) { meet( composition( complement( one ), skol2 ), skol1 ) ==>
% 9.24/9.68 zero }.
% 9.24/9.68 parent1[0; 10]: (60996) {G20,W10,D5,L1,V2,M1} { X ==> join( meet( X,
% 9.24/9.68 complement( Y ) ), meet( Y, X ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := skol1
% 9.24/9.68 Y := composition( complement( one ), skol2 )
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (60999) {G15,W9,D6,L1,V0,M1} { skol1 ==> meet( skol1, complement
% 9.24/9.68 ( composition( complement( one ), skol2 ) ) ) }.
% 9.24/9.68 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.68 }.
% 9.24/9.68 parent1[0; 2]: (60998) {G21,W11,D7,L1,V0,M1} { skol1 ==> join( meet( skol1
% 9.24/9.68 , complement( composition( complement( one ), skol2 ) ) ), zero ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := meet( skol1, complement( composition( complement( one ), skol2 ) )
% 9.24/9.68 )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61000) {G15,W9,D6,L1,V0,M1} { meet( skol1, complement(
% 9.24/9.68 composition( complement( one ), skol2 ) ) ) ==> skol1 }.
% 9.24/9.68 parent0[0]: (60999) {G15,W9,D6,L1,V0,M1} { skol1 ==> meet( skol1,
% 9.24/9.68 complement( composition( complement( one ), skol2 ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (6753) {G39,W9,D6,L1,V0,M1} P(6750,5815);d(712) { meet( skol1
% 9.24/9.68 , complement( composition( complement( one ), skol2 ) ) ) ==> skol1 }.
% 9.24/9.68 parent0: (61000) {G15,W9,D6,L1,V0,M1} { meet( skol1, complement(
% 9.24/9.68 composition( complement( one ), skol2 ) ) ) ==> skol1 }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61002) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement( Y
% 9.24/9.68 ) ), meet( X, Y ) ) }.
% 9.24/9.68 parent0[0]: (309) {G2,W10,D5,L1,V2,M1} P(3,37) { join( meet( X, complement
% 9.24/9.68 ( Y ) ), meet( X, Y ) ) ==> X }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61004) {G3,W13,D6,L1,V0,M1} { composition( skol1, converse(
% 9.24/9.68 skol1 ) ) ==> join( zero, meet( composition( skol1, converse( skol1 ) ),
% 9.24/9.68 one ) ) }.
% 9.24/9.68 parent0[0]: (6743) {G38,W9,D5,L1,V0,M1} P(6742,158);d(968);d(339);d(712) {
% 9.24/9.68 meet( composition( skol1, converse( skol1 ) ), complement( one ) ) ==>
% 9.24/9.68 zero }.
% 9.24/9.68 parent1[0; 6]: (61002) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X,
% 9.24/9.68 complement( Y ) ), meet( X, Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := composition( skol1, converse( skol1 ) )
% 9.24/9.68 Y := one
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61006) {G4,W11,D5,L1,V0,M1} { composition( skol1, converse(
% 9.24/9.68 skol1 ) ) ==> meet( composition( skol1, converse( skol1 ) ), one ) }.
% 9.24/9.68 parent0[0]: (713) {G15,W5,D3,L1,V1,M1} P(321,27);d(712);d(712) { join( zero
% 9.24/9.68 , X ) ==> X }.
% 9.24/9.68 parent1[0; 5]: (61004) {G3,W13,D6,L1,V0,M1} { composition( skol1, converse
% 9.24/9.68 ( skol1 ) ) ==> join( zero, meet( composition( skol1, converse( skol1 ) )
% 9.24/9.68 , one ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := meet( composition( skol1, converse( skol1 ) ), one )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61007) {G4,W11,D5,L1,V0,M1} { meet( composition( skol1, converse
% 9.24/9.68 ( skol1 ) ), one ) ==> composition( skol1, converse( skol1 ) ) }.
% 9.24/9.68 parent0[0]: (61006) {G4,W11,D5,L1,V0,M1} { composition( skol1, converse(
% 9.24/9.68 skol1 ) ) ==> meet( composition( skol1, converse( skol1 ) ), one ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (6773) {G39,W11,D5,L1,V0,M1} P(6743,309);d(713) { meet(
% 9.24/9.68 composition( skol1, converse( skol1 ) ), one ) ==> composition( skol1,
% 9.24/9.68 converse( skol1 ) ) }.
% 9.24/9.68 parent0: (61007) {G4,W11,D5,L1,V0,M1} { meet( composition( skol1, converse
% 9.24/9.68 ( skol1 ) ), one ) ==> composition( skol1, converse( skol1 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61009) {G17,W10,D5,L1,V2,M1} { join( complement( X ), Y ) ==>
% 9.24/9.68 complement( meet( X, complement( Y ) ) ) }.
% 9.24/9.68 parent0[0]: (1185) {G17,W10,D5,L1,V2,M1} P(723,726) { complement( meet( Y,
% 9.24/9.68 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61010) {G18,W10,D5,L1,V0,M1} { join( complement( skol1 ),
% 9.24/9.68 composition( complement( one ), skol2 ) ) ==> complement( skol1 ) }.
% 9.24/9.68 parent0[0]: (6753) {G39,W9,D6,L1,V0,M1} P(6750,5815);d(712) { meet( skol1,
% 9.24/9.68 complement( composition( complement( one ), skol2 ) ) ) ==> skol1 }.
% 9.24/9.68 parent1[0; 9]: (61009) {G17,W10,D5,L1,V2,M1} { join( complement( X ), Y )
% 9.24/9.68 ==> complement( meet( X, complement( Y ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := skol1
% 9.24/9.68 Y := composition( complement( one ), skol2 )
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (6947) {G40,W10,D5,L1,V0,M1} P(6753,1185) { join( complement(
% 9.24/9.68 skol1 ), composition( complement( one ), skol2 ) ) ==> complement( skol1
% 9.24/9.68 ) }.
% 9.24/9.68 parent0: (61010) {G18,W10,D5,L1,V0,M1} { join( complement( skol1 ),
% 9.24/9.68 composition( complement( one ), skol2 ) ) ==> complement( skol1 ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61013) {G35,W10,D5,L1,V1,M1} { zero ==> meet( composition(
% 9.24/9.68 complement( one ), skol2 ), meet( X, one ) ) }.
% 9.24/9.68 parent0[0]: (4599) {G35,W10,D5,L1,V1,M1} P(2327,4578);d(723) { meet(
% 9.24/9.68 composition( complement( one ), skol2 ), meet( X, one ) ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61014) {G16,W8,D5,L1,V0,M1} { zero ==> meet( composition(
% 9.24/9.68 complement( one ), skol2 ), skol2 ) }.
% 9.24/9.68 parent0[0]: (718) {G15,W5,D3,L1,V0,M1} P(712,302) { meet( skol2, one ) ==>
% 9.24/9.68 skol2 }.
% 9.24/9.68 parent1[0; 7]: (61013) {G35,W10,D5,L1,V1,M1} { zero ==> meet( composition
% 9.24/9.68 ( complement( one ), skol2 ), meet( X, one ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := skol2
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61015) {G16,W8,D5,L1,V0,M1} { meet( composition( complement( one
% 9.24/9.68 ), skol2 ), skol2 ) ==> zero }.
% 9.24/9.68 parent0[0]: (61014) {G16,W8,D5,L1,V0,M1} { zero ==> meet( composition(
% 9.24/9.68 complement( one ), skol2 ), skol2 ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (7402) {G36,W8,D5,L1,V0,M1} P(718,4599) { meet( composition(
% 9.24/9.68 complement( one ), skol2 ), skol2 ) ==> zero }.
% 9.24/9.68 parent0: (61015) {G16,W8,D5,L1,V0,M1} { meet( composition( complement( one
% 9.24/9.68 ), skol2 ), skol2 ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61017) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 9.24/9.68 complement( meet( Y, X ) ) ) }.
% 9.24/9.68 parent0[0]: (1322) {G18,W10,D5,L1,V2,M1} P(1195,12) { meet( meet( X, Y ),
% 9.24/9.68 complement( meet( Y, X ) ) ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61021) {G19,W11,D6,L1,V0,M1} { zero ==> meet( meet( skol2,
% 9.24/9.68 composition( complement( one ), skol2 ) ), complement( zero ) ) }.
% 9.24/9.68 parent0[0]: (7402) {G36,W8,D5,L1,V0,M1} P(718,4599) { meet( composition(
% 9.24/9.68 complement( one ), skol2 ), skol2 ) ==> zero }.
% 9.24/9.68 parent1[0; 10]: (61017) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y
% 9.24/9.68 ), complement( meet( Y, X ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := skol2
% 9.24/9.68 Y := composition( complement( one ), skol2 )
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61022) {G14,W10,D6,L1,V0,M1} { zero ==> meet( meet( skol2,
% 9.24/9.68 composition( complement( one ), skol2 ) ), top ) }.
% 9.24/9.68 parent0[0]: (336) {G13,W4,D3,L1,V0,M1} P(329,10) { complement( zero ) ==>
% 9.24/9.68 top }.
% 9.24/9.68 parent1[0; 9]: (61021) {G19,W11,D6,L1,V0,M1} { zero ==> meet( meet( skol2
% 9.24/9.68 , composition( complement( one ), skol2 ) ), complement( zero ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61023) {G15,W8,D5,L1,V0,M1} { zero ==> meet( skol2, composition
% 9.24/9.68 ( complement( one ), skol2 ) ) }.
% 9.24/9.68 parent0[0]: (748) {G17,W5,D3,L1,V1,M1} S(716);d(723) { meet( X, top ) ==> X
% 9.24/9.68 }.
% 9.24/9.68 parent1[0; 2]: (61022) {G14,W10,D6,L1,V0,M1} { zero ==> meet( meet( skol2
% 9.24/9.68 , composition( complement( one ), skol2 ) ), top ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := meet( skol2, composition( complement( one ), skol2 ) )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61024) {G15,W8,D5,L1,V0,M1} { meet( skol2, composition(
% 9.24/9.68 complement( one ), skol2 ) ) ==> zero }.
% 9.24/9.68 parent0[0]: (61023) {G15,W8,D5,L1,V0,M1} { zero ==> meet( skol2,
% 9.24/9.68 composition( complement( one ), skol2 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (7408) {G37,W8,D5,L1,V0,M1} P(7402,1322);d(336);d(748) { meet
% 9.24/9.68 ( skol2, composition( complement( one ), skol2 ) ) ==> zero }.
% 9.24/9.68 parent0: (61024) {G15,W8,D5,L1,V0,M1} { meet( skol2, composition(
% 9.24/9.68 complement( one ), skol2 ) ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61026) {G1,W28,D7,L1,V3,M1} { meet( composition( meet( X,
% 9.24/9.68 composition( Z, Y ) ), converse( Y ) ), Z ) ==> join( meet( composition(
% 9.24/9.68 X, converse( Y ) ), Z ), meet( composition( meet( X, composition( Z, Y )
% 9.24/9.68 ), converse( Y ) ), Z ) ) }.
% 9.24/9.68 parent0[0]: (158) {G1,W28,D7,L1,V3,M1} P(7,15) { join( meet( composition( Y
% 9.24/9.68 , converse( X ) ), Z ), meet( composition( meet( Y, composition( Z, X ) )
% 9.24/9.68 , converse( X ) ), Z ) ) ==> meet( composition( meet( Y, composition( Z,
% 9.24/9.68 X ) ), converse( X ) ), Z ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := X
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61031) {G2,W28,D7,L1,V0,M1} { meet( composition( meet( skol2,
% 9.24/9.68 composition( complement( one ), skol2 ) ), converse( skol2 ) ),
% 9.24/9.68 complement( one ) ) ==> join( meet( composition( skol2, converse( skol2 )
% 9.24/9.68 ), complement( one ) ), meet( composition( zero, converse( skol2 ) ),
% 9.24/9.68 complement( one ) ) ) }.
% 9.24/9.68 parent0[0]: (7408) {G37,W8,D5,L1,V0,M1} P(7402,1322);d(336);d(748) { meet(
% 9.24/9.68 skol2, composition( complement( one ), skol2 ) ) ==> zero }.
% 9.24/9.68 parent1[0; 23]: (61026) {G1,W28,D7,L1,V3,M1} { meet( composition( meet( X
% 9.24/9.68 , composition( Z, Y ) ), converse( Y ) ), Z ) ==> join( meet( composition
% 9.24/9.68 ( X, converse( Y ) ), Z ), meet( composition( meet( X, composition( Z, Y
% 9.24/9.68 ) ), converse( Y ) ), Z ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := skol2
% 9.24/9.68 Y := skol2
% 9.24/9.68 Z := complement( one )
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61032) {G3,W23,D6,L1,V0,M1} { meet( composition( zero, converse
% 9.24/9.68 ( skol2 ) ), complement( one ) ) ==> join( meet( composition( skol2,
% 9.24/9.68 converse( skol2 ) ), complement( one ) ), meet( composition( zero,
% 9.24/9.68 converse( skol2 ) ), complement( one ) ) ) }.
% 9.24/9.68 parent0[0]: (7408) {G37,W8,D5,L1,V0,M1} P(7402,1322);d(336);d(748) { meet(
% 9.24/9.68 skol2, composition( complement( one ), skol2 ) ) ==> zero }.
% 9.24/9.68 parent1[0; 3]: (61031) {G2,W28,D7,L1,V0,M1} { meet( composition( meet(
% 9.24/9.68 skol2, composition( complement( one ), skol2 ) ), converse( skol2 ) ),
% 9.24/9.68 complement( one ) ) ==> join( meet( composition( skol2, converse( skol2 )
% 9.24/9.68 ), complement( one ) ), meet( composition( zero, converse( skol2 ) ),
% 9.24/9.68 complement( one ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61038) {G4,W20,D6,L1,V0,M1} { meet( composition( zero, converse
% 9.24/9.68 ( skol2 ) ), complement( one ) ) ==> join( meet( composition( skol2,
% 9.24/9.68 converse( skol2 ) ), complement( one ) ), meet( zero, complement( one ) )
% 9.24/9.68 ) }.
% 9.24/9.68 parent0[0]: (968) {G22,W5,D3,L1,V1,M1} P(966,89);d(742) { composition( zero
% 9.24/9.68 , X ) ==> zero }.
% 9.24/9.68 parent1[0; 17]: (61032) {G3,W23,D6,L1,V0,M1} { meet( composition( zero,
% 9.24/9.68 converse( skol2 ) ), complement( one ) ) ==> join( meet( composition(
% 9.24/9.68 skol2, converse( skol2 ) ), complement( one ) ), meet( composition( zero
% 9.24/9.68 , converse( skol2 ) ), complement( one ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := converse( skol2 )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61039) {G5,W17,D6,L1,V0,M1} { meet( zero, complement( one ) )
% 9.24/9.68 ==> join( meet( composition( skol2, converse( skol2 ) ), complement( one
% 9.24/9.68 ) ), meet( zero, complement( one ) ) ) }.
% 9.24/9.68 parent0[0]: (968) {G22,W5,D3,L1,V1,M1} P(966,89);d(742) { composition( zero
% 9.24/9.68 , X ) ==> zero }.
% 9.24/9.68 parent1[0; 2]: (61038) {G4,W20,D6,L1,V0,M1} { meet( composition( zero,
% 9.24/9.68 converse( skol2 ) ), complement( one ) ) ==> join( meet( composition(
% 9.24/9.68 skol2, converse( skol2 ) ), complement( one ) ), meet( zero, complement(
% 9.24/9.68 one ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := converse( skol2 )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61044) {G6,W14,D6,L1,V0,M1} { meet( zero, complement( one ) )
% 9.24/9.68 ==> join( meet( composition( skol2, converse( skol2 ) ), complement( one
% 9.24/9.68 ) ), zero ) }.
% 9.24/9.68 parent0[0]: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero,
% 9.24/9.68 X ) ==> zero }.
% 9.24/9.68 parent1[0; 13]: (61039) {G5,W17,D6,L1,V0,M1} { meet( zero, complement( one
% 9.24/9.68 ) ) ==> join( meet( composition( skol2, converse( skol2 ) ), complement
% 9.24/9.68 ( one ) ), meet( zero, complement( one ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := complement( one )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61045) {G7,W11,D6,L1,V0,M1} { zero ==> join( meet( composition(
% 9.24/9.68 skol2, converse( skol2 ) ), complement( one ) ), zero ) }.
% 9.24/9.68 parent0[0]: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero,
% 9.24/9.68 X ) ==> zero }.
% 9.24/9.68 parent1[0; 1]: (61044) {G6,W14,D6,L1,V0,M1} { meet( zero, complement( one
% 9.24/9.68 ) ) ==> join( meet( composition( skol2, converse( skol2 ) ), complement
% 9.24/9.68 ( one ) ), zero ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := complement( one )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61048) {G8,W9,D5,L1,V0,M1} { zero ==> meet( composition( skol2,
% 9.24/9.68 converse( skol2 ) ), complement( one ) ) }.
% 9.24/9.68 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.68 }.
% 9.24/9.68 parent1[0; 2]: (61045) {G7,W11,D6,L1,V0,M1} { zero ==> join( meet(
% 9.24/9.68 composition( skol2, converse( skol2 ) ), complement( one ) ), zero ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := meet( composition( skol2, converse( skol2 ) ), complement( one ) )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61049) {G8,W9,D5,L1,V0,M1} { meet( composition( skol2, converse(
% 9.24/9.68 skol2 ) ), complement( one ) ) ==> zero }.
% 9.24/9.68 parent0[0]: (61048) {G8,W9,D5,L1,V0,M1} { zero ==> meet( composition(
% 9.24/9.68 skol2, converse( skol2 ) ), complement( one ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (7409) {G38,W9,D5,L1,V0,M1} P(7408,158);d(968);d(339);d(712)
% 9.24/9.68 { meet( composition( skol2, converse( skol2 ) ), complement( one ) ) ==>
% 9.24/9.68 zero }.
% 9.24/9.68 parent0: (61049) {G8,W9,D5,L1,V0,M1} { meet( composition( skol2, converse
% 9.24/9.68 ( skol2 ) ), complement( one ) ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61051) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement( Y
% 9.24/9.68 ) ), meet( X, Y ) ) }.
% 9.24/9.68 parent0[0]: (309) {G2,W10,D5,L1,V2,M1} P(3,37) { join( meet( X, complement
% 9.24/9.68 ( Y ) ), meet( X, Y ) ) ==> X }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61053) {G3,W13,D6,L1,V0,M1} { composition( skol2, converse(
% 9.24/9.68 skol2 ) ) ==> join( zero, meet( composition( skol2, converse( skol2 ) ),
% 9.24/9.68 one ) ) }.
% 9.24/9.68 parent0[0]: (7409) {G38,W9,D5,L1,V0,M1} P(7408,158);d(968);d(339);d(712) {
% 9.24/9.68 meet( composition( skol2, converse( skol2 ) ), complement( one ) ) ==>
% 9.24/9.68 zero }.
% 9.24/9.68 parent1[0; 6]: (61051) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X,
% 9.24/9.68 complement( Y ) ), meet( X, Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := composition( skol2, converse( skol2 ) )
% 9.24/9.68 Y := one
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61055) {G4,W11,D5,L1,V0,M1} { composition( skol2, converse(
% 9.24/9.68 skol2 ) ) ==> meet( composition( skol2, converse( skol2 ) ), one ) }.
% 9.24/9.68 parent0[0]: (713) {G15,W5,D3,L1,V1,M1} P(321,27);d(712);d(712) { join( zero
% 9.24/9.68 , X ) ==> X }.
% 9.24/9.68 parent1[0; 5]: (61053) {G3,W13,D6,L1,V0,M1} { composition( skol2, converse
% 9.24/9.68 ( skol2 ) ) ==> join( zero, meet( composition( skol2, converse( skol2 ) )
% 9.24/9.68 , one ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := meet( composition( skol2, converse( skol2 ) ), one )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61056) {G4,W11,D5,L1,V0,M1} { meet( composition( skol2, converse
% 9.24/9.68 ( skol2 ) ), one ) ==> composition( skol2, converse( skol2 ) ) }.
% 9.24/9.68 parent0[0]: (61055) {G4,W11,D5,L1,V0,M1} { composition( skol2, converse(
% 9.24/9.68 skol2 ) ) ==> meet( composition( skol2, converse( skol2 ) ), one ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (7412) {G39,W11,D5,L1,V0,M1} P(7409,309);d(713) { meet(
% 9.24/9.68 composition( skol2, converse( skol2 ) ), one ) ==> composition( skol2,
% 9.24/9.68 converse( skol2 ) ) }.
% 9.24/9.68 parent0: (61056) {G4,W11,D5,L1,V0,M1} { meet( composition( skol2, converse
% 9.24/9.68 ( skol2 ) ), one ) ==> composition( skol2, converse( skol2 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61058) {G11,W14,D6,L1,V4,M1} { top ==> join( join( X, composition
% 9.24/9.68 ( join( Y, Z ), T ) ), complement( composition( Z, T ) ) ) }.
% 9.24/9.68 parent0[0]: (475) {G11,W14,D6,L1,V4,M1} P(62,24);d(319) { join( join( X,
% 9.24/9.68 composition( join( Y, T ), Z ) ), complement( composition( T, Z ) ) ) ==>
% 9.24/9.68 top }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := T
% 9.24/9.68 T := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61060) {G12,W12,D5,L1,V2,M1} { top ==> join( join( X,
% 9.24/9.68 composition( one, Y ) ), complement( composition( skol2, Y ) ) ) }.
% 9.24/9.68 parent0[0]: (1114) {G19,W8,D5,L1,V0,M1} P(1098,0) { join( meet( one,
% 9.24/9.68 complement( skol2 ) ), skol2 ) ==> one }.
% 9.24/9.68 parent1[0; 6]: (61058) {G11,W14,D6,L1,V4,M1} { top ==> join( join( X,
% 9.24/9.68 composition( join( Y, Z ), T ) ), complement( composition( Z, T ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := meet( one, complement( skol2 ) )
% 9.24/9.68 Z := skol2
% 9.24/9.68 T := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61061) {G5,W10,D5,L1,V2,M1} { top ==> join( join( X, Y ),
% 9.24/9.68 complement( composition( skol2, Y ) ) ) }.
% 9.24/9.68 parent0[0]: (805) {G4,W5,D3,L1,V1,M1} P(804,798) { composition( one, X )
% 9.24/9.68 ==> X }.
% 9.24/9.68 parent1[0; 5]: (61060) {G12,W12,D5,L1,V2,M1} { top ==> join( join( X,
% 9.24/9.68 composition( one, Y ) ), complement( composition( skol2, Y ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61062) {G5,W10,D5,L1,V2,M1} { join( join( X, Y ), complement(
% 9.24/9.68 composition( skol2, Y ) ) ) ==> top }.
% 9.24/9.68 parent0[0]: (61061) {G5,W10,D5,L1,V2,M1} { top ==> join( join( X, Y ),
% 9.24/9.68 complement( composition( skol2, Y ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (8676) {G20,W10,D5,L1,V2,M1} P(1114,475);d(805) { join( join(
% 9.24/9.68 X, Y ), complement( composition( skol2, Y ) ) ) ==> top }.
% 9.24/9.68 parent0: (61062) {G5,W10,D5,L1,V2,M1} { join( join( X, Y ), complement(
% 9.24/9.68 composition( skol2, Y ) ) ) ==> top }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61064) {G20,W10,D5,L1,V2,M1} { top ==> join( join( X, Y ),
% 9.24/9.68 complement( composition( skol2, Y ) ) ) }.
% 9.24/9.68 parent0[0]: (8676) {G20,W10,D5,L1,V2,M1} P(1114,475);d(805) { join( join( X
% 9.24/9.68 , Y ), complement( composition( skol2, Y ) ) ) ==> top }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61065) {G21,W8,D5,L1,V1,M1} { top ==> join( X, complement(
% 9.24/9.68 composition( skol2, X ) ) ) }.
% 9.24/9.68 parent0[0]: (2491) {G26,W9,D6,L1,V1,M1} P(2488,1185);d(723) { join(
% 9.24/9.68 complement( composition( complement( X ), top ) ), X ) ==> X }.
% 9.24/9.68 parent1[0; 3]: (61064) {G20,W10,D5,L1,V2,M1} { top ==> join( join( X, Y )
% 9.24/9.68 , complement( composition( skol2, Y ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := complement( composition( complement( X ), top ) )
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61066) {G21,W8,D5,L1,V1,M1} { join( X, complement( composition(
% 9.24/9.68 skol2, X ) ) ) ==> top }.
% 9.24/9.68 parent0[0]: (61065) {G21,W8,D5,L1,V1,M1} { top ==> join( X, complement(
% 9.24/9.68 composition( skol2, X ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (8728) {G27,W8,D5,L1,V1,M1} P(2491,8676) { join( X, complement
% 9.24/9.68 ( composition( skol2, X ) ) ) ==> top }.
% 9.24/9.68 parent0: (61066) {G21,W8,D5,L1,V1,M1} { join( X, complement( composition(
% 9.24/9.68 skol2, X ) ) ) ==> top }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61068) {G17,W10,D5,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 9.24/9.68 complement( join( X, complement( Y ) ) ) }.
% 9.24/9.68 parent0[0]: (740) {G17,W10,D5,L1,V2,M1} P(723,3) { complement( join( X,
% 9.24/9.68 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61070) {G18,W9,D4,L1,V1,M1} { meet( complement( X ), composition
% 9.24/9.68 ( skol2, X ) ) ==> complement( top ) }.
% 9.24/9.68 parent0[0]: (8728) {G27,W8,D5,L1,V1,M1} P(2491,8676) { join( X, complement
% 9.24/9.68 ( composition( skol2, X ) ) ) ==> top }.
% 9.24/9.68 parent1[0; 8]: (61068) {G17,W10,D5,L1,V2,M1} { meet( complement( X ), Y )
% 9.24/9.68 ==> complement( join( X, complement( Y ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := composition( skol2, X )
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61071) {G2,W8,D4,L1,V1,M1} { meet( complement( X ), composition
% 9.24/9.68 ( skol2, X ) ) ==> zero }.
% 9.24/9.68 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.68 zero }.
% 9.24/9.68 parent1[0; 7]: (61070) {G18,W9,D4,L1,V1,M1} { meet( complement( X ),
% 9.24/9.68 composition( skol2, X ) ) ==> complement( top ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (8781) {G28,W8,D4,L1,V1,M1} P(8728,740);d(51) { meet(
% 9.24/9.68 complement( X ), composition( skol2, X ) ) ==> zero }.
% 9.24/9.68 parent0: (61071) {G2,W8,D4,L1,V1,M1} { meet( complement( X ), composition
% 9.24/9.68 ( skol2, X ) ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61074) {G19,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet(
% 9.24/9.68 complement( Y ), X ) ) }.
% 9.24/9.68 parent0[0]: (2365) {G19,W10,D5,L1,V2,M1} P(52,1001) { join( meet( X, Y ),
% 9.24/9.68 meet( complement( Y ), X ) ) ==> X }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61077) {G20,W11,D5,L1,V1,M1} { composition( skol2, X ) ==> join
% 9.24/9.68 ( meet( composition( skol2, X ), X ), zero ) }.
% 9.24/9.68 parent0[0]: (8781) {G28,W8,D4,L1,V1,M1} P(8728,740);d(51) { meet(
% 9.24/9.68 complement( X ), composition( skol2, X ) ) ==> zero }.
% 9.24/9.68 parent1[0; 10]: (61074) {G19,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 9.24/9.68 meet( complement( Y ), X ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := composition( skol2, X )
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61078) {G15,W9,D4,L1,V1,M1} { composition( skol2, X ) ==> meet(
% 9.24/9.68 composition( skol2, X ), X ) }.
% 9.24/9.68 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.68 }.
% 9.24/9.68 parent1[0; 4]: (61077) {G20,W11,D5,L1,V1,M1} { composition( skol2, X ) ==>
% 9.24/9.68 join( meet( composition( skol2, X ), X ), zero ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := meet( composition( skol2, X ), X )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61079) {G15,W9,D4,L1,V1,M1} { meet( composition( skol2, X ), X )
% 9.24/9.68 ==> composition( skol2, X ) }.
% 9.24/9.68 parent0[0]: (61078) {G15,W9,D4,L1,V1,M1} { composition( skol2, X ) ==>
% 9.24/9.68 meet( composition( skol2, X ), X ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (8812) {G29,W9,D4,L1,V1,M1} P(8781,2365);d(712) { meet(
% 9.24/9.68 composition( skol2, X ), X ) ==> composition( skol2, X ) }.
% 9.24/9.68 parent0: (61079) {G15,W9,D4,L1,V1,M1} { meet( composition( skol2, X ), X )
% 9.24/9.68 ==> composition( skol2, X ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61081) {G5,W12,D5,L1,V3,M1} { top ==> join( complement(
% 9.24/9.68 composition( X, Y ) ), composition( join( X, Z ), Y ) ) }.
% 9.24/9.68 parent0[0]: (477) {G5,W12,D5,L1,V3,M1} P(21,62);d(298) { join( complement(
% 9.24/9.68 composition( X, Y ) ), composition( join( X, Z ), Y ) ) ==> top }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61083) {G6,W10,D5,L1,V1,M1} { top ==> join( complement(
% 9.24/9.68 composition( skol1, X ) ), composition( one, X ) ) }.
% 9.24/9.68 parent0[0]: (1054) {G19,W8,D5,L1,V0,M1} P(52,1039) { join( skol1, meet(
% 9.24/9.68 complement( skol1 ), one ) ) ==> one }.
% 9.24/9.68 parent1[0; 8]: (61081) {G5,W12,D5,L1,V3,M1} { top ==> join( complement(
% 9.24/9.68 composition( X, Y ) ), composition( join( X, Z ), Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := skol1
% 9.24/9.68 Y := X
% 9.24/9.68 Z := meet( complement( skol1 ), one )
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61084) {G5,W8,D5,L1,V1,M1} { top ==> join( complement(
% 9.24/9.68 composition( skol1, X ) ), X ) }.
% 9.24/9.68 parent0[0]: (805) {G4,W5,D3,L1,V1,M1} P(804,798) { composition( one, X )
% 9.24/9.68 ==> X }.
% 9.24/9.68 parent1[0; 7]: (61083) {G6,W10,D5,L1,V1,M1} { top ==> join( complement(
% 9.24/9.68 composition( skol1, X ) ), composition( one, X ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61085) {G5,W8,D5,L1,V1,M1} { join( complement( composition( skol1
% 9.24/9.68 , X ) ), X ) ==> top }.
% 9.24/9.68 parent0[0]: (61084) {G5,W8,D5,L1,V1,M1} { top ==> join( complement(
% 9.24/9.68 composition( skol1, X ) ), X ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (8871) {G20,W8,D5,L1,V1,M1} P(1054,477);d(805) { join(
% 9.24/9.68 complement( composition( skol1, X ) ), X ) ==> top }.
% 9.24/9.68 parent0: (61085) {G5,W8,D5,L1,V1,M1} { join( complement( composition(
% 9.24/9.68 skol1, X ) ), X ) ==> top }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61087) {G17,W10,D5,L1,V2,M1} { meet( X, complement( Y ) ) ==>
% 9.24/9.68 complement( join( complement( X ), Y ) ) }.
% 9.24/9.68 parent0[0]: (741) {G17,W10,D5,L1,V2,M1} P(723,3) { complement( join(
% 9.24/9.68 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61089) {G18,W9,D4,L1,V1,M1} { meet( composition( skol1, X ),
% 9.24/9.68 complement( X ) ) ==> complement( top ) }.
% 9.24/9.68 parent0[0]: (8871) {G20,W8,D5,L1,V1,M1} P(1054,477);d(805) { join(
% 9.24/9.68 complement( composition( skol1, X ) ), X ) ==> top }.
% 9.24/9.68 parent1[0; 8]: (61087) {G17,W10,D5,L1,V2,M1} { meet( X, complement( Y ) )
% 9.24/9.68 ==> complement( join( complement( X ), Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := composition( skol1, X )
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61090) {G2,W8,D4,L1,V1,M1} { meet( composition( skol1, X ),
% 9.24/9.68 complement( X ) ) ==> zero }.
% 9.24/9.68 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.68 zero }.
% 9.24/9.68 parent1[0; 7]: (61089) {G18,W9,D4,L1,V1,M1} { meet( composition( skol1, X
% 9.24/9.68 ), complement( X ) ) ==> complement( top ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (8885) {G21,W8,D4,L1,V1,M1} P(8871,741);d(51) { meet(
% 9.24/9.68 composition( skol1, X ), complement( X ) ) ==> zero }.
% 9.24/9.68 parent0: (61090) {G2,W8,D4,L1,V1,M1} { meet( composition( skol1, X ),
% 9.24/9.68 complement( X ) ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61093) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement( Y
% 9.24/9.68 ) ), meet( X, Y ) ) }.
% 9.24/9.68 parent0[0]: (309) {G2,W10,D5,L1,V2,M1} P(3,37) { join( meet( X, complement
% 9.24/9.68 ( Y ) ), meet( X, Y ) ) ==> X }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61095) {G3,W11,D5,L1,V1,M1} { composition( skol1, X ) ==> join(
% 9.24/9.68 zero, meet( composition( skol1, X ), X ) ) }.
% 9.24/9.68 parent0[0]: (8885) {G21,W8,D4,L1,V1,M1} P(8871,741);d(51) { meet(
% 9.24/9.68 composition( skol1, X ), complement( X ) ) ==> zero }.
% 9.24/9.68 parent1[0; 5]: (61093) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X,
% 9.24/9.68 complement( Y ) ), meet( X, Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := composition( skol1, X )
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61097) {G4,W9,D4,L1,V1,M1} { composition( skol1, X ) ==> meet(
% 9.24/9.68 composition( skol1, X ), X ) }.
% 9.24/9.68 parent0[0]: (713) {G15,W5,D3,L1,V1,M1} P(321,27);d(712);d(712) { join( zero
% 9.24/9.68 , X ) ==> X }.
% 9.24/9.68 parent1[0; 4]: (61095) {G3,W11,D5,L1,V1,M1} { composition( skol1, X ) ==>
% 9.24/9.68 join( zero, meet( composition( skol1, X ), X ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := meet( composition( skol1, X ), X )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61098) {G4,W9,D4,L1,V1,M1} { meet( composition( skol1, X ), X )
% 9.24/9.68 ==> composition( skol1, X ) }.
% 9.24/9.68 parent0[0]: (61097) {G4,W9,D4,L1,V1,M1} { composition( skol1, X ) ==> meet
% 9.24/9.68 ( composition( skol1, X ), X ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (8908) {G22,W9,D4,L1,V1,M1} P(8885,309);d(713) { meet(
% 9.24/9.68 composition( skol1, X ), X ) ==> composition( skol1, X ) }.
% 9.24/9.68 parent0: (61098) {G4,W9,D4,L1,V1,M1} { meet( composition( skol1, X ), X )
% 9.24/9.68 ==> composition( skol1, X ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61100) {G22,W9,D6,L1,V2,M1} { X ==> join( X, converse( meet( Y,
% 9.24/9.68 converse( X ) ) ) ) }.
% 9.24/9.68 parent0[0]: (2414) {G22,W9,D6,L1,V2,M1} P(2393,74);d(7) { join( X, converse
% 9.24/9.68 ( meet( Y, converse( X ) ) ) ) ==> X }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61102) {G23,W9,D6,L1,V1,M1} { X ==> join( X, converse(
% 9.24/9.68 composition( skol1, converse( X ) ) ) ) }.
% 9.24/9.68 parent0[0]: (8908) {G22,W9,D4,L1,V1,M1} P(8885,309);d(713) { meet(
% 9.24/9.68 composition( skol1, X ), X ) ==> composition( skol1, X ) }.
% 9.24/9.68 parent1[0; 5]: (61100) {G22,W9,D6,L1,V2,M1} { X ==> join( X, converse(
% 9.24/9.68 meet( Y, converse( X ) ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := converse( X )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := composition( skol1, converse( X ) )
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61103) {G2,W8,D5,L1,V1,M1} { X ==> join( X, composition( X,
% 9.24/9.68 converse( skol1 ) ) ) }.
% 9.24/9.68 parent0[0]: (88) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 9.24/9.68 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 9.24/9.68 parent1[0; 4]: (61102) {G23,W9,D6,L1,V1,M1} { X ==> join( X, converse(
% 9.24/9.68 composition( skol1, converse( X ) ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := skol1
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61104) {G2,W8,D5,L1,V1,M1} { join( X, composition( X, converse(
% 9.24/9.68 skol1 ) ) ) ==> X }.
% 9.24/9.68 parent0[0]: (61103) {G2,W8,D5,L1,V1,M1} { X ==> join( X, composition( X,
% 9.24/9.68 converse( skol1 ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (9038) {G23,W8,D5,L1,V1,M1} P(8908,2414);d(88) { join( X,
% 9.24/9.68 composition( X, converse( skol1 ) ) ) ==> X }.
% 9.24/9.68 parent0: (61104) {G2,W8,D5,L1,V1,M1} { join( X, composition( X, converse(
% 9.24/9.68 skol1 ) ) ) ==> X }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61106) {G22,W9,D6,L1,V2,M1} { X ==> join( X, converse( meet( Y,
% 9.24/9.68 converse( X ) ) ) ) }.
% 9.24/9.68 parent0[0]: (2414) {G22,W9,D6,L1,V2,M1} P(2393,74);d(7) { join( X, converse
% 9.24/9.68 ( meet( Y, converse( X ) ) ) ) ==> X }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61108) {G23,W9,D6,L1,V1,M1} { X ==> join( X, converse(
% 9.24/9.68 composition( skol2, converse( X ) ) ) ) }.
% 9.24/9.68 parent0[0]: (8812) {G29,W9,D4,L1,V1,M1} P(8781,2365);d(712) { meet(
% 9.24/9.68 composition( skol2, X ), X ) ==> composition( skol2, X ) }.
% 9.24/9.68 parent1[0; 5]: (61106) {G22,W9,D6,L1,V2,M1} { X ==> join( X, converse(
% 9.24/9.68 meet( Y, converse( X ) ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := converse( X )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := composition( skol2, converse( X ) )
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61109) {G2,W8,D5,L1,V1,M1} { X ==> join( X, composition( X,
% 9.24/9.68 converse( skol2 ) ) ) }.
% 9.24/9.68 parent0[0]: (88) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 9.24/9.68 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 9.24/9.68 parent1[0; 4]: (61108) {G23,W9,D6,L1,V1,M1} { X ==> join( X, converse(
% 9.24/9.68 composition( skol2, converse( X ) ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := skol2
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61110) {G2,W8,D5,L1,V1,M1} { join( X, composition( X, converse(
% 9.24/9.68 skol2 ) ) ) ==> X }.
% 9.24/9.68 parent0[0]: (61109) {G2,W8,D5,L1,V1,M1} { X ==> join( X, composition( X,
% 9.24/9.68 converse( skol2 ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (9283) {G30,W8,D5,L1,V1,M1} P(8812,2414);d(88) { join( X,
% 9.24/9.68 composition( X, converse( skol2 ) ) ) ==> X }.
% 9.24/9.68 parent0: (61110) {G2,W8,D5,L1,V1,M1} { join( X, composition( X, converse(
% 9.24/9.68 skol2 ) ) ) ==> X }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61112) {G26,W8,D5,L1,V2,M1} { zero ==> meet( X, complement( join
% 9.24/9.68 ( Y, X ) ) ) }.
% 9.24/9.68 parent0[0]: (2630) {G26,W8,D5,L1,V2,M1} P(2624,1349) { meet( Y, complement
% 9.24/9.68 ( join( X, Y ) ) ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61113) {G27,W9,D5,L1,V1,M1} { zero ==> meet( composition( X,
% 9.24/9.68 converse( skol2 ) ), complement( X ) ) }.
% 9.24/9.68 parent0[0]: (9283) {G30,W8,D5,L1,V1,M1} P(8812,2414);d(88) { join( X,
% 9.24/9.68 composition( X, converse( skol2 ) ) ) ==> X }.
% 9.24/9.68 parent1[0; 8]: (61112) {G26,W8,D5,L1,V2,M1} { zero ==> meet( X, complement
% 9.24/9.68 ( join( Y, X ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := composition( X, converse( skol2 ) )
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61114) {G27,W9,D5,L1,V1,M1} { meet( composition( X, converse(
% 9.24/9.68 skol2 ) ), complement( X ) ) ==> zero }.
% 9.24/9.68 parent0[0]: (61113) {G27,W9,D5,L1,V1,M1} { zero ==> meet( composition( X,
% 9.24/9.68 converse( skol2 ) ), complement( X ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (9350) {G31,W9,D5,L1,V1,M1} P(9283,2630) { meet( composition(
% 9.24/9.68 X, converse( skol2 ) ), complement( X ) ) ==> zero }.
% 9.24/9.68 parent0: (61114) {G27,W9,D5,L1,V1,M1} { meet( composition( X, converse(
% 9.24/9.68 skol2 ) ), complement( X ) ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61116) {G31,W9,D5,L1,V1,M1} { zero ==> meet( composition( X,
% 9.24/9.68 converse( skol2 ) ), complement( X ) ) }.
% 9.24/9.68 parent0[0]: (9350) {G31,W9,D5,L1,V1,M1} P(9283,2630) { meet( composition( X
% 9.24/9.68 , converse( skol2 ) ), complement( X ) ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61117) {G17,W9,D5,L1,V1,M1} { zero ==> meet( composition(
% 9.24/9.68 complement( X ), converse( skol2 ) ), X ) }.
% 9.24/9.68 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.68 complement( X ) ) ==> X }.
% 9.24/9.68 parent1[0; 8]: (61116) {G31,W9,D5,L1,V1,M1} { zero ==> meet( composition(
% 9.24/9.68 X, converse( skol2 ) ), complement( X ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := complement( X )
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61118) {G17,W9,D5,L1,V1,M1} { meet( composition( complement( X )
% 9.24/9.68 , converse( skol2 ) ), X ) ==> zero }.
% 9.24/9.68 parent0[0]: (61117) {G17,W9,D5,L1,V1,M1} { zero ==> meet( composition(
% 9.24/9.68 complement( X ), converse( skol2 ) ), X ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (9419) {G32,W9,D5,L1,V1,M1} P(723,9350) { meet( composition(
% 9.24/9.68 complement( X ), converse( skol2 ) ), X ) ==> zero }.
% 9.24/9.68 parent0: (61118) {G17,W9,D5,L1,V1,M1} { meet( composition( complement( X )
% 9.24/9.68 , converse( skol2 ) ), X ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61120) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 9.24/9.68 complement( meet( Y, X ) ) ) }.
% 9.24/9.68 parent0[0]: (1322) {G18,W10,D5,L1,V2,M1} P(1195,12) { meet( meet( X, Y ),
% 9.24/9.68 complement( meet( Y, X ) ) ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61124) {G19,W12,D6,L1,V1,M1} { zero ==> meet( meet( X,
% 9.24/9.68 composition( complement( X ), converse( skol2 ) ) ), complement( zero ) )
% 9.24/9.68 }.
% 9.24/9.68 parent0[0]: (9419) {G32,W9,D5,L1,V1,M1} P(723,9350) { meet( composition(
% 9.24/9.68 complement( X ), converse( skol2 ) ), X ) ==> zero }.
% 9.24/9.68 parent1[0; 11]: (61120) {G18,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y
% 9.24/9.68 ), complement( meet( Y, X ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := composition( complement( X ), converse( skol2 ) )
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61125) {G14,W11,D6,L1,V1,M1} { zero ==> meet( meet( X,
% 9.24/9.68 composition( complement( X ), converse( skol2 ) ) ), top ) }.
% 9.24/9.68 parent0[0]: (336) {G13,W4,D3,L1,V0,M1} P(329,10) { complement( zero ) ==>
% 9.24/9.68 top }.
% 9.24/9.68 parent1[0; 10]: (61124) {G19,W12,D6,L1,V1,M1} { zero ==> meet( meet( X,
% 9.24/9.68 composition( complement( X ), converse( skol2 ) ) ), complement( zero ) )
% 9.24/9.68 }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61126) {G15,W9,D5,L1,V1,M1} { zero ==> meet( X, composition(
% 9.24/9.68 complement( X ), converse( skol2 ) ) ) }.
% 9.24/9.68 parent0[0]: (748) {G17,W5,D3,L1,V1,M1} S(716);d(723) { meet( X, top ) ==> X
% 9.24/9.68 }.
% 9.24/9.68 parent1[0; 2]: (61125) {G14,W11,D6,L1,V1,M1} { zero ==> meet( meet( X,
% 9.24/9.68 composition( complement( X ), converse( skol2 ) ) ), top ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := meet( X, composition( complement( X ), converse( skol2 ) ) )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61127) {G15,W9,D5,L1,V1,M1} { meet( X, composition( complement( X
% 9.24/9.68 ), converse( skol2 ) ) ) ==> zero }.
% 9.24/9.68 parent0[0]: (61126) {G15,W9,D5,L1,V1,M1} { zero ==> meet( X, composition(
% 9.24/9.68 complement( X ), converse( skol2 ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (9429) {G33,W9,D5,L1,V1,M1} P(9419,1322);d(336);d(748) { meet
% 9.24/9.68 ( X, composition( complement( X ), converse( skol2 ) ) ) ==> zero }.
% 9.24/9.68 parent0: (61127) {G15,W9,D5,L1,V1,M1} { meet( X, composition( complement(
% 9.24/9.68 X ), converse( skol2 ) ) ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61129) {G1,W28,D7,L1,V3,M1} { meet( composition( meet( X,
% 9.24/9.68 composition( Z, Y ) ), converse( Y ) ), Z ) ==> join( meet( composition(
% 9.24/9.68 X, converse( Y ) ), Z ), meet( composition( meet( X, composition( Z, Y )
% 9.24/9.68 ), converse( Y ) ), Z ) ) }.
% 9.24/9.68 parent0[0]: (158) {G1,W28,D7,L1,V3,M1} P(7,15) { join( meet( composition( Y
% 9.24/9.68 , converse( X ) ), Z ), meet( composition( meet( Y, composition( Z, X ) )
% 9.24/9.68 , converse( X ) ), Z ) ) ==> meet( composition( meet( Y, composition( Z,
% 9.24/9.68 X ) ), converse( X ) ), Z ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := X
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61135) {G2,W32,D7,L1,V1,M1} { meet( composition( meet( X,
% 9.24/9.68 composition( complement( X ), converse( skol2 ) ) ), converse( converse(
% 9.24/9.68 skol2 ) ) ), complement( X ) ) ==> join( meet( composition( X, converse(
% 9.24/9.68 converse( skol2 ) ) ), complement( X ) ), meet( composition( zero,
% 9.24/9.68 converse( converse( skol2 ) ) ), complement( X ) ) ) }.
% 9.24/9.68 parent0[0]: (9429) {G33,W9,D5,L1,V1,M1} P(9419,1322);d(336);d(748) { meet(
% 9.24/9.68 X, composition( complement( X ), converse( skol2 ) ) ) ==> zero }.
% 9.24/9.68 parent1[0; 26]: (61129) {G1,W28,D7,L1,V3,M1} { meet( composition( meet( X
% 9.24/9.68 , composition( Z, Y ) ), converse( Y ) ), Z ) ==> join( meet( composition
% 9.24/9.68 ( X, converse( Y ) ), Z ), meet( composition( meet( X, composition( Z, Y
% 9.24/9.68 ) ), converse( Y ) ), Z ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := converse( skol2 )
% 9.24/9.68 Z := complement( X )
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61137) {G3,W26,D7,L1,V1,M1} { meet( composition( zero, converse
% 9.24/9.68 ( converse( skol2 ) ) ), complement( X ) ) ==> join( meet( composition( X
% 9.24/9.68 , converse( converse( skol2 ) ) ), complement( X ) ), meet( composition(
% 9.24/9.68 zero, converse( converse( skol2 ) ) ), complement( X ) ) ) }.
% 9.24/9.68 parent0[0]: (9429) {G33,W9,D5,L1,V1,M1} P(9419,1322);d(336);d(748) { meet(
% 9.24/9.68 X, composition( complement( X ), converse( skol2 ) ) ) ==> zero }.
% 9.24/9.68 parent1[0; 3]: (61135) {G2,W32,D7,L1,V1,M1} { meet( composition( meet( X,
% 9.24/9.68 composition( complement( X ), converse( skol2 ) ) ), converse( converse(
% 9.24/9.68 skol2 ) ) ), complement( X ) ) ==> join( meet( composition( X, converse(
% 9.24/9.68 converse( skol2 ) ) ), complement( X ) ), meet( composition( zero,
% 9.24/9.68 converse( converse( skol2 ) ) ), complement( X ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61175) {G1,W24,D7,L1,V1,M1} { meet( composition( zero, converse
% 9.24/9.68 ( converse( skol2 ) ) ), complement( X ) ) ==> join( meet( composition( X
% 9.24/9.68 , converse( converse( skol2 ) ) ), complement( X ) ), meet( composition(
% 9.24/9.68 zero, skol2 ), complement( X ) ) ) }.
% 9.24/9.68 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 9.24/9.68 parent1[0; 21]: (61137) {G3,W26,D7,L1,V1,M1} { meet( composition( zero,
% 9.24/9.68 converse( converse( skol2 ) ) ), complement( X ) ) ==> join( meet(
% 9.24/9.68 composition( X, converse( converse( skol2 ) ) ), complement( X ) ), meet
% 9.24/9.68 ( composition( zero, converse( converse( skol2 ) ) ), complement( X ) ) )
% 9.24/9.68 }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := skol2
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61177) {G1,W22,D6,L1,V1,M1} { meet( composition( zero, converse
% 9.24/9.68 ( converse( skol2 ) ) ), complement( X ) ) ==> join( meet( composition( X
% 9.24/9.68 , skol2 ), complement( X ) ), meet( composition( zero, skol2 ),
% 9.24/9.68 complement( X ) ) ) }.
% 9.24/9.68 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 9.24/9.68 parent1[0; 13]: (61175) {G1,W24,D7,L1,V1,M1} { meet( composition( zero,
% 9.24/9.68 converse( converse( skol2 ) ) ), complement( X ) ) ==> join( meet(
% 9.24/9.68 composition( X, converse( converse( skol2 ) ) ), complement( X ) ), meet
% 9.24/9.68 ( composition( zero, skol2 ), complement( X ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := skol2
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61195) {G2,W20,D6,L1,V1,M1} { meet( composition( zero, converse
% 9.24/9.68 ( converse( skol2 ) ) ), complement( X ) ) ==> join( meet( composition( X
% 9.24/9.68 , skol2 ), complement( X ) ), meet( zero, complement( X ) ) ) }.
% 9.24/9.68 parent0[0]: (968) {G22,W5,D3,L1,V1,M1} P(966,89);d(742) { composition( zero
% 9.24/9.68 , X ) ==> zero }.
% 9.24/9.68 parent1[0; 17]: (61177) {G1,W22,D6,L1,V1,M1} { meet( composition( zero,
% 9.24/9.68 converse( converse( skol2 ) ) ), complement( X ) ) ==> join( meet(
% 9.24/9.68 composition( X, skol2 ), complement( X ) ), meet( composition( zero,
% 9.24/9.68 skol2 ), complement( X ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := skol2
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61196) {G3,W16,D5,L1,V1,M1} { meet( zero, complement( X ) ) ==>
% 9.24/9.68 join( meet( composition( X, skol2 ), complement( X ) ), meet( zero,
% 9.24/9.68 complement( X ) ) ) }.
% 9.24/9.68 parent0[0]: (968) {G22,W5,D3,L1,V1,M1} P(966,89);d(742) { composition( zero
% 9.24/9.68 , X ) ==> zero }.
% 9.24/9.68 parent1[0; 2]: (61195) {G2,W20,D6,L1,V1,M1} { meet( composition( zero,
% 9.24/9.68 converse( converse( skol2 ) ) ), complement( X ) ) ==> join( meet(
% 9.24/9.68 composition( X, skol2 ), complement( X ) ), meet( zero, complement( X ) )
% 9.24/9.68 ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := converse( converse( skol2 ) )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61201) {G4,W13,D5,L1,V1,M1} { meet( zero, complement( X ) ) ==>
% 9.24/9.68 join( meet( composition( X, skol2 ), complement( X ) ), zero ) }.
% 9.24/9.68 parent0[0]: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero,
% 9.24/9.68 X ) ==> zero }.
% 9.24/9.68 parent1[0; 12]: (61196) {G3,W16,D5,L1,V1,M1} { meet( zero, complement( X )
% 9.24/9.68 ) ==> join( meet( composition( X, skol2 ), complement( X ) ), meet( zero
% 9.24/9.68 , complement( X ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := complement( X )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61202) {G5,W10,D5,L1,V1,M1} { zero ==> join( meet( composition(
% 9.24/9.68 X, skol2 ), complement( X ) ), zero ) }.
% 9.24/9.68 parent0[0]: (339) {G14,W5,D3,L1,V1,M1} P(336,3);d(298);d(51) { meet( zero,
% 9.24/9.68 X ) ==> zero }.
% 9.24/9.68 parent1[0; 1]: (61201) {G4,W13,D5,L1,V1,M1} { meet( zero, complement( X )
% 9.24/9.68 ) ==> join( meet( composition( X, skol2 ), complement( X ) ), zero ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := complement( X )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61205) {G6,W8,D4,L1,V1,M1} { zero ==> meet( composition( X,
% 9.24/9.68 skol2 ), complement( X ) ) }.
% 9.24/9.68 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.68 }.
% 9.24/9.68 parent1[0; 2]: (61202) {G5,W10,D5,L1,V1,M1} { zero ==> join( meet(
% 9.24/9.68 composition( X, skol2 ), complement( X ) ), zero ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := meet( composition( X, skol2 ), complement( X ) )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61206) {G6,W8,D4,L1,V1,M1} { meet( composition( X, skol2 ),
% 9.24/9.68 complement( X ) ) ==> zero }.
% 9.24/9.68 parent0[0]: (61205) {G6,W8,D4,L1,V1,M1} { zero ==> meet( composition( X,
% 9.24/9.68 skol2 ), complement( X ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (9436) {G34,W8,D4,L1,V1,M1} P(9429,158);d(7);d(968);d(339);d(
% 9.24/9.68 712) { meet( composition( X, skol2 ), complement( X ) ) ==> zero }.
% 9.24/9.68 parent0: (61206) {G6,W8,D4,L1,V1,M1} { meet( composition( X, skol2 ),
% 9.24/9.68 complement( X ) ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61208) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement( Y
% 9.24/9.68 ) ), meet( X, Y ) ) }.
% 9.24/9.68 parent0[0]: (309) {G2,W10,D5,L1,V2,M1} P(3,37) { join( meet( X, complement
% 9.24/9.68 ( Y ) ), meet( X, Y ) ) ==> X }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61210) {G3,W11,D5,L1,V1,M1} { composition( X, skol2 ) ==> join(
% 9.24/9.68 zero, meet( composition( X, skol2 ), X ) ) }.
% 9.24/9.68 parent0[0]: (9436) {G34,W8,D4,L1,V1,M1} P(9429,158);d(7);d(968);d(339);d(
% 9.24/9.68 712) { meet( composition( X, skol2 ), complement( X ) ) ==> zero }.
% 9.24/9.68 parent1[0; 5]: (61208) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X,
% 9.24/9.68 complement( Y ) ), meet( X, Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := composition( X, skol2 )
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61212) {G4,W9,D4,L1,V1,M1} { composition( X, skol2 ) ==> meet(
% 9.24/9.68 composition( X, skol2 ), X ) }.
% 9.24/9.68 parent0[0]: (713) {G15,W5,D3,L1,V1,M1} P(321,27);d(712);d(712) { join( zero
% 9.24/9.68 , X ) ==> X }.
% 9.24/9.68 parent1[0; 4]: (61210) {G3,W11,D5,L1,V1,M1} { composition( X, skol2 ) ==>
% 9.24/9.68 join( zero, meet( composition( X, skol2 ), X ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := meet( composition( X, skol2 ), X )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61213) {G4,W9,D4,L1,V1,M1} { meet( composition( X, skol2 ), X )
% 9.24/9.68 ==> composition( X, skol2 ) }.
% 9.24/9.68 parent0[0]: (61212) {G4,W9,D4,L1,V1,M1} { composition( X, skol2 ) ==> meet
% 9.24/9.68 ( composition( X, skol2 ), X ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (9443) {G35,W9,D4,L1,V1,M1} P(9436,309);d(713) { meet(
% 9.24/9.68 composition( X, skol2 ), X ) ==> composition( X, skol2 ) }.
% 9.24/9.68 parent0: (61213) {G4,W9,D4,L1,V1,M1} { meet( composition( X, skol2 ), X )
% 9.24/9.68 ==> composition( X, skol2 ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61215) {G5,W15,D5,L1,V3,M1} { join( X, composition( join( Y, one
% 9.24/9.68 ), Z ) ) = join( join( X, composition( Y, Z ) ), Z ) }.
% 9.24/9.68 parent0[0]: (818) {G5,W15,D5,L1,V3,M1} P(805,62) { join( join( Y,
% 9.24/9.68 composition( Z, X ) ), X ) = join( Y, composition( join( Z, one ), X ) )
% 9.24/9.68 }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Z
% 9.24/9.68 Y := X
% 9.24/9.68 Z := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61217) {G6,W14,D6,L1,V0,M1} { join( complement( skol1 ),
% 9.24/9.68 composition( join( complement( one ), one ), skol2 ) ) = join( complement
% 9.24/9.68 ( skol1 ), skol2 ) }.
% 9.24/9.68 parent0[0]: (6947) {G40,W10,D5,L1,V0,M1} P(6753,1185) { join( complement(
% 9.24/9.68 skol1 ), composition( complement( one ), skol2 ) ) ==> complement( skol1
% 9.24/9.68 ) }.
% 9.24/9.68 parent1[0; 11]: (61215) {G5,W15,D5,L1,V3,M1} { join( X, composition( join
% 9.24/9.68 ( Y, one ), Z ) ) = join( join( X, composition( Y, Z ) ), Z ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := complement( skol1 )
% 9.24/9.68 Y := complement( one )
% 9.24/9.68 Z := skol2
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61218) {G2,W11,D4,L1,V0,M1} { join( complement( skol1 ),
% 9.24/9.68 composition( top, skol2 ) ) = join( complement( skol1 ), skol2 ) }.
% 9.24/9.68 parent0[0]: (21) {G1,W6,D4,L1,V1,M1} P(11,0) { join( complement( X ), X )
% 9.24/9.68 ==> top }.
% 9.24/9.68 parent1[0; 5]: (61217) {G6,W14,D6,L1,V0,M1} { join( complement( skol1 ),
% 9.24/9.68 composition( join( complement( one ), one ), skol2 ) ) = join( complement
% 9.24/9.68 ( skol1 ), skol2 ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := one
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (19748) {G41,W11,D4,L1,V0,M1} P(6947,818);d(21) { join(
% 9.24/9.68 complement( skol1 ), composition( top, skol2 ) ) ==> join( complement(
% 9.24/9.68 skol1 ), skol2 ) }.
% 9.24/9.68 parent0: (61218) {G2,W11,D4,L1,V0,M1} { join( complement( skol1 ),
% 9.24/9.68 composition( top, skol2 ) ) = join( complement( skol1 ), skol2 ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61224) {G24,W13,D6,L1,V0,M1} { join( skol1, meet( composition(
% 9.24/9.68 skol1, converse( skol1 ) ), one ) ) ==> composition( skol1, converse(
% 9.24/9.68 skol1 ) ) }.
% 9.24/9.68 parent0[0]: (6773) {G39,W11,D5,L1,V0,M1} P(6743,309);d(713) { meet(
% 9.24/9.68 composition( skol1, converse( skol1 ) ), one ) ==> composition( skol1,
% 9.24/9.68 converse( skol1 ) ) }.
% 9.24/9.68 parent1[0; 9]: (1681) {G23,W15,D6,L1,V0,M1} P(720,143);d(5);d(836) { join(
% 9.24/9.68 skol1, meet( composition( skol1, converse( skol1 ) ), one ) ) ==> meet(
% 9.24/9.68 composition( skol1, converse( skol1 ) ), one ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61225) {G25,W11,D5,L1,V0,M1} { join( skol1, composition( skol1,
% 9.24/9.68 converse( skol1 ) ) ) ==> composition( skol1, converse( skol1 ) ) }.
% 9.24/9.68 parent0[0]: (6773) {G39,W11,D5,L1,V0,M1} P(6743,309);d(713) { meet(
% 9.24/9.68 composition( skol1, converse( skol1 ) ), one ) ==> composition( skol1,
% 9.24/9.68 converse( skol1 ) ) }.
% 9.24/9.68 parent1[0; 3]: (61224) {G24,W13,D6,L1,V0,M1} { join( skol1, meet(
% 9.24/9.68 composition( skol1, converse( skol1 ) ), one ) ) ==> composition( skol1,
% 9.24/9.68 converse( skol1 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61226) {G24,W6,D4,L1,V0,M1} { skol1 ==> composition( skol1,
% 9.24/9.68 converse( skol1 ) ) }.
% 9.24/9.68 parent0[0]: (9038) {G23,W8,D5,L1,V1,M1} P(8908,2414);d(88) { join( X,
% 9.24/9.68 composition( X, converse( skol1 ) ) ) ==> X }.
% 9.24/9.68 parent1[0; 1]: (61225) {G25,W11,D5,L1,V0,M1} { join( skol1, composition(
% 9.24/9.68 skol1, converse( skol1 ) ) ) ==> composition( skol1, converse( skol1 ) )
% 9.24/9.68 }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := skol1
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61227) {G24,W6,D4,L1,V0,M1} { composition( skol1, converse( skol1
% 9.24/9.68 ) ) ==> skol1 }.
% 9.24/9.68 parent0[0]: (61226) {G24,W6,D4,L1,V0,M1} { skol1 ==> composition( skol1,
% 9.24/9.68 converse( skol1 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (20239) {G40,W6,D4,L1,V0,M1} S(1681);d(6773);d(9038) {
% 9.24/9.68 composition( skol1, converse( skol1 ) ) ==> skol1 }.
% 9.24/9.68 parent0: (61227) {G24,W6,D4,L1,V0,M1} { composition( skol1, converse(
% 9.24/9.68 skol1 ) ) ==> skol1 }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61232) {G24,W13,D6,L1,V0,M1} { join( skol2, meet( composition(
% 9.24/9.68 skol2, converse( skol2 ) ), one ) ) ==> composition( skol2, converse(
% 9.24/9.68 skol2 ) ) }.
% 9.24/9.68 parent0[0]: (7412) {G39,W11,D5,L1,V0,M1} P(7409,309);d(713) { meet(
% 9.24/9.68 composition( skol2, converse( skol2 ) ), one ) ==> composition( skol2,
% 9.24/9.68 converse( skol2 ) ) }.
% 9.24/9.68 parent1[0; 9]: (1682) {G23,W15,D6,L1,V0,M1} P(718,143);d(5);d(850) { join(
% 9.24/9.68 skol2, meet( composition( skol2, converse( skol2 ) ), one ) ) ==> meet(
% 9.24/9.68 composition( skol2, converse( skol2 ) ), one ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61233) {G25,W11,D5,L1,V0,M1} { join( skol2, composition( skol2,
% 9.24/9.68 converse( skol2 ) ) ) ==> composition( skol2, converse( skol2 ) ) }.
% 9.24/9.68 parent0[0]: (7412) {G39,W11,D5,L1,V0,M1} P(7409,309);d(713) { meet(
% 9.24/9.68 composition( skol2, converse( skol2 ) ), one ) ==> composition( skol2,
% 9.24/9.68 converse( skol2 ) ) }.
% 9.24/9.68 parent1[0; 3]: (61232) {G24,W13,D6,L1,V0,M1} { join( skol2, meet(
% 9.24/9.68 composition( skol2, converse( skol2 ) ), one ) ) ==> composition( skol2,
% 9.24/9.68 converse( skol2 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61234) {G26,W6,D4,L1,V0,M1} { skol2 ==> composition( skol2,
% 9.24/9.68 converse( skol2 ) ) }.
% 9.24/9.68 parent0[0]: (9283) {G30,W8,D5,L1,V1,M1} P(8812,2414);d(88) { join( X,
% 9.24/9.68 composition( X, converse( skol2 ) ) ) ==> X }.
% 9.24/9.68 parent1[0; 1]: (61233) {G25,W11,D5,L1,V0,M1} { join( skol2, composition(
% 9.24/9.68 skol2, converse( skol2 ) ) ) ==> composition( skol2, converse( skol2 ) )
% 9.24/9.68 }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := skol2
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61235) {G26,W6,D4,L1,V0,M1} { composition( skol2, converse( skol2
% 9.24/9.68 ) ) ==> skol2 }.
% 9.24/9.68 parent0[0]: (61234) {G26,W6,D4,L1,V0,M1} { skol2 ==> composition( skol2,
% 9.24/9.68 converse( skol2 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (20240) {G40,W6,D4,L1,V0,M1} S(1682);d(7412);d(9283) {
% 9.24/9.68 composition( skol2, converse( skol2 ) ) ==> skol2 }.
% 9.24/9.68 parent0: (61235) {G26,W6,D4,L1,V0,M1} { composition( skol2, converse(
% 9.24/9.68 skol2 ) ) ==> skol2 }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61237) {G1,W10,D5,L1,V2,M1} { composition( Y, converse( X ) ) ==>
% 9.24/9.68 converse( composition( X, converse( Y ) ) ) }.
% 9.24/9.68 parent0[0]: (88) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 9.24/9.68 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61239) {G2,W7,D4,L1,V0,M1} { composition( skol1, converse( skol1
% 9.24/9.68 ) ) ==> converse( skol1 ) }.
% 9.24/9.68 parent0[0]: (20239) {G40,W6,D4,L1,V0,M1} S(1681);d(6773);d(9038) {
% 9.24/9.68 composition( skol1, converse( skol1 ) ) ==> skol1 }.
% 9.24/9.68 parent1[0; 6]: (61237) {G1,W10,D5,L1,V2,M1} { composition( Y, converse( X
% 9.24/9.68 ) ) ==> converse( composition( X, converse( Y ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := skol1
% 9.24/9.68 Y := skol1
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61240) {G3,W4,D3,L1,V0,M1} { skol1 ==> converse( skol1 ) }.
% 9.24/9.68 parent0[0]: (20239) {G40,W6,D4,L1,V0,M1} S(1681);d(6773);d(9038) {
% 9.24/9.68 composition( skol1, converse( skol1 ) ) ==> skol1 }.
% 9.24/9.68 parent1[0; 1]: (61239) {G2,W7,D4,L1,V0,M1} { composition( skol1, converse
% 9.24/9.68 ( skol1 ) ) ==> converse( skol1 ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61242) {G3,W4,D3,L1,V0,M1} { converse( skol1 ) ==> skol1 }.
% 9.24/9.68 parent0[0]: (61240) {G3,W4,D3,L1,V0,M1} { skol1 ==> converse( skol1 ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (20290) {G41,W4,D3,L1,V0,M1} P(20239,88) { converse( skol1 )
% 9.24/9.68 ==> skol1 }.
% 9.24/9.68 parent0: (61242) {G3,W4,D3,L1,V0,M1} { converse( skol1 ) ==> skol1 }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61245) {G1,W10,D5,L1,V2,M1} { composition( Y, converse( X ) ) ==>
% 9.24/9.68 converse( composition( X, converse( Y ) ) ) }.
% 9.24/9.68 parent0[0]: (88) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 9.24/9.68 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61247) {G2,W9,D4,L1,V1,M1} { composition( skol1, converse( X ) )
% 9.24/9.68 ==> converse( composition( X, skol1 ) ) }.
% 9.24/9.68 parent0[0]: (20290) {G41,W4,D3,L1,V0,M1} P(20239,88) { converse( skol1 )
% 9.24/9.68 ==> skol1 }.
% 9.24/9.68 parent1[0; 8]: (61245) {G1,W10,D5,L1,V2,M1} { composition( Y, converse( X
% 9.24/9.68 ) ) ==> converse( composition( X, converse( Y ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := skol1
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (20352) {G42,W9,D4,L1,V1,M1} P(20290,88) { composition( skol1
% 9.24/9.68 , converse( X ) ) ==> converse( composition( X, skol1 ) ) }.
% 9.24/9.68 parent0: (61247) {G2,W9,D4,L1,V1,M1} { composition( skol1, converse( X ) )
% 9.24/9.68 ==> converse( composition( X, skol1 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61251) {G1,W10,D5,L1,V2,M1} { composition( Y, converse( X ) ) ==>
% 9.24/9.68 converse( composition( X, converse( Y ) ) ) }.
% 9.24/9.68 parent0[0]: (88) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 9.24/9.68 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61253) {G2,W7,D4,L1,V0,M1} { composition( skol2, converse( skol2
% 9.24/9.68 ) ) ==> converse( skol2 ) }.
% 9.24/9.68 parent0[0]: (20240) {G40,W6,D4,L1,V0,M1} S(1682);d(7412);d(9283) {
% 9.24/9.68 composition( skol2, converse( skol2 ) ) ==> skol2 }.
% 9.24/9.68 parent1[0; 6]: (61251) {G1,W10,D5,L1,V2,M1} { composition( Y, converse( X
% 9.24/9.68 ) ) ==> converse( composition( X, converse( Y ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := skol2
% 9.24/9.68 Y := skol2
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61254) {G3,W4,D3,L1,V0,M1} { skol2 ==> converse( skol2 ) }.
% 9.24/9.68 parent0[0]: (20240) {G40,W6,D4,L1,V0,M1} S(1682);d(7412);d(9283) {
% 9.24/9.68 composition( skol2, converse( skol2 ) ) ==> skol2 }.
% 9.24/9.68 parent1[0; 1]: (61253) {G2,W7,D4,L1,V0,M1} { composition( skol2, converse
% 9.24/9.68 ( skol2 ) ) ==> converse( skol2 ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61256) {G3,W4,D3,L1,V0,M1} { converse( skol2 ) ==> skol2 }.
% 9.24/9.68 parent0[0]: (61254) {G3,W4,D3,L1,V0,M1} { skol2 ==> converse( skol2 ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (20664) {G41,W4,D3,L1,V0,M1} P(20240,88) { converse( skol2 )
% 9.24/9.68 ==> skol2 }.
% 9.24/9.68 parent0: (61256) {G3,W4,D3,L1,V0,M1} { converse( skol2 ) ==> skol2 }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61259) {G40,W6,D4,L1,V0,M1} { skol2 ==> composition( skol2,
% 9.24/9.68 converse( skol2 ) ) }.
% 9.24/9.68 parent0[0]: (20240) {G40,W6,D4,L1,V0,M1} S(1682);d(7412);d(9283) {
% 9.24/9.68 composition( skol2, converse( skol2 ) ) ==> skol2 }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61260) {G41,W5,D3,L1,V0,M1} { skol2 ==> composition( skol2,
% 9.24/9.68 skol2 ) }.
% 9.24/9.68 parent0[0]: (20664) {G41,W4,D3,L1,V0,M1} P(20240,88) { converse( skol2 )
% 9.24/9.68 ==> skol2 }.
% 9.24/9.68 parent1[0; 4]: (61259) {G40,W6,D4,L1,V0,M1} { skol2 ==> composition( skol2
% 9.24/9.68 , converse( skol2 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61261) {G41,W5,D3,L1,V0,M1} { composition( skol2, skol2 ) ==>
% 9.24/9.68 skol2 }.
% 9.24/9.68 parent0[0]: (61260) {G41,W5,D3,L1,V0,M1} { skol2 ==> composition( skol2,
% 9.24/9.68 skol2 ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (20671) {G42,W5,D3,L1,V0,M1} P(20664,20240) { composition(
% 9.24/9.68 skol2, skol2 ) ==> skol2 }.
% 9.24/9.68 parent0: (61261) {G41,W5,D3,L1,V0,M1} { composition( skol2, skol2 ) ==>
% 9.24/9.68 skol2 }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61263) {G1,W10,D5,L1,V2,M1} { composition( converse( Y ), X ) ==>
% 9.24/9.68 converse( composition( converse( X ), Y ) ) }.
% 9.24/9.68 parent0[0]: (89) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition(
% 9.24/9.68 converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61265) {G2,W9,D4,L1,V1,M1} { composition( converse( X ), skol2 )
% 9.24/9.68 ==> converse( composition( skol2, X ) ) }.
% 9.24/9.68 parent0[0]: (20664) {G41,W4,D3,L1,V0,M1} P(20240,88) { converse( skol2 )
% 9.24/9.68 ==> skol2 }.
% 9.24/9.68 parent1[0; 7]: (61263) {G1,W10,D5,L1,V2,M1} { composition( converse( Y ),
% 9.24/9.68 X ) ==> converse( composition( converse( X ), Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := skol2
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (20721) {G42,W9,D4,L1,V1,M1} P(20664,89) { composition(
% 9.24/9.68 converse( X ), skol2 ) ==> converse( composition( skol2, X ) ) }.
% 9.24/9.68 parent0: (61265) {G2,W9,D4,L1,V1,M1} { composition( converse( X ), skol2 )
% 9.24/9.68 ==> converse( composition( skol2, X ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61269) {G42,W9,D4,L1,V1,M1} { converse( composition( skol2, X ) )
% 9.24/9.68 ==> composition( converse( X ), skol2 ) }.
% 9.24/9.68 parent0[0]: (20721) {G42,W9,D4,L1,V1,M1} P(20664,89) { composition(
% 9.24/9.68 converse( X ), skol2 ) ==> converse( composition( skol2, X ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61270) {G42,W8,D4,L1,V0,M1} { converse( composition( skol2,
% 9.24/9.68 skol1 ) ) ==> composition( skol1, skol2 ) }.
% 9.24/9.68 parent0[0]: (20290) {G41,W4,D3,L1,V0,M1} P(20239,88) { converse( skol1 )
% 9.24/9.68 ==> skol1 }.
% 9.24/9.68 parent1[0; 6]: (61269) {G42,W9,D4,L1,V1,M1} { converse( composition( skol2
% 9.24/9.68 , X ) ) ==> composition( converse( X ), skol2 ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := skol1
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (21266) {G43,W8,D4,L1,V0,M1} P(20290,20721) { converse(
% 9.24/9.68 composition( skol2, skol1 ) ) ==> composition( skol1, skol2 ) }.
% 9.24/9.68 parent0: (61270) {G42,W8,D4,L1,V0,M1} { converse( composition( skol2,
% 9.24/9.68 skol1 ) ) ==> composition( skol1, skol2 ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61281) {G18,W16,D6,L1,V3,M1} { complement( join( complement( X )
% 9.24/9.68 , join( Y, complement( Z ) ) ) ) = complement( join( complement( meet( Z
% 9.24/9.68 , X ) ), Y ) ) }.
% 9.24/9.68 parent0[0]: (1191) {G17,W14,D5,L1,V3,M1} P(726,27) { join( join( Z,
% 9.24/9.68 complement( X ) ), complement( Y ) ) ==> join( complement( meet( X, Y ) )
% 9.24/9.68 , Z ) }.
% 9.24/9.68 parent1[0; 10]: (2525) {G28,W9,D4,L1,V2,M1} P(73,2319);d(2319) { complement
% 9.24/9.68 ( join( Y, X ) ) = complement( join( X, Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Z
% 9.24/9.68 Y := X
% 9.24/9.68 Z := Y
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := join( Y, complement( Z ) )
% 9.24/9.68 Y := complement( X )
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61283) {G18,W15,D6,L1,V3,M1} { complement( join( complement( X )
% 9.24/9.68 , join( Y, complement( Z ) ) ) ) = meet( meet( Z, X ), complement( Y ) )
% 9.24/9.68 }.
% 9.24/9.68 parent0[0]: (741) {G17,W10,D5,L1,V2,M1} P(723,3) { complement( join(
% 9.24/9.68 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 9.24/9.68 parent1[0; 9]: (61281) {G18,W16,D6,L1,V3,M1} { complement( join(
% 9.24/9.68 complement( X ), join( Y, complement( Z ) ) ) ) = complement( join(
% 9.24/9.68 complement( meet( Z, X ) ), Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := meet( Z, X )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61285) {G18,W14,D6,L1,V3,M1} { meet( X, complement( join( Y,
% 9.24/9.68 complement( Z ) ) ) ) = meet( meet( Z, X ), complement( Y ) ) }.
% 9.24/9.68 parent0[0]: (741) {G17,W10,D5,L1,V2,M1} P(723,3) { complement( join(
% 9.24/9.68 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 9.24/9.68 parent1[0; 1]: (61283) {G18,W15,D6,L1,V3,M1} { complement( join(
% 9.24/9.68 complement( X ), join( Y, complement( Z ) ) ) ) = meet( meet( Z, X ),
% 9.24/9.68 complement( Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := join( Y, complement( Z ) )
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61286) {G18,W13,D5,L1,V3,M1} { meet( X, meet( complement( Y ), Z
% 9.24/9.68 ) ) = meet( meet( Z, X ), complement( Y ) ) }.
% 9.24/9.68 parent0[0]: (740) {G17,W10,D5,L1,V2,M1} P(723,3) { complement( join( X,
% 9.24/9.68 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 9.24/9.68 parent1[0; 3]: (61285) {G18,W14,D6,L1,V3,M1} { meet( X, complement( join(
% 9.24/9.68 Y, complement( Z ) ) ) ) = meet( meet( Z, X ), complement( Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := Z
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (28543) {G29,W13,D5,L1,V3,M1} P(1191,2525);d(741);d(741);d(740
% 9.24/9.68 ) { meet( Z, meet( complement( X ), Y ) ) ==> meet( meet( Y, Z ),
% 9.24/9.68 complement( X ) ) }.
% 9.24/9.68 parent0: (61286) {G18,W13,D5,L1,V3,M1} { meet( X, meet( complement( Y ), Z
% 9.24/9.68 ) ) = meet( meet( Z, X ), complement( Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Z
% 9.24/9.68 Y := X
% 9.24/9.68 Z := Y
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61289) {G17,W10,D5,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 9.24/9.68 complement( join( X, complement( Y ) ) ) }.
% 9.24/9.68 parent0[0]: (740) {G17,W10,D5,L1,V2,M1} P(723,3) { complement( join( X,
% 9.24/9.68 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61294) {G18,W14,D8,L1,V2,M1} { meet( complement( complement(
% 9.24/9.68 meet( join( complement( X ), complement( Y ) ), X ) ) ), Y ) ==>
% 9.24/9.68 complement( top ) }.
% 9.24/9.68 parent0[0]: (1192) {G17,W11,D7,L1,V2,M1} P(726,22) { join( complement( meet
% 9.24/9.68 ( join( complement( X ), Y ), X ) ), Y ) ==> top }.
% 9.24/9.68 parent1[0; 13]: (61289) {G17,W10,D5,L1,V2,M1} { meet( complement( X ), Y )
% 9.24/9.68 ==> complement( join( X, complement( Y ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := complement( Y )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := complement( meet( join( complement( X ), complement( Y ) ), X ) )
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61295) {G2,W13,D8,L1,V2,M1} { meet( complement( complement( meet
% 9.24/9.68 ( join( complement( X ), complement( Y ) ), X ) ) ), Y ) ==> zero }.
% 9.24/9.68 parent0[0]: (51) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 9.24/9.68 zero }.
% 9.24/9.68 parent1[0; 12]: (61294) {G18,W14,D8,L1,V2,M1} { meet( complement(
% 9.24/9.68 complement( meet( join( complement( X ), complement( Y ) ), X ) ) ), Y )
% 9.24/9.68 ==> complement( top ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61296) {G3,W11,D6,L1,V2,M1} { meet( meet( join( complement( X )
% 9.24/9.68 , complement( Y ) ), X ), Y ) ==> zero }.
% 9.24/9.68 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.68 complement( X ) ) ==> X }.
% 9.24/9.68 parent1[0; 2]: (61295) {G2,W13,D8,L1,V2,M1} { meet( complement( complement
% 9.24/9.68 ( meet( join( complement( X ), complement( Y ) ), X ) ) ), Y ) ==> zero
% 9.24/9.68 }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := meet( join( complement( X ), complement( Y ) ), X )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61297) {G4,W10,D6,L1,V2,M1} { meet( meet( complement( meet( X, Y
% 9.24/9.68 ) ), X ), Y ) ==> zero }.
% 9.24/9.68 parent0[0]: (726) {G16,W10,D4,L1,V2,M1} P(722,47);d(51);d(713) { join(
% 9.24/9.68 complement( X ), complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 9.24/9.68 parent1[0; 3]: (61296) {G3,W11,D6,L1,V2,M1} { meet( meet( join( complement
% 9.24/9.68 ( X ), complement( Y ) ), X ), Y ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (28625) {G18,W10,D6,L1,V2,M1} P(1192,740);d(51);d(723);d(726)
% 9.24/9.68 { meet( meet( complement( meet( X, Y ) ), X ), Y ) ==> zero }.
% 9.24/9.68 parent0: (61297) {G4,W10,D6,L1,V2,M1} { meet( meet( complement( meet( X, Y
% 9.24/9.68 ) ), X ), Y ) ==> zero }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61300) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement( Y
% 9.24/9.68 ) ), meet( X, Y ) ) }.
% 9.24/9.68 parent0[0]: (309) {G2,W10,D5,L1,V2,M1} P(3,37) { join( meet( X, complement
% 9.24/9.68 ( Y ) ), meet( X, Y ) ) ==> X }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61305) {G3,W18,D7,L1,V2,M1} { meet( complement( meet( X, Y ) ),
% 9.24/9.68 X ) ==> join( meet( meet( complement( meet( X, Y ) ), X ), complement( Y
% 9.24/9.68 ) ), zero ) }.
% 9.24/9.68 parent0[0]: (28625) {G18,W10,D6,L1,V2,M1} P(1192,740);d(51);d(723);d(726)
% 9.24/9.68 { meet( meet( complement( meet( X, Y ) ), X ), Y ) ==> zero }.
% 9.24/9.68 parent1[0; 17]: (61300) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X,
% 9.24/9.68 complement( Y ) ), meet( X, Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := meet( complement( meet( X, Y ) ), X )
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61306) {G4,W16,D6,L1,V2,M1} { meet( complement( meet( X, Y ) ),
% 9.24/9.68 X ) ==> meet( meet( complement( meet( X, Y ) ), X ), complement( Y ) )
% 9.24/9.68 }.
% 9.24/9.68 parent0[0]: (712) {G14,W5,D3,L1,V1,M1} P(316,321) { join( X, zero ) ==> X
% 9.24/9.68 }.
% 9.24/9.68 parent1[0; 7]: (61305) {G3,W18,D7,L1,V2,M1} { meet( complement( meet( X, Y
% 9.24/9.68 ) ), X ) ==> join( meet( meet( complement( meet( X, Y ) ), X ),
% 9.24/9.68 complement( Y ) ), zero ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := meet( meet( complement( meet( X, Y ) ), X ), complement( Y ) )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61307) {G5,W15,D6,L1,V2,M1} { meet( complement( meet( X, Y ) ),
% 9.24/9.68 X ) ==> meet( complement( join( meet( X, Y ), Y ) ), X ) }.
% 9.24/9.68 parent0[0]: (6094) {G19,W14,D5,L1,V3,M1} P(740,6091);d(6092) { meet( meet(
% 9.24/9.68 complement( X ), Y ), complement( Z ) ) ==> meet( complement( join( X, Z
% 9.24/9.68 ) ), Y ) }.
% 9.24/9.68 parent1[0; 7]: (61306) {G4,W16,D6,L1,V2,M1} { meet( complement( meet( X, Y
% 9.24/9.68 ) ), X ) ==> meet( meet( complement( meet( X, Y ) ), X ), complement( Y
% 9.24/9.68 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := meet( X, Y )
% 9.24/9.68 Y := X
% 9.24/9.68 Z := Y
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61308) {G6,W11,D5,L1,V2,M1} { meet( complement( meet( X, Y ) ),
% 9.24/9.68 X ) ==> meet( complement( Y ), X ) }.
% 9.24/9.68 parent0[0]: (2425) {G22,W7,D4,L1,V2,M1} P(2393,0) { join( meet( Y, X ), X )
% 9.24/9.68 ==> X }.
% 9.24/9.68 parent1[0; 9]: (61307) {G5,W15,D6,L1,V2,M1} { meet( complement( meet( X, Y
% 9.24/9.68 ) ), X ) ==> meet( complement( join( meet( X, Y ), Y ) ), X ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (28653) {G23,W11,D5,L1,V2,M1} P(28625,309);d(712);d(6094);d(
% 9.24/9.68 2425) { meet( complement( meet( X, Y ) ), X ) ==> meet( complement( Y ),
% 9.24/9.68 X ) }.
% 9.24/9.68 parent0: (61308) {G6,W11,D5,L1,V2,M1} { meet( complement( meet( X, Y ) ),
% 9.24/9.68 X ) ==> meet( complement( Y ), X ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61311) {G20,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement( Y
% 9.24/9.68 ) ), meet( Y, X ) ) }.
% 9.24/9.68 parent0[0]: (5815) {G20,W10,D5,L1,V2,M1} P(2364,0) { join( meet( Y,
% 9.24/9.68 complement( X ) ), meet( X, Y ) ) ==> Y }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61316) {G19,W19,D8,L1,V2,M1} { meet( complement( meet( X,
% 9.24/9.68 complement( Y ) ) ), X ) ==> join( zero, meet( Y, meet( complement( meet
% 9.24/9.68 ( X, complement( Y ) ) ), X ) ) ) }.
% 9.24/9.68 parent0[0]: (28625) {G18,W10,D6,L1,V2,M1} P(1192,740);d(51);d(723);d(726)
% 9.24/9.68 { meet( meet( complement( meet( X, Y ) ), X ), Y ) ==> zero }.
% 9.24/9.68 parent1[0; 9]: (61311) {G20,W10,D5,L1,V2,M1} { X ==> join( meet( X,
% 9.24/9.68 complement( Y ) ), meet( Y, X ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := complement( Y )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := meet( complement( meet( X, complement( Y ) ) ), X )
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61318) {G16,W17,D7,L1,V2,M1} { meet( complement( meet( X,
% 9.24/9.68 complement( Y ) ) ), X ) ==> meet( Y, meet( complement( meet( X,
% 9.24/9.68 complement( Y ) ) ), X ) ) }.
% 9.24/9.68 parent0[0]: (713) {G15,W5,D3,L1,V1,M1} P(321,27);d(712);d(712) { join( zero
% 9.24/9.68 , X ) ==> X }.
% 9.24/9.68 parent1[0; 8]: (61316) {G19,W19,D8,L1,V2,M1} { meet( complement( meet( X,
% 9.24/9.68 complement( Y ) ) ), X ) ==> join( zero, meet( Y, meet( complement( meet
% 9.24/9.68 ( X, complement( Y ) ) ), X ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := meet( Y, meet( complement( meet( X, complement( Y ) ) ), X ) )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61319) {G17,W17,D6,L1,V2,M1} { meet( complement( meet( X,
% 9.24/9.68 complement( Y ) ) ), X ) ==> meet( meet( X, Y ), complement( meet( X,
% 9.24/9.68 complement( Y ) ) ) ) }.
% 9.24/9.68 parent0[0]: (28543) {G29,W13,D5,L1,V3,M1} P(1191,2525);d(741);d(741);d(740)
% 9.24/9.68 { meet( Z, meet( complement( X ), Y ) ) ==> meet( meet( Y, Z ),
% 9.24/9.68 complement( X ) ) }.
% 9.24/9.68 parent1[0; 8]: (61318) {G16,W17,D7,L1,V2,M1} { meet( complement( meet( X,
% 9.24/9.68 complement( Y ) ) ), X ) ==> meet( Y, meet( complement( meet( X,
% 9.24/9.68 complement( Y ) ) ), X ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := meet( X, complement( Y ) )
% 9.24/9.68 Y := X
% 9.24/9.68 Z := Y
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61321) {G18,W16,D6,L1,V2,M1} { meet( complement( meet( X,
% 9.24/9.68 complement( Y ) ) ), X ) ==> meet( meet( X, Y ), join( complement( X ), Y
% 9.24/9.68 ) ) }.
% 9.24/9.68 parent0[0]: (1185) {G17,W10,D5,L1,V2,M1} P(723,726) { complement( meet( Y,
% 9.24/9.68 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 9.24/9.68 parent1[0; 12]: (61319) {G17,W17,D6,L1,V2,M1} { meet( complement( meet( X
% 9.24/9.68 , complement( Y ) ) ), X ) ==> meet( meet( X, Y ), complement( meet( X,
% 9.24/9.68 complement( Y ) ) ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61322) {G18,W15,D5,L1,V2,M1} { meet( join( complement( X ), Y )
% 9.24/9.68 , X ) ==> meet( meet( X, Y ), join( complement( X ), Y ) ) }.
% 9.24/9.68 parent0[0]: (1185) {G17,W10,D5,L1,V2,M1} P(723,726) { complement( meet( Y,
% 9.24/9.68 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 9.24/9.68 parent1[0; 2]: (61321) {G18,W16,D6,L1,V2,M1} { meet( complement( meet( X,
% 9.24/9.68 complement( Y ) ) ), X ) ==> meet( meet( X, Y ), join( complement( X ), Y
% 9.24/9.68 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := Y
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61325) {G19,W10,D5,L1,V2,M1} { meet( join( complement( X ), Y )
% 9.24/9.68 , X ) ==> meet( X, Y ) }.
% 9.24/9.68 parent0[0]: (5083) {G30,W11,D4,L1,V3,M1} P(2880,1001);d(713);d(723) { meet
% 9.24/9.68 ( meet( X, Y ), join( Z, Y ) ) ==> meet( X, Y ) }.
% 9.24/9.68 parent1[0; 7]: (61322) {G18,W15,D5,L1,V2,M1} { meet( join( complement( X )
% 9.24/9.68 , Y ), X ) ==> meet( meet( X, Y ), join( complement( X ), Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := complement( X )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (28654) {G31,W10,D5,L1,V2,M1} P(28625,5815);d(713);d(28543);d(
% 9.24/9.68 1185);d(5083) { meet( join( complement( X ), Y ), X ) ==> meet( X, Y )
% 9.24/9.68 }.
% 9.24/9.68 parent0: (61325) {G19,W10,D5,L1,V2,M1} { meet( join( complement( X ), Y )
% 9.24/9.68 , X ) ==> meet( X, Y ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61328) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement( Y
% 9.24/9.68 ) ), meet( X, Y ) ) }.
% 9.24/9.68 parent0[0]: (309) {G2,W10,D5,L1,V2,M1} P(3,37) { join( meet( X, complement
% 9.24/9.68 ( Y ) ), meet( X, Y ) ) ==> X }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61331) {G3,W18,D7,L1,V2,M1} { join( complement( complement( X )
% 9.24/9.68 ), Y ) ==> join( meet( complement( X ), Y ), meet( join( complement(
% 9.24/9.68 complement( X ) ), Y ), X ) ) }.
% 9.24/9.68 parent0[0]: (28654) {G31,W10,D5,L1,V2,M1} P(28625,5815);d(713);d(28543);d(
% 9.24/9.68 1185);d(5083) { meet( join( complement( X ), Y ), X ) ==> meet( X, Y )
% 9.24/9.68 }.
% 9.24/9.68 parent1[0; 7]: (61328) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X,
% 9.24/9.68 complement( Y ) ), meet( X, Y ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := complement( X )
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := join( complement( complement( X ) ), Y )
% 9.24/9.68 Y := X
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61334) {G4,W16,D5,L1,V2,M1} { join( complement( complement( X )
% 9.24/9.68 ), Y ) ==> join( meet( complement( X ), Y ), meet( join( X, Y ), X ) )
% 9.24/9.68 }.
% 9.24/9.68 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.68 complement( X ) ) ==> X }.
% 9.24/9.68 parent1[0; 13]: (61331) {G3,W18,D7,L1,V2,M1} { join( complement(
% 9.24/9.68 complement( X ) ), Y ) ==> join( meet( complement( X ), Y ), meet( join(
% 9.24/9.68 complement( complement( X ) ), Y ), X ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61335) {G5,W14,D5,L1,V2,M1} { join( X, Y ) ==> join( meet(
% 9.24/9.68 complement( X ), Y ), meet( join( X, Y ), X ) ) }.
% 9.24/9.68 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.68 complement( X ) ) ==> X }.
% 9.24/9.68 parent1[0; 2]: (61334) {G4,W16,D5,L1,V2,M1} { join( complement( complement
% 9.24/9.68 ( X ) ), Y ) ==> join( meet( complement( X ), Y ), meet( join( X, Y ), X
% 9.24/9.68 ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61338) {G6,W10,D5,L1,V2,M1} { join( X, Y ) ==> join( meet(
% 9.24/9.68 complement( X ), Y ), X ) }.
% 9.24/9.68 parent0[0]: (2599) {G24,W7,D4,L1,V2,M1} P(2572,52) { meet( join( X, Y ), X
% 9.24/9.68 ) ==> X }.
% 9.24/9.68 parent1[0; 9]: (61335) {G5,W14,D5,L1,V2,M1} { join( X, Y ) ==> join( meet
% 9.24/9.68 ( complement( X ), Y ), meet( join( X, Y ), X ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61339) {G6,W10,D5,L1,V2,M1} { join( meet( complement( X ), Y ), X
% 9.24/9.68 ) ==> join( X, Y ) }.
% 9.24/9.68 parent0[0]: (61338) {G6,W10,D5,L1,V2,M1} { join( X, Y ) ==> join( meet(
% 9.24/9.68 complement( X ), Y ), X ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (28687) {G32,W10,D5,L1,V2,M1} P(28654,309);d(723);d(2599) {
% 9.24/9.68 join( meet( complement( X ), Y ), X ) ==> join( X, Y ) }.
% 9.24/9.68 parent0: (61339) {G6,W10,D5,L1,V2,M1} { join( meet( complement( X ), Y ),
% 9.24/9.68 X ) ==> join( X, Y ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61341) {G31,W10,D5,L1,V2,M1} { meet( X, Y ) ==> meet( join(
% 9.24/9.68 complement( X ), Y ), X ) }.
% 9.24/9.68 parent0[0]: (28654) {G31,W10,D5,L1,V2,M1} P(28625,5815);d(713);d(28543);d(
% 9.24/9.68 1185);d(5083) { meet( join( complement( X ), Y ), X ) ==> meet( X, Y )
% 9.24/9.68 }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61342) {G17,W11,D4,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 9.24/9.68 meet( join( X, Y ), complement( X ) ) }.
% 9.24/9.68 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.68 complement( X ) ) ==> X }.
% 9.24/9.68 parent1[0; 7]: (61341) {G31,W10,D5,L1,V2,M1} { meet( X, Y ) ==> meet( join
% 9.24/9.68 ( complement( X ), Y ), X ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := complement( X )
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61343) {G17,W11,D4,L1,V2,M1} { meet( join( X, Y ), complement( X
% 9.24/9.68 ) ) ==> meet( complement( X ), Y ) }.
% 9.24/9.68 parent0[0]: (61342) {G17,W11,D4,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 9.24/9.68 meet( join( X, Y ), complement( X ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (28702) {G32,W11,D4,L1,V2,M1} P(723,28654) { meet( join( X, Y
% 9.24/9.68 ), complement( X ) ) ==> meet( complement( X ), Y ) }.
% 9.24/9.68 parent0: (61343) {G17,W11,D4,L1,V2,M1} { meet( join( X, Y ), complement( X
% 9.24/9.68 ) ) ==> meet( complement( X ), Y ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61345) {G32,W10,D5,L1,V2,M1} { join( X, Y ) ==> join( meet(
% 9.24/9.68 complement( X ), Y ), X ) }.
% 9.24/9.68 parent0[0]: (28687) {G32,W10,D5,L1,V2,M1} P(28654,309);d(723);d(2599) {
% 9.24/9.68 join( meet( complement( X ), Y ), X ) ==> join( X, Y ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61348) {G33,W13,D7,L1,V3,M1} { join( X, meet( meet( Y,
% 9.24/9.68 complement( complement( X ) ) ), Z ) ) ==> join( zero, X ) }.
% 9.24/9.68 parent0[0]: (4595) {G34,W10,D6,L1,V3,M1} P(723,4538) { meet( X, meet( meet
% 9.24/9.68 ( Y, complement( X ) ), Z ) ) ==> zero }.
% 9.24/9.68 parent1[0; 11]: (61345) {G32,W10,D5,L1,V2,M1} { join( X, Y ) ==> join(
% 9.24/9.68 meet( complement( X ), Y ), X ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := complement( X )
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := meet( meet( Y, complement( complement( X ) ) ), Z )
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61349) {G16,W11,D7,L1,V3,M1} { join( X, meet( meet( Y,
% 9.24/9.68 complement( complement( X ) ) ), Z ) ) ==> X }.
% 9.24/9.68 parent0[0]: (713) {G15,W5,D3,L1,V1,M1} P(321,27);d(712);d(712) { join( zero
% 9.24/9.68 , X ) ==> X }.
% 9.24/9.68 parent1[0; 10]: (61348) {G33,W13,D7,L1,V3,M1} { join( X, meet( meet( Y,
% 9.24/9.68 complement( complement( X ) ) ), Z ) ) ==> join( zero, X ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61350) {G17,W9,D5,L1,V3,M1} { join( X, meet( meet( Y, X ), Z ) )
% 9.24/9.68 ==> X }.
% 9.24/9.68 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.68 complement( X ) ) ==> X }.
% 9.24/9.68 parent1[0; 6]: (61349) {G16,W11,D7,L1,V3,M1} { join( X, meet( meet( Y,
% 9.24/9.68 complement( complement( X ) ) ), Z ) ) ==> X }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 subsumption: (28762) {G35,W9,D5,L1,V3,M1} P(4595,28687);d(713);d(723) {
% 9.24/9.68 join( X, meet( meet( Y, X ), Z ) ) ==> X }.
% 9.24/9.68 parent0: (61350) {G17,W9,D5,L1,V3,M1} { join( X, meet( meet( Y, X ), Z ) )
% 9.24/9.68 ==> X }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68 permutation0:
% 9.24/9.68 0 ==> 0
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61352) {G35,W9,D5,L1,V3,M1} { X ==> join( X, meet( meet( Y, X ),
% 9.24/9.68 Z ) ) }.
% 9.24/9.68 parent0[0]: (28762) {G35,W9,D5,L1,V3,M1} P(4595,28687);d(713);d(723) { join
% 9.24/9.68 ( X, meet( meet( Y, X ), Z ) ) ==> X }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 paramod: (61353) {G1,W9,D5,L1,V3,M1} { X ==> join( meet( meet( Y, X ), Z )
% 9.24/9.68 , X ) }.
% 9.24/9.68 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 9.24/9.68 parent1[0; 2]: (61352) {G35,W9,D5,L1,V3,M1} { X ==> join( X, meet( meet( Y
% 9.24/9.68 , X ), Z ) ) }.
% 9.24/9.68 substitution0:
% 9.24/9.68 X := X
% 9.24/9.68 Y := meet( meet( Y, X ), Z )
% 9.24/9.68 end
% 9.24/9.68 substitution1:
% 9.24/9.68 X := X
% 9.24/9.68 Y := Y
% 9.24/9.68 Z := Z
% 9.24/9.68 end
% 9.24/9.68
% 9.24/9.68 eqswap: (61356) {G1,W9,D5,L1,V3,M1} { join( meet( meet( Y, X ), Z ), X )
% 9.24/9.68 ==> X }.
% 9.24/9.68 parent0[0]: (61353) {G1,W9,D5,L1,V3,M1} { X ==> join( meet( meet( Y, X ),
% 9.24/9.69 Z ), X ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := X
% 9.24/9.69 Y := Y
% 9.24/9.69 Z := Z
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 subsumption: (28991) {G36,W9,D5,L1,V3,M1} P(28762,0) { join( meet( meet( Y
% 9.24/9.69 , X ), Z ), X ) ==> X }.
% 9.24/9.69 parent0: (61356) {G1,W9,D5,L1,V3,M1} { join( meet( meet( Y, X ), Z ), X )
% 9.24/9.69 ==> X }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := X
% 9.24/9.69 Y := Y
% 9.24/9.69 Z := Z
% 9.24/9.69 end
% 9.24/9.69 permutation0:
% 9.24/9.69 0 ==> 0
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 eqswap: (61358) {G36,W9,D5,L1,V3,M1} { Y ==> join( meet( meet( X, Y ), Z )
% 9.24/9.69 , Y ) }.
% 9.24/9.69 parent0[0]: (28991) {G36,W9,D5,L1,V3,M1} P(28762,0) { join( meet( meet( Y,
% 9.24/9.69 X ), Z ), X ) ==> X }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := Y
% 9.24/9.69 Y := X
% 9.24/9.69 Z := Z
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61359) {G36,W9,D5,L1,V2,M1} { X ==> join( meet( composition( X,
% 9.24/9.69 skol2 ), Y ), X ) }.
% 9.24/9.69 parent0[0]: (9443) {G35,W9,D4,L1,V1,M1} P(9436,309);d(713) { meet(
% 9.24/9.69 composition( X, skol2 ), X ) ==> composition( X, skol2 ) }.
% 9.24/9.69 parent1[0; 4]: (61358) {G36,W9,D5,L1,V3,M1} { Y ==> join( meet( meet( X, Y
% 9.24/9.69 ), Z ), Y ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := X
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 X := composition( X, skol2 )
% 9.24/9.69 Y := X
% 9.24/9.69 Z := Y
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 eqswap: (61360) {G36,W9,D5,L1,V2,M1} { join( meet( composition( X, skol2 )
% 9.24/9.69 , Y ), X ) ==> X }.
% 9.24/9.69 parent0[0]: (61359) {G36,W9,D5,L1,V2,M1} { X ==> join( meet( composition(
% 9.24/9.69 X, skol2 ), Y ), X ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := X
% 9.24/9.69 Y := Y
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 subsumption: (29021) {G37,W9,D5,L1,V2,M1} P(9443,28991) { join( meet(
% 9.24/9.69 composition( X, skol2 ), Y ), X ) ==> X }.
% 9.24/9.69 parent0: (61360) {G36,W9,D5,L1,V2,M1} { join( meet( composition( X, skol2
% 9.24/9.69 ), Y ), X ) ==> X }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := X
% 9.24/9.69 Y := Y
% 9.24/9.69 end
% 9.24/9.69 permutation0:
% 9.24/9.69 0 ==> 0
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 eqswap: (61362) {G32,W11,D4,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 9.24/9.69 meet( join( X, Y ), complement( X ) ) }.
% 9.24/9.69 parent0[0]: (28702) {G32,W11,D4,L1,V2,M1} P(723,28654) { meet( join( X, Y )
% 9.24/9.69 , complement( X ) ) ==> meet( complement( X ), Y ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := X
% 9.24/9.69 Y := Y
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61368) {G33,W16,D5,L1,V0,M1} { meet( complement( complement(
% 9.24/9.69 skol1 ) ), composition( top, skol2 ) ) ==> meet( join( complement( skol1
% 9.24/9.69 ), skol2 ), complement( complement( skol1 ) ) ) }.
% 9.24/9.69 parent0[0]: (19748) {G41,W11,D4,L1,V0,M1} P(6947,818);d(21) { join(
% 9.24/9.69 complement( skol1 ), composition( top, skol2 ) ) ==> join( complement(
% 9.24/9.69 skol1 ), skol2 ) }.
% 9.24/9.69 parent1[0; 9]: (61362) {G32,W11,D4,L1,V2,M1} { meet( complement( X ), Y )
% 9.24/9.69 ==> meet( join( X, Y ), complement( X ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 X := complement( skol1 )
% 9.24/9.69 Y := composition( top, skol2 )
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61369) {G20,W16,D6,L1,V0,M1} { meet( complement( complement(
% 9.24/9.69 skol1 ) ), composition( top, skol2 ) ) ==> complement( join( meet( skol1
% 9.24/9.69 , complement( skol2 ) ), complement( skol1 ) ) ) }.
% 9.24/9.69 parent0[0]: (6102) {G19,W15,D6,L1,V3,M1} P(1185,6091) { meet( join(
% 9.24/9.69 complement( X ), Y ), complement( Z ) ) ==> complement( join( meet( X,
% 9.24/9.69 complement( Y ) ), Z ) ) }.
% 9.24/9.69 parent1[0; 8]: (61368) {G33,W16,D5,L1,V0,M1} { meet( complement(
% 9.24/9.69 complement( skol1 ) ), composition( top, skol2 ) ) ==> meet( join(
% 9.24/9.69 complement( skol1 ), skol2 ), complement( complement( skol1 ) ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := skol1
% 9.24/9.69 Y := skol2
% 9.24/9.69 Z := complement( skol1 )
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61370) {G18,W15,D6,L1,V0,M1} { meet( complement( complement(
% 9.24/9.69 skol1 ) ), composition( top, skol2 ) ) ==> meet( complement( meet( skol1
% 9.24/9.69 , complement( skol2 ) ) ), skol1 ) }.
% 9.24/9.69 parent0[0]: (740) {G17,W10,D5,L1,V2,M1} P(723,3) { complement( join( X,
% 9.24/9.69 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 9.24/9.69 parent1[0; 8]: (61369) {G20,W16,D6,L1,V0,M1} { meet( complement(
% 9.24/9.69 complement( skol1 ) ), composition( top, skol2 ) ) ==> complement( join(
% 9.24/9.69 meet( skol1, complement( skol2 ) ), complement( skol1 ) ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := meet( skol1, complement( skol2 ) )
% 9.24/9.69 Y := skol1
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61371) {G19,W13,D5,L1,V0,M1} { meet( complement( complement(
% 9.24/9.69 skol1 ) ), composition( top, skol2 ) ) ==> meet( complement( complement(
% 9.24/9.69 skol2 ) ), skol1 ) }.
% 9.24/9.69 parent0[0]: (28653) {G23,W11,D5,L1,V2,M1} P(28625,309);d(712);d(6094);d(
% 9.24/9.69 2425) { meet( complement( meet( X, Y ) ), X ) ==> meet( complement( Y ),
% 9.24/9.69 X ) }.
% 9.24/9.69 parent1[0; 8]: (61370) {G18,W15,D6,L1,V0,M1} { meet( complement(
% 9.24/9.69 complement( skol1 ) ), composition( top, skol2 ) ) ==> meet( complement(
% 9.24/9.69 meet( skol1, complement( skol2 ) ) ), skol1 ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := skol1
% 9.24/9.69 Y := complement( skol2 )
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61373) {G17,W11,D5,L1,V0,M1} { meet( complement( complement(
% 9.24/9.69 skol1 ) ), composition( top, skol2 ) ) ==> meet( skol2, skol1 ) }.
% 9.24/9.69 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.69 complement( X ) ) ==> X }.
% 9.24/9.69 parent1[0; 9]: (61371) {G19,W13,D5,L1,V0,M1} { meet( complement(
% 9.24/9.69 complement( skol1 ) ), composition( top, skol2 ) ) ==> meet( complement(
% 9.24/9.69 complement( skol2 ) ), skol1 ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := skol2
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61375) {G17,W9,D4,L1,V0,M1} { meet( skol1, composition( top,
% 9.24/9.69 skol2 ) ) ==> meet( skol2, skol1 ) }.
% 9.24/9.69 parent0[0]: (723) {G16,W5,D4,L1,V1,M1} P(712,320);d(716) { complement(
% 9.24/9.69 complement( X ) ) ==> X }.
% 9.24/9.69 parent1[0; 2]: (61373) {G17,W11,D5,L1,V0,M1} { meet( complement(
% 9.24/9.69 complement( skol1 ) ), composition( top, skol2 ) ) ==> meet( skol2, skol1
% 9.24/9.69 ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := skol1
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 subsumption: (58377) {G42,W9,D4,L1,V0,M1} P(19748,28702);d(6102);d(740);d(
% 9.24/9.69 28653);d(723);d(723) { meet( skol1, composition( top, skol2 ) ) ==> meet
% 9.24/9.69 ( skol2, skol1 ) }.
% 9.24/9.69 parent0: (61375) {G17,W9,D4,L1,V0,M1} { meet( skol1, composition( top,
% 9.24/9.69 skol2 ) ) ==> meet( skol2, skol1 ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69 permutation0:
% 9.24/9.69 0 ==> 0
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 eqswap: (61378) {G1,W28,D7,L1,V3,M1} { meet( composition( meet( X,
% 9.24/9.69 composition( Z, Y ) ), converse( Y ) ), Z ) ==> join( meet( composition(
% 9.24/9.69 X, converse( Y ) ), Z ), meet( composition( meet( X, composition( Z, Y )
% 9.24/9.69 ), converse( Y ) ), Z ) ) }.
% 9.24/9.69 parent0[0]: (158) {G1,W28,D7,L1,V3,M1} P(7,15) { join( meet( composition( Y
% 9.24/9.69 , converse( X ) ), Z ), meet( composition( meet( Y, composition( Z, X ) )
% 9.24/9.69 , converse( X ) ), Z ) ) ==> meet( composition( meet( Y, composition( Z,
% 9.24/9.69 X ) ), converse( X ) ), Z ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := Y
% 9.24/9.69 Y := X
% 9.24/9.69 Z := Z
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61387) {G2,W26,D6,L1,V0,M1} { meet( composition( meet( skol1,
% 9.24/9.69 composition( top, skol2 ) ), converse( skol2 ) ), top ) ==> join( meet(
% 9.24/9.69 composition( skol1, converse( skol2 ) ), top ), meet( composition( meet(
% 9.24/9.69 skol2, skol1 ), converse( skol2 ) ), top ) ) }.
% 9.24/9.69 parent0[0]: (58377) {G42,W9,D4,L1,V0,M1} P(19748,28702);d(6102);d(740);d(
% 9.24/9.69 28653);d(723);d(723) { meet( skol1, composition( top, skol2 ) ) ==> meet
% 9.24/9.69 ( skol2, skol1 ) }.
% 9.24/9.69 parent1[0; 20]: (61378) {G1,W28,D7,L1,V3,M1} { meet( composition( meet( X
% 9.24/9.69 , composition( Z, Y ) ), converse( Y ) ), Z ) ==> join( meet( composition
% 9.24/9.69 ( X, converse( Y ) ), Z ), meet( composition( meet( X, composition( Z, Y
% 9.24/9.69 ) ), converse( Y ) ), Z ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 X := skol1
% 9.24/9.69 Y := skol2
% 9.24/9.69 Z := top
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61388) {G3,W24,D6,L1,V0,M1} { meet( composition( meet( skol2,
% 9.24/9.69 skol1 ), converse( skol2 ) ), top ) ==> join( meet( composition( skol1,
% 9.24/9.69 converse( skol2 ) ), top ), meet( composition( meet( skol2, skol1 ),
% 9.24/9.69 converse( skol2 ) ), top ) ) }.
% 9.24/9.69 parent0[0]: (58377) {G42,W9,D4,L1,V0,M1} P(19748,28702);d(6102);d(740);d(
% 9.24/9.69 28653);d(723);d(723) { meet( skol1, composition( top, skol2 ) ) ==> meet
% 9.24/9.69 ( skol2, skol1 ) }.
% 9.24/9.69 parent1[0; 3]: (61387) {G2,W26,D6,L1,V0,M1} { meet( composition( meet(
% 9.24/9.69 skol1, composition( top, skol2 ) ), converse( skol2 ) ), top ) ==> join(
% 9.24/9.69 meet( composition( skol1, converse( skol2 ) ), top ), meet( composition(
% 9.24/9.69 meet( skol2, skol1 ), converse( skol2 ) ), top ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61508) {G4,W22,D6,L1,V0,M1} { meet( composition( meet( skol2,
% 9.24/9.69 skol1 ), converse( skol2 ) ), top ) ==> join( composition( skol1,
% 9.24/9.69 converse( skol2 ) ), meet( composition( meet( skol2, skol1 ), converse(
% 9.24/9.69 skol2 ) ), top ) ) }.
% 9.24/9.69 parent0[0]: (748) {G17,W5,D3,L1,V1,M1} S(716);d(723) { meet( X, top ) ==> X
% 9.24/9.69 }.
% 9.24/9.69 parent1[0; 10]: (61388) {G3,W24,D6,L1,V0,M1} { meet( composition( meet(
% 9.24/9.69 skol2, skol1 ), converse( skol2 ) ), top ) ==> join( meet( composition(
% 9.24/9.69 skol1, converse( skol2 ) ), top ), meet( composition( meet( skol2, skol1
% 9.24/9.69 ), converse( skol2 ) ), top ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := composition( skol1, converse( skol2 ) )
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61513) {G5,W22,D6,L1,V0,M1} { meet( composition( meet( skol2,
% 9.24/9.69 skol1 ), converse( skol2 ) ), top ) ==> join( converse( composition(
% 9.24/9.69 skol2, skol1 ) ), meet( composition( meet( skol2, skol1 ), converse(
% 9.24/9.69 skol2 ) ), top ) ) }.
% 9.24/9.69 parent0[0]: (20352) {G42,W9,D4,L1,V1,M1} P(20290,88) { composition( skol1,
% 9.24/9.69 converse( X ) ) ==> converse( composition( X, skol1 ) ) }.
% 9.24/9.69 parent1[0; 10]: (61508) {G4,W22,D6,L1,V0,M1} { meet( composition( meet(
% 9.24/9.69 skol2, skol1 ), converse( skol2 ) ), top ) ==> join( composition( skol1,
% 9.24/9.69 converse( skol2 ) ), meet( composition( meet( skol2, skol1 ), converse(
% 9.24/9.69 skol2 ) ), top ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := skol2
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61514) {G6,W21,D6,L1,V0,M1} { meet( composition( meet( skol2,
% 9.24/9.69 skol1 ), converse( skol2 ) ), top ) ==> join( composition( skol1, skol2 )
% 9.24/9.69 , meet( composition( meet( skol2, skol1 ), converse( skol2 ) ), top ) )
% 9.24/9.69 }.
% 9.24/9.69 parent0[0]: (21266) {G43,W8,D4,L1,V0,M1} P(20290,20721) { converse(
% 9.24/9.69 composition( skol2, skol1 ) ) ==> composition( skol1, skol2 ) }.
% 9.24/9.69 parent1[0; 10]: (61513) {G5,W22,D6,L1,V0,M1} { meet( composition( meet(
% 9.24/9.69 skol2, skol1 ), converse( skol2 ) ), top ) ==> join( converse(
% 9.24/9.69 composition( skol2, skol1 ) ), meet( composition( meet( skol2, skol1 ),
% 9.24/9.69 converse( skol2 ) ), top ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61516) {G7,W19,D5,L1,V0,M1} { meet( composition( meet( skol2,
% 9.24/9.69 skol1 ), converse( skol2 ) ), top ) ==> join( composition( skol1, skol2 )
% 9.24/9.69 , composition( meet( skol2, skol1 ), converse( skol2 ) ) ) }.
% 9.24/9.69 parent0[0]: (748) {G17,W5,D3,L1,V1,M1} S(716);d(723) { meet( X, top ) ==> X
% 9.24/9.69 }.
% 9.24/9.69 parent1[0; 13]: (61514) {G6,W21,D6,L1,V0,M1} { meet( composition( meet(
% 9.24/9.69 skol2, skol1 ), converse( skol2 ) ), top ) ==> join( composition( skol1,
% 9.24/9.69 skol2 ), meet( composition( meet( skol2, skol1 ), converse( skol2 ) ),
% 9.24/9.69 top ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := composition( meet( skol2, skol1 ), converse( skol2 ) )
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61517) {G8,W17,D5,L1,V0,M1} { composition( meet( skol2, skol1 )
% 9.24/9.69 , converse( skol2 ) ) ==> join( composition( skol1, skol2 ), composition
% 9.24/9.69 ( meet( skol2, skol1 ), converse( skol2 ) ) ) }.
% 9.24/9.69 parent0[0]: (748) {G17,W5,D3,L1,V1,M1} S(716);d(723) { meet( X, top ) ==> X
% 9.24/9.69 }.
% 9.24/9.69 parent1[0; 1]: (61516) {G7,W19,D5,L1,V0,M1} { meet( composition( meet(
% 9.24/9.69 skol2, skol1 ), converse( skol2 ) ), top ) ==> join( composition( skol1,
% 9.24/9.69 skol2 ), composition( meet( skol2, skol1 ), converse( skol2 ) ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := composition( meet( skol2, skol1 ), converse( skol2 ) )
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61528) {G9,W16,D5,L1,V0,M1} { composition( meet( skol2, skol1 )
% 9.24/9.69 , converse( skol2 ) ) ==> join( composition( skol1, skol2 ), composition
% 9.24/9.69 ( meet( skol2, skol1 ), skol2 ) ) }.
% 9.24/9.69 parent0[0]: (20664) {G41,W4,D3,L1,V0,M1} P(20240,88) { converse( skol2 )
% 9.24/9.69 ==> skol2 }.
% 9.24/9.69 parent1[0; 15]: (61517) {G8,W17,D5,L1,V0,M1} { composition( meet( skol2,
% 9.24/9.69 skol1 ), converse( skol2 ) ) ==> join( composition( skol1, skol2 ),
% 9.24/9.69 composition( meet( skol2, skol1 ), converse( skol2 ) ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61529) {G10,W15,D5,L1,V0,M1} { composition( meet( skol2, skol1 )
% 9.24/9.69 , skol2 ) ==> join( composition( skol1, skol2 ), composition( meet( skol2
% 9.24/9.69 , skol1 ), skol2 ) ) }.
% 9.24/9.69 parent0[0]: (20664) {G41,W4,D3,L1,V0,M1} P(20240,88) { converse( skol2 )
% 9.24/9.69 ==> skol2 }.
% 9.24/9.69 parent1[0; 5]: (61528) {G9,W16,D5,L1,V0,M1} { composition( meet( skol2,
% 9.24/9.69 skol1 ), converse( skol2 ) ) ==> join( composition( skol1, skol2 ),
% 9.24/9.69 composition( meet( skol2, skol1 ), skol2 ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61533) {G1,W13,D5,L1,V0,M1} { composition( meet( skol2, skol1 )
% 9.24/9.69 , skol2 ) ==> composition( join( skol1, meet( skol2, skol1 ) ), skol2 )
% 9.24/9.69 }.
% 9.24/9.69 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 9.24/9.69 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 9.24/9.69 parent1[0; 6]: (61529) {G10,W15,D5,L1,V0,M1} { composition( meet( skol2,
% 9.24/9.69 skol1 ), skol2 ) ==> join( composition( skol1, skol2 ), composition( meet
% 9.24/9.69 ( skol2, skol1 ), skol2 ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := skol1
% 9.24/9.69 Y := meet( skol2, skol1 )
% 9.24/9.69 Z := skol2
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61534) {G2,W9,D4,L1,V0,M1} { composition( meet( skol2, skol1 ),
% 9.24/9.69 skol2 ) ==> composition( skol1, skol2 ) }.
% 9.24/9.69 parent0[0]: (2393) {G21,W7,D4,L1,V2,M1} P(52,2342) { join( X, meet( Y, X )
% 9.24/9.69 ) ==> X }.
% 9.24/9.69 parent1[0; 7]: (61533) {G1,W13,D5,L1,V0,M1} { composition( meet( skol2,
% 9.24/9.69 skol1 ), skol2 ) ==> composition( join( skol1, meet( skol2, skol1 ) ),
% 9.24/9.69 skol2 ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := skol1
% 9.24/9.69 Y := skol2
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 subsumption: (58587) {G44,W9,D4,L1,V0,M1} P(58377,158);d(748);d(20352);d(
% 9.24/9.69 21266);d(748);d(20664);d(6);d(2393) { composition( meet( skol2, skol1 ),
% 9.24/9.69 skol2 ) ==> composition( skol1, skol2 ) }.
% 9.24/9.69 parent0: (61534) {G2,W9,D4,L1,V0,M1} { composition( meet( skol2, skol1 ),
% 9.24/9.69 skol2 ) ==> composition( skol1, skol2 ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69 permutation0:
% 9.24/9.69 0 ==> 0
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 eqswap: (61536) {G42,W9,D4,L1,V0,M1} { meet( skol2, skol1 ) ==> meet(
% 9.24/9.69 skol1, composition( top, skol2 ) ) }.
% 9.24/9.69 parent0[0]: (58377) {G42,W9,D4,L1,V0,M1} P(19748,28702);d(6102);d(740);d(
% 9.24/9.69 28653);d(723);d(723) { meet( skol1, composition( top, skol2 ) ) ==> meet
% 9.24/9.69 ( skol2, skol1 ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61538) {G2,W9,D4,L1,V0,M1} { meet( skol2, skol1 ) ==> meet(
% 9.24/9.69 composition( top, skol2 ), skol1 ) }.
% 9.24/9.69 parent0[0]: (52) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 9.24/9.69 Y ) }.
% 9.24/9.69 parent1[0; 4]: (61536) {G42,W9,D4,L1,V0,M1} { meet( skol2, skol1 ) ==>
% 9.24/9.69 meet( skol1, composition( top, skol2 ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := composition( top, skol2 )
% 9.24/9.69 Y := skol1
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 eqswap: (61544) {G2,W9,D4,L1,V0,M1} { meet( composition( top, skol2 ),
% 9.24/9.69 skol1 ) ==> meet( skol2, skol1 ) }.
% 9.24/9.69 parent0[0]: (61538) {G2,W9,D4,L1,V0,M1} { meet( skol2, skol1 ) ==> meet(
% 9.24/9.69 composition( top, skol2 ), skol1 ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 subsumption: (58592) {G43,W9,D4,L1,V0,M1} P(58377,52) { meet( composition(
% 9.24/9.69 top, skol2 ), skol1 ) ==> meet( skol2, skol1 ) }.
% 9.24/9.69 parent0: (61544) {G2,W9,D4,L1,V0,M1} { meet( composition( top, skol2 ),
% 9.24/9.69 skol1 ) ==> meet( skol2, skol1 ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69 permutation0:
% 9.24/9.69 0 ==> 0
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 eqswap: (61546) {G37,W9,D5,L1,V2,M1} { X ==> join( meet( composition( X,
% 9.24/9.69 skol2 ), Y ), X ) }.
% 9.24/9.69 parent0[0]: (29021) {G37,W9,D5,L1,V2,M1} P(9443,28991) { join( meet(
% 9.24/9.69 composition( X, skol2 ), Y ), X ) ==> X }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := X
% 9.24/9.69 Y := Y
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61547) {G38,W13,D5,L1,V1,M1} { meet( skol2, skol1 ) ==> join(
% 9.24/9.69 meet( composition( skol1, skol2 ), X ), meet( skol2, skol1 ) ) }.
% 9.24/9.69 parent0[0]: (58587) {G44,W9,D4,L1,V0,M1} P(58377,158);d(748);d(20352);d(
% 9.24/9.69 21266);d(748);d(20664);d(6);d(2393) { composition( meet( skol2, skol1 ),
% 9.24/9.69 skol2 ) ==> composition( skol1, skol2 ) }.
% 9.24/9.69 parent1[0; 6]: (61546) {G37,W9,D5,L1,V2,M1} { X ==> join( meet(
% 9.24/9.69 composition( X, skol2 ), Y ), X ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 X := meet( skol2, skol1 )
% 9.24/9.69 Y := X
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 eqswap: (61548) {G38,W13,D5,L1,V1,M1} { join( meet( composition( skol1,
% 9.24/9.69 skol2 ), X ), meet( skol2, skol1 ) ) ==> meet( skol2, skol1 ) }.
% 9.24/9.69 parent0[0]: (61547) {G38,W13,D5,L1,V1,M1} { meet( skol2, skol1 ) ==> join
% 9.24/9.69 ( meet( composition( skol1, skol2 ), X ), meet( skol2, skol1 ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := X
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 subsumption: (58634) {G45,W13,D5,L1,V1,M1} P(58587,29021) { join( meet(
% 9.24/9.69 composition( skol1, skol2 ), X ), meet( skol2, skol1 ) ) ==> meet( skol2
% 9.24/9.69 , skol1 ) }.
% 9.24/9.69 parent0: (61548) {G38,W13,D5,L1,V1,M1} { join( meet( composition( skol1,
% 9.24/9.69 skol2 ), X ), meet( skol2, skol1 ) ) ==> meet( skol2, skol1 ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := X
% 9.24/9.69 end
% 9.24/9.69 permutation0:
% 9.24/9.69 0 ==> 0
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 eqswap: (61550) {G1,W27,D8,L1,V3,M1} { meet( composition( meet( X,
% 9.24/9.69 composition( Y, converse( Z ) ) ), Z ), Y ) ==> join( meet( composition(
% 9.24/9.69 meet( X, composition( Y, converse( Z ) ) ), Z ), Y ), meet( composition(
% 9.24/9.69 X, Z ), Y ) ) }.
% 9.24/9.69 parent0[0]: (156) {G1,W27,D8,L1,V3,M1} P(15,0) { join( meet( composition(
% 9.24/9.69 meet( X, composition( Z, converse( Y ) ) ), Y ), Z ), meet( composition(
% 9.24/9.69 X, Y ), Z ) ) ==> meet( composition( meet( X, composition( Z, converse( Y
% 9.24/9.69 ) ) ), Y ), Z ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := X
% 9.24/9.69 Y := Z
% 9.24/9.69 Z := Y
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61559) {G2,W25,D8,L1,V0,M1} { meet( composition( meet( top,
% 9.24/9.69 composition( skol1, converse( skol2 ) ) ), skol2 ), skol1 ) ==> join(
% 9.24/9.69 meet( composition( meet( top, composition( skol1, converse( skol2 ) ) ),
% 9.24/9.69 skol2 ), skol1 ), meet( skol2, skol1 ) ) }.
% 9.24/9.69 parent0[0]: (58592) {G43,W9,D4,L1,V0,M1} P(58377,52) { meet( composition(
% 9.24/9.69 top, skol2 ), skol1 ) ==> meet( skol2, skol1 ) }.
% 9.24/9.69 parent1[0; 22]: (61550) {G1,W27,D8,L1,V3,M1} { meet( composition( meet( X
% 9.24/9.69 , composition( Y, converse( Z ) ) ), Z ), Y ) ==> join( meet( composition
% 9.24/9.69 ( meet( X, composition( Y, converse( Z ) ) ), Z ), Y ), meet( composition
% 9.24/9.69 ( X, Z ), Y ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 X := top
% 9.24/9.69 Y := skol1
% 9.24/9.69 Z := skol2
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61561) {G3,W23,D7,L1,V0,M1} { meet( composition( meet( top,
% 9.24/9.69 composition( skol1, converse( skol2 ) ) ), skol2 ), skol1 ) ==> join(
% 9.24/9.69 meet( composition( composition( skol1, converse( skol2 ) ), skol2 ),
% 9.24/9.69 skol1 ), meet( skol2, skol1 ) ) }.
% 9.24/9.69 parent0[0]: (722) {G15,W5,D3,L1,V1,M1} P(712,331) { meet( top, X ) ==> X
% 9.24/9.69 }.
% 9.24/9.69 parent1[0; 14]: (61559) {G2,W25,D8,L1,V0,M1} { meet( composition( meet(
% 9.24/9.69 top, composition( skol1, converse( skol2 ) ) ), skol2 ), skol1 ) ==> join
% 9.24/9.69 ( meet( composition( meet( top, composition( skol1, converse( skol2 ) ) )
% 9.24/9.69 , skol2 ), skol1 ), meet( skol2, skol1 ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := composition( skol1, converse( skol2 ) )
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61562) {G4,W21,D7,L1,V0,M1} { meet( composition( composition(
% 9.24/9.69 skol1, converse( skol2 ) ), skol2 ), skol1 ) ==> join( meet( composition
% 9.24/9.69 ( composition( skol1, converse( skol2 ) ), skol2 ), skol1 ), meet( skol2
% 9.24/9.69 , skol1 ) ) }.
% 9.24/9.69 parent0[0]: (722) {G15,W5,D3,L1,V1,M1} P(712,331) { meet( top, X ) ==> X
% 9.24/9.69 }.
% 9.24/9.69 parent1[0; 3]: (61561) {G3,W23,D7,L1,V0,M1} { meet( composition( meet( top
% 9.24/9.69 , composition( skol1, converse( skol2 ) ) ), skol2 ), skol1 ) ==> join(
% 9.24/9.69 meet( composition( composition( skol1, converse( skol2 ) ), skol2 ),
% 9.24/9.69 skol1 ), meet( skol2, skol1 ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := composition( skol1, converse( skol2 ) )
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61580) {G5,W21,D7,L1,V0,M1} { meet( composition( composition(
% 9.24/9.69 skol1, converse( skol2 ) ), skol2 ), skol1 ) ==> join( meet( composition
% 9.24/9.69 ( converse( composition( skol2, skol1 ) ), skol2 ), skol1 ), meet( skol2
% 9.24/9.69 , skol1 ) ) }.
% 9.24/9.69 parent0[0]: (20352) {G42,W9,D4,L1,V1,M1} P(20290,88) { composition( skol1,
% 9.24/9.69 converse( X ) ) ==> converse( composition( X, skol1 ) ) }.
% 9.24/9.69 parent1[0; 12]: (61562) {G4,W21,D7,L1,V0,M1} { meet( composition(
% 9.24/9.69 composition( skol1, converse( skol2 ) ), skol2 ), skol1 ) ==> join( meet
% 9.24/9.69 ( composition( composition( skol1, converse( skol2 ) ), skol2 ), skol1 )
% 9.24/9.69 , meet( skol2, skol1 ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := skol2
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61581) {G6,W21,D7,L1,V0,M1} { meet( composition( converse(
% 9.24/9.69 composition( skol2, skol1 ) ), skol2 ), skol1 ) ==> join( meet(
% 9.24/9.69 composition( converse( composition( skol2, skol1 ) ), skol2 ), skol1 ),
% 9.24/9.69 meet( skol2, skol1 ) ) }.
% 9.24/9.69 parent0[0]: (20352) {G42,W9,D4,L1,V1,M1} P(20290,88) { composition( skol1,
% 9.24/9.69 converse( X ) ) ==> converse( composition( X, skol1 ) ) }.
% 9.24/9.69 parent1[0; 3]: (61580) {G5,W21,D7,L1,V0,M1} { meet( composition(
% 9.24/9.69 composition( skol1, converse( skol2 ) ), skol2 ), skol1 ) ==> join( meet
% 9.24/9.69 ( composition( converse( composition( skol2, skol1 ) ), skol2 ), skol1 )
% 9.24/9.69 , meet( skol2, skol1 ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := skol2
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61588) {G7,W21,D7,L1,V0,M1} { meet( composition( converse(
% 9.24/9.69 composition( skol2, skol1 ) ), skol2 ), skol1 ) ==> join( meet( converse
% 9.24/9.69 ( composition( skol2, composition( skol2, skol1 ) ) ), skol1 ), meet(
% 9.24/9.69 skol2, skol1 ) ) }.
% 9.24/9.69 parent0[0]: (20721) {G42,W9,D4,L1,V1,M1} P(20664,89) { composition(
% 9.24/9.69 converse( X ), skol2 ) ==> converse( composition( skol2, X ) ) }.
% 9.24/9.69 parent1[0; 11]: (61581) {G6,W21,D7,L1,V0,M1} { meet( composition( converse
% 9.24/9.69 ( composition( skol2, skol1 ) ), skol2 ), skol1 ) ==> join( meet(
% 9.24/9.69 composition( converse( composition( skol2, skol1 ) ), skol2 ), skol1 ),
% 9.24/9.69 meet( skol2, skol1 ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := composition( skol2, skol1 )
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61589) {G8,W21,D7,L1,V0,M1} { meet( converse( composition( skol2
% 9.24/9.69 , composition( skol2, skol1 ) ) ), skol1 ) ==> join( meet( converse(
% 9.24/9.69 composition( skol2, composition( skol2, skol1 ) ) ), skol1 ), meet( skol2
% 9.24/9.69 , skol1 ) ) }.
% 9.24/9.69 parent0[0]: (20721) {G42,W9,D4,L1,V1,M1} P(20664,89) { composition(
% 9.24/9.69 converse( X ), skol2 ) ==> converse( composition( skol2, X ) ) }.
% 9.24/9.69 parent1[0; 2]: (61588) {G7,W21,D7,L1,V0,M1} { meet( composition( converse
% 9.24/9.69 ( composition( skol2, skol1 ) ), skol2 ), skol1 ) ==> join( meet(
% 9.24/9.69 converse( composition( skol2, composition( skol2, skol1 ) ) ), skol1 ),
% 9.24/9.69 meet( skol2, skol1 ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := composition( skol2, skol1 )
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61598) {G1,W21,D7,L1,V0,M1} { meet( converse( composition( skol2
% 9.24/9.69 , composition( skol2, skol1 ) ) ), skol1 ) ==> join( meet( converse(
% 9.24/9.69 composition( composition( skol2, skol2 ), skol1 ) ), skol1 ), meet( skol2
% 9.24/9.69 , skol1 ) ) }.
% 9.24/9.69 parent0[0]: (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z
% 9.24/9.69 ) ) ==> composition( composition( X, Y ), Z ) }.
% 9.24/9.69 parent1[0; 12]: (61589) {G8,W21,D7,L1,V0,M1} { meet( converse( composition
% 9.24/9.69 ( skol2, composition( skol2, skol1 ) ) ), skol1 ) ==> join( meet(
% 9.24/9.69 converse( composition( skol2, composition( skol2, skol1 ) ) ), skol1 ),
% 9.24/9.69 meet( skol2, skol1 ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := skol2
% 9.24/9.69 Y := skol2
% 9.24/9.69 Z := skol1
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61599) {G1,W21,D7,L1,V0,M1} { meet( converse( composition(
% 9.24/9.69 composition( skol2, skol2 ), skol1 ) ), skol1 ) ==> join( meet( converse
% 9.24/9.69 ( composition( composition( skol2, skol2 ), skol1 ) ), skol1 ), meet(
% 9.24/9.69 skol2, skol1 ) ) }.
% 9.24/9.69 parent0[0]: (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z
% 9.24/9.69 ) ) ==> composition( composition( X, Y ), Z ) }.
% 9.24/9.69 parent1[0; 3]: (61598) {G1,W21,D7,L1,V0,M1} { meet( converse( composition
% 9.24/9.69 ( skol2, composition( skol2, skol1 ) ) ), skol1 ) ==> join( meet(
% 9.24/9.69 converse( composition( composition( skol2, skol2 ), skol1 ) ), skol1 ),
% 9.24/9.69 meet( skol2, skol1 ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := skol2
% 9.24/9.69 Y := skol2
% 9.24/9.69 Z := skol1
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61604) {G2,W19,D6,L1,V0,M1} { meet( converse( composition(
% 9.24/9.69 composition( skol2, skol2 ), skol1 ) ), skol1 ) ==> join( meet( converse
% 9.24/9.69 ( composition( skol2, skol1 ) ), skol1 ), meet( skol2, skol1 ) ) }.
% 9.24/9.69 parent0[0]: (20671) {G42,W5,D3,L1,V0,M1} P(20664,20240) { composition(
% 9.24/9.69 skol2, skol2 ) ==> skol2 }.
% 9.24/9.69 parent1[0; 13]: (61599) {G1,W21,D7,L1,V0,M1} { meet( converse( composition
% 9.24/9.69 ( composition( skol2, skol2 ), skol1 ) ), skol1 ) ==> join( meet(
% 9.24/9.69 converse( composition( composition( skol2, skol2 ), skol1 ) ), skol1 ),
% 9.24/9.69 meet( skol2, skol1 ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61605) {G3,W17,D6,L1,V0,M1} { meet( converse( composition( skol2
% 9.24/9.69 , skol1 ) ), skol1 ) ==> join( meet( converse( composition( skol2, skol1
% 9.24/9.69 ) ), skol1 ), meet( skol2, skol1 ) ) }.
% 9.24/9.69 parent0[0]: (20671) {G42,W5,D3,L1,V0,M1} P(20664,20240) { composition(
% 9.24/9.69 skol2, skol2 ) ==> skol2 }.
% 9.24/9.69 parent1[0; 4]: (61604) {G2,W19,D6,L1,V0,M1} { meet( converse( composition
% 9.24/9.69 ( composition( skol2, skol2 ), skol1 ) ), skol1 ) ==> join( meet(
% 9.24/9.69 converse( composition( skol2, skol1 ) ), skol1 ), meet( skol2, skol1 ) )
% 9.24/9.69 }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61609) {G4,W16,D5,L1,V0,M1} { meet( converse( composition( skol2
% 9.24/9.69 , skol1 ) ), skol1 ) ==> join( meet( composition( skol1, skol2 ), skol1 )
% 9.24/9.69 , meet( skol2, skol1 ) ) }.
% 9.24/9.69 parent0[0]: (21266) {G43,W8,D4,L1,V0,M1} P(20290,20721) { converse(
% 9.24/9.69 composition( skol2, skol1 ) ) ==> composition( skol1, skol2 ) }.
% 9.24/9.69 parent1[0; 9]: (61605) {G3,W17,D6,L1,V0,M1} { meet( converse( composition
% 9.24/9.69 ( skol2, skol1 ) ), skol1 ) ==> join( meet( converse( composition( skol2
% 9.24/9.69 , skol1 ) ), skol1 ), meet( skol2, skol1 ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61610) {G5,W15,D5,L1,V0,M1} { meet( composition( skol1, skol2 )
% 9.24/9.69 , skol1 ) ==> join( meet( composition( skol1, skol2 ), skol1 ), meet(
% 9.24/9.69 skol2, skol1 ) ) }.
% 9.24/9.69 parent0[0]: (21266) {G43,W8,D4,L1,V0,M1} P(20290,20721) { converse(
% 9.24/9.69 composition( skol2, skol1 ) ) ==> composition( skol1, skol2 ) }.
% 9.24/9.69 parent1[0; 2]: (61609) {G4,W16,D5,L1,V0,M1} { meet( converse( composition
% 9.24/9.69 ( skol2, skol1 ) ), skol1 ) ==> join( meet( composition( skol1, skol2 ),
% 9.24/9.69 skol1 ), meet( skol2, skol1 ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61612) {G6,W9,D4,L1,V0,M1} { meet( composition( skol1, skol2 ),
% 9.24/9.69 skol1 ) ==> meet( skol2, skol1 ) }.
% 9.24/9.69 parent0[0]: (58634) {G45,W13,D5,L1,V1,M1} P(58587,29021) { join( meet(
% 9.24/9.69 composition( skol1, skol2 ), X ), meet( skol2, skol1 ) ) ==> meet( skol2
% 9.24/9.69 , skol1 ) }.
% 9.24/9.69 parent1[0; 6]: (61610) {G5,W15,D5,L1,V0,M1} { meet( composition( skol1,
% 9.24/9.69 skol2 ), skol1 ) ==> join( meet( composition( skol1, skol2 ), skol1 ),
% 9.24/9.69 meet( skol2, skol1 ) ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := skol1
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61613) {G7,W7,D3,L1,V0,M1} { composition( skol1, skol2 ) ==>
% 9.24/9.69 meet( skol2, skol1 ) }.
% 9.24/9.69 parent0[0]: (9443) {G35,W9,D4,L1,V1,M1} P(9436,309);d(713) { meet(
% 9.24/9.69 composition( X, skol2 ), X ) ==> composition( X, skol2 ) }.
% 9.24/9.69 parent1[0; 1]: (61612) {G6,W9,D4,L1,V0,M1} { meet( composition( skol1,
% 9.24/9.69 skol2 ), skol1 ) ==> meet( skol2, skol1 ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := skol1
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 subsumption: (58802) {G46,W7,D3,L1,V0,M1} P(58592,156);d(722);d(20352);d(
% 9.24/9.69 20721);d(4);d(20671);d(21266);d(58634);d(9443) { composition( skol1,
% 9.24/9.69 skol2 ) ==> meet( skol2, skol1 ) }.
% 9.24/9.69 parent0: (61613) {G7,W7,D3,L1,V0,M1} { composition( skol1, skol2 ) ==>
% 9.24/9.69 meet( skol2, skol1 ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69 permutation0:
% 9.24/9.69 0 ==> 0
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 eqswap: (61616) {G0,W7,D3,L1,V0,M1} { ! meet( skol1, skol2 ) ==>
% 9.24/9.69 composition( skol1, skol2 ) }.
% 9.24/9.69 parent0[0]: (18) {G0,W7,D3,L1,V0,M1} I { ! composition( skol1, skol2 ) ==>
% 9.24/9.69 meet( skol1, skol2 ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61617) {G1,W7,D3,L1,V0,M1} { ! meet( skol1, skol2 ) ==> meet(
% 9.24/9.69 skol2, skol1 ) }.
% 9.24/9.69 parent0[0]: (58802) {G46,W7,D3,L1,V0,M1} P(58592,156);d(722);d(20352);d(
% 9.24/9.69 20721);d(4);d(20671);d(21266);d(58634);d(9443) { composition( skol1,
% 9.24/9.69 skol2 ) ==> meet( skol2, skol1 ) }.
% 9.24/9.69 parent1[0; 5]: (61616) {G0,W7,D3,L1,V0,M1} { ! meet( skol1, skol2 ) ==>
% 9.24/9.69 composition( skol1, skol2 ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 subsumption: (58866) {G47,W7,D3,L1,V0,M1} P(58802,18) { ! meet( skol1,
% 9.24/9.69 skol2 ) ==> meet( skol2, skol1 ) }.
% 9.24/9.69 parent0: (61617) {G1,W7,D3,L1,V0,M1} { ! meet( skol1, skol2 ) ==> meet(
% 9.24/9.69 skol2, skol1 ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69 permutation0:
% 9.24/9.69 0 ==> 0
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 eqswap: (61619) {G47,W7,D3,L1,V0,M1} { ! meet( skol2, skol1 ) ==> meet(
% 9.24/9.69 skol1, skol2 ) }.
% 9.24/9.69 parent0[0]: (58866) {G47,W7,D3,L1,V0,M1} P(58802,18) { ! meet( skol1, skol2
% 9.24/9.69 ) ==> meet( skol2, skol1 ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 paramod: (61621) {G2,W7,D3,L1,V0,M1} { ! meet( skol2, skol1 ) ==> meet(
% 9.24/9.69 skol2, skol1 ) }.
% 9.24/9.69 parent0[0]: (52) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 9.24/9.69 Y ) }.
% 9.24/9.69 parent1[0; 5]: (61619) {G47,W7,D3,L1,V0,M1} { ! meet( skol2, skol1 ) ==>
% 9.24/9.69 meet( skol1, skol2 ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 X := skol2
% 9.24/9.69 Y := skol1
% 9.24/9.69 end
% 9.24/9.69 substitution1:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 eqrefl: (61624) {G0,W0,D0,L0,V0,M0} { }.
% 9.24/9.69 parent0[0]: (61621) {G2,W7,D3,L1,V0,M1} { ! meet( skol2, skol1 ) ==> meet
% 9.24/9.69 ( skol2, skol1 ) }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 subsumption: (58896) {G48,W0,D0,L0,V0,M0} P(52,58866);q { }.
% 9.24/9.69 parent0: (61624) {G0,W0,D0,L0,V0,M0} { }.
% 9.24/9.69 substitution0:
% 9.24/9.69 end
% 9.24/9.69 permutation0:
% 9.24/9.69 end
% 9.24/9.69
% 9.24/9.69 Proof check complete!
% 9.24/9.69
% 9.24/9.69 Memory use:
% 9.24/9.69
% 9.24/9.69 space for terms: 760988
% 9.24/9.69 space for clauses: 5766955
% 9.24/9.69
% 9.24/9.69
% 9.24/9.69 clauses generated: 2290893
% 9.24/9.69 clauses kept: 58897
% 9.24/9.69 clauses selected: 4271
% 9.24/9.69 clauses deleted: 13732
% 9.24/9.69 clauses inuse deleted: 1228
% 9.24/9.69
% 9.24/9.69 subsentry: 40522
% 9.24/9.69 literals s-matched: 34346
% 9.24/9.69 literals matched: 34078
% 9.24/9.69 full subsumption: 0
% 9.24/9.69
% 9.24/9.69 checksum: 679741223
% 9.24/9.69
% 9.24/9.69
% 9.24/9.69 Bliksem ended
%------------------------------------------------------------------------------