TSTP Solution File: REL030+2 by Bliksem---1.12
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- Process Solution
%------------------------------------------------------------------------------
% File : Bliksem---1.12
% Problem : REL030+2 : TPTP v8.1.0. Released v4.0.0.
% Transfm : none
% Format : tptp:raw
% Command : bliksem %s
% Computer : n012.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 19:00:46 EDT 2022
% Result : Theorem 100.33s 100.73s
% Output : Refutation 100.33s
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.04/0.13 % Problem : REL030+2 : TPTP v8.1.0. Released v4.0.0.
% 0.04/0.13 % Command : bliksem %s
% 0.13/0.35 % Computer : n012.cluster.edu
% 0.13/0.35 % Model : x86_64 x86_64
% 0.13/0.35 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.13/0.35 % Memory : 8042.1875MB
% 0.13/0.35 % OS : Linux 3.10.0-693.el7.x86_64
% 0.13/0.35 % CPULimit : 300
% 0.13/0.35 % DateTime : Fri Jul 8 12:18:14 EDT 2022
% 0.13/0.35 % CPUTime :
% 5.83/6.21 *** allocated 10000 integers for termspace/termends
% 5.83/6.21 *** allocated 10000 integers for clauses
% 5.83/6.21 *** allocated 10000 integers for justifications
% 5.83/6.21 Bliksem 1.12
% 5.83/6.21
% 5.83/6.21
% 5.83/6.21 Automatic Strategy Selection
% 5.83/6.21
% 5.83/6.21
% 5.83/6.21 Clauses:
% 5.83/6.21
% 5.83/6.21 { join( X, Y ) = join( Y, X ) }.
% 5.83/6.21 { join( X, join( Y, Z ) ) = join( join( X, Y ), Z ) }.
% 5.83/6.21 { X = join( complement( join( complement( X ), complement( Y ) ) ),
% 5.83/6.21 complement( join( complement( X ), Y ) ) ) }.
% 5.83/6.21 { meet( X, Y ) = complement( join( complement( X ), complement( Y ) ) ) }.
% 5.83/6.21 { composition( X, composition( Y, Z ) ) = composition( composition( X, Y )
% 5.83/6.21 , Z ) }.
% 5.83/6.21 { composition( X, one ) = X }.
% 5.83/6.21 { composition( join( X, Y ), Z ) = join( composition( X, Z ), composition(
% 5.83/6.21 Y, Z ) ) }.
% 5.83/6.21 { converse( converse( X ) ) = X }.
% 5.83/6.21 { converse( join( X, Y ) ) = join( converse( X ), converse( Y ) ) }.
% 5.83/6.21 { converse( composition( X, Y ) ) = composition( converse( Y ), converse( X
% 5.83/6.21 ) ) }.
% 5.83/6.21 { join( composition( converse( X ), complement( composition( X, Y ) ) ),
% 5.83/6.21 complement( Y ) ) = complement( Y ) }.
% 5.83/6.21 { top = join( X, complement( X ) ) }.
% 5.83/6.21 { zero = meet( X, complement( X ) ) }.
% 5.83/6.21 { join( skol1, one ) = one }.
% 5.83/6.21 { ! join( meet( composition( skol1, skol2 ), complement( skol3 ) ), meet(
% 5.83/6.21 composition( skol1, skol2 ), complement( composition( skol1, skol3 ) ) )
% 5.83/6.21 ) = meet( composition( skol1, skol2 ), complement( composition( skol1,
% 5.83/6.21 skol3 ) ) ), ! join( meet( composition( skol1, skol2 ), complement(
% 5.83/6.21 composition( skol1, skol3 ) ) ), meet( composition( skol1, skol2 ),
% 5.83/6.21 complement( skol3 ) ) ) = meet( composition( skol1, skol2 ), complement(
% 5.83/6.21 skol3 ) ) }.
% 5.83/6.21
% 5.83/6.21 percentage equality = 1.000000, percentage horn = 1.000000
% 5.83/6.21 This is a pure equality problem
% 5.83/6.21
% 5.83/6.21
% 5.83/6.21
% 5.83/6.21 Options Used:
% 5.83/6.21
% 5.83/6.21 useres = 1
% 5.83/6.21 useparamod = 1
% 5.83/6.21 useeqrefl = 1
% 5.83/6.21 useeqfact = 1
% 5.83/6.21 usefactor = 1
% 5.83/6.21 usesimpsplitting = 0
% 5.83/6.21 usesimpdemod = 5
% 5.83/6.21 usesimpres = 3
% 5.83/6.21
% 5.83/6.21 resimpinuse = 1000
% 5.83/6.21 resimpclauses = 20000
% 5.83/6.21 substype = eqrewr
% 5.83/6.21 backwardsubs = 1
% 5.83/6.21 selectoldest = 5
% 5.83/6.21
% 5.83/6.21 litorderings [0] = split
% 5.83/6.21 litorderings [1] = extend the termordering, first sorting on arguments
% 5.83/6.21
% 5.83/6.21 termordering = kbo
% 5.83/6.21
% 5.83/6.21 litapriori = 0
% 5.83/6.21 termapriori = 1
% 5.83/6.21 litaposteriori = 0
% 5.83/6.21 termaposteriori = 0
% 5.83/6.21 demodaposteriori = 0
% 5.83/6.21 ordereqreflfact = 0
% 5.83/6.21
% 5.83/6.21 litselect = negord
% 5.83/6.21
% 5.83/6.21 maxweight = 15
% 5.83/6.21 maxdepth = 30000
% 5.83/6.21 maxlength = 115
% 5.83/6.21 maxnrvars = 195
% 5.83/6.21 excuselevel = 1
% 5.83/6.21 increasemaxweight = 1
% 5.83/6.21
% 5.83/6.21 maxselected = 10000000
% 5.83/6.21 maxnrclauses = 10000000
% 5.83/6.21
% 5.83/6.21 showgenerated = 0
% 5.83/6.21 showkept = 0
% 5.83/6.21 showselected = 0
% 5.83/6.21 showdeleted = 0
% 5.83/6.21 showresimp = 1
% 5.83/6.21 showstatus = 2000
% 5.83/6.21
% 5.83/6.21 prologoutput = 0
% 5.83/6.21 nrgoals = 5000000
% 5.83/6.21 totalproof = 1
% 5.83/6.21
% 5.83/6.21 Symbols occurring in the translation:
% 5.83/6.21
% 5.83/6.21 {} [0, 0] (w:1, o:2, a:1, s:1, b:0),
% 5.83/6.21 . [1, 2] (w:1, o:22, a:1, s:1, b:0),
% 5.83/6.21 ! [4, 1] (w:0, o:15, a:1, s:1, b:0),
% 5.83/6.21 = [13, 2] (w:1, o:0, a:0, s:1, b:0),
% 5.83/6.21 ==> [14, 2] (w:1, o:0, a:0, s:1, b:0),
% 5.83/6.21 join [37, 2] (w:1, o:46, a:1, s:1, b:0),
% 5.83/6.21 complement [39, 1] (w:1, o:20, a:1, s:1, b:0),
% 5.83/6.21 meet [40, 2] (w:1, o:47, a:1, s:1, b:0),
% 5.83/6.21 composition [41, 2] (w:1, o:48, a:1, s:1, b:0),
% 5.83/6.21 one [42, 0] (w:1, o:9, a:1, s:1, b:0),
% 5.83/6.21 converse [43, 1] (w:1, o:21, a:1, s:1, b:0),
% 5.83/6.21 top [44, 0] (w:1, o:13, a:1, s:1, b:0),
% 5.83/6.21 zero [45, 0] (w:1, o:14, a:1, s:1, b:0),
% 5.83/6.21 skol1 [46, 0] (w:1, o:10, a:1, s:1, b:1),
% 5.83/6.21 skol2 [47, 0] (w:1, o:11, a:1, s:1, b:1),
% 5.83/6.21 skol3 [48, 0] (w:1, o:12, a:1, s:1, b:1).
% 5.83/6.21
% 5.83/6.21
% 5.83/6.21 Starting Search:
% 5.83/6.21
% 5.83/6.21 *** allocated 15000 integers for clauses
% 5.83/6.21 *** allocated 22500 integers for clauses
% 5.83/6.21 *** allocated 33750 integers for clauses
% 5.83/6.21 *** allocated 50625 integers for clauses
% 5.83/6.21 *** allocated 75937 integers for clauses
% 5.83/6.21 *** allocated 113905 integers for clauses
% 5.83/6.21 *** allocated 15000 integers for termspace/termends
% 5.83/6.21 Resimplifying inuse:
% 5.83/6.21 Done
% 5.83/6.21
% 5.83/6.21 *** allocated 170857 integers for clauses
% 5.83/6.21 *** allocated 22500 integers for termspace/termends
% 5.83/6.21 *** allocated 256285 integers for clauses
% 5.83/6.21 *** allocated 33750 integers for termspace/termends
% 5.83/6.21
% 5.83/6.21 Intermediate Status:
% 5.83/6.21 Generated: 26176
% 5.83/6.21 Kept: 2012
% 5.83/6.21 Inuse: 352
% 5.83/6.21 Deleted: 168
% 5.83/6.21 Deletedinuse: 63
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 *** allocated 384427 integers for clauses
% 18.78/19.16 *** allocated 50625 integers for termspace/termends
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 *** allocated 576640 integers for clauses
% 18.78/19.16
% 18.78/19.16 Intermediate Status:
% 18.78/19.16 Generated: 52923
% 18.78/19.16 Kept: 4034
% 18.78/19.16 Inuse: 543
% 18.78/19.16 Deleted: 221
% 18.78/19.16 Deletedinuse: 84
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 *** allocated 75937 integers for termspace/termends
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 *** allocated 864960 integers for clauses
% 18.78/19.16
% 18.78/19.16 Intermediate Status:
% 18.78/19.16 Generated: 96721
% 18.78/19.16 Kept: 6044
% 18.78/19.16 Inuse: 679
% 18.78/19.16 Deleted: 246
% 18.78/19.16 Deletedinuse: 84
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 *** allocated 113905 integers for termspace/termends
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16
% 18.78/19.16 Intermediate Status:
% 18.78/19.16 Generated: 151358
% 18.78/19.16 Kept: 8053
% 18.78/19.16 Inuse: 842
% 18.78/19.16 Deleted: 264
% 18.78/19.16 Deletedinuse: 84
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 *** allocated 1297440 integers for clauses
% 18.78/19.16 *** allocated 170857 integers for termspace/termends
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16
% 18.78/19.16 Intermediate Status:
% 18.78/19.16 Generated: 214714
% 18.78/19.16 Kept: 10068
% 18.78/19.16 Inuse: 990
% 18.78/19.16 Deleted: 300
% 18.78/19.16 Deletedinuse: 85
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16
% 18.78/19.16 Intermediate Status:
% 18.78/19.16 Generated: 256627
% 18.78/19.16 Kept: 12092
% 18.78/19.16 Inuse: 1058
% 18.78/19.16 Deleted: 320
% 18.78/19.16 Deletedinuse: 98
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 *** allocated 1946160 integers for clauses
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 *** allocated 256285 integers for termspace/termends
% 18.78/19.16
% 18.78/19.16 Intermediate Status:
% 18.78/19.16 Generated: 295819
% 18.78/19.16 Kept: 14101
% 18.78/19.16 Inuse: 1136
% 18.78/19.16 Deleted: 427
% 18.78/19.16 Deletedinuse: 164
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16
% 18.78/19.16 Intermediate Status:
% 18.78/19.16 Generated: 378916
% 18.78/19.16 Kept: 16154
% 18.78/19.16 Inuse: 1287
% 18.78/19.16 Deleted: 468
% 18.78/19.16 Deletedinuse: 168
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16
% 18.78/19.16 Intermediate Status:
% 18.78/19.16 Generated: 440105
% 18.78/19.16 Kept: 18174
% 18.78/19.16 Inuse: 1416
% 18.78/19.16 Deleted: 504
% 18.78/19.16 Deletedinuse: 168
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 *** allocated 2919240 integers for clauses
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 *** allocated 384427 integers for termspace/termends
% 18.78/19.16 Resimplifying clauses:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16
% 18.78/19.16 Intermediate Status:
% 18.78/19.16 Generated: 516944
% 18.78/19.16 Kept: 20174
% 18.78/19.16 Inuse: 1577
% 18.78/19.16 Deleted: 4053
% 18.78/19.16 Deletedinuse: 168
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16
% 18.78/19.16 Intermediate Status:
% 18.78/19.16 Generated: 573352
% 18.78/19.16 Kept: 22227
% 18.78/19.16 Inuse: 1635
% 18.78/19.16 Deleted: 4057
% 18.78/19.16 Deletedinuse: 170
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16
% 18.78/19.16 Intermediate Status:
% 18.78/19.16 Generated: 649175
% 18.78/19.16 Kept: 24302
% 18.78/19.16 Inuse: 1701
% 18.78/19.16 Deleted: 4065
% 18.78/19.16 Deletedinuse: 178
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16
% 18.78/19.16 Intermediate Status:
% 18.78/19.16 Generated: 701256
% 18.78/19.16 Kept: 26305
% 18.78/19.16 Inuse: 1784
% 18.78/19.16 Deleted: 4071
% 18.78/19.16 Deletedinuse: 182
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16
% 18.78/19.16 Intermediate Status:
% 18.78/19.16 Generated: 754483
% 18.78/19.16 Kept: 28364
% 18.78/19.16 Inuse: 1853
% 18.78/19.16 Deleted: 4091
% 18.78/19.16 Deletedinuse: 199
% 18.78/19.16
% 18.78/19.16 *** allocated 4378860 integers for clauses
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 *** allocated 576640 integers for termspace/termends
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16
% 18.78/19.16 Intermediate Status:
% 18.78/19.16 Generated: 818029
% 18.78/19.16 Kept: 30398
% 18.78/19.16 Inuse: 1904
% 18.78/19.16 Deleted: 4095
% 18.78/19.16 Deletedinuse: 199
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16
% 18.78/19.16 Intermediate Status:
% 18.78/19.16 Generated: 899349
% 18.78/19.16 Kept: 32438
% 18.78/19.16 Inuse: 1972
% 18.78/19.16 Deleted: 4095
% 18.78/19.16 Deletedinuse: 199
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16
% 18.78/19.16 Intermediate Status:
% 18.78/19.16 Generated: 987080
% 18.78/19.16 Kept: 34467
% 18.78/19.16 Inuse: 2088
% 18.78/19.16 Deleted: 4463
% 18.78/19.16 Deletedinuse: 503
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16
% 18.78/19.16 Intermediate Status:
% 18.78/19.16 Generated: 1089338
% 18.78/19.16 Kept: 36500
% 18.78/19.16 Inuse: 2212
% 18.78/19.16 Deleted: 4552
% 18.78/19.16 Deletedinuse: 551
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16
% 18.78/19.16 Intermediate Status:
% 18.78/19.16 Generated: 1147499
% 18.78/19.16 Kept: 38553
% 18.78/19.16 Inuse: 2290
% 18.78/19.16 Deleted: 4592
% 18.78/19.16 Deletedinuse: 576
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 Resimplifying clauses:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16
% 18.78/19.16 Intermediate Status:
% 18.78/19.16 Generated: 1255619
% 18.78/19.16 Kept: 40681
% 18.78/19.16 Inuse: 2408
% 18.78/19.16 Deleted: 17343
% 18.78/19.16 Deletedinuse: 718
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16 Resimplifying inuse:
% 18.78/19.16 Done
% 18.78/19.16
% 18.78/19.16
% 18.78/19.16 Intermediate Status:
% 43.64/44.00 Generated: 1345728
% 43.64/44.00 Kept: 42724
% 43.64/44.00 Inuse: 2513
% 43.64/44.00 Deleted: 17388
% 43.64/44.00 Deletedinuse: 751
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 *** allocated 6568290 integers for clauses
% 43.64/44.00 *** allocated 864960 integers for termspace/termends
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 43.64/44.00 Generated: 1423398
% 43.64/44.00 Kept: 44764
% 43.64/44.00 Inuse: 2562
% 43.64/44.00 Deleted: 17388
% 43.64/44.00 Deletedinuse: 751
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 43.64/44.00 Generated: 1576629
% 43.64/44.00 Kept: 46771
% 43.64/44.00 Inuse: 2666
% 43.64/44.00 Deleted: 17392
% 43.64/44.00 Deletedinuse: 751
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 43.64/44.00 Generated: 1688822
% 43.64/44.00 Kept: 48790
% 43.64/44.00 Inuse: 2738
% 43.64/44.00 Deleted: 17392
% 43.64/44.00 Deletedinuse: 751
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 43.64/44.00 Generated: 1799954
% 43.64/44.00 Kept: 50825
% 43.64/44.00 Inuse: 2831
% 43.64/44.00 Deleted: 17401
% 43.64/44.00 Deletedinuse: 751
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 43.64/44.00 Generated: 2002517
% 43.64/44.00 Kept: 52826
% 43.64/44.00 Inuse: 2976
% 43.64/44.00 Deleted: 17403
% 43.64/44.00 Deletedinuse: 751
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 43.64/44.00 Generated: 2136035
% 43.64/44.00 Kept: 54828
% 43.64/44.00 Inuse: 3077
% 43.64/44.00 Deleted: 17439
% 43.64/44.00 Deletedinuse: 780
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 43.64/44.00 Generated: 2370593
% 43.64/44.00 Kept: 56846
% 43.64/44.00 Inuse: 3246
% 43.64/44.00 Deleted: 17465
% 43.64/44.00 Deletedinuse: 788
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 43.64/44.00 Generated: 2511578
% 43.64/44.00 Kept: 58857
% 43.64/44.00 Inuse: 3387
% 43.64/44.00 Deleted: 17492
% 43.64/44.00 Deletedinuse: 788
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 Resimplifying clauses:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 43.64/44.00 Generated: 2574153
% 43.64/44.00 Kept: 60901
% 43.64/44.00 Inuse: 3423
% 43.64/44.00 Deleted: 20480
% 43.64/44.00 Deletedinuse: 798
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 43.64/44.00 Generated: 2691218
% 43.64/44.00 Kept: 62968
% 43.64/44.00 Inuse: 3497
% 43.64/44.00 Deleted: 20483
% 43.64/44.00 Deletedinuse: 801
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 *** allocated 9852435 integers for clauses
% 43.64/44.00 *** allocated 1297440 integers for termspace/termends
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 43.64/44.00 Generated: 2732273
% 43.64/44.00 Kept: 65001
% 43.64/44.00 Inuse: 3528
% 43.64/44.00 Deleted: 20486
% 43.64/44.00 Deletedinuse: 804
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 43.64/44.00 Generated: 2831350
% 43.64/44.00 Kept: 67004
% 43.64/44.00 Inuse: 3600
% 43.64/44.00 Deleted: 20495
% 43.64/44.00 Deletedinuse: 804
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 43.64/44.00 Generated: 2917699
% 43.64/44.00 Kept: 69018
% 43.64/44.00 Inuse: 3663
% 43.64/44.00 Deleted: 20495
% 43.64/44.00 Deletedinuse: 804
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 43.64/44.00 Generated: 2975866
% 43.64/44.00 Kept: 71133
% 43.64/44.00 Inuse: 3693
% 43.64/44.00 Deleted: 20495
% 43.64/44.00 Deletedinuse: 804
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 43.64/44.00 Generated: 3099959
% 43.64/44.00 Kept: 73147
% 43.64/44.00 Inuse: 3782
% 43.64/44.00 Deleted: 20506
% 43.64/44.00 Deletedinuse: 804
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 43.64/44.00 Generated: 3224620
% 43.64/44.00 Kept: 75161
% 43.64/44.00 Inuse: 3881
% 43.64/44.00 Deleted: 20716
% 43.64/44.00 Deletedinuse: 980
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 43.64/44.00 Generated: 3325695
% 43.64/44.00 Kept: 77170
% 43.64/44.00 Inuse: 3965
% 43.64/44.00 Deleted: 20722
% 43.64/44.00 Deletedinuse: 982
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 43.64/44.00 Generated: 3489804
% 43.64/44.00 Kept: 79175
% 43.64/44.00 Inuse: 4058
% 43.64/44.00 Deleted: 20722
% 43.64/44.00 Deletedinuse: 982
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 Resimplifying clauses:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 43.64/44.00 Generated: 3674453
% 43.64/44.00 Kept: 81184
% 43.64/44.00 Inuse: 4164
% 43.64/44.00 Deleted: 27811
% 43.64/44.00 Deletedinuse: 985
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 43.64/44.00 Generated: 3793174
% 43.64/44.00 Kept: 83187
% 43.64/44.00 Inuse: 4265
% 43.64/44.00 Deleted: 27862
% 43.64/44.00 Deletedinuse: 1011
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 43.64/44.00 Generated: 3932201
% 43.64/44.00 Kept: 85216
% 43.64/44.00 Inuse: 4377
% 43.64/44.00 Deleted: 27871
% 43.64/44.00 Deletedinuse: 1013
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00 Resimplifying inuse:
% 43.64/44.00 Done
% 43.64/44.00
% 43.64/44.00
% 43.64/44.00 Intermediate Status:
% 73.10/73.48 Generated: 4126800
% 73.10/73.48 Kept: 87219
% 73.10/73.48 Inuse: 4507
% 73.10/73.48 Deleted: 27871
% 73.10/73.48 Deletedinuse: 1013
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 4233538
% 73.10/73.48 Kept: 89257
% 73.10/73.48 Inuse: 4564
% 73.10/73.48 Deleted: 27877
% 73.10/73.48 Deletedinuse: 1013
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 4355589
% 73.10/73.48 Kept: 91362
% 73.10/73.48 Inuse: 4604
% 73.10/73.48 Deleted: 27877
% 73.10/73.48 Deletedinuse: 1013
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 4456867
% 73.10/73.48 Kept: 93366
% 73.10/73.48 Inuse: 4639
% 73.10/73.48 Deleted: 27877
% 73.10/73.48 Deletedinuse: 1013
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 *** allocated 1946160 integers for termspace/termends
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 4620901
% 73.10/73.48 Kept: 95373
% 73.10/73.48 Inuse: 4739
% 73.10/73.48 Deleted: 27890
% 73.10/73.48 Deletedinuse: 1017
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 *** allocated 14778652 integers for clauses
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 4742925
% 73.10/73.48 Kept: 97504
% 73.10/73.48 Inuse: 4822
% 73.10/73.48 Deleted: 27921
% 73.10/73.48 Deletedinuse: 1018
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 4829167
% 73.10/73.48 Kept: 99540
% 73.10/73.48 Inuse: 4862
% 73.10/73.48 Deleted: 27923
% 73.10/73.48 Deletedinuse: 1019
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 Resimplifying clauses:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 4969494
% 73.10/73.48 Kept: 101588
% 73.10/73.48 Inuse: 4910
% 73.10/73.48 Deleted: 32058
% 73.10/73.48 Deletedinuse: 1019
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 5129153
% 73.10/73.48 Kept: 103612
% 73.10/73.48 Inuse: 4960
% 73.10/73.48 Deleted: 32058
% 73.10/73.48 Deletedinuse: 1019
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 5322387
% 73.10/73.48 Kept: 105655
% 73.10/73.48 Inuse: 5035
% 73.10/73.48 Deleted: 32058
% 73.10/73.48 Deletedinuse: 1019
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 5428345
% 73.10/73.48 Kept: 107732
% 73.10/73.48 Inuse: 5102
% 73.10/73.48 Deleted: 32062
% 73.10/73.48 Deletedinuse: 1019
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 5602368
% 73.10/73.48 Kept: 109748
% 73.10/73.48 Inuse: 5169
% 73.10/73.48 Deleted: 32063
% 73.10/73.48 Deletedinuse: 1020
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 5701395
% 73.10/73.48 Kept: 111769
% 73.10/73.48 Inuse: 5233
% 73.10/73.48 Deleted: 32067
% 73.10/73.48 Deletedinuse: 1020
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 6010218
% 73.10/73.48 Kept: 113775
% 73.10/73.48 Inuse: 5333
% 73.10/73.48 Deleted: 32086
% 73.10/73.48 Deletedinuse: 1038
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 6195771
% 73.10/73.48 Kept: 115790
% 73.10/73.48 Inuse: 5424
% 73.10/73.48 Deleted: 32092
% 73.10/73.48 Deletedinuse: 1041
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 6363081
% 73.10/73.48 Kept: 117803
% 73.10/73.48 Inuse: 5536
% 73.10/73.48 Deleted: 32092
% 73.10/73.48 Deletedinuse: 1041
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 6558286
% 73.10/73.48 Kept: 119822
% 73.10/73.48 Inuse: 5657
% 73.10/73.48 Deleted: 32092
% 73.10/73.48 Deletedinuse: 1041
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 Resimplifying clauses:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 6800237
% 73.10/73.48 Kept: 121902
% 73.10/73.48 Inuse: 5774
% 73.10/73.48 Deleted: 35315
% 73.10/73.48 Deletedinuse: 1053
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 7090312
% 73.10/73.48 Kept: 123927
% 73.10/73.48 Inuse: 5916
% 73.10/73.48 Deleted: 35315
% 73.10/73.48 Deletedinuse: 1053
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 7597126
% 73.10/73.48 Kept: 125945
% 73.10/73.48 Inuse: 6111
% 73.10/73.48 Deleted: 35327
% 73.10/73.48 Deletedinuse: 1063
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 8009295
% 73.10/73.48 Kept: 127945
% 73.10/73.48 Inuse: 6274
% 73.10/73.48 Deleted: 35550
% 73.10/73.48 Deletedinuse: 1284
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 8239338
% 73.10/73.48 Kept: 130013
% 73.10/73.48 Inuse: 6357
% 73.10/73.48 Deleted: 35576
% 73.10/73.48 Deletedinuse: 1310
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48 Resimplifying inuse:
% 73.10/73.48 Done
% 73.10/73.48
% 73.10/73.48
% 73.10/73.48 Intermediate Status:
% 73.10/73.48 Generated: 8404742
% 73.10/73.48 Kept: 132015
% 73.10/73.48 Inuse: 6431
% 100.33/100.73 Deleted: 35576
% 100.33/100.73 Deletedinuse: 1310
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 8597995
% 100.33/100.73 Kept: 134084
% 100.33/100.73 Inuse: 6538
% 100.33/100.73 Deleted: 35576
% 100.33/100.73 Deletedinuse: 1310
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 8710413
% 100.33/100.73 Kept: 136198
% 100.33/100.73 Inuse: 6594
% 100.33/100.73 Deleted: 35576
% 100.33/100.73 Deletedinuse: 1310
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 8936449
% 100.33/100.73 Kept: 138204
% 100.33/100.73 Inuse: 6696
% 100.33/100.73 Deleted: 35854
% 100.33/100.73 Deletedinuse: 1582
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 9026001
% 100.33/100.73 Kept: 140300
% 100.33/100.73 Inuse: 6737
% 100.33/100.73 Deleted: 35944
% 100.33/100.73 Deletedinuse: 1672
% 100.33/100.73
% 100.33/100.73 *** allocated 2919240 integers for termspace/termends
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying clauses:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 9112553
% 100.33/100.73 Kept: 142338
% 100.33/100.73 Inuse: 6766
% 100.33/100.73 Deleted: 56977
% 100.33/100.73 Deletedinuse: 1795
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 9266696
% 100.33/100.73 Kept: 144510
% 100.33/100.73 Inuse: 6829
% 100.33/100.73 Deleted: 57087
% 100.33/100.73 Deletedinuse: 1904
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 9440865
% 100.33/100.73 Kept: 146528
% 100.33/100.73 Inuse: 6903
% 100.33/100.73 Deleted: 57182
% 100.33/100.73 Deletedinuse: 1995
% 100.33/100.73
% 100.33/100.73 *** allocated 22167978 integers for clauses
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 9590961
% 100.33/100.73 Kept: 148574
% 100.33/100.73 Inuse: 6971
% 100.33/100.73 Deleted: 57197
% 100.33/100.73 Deletedinuse: 2005
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 9902649
% 100.33/100.73 Kept: 150633
% 100.33/100.73 Inuse: 7091
% 100.33/100.73 Deleted: 57206
% 100.33/100.73 Deletedinuse: 2010
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 10184010
% 100.33/100.73 Kept: 152636
% 100.33/100.73 Inuse: 7207
% 100.33/100.73 Deleted: 57206
% 100.33/100.73 Deletedinuse: 2010
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 10464677
% 100.33/100.73 Kept: 154662
% 100.33/100.73 Inuse: 7315
% 100.33/100.73 Deleted: 57210
% 100.33/100.73 Deletedinuse: 2010
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 10808770
% 100.33/100.73 Kept: 156735
% 100.33/100.73 Inuse: 7473
% 100.33/100.73 Deleted: 57277
% 100.33/100.73 Deletedinuse: 2069
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 11113079
% 100.33/100.73 Kept: 158741
% 100.33/100.73 Inuse: 7619
% 100.33/100.73 Deleted: 57359
% 100.33/100.73 Deletedinuse: 2133
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 11554950
% 100.33/100.73 Kept: 160751
% 100.33/100.73 Inuse: 7746
% 100.33/100.73 Deleted: 57369
% 100.33/100.73 Deletedinuse: 2133
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying clauses:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 11760265
% 100.33/100.73 Kept: 162995
% 100.33/100.73 Inuse: 7804
% 100.33/100.73 Deleted: 69158
% 100.33/100.73 Deletedinuse: 2147
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 11821291
% 100.33/100.73 Kept: 165061
% 100.33/100.73 Inuse: 7828
% 100.33/100.73 Deleted: 69470
% 100.33/100.73 Deletedinuse: 2438
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 11972817
% 100.33/100.73 Kept: 167132
% 100.33/100.73 Inuse: 7892
% 100.33/100.73 Deleted: 69493
% 100.33/100.73 Deletedinuse: 2450
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 12202015
% 100.33/100.73 Kept: 169466
% 100.33/100.73 Inuse: 7971
% 100.33/100.73 Deleted: 69523
% 100.33/100.73 Deletedinuse: 2452
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 12280125
% 100.33/100.73 Kept: 171518
% 100.33/100.73 Inuse: 7992
% 100.33/100.73 Deleted: 69525
% 100.33/100.73 Deletedinuse: 2454
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 12571887
% 100.33/100.73 Kept: 173623
% 100.33/100.73 Inuse: 8095
% 100.33/100.73 Deleted: 69547
% 100.33/100.73 Deletedinuse: 2454
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 12697259
% 100.33/100.73 Kept: 175626
% 100.33/100.73 Inuse: 8151
% 100.33/100.73 Deleted: 69547
% 100.33/100.73 Deletedinuse: 2454
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 12892150
% 100.33/100.73 Kept: 177630
% 100.33/100.73 Inuse: 8242
% 100.33/100.73 Deleted: 69551
% 100.33/100.73 Deletedinuse: 2454
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 13101332
% 100.33/100.73 Kept: 179631
% 100.33/100.73 Inuse: 8309
% 100.33/100.73 Deleted: 69562
% 100.33/100.73 Deletedinuse: 2454
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 13328926
% 100.33/100.73 Kept: 181706
% 100.33/100.73 Inuse: 8400
% 100.33/100.73 Deleted: 69584
% 100.33/100.73 Deletedinuse: 2454
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying clauses:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 13407010
% 100.33/100.73 Kept: 183910
% 100.33/100.73 Inuse: 8428
% 100.33/100.73 Deleted: 81329
% 100.33/100.73 Deletedinuse: 2454
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 13635485
% 100.33/100.73 Kept: 185923
% 100.33/100.73 Inuse: 8508
% 100.33/100.73 Deleted: 81329
% 100.33/100.73 Deletedinuse: 2454
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 13912136
% 100.33/100.73 Kept: 187969
% 100.33/100.73 Inuse: 8610
% 100.33/100.73 Deleted: 81333
% 100.33/100.73 Deletedinuse: 2456
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 14064355
% 100.33/100.73 Kept: 190013
% 100.33/100.73 Inuse: 8663
% 100.33/100.73 Deleted: 81341
% 100.33/100.73 Deletedinuse: 2458
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 14555824
% 100.33/100.73 Kept: 192035
% 100.33/100.73 Inuse: 8764
% 100.33/100.73 Deleted: 81341
% 100.33/100.73 Deletedinuse: 2458
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 14733681
% 100.33/100.73 Kept: 194100
% 100.33/100.73 Inuse: 8795
% 100.33/100.73 Deleted: 81370
% 100.33/100.73 Deletedinuse: 2485
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 14883281
% 100.33/100.73 Kept: 196104
% 100.33/100.73 Inuse: 8826
% 100.33/100.73 Deleted: 81371
% 100.33/100.73 Deletedinuse: 2486
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 14978054
% 100.33/100.73 Kept: 198115
% 100.33/100.73 Inuse: 8843
% 100.33/100.73 Deleted: 81384
% 100.33/100.73 Deletedinuse: 2499
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 15116043
% 100.33/100.73 Kept: 200461
% 100.33/100.73 Inuse: 8880
% 100.33/100.73 Deleted: 81386
% 100.33/100.73 Deletedinuse: 2501
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 15223965
% 100.33/100.73 Kept: 202486
% 100.33/100.73 Inuse: 8898
% 100.33/100.73 Deleted: 81400
% 100.33/100.73 Deletedinuse: 2513
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying clauses:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 15388644
% 100.33/100.73 Kept: 204518
% 100.33/100.73 Inuse: 8936
% 100.33/100.73 Deleted: 84168
% 100.33/100.73 Deletedinuse: 2513
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 15749437
% 100.33/100.73 Kept: 206679
% 100.33/100.73 Inuse: 9015
% 100.33/100.73 Deleted: 84176
% 100.33/100.73 Deletedinuse: 2519
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 16125007
% 100.33/100.73 Kept: 208714
% 100.33/100.73 Inuse: 9091
% 100.33/100.73 Deleted: 84235
% 100.33/100.73 Deletedinuse: 2568
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 *** allocated 4378860 integers for termspace/termends
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 16905948
% 100.33/100.73 Kept: 210719
% 100.33/100.73 Inuse: 9253
% 100.33/100.73 Deleted: 84235
% 100.33/100.73 Deletedinuse: 2568
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 17102368
% 100.33/100.73 Kept: 212757
% 100.33/100.73 Inuse: 9286
% 100.33/100.73 Deleted: 84249
% 100.33/100.73 Deletedinuse: 2582
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73
% 100.33/100.73 Intermediate Status:
% 100.33/100.73 Generated: 17161348
% 100.33/100.73 Kept: 215011
% 100.33/100.73 Inuse: 9294
% 100.33/100.73 Deleted: 86140
% 100.33/100.73 Deletedinuse: 4473
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73 Done
% 100.33/100.73
% 100.33/100.73 Resimplifying inuse:
% 100.33/100.73
% 100.33/100.73 Bliksems!, er is een bewijs:
% 100.33/100.73 % SZS status Theorem
% 100.33/100.73 % SZS output start Refutation
% 100.33/100.73
% 100.33/100.73 (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.73 (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( join( X, Y )
% 100.33/100.73 , Z ) }.
% 100.33/100.73 (2) {G0,W14,D6,L1,V2,M1} I { join( complement( join( complement( X ),
% 100.33/100.73 complement( Y ) ) ), complement( join( complement( X ), Y ) ) ) ==> X }.
% 100.33/100.73 (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X ), complement
% 100.33/100.73 ( Y ) ) ) ==> meet( X, Y ) }.
% 100.33/100.73 (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z ) ) ==>
% 100.33/100.73 composition( composition( X, Y ), Z ) }.
% 100.33/100.73 (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 100.33/100.73 (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ), composition( Y, Z )
% 100.33/100.73 ) ==> composition( join( X, Y ), Z ) }.
% 100.33/100.73 (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 100.33/100.73 (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y ) ) ==>
% 100.33/100.73 converse( join( X, Y ) ) }.
% 100.33/100.73 (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ), converse( X ) )
% 100.33/100.73 ==> converse( composition( X, Y ) ) }.
% 100.33/100.73 (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X ), complement
% 100.33/100.73 ( composition( X, Y ) ) ), complement( Y ) ) ==> complement( Y ) }.
% 100.33/100.73 (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top }.
% 100.33/100.73 (12) {G0,W6,D4,L1,V1,M1} I { meet( X, complement( X ) ) ==> zero }.
% 100.33/100.73 (13) {G0,W5,D3,L1,V0,M1} I { join( skol1, one ) ==> one }.
% 100.33/100.73 (14) {G0,W46,D6,L2,V0,M2} I { ! join( meet( composition( skol1, skol2 ),
% 100.33/100.73 complement( skol3 ) ), meet( composition( skol1, skol2 ), complement(
% 100.33/100.73 composition( skol1, skol3 ) ) ) ) ==> meet( composition( skol1, skol2 ),
% 100.33/100.73 complement( composition( skol1, skol3 ) ) ), ! join( meet( composition(
% 100.33/100.73 skol1, skol2 ), complement( composition( skol1, skol3 ) ) ), meet(
% 100.33/100.73 composition( skol1, skol2 ), complement( skol3 ) ) ) ==> meet(
% 100.33/100.73 composition( skol1, skol2 ), complement( skol3 ) ) }.
% 100.33/100.73 (15) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X ) ==> top }.
% 100.33/100.73 (16) {G1,W5,D3,L1,V0,M1} P(0,13) { join( one, skol1 ) ==> one }.
% 100.33/100.73 (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y, converse( X )
% 100.33/100.73 ) ) ==> composition( X, converse( Y ) ) }.
% 100.33/100.73 (18) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( converse( X ), Y
% 100.33/100.73 ) ) ==> composition( converse( Y ), X ) }.
% 100.33/100.73 (19) {G1,W9,D4,L1,V2,M1} P(8,0);d(8) { converse( join( X, Y ) ) = converse
% 100.33/100.73 ( join( Y, X ) ) }.
% 100.33/100.73 (20) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X ), Y ) ) ==>
% 100.33/100.73 join( X, converse( Y ) ) }.
% 100.33/100.73 (21) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse( X ) ) ) ==>
% 100.33/100.73 join( converse( Y ), X ) }.
% 100.33/100.73 (22) {G1,W14,D5,L1,V3,M1} P(8,1) { join( join( Z, converse( X ) ), converse
% 100.33/100.73 ( Y ) ) ==> join( Z, converse( join( X, Y ) ) ) }.
% 100.33/100.73 (23) {G2,W10,D6,L1,V2,M1} P(1,15) { join( join( complement( join( X, Y ) )
% 100.33/100.73 , X ), Y ) ==> top }.
% 100.33/100.73 (24) {G2,W10,D5,L1,V2,M1} P(15,1) { join( join( Y, complement( X ) ), X )
% 100.33/100.73 ==> join( Y, top ) }.
% 100.33/100.73 (25) {G2,W9,D4,L1,V1,M1} P(16,1) { join( join( X, one ), skol1 ) ==> join(
% 100.33/100.73 X, one ) }.
% 100.33/100.73 (26) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) = join( join( Y
% 100.33/100.73 , Z ), X ) }.
% 100.33/100.73 (27) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X ) = join(
% 100.33/100.73 join( Z, X ), Y ) }.
% 100.33/100.73 (28) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ), complement( X ) )
% 100.33/100.73 ==> join( Y, top ) }.
% 100.33/100.73 (29) {G1,W9,D4,L1,V1,M1} P(13,1) { join( join( X, skol1 ), one ) ==> join(
% 100.33/100.73 X, one ) }.
% 100.33/100.73 (30) {G2,W13,D5,L1,V3,M1} P(1,19) { converse( join( join( X, Y ), Z ) ) =
% 100.33/100.73 converse( join( join( Y, Z ), X ) ) }.
% 100.33/100.73 (38) {G3,W9,D4,L1,V1,M1} P(0,25) { join( join( one, X ), skol1 ) ==> join(
% 100.33/100.73 one, X ) }.
% 100.33/100.73 (43) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ), complement( join
% 100.33/100.73 ( complement( X ), Y ) ) ) ==> X }.
% 100.33/100.73 (56) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X, Y ) }.
% 100.33/100.73 (58) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==> zero }.
% 100.33/100.73 (60) {G2,W9,D5,L1,V1,M1} P(58,3) { complement( join( complement( X ), zero
% 100.33/100.73 ) ) ==> meet( X, top ) }.
% 100.33/100.73 (69) {G1,W17,D5,L1,V4,M1} P(6,1) { join( join( T, composition( X, Y ) ),
% 100.33/100.73 composition( Z, Y ) ) ==> join( T, composition( join( X, Z ), Y ) ) }.
% 100.33/100.73 (72) {G1,W11,D4,L1,V3,M1} P(6,0);d(6) { composition( join( X, Z ), Y ) =
% 100.33/100.73 composition( join( Z, X ), Y ) }.
% 100.33/100.73 (84) {G2,W11,D6,L1,V1,M1} P(58,10) { join( composition( converse( X ),
% 100.33/100.73 complement( composition( X, top ) ) ), zero ) ==> zero }.
% 100.33/100.73 (88) {G1,W15,D7,L1,V2,M1} P(9,10);d(7) { join( composition( X, complement(
% 100.33/100.73 converse( composition( Y, X ) ) ) ), complement( converse( Y ) ) ) ==>
% 100.33/100.73 complement( converse( Y ) ) }.
% 100.33/100.73 (89) {G1,W13,D6,L1,V2,M1} P(10,0) { join( complement( Y ), composition(
% 100.33/100.73 converse( X ), complement( composition( X, Y ) ) ) ) ==> complement( Y )
% 100.33/100.73 }.
% 100.33/100.73 (91) {G1,W11,D5,L1,V1,M1} P(5,10) { join( composition( converse( X ),
% 100.33/100.73 complement( X ) ), complement( one ) ) ==> complement( one ) }.
% 100.33/100.73 (99) {G1,W46,D6,L2,V0,M2} P(0,14) { ! join( meet( composition( skol1, skol2
% 100.33/100.73 ), complement( skol3 ) ), meet( composition( skol1, skol2 ), complement
% 100.33/100.73 ( composition( skol1, skol3 ) ) ) ) ==> meet( composition( skol1, skol2 )
% 100.33/100.73 , complement( composition( skol1, skol3 ) ) ), ! join( meet( composition
% 100.33/100.73 ( skol1, skol2 ), complement( skol3 ) ), meet( composition( skol1, skol2
% 100.33/100.73 ), complement( composition( skol1, skol3 ) ) ) ) ==> meet( composition(
% 100.33/100.73 skol1, skol2 ), complement( skol3 ) ) }.
% 100.33/100.73 (130) {G2,W6,D4,L1,V1,M1} P(5,18);d(7) { composition( converse( one ), X )
% 100.33/100.73 ==> X }.
% 100.33/100.73 (136) {G3,W4,D3,L1,V0,M1} P(130,5) { converse( one ) ==> one }.
% 100.33/100.73 (137) {G4,W5,D3,L1,V1,M1} P(136,130) { composition( one, X ) ==> X }.
% 100.33/100.73 (139) {G4,W9,D4,L1,V1,M1} P(136,8) { join( converse( X ), one ) ==>
% 100.33/100.73 converse( join( X, one ) ) }.
% 100.33/100.73 (140) {G5,W8,D4,L1,V1,M1} P(137,10);d(130) { join( complement( X ),
% 100.33/100.73 complement( X ) ) ==> complement( X ) }.
% 100.33/100.73 (141) {G5,W11,D4,L1,V2,M1} P(137,6) { join( X, composition( Y, X ) ) =
% 100.33/100.73 composition( join( one, Y ), X ) }.
% 100.33/100.73 (142) {G5,W11,D4,L1,V2,M1} P(137,6) { join( composition( Y, X ), X ) =
% 100.33/100.73 composition( join( Y, one ), X ) }.
% 100.33/100.73 (145) {G6,W5,D3,L1,V0,M1} P(58,140) { join( zero, zero ) ==> zero }.
% 100.33/100.73 (146) {G6,W7,D4,L1,V1,M1} P(140,3) { complement( complement( X ) ) = meet(
% 100.33/100.73 X, X ) }.
% 100.33/100.73 (156) {G2,W9,D6,L1,V1,M1} P(11,20) { join( X, converse( complement(
% 100.33/100.73 converse( X ) ) ) ) ==> converse( top ) }.
% 100.33/100.73 (158) {G7,W9,D4,L1,V1,M1} P(145,1) { join( join( X, zero ), zero ) ==> join
% 100.33/100.73 ( X, zero ) }.
% 100.33/100.73 (168) {G2,W9,D6,L1,V1,M1} P(15,21) { join( converse( complement( converse(
% 100.33/100.73 X ) ) ), X ) ==> converse( top ) }.
% 100.33/100.73 (201) {G3,W10,D6,L1,V2,M1} P(23,0);d(1) { join( join( Y, complement( join(
% 100.33/100.73 X, Y ) ) ), X ) ==> top }.
% 100.33/100.73 (202) {G3,W10,D6,L1,V2,M1} P(0,23) { join( join( X, complement( join( X, Y
% 100.33/100.73 ) ) ), Y ) ==> top }.
% 100.33/100.73 (203) {G3,W10,D6,L1,V2,M1} P(0,23) { join( join( complement( join( Y, X ) )
% 100.33/100.73 , X ), Y ) ==> top }.
% 100.33/100.73 (224) {G6,W6,D4,L1,V1,M1} P(140,24);d(15) { join( complement( X ), top )
% 100.33/100.73 ==> top }.
% 100.33/100.73 (230) {G7,W5,D3,L1,V1,M1} P(15,24);d(224) { join( top, X ) ==> top }.
% 100.33/100.73 (231) {G3,W10,D4,L1,V2,M1} P(24,0);d(1) { join( join( Y, X ), complement( Y
% 100.33/100.73 ) ) ==> join( X, top ) }.
% 100.33/100.73 (233) {G8,W5,D3,L1,V1,M1} P(11,24);d(230) { join( X, top ) ==> top }.
% 100.33/100.73 (235) {G9,W7,D4,L1,V1,M1} P(233,20) { join( X, converse( top ) ) ==>
% 100.33/100.73 converse( top ) }.
% 100.33/100.73 (236) {G2,W15,D5,L1,V4,M1} P(26,26);d(1) { join( join( join( Y, Z ), X ), T
% 100.33/100.73 ) = join( join( join( Z, T ), X ), Y ) }.
% 100.33/100.73 (260) {G10,W4,D3,L1,V0,M1} P(235,230) { converse( top ) ==> top }.
% 100.33/100.73 (261) {G11,W9,D4,L1,V1,M1} P(260,18) { composition( converse( X ), top )
% 100.33/100.73 ==> converse( composition( top, X ) ) }.
% 100.33/100.73 (262) {G11,W9,D4,L1,V1,M1} P(260,17) { composition( top, converse( X ) )
% 100.33/100.73 ==> converse( composition( X, top ) ) }.
% 100.33/100.73 (268) {G2,W11,D4,L1,V3,M1} P(27,26) { join( join( Z, X ), Y ) = join( join
% 100.33/100.73 ( X, Z ), Y ) }.
% 100.33/100.73 (270) {G8,W12,D7,L1,V3,M1} P(23,27);d(230) { join( join( join( complement(
% 100.33/100.73 join( X, Y ) ), X ), Z ), Y ) ==> top }.
% 100.33/100.73 (282) {G12,W15,D5,L1,V2,M1} P(261,6) { join( converse( composition( top, X
% 100.33/100.73 ) ), composition( Y, top ) ) ==> composition( join( converse( X ), Y ),
% 100.33/100.73 top ) }.
% 100.33/100.73 (296) {G9,W8,D4,L1,V2,M1} S(28);d(233) { join( join( Y, X ), complement( X
% 100.33/100.73 ) ) ==> top }.
% 100.33/100.73 (355) {G11,W8,D6,L1,V1,M1} S(168);d(260) { join( converse( complement(
% 100.33/100.73 converse( X ) ) ), X ) ==> top }.
% 100.33/100.73 (364) {G12,W8,D6,L1,V0,M1} P(355,29);d(230);d(139) { converse( join(
% 100.33/100.73 complement( converse( skol1 ) ), one ) ) ==> top }.
% 100.33/100.73 (383) {G13,W7,D5,L1,V0,M1} P(364,7);d(260) { join( complement( converse(
% 100.33/100.73 skol1 ) ), one ) ==> top }.
% 100.33/100.73 (404) {G11,W8,D6,L1,V1,M1} S(156);d(260) { join( X, converse( complement(
% 100.33/100.73 converse( X ) ) ) ) ==> top }.
% 100.33/100.73 (413) {G9,W8,D4,L1,V2,M1} S(231);d(233) { join( join( Y, X ), complement( Y
% 100.33/100.73 ) ) ==> top }.
% 100.33/100.73 (418) {G11,W7,D4,L1,V1,M1} P(235,43);d(260);d(58) { join( meet( X, top ),
% 100.33/100.73 zero ) ==> X }.
% 100.33/100.73 (432) {G2,W10,D5,L1,V2,M1} P(3,43) { join( meet( X, complement( Y ) ), meet
% 100.33/100.73 ( X, Y ) ) ==> X }.
% 100.33/100.73 (450) {G12,W5,D3,L1,V1,M1} P(418,158) { join( X, zero ) ==> X }.
% 100.33/100.73 (451) {G13,W4,D3,L1,V0,M1} P(146,418);d(450);d(58) { complement( zero ) ==>
% 100.33/100.73 top }.
% 100.33/100.73 (452) {G13,W5,D3,L1,V1,M1} P(56,418);d(450) { meet( top, X ) ==> X }.
% 100.33/100.73 (454) {G13,W9,D4,L1,V2,M1} P(418,1);d(450) { join( Y, meet( X, top ) ) ==>
% 100.33/100.73 join( Y, X ) }.
% 100.33/100.73 (455) {G14,W5,D3,L1,V1,M1} P(418,0);d(454) { join( zero, X ) ==> X }.
% 100.33/100.73 (457) {G14,W5,D3,L1,V1,M1} P(451,3);d(233);d(58) { meet( X, zero ) ==> zero
% 100.33/100.73 }.
% 100.33/100.73 (458) {G15,W5,D3,L1,V1,M1} P(457,43);d(455);d(60) { meet( X, top ) ==> X
% 100.33/100.73 }.
% 100.33/100.73 (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement( complement( X ) )
% 100.33/100.73 ==> X }.
% 100.33/100.73 (462) {G15,W6,D4,L1,V1,M1} P(455,21);d(7) { join( converse( zero ), X ) ==>
% 100.33/100.73 X }.
% 100.33/100.73 (468) {G17,W5,D3,L1,V1,M1} P(460,146) { meet( X, X ) ==> X }.
% 100.33/100.73 (469) {G17,W5,D3,L1,V1,M1} P(460,140) { join( X, X ) ==> X }.
% 100.33/100.73 (470) {G17,W12,D7,L1,V2,M1} P(460,10) { join( composition( converse( Y ),
% 100.33/100.73 complement( composition( Y, complement( X ) ) ) ), X ) ==> X }.
% 100.33/100.73 (471) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( X, complement( Y )
% 100.33/100.73 ) ) ==> meet( complement( X ), Y ) }.
% 100.33/100.73 (472) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( complement( Y ), X
% 100.33/100.73 ) ) ==> meet( Y, complement( X ) ) }.
% 100.33/100.73 (473) {G17,W10,D4,L1,V2,M1} P(3,460) { join( complement( X ), complement( Y
% 100.33/100.73 ) ) ==> complement( meet( X, Y ) ) }.
% 100.33/100.73 (478) {G18,W9,D4,L1,V2,M1} P(469,27);d(1);d(469) { join( join( X, Y ), Y )
% 100.33/100.73 ==> join( X, Y ) }.
% 100.33/100.73 (479) {G18,W9,D4,L1,V2,M1} P(469,27) { join( join( X, Y ), X ) ==> join( X
% 100.33/100.73 , Y ) }.
% 100.33/100.73 (480) {G16,W4,D3,L1,V0,M1} P(462,450) { converse( zero ) ==> zero }.
% 100.33/100.73 (490) {G10,W8,D5,L1,V2,M1} P(43,413) { join( X, complement( meet( X, Y ) )
% 100.33/100.73 ) ==> top }.
% 100.33/100.73 (513) {G13,W9,D6,L1,V2,M1} P(490,43);d(58);d(450) { meet( X, complement(
% 100.33/100.73 meet( complement( X ), Y ) ) ) ==> X }.
% 100.33/100.73 (529) {G11,W10,D5,L1,V3,M1} P(490,26);d(230) { join( join( Z, X ),
% 100.33/100.73 complement( meet( X, Y ) ) ) ==> top }.
% 100.33/100.73 (532) {G11,W8,D5,L1,V2,M1} P(56,490) { join( X, complement( meet( Y, X ) )
% 100.33/100.73 ) ==> top }.
% 100.33/100.73 (535) {G11,W8,D5,L1,V2,M1} P(490,0) { join( complement( meet( X, Y ) ), X )
% 100.33/100.73 ==> top }.
% 100.33/100.73 (555) {G12,W8,D5,L1,V2,M1} P(532,3);d(58) { meet( X, meet( Y, complement( X
% 100.33/100.73 ) ) ) ==> zero }.
% 100.33/100.73 (571) {G17,W8,D4,L1,V2,M1} P(460,555) { meet( complement( X ), meet( Y, X )
% 100.33/100.73 ) ==> zero }.
% 100.33/100.73 (575) {G18,W8,D4,L1,V2,M1} P(571,56) { meet( meet( Y, X ), complement( X )
% 100.33/100.73 ) ==> zero }.
% 100.33/100.73 (576) {G18,W8,D4,L1,V2,M1} P(56,571) { meet( complement( Y ), meet( Y, X )
% 100.33/100.73 ) ==> zero }.
% 100.33/100.73 (579) {G19,W9,D4,L1,V2,M1} P(575,43);d(455);d(3) { meet( meet( X, Y ), Y )
% 100.33/100.73 ==> meet( X, Y ) }.
% 100.33/100.73 (580) {G19,W8,D4,L1,V2,M1} P(56,575) { meet( meet( Y, X ), complement( Y )
% 100.33/100.73 ) ==> zero }.
% 100.33/100.73 (582) {G20,W9,D4,L1,V2,M1} P(580,43);d(455);d(3) { meet( meet( X, Y ), X )
% 100.33/100.73 ==> meet( X, Y ) }.
% 100.33/100.73 (603) {G12,W12,D6,L1,V3,M1} P(535,22);d(230) { join( complement( meet(
% 100.33/100.73 converse( X ), Y ) ), converse( join( X, Z ) ) ) ==> top }.
% 100.33/100.73 (689) {G21,W9,D4,L1,V2,M1} P(582,56) { meet( X, meet( X, Y ) ) ==> meet( X
% 100.33/100.73 , Y ) }.
% 100.33/100.73 (691) {G22,W9,D4,L1,V2,M1} P(56,689) { meet( X, meet( Y, X ) ) ==> meet( Y
% 100.33/100.73 , X ) }.
% 100.33/100.73 (693) {G19,W8,D5,L1,V2,M1} P(43,478);d(472) { join( X, meet( X, complement
% 100.33/100.73 ( Y ) ) ) ==> X }.
% 100.33/100.73 (699) {G20,W7,D4,L1,V2,M1} P(460,693) { join( Y, meet( Y, X ) ) ==> Y }.
% 100.33/100.73 (716) {G23,W7,D4,L1,V2,M1} P(691,699) { join( X, meet( Y, X ) ) ==> X }.
% 100.33/100.73 (728) {G21,W11,D4,L1,V3,M1} P(699,27) { join( join( X, Z ), meet( X, Y ) )
% 100.33/100.73 ==> join( X, Z ) }.
% 100.33/100.73 (730) {G21,W11,D5,L1,V3,M1} P(699,26) { join( join( meet( X, Y ), Z ), X )
% 100.33/100.73 ==> join( X, Z ) }.
% 100.33/100.73 (733) {G21,W9,D6,L1,V2,M1} P(699,20);d(7) { join( X, converse( meet(
% 100.33/100.73 converse( X ), Y ) ) ) ==> X }.
% 100.33/100.73 (736) {G21,W7,D4,L1,V2,M1} P(699,0) { join( meet( X, Y ), X ) ==> X }.
% 100.33/100.73 (748) {G24,W11,D4,L1,V3,M1} P(716,27) { join( join( X, Z ), meet( Y, X ) )
% 100.33/100.73 ==> join( X, Z ) }.
% 100.33/100.73 (756) {G24,W7,D4,L1,V2,M1} P(716,0) { join( meet( Y, X ), X ) ==> X }.
% 100.33/100.73 (758) {G25,W11,D5,L1,V3,M1} P(756,26) { join( join( Z, meet( X, Y ) ), Y )
% 100.33/100.73 ==> join( Y, Z ) }.
% 100.33/100.73 (760) {G25,W9,D6,L1,V2,M1} P(756,21);d(7) { join( converse( meet( X,
% 100.33/100.73 converse( Y ) ) ), Y ) ==> Y }.
% 100.33/100.73 (762) {G22,W11,D5,L1,V3,M1} P(736,26) { join( join( Z, meet( X, Y ) ), X )
% 100.33/100.73 ==> join( X, Z ) }.
% 100.33/100.73 (794) {G13,W9,D5,L1,V1,M1} S(84);d(450) { composition( converse( X ),
% 100.33/100.73 complement( composition( X, top ) ) ) ==> zero }.
% 100.33/100.73 (824) {G14,W8,D5,L1,V0,M1} P(364,794);d(383) { composition( top, complement
% 100.33/100.73 ( composition( top, top ) ) ) ==> zero }.
% 100.33/100.73 (843) {G15,W8,D5,L1,V1,M1} P(824,6);d(450);d(233);d(824) { composition( X,
% 100.33/100.73 complement( composition( top, top ) ) ) ==> zero }.
% 100.33/100.73 (850) {G19,W15,D7,L1,V2,M1} P(88,479) { join( complement( converse( Y ) ),
% 100.33/100.73 composition( X, complement( converse( composition( Y, X ) ) ) ) ) ==>
% 100.33/100.73 complement( converse( Y ) ) }.
% 100.33/100.73 (853) {G16,W6,D4,L1,V0,M1} P(843,137) { complement( composition( top, top )
% 100.33/100.73 ) ==> zero }.
% 100.33/100.73 (860) {G17,W5,D3,L1,V0,M1} P(853,460);d(451) { composition( top, top ) ==>
% 100.33/100.73 top }.
% 100.33/100.73 (861) {G18,W9,D4,L1,V1,M1} P(860,4) { composition( composition( X, top ),
% 100.33/100.73 top ) ==> composition( X, top ) }.
% 100.33/100.73 (868) {G19,W13,D5,L1,V2,M1} P(861,6);d(6) { composition( join( Y,
% 100.33/100.73 composition( X, top ) ), top ) ==> composition( join( Y, X ), top ) }.
% 100.33/100.73 (899) {G26,W9,D6,L1,V1,M1} P(760,29);d(13);d(139) { converse( join( meet( X
% 100.33/100.73 , converse( skol1 ) ), one ) ) ==> one }.
% 100.33/100.73 (908) {G22,W14,D5,L1,V3,M1} P(733,30);d(21) { join( converse( join( Z, X )
% 100.33/100.73 ), meet( converse( X ), Y ) ) ==> converse( join( X, Z ) ) }.
% 100.33/100.73 (938) {G27,W8,D5,L1,V1,M1} P(899,7);d(136) { join( meet( X, converse( skol1
% 100.33/100.73 ) ), one ) ==> one }.
% 100.33/100.73 (939) {G28,W8,D5,L1,V1,M1} P(938,479) { join( one, meet( X, converse( skol1
% 100.33/100.73 ) ) ) ==> one }.
% 100.33/100.73 (947) {G29,W8,D5,L1,V1,M1} P(582,939) { join( one, meet( converse( skol1 )
% 100.33/100.73 , X ) ) ==> one }.
% 100.33/100.73 (953) {G30,W9,D6,L1,V1,M1} P(947,296) { join( one, complement( meet(
% 100.33/100.73 converse( skol1 ), X ) ) ) ==> top }.
% 100.33/100.73 (969) {G31,W9,D6,L1,V1,M1} P(953,0) { join( complement( meet( converse(
% 100.33/100.73 skol1 ), X ) ), one ) ==> top }.
% 100.33/100.73 (971) {G32,W11,D5,L1,V1,M1} P(969,43);d(58);d(450) { meet( meet( converse(
% 100.33/100.73 skol1 ), X ), one ) ==> meet( converse( skol1 ), X ) }.
% 100.33/100.73 (994) {G18,W10,D5,L1,V2,M1} P(460,473) { complement( meet( complement( X )
% 100.33/100.73 , Y ) ) ==> join( X, complement( Y ) ) }.
% 100.33/100.73 (995) {G18,W10,D5,L1,V2,M1} P(460,473) { complement( meet( Y, complement( X
% 100.33/100.73 ) ) ) ==> join( complement( Y ), X ) }.
% 100.33/100.73 (999) {G18,W14,D5,L1,V3,M1} P(473,27) { join( join( complement( X ), Z ),
% 100.33/100.73 complement( Y ) ) ==> join( complement( meet( X, Y ) ), Z ) }.
% 100.33/100.73 (1004) {G18,W9,D4,L1,V2,M1} P(473,0);d(473) { complement( meet( X, Y ) ) =
% 100.33/100.73 complement( meet( Y, X ) ) }.
% 100.33/100.73 (1005) {G19,W8,D5,L1,V2,M1} S(513);d(994) { meet( X, join( X, complement( Y
% 100.33/100.73 ) ) ) ==> X }.
% 100.33/100.73 (1009) {G18,W10,D5,L1,V2,M1} S(43);d(472) { join( meet( X, Y ), meet( X,
% 100.33/100.73 complement( Y ) ) ) ==> X }.
% 100.33/100.73 (1028) {G20,W7,D4,L1,V2,M1} P(460,1005) { meet( Y, join( Y, X ) ) ==> Y }.
% 100.33/100.73 (1034) {G23,W7,D4,L1,V2,M1} P(1028,691) { meet( join( X, Y ), X ) ==> X }.
% 100.33/100.73 (1035) {G21,W8,D5,L1,V2,M1} P(1028,575) { meet( X, complement( join( X, Y )
% 100.33/100.73 ) ) ==> zero }.
% 100.33/100.73 (1036) {G21,W8,D5,L1,V2,M1} P(1028,571) { meet( complement( join( X, Y ) )
% 100.33/100.73 , X ) ==> zero }.
% 100.33/100.73 (1047) {G21,W7,D4,L1,V2,M1} P(0,1028) { meet( X, join( Y, X ) ) ==> X }.
% 100.33/100.73 (1061) {G24,W9,D5,L1,V3,M1} P(1,1034) { meet( join( join( X, Y ), Z ), X )
% 100.33/100.73 ==> X }.
% 100.33/100.73 (1063) {G24,W7,D4,L1,V2,M1} P(0,1034) { meet( join( Y, X ), X ) ==> X }.
% 100.33/100.73 (1074) {G25,W8,D5,L1,V2,M1} P(1063,576) { meet( complement( join( X, Y ) )
% 100.33/100.73 , Y ) ==> zero }.
% 100.33/100.73 (1076) {G25,W9,D5,L1,V3,M1} P(27,1063) { meet( join( join( X, Z ), Y ), Z )
% 100.33/100.73 ==> Z }.
% 100.33/100.73 (1083) {G25,W10,D5,L1,V2,M1} P(8,1063) { meet( converse( join( X, Y ) ),
% 100.33/100.73 converse( Y ) ) ==> converse( Y ) }.
% 100.33/100.73 (1085) {G22,W9,D5,L1,V3,M1} P(27,1047) { meet( Z, join( join( X, Z ), Y ) )
% 100.33/100.73 ==> Z }.
% 100.33/100.73 (1089) {G22,W7,D4,L1,V1,M1} P(38,1047) { meet( skol1, join( one, X ) ) ==>
% 100.33/100.73 skol1 }.
% 100.33/100.73 (1094) {G23,W8,D5,L1,V1,M1} P(1089,571) { meet( complement( join( one, X )
% 100.33/100.73 ), skol1 ) ==> zero }.
% 100.33/100.73 (1109) {G26,W11,D6,L1,V2,M1} P(89,1074);d(460) { meet( X, composition(
% 100.33/100.73 converse( Y ), complement( composition( Y, X ) ) ) ) ==> zero }.
% 100.33/100.73 (1136) {G22,W9,D5,L1,V1,M1} P(91,1035);d(460) { meet( composition( converse
% 100.33/100.73 ( X ), complement( X ) ), one ) ==> zero }.
% 100.33/100.73 (1208) {G19,W10,D5,L1,V2,M1} P(1004,11) { join( meet( X, Y ), complement(
% 100.33/100.73 meet( Y, X ) ) ) ==> top }.
% 100.33/100.73 (1209) {G19,W10,D5,L1,V2,M1} P(1004,12) { meet( meet( X, Y ), complement(
% 100.33/100.73 meet( Y, X ) ) ) ==> zero }.
% 100.33/100.73 (1292) {G23,W9,D6,L1,V1,M1} P(460,1136) { meet( composition( converse(
% 100.33/100.73 complement( X ) ), X ), one ) ==> zero }.
% 100.33/100.73 (1302) {G24,W7,D5,L1,V0,M1} P(5,1292) { meet( converse( complement( one ) )
% 100.33/100.73 , one ) ==> zero }.
% 100.33/100.73 (1304) {G25,W7,D5,L1,V0,M1} P(1302,56) { meet( one, converse( complement(
% 100.33/100.73 one ) ) ) ==> zero }.
% 100.33/100.73 (1493) {G20,W11,D4,L1,V2,M1} P(1209,1009);d(455);d(460) { meet( meet( X, Y
% 100.33/100.73 ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 100.33/100.73 (1506) {G26,W8,D6,L1,V0,M1} P(1304,1009);d(455) { meet( one, complement(
% 100.33/100.73 converse( complement( one ) ) ) ) ==> one }.
% 100.33/100.73 (1507) {G25,W10,D5,L1,V0,M1} P(1302,1009);d(455) { meet( converse(
% 100.33/100.73 complement( one ) ), complement( one ) ) ==> converse( complement( one )
% 100.33/100.73 ) }.
% 100.33/100.73 (1534) {G19,W10,D5,L1,V2,M1} P(56,1009) { join( meet( Y, X ), meet( X,
% 100.33/100.73 complement( Y ) ) ) ==> X }.
% 100.33/100.73 (1535) {G19,W10,D5,L1,V2,M1} P(56,1009) { join( meet( X, Y ), meet(
% 100.33/100.73 complement( Y ), X ) ) ==> X }.
% 100.33/100.73 (1546) {G27,W8,D6,L1,V0,M1} P(1506,691) { meet( complement( converse(
% 100.33/100.73 complement( one ) ) ), one ) ==> one }.
% 100.33/100.73 (1550) {G28,W9,D5,L1,V0,M1} P(1546,1004);d(995) { join( complement( one ),
% 100.33/100.73 converse( complement( one ) ) ) ==> complement( one ) }.
% 100.33/100.73 (1551) {G29,W6,D4,L1,V0,M1} P(1550,1083);d(7);d(1507) { converse(
% 100.33/100.73 complement( one ) ) ==> complement( one ) }.
% 100.33/100.73 (1572) {G30,W15,D6,L1,V2,M1} P(1551,22) { join( X, converse( join(
% 100.33/100.73 complement( one ), Y ) ) ) ==> join( join( X, complement( one ) ),
% 100.33/100.73 converse( Y ) ) }.
% 100.33/100.73 (1587) {G20,W10,D5,L1,V2,M1} P(56,1534) { join( meet( Y, X ), meet(
% 100.33/100.73 complement( Y ), X ) ) ==> X }.
% 100.33/100.73 (1589) {G20,W10,D5,L1,V2,M1} P(1534,0) { join( meet( Y, complement( X ) ),
% 100.33/100.73 meet( X, Y ) ) ==> Y }.
% 100.33/100.73 (1788) {G24,W8,D5,L1,V1,M1} P(471,1094) { meet( meet( complement( one ), X
% 100.33/100.73 ), skol1 ) ==> zero }.
% 100.33/100.73 (1795) {G18,W10,D4,L1,V2,M1} P(460,471) { meet( complement( Y ), complement
% 100.33/100.73 ( X ) ) ==> complement( join( Y, X ) ) }.
% 100.33/100.73 (1797) {G18,W14,D6,L1,V3,M1} P(27,471) { complement( join( join( X,
% 100.33/100.73 complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 100.33/100.73 (1799) {G18,W14,D6,L1,V3,M1} P(26,471) { complement( join( join( complement
% 100.33/100.73 ( Z ), X ), Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 100.33/100.73 (1803) {G25,W8,D5,L1,V1,M1} P(691,1788) { meet( meet( X, complement( one )
% 100.33/100.73 ), skol1 ) ==> zero }.
% 100.33/100.73 (1805) {G26,W8,D5,L1,V1,M1} P(1803,1209);d(451);d(458) { meet( skol1, meet
% 100.33/100.73 ( X, complement( one ) ) ) ==> zero }.
% 100.33/100.73 (1823) {G23,W11,D5,L1,V3,M1} P(141,1085) { meet( Y, composition( join( one
% 100.33/100.73 , Z ), join( X, Y ) ) ) ==> Y }.
% 100.33/100.73 (1837) {G20,W7,D4,L1,V1,M1} P(861,141);d(230);d(868) { composition( join(
% 100.33/100.73 one, X ), top ) ==> top }.
% 100.33/100.73 (1864) {G9,W9,D4,L1,V1,M1} P(233,141) { join( X, composition( top, X ) )
% 100.33/100.73 ==> composition( top, X ) }.
% 100.33/100.73 (1872) {G6,W7,D4,L1,V1,M1} P(16,141);d(137) { join( X, composition( skol1,
% 100.33/100.73 X ) ) ==> X }.
% 100.33/100.73 (1875) {G21,W7,D4,L1,V1,M1} P(1837,72) { composition( join( X, one ), top )
% 100.33/100.73 ==> top }.
% 100.33/100.73 (1883) {G22,W8,D5,L1,V1,M1} P(139,1875);d(261) { converse( composition( top
% 100.33/100.73 , join( X, one ) ) ) ==> top }.
% 100.33/100.73 (1893) {G26,W8,D4,L1,V1,M1} P(1872,1074) { meet( complement( X ),
% 100.33/100.73 composition( skol1, X ) ) ==> zero }.
% 100.33/100.73 (1894) {G22,W9,D4,L1,V1,M1} P(1872,1047) { meet( composition( skol1, X ), X
% 100.33/100.73 ) ==> composition( skol1, X ) }.
% 100.33/100.73 (1920) {G7,W7,D4,L1,V1,M1} P(1872,0) { join( composition( skol1, X ), X )
% 100.33/100.73 ==> X }.
% 100.33/100.73 (1927) {G8,W8,D5,L1,V1,M1} P(1920,21);d(7);d(17) { join( composition( X,
% 100.33/100.73 converse( skol1 ) ), X ) ==> X }.
% 100.33/100.73 (1957) {G22,W9,D5,L1,V2,M1} P(736,142);d(137) { join( composition( meet(
% 100.33/100.73 one, X ), Y ), Y ) ==> Y }.
% 100.33/100.73 (1970) {G30,W10,D5,L1,V1,M1} P(355,142);d(136);d(1551) { join( composition
% 100.33/100.73 ( complement( one ), X ), X ) ==> composition( top, X ) }.
% 100.33/100.73 (1984) {G8,W9,D4,L1,V1,M1} P(230,142) { join( composition( top, X ), X )
% 100.33/100.73 ==> composition( top, X ) }.
% 100.33/100.73 (2027) {G27,W8,D5,L1,V1,M1} P(460,1893) { meet( X, composition( skol1,
% 100.33/100.73 complement( X ) ) ) ==> zero }.
% 100.33/100.73 (2031) {G28,W9,D6,L1,V1,M1} P(2027,1009);d(455) { meet( X, complement(
% 100.33/100.73 composition( skol1, complement( X ) ) ) ) ==> X }.
% 100.33/100.73 (2046) {G9,W8,D5,L1,V1,M1} P(1927,142);d(137);d(137) { join( composition(
% 100.33/100.73 converse( skol1 ), X ), X ) ==> X }.
% 100.33/100.73 (2055) {G22,W9,D5,L1,V1,M1} P(1927,1036) { meet( complement( X ),
% 100.33/100.73 composition( X, converse( skol1 ) ) ) ==> zero }.
% 100.33/100.73 (2094) {G10,W7,D4,L1,V1,M1} P(2046,21);d(7);d(17);d(7) { join( composition
% 100.33/100.73 ( X, skol1 ), X ) ==> X }.
% 100.33/100.73 (2098) {G18,W9,D6,L1,V1,M1} P(2094,471);d(460) { meet( complement(
% 100.33/100.73 composition( complement( X ), skol1 ) ), X ) ==> X }.
% 100.33/100.73 (2108) {G24,W9,D4,L1,V1,M1} P(2094,1034) { meet( X, composition( X, skol1 )
% 100.33/100.73 ) ==> composition( X, skol1 ) }.
% 100.33/100.73 (2111) {G19,W7,D4,L1,V1,M1} P(2094,479) { join( X, composition( X, skol1 )
% 100.33/100.73 ) ==> X }.
% 100.33/100.73 (2118) {G11,W11,D4,L1,V2,M1} P(2094,26) { join( join( X, Y ), composition(
% 100.33/100.73 X, skol1 ) ) ==> join( X, Y ) }.
% 100.33/100.73 (2125) {G20,W13,D5,L1,V2,M1} P(2111,69);d(1);d(2118) { join( X, composition
% 100.33/100.73 ( join( Y, X ), skol1 ) ) ==> join( X, composition( Y, skol1 ) ) }.
% 100.33/100.73 (2207) {G23,W14,D5,L1,V2,M1} P(1883,733);d(452) { join( composition( top,
% 100.33/100.73 join( X, one ) ), converse( Y ) ) ==> composition( top, join( X, one ) )
% 100.33/100.73 }.
% 100.33/100.73 (2211) {G24,W7,D4,L1,V1,M1} P(1883,404);d(2207) { composition( top, join( X
% 100.33/100.73 , one ) ) ==> top }.
% 100.33/100.73 (2217) {G25,W7,D4,L1,V1,M1} P(479,2211) { composition( top, join( one, X )
% 100.33/100.73 ) ==> top }.
% 100.33/100.73 (2275) {G25,W13,D6,L1,V1,M1} P(2108,994) { join( X, complement( composition
% 100.33/100.73 ( complement( X ), skol1 ) ) ) ==> complement( composition( complement( X
% 100.33/100.73 ), skol1 ) ) }.
% 100.33/100.73 (2320) {G22,W7,D4,L1,V1,M1} P(1984,1047) { meet( X, composition( top, X ) )
% 100.33/100.73 ==> X }.
% 100.33/100.73 (2329) {G9,W13,D4,L1,V2,M1} P(1984,26) { join( join( X, Y ), composition(
% 100.33/100.73 top, X ) ) ==> join( composition( top, X ), Y ) }.
% 100.33/100.73 (2332) {G11,W9,D4,L1,V1,M1} P(1984,21);d(17);d(260) { join( composition( X
% 100.33/100.73 , top ), X ) ==> composition( X, top ) }.
% 100.33/100.73 (2334) {G23,W9,D6,L1,V1,M1} P(2320,994);d(460) { join( X, complement(
% 100.33/100.73 composition( top, complement( X ) ) ) ) ==> X }.
% 100.33/100.73 (2428) {G22,W7,D4,L1,V1,M1} P(2332,1047) { meet( X, composition( X, top ) )
% 100.33/100.73 ==> X }.
% 100.33/100.73 (2443) {G12,W9,D4,L1,V1,M1} P(2332,0) { join( X, composition( X, top ) )
% 100.33/100.73 ==> composition( X, top ) }.
% 100.33/100.73 (2533) {G25,W9,D5,L1,V2,M1} P(2443,1061) { meet( composition( join( X, Y )
% 100.33/100.73 , top ), X ) ==> X }.
% 100.33/100.73 (2543) {G27,W8,D5,L1,V0,M1} P(1894,1805) { meet( skol1, composition( skol1
% 100.33/100.73 , complement( one ) ) ) ==> zero }.
% 100.33/100.73 (2552) {G28,W9,D6,L1,V0,M1} P(2543,1535);d(455) { meet( complement(
% 100.33/100.73 composition( skol1, complement( one ) ) ), skol1 ) ==> skol1 }.
% 100.33/100.73 (2561) {G25,W9,D5,L1,V2,M1} P(1864,1061) { meet( composition( top, join( X
% 100.33/100.73 , Y ) ), X ) ==> X }.
% 100.33/100.73 (2562) {G26,W9,D5,L1,V2,M1} P(1864,1076) { meet( composition( top, join( X
% 100.33/100.73 , Y ) ), Y ) ==> Y }.
% 100.33/100.73 (2567) {G10,W13,D4,L1,V2,M1} P(1864,26) { join( join( Y, X ), composition(
% 100.33/100.73 top, X ) ) ==> join( composition( top, X ), Y ) }.
% 100.33/100.73 (2602) {G26,W11,D4,L1,V2,M1} P(142,2561);d(4);d(2211) { meet( composition(
% 100.33/100.73 top, Y ), composition( X, Y ) ) ==> composition( X, Y ) }.
% 100.33/100.73 (2625) {G27,W10,D5,L1,V2,M1} P(2562,535) { join( complement( Y ),
% 100.33/100.73 composition( top, join( X, Y ) ) ) ==> top }.
% 100.33/100.73 (2927) {G26,W15,D5,L1,V2,M1} P(1957,2533) { meet( composition( Y, top ),
% 100.33/100.73 composition( meet( one, X ), Y ) ) ==> composition( meet( one, X ), Y )
% 100.33/100.73 }.
% 100.33/100.73 (3194) {G23,W9,D5,L1,V1,M1} P(460,2055) { meet( X, composition( complement
% 100.33/100.73 ( X ), converse( skol1 ) ) ) ==> zero }.
% 100.33/100.73 (3378) {G24,W15,D8,L1,V2,M1} P(2334,26) { join( join( Y, complement(
% 100.33/100.73 composition( top, complement( join( X, Y ) ) ) ) ), X ) ==> join( X, Y )
% 100.33/100.73 }.
% 100.33/100.73 (3434) {G29,W15,D7,L1,V2,M1} P(1004,2031) { meet( meet( X, Y ), complement
% 100.33/100.73 ( composition( skol1, complement( meet( Y, X ) ) ) ) ) ==> meet( X, Y )
% 100.33/100.73 }.
% 100.33/100.73 (3504) {G29,W10,D5,L1,V0,M1} P(2552,1004);d(995) { join( complement( skol1
% 100.33/100.73 ), composition( skol1, complement( one ) ) ) ==> complement( skol1 ) }.
% 100.33/100.73 (3570) {G19,W14,D5,L1,V3,M1} P(471,1795);d(1797) { meet( meet( complement(
% 100.33/100.73 X ), Y ), complement( Z ) ) ==> meet( complement( join( X, Z ) ), Y ) }.
% 100.33/100.73 (3573) {G19,W15,D6,L1,V3,M1} P(994,1795) { meet( join( X, complement( Y ) )
% 100.33/100.73 , complement( Z ) ) ==> complement( join( meet( complement( X ), Y ), Z )
% 100.33/100.73 ) }.
% 100.33/100.73 (3581) {G20,W10,D5,L1,V2,M1} P(1795,1209);d(1795);d(1795);d(471) { meet(
% 100.33/100.73 complement( join( X, Y ) ), join( Y, X ) ) ==> zero }.
% 100.33/100.73 (3585) {G19,W9,D4,L1,V2,M1} P(1795,56);d(1795) { complement( join( X, Y ) )
% 100.33/100.73 = complement( join( Y, X ) ) }.
% 100.33/100.74 (3637) {G20,W10,D5,L1,V3,M1} P(529,3585);d(58);d(472) { meet( meet( Y, Z )
% 100.33/100.74 , complement( join( X, Y ) ) ) ==> zero }.
% 100.33/100.74 (3707) {G21,W10,D5,L1,V3,M1} P(1589,3637) { meet( meet( meet( Y, X ), Z ),
% 100.33/100.74 complement( X ) ) ==> zero }.
% 100.33/100.74 (3760) {G22,W10,D5,L1,V3,M1} P(3707,1209);d(3570);d(450) { meet( complement
% 100.33/100.74 ( Y ), meet( meet( X, Y ), Z ) ) ==> zero }.
% 100.33/100.74 (3806) {G23,W10,D5,L1,V3,M1} P(691,3760) { meet( complement( Y ), meet( Z,
% 100.33/100.74 meet( X, Y ) ) ) ==> zero }.
% 100.33/100.74 (3853) {G24,W10,D5,L1,V3,M1} P(582,3806) { meet( complement( X ), meet( Z,
% 100.33/100.74 meet( X, Y ) ) ) ==> zero }.
% 100.33/100.74 (3865) {G25,W10,D5,L1,V3,M1} P(3853,1209);d(451);d(458) { meet( meet( Y,
% 100.33/100.74 meet( X, Z ) ), complement( X ) ) ==> zero }.
% 100.33/100.74 (3874) {G26,W10,D5,L1,V2,M1} P(2098,3865);d(460) { meet( meet( Y, X ),
% 100.33/100.74 composition( complement( X ), skol1 ) ) ==> zero }.
% 100.33/100.74 (4742) {G27,W10,D6,L1,V2,M1} P(1028,3874) { meet( X, composition(
% 100.33/100.74 complement( join( X, Y ) ), skol1 ) ) ==> zero }.
% 100.33/100.74 (5214) {G21,W10,D6,L1,V2,M1} P(473,3581);d(1795);d(1797);d(472) { meet(
% 100.33/100.74 meet( Y, complement( meet( X, Y ) ) ), X ) ==> zero }.
% 100.33/100.74 (5728) {G24,W15,D6,L1,V4,M1} P(716,236) { join( join( join( meet( Y, X ), T
% 100.33/100.74 ), Z ), X ) ==> join( join( X, Z ), T ) }.
% 100.33/100.74 (5969) {G28,W10,D5,L1,V2,M1} P(141,2625);d(4);d(2217) { join( complement(
% 100.33/100.74 composition( Y, X ) ), composition( top, X ) ) ==> top }.
% 100.33/100.74 (5993) {G29,W10,D5,L1,V2,M1} P(5969,3581);d(458);d(471) { meet( complement
% 100.33/100.74 ( composition( top, Y ) ), composition( X, Y ) ) ==> zero }.
% 100.33/100.74 (6015) {G30,W8,D5,L1,V0,M1} P(5993,2108) { composition( complement(
% 100.33/100.74 composition( top, skol1 ) ), skol1 ) ==> zero }.
% 100.33/100.74 (7023) {G19,W14,D5,L1,V3,M1} P(472,1795);d(1799) { meet( meet( X,
% 100.33/100.74 complement( Y ) ), complement( Z ) ) ==> meet( complement( join( Y, Z ) )
% 100.33/100.74 , X ) }.
% 100.33/100.74 (7978) {G31,W10,D5,L1,V1,M1} P(1970,21);d(17);d(260);d(17);d(1551) { join(
% 100.33/100.74 composition( X, complement( one ) ), X ) ==> composition( X, top ) }.
% 100.33/100.74 (8031) {G32,W10,D5,L1,V1,M1} P(7978,0) { join( X, composition( X,
% 100.33/100.74 complement( one ) ) ) ==> composition( X, top ) }.
% 100.33/100.74 (10310) {G22,W11,D5,L1,V2,M1} P(5214,432);d(450);d(7023);d(736) { meet( X,
% 100.33/100.74 complement( meet( Y, X ) ) ) ==> meet( complement( Y ), X ) }.
% 100.33/100.74 (10312) {G22,W10,D5,L1,V2,M1} P(5214,1589);d(450);d(995) { meet( Y, join(
% 100.33/100.74 complement( X ), meet( Y, X ) ) ) ==> Y }.
% 100.33/100.74 (10348) {G25,W11,D4,L1,V2,M1} P(10312,756);d(1);d(728) { join( complement(
% 100.33/100.74 Y ), meet( X, Y ) ) ==> join( X, complement( Y ) ) }.
% 100.33/100.74 (10350) {G23,W10,D5,L1,V2,M1} P(56,10312) { meet( X, join( complement( Y )
% 100.33/100.74 , meet( Y, X ) ) ) ==> X }.
% 100.33/100.74 (10351) {G23,W10,D5,L1,V2,M1} P(0,10312) { meet( Y, join( meet( Y, X ),
% 100.33/100.74 complement( X ) ) ) ==> Y }.
% 100.33/100.74 (10406) {G25,W11,D4,L1,V2,M1} P(10350,756);d(1);d(748) { join( complement(
% 100.33/100.74 Y ), meet( Y, X ) ) ==> join( X, complement( Y ) ) }.
% 100.33/100.74 (10499) {G24,W10,D6,L1,V2,M1} P(10351,994);d(460);d(471);d(994) { join( X,
% 100.33/100.74 meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 100.33/100.74 (10531) {G25,W14,D6,L1,V3,M1} P(270,10499);d(471);d(452);d(5728) { join(
% 100.33/100.74 join( meet( complement( X ), Y ), X ), Z ) ==> join( join( Y, Z ), X )
% 100.33/100.74 }.
% 100.33/100.74 (10556) {G25,W10,D5,L1,V2,M1} P(203,10499);d(472);d(452);d(730) { join(
% 100.33/100.74 meet( X, complement( Y ) ), Y ) ==> join( X, Y ) }.
% 100.33/100.74 (10559) {G26,W10,D5,L1,V2,M1} P(202,10499);d(471);d(452);d(758) { join( X,
% 100.33/100.74 meet( complement( X ), Y ) ) ==> join( Y, X ) }.
% 100.33/100.74 (10561) {G25,W10,D5,L1,V2,M1} P(201,10499);d(472);d(452);d(762) { join( X,
% 100.33/100.74 meet( Y, complement( X ) ) ) ==> join( Y, X ) }.
% 100.33/100.74 (10571) {G25,W11,D4,L1,V2,M1} P(1208,10499);d(452) { join( meet( X, Y ),
% 100.33/100.74 meet( Y, X ) ) ==> meet( X, Y ) }.
% 100.33/100.74 (10581) {G25,W10,D5,L1,V2,M1} P(460,10499) { join( Y, meet( join( Y, X ),
% 100.33/100.74 complement( X ) ) ) ==> Y }.
% 100.33/100.74 (10586) {G26,W10,D5,L1,V2,M1} P(23,10499);d(471);d(10531);d(716) { join(
% 100.33/100.74 meet( complement( X ), Y ), X ) ==> join( Y, X ) }.
% 100.33/100.74 (12201) {G27,W11,D5,L1,V2,M1} P(10559,472);d(471);d(994);d(473) { meet( X,
% 100.33/100.74 complement( meet( X, Y ) ) ) ==> meet( complement( Y ), X ) }.
% 100.33/100.74 (12205) {G27,W11,D5,L1,V2,M1} P(1795,10559) { join( X, complement( join( X
% 100.33/100.74 , Y ) ) ) ==> join( complement( Y ), X ) }.
% 100.33/100.74 (12299) {G26,W9,D7,L1,V1,M1} P(404,10581);d(452) { join( X, complement(
% 100.33/100.74 converse( complement( converse( X ) ) ) ) ) ==> X }.
% 100.33/100.74 (12313) {G26,W10,D5,L1,V2,M1} P(56,10581) { join( X, meet( complement( Y )
% 100.33/100.74 , join( X, Y ) ) ) ==> X }.
% 100.33/100.74 (12334) {G27,W9,D7,L1,V1,M1} P(12299,472);d(460);d(460) { meet( X, converse
% 100.33/100.74 ( complement( converse( complement( X ) ) ) ) ) ==> X }.
% 100.33/100.74 (12374) {G27,W10,D6,L1,V1,M1} P(7,12299) { join( converse( X ), complement
% 100.33/100.74 ( converse( complement( X ) ) ) ) ==> converse( X ) }.
% 100.33/100.74 (12515) {G28,W7,D5,L1,V1,M1} P(12334,760);d(12374) { complement( converse(
% 100.33/100.74 complement( X ) ) ) ==> converse( X ) }.
% 100.33/100.74 (12562) {G29,W12,D5,L1,V2,M1} P(12515,472) { meet( converse( complement( X
% 100.33/100.74 ) ), complement( Y ) ) ==> complement( join( converse( X ), Y ) ) }.
% 100.33/100.74 (12563) {G29,W12,D6,L1,V2,M1} P(472,12515) { complement( converse( meet( X
% 100.33/100.74 , complement( Y ) ) ) ) ==> converse( join( complement( X ), Y ) ) }.
% 100.33/100.74 (12649) {G30,W7,D4,L1,V1,M1} P(12515,2031);d(12562);d(1872) { converse(
% 100.33/100.74 complement( X ) ) ==> complement( converse( X ) ) }.
% 100.33/100.74 (12650) {G29,W12,D6,L1,V2,M1} P(471,12515) { complement( converse( meet(
% 100.33/100.74 complement( X ), Y ) ) ) ==> converse( join( X, complement( Y ) ) ) }.
% 100.33/100.74 (12696) {G31,W12,D5,L1,V2,M1} P(12649,8) { join( complement( converse( X )
% 100.33/100.74 ), converse( Y ) ) ==> converse( join( complement( X ), Y ) ) }.
% 100.33/100.74 (12698) {G31,W12,D5,L1,V2,M1} P(12649,9) { composition( complement(
% 100.33/100.74 converse( X ) ), converse( Y ) ) ==> converse( composition( Y, complement
% 100.33/100.74 ( X ) ) ) }.
% 100.33/100.74 (12860) {G27,W10,D5,L1,V2,M1} P(12313,0) { join( meet( complement( Y ),
% 100.33/100.74 join( X, Y ) ), X ) ==> X }.
% 100.33/100.74 (12900) {G28,W10,D5,L1,V2,M1} P(0,12860) { join( meet( complement( Y ),
% 100.33/100.74 join( Y, X ) ), X ) ==> X }.
% 100.33/100.74 (12960) {G29,W10,D6,L1,V2,M1} P(460,12900) { join( meet( X, join(
% 100.33/100.74 complement( X ), Y ) ), Y ) ==> Y }.
% 100.33/100.74 (13102) {G27,W11,D5,L1,V2,M1} P(10586,471);d(471);d(994);d(473) { meet(
% 100.33/100.74 complement( meet( X, Y ) ), X ) ==> meet( complement( Y ), X ) }.
% 100.33/100.74 (13436) {G30,W14,D6,L1,V2,M1} P(10561,12960);d(460) { join( meet( X, join(
% 100.33/100.74 Y, complement( X ) ) ), meet( Y, X ) ) ==> meet( Y, X ) }.
% 100.33/100.74 (22367) {G26,W11,D4,L1,V3,M1} P(10571,268);d(10571) { join( meet( X, Y ), Z
% 100.33/100.74 ) = join( meet( Y, X ), Z ) }.
% 100.33/100.74 (22382) {G26,W11,D4,L1,V3,M1} P(10571,72);d(10571) { composition( meet( X,
% 100.33/100.74 Y ), Z ) = composition( meet( Y, X ), Z ) }.
% 100.33/100.74 (22589) {G27,W11,D4,L1,V3,M1} P(22367,0) { join( meet( Y, X ), Z ) = join(
% 100.33/100.74 Z, meet( X, Y ) ) }.
% 100.33/100.74 (23702) {G32,W9,D6,L1,V0,M1} P(2602,3194);d(262);d(12698) { converse(
% 100.33/100.74 composition( skol1, complement( composition( skol1, top ) ) ) ) ==> zero
% 100.33/100.74 }.
% 100.33/100.74 (23766) {G33,W8,D5,L1,V0,M1} P(23702,7);d(480) { composition( skol1,
% 100.33/100.74 complement( composition( skol1, top ) ) ) ==> zero }.
% 100.33/100.74 (23767) {G34,W10,D5,L1,V0,M1} P(23766,470);d(451);d(6) { composition( join
% 100.33/100.74 ( converse( skol1 ), skol1 ), top ) ==> composition( skol1, top ) }.
% 100.33/100.74 (23991) {G35,W9,D4,L1,V0,M1} P(23767,2533) { meet( composition( skol1, top
% 100.33/100.74 ), converse( skol1 ) ) ==> converse( skol1 ) }.
% 100.33/100.74 (24011) {G36,W14,D5,L1,V1,M1} P(23991,728) { join( join( composition( skol1
% 100.33/100.74 , top ), X ), converse( skol1 ) ) ==> join( composition( skol1, top ), X
% 100.33/100.74 ) }.
% 100.33/100.74 (26361) {G35,W8,D4,L1,V0,M1} P(6015,850);d(12649);d(460);d(480);d(451);d(
% 100.33/100.74 282);d(23767) { converse( composition( top, skol1 ) ) ==> composition(
% 100.33/100.74 skol1, top ) }.
% 100.33/100.74 (26439) {G36,W13,D5,L1,V1,M1} P(26361,8) { join( converse( X ), composition
% 100.33/100.74 ( skol1, top ) ) ==> converse( join( X, composition( top, skol1 ) ) ) }.
% 100.33/100.74 (32126) {G28,W10,D5,L1,V2,M1} P(995,13102);d(460) { meet( join( complement
% 100.33/100.74 ( X ), Y ), X ) ==> meet( Y, X ) }.
% 100.33/100.74 (32157) {G29,W10,D5,L1,V2,M1} P(10348,32126);d(579) { meet( join( Y,
% 100.33/100.74 complement( X ) ), X ) ==> meet( Y, X ) }.
% 100.33/100.74 (32160) {G29,W14,D6,L1,V3,M1} P(32126,22589) { join( meet( X, join(
% 100.33/100.74 complement( X ), Y ) ), Z ) ==> join( Z, meet( Y, X ) ) }.
% 100.33/100.74 (32161) {G30,W11,D4,L1,V3,M1} P(22589,32126);d(32157) { meet( meet( Z, Y )
% 100.33/100.74 , X ) = meet( meet( Y, Z ), X ) }.
% 100.33/100.74 (32163) {G30,W10,D5,L1,V2,M1} P(32126,10571);d(32160);d(469) { meet( X,
% 100.33/100.74 join( complement( X ), Y ) ) ==> meet( Y, X ) }.
% 100.33/100.74 (32188) {G30,W12,D6,L1,V3,M1} P(762,32157);d(32126) { meet( join( X, meet(
% 100.33/100.74 complement( Y ), Z ) ), Y ) ==> meet( X, Y ) }.
% 100.33/100.74 (32201) {G31,W10,D5,L1,V2,M1} P(32157,10571);d(13436) { meet( Y, join( X,
% 100.33/100.74 complement( Y ) ) ) ==> meet( X, Y ) }.
% 100.33/100.74 (32211) {G30,W11,D4,L1,V3,M1} P(268,32157);d(32157) { meet( join( Y, X ), Z
% 100.33/100.74 ) = meet( join( X, Y ), Z ) }.
% 100.33/100.74 (32220) {G32,W11,D4,L1,V2,M1} P(460,32201) { meet( complement( X ), join( Y
% 100.33/100.74 , X ) ) ==> meet( Y, complement( X ) ) }.
% 100.33/100.74 (32223) {G31,W11,D4,L1,V2,M1} P(460,32163) { meet( complement( X ), join( X
% 100.33/100.74 , Y ) ) ==> meet( Y, complement( X ) ) }.
% 100.33/100.74 (32247) {G31,W11,D4,L1,V3,M1} P(32211,56) { meet( join( Y, X ), Z ) = meet
% 100.33/100.74 ( Z, join( X, Y ) ) }.
% 100.33/100.74 (32268) {G32,W11,D4,L1,V3,M1} P(10571,32247);d(10571) { meet( meet( X, Y )
% 100.33/100.74 , Z ) = meet( Z, meet( Y, X ) ) }.
% 100.33/100.74 (32324) {G33,W11,D4,L1,V3,M1} P(32268,56) { meet( Z, meet( Y, X ) ) = meet
% 100.33/100.74 ( Z, meet( X, Y ) ) }.
% 100.33/100.74 (32504) {G32,W10,D5,L1,V2,M1} P(10586,32223);d(994);d(1028) { meet( join( X
% 100.33/100.74 , complement( Y ) ), join( Y, X ) ) ==> X }.
% 100.33/100.74 (32505) {G32,W10,D5,L1,V2,M1} P(10556,32223);d(995);d(1047) { meet( join(
% 100.33/100.74 complement( X ), Y ), join( X, Y ) ) ==> Y }.
% 100.33/100.74 (32513) {G33,W14,D5,L1,V1,M1} P(8031,32223) { meet( composition( X,
% 100.33/100.74 complement( one ) ), complement( X ) ) ==> meet( complement( X ),
% 100.33/100.74 composition( X, top ) ) }.
% 100.33/100.74 (32553) {G33,W14,D6,L1,V3,M1} P(32504,32161) { meet( meet( join( Y, X ),
% 100.33/100.74 join( X, complement( Y ) ) ), Z ) ==> meet( X, Z ) }.
% 100.33/100.74 (32559) {G34,W10,D5,L1,V2,M1} P(32504,1493);d(32553);d(468) { meet( join( Y
% 100.33/100.74 , X ), join( X, complement( Y ) ) ) ==> X }.
% 100.33/100.74 (32571) {G34,W11,D4,L1,V0,M1} P(3504,32504);d(3573);d(10556);d(472);d(32513
% 100.33/100.74 ) { meet( complement( skol1 ), composition( skol1, top ) ) ==>
% 100.33/100.74 composition( skol1, complement( one ) ) }.
% 100.33/100.74 (32784) {G33,W11,D4,L1,V1,M1} P(29,32220);d(32220) { meet( join( X, skol1 )
% 100.33/100.74 , complement( one ) ) ==> meet( X, complement( one ) ) }.
% 100.33/100.74 (32819) {G34,W11,D4,L1,V0,M1} P(7978,32784);d(1894) { meet( composition(
% 100.33/100.74 skol1, top ), complement( one ) ) ==> composition( skol1, complement( one
% 100.33/100.74 ) ) }.
% 100.33/100.74 (33040) {G35,W15,D6,L1,V0,M1} P(32819,13102);d(460) { meet( complement(
% 100.33/100.74 composition( skol1, complement( one ) ) ), composition( skol1, top ) )
% 100.33/100.74 ==> meet( one, composition( skol1, top ) ) }.
% 100.33/100.74 (33043) {G35,W15,D5,L1,V1,M1} P(32571,32161) { meet( meet( composition(
% 100.33/100.74 skol1, top ), complement( skol1 ) ), X ) ==> meet( composition( skol1,
% 100.33/100.74 complement( one ) ), X ) }.
% 100.33/100.74 (33063) {G36,W11,D4,L1,V0,M1} P(32571,1493);d(33043);d(468) { meet(
% 100.33/100.74 composition( skol1, top ), complement( skol1 ) ) ==> composition( skol1,
% 100.33/100.74 complement( one ) ) }.
% 100.33/100.74 (33077) {G37,W7,D4,L1,V0,M1} P(33063,13102);d(33040);d(460);d(2428) { meet
% 100.33/100.74 ( one, composition( skol1, top ) ) ==> skol1 }.
% 100.33/100.74 (33082) {G38,W11,D4,L1,V0,M1} P(33077,10406) { join( composition( skol1,
% 100.33/100.74 top ), complement( one ) ) ==> join( complement( one ), skol1 ) }.
% 100.33/100.74 (33161) {G39,W8,D5,L1,V0,M1} P(33082,4742);d(472);d(2927) { composition(
% 100.33/100.74 meet( one, complement( skol1 ) ), skol1 ) ==> zero }.
% 100.33/100.74 (33220) {G40,W13,D5,L1,V0,M1} P(33161,850);d(12563);d(480);d(451);d(26439);
% 100.33/100.74 d(2567) { converse( join( composition( top, skol1 ), complement( one ) )
% 100.33/100.74 ) ==> converse( join( complement( one ), skol1 ) ) }.
% 100.33/100.74 (33223) {G40,W8,D5,L1,V0,M1} P(33161,22382) { composition( meet( complement
% 100.33/100.74 ( skol1 ), one ), skol1 ) ==> zero }.
% 100.33/100.74 (33225) {G40,W10,D5,L1,V0,M1} P(33161,88);d(480);d(451);d(12563);d(1572);d(
% 100.33/100.74 24011);d(33082) { converse( join( complement( one ), skol1 ) ) ==> join(
% 100.33/100.74 complement( one ), skol1 ) }.
% 100.33/100.74 (33230) {G41,W10,D5,L1,V0,M1} P(33223,850);d(12650);d(480);d(451);d(26439);
% 100.33/100.74 d(2329);d(33220);d(33225) { converse( join( skol1, complement( one ) ) )
% 100.33/100.74 ==> join( complement( one ), skol1 ) }.
% 100.33/100.74 (33270) {G42,W9,D6,L1,V1,M1} P(33230,603);d(1);d(473);d(971) { join(
% 100.33/100.74 complement( meet( converse( skol1 ), X ) ), skol1 ) ==> top }.
% 100.33/100.74 (33407) {G43,W7,D5,L1,V0,M1} P(1823,33270) { join( complement( converse(
% 100.33/100.74 skol1 ) ), skol1 ) ==> top }.
% 100.33/100.74 (33425) {G44,W6,D4,L1,V0,M1} P(33407,32505);d(452) { join( converse( skol1
% 100.33/100.74 ), skol1 ) ==> skol1 }.
% 100.33/100.74 (33452) {G45,W4,D3,L1,V0,M1} P(33425,908);d(699);d(21);d(33425) { converse
% 100.33/100.74 ( skol1 ) ==> skol1 }.
% 100.33/100.74 (34145) {G20,W13,D5,L1,V3,M1} P(999,3585);d(472);d(472);d(472) { meet( Z,
% 100.33/100.74 meet( X, complement( Y ) ) ) ==> meet( meet( X, Z ), complement( Y ) )
% 100.33/100.74 }.
% 100.33/100.74 (36322) {G46,W10,D6,L1,V1,M1} P(33452,1109) { meet( X, composition( skol1,
% 100.33/100.74 complement( composition( skol1, X ) ) ) ) ==> zero }.
% 100.33/100.74 (36390) {G47,W11,D7,L1,V1,M1} P(36322,12201);d(451);d(458) { meet(
% 100.33/100.74 complement( composition( skol1, complement( composition( skol1, X ) ) ) )
% 100.33/100.74 , X ) ==> X }.
% 100.33/100.74 (73603) {G21,W12,D5,L1,V1,M1} P(15,2125) { join( X, composition( complement
% 100.33/100.74 ( X ), skol1 ) ) ==> join( X, composition( top, skol1 ) ) }.
% 100.33/100.74 (76952) {G28,W12,D5,L1,V1,M1} P(2275,12205);d(460);d(73603) { join(
% 100.33/100.74 composition( complement( X ), skol1 ), X ) ==> join( X, composition( top
% 100.33/100.74 , skol1 ) ) }.
% 100.33/100.74 (85064) {G48,W15,D7,L1,V2,M1} P(36390,32324);d(34145) { meet( meet( X, Y )
% 100.33/100.74 , complement( composition( skol1, complement( composition( skol1, X ) ) )
% 100.33/100.74 ) ) ==> meet( Y, X ) }.
% 100.33/100.74 (126884) {G32,W12,D5,L1,V2,M1} P(12649,12696);d(473);d(473);d(12649) {
% 100.33/100.74 complement( meet( converse( Y ), converse( X ) ) ) ==> complement(
% 100.33/100.74 converse( meet( Y, X ) ) ) }.
% 100.33/100.74 (126999) {G33,W10,D4,L1,V2,M1} P(126884,460);d(460) { meet( converse( X ),
% 100.33/100.74 converse( Y ) ) ==> converse( meet( X, Y ) ) }.
% 100.33/100.74 (127029) {G34,W10,D5,L1,V2,M1} P(7,126999) { converse( meet( Y, converse( X
% 100.33/100.74 ) ) ) ==> meet( converse( Y ), X ) }.
% 100.33/100.74 (137140) {G35,W9,D4,L1,V1,M1} P(76952,32559);d(460);d(2111);d(32163) { meet
% 100.33/100.74 ( composition( top, skol1 ), X ) ==> composition( X, skol1 ) }.
% 100.33/100.74 (137152) {G46,W9,D4,L1,V1,M1} P(137140,127029);d(18);d(33452);d(26361) {
% 100.33/100.74 meet( composition( skol1, top ), X ) ==> composition( skol1, X ) }.
% 100.33/100.74 (137234) {G49,W9,D4,L1,V1,M1} P(137152,3434);d(85064);d(137152) { meet( X,
% 100.33/100.74 composition( skol1, top ) ) ==> composition( skol1, X ) }.
% 100.33/100.74 (137318) {G50,W11,D5,L1,V1,M1} P(137152,10310);d(137234);d(137234) {
% 100.33/100.74 composition( skol1, complement( composition( skol1, X ) ) ) ==>
% 100.33/100.74 composition( skol1, complement( X ) ) }.
% 100.33/100.74 (212001) {G32,W12,D6,L1,V3,M1} P(32188,32247) { meet( Y, join( meet(
% 100.33/100.74 complement( Y ), Z ), X ) ) ==> meet( X, Y ) }.
% 100.33/100.74 (212572) {G33,W12,D6,L1,V3,M1} P(212001,212001) { meet( X, join( meet( Z,
% 100.33/100.74 complement( X ) ), T ) ) ==> meet( T, X ) }.
% 100.33/100.74 (212621) {G33,W12,D6,L1,V3,M1} P(22589,212001) { meet( X, join( Z, meet( Y
% 100.33/100.74 , complement( X ) ) ) ) ==> meet( Z, X ) }.
% 100.33/100.74 (212751) {G34,W12,D6,L1,V3,M1} P(10561,212572);d(212621);d(995) { meet(
% 100.33/100.74 meet( Z, join( complement( X ), Y ) ), Y ) ==> meet( Z, Y ) }.
% 100.33/100.74 (212897) {G35,W11,D5,L1,V3,M1} P(460,212751) { meet( meet( Y, join( X, Z )
% 100.33/100.74 ), Z ) ==> meet( Y, Z ) }.
% 100.33/100.74 (213058) {G36,W11,D5,L1,V3,M1} P(3378,212897) { meet( meet( Z, join( Y, X )
% 100.33/100.74 ), Y ) ==> meet( Z, Y ) }.
% 100.33/100.74 (213210) {G36,W13,D4,L1,V3,M1} P(432,212897) { meet( meet( Z, X ), meet( X
% 100.33/100.74 , Y ) ) ==> meet( Z, meet( X, Y ) ) }.
% 100.33/100.74 (213438) {G37,W11,D5,L1,V3,M1} P(213058,32268) { meet( Y, meet( join( Y, Z
% 100.33/100.74 ), X ) ) ==> meet( X, Y ) }.
% 100.33/100.74 (213725) {G38,W11,D4,L1,V3,M1} P(1587,213438);d(213210) { meet( X, meet( Y
% 100.33/100.74 , Z ) ) = meet( Z, meet( X, Y ) ) }.
% 100.33/100.74 (213741) {G39,W15,D6,L1,V4,M1} P(213725,213438) { meet( X, meet( Z, meet( T
% 100.33/100.74 , join( X, Y ) ) ) ) ==> meet( meet( Z, T ), X ) }.
% 100.33/100.74 (213744) {G40,W11,D4,L1,V3,M1} P(213058,213725);d(213741) { meet( T, meet(
% 100.33/100.74 X, Y ) ) ==> meet( meet( T, X ), Y ) }.
% 100.33/100.74 (214095) {G50,W11,D4,L1,V2,M1} P(137234,213725);d(213744);d(137152) { meet
% 100.33/100.74 ( Y, composition( skol1, X ) ) ==> meet( composition( skol1, Y ), X ) }.
% 100.33/100.74 (215877) {G51,W15,D5,L1,V2,M1} P(137318,214095);d(214095) { meet(
% 100.33/100.74 composition( skol1, Y ), complement( composition( skol1, X ) ) ) ==> meet
% 100.33/100.74 ( composition( skol1, Y ), complement( X ) ) }.
% 100.33/100.74 (216733) {G52,W0,D0,L0,V0,M0} S(99);d(215877);d(215877);d(469);d(469);q;q
% 100.33/100.74 { }.
% 100.33/100.74
% 100.33/100.74
% 100.33/100.74 % SZS output end Refutation
% 100.33/100.74 found a proof!
% 100.33/100.74
% 100.33/100.74
% 100.33/100.74 Unprocessed initial clauses:
% 100.33/100.74
% 100.33/100.74 (216735) {G0,W7,D3,L1,V2,M1} { join( X, Y ) = join( Y, X ) }.
% 100.33/100.74 (216736) {G0,W11,D4,L1,V3,M1} { join( X, join( Y, Z ) ) = join( join( X, Y
% 100.33/100.74 ), Z ) }.
% 100.33/100.74 (216737) {G0,W14,D6,L1,V2,M1} { X = join( complement( join( complement( X
% 100.33/100.74 ), complement( Y ) ) ), complement( join( complement( X ), Y ) ) ) }.
% 100.33/100.74 (216738) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) = complement( join(
% 100.33/100.74 complement( X ), complement( Y ) ) ) }.
% 100.33/100.74 (216739) {G0,W11,D4,L1,V3,M1} { composition( X, composition( Y, Z ) ) =
% 100.33/100.74 composition( composition( X, Y ), Z ) }.
% 100.33/100.74 (216740) {G0,W5,D3,L1,V1,M1} { composition( X, one ) = X }.
% 100.33/100.74 (216741) {G0,W13,D4,L1,V3,M1} { composition( join( X, Y ), Z ) = join(
% 100.33/100.74 composition( X, Z ), composition( Y, Z ) ) }.
% 100.33/100.74 (216742) {G0,W5,D4,L1,V1,M1} { converse( converse( X ) ) = X }.
% 100.33/100.74 (216743) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) = join( converse
% 100.33/100.74 ( X ), converse( Y ) ) }.
% 100.33/100.74 (216744) {G0,W10,D4,L1,V2,M1} { converse( composition( X, Y ) ) =
% 100.33/100.74 composition( converse( Y ), converse( X ) ) }.
% 100.33/100.74 (216745) {G0,W13,D6,L1,V2,M1} { join( composition( converse( X ),
% 100.33/100.74 complement( composition( X, Y ) ) ), complement( Y ) ) = complement( Y )
% 100.33/100.74 }.
% 100.33/100.74 (216746) {G0,W6,D4,L1,V1,M1} { top = join( X, complement( X ) ) }.
% 100.33/100.74 (216747) {G0,W6,D4,L1,V1,M1} { zero = meet( X, complement( X ) ) }.
% 100.33/100.74 (216748) {G0,W5,D3,L1,V0,M1} { join( skol1, one ) = one }.
% 100.33/100.74 (216749) {G0,W46,D6,L2,V0,M2} { ! join( meet( composition( skol1, skol2 )
% 100.33/100.74 , complement( skol3 ) ), meet( composition( skol1, skol2 ), complement(
% 100.33/100.74 composition( skol1, skol3 ) ) ) ) = meet( composition( skol1, skol2 ),
% 100.33/100.74 complement( composition( skol1, skol3 ) ) ), ! join( meet( composition(
% 100.33/100.74 skol1, skol2 ), complement( composition( skol1, skol3 ) ) ), meet(
% 100.33/100.74 composition( skol1, skol2 ), complement( skol3 ) ) ) = meet( composition
% 100.33/100.74 ( skol1, skol2 ), complement( skol3 ) ) }.
% 100.33/100.74
% 100.33/100.74
% 100.33/100.74 Total Proof:
% 100.33/100.74
% 100.33/100.74 subsumption: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.74 parent0: (216735) {G0,W7,D3,L1,V2,M1} { join( X, Y ) = join( Y, X ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join
% 100.33/100.74 ( join( X, Y ), Z ) }.
% 100.33/100.74 parent0: (216736) {G0,W11,D4,L1,V3,M1} { join( X, join( Y, Z ) ) = join(
% 100.33/100.74 join( X, Y ), Z ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216752) {G0,W14,D6,L1,V2,M1} { join( complement( join( complement
% 100.33/100.74 ( X ), complement( Y ) ) ), complement( join( complement( X ), Y ) ) ) =
% 100.33/100.74 X }.
% 100.33/100.74 parent0[0]: (216737) {G0,W14,D6,L1,V2,M1} { X = join( complement( join(
% 100.33/100.74 complement( X ), complement( Y ) ) ), complement( join( complement( X ),
% 100.33/100.74 Y ) ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (2) {G0,W14,D6,L1,V2,M1} I { join( complement( join(
% 100.33/100.74 complement( X ), complement( Y ) ) ), complement( join( complement( X ),
% 100.33/100.74 Y ) ) ) ==> X }.
% 100.33/100.74 parent0: (216752) {G0,W14,D6,L1,V2,M1} { join( complement( join(
% 100.33/100.74 complement( X ), complement( Y ) ) ), complement( join( complement( X ),
% 100.33/100.74 Y ) ) ) = X }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216755) {G0,W10,D5,L1,V2,M1} { complement( join( complement( X )
% 100.33/100.74 , complement( Y ) ) ) = meet( X, Y ) }.
% 100.33/100.74 parent0[0]: (216738) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) = complement(
% 100.33/100.74 join( complement( X ), complement( Y ) ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 100.33/100.74 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 100.33/100.74 parent0: (216755) {G0,W10,D5,L1,V2,M1} { complement( join( complement( X )
% 100.33/100.74 , complement( Y ) ) ) = meet( X, Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z
% 100.33/100.74 ) ) ==> composition( composition( X, Y ), Z ) }.
% 100.33/100.74 parent0: (216739) {G0,W11,D4,L1,V3,M1} { composition( X, composition( Y, Z
% 100.33/100.74 ) ) = composition( composition( X, Y ), Z ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 100.33/100.74 parent0: (216740) {G0,W5,D3,L1,V1,M1} { composition( X, one ) = X }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216770) {G0,W13,D4,L1,V3,M1} { join( composition( X, Z ),
% 100.33/100.74 composition( Y, Z ) ) = composition( join( X, Y ), Z ) }.
% 100.33/100.74 parent0[0]: (216741) {G0,W13,D4,L1,V3,M1} { composition( join( X, Y ), Z )
% 100.33/100.74 = join( composition( X, Z ), composition( Y, Z ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 100.33/100.74 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 100.33/100.74 parent0: (216770) {G0,W13,D4,L1,V3,M1} { join( composition( X, Z ),
% 100.33/100.74 composition( Y, Z ) ) = composition( join( X, Y ), Z ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X
% 100.33/100.74 }.
% 100.33/100.74 parent0: (216742) {G0,W5,D4,L1,V1,M1} { converse( converse( X ) ) = X }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216785) {G0,W10,D4,L1,V2,M1} { join( converse( X ), converse( Y )
% 100.33/100.74 ) = converse( join( X, Y ) ) }.
% 100.33/100.74 parent0[0]: (216743) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) =
% 100.33/100.74 join( converse( X ), converse( Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y
% 100.33/100.74 ) ) ==> converse( join( X, Y ) ) }.
% 100.33/100.74 parent0: (216785) {G0,W10,D4,L1,V2,M1} { join( converse( X ), converse( Y
% 100.33/100.74 ) ) = converse( join( X, Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216794) {G0,W10,D4,L1,V2,M1} { composition( converse( Y ),
% 100.33/100.74 converse( X ) ) = converse( composition( X, Y ) ) }.
% 100.33/100.74 parent0[0]: (216744) {G0,W10,D4,L1,V2,M1} { converse( composition( X, Y )
% 100.33/100.74 ) = composition( converse( Y ), converse( X ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ),
% 100.33/100.74 converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 100.33/100.74 parent0: (216794) {G0,W10,D4,L1,V2,M1} { composition( converse( Y ),
% 100.33/100.74 converse( X ) ) = converse( composition( X, Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 100.33/100.74 , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement(
% 100.33/100.74 Y ) }.
% 100.33/100.74 parent0: (216745) {G0,W13,D6,L1,V2,M1} { join( composition( converse( X )
% 100.33/100.74 , complement( composition( X, Y ) ) ), complement( Y ) ) = complement( Y
% 100.33/100.74 ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216815) {G0,W6,D4,L1,V1,M1} { join( X, complement( X ) ) = top
% 100.33/100.74 }.
% 100.33/100.74 parent0[0]: (216746) {G0,W6,D4,L1,V1,M1} { top = join( X, complement( X )
% 100.33/100.74 ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==>
% 100.33/100.74 top }.
% 100.33/100.74 parent0: (216815) {G0,W6,D4,L1,V1,M1} { join( X, complement( X ) ) = top
% 100.33/100.74 }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216827) {G0,W6,D4,L1,V1,M1} { meet( X, complement( X ) ) = zero
% 100.33/100.74 }.
% 100.33/100.74 parent0[0]: (216747) {G0,W6,D4,L1,V1,M1} { zero = meet( X, complement( X )
% 100.33/100.74 ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (12) {G0,W6,D4,L1,V1,M1} I { meet( X, complement( X ) ) ==>
% 100.33/100.74 zero }.
% 100.33/100.74 parent0: (216827) {G0,W6,D4,L1,V1,M1} { meet( X, complement( X ) ) = zero
% 100.33/100.74 }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (13) {G0,W5,D3,L1,V0,M1} I { join( skol1, one ) ==> one }.
% 100.33/100.74 parent0: (216748) {G0,W5,D3,L1,V0,M1} { join( skol1, one ) = one }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (14) {G0,W46,D6,L2,V0,M2} I { ! join( meet( composition( skol1
% 100.33/100.74 , skol2 ), complement( skol3 ) ), meet( composition( skol1, skol2 ),
% 100.33/100.74 complement( composition( skol1, skol3 ) ) ) ) ==> meet( composition(
% 100.33/100.74 skol1, skol2 ), complement( composition( skol1, skol3 ) ) ), ! join( meet
% 100.33/100.74 ( composition( skol1, skol2 ), complement( composition( skol1, skol3 ) )
% 100.33/100.74 ), meet( composition( skol1, skol2 ), complement( skol3 ) ) ) ==> meet(
% 100.33/100.74 composition( skol1, skol2 ), complement( skol3 ) ) }.
% 100.33/100.74 parent0: (216749) {G0,W46,D6,L2,V0,M2} { ! join( meet( composition( skol1
% 100.33/100.74 , skol2 ), complement( skol3 ) ), meet( composition( skol1, skol2 ),
% 100.33/100.74 complement( composition( skol1, skol3 ) ) ) ) = meet( composition( skol1
% 100.33/100.74 , skol2 ), complement( composition( skol1, skol3 ) ) ), ! join( meet(
% 100.33/100.74 composition( skol1, skol2 ), complement( composition( skol1, skol3 ) ) )
% 100.33/100.74 , meet( composition( skol1, skol2 ), complement( skol3 ) ) ) = meet(
% 100.33/100.74 composition( skol1, skol2 ), complement( skol3 ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 1 ==> 1
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216857) {G0,W6,D4,L1,V1,M1} { top ==> join( X, complement( X ) )
% 100.33/100.74 }.
% 100.33/100.74 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 100.33/100.74 }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216858) {G1,W6,D4,L1,V1,M1} { top ==> join( complement( X ), X )
% 100.33/100.74 }.
% 100.33/100.74 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.74 parent1[0; 2]: (216857) {G0,W6,D4,L1,V1,M1} { top ==> join( X, complement
% 100.33/100.74 ( X ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := complement( X )
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216861) {G1,W6,D4,L1,V1,M1} { join( complement( X ), X ) ==> top
% 100.33/100.74 }.
% 100.33/100.74 parent0[0]: (216858) {G1,W6,D4,L1,V1,M1} { top ==> join( complement( X ),
% 100.33/100.74 X ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (15) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X )
% 100.33/100.74 ==> top }.
% 100.33/100.74 parent0: (216861) {G1,W6,D4,L1,V1,M1} { join( complement( X ), X ) ==> top
% 100.33/100.74 }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216862) {G0,W5,D3,L1,V0,M1} { one ==> join( skol1, one ) }.
% 100.33/100.74 parent0[0]: (13) {G0,W5,D3,L1,V0,M1} I { join( skol1, one ) ==> one }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216863) {G1,W5,D3,L1,V0,M1} { one ==> join( one, skol1 ) }.
% 100.33/100.74 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.74 parent1[0; 2]: (216862) {G0,W5,D3,L1,V0,M1} { one ==> join( skol1, one )
% 100.33/100.74 }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := skol1
% 100.33/100.74 Y := one
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216866) {G1,W5,D3,L1,V0,M1} { join( one, skol1 ) ==> one }.
% 100.33/100.74 parent0[0]: (216863) {G1,W5,D3,L1,V0,M1} { one ==> join( one, skol1 ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (16) {G1,W5,D3,L1,V0,M1} P(0,13) { join( one, skol1 ) ==> one
% 100.33/100.74 }.
% 100.33/100.74 parent0: (216866) {G1,W5,D3,L1,V0,M1} { join( one, skol1 ) ==> one }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216868) {G0,W10,D4,L1,V2,M1} { converse( composition( Y, X ) )
% 100.33/100.74 ==> composition( converse( X ), converse( Y ) ) }.
% 100.33/100.74 parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ),
% 100.33/100.74 converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216869) {G1,W10,D5,L1,V2,M1} { converse( composition( X,
% 100.33/100.74 converse( Y ) ) ) ==> composition( Y, converse( X ) ) }.
% 100.33/100.74 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 100.33/100.74 parent1[0; 7]: (216868) {G0,W10,D4,L1,V2,M1} { converse( composition( Y, X
% 100.33/100.74 ) ) ==> composition( converse( X ), converse( Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := converse( Y )
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 100.33/100.74 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 100.33/100.74 parent0: (216869) {G1,W10,D5,L1,V2,M1} { converse( composition( X,
% 100.33/100.74 converse( Y ) ) ) ==> composition( Y, converse( X ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216874) {G0,W10,D4,L1,V2,M1} { converse( composition( Y, X ) )
% 100.33/100.74 ==> composition( converse( X ), converse( Y ) ) }.
% 100.33/100.74 parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ),
% 100.33/100.74 converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216876) {G1,W10,D5,L1,V2,M1} { converse( composition( converse(
% 100.33/100.74 X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 100.33/100.74 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 100.33/100.74 parent1[0; 9]: (216874) {G0,W10,D4,L1,V2,M1} { converse( composition( Y, X
% 100.33/100.74 ) ) ==> composition( converse( X ), converse( Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := converse( X )
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (18) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition(
% 100.33/100.74 converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 100.33/100.74 parent0: (216876) {G1,W10,D5,L1,V2,M1} { converse( composition( converse(
% 100.33/100.74 X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216879) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) ==> join
% 100.33/100.74 ( converse( X ), converse( Y ) ) }.
% 100.33/100.74 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 100.33/100.74 ) ==> converse( join( X, Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216881) {G1,W10,D4,L1,V2,M1} { converse( join( Y, X ) ) ==> join
% 100.33/100.74 ( converse( X ), converse( Y ) ) }.
% 100.33/100.74 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.74 parent1[0; 2]: (216879) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) )
% 100.33/100.74 ==> join( converse( X ), converse( Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216883) {G1,W9,D4,L1,V2,M1} { converse( join( X, Y ) ) ==>
% 100.33/100.74 converse( join( Y, X ) ) }.
% 100.33/100.74 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 100.33/100.74 ) ==> converse( join( X, Y ) ) }.
% 100.33/100.74 parent1[0; 5]: (216881) {G1,W10,D4,L1,V2,M1} { converse( join( Y, X ) )
% 100.33/100.74 ==> join( converse( X ), converse( Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (19) {G1,W9,D4,L1,V2,M1} P(8,0);d(8) { converse( join( X, Y )
% 100.33/100.74 ) = converse( join( Y, X ) ) }.
% 100.33/100.74 parent0: (216883) {G1,W9,D4,L1,V2,M1} { converse( join( X, Y ) ) ==>
% 100.33/100.74 converse( join( Y, X ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216885) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) ==> join
% 100.33/100.74 ( converse( X ), converse( Y ) ) }.
% 100.33/100.74 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 100.33/100.74 ) ==> converse( join( X, Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216886) {G1,W10,D5,L1,V2,M1} { converse( join( converse( X ), Y
% 100.33/100.74 ) ) ==> join( X, converse( Y ) ) }.
% 100.33/100.74 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 100.33/100.74 parent1[0; 7]: (216885) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) )
% 100.33/100.74 ==> join( converse( X ), converse( Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := converse( X )
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (20) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 100.33/100.74 ), Y ) ) ==> join( X, converse( Y ) ) }.
% 100.33/100.74 parent0: (216886) {G1,W10,D5,L1,V2,M1} { converse( join( converse( X ), Y
% 100.33/100.74 ) ) ==> join( X, converse( Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216891) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) ==> join
% 100.33/100.74 ( converse( X ), converse( Y ) ) }.
% 100.33/100.74 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 100.33/100.74 ) ==> converse( join( X, Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216893) {G1,W10,D5,L1,V2,M1} { converse( join( X, converse( Y )
% 100.33/100.74 ) ) ==> join( converse( X ), Y ) }.
% 100.33/100.74 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 100.33/100.74 parent1[0; 9]: (216891) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) )
% 100.33/100.74 ==> join( converse( X ), converse( Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := converse( Y )
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (21) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 100.33/100.74 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 100.33/100.74 parent0: (216893) {G1,W10,D5,L1,V2,M1} { converse( join( X, converse( Y )
% 100.33/100.74 ) ) ==> join( converse( X ), Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216897) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 100.33/100.74 X, join( Y, Z ) ) }.
% 100.33/100.74 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.33/100.74 join( X, Y ), Z ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216901) {G1,W14,D5,L1,V3,M1} { join( join( X, converse( Y ) ),
% 100.33/100.74 converse( Z ) ) ==> join( X, converse( join( Y, Z ) ) ) }.
% 100.33/100.74 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 100.33/100.74 ) ==> converse( join( X, Y ) ) }.
% 100.33/100.74 parent1[0; 10]: (216897) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z )
% 100.33/100.74 ==> join( X, join( Y, Z ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := Z
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := converse( Y )
% 100.33/100.74 Z := converse( Z )
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (22) {G1,W14,D5,L1,V3,M1} P(8,1) { join( join( Z, converse( X
% 100.33/100.74 ) ), converse( Y ) ) ==> join( Z, converse( join( X, Y ) ) ) }.
% 100.33/100.74 parent0: (216901) {G1,W14,D5,L1,V3,M1} { join( join( X, converse( Y ) ),
% 100.33/100.74 converse( Z ) ) ==> join( X, converse( join( Y, Z ) ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Z
% 100.33/100.74 Y := X
% 100.33/100.74 Z := Y
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216904) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 100.33/100.74 X, join( Y, Z ) ) }.
% 100.33/100.74 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.33/100.74 join( X, Y ), Z ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216907) {G1,W10,D6,L1,V2,M1} { join( join( complement( join( X,
% 100.33/100.74 Y ) ), X ), Y ) ==> top }.
% 100.33/100.74 parent0[0]: (15) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X )
% 100.33/100.74 ==> top }.
% 100.33/100.74 parent1[0; 9]: (216904) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 100.33/100.74 join( X, join( Y, Z ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := join( X, Y )
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := complement( join( X, Y ) )
% 100.33/100.74 Y := X
% 100.33/100.74 Z := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (23) {G2,W10,D6,L1,V2,M1} P(1,15) { join( join( complement(
% 100.33/100.74 join( X, Y ) ), X ), Y ) ==> top }.
% 100.33/100.74 parent0: (216907) {G1,W10,D6,L1,V2,M1} { join( join( complement( join( X,
% 100.33/100.74 Y ) ), X ), Y ) ==> top }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216913) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 100.33/100.74 X, join( Y, Z ) ) }.
% 100.33/100.74 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.33/100.74 join( X, Y ), Z ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216918) {G1,W10,D5,L1,V2,M1} { join( join( X, complement( Y ) )
% 100.33/100.74 , Y ) ==> join( X, top ) }.
% 100.33/100.74 parent0[0]: (15) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X )
% 100.33/100.74 ==> top }.
% 100.33/100.74 parent1[0; 9]: (216913) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 100.33/100.74 join( X, join( Y, Z ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := complement( Y )
% 100.33/100.74 Z := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (24) {G2,W10,D5,L1,V2,M1} P(15,1) { join( join( Y, complement
% 100.33/100.74 ( X ) ), X ) ==> join( Y, top ) }.
% 100.33/100.74 parent0: (216918) {G1,W10,D5,L1,V2,M1} { join( join( X, complement( Y ) )
% 100.33/100.74 , Y ) ==> join( X, top ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216923) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 100.33/100.74 X, join( Y, Z ) ) }.
% 100.33/100.74 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.33/100.74 join( X, Y ), Z ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216925) {G1,W9,D4,L1,V1,M1} { join( join( X, one ), skol1 ) ==>
% 100.33/100.74 join( X, one ) }.
% 100.33/100.74 parent0[0]: (16) {G1,W5,D3,L1,V0,M1} P(0,13) { join( one, skol1 ) ==> one
% 100.33/100.74 }.
% 100.33/100.74 parent1[0; 8]: (216923) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 100.33/100.74 join( X, join( Y, Z ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := one
% 100.33/100.74 Z := skol1
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (25) {G2,W9,D4,L1,V1,M1} P(16,1) { join( join( X, one ), skol1
% 100.33/100.74 ) ==> join( X, one ) }.
% 100.33/100.74 parent0: (216925) {G1,W9,D4,L1,V1,M1} { join( join( X, one ), skol1 ) ==>
% 100.33/100.74 join( X, one ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216928) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 100.33/100.74 X, join( Y, Z ) ) }.
% 100.33/100.74 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.33/100.74 join( X, Y ), Z ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216931) {G1,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join
% 100.33/100.74 ( join( Y, Z ), X ) }.
% 100.33/100.74 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.74 parent1[0; 6]: (216928) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 100.33/100.74 join( X, join( Y, Z ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := join( Y, Z )
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (26) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 100.33/100.74 join( join( Y, Z ), X ) }.
% 100.33/100.74 parent0: (216931) {G1,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join
% 100.33/100.74 ( join( Y, Z ), X ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216945) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 100.33/100.74 X, join( Y, Z ) ) }.
% 100.33/100.74 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.33/100.74 join( X, Y ), Z ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216950) {G1,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join
% 100.33/100.74 ( X, join( Z, Y ) ) }.
% 100.33/100.74 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.74 parent1[0; 8]: (216945) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 100.33/100.74 join( X, join( Y, Z ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := Z
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216963) {G1,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join
% 100.33/100.74 ( join( X, Z ), Y ) }.
% 100.33/100.74 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.33/100.74 join( X, Y ), Z ) }.
% 100.33/100.74 parent1[0; 6]: (216950) {G1,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 100.33/100.74 join( X, join( Z, Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Z
% 100.33/100.74 Z := Y
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (27) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X
% 100.33/100.74 ) = join( join( Z, X ), Y ) }.
% 100.33/100.74 parent0: (216963) {G1,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join
% 100.33/100.74 ( join( X, Z ), Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Z
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216965) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 100.33/100.74 X, join( Y, Z ) ) }.
% 100.33/100.74 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.33/100.74 join( X, Y ), Z ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216968) {G1,W10,D4,L1,V2,M1} { join( join( X, Y ), complement( Y
% 100.33/100.74 ) ) ==> join( X, top ) }.
% 100.33/100.74 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 100.33/100.74 }.
% 100.33/100.74 parent1[0; 9]: (216965) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 100.33/100.74 join( X, join( Y, Z ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := complement( Y )
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (28) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ),
% 100.33/100.74 complement( X ) ) ==> join( Y, top ) }.
% 100.33/100.74 parent0: (216968) {G1,W10,D4,L1,V2,M1} { join( join( X, Y ), complement( Y
% 100.33/100.74 ) ) ==> join( X, top ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216973) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 100.33/100.74 X, join( Y, Z ) ) }.
% 100.33/100.74 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.33/100.74 join( X, Y ), Z ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216975) {G1,W9,D4,L1,V1,M1} { join( join( X, skol1 ), one ) ==>
% 100.33/100.74 join( X, one ) }.
% 100.33/100.74 parent0[0]: (13) {G0,W5,D3,L1,V0,M1} I { join( skol1, one ) ==> one }.
% 100.33/100.74 parent1[0; 8]: (216973) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 100.33/100.74 join( X, join( Y, Z ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := skol1
% 100.33/100.74 Z := one
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (29) {G1,W9,D4,L1,V1,M1} P(13,1) { join( join( X, skol1 ), one
% 100.33/100.74 ) ==> join( X, one ) }.
% 100.33/100.74 parent0: (216975) {G1,W9,D4,L1,V1,M1} { join( join( X, skol1 ), one ) ==>
% 100.33/100.74 join( X, one ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216979) {G1,W13,D5,L1,V3,M1} { converse( join( join( X, Y ), Z )
% 100.33/100.74 ) = converse( join( join( Y, Z ), X ) ) }.
% 100.33/100.74 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.33/100.74 join( X, Y ), Z ) }.
% 100.33/100.74 parent1[0; 2]: (19) {G1,W9,D4,L1,V2,M1} P(8,0);d(8) { converse( join( X, Y
% 100.33/100.74 ) ) = converse( join( Y, X ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := join( Y, Z )
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (30) {G2,W13,D5,L1,V3,M1} P(1,19) { converse( join( join( X, Y
% 100.33/100.74 ), Z ) ) = converse( join( join( Y, Z ), X ) ) }.
% 100.33/100.74 parent0: (216979) {G1,W13,D5,L1,V3,M1} { converse( join( join( X, Y ), Z )
% 100.33/100.74 ) = converse( join( join( Y, Z ), X ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216981) {G2,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join( X,
% 100.33/100.74 one ), skol1 ) }.
% 100.33/100.74 parent0[0]: (25) {G2,W9,D4,L1,V1,M1} P(16,1) { join( join( X, one ), skol1
% 100.33/100.74 ) ==> join( X, one ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216984) {G1,W9,D4,L1,V1,M1} { join( X, one ) ==> join( skol1,
% 100.33/100.74 join( X, one ) ) }.
% 100.33/100.74 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.74 parent1[0; 4]: (216981) {G2,W9,D4,L1,V1,M1} { join( X, one ) ==> join(
% 100.33/100.74 join( X, one ), skol1 ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := join( X, one )
% 100.33/100.74 Y := skol1
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216986) {G1,W9,D4,L1,V1,M1} { join( X, one ) ==> join( skol1,
% 100.33/100.74 join( one, X ) ) }.
% 100.33/100.74 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.74 parent1[0; 6]: (216984) {G1,W9,D4,L1,V1,M1} { join( X, one ) ==> join(
% 100.33/100.74 skol1, join( X, one ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := one
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216988) {G1,W9,D4,L1,V1,M1} { join( one, X ) ==> join( skol1,
% 100.33/100.74 join( one, X ) ) }.
% 100.33/100.74 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.74 parent1[0; 1]: (216986) {G1,W9,D4,L1,V1,M1} { join( X, one ) ==> join(
% 100.33/100.74 skol1, join( one, X ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := one
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (216989) {G1,W9,D4,L1,V1,M1} { join( one, X ) ==> join( join( one
% 100.33/100.74 , X ), skol1 ) }.
% 100.33/100.74 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.74 parent1[0; 4]: (216988) {G1,W9,D4,L1,V1,M1} { join( one, X ) ==> join(
% 100.33/100.74 skol1, join( one, X ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := skol1
% 100.33/100.74 Y := join( one, X )
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (216993) {G1,W9,D4,L1,V1,M1} { join( join( one, X ), skol1 ) ==>
% 100.33/100.74 join( one, X ) }.
% 100.33/100.74 parent0[0]: (216989) {G1,W9,D4,L1,V1,M1} { join( one, X ) ==> join( join(
% 100.33/100.74 one, X ), skol1 ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (38) {G3,W9,D4,L1,V1,M1} P(0,25) { join( join( one, X ), skol1
% 100.33/100.74 ) ==> join( one, X ) }.
% 100.33/100.74 parent0: (216993) {G1,W9,D4,L1,V1,M1} { join( join( one, X ), skol1 ) ==>
% 100.33/100.74 join( one, X ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217000) {G1,W11,D6,L1,V2,M1} { join( meet( X, Y ), complement(
% 100.33/100.74 join( complement( X ), Y ) ) ) ==> X }.
% 100.33/100.74 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 100.33/100.74 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 100.33/100.74 parent1[0; 2]: (2) {G0,W14,D6,L1,V2,M1} I { join( complement( join(
% 100.33/100.74 complement( X ), complement( Y ) ) ), complement( join( complement( X ),
% 100.33/100.74 Y ) ) ) ==> X }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (43) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 100.33/100.74 complement( join( complement( X ), Y ) ) ) ==> X }.
% 100.33/100.74 parent0: (217000) {G1,W11,D6,L1,V2,M1} { join( meet( X, Y ), complement(
% 100.33/100.74 join( complement( X ), Y ) ) ) ==> X }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217002) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 100.33/100.74 ( complement( X ), complement( Y ) ) ) }.
% 100.33/100.74 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 100.33/100.74 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217004) {G1,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 100.33/100.74 ( complement( Y ), complement( X ) ) ) }.
% 100.33/100.74 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.74 parent1[0; 5]: (217002) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 100.33/100.74 ( join( complement( X ), complement( Y ) ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := complement( X )
% 100.33/100.74 Y := complement( Y )
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217006) {G1,W7,D3,L1,V2,M1} { meet( X, Y ) ==> meet( Y, X ) }.
% 100.33/100.74 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 100.33/100.74 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 100.33/100.74 parent1[0; 4]: (217004) {G1,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 100.33/100.74 ( join( complement( Y ), complement( X ) ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (56) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X
% 100.33/100.74 , Y ) }.
% 100.33/100.74 parent0: (217006) {G1,W7,D3,L1,V2,M1} { meet( X, Y ) ==> meet( Y, X ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217008) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 100.33/100.74 ( complement( X ), complement( Y ) ) ) }.
% 100.33/100.74 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 100.33/100.74 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217011) {G1,W7,D4,L1,V1,M1} { meet( X, complement( X ) ) ==>
% 100.33/100.74 complement( top ) }.
% 100.33/100.74 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 100.33/100.74 }.
% 100.33/100.74 parent1[0; 6]: (217008) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 100.33/100.74 ( join( complement( X ), complement( Y ) ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := complement( X )
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := complement( X )
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217012) {G1,W4,D3,L1,V0,M1} { zero ==> complement( top ) }.
% 100.33/100.74 parent0[0]: (12) {G0,W6,D4,L1,V1,M1} I { meet( X, complement( X ) ) ==>
% 100.33/100.74 zero }.
% 100.33/100.74 parent1[0; 1]: (217011) {G1,W7,D4,L1,V1,M1} { meet( X, complement( X ) )
% 100.33/100.74 ==> complement( top ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217013) {G1,W4,D3,L1,V0,M1} { complement( top ) ==> zero }.
% 100.33/100.74 parent0[0]: (217012) {G1,W4,D3,L1,V0,M1} { zero ==> complement( top ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (58) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 100.33/100.74 zero }.
% 100.33/100.74 parent0: (217013) {G1,W4,D3,L1,V0,M1} { complement( top ) ==> zero }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217015) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 100.33/100.74 ( complement( X ), complement( Y ) ) ) }.
% 100.33/100.74 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 100.33/100.74 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217017) {G1,W9,D5,L1,V1,M1} { meet( X, top ) ==> complement(
% 100.33/100.74 join( complement( X ), zero ) ) }.
% 100.33/100.74 parent0[0]: (58) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 100.33/100.74 zero }.
% 100.33/100.74 parent1[0; 8]: (217015) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 100.33/100.74 ( join( complement( X ), complement( Y ) ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := top
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217019) {G1,W9,D5,L1,V1,M1} { complement( join( complement( X ),
% 100.33/100.74 zero ) ) ==> meet( X, top ) }.
% 100.33/100.74 parent0[0]: (217017) {G1,W9,D5,L1,V1,M1} { meet( X, top ) ==> complement(
% 100.33/100.74 join( complement( X ), zero ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (60) {G2,W9,D5,L1,V1,M1} P(58,3) { complement( join(
% 100.33/100.74 complement( X ), zero ) ) ==> meet( X, top ) }.
% 100.33/100.74 parent0: (217019) {G1,W9,D5,L1,V1,M1} { complement( join( complement( X )
% 100.33/100.74 , zero ) ) ==> meet( X, top ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217021) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 100.33/100.74 X, join( Y, Z ) ) }.
% 100.33/100.74 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.33/100.74 join( X, Y ), Z ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217025) {G1,W17,D5,L1,V4,M1} { join( join( X, composition( Y, Z
% 100.33/100.74 ) ), composition( T, Z ) ) ==> join( X, composition( join( Y, T ), Z ) )
% 100.33/100.74 }.
% 100.33/100.74 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 100.33/100.74 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 100.33/100.74 parent1[0; 12]: (217021) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z )
% 100.33/100.74 ==> join( X, join( Y, Z ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := T
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := composition( Y, Z )
% 100.33/100.74 Z := composition( T, Z )
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (69) {G1,W17,D5,L1,V4,M1} P(6,1) { join( join( T, composition
% 100.33/100.74 ( X, Y ) ), composition( Z, Y ) ) ==> join( T, composition( join( X, Z )
% 100.33/100.74 , Y ) ) }.
% 100.33/100.74 parent0: (217025) {G1,W17,D5,L1,V4,M1} { join( join( X, composition( Y, Z
% 100.33/100.74 ) ), composition( T, Z ) ) ==> join( X, composition( join( Y, T ), Z ) )
% 100.33/100.74 }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := T
% 100.33/100.74 Y := X
% 100.33/100.74 Z := Y
% 100.33/100.74 T := Z
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217028) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ), Y ) ==>
% 100.33/100.74 join( composition( X, Y ), composition( Z, Y ) ) }.
% 100.33/100.74 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 100.33/100.74 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Z
% 100.33/100.74 Z := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217030) {G1,W13,D4,L1,V3,M1} { composition( join( Y, X ), Z )
% 100.33/100.74 ==> join( composition( X, Z ), composition( Y, Z ) ) }.
% 100.33/100.74 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.74 parent1[0; 2]: (217028) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ),
% 100.33/100.74 Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Z
% 100.33/100.74 Z := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217032) {G1,W11,D4,L1,V3,M1} { composition( join( X, Y ), Z )
% 100.33/100.74 ==> composition( join( Y, X ), Z ) }.
% 100.33/100.74 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 100.33/100.74 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 100.33/100.74 parent1[0; 6]: (217030) {G1,W13,D4,L1,V3,M1} { composition( join( Y, X ),
% 100.33/100.74 Z ) ==> join( composition( X, Z ), composition( Y, Z ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (72) {G1,W11,D4,L1,V3,M1} P(6,0);d(6) { composition( join( X,
% 100.33/100.74 Z ), Y ) = composition( join( Z, X ), Y ) }.
% 100.33/100.74 parent0: (217032) {G1,W11,D4,L1,V3,M1} { composition( join( X, Y ), Z )
% 100.33/100.74 ==> composition( join( Y, X ), Z ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Z
% 100.33/100.74 Z := Y
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217034) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 100.33/100.74 composition( converse( X ), complement( composition( X, Y ) ) ),
% 100.33/100.74 complement( Y ) ) }.
% 100.33/100.74 parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 100.33/100.74 , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement(
% 100.33/100.74 Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217036) {G1,W12,D6,L1,V1,M1} { complement( top ) ==> join(
% 100.33/100.74 composition( converse( X ), complement( composition( X, top ) ) ), zero )
% 100.33/100.74 }.
% 100.33/100.74 parent0[0]: (58) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 100.33/100.74 zero }.
% 100.33/100.74 parent1[0; 11]: (217034) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 100.33/100.74 composition( converse( X ), complement( composition( X, Y ) ) ),
% 100.33/100.74 complement( Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := top
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217037) {G2,W11,D6,L1,V1,M1} { zero ==> join( composition(
% 100.33/100.74 converse( X ), complement( composition( X, top ) ) ), zero ) }.
% 100.33/100.74 parent0[0]: (58) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 100.33/100.74 zero }.
% 100.33/100.74 parent1[0; 1]: (217036) {G1,W12,D6,L1,V1,M1} { complement( top ) ==> join
% 100.33/100.74 ( composition( converse( X ), complement( composition( X, top ) ) ), zero
% 100.33/100.74 ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217039) {G2,W11,D6,L1,V1,M1} { join( composition( converse( X ),
% 100.33/100.74 complement( composition( X, top ) ) ), zero ) ==> zero }.
% 100.33/100.74 parent0[0]: (217037) {G2,W11,D6,L1,V1,M1} { zero ==> join( composition(
% 100.33/100.74 converse( X ), complement( composition( X, top ) ) ), zero ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (84) {G2,W11,D6,L1,V1,M1} P(58,10) { join( composition(
% 100.33/100.74 converse( X ), complement( composition( X, top ) ) ), zero ) ==> zero }.
% 100.33/100.74 parent0: (217039) {G2,W11,D6,L1,V1,M1} { join( composition( converse( X )
% 100.33/100.74 , complement( composition( X, top ) ) ), zero ) ==> zero }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217042) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 100.33/100.74 composition( converse( X ), complement( composition( X, Y ) ) ),
% 100.33/100.74 complement( Y ) ) }.
% 100.33/100.74 parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 100.33/100.74 , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement(
% 100.33/100.74 Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217044) {G1,W17,D7,L1,V2,M1} { complement( converse( X ) ) ==>
% 100.33/100.74 join( composition( converse( converse( Y ) ), complement( converse(
% 100.33/100.74 composition( X, Y ) ) ) ), complement( converse( X ) ) ) }.
% 100.33/100.74 parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ),
% 100.33/100.74 converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 100.33/100.74 parent1[0; 10]: (217042) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 100.33/100.74 composition( converse( X ), complement( composition( X, Y ) ) ),
% 100.33/100.74 complement( Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := converse( Y )
% 100.33/100.74 Y := converse( X )
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217045) {G1,W15,D7,L1,V2,M1} { complement( converse( X ) ) ==>
% 100.33/100.74 join( composition( Y, complement( converse( composition( X, Y ) ) ) ),
% 100.33/100.74 complement( converse( X ) ) ) }.
% 100.33/100.74 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 100.33/100.74 parent1[0; 6]: (217044) {G1,W17,D7,L1,V2,M1} { complement( converse( X ) )
% 100.33/100.74 ==> join( composition( converse( converse( Y ) ), complement( converse(
% 100.33/100.74 composition( X, Y ) ) ) ), complement( converse( X ) ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217046) {G1,W15,D7,L1,V2,M1} { join( composition( Y, complement(
% 100.33/100.74 converse( composition( X, Y ) ) ) ), complement( converse( X ) ) ) ==>
% 100.33/100.74 complement( converse( X ) ) }.
% 100.33/100.74 parent0[0]: (217045) {G1,W15,D7,L1,V2,M1} { complement( converse( X ) )
% 100.33/100.74 ==> join( composition( Y, complement( converse( composition( X, Y ) ) ) )
% 100.33/100.74 , complement( converse( X ) ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (88) {G1,W15,D7,L1,V2,M1} P(9,10);d(7) { join( composition( X
% 100.33/100.74 , complement( converse( composition( Y, X ) ) ) ), complement( converse(
% 100.33/100.74 Y ) ) ) ==> complement( converse( Y ) ) }.
% 100.33/100.74 parent0: (217046) {G1,W15,D7,L1,V2,M1} { join( composition( Y, complement
% 100.33/100.74 ( converse( composition( X, Y ) ) ) ), complement( converse( X ) ) ) ==>
% 100.33/100.74 complement( converse( X ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217047) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 100.33/100.74 composition( converse( X ), complement( composition( X, Y ) ) ),
% 100.33/100.74 complement( Y ) ) }.
% 100.33/100.74 parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 100.33/100.74 , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement(
% 100.33/100.74 Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217048) {G1,W13,D6,L1,V2,M1} { complement( X ) ==> join(
% 100.33/100.74 complement( X ), composition( converse( Y ), complement( composition( Y,
% 100.33/100.74 X ) ) ) ) }.
% 100.33/100.74 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.74 parent1[0; 3]: (217047) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 100.33/100.74 composition( converse( X ), complement( composition( X, Y ) ) ),
% 100.33/100.74 complement( Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := composition( converse( Y ), complement( composition( Y, X ) ) )
% 100.33/100.74 Y := complement( X )
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217051) {G1,W13,D6,L1,V2,M1} { join( complement( X ), composition
% 100.33/100.74 ( converse( Y ), complement( composition( Y, X ) ) ) ) ==> complement( X
% 100.33/100.74 ) }.
% 100.33/100.74 parent0[0]: (217048) {G1,W13,D6,L1,V2,M1} { complement( X ) ==> join(
% 100.33/100.74 complement( X ), composition( converse( Y ), complement( composition( Y,
% 100.33/100.74 X ) ) ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (89) {G1,W13,D6,L1,V2,M1} P(10,0) { join( complement( Y ),
% 100.33/100.74 composition( converse( X ), complement( composition( X, Y ) ) ) ) ==>
% 100.33/100.74 complement( Y ) }.
% 100.33/100.74 parent0: (217051) {G1,W13,D6,L1,V2,M1} { join( complement( X ),
% 100.33/100.74 composition( converse( Y ), complement( composition( Y, X ) ) ) ) ==>
% 100.33/100.74 complement( X ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217053) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 100.33/100.74 composition( converse( X ), complement( composition( X, Y ) ) ),
% 100.33/100.74 complement( Y ) ) }.
% 100.33/100.74 parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 100.33/100.74 , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement(
% 100.33/100.74 Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217054) {G1,W11,D5,L1,V1,M1} { complement( one ) ==> join(
% 100.33/100.74 composition( converse( X ), complement( X ) ), complement( one ) ) }.
% 100.33/100.74 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 100.33/100.74 parent1[0; 8]: (217053) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 100.33/100.74 composition( converse( X ), complement( composition( X, Y ) ) ),
% 100.33/100.74 complement( Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := one
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217055) {G1,W11,D5,L1,V1,M1} { join( composition( converse( X ),
% 100.33/100.74 complement( X ) ), complement( one ) ) ==> complement( one ) }.
% 100.33/100.74 parent0[0]: (217054) {G1,W11,D5,L1,V1,M1} { complement( one ) ==> join(
% 100.33/100.74 composition( converse( X ), complement( X ) ), complement( one ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (91) {G1,W11,D5,L1,V1,M1} P(5,10) { join( composition(
% 100.33/100.74 converse( X ), complement( X ) ), complement( one ) ) ==> complement( one
% 100.33/100.74 ) }.
% 100.33/100.74 parent0: (217055) {G1,W11,D5,L1,V1,M1} { join( composition( converse( X )
% 100.33/100.74 , complement( X ) ), complement( one ) ) ==> complement( one ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217056) {G0,W46,D6,L2,V0,M2} { ! meet( composition( skol1, skol2
% 100.33/100.74 ), complement( composition( skol1, skol3 ) ) ) ==> join( meet(
% 100.33/100.74 composition( skol1, skol2 ), complement( skol3 ) ), meet( composition(
% 100.33/100.74 skol1, skol2 ), complement( composition( skol1, skol3 ) ) ) ), ! join(
% 100.33/100.74 meet( composition( skol1, skol2 ), complement( composition( skol1, skol3
% 100.33/100.74 ) ) ), meet( composition( skol1, skol2 ), complement( skol3 ) ) ) ==>
% 100.33/100.74 meet( composition( skol1, skol2 ), complement( skol3 ) ) }.
% 100.33/100.74 parent0[0]: (14) {G0,W46,D6,L2,V0,M2} I { ! join( meet( composition( skol1
% 100.33/100.74 , skol2 ), complement( skol3 ) ), meet( composition( skol1, skol2 ),
% 100.33/100.74 complement( composition( skol1, skol3 ) ) ) ) ==> meet( composition(
% 100.33/100.74 skol1, skol2 ), complement( composition( skol1, skol3 ) ) ), ! join( meet
% 100.33/100.74 ( composition( skol1, skol2 ), complement( composition( skol1, skol3 ) )
% 100.33/100.74 ), meet( composition( skol1, skol2 ), complement( skol3 ) ) ) ==> meet(
% 100.33/100.74 composition( skol1, skol2 ), complement( skol3 ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217060) {G1,W46,D6,L2,V0,M2} { ! join( meet( composition( skol1
% 100.33/100.74 , skol2 ), complement( skol3 ) ), meet( composition( skol1, skol2 ),
% 100.33/100.74 complement( composition( skol1, skol3 ) ) ) ) ==> meet( composition(
% 100.33/100.74 skol1, skol2 ), complement( skol3 ) ), ! meet( composition( skol1, skol2
% 100.33/100.74 ), complement( composition( skol1, skol3 ) ) ) ==> join( meet(
% 100.33/100.74 composition( skol1, skol2 ), complement( skol3 ) ), meet( composition(
% 100.33/100.74 skol1, skol2 ), complement( composition( skol1, skol3 ) ) ) ) }.
% 100.33/100.74 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.74 parent1[1; 2]: (217056) {G0,W46,D6,L2,V0,M2} { ! meet( composition( skol1
% 100.33/100.74 , skol2 ), complement( composition( skol1, skol3 ) ) ) ==> join( meet(
% 100.33/100.74 composition( skol1, skol2 ), complement( skol3 ) ), meet( composition(
% 100.33/100.74 skol1, skol2 ), complement( composition( skol1, skol3 ) ) ) ), ! join(
% 100.33/100.74 meet( composition( skol1, skol2 ), complement( composition( skol1, skol3
% 100.33/100.74 ) ) ), meet( composition( skol1, skol2 ), complement( skol3 ) ) ) ==>
% 100.33/100.74 meet( composition( skol1, skol2 ), complement( skol3 ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := meet( composition( skol1, skol2 ), complement( composition( skol1,
% 100.33/100.74 skol3 ) ) )
% 100.33/100.74 Y := meet( composition( skol1, skol2 ), complement( skol3 ) )
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217073) {G1,W46,D6,L2,V0,M2} { ! join( meet( composition( skol1,
% 100.33/100.74 skol2 ), complement( skol3 ) ), meet( composition( skol1, skol2 ),
% 100.33/100.74 complement( composition( skol1, skol3 ) ) ) ) ==> meet( composition(
% 100.33/100.74 skol1, skol2 ), complement( composition( skol1, skol3 ) ) ), ! join( meet
% 100.33/100.74 ( composition( skol1, skol2 ), complement( skol3 ) ), meet( composition(
% 100.33/100.74 skol1, skol2 ), complement( composition( skol1, skol3 ) ) ) ) ==> meet(
% 100.33/100.74 composition( skol1, skol2 ), complement( skol3 ) ) }.
% 100.33/100.74 parent0[1]: (217060) {G1,W46,D6,L2,V0,M2} { ! join( meet( composition(
% 100.33/100.74 skol1, skol2 ), complement( skol3 ) ), meet( composition( skol1, skol2 )
% 100.33/100.74 , complement( composition( skol1, skol3 ) ) ) ) ==> meet( composition(
% 100.33/100.74 skol1, skol2 ), complement( skol3 ) ), ! meet( composition( skol1, skol2
% 100.33/100.74 ), complement( composition( skol1, skol3 ) ) ) ==> join( meet(
% 100.33/100.74 composition( skol1, skol2 ), complement( skol3 ) ), meet( composition(
% 100.33/100.74 skol1, skol2 ), complement( composition( skol1, skol3 ) ) ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (99) {G1,W46,D6,L2,V0,M2} P(0,14) { ! join( meet( composition
% 100.33/100.74 ( skol1, skol2 ), complement( skol3 ) ), meet( composition( skol1, skol2
% 100.33/100.74 ), complement( composition( skol1, skol3 ) ) ) ) ==> meet( composition(
% 100.33/100.74 skol1, skol2 ), complement( composition( skol1, skol3 ) ) ), ! join( meet
% 100.33/100.74 ( composition( skol1, skol2 ), complement( skol3 ) ), meet( composition(
% 100.33/100.74 skol1, skol2 ), complement( composition( skol1, skol3 ) ) ) ) ==> meet(
% 100.33/100.74 composition( skol1, skol2 ), complement( skol3 ) ) }.
% 100.33/100.74 parent0: (217073) {G1,W46,D6,L2,V0,M2} { ! join( meet( composition( skol1
% 100.33/100.74 , skol2 ), complement( skol3 ) ), meet( composition( skol1, skol2 ),
% 100.33/100.74 complement( composition( skol1, skol3 ) ) ) ) ==> meet( composition(
% 100.33/100.74 skol1, skol2 ), complement( composition( skol1, skol3 ) ) ), ! join( meet
% 100.33/100.74 ( composition( skol1, skol2 ), complement( skol3 ) ), meet( composition(
% 100.33/100.74 skol1, skol2 ), complement( composition( skol1, skol3 ) ) ) ) ==> meet(
% 100.33/100.74 composition( skol1, skol2 ), complement( skol3 ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 1 ==> 1
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217076) {G1,W10,D5,L1,V2,M1} { composition( converse( Y ), X )
% 100.33/100.74 ==> converse( composition( converse( X ), Y ) ) }.
% 100.33/100.74 parent0[0]: (18) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition(
% 100.33/100.74 converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217079) {G1,W8,D4,L1,V1,M1} { composition( converse( one ), X )
% 100.33/100.74 ==> converse( converse( X ) ) }.
% 100.33/100.74 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 100.33/100.74 parent1[0; 6]: (217076) {G1,W10,D5,L1,V2,M1} { composition( converse( Y )
% 100.33/100.74 , X ) ==> converse( composition( converse( X ), Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := converse( X )
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := one
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217080) {G1,W6,D4,L1,V1,M1} { composition( converse( one ), X )
% 100.33/100.74 ==> X }.
% 100.33/100.74 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 100.33/100.74 parent1[0; 5]: (217079) {G1,W8,D4,L1,V1,M1} { composition( converse( one )
% 100.33/100.74 , X ) ==> converse( converse( X ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (130) {G2,W6,D4,L1,V1,M1} P(5,18);d(7) { composition( converse
% 100.33/100.74 ( one ), X ) ==> X }.
% 100.33/100.74 parent0: (217080) {G1,W6,D4,L1,V1,M1} { composition( converse( one ), X )
% 100.33/100.74 ==> X }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217082) {G2,W6,D4,L1,V1,M1} { X ==> composition( converse( one )
% 100.33/100.74 , X ) }.
% 100.33/100.74 parent0[0]: (130) {G2,W6,D4,L1,V1,M1} P(5,18);d(7) { composition( converse
% 100.33/100.74 ( one ), X ) ==> X }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217084) {G1,W4,D3,L1,V0,M1} { one ==> converse( one ) }.
% 100.33/100.74 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 100.33/100.74 parent1[0; 2]: (217082) {G2,W6,D4,L1,V1,M1} { X ==> composition( converse
% 100.33/100.74 ( one ), X ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := converse( one )
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := one
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217085) {G1,W4,D3,L1,V0,M1} { converse( one ) ==> one }.
% 100.33/100.74 parent0[0]: (217084) {G1,W4,D3,L1,V0,M1} { one ==> converse( one ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (136) {G3,W4,D3,L1,V0,M1} P(130,5) { converse( one ) ==> one
% 100.33/100.74 }.
% 100.33/100.74 parent0: (217085) {G1,W4,D3,L1,V0,M1} { converse( one ) ==> one }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217087) {G2,W6,D4,L1,V1,M1} { X ==> composition( converse( one )
% 100.33/100.74 , X ) }.
% 100.33/100.74 parent0[0]: (130) {G2,W6,D4,L1,V1,M1} P(5,18);d(7) { composition( converse
% 100.33/100.74 ( one ), X ) ==> X }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217088) {G3,W5,D3,L1,V1,M1} { X ==> composition( one, X ) }.
% 100.33/100.74 parent0[0]: (136) {G3,W4,D3,L1,V0,M1} P(130,5) { converse( one ) ==> one
% 100.33/100.74 }.
% 100.33/100.74 parent1[0; 3]: (217087) {G2,W6,D4,L1,V1,M1} { X ==> composition( converse
% 100.33/100.74 ( one ), X ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217089) {G3,W5,D3,L1,V1,M1} { composition( one, X ) ==> X }.
% 100.33/100.74 parent0[0]: (217088) {G3,W5,D3,L1,V1,M1} { X ==> composition( one, X ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (137) {G4,W5,D3,L1,V1,M1} P(136,130) { composition( one, X )
% 100.33/100.74 ==> X }.
% 100.33/100.74 parent0: (217089) {G3,W5,D3,L1,V1,M1} { composition( one, X ) ==> X }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217091) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) ==> join
% 100.33/100.74 ( converse( X ), converse( Y ) ) }.
% 100.33/100.74 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 100.33/100.74 ) ==> converse( join( X, Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217093) {G1,W9,D4,L1,V1,M1} { converse( join( X, one ) ) ==>
% 100.33/100.74 join( converse( X ), one ) }.
% 100.33/100.74 parent0[0]: (136) {G3,W4,D3,L1,V0,M1} P(130,5) { converse( one ) ==> one
% 100.33/100.74 }.
% 100.33/100.74 parent1[0; 8]: (217091) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) )
% 100.33/100.74 ==> join( converse( X ), converse( Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := one
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217095) {G1,W9,D4,L1,V1,M1} { join( converse( X ), one ) ==>
% 100.33/100.74 converse( join( X, one ) ) }.
% 100.33/100.74 parent0[0]: (217093) {G1,W9,D4,L1,V1,M1} { converse( join( X, one ) ) ==>
% 100.33/100.74 join( converse( X ), one ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (139) {G4,W9,D4,L1,V1,M1} P(136,8) { join( converse( X ), one
% 100.33/100.74 ) ==> converse( join( X, one ) ) }.
% 100.33/100.74 parent0: (217095) {G1,W9,D4,L1,V1,M1} { join( converse( X ), one ) ==>
% 100.33/100.74 converse( join( X, one ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217097) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 100.33/100.74 composition( converse( X ), complement( composition( X, Y ) ) ),
% 100.33/100.74 complement( Y ) ) }.
% 100.33/100.74 parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 100.33/100.74 , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement(
% 100.33/100.74 Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217099) {G1,W11,D5,L1,V1,M1} { complement( X ) ==> join(
% 100.33/100.74 composition( converse( one ), complement( X ) ), complement( X ) ) }.
% 100.33/100.74 parent0[0]: (137) {G4,W5,D3,L1,V1,M1} P(136,130) { composition( one, X )
% 100.33/100.74 ==> X }.
% 100.33/100.74 parent1[0; 8]: (217097) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 100.33/100.74 composition( converse( X ), complement( composition( X, Y ) ) ),
% 100.33/100.74 complement( Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := one
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217100) {G2,W8,D4,L1,V1,M1} { complement( X ) ==> join(
% 100.33/100.74 complement( X ), complement( X ) ) }.
% 100.33/100.74 parent0[0]: (130) {G2,W6,D4,L1,V1,M1} P(5,18);d(7) { composition( converse
% 100.33/100.74 ( one ), X ) ==> X }.
% 100.33/100.74 parent1[0; 4]: (217099) {G1,W11,D5,L1,V1,M1} { complement( X ) ==> join(
% 100.33/100.74 composition( converse( one ), complement( X ) ), complement( X ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := complement( X )
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217101) {G2,W8,D4,L1,V1,M1} { join( complement( X ), complement(
% 100.33/100.74 X ) ) ==> complement( X ) }.
% 100.33/100.74 parent0[0]: (217100) {G2,W8,D4,L1,V1,M1} { complement( X ) ==> join(
% 100.33/100.74 complement( X ), complement( X ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (140) {G5,W8,D4,L1,V1,M1} P(137,10);d(130) { join( complement
% 100.33/100.74 ( X ), complement( X ) ) ==> complement( X ) }.
% 100.33/100.74 parent0: (217101) {G2,W8,D4,L1,V1,M1} { join( complement( X ), complement
% 100.33/100.74 ( X ) ) ==> complement( X ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217103) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ), Y ) ==>
% 100.33/100.74 join( composition( X, Y ), composition( Z, Y ) ) }.
% 100.33/100.74 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 100.33/100.74 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Z
% 100.33/100.74 Z := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217104) {G1,W11,D4,L1,V2,M1} { composition( join( one, X ), Y )
% 100.33/100.74 ==> join( Y, composition( X, Y ) ) }.
% 100.33/100.74 parent0[0]: (137) {G4,W5,D3,L1,V1,M1} P(136,130) { composition( one, X )
% 100.33/100.74 ==> X }.
% 100.33/100.74 parent1[0; 7]: (217103) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ),
% 100.33/100.74 Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := one
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217106) {G1,W11,D4,L1,V2,M1} { join( Y, composition( X, Y ) ) ==>
% 100.33/100.74 composition( join( one, X ), Y ) }.
% 100.33/100.74 parent0[0]: (217104) {G1,W11,D4,L1,V2,M1} { composition( join( one, X ), Y
% 100.33/100.74 ) ==> join( Y, composition( X, Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (141) {G5,W11,D4,L1,V2,M1} P(137,6) { join( X, composition( Y
% 100.33/100.74 , X ) ) = composition( join( one, Y ), X ) }.
% 100.33/100.74 parent0: (217106) {G1,W11,D4,L1,V2,M1} { join( Y, composition( X, Y ) )
% 100.33/100.74 ==> composition( join( one, X ), Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217109) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ), Y ) ==>
% 100.33/100.74 join( composition( X, Y ), composition( Z, Y ) ) }.
% 100.33/100.74 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 100.33/100.74 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Z
% 100.33/100.74 Z := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217111) {G1,W11,D4,L1,V2,M1} { composition( join( X, one ), Y )
% 100.33/100.74 ==> join( composition( X, Y ), Y ) }.
% 100.33/100.74 parent0[0]: (137) {G4,W5,D3,L1,V1,M1} P(136,130) { composition( one, X )
% 100.33/100.74 ==> X }.
% 100.33/100.74 parent1[0; 10]: (217109) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z )
% 100.33/100.74 , Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := one
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217113) {G1,W11,D4,L1,V2,M1} { join( composition( X, Y ), Y ) ==>
% 100.33/100.74 composition( join( X, one ), Y ) }.
% 100.33/100.74 parent0[0]: (217111) {G1,W11,D4,L1,V2,M1} { composition( join( X, one ), Y
% 100.33/100.74 ) ==> join( composition( X, Y ), Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (142) {G5,W11,D4,L1,V2,M1} P(137,6) { join( composition( Y, X
% 100.33/100.74 ), X ) = composition( join( Y, one ), X ) }.
% 100.33/100.74 parent0: (217113) {G1,W11,D4,L1,V2,M1} { join( composition( X, Y ), Y )
% 100.33/100.74 ==> composition( join( X, one ), Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217115) {G5,W8,D4,L1,V1,M1} { complement( X ) ==> join(
% 100.33/100.74 complement( X ), complement( X ) ) }.
% 100.33/100.74 parent0[0]: (140) {G5,W8,D4,L1,V1,M1} P(137,10);d(130) { join( complement(
% 100.33/100.74 X ), complement( X ) ) ==> complement( X ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217118) {G2,W7,D4,L1,V0,M1} { complement( top ) ==> join(
% 100.33/100.74 complement( top ), zero ) }.
% 100.33/100.74 parent0[0]: (58) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 100.33/100.74 zero }.
% 100.33/100.74 parent1[0; 6]: (217115) {G5,W8,D4,L1,V1,M1} { complement( X ) ==> join(
% 100.33/100.74 complement( X ), complement( X ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := top
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217120) {G2,W6,D3,L1,V0,M1} { complement( top ) ==> join( zero,
% 100.33/100.74 zero ) }.
% 100.33/100.74 parent0[0]: (58) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 100.33/100.74 zero }.
% 100.33/100.74 parent1[0; 4]: (217118) {G2,W7,D4,L1,V0,M1} { complement( top ) ==> join(
% 100.33/100.74 complement( top ), zero ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217121) {G2,W5,D3,L1,V0,M1} { zero ==> join( zero, zero ) }.
% 100.33/100.74 parent0[0]: (58) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 100.33/100.74 zero }.
% 100.33/100.74 parent1[0; 1]: (217120) {G2,W6,D3,L1,V0,M1} { complement( top ) ==> join(
% 100.33/100.74 zero, zero ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217127) {G2,W5,D3,L1,V0,M1} { join( zero, zero ) ==> zero }.
% 100.33/100.74 parent0[0]: (217121) {G2,W5,D3,L1,V0,M1} { zero ==> join( zero, zero ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (145) {G6,W5,D3,L1,V0,M1} P(58,140) { join( zero, zero ) ==>
% 100.33/100.74 zero }.
% 100.33/100.74 parent0: (217127) {G2,W5,D3,L1,V0,M1} { join( zero, zero ) ==> zero }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217131) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 100.33/100.74 ( complement( X ), complement( Y ) ) ) }.
% 100.33/100.74 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 100.33/100.74 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217146) {G1,W7,D4,L1,V1,M1} { meet( X, X ) ==> complement(
% 100.33/100.74 complement( X ) ) }.
% 100.33/100.74 parent0[0]: (140) {G5,W8,D4,L1,V1,M1} P(137,10);d(130) { join( complement(
% 100.33/100.74 X ), complement( X ) ) ==> complement( X ) }.
% 100.33/100.74 parent1[0; 5]: (217131) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 100.33/100.74 ( join( complement( X ), complement( Y ) ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217147) {G1,W7,D4,L1,V1,M1} { complement( complement( X ) ) ==>
% 100.33/100.74 meet( X, X ) }.
% 100.33/100.74 parent0[0]: (217146) {G1,W7,D4,L1,V1,M1} { meet( X, X ) ==> complement(
% 100.33/100.74 complement( X ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (146) {G6,W7,D4,L1,V1,M1} P(140,3) { complement( complement( X
% 100.33/100.74 ) ) = meet( X, X ) }.
% 100.33/100.74 parent0: (217147) {G1,W7,D4,L1,V1,M1} { complement( complement( X ) ) ==>
% 100.33/100.74 meet( X, X ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217149) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) ) ==>
% 100.33/100.74 converse( join( converse( X ), Y ) ) }.
% 100.33/100.74 parent0[0]: (20) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 100.33/100.74 ), Y ) ) ==> join( X, converse( Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217150) {G1,W9,D6,L1,V1,M1} { join( X, converse( complement(
% 100.33/100.74 converse( X ) ) ) ) ==> converse( top ) }.
% 100.33/100.74 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 100.33/100.74 }.
% 100.33/100.74 parent1[0; 8]: (217149) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) )
% 100.33/100.74 ==> converse( join( converse( X ), Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := converse( X )
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := complement( converse( X ) )
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (156) {G2,W9,D6,L1,V1,M1} P(11,20) { join( X, converse(
% 100.33/100.74 complement( converse( X ) ) ) ) ==> converse( top ) }.
% 100.33/100.74 parent0: (217150) {G1,W9,D6,L1,V1,M1} { join( X, converse( complement(
% 100.33/100.74 converse( X ) ) ) ) ==> converse( top ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217153) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 100.33/100.74 X, join( Y, Z ) ) }.
% 100.33/100.74 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.33/100.74 join( X, Y ), Z ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217155) {G1,W9,D4,L1,V1,M1} { join( join( X, zero ), zero ) ==>
% 100.33/100.74 join( X, zero ) }.
% 100.33/100.74 parent0[0]: (145) {G6,W5,D3,L1,V0,M1} P(58,140) { join( zero, zero ) ==>
% 100.33/100.74 zero }.
% 100.33/100.74 parent1[0; 8]: (217153) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==>
% 100.33/100.74 join( X, join( Y, Z ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := zero
% 100.33/100.74 Z := zero
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (158) {G7,W9,D4,L1,V1,M1} P(145,1) { join( join( X, zero ),
% 100.33/100.74 zero ) ==> join( X, zero ) }.
% 100.33/100.74 parent0: (217155) {G1,W9,D4,L1,V1,M1} { join( join( X, zero ), zero ) ==>
% 100.33/100.74 join( X, zero ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217159) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y ) ==>
% 100.33/100.74 converse( join( X, converse( Y ) ) ) }.
% 100.33/100.74 parent0[0]: (21) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 100.33/100.74 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217160) {G2,W9,D6,L1,V1,M1} { join( converse( complement(
% 100.33/100.74 converse( X ) ) ), X ) ==> converse( top ) }.
% 100.33/100.74 parent0[0]: (15) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X )
% 100.33/100.74 ==> top }.
% 100.33/100.74 parent1[0; 8]: (217159) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y )
% 100.33/100.74 ==> converse( join( X, converse( Y ) ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := converse( X )
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := complement( converse( X ) )
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (168) {G2,W9,D6,L1,V1,M1} P(15,21) { join( converse(
% 100.33/100.74 complement( converse( X ) ) ), X ) ==> converse( top ) }.
% 100.33/100.74 parent0: (217160) {G2,W9,D6,L1,V1,M1} { join( converse( complement(
% 100.33/100.74 converse( X ) ) ), X ) ==> converse( top ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217162) {G2,W10,D6,L1,V2,M1} { top ==> join( join( complement(
% 100.33/100.74 join( X, Y ) ), X ), Y ) }.
% 100.33/100.74 parent0[0]: (23) {G2,W10,D6,L1,V2,M1} P(1,15) { join( join( complement(
% 100.33/100.74 join( X, Y ) ), X ), Y ) ==> top }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217164) {G1,W10,D6,L1,V2,M1} { top ==> join( Y, join( complement
% 100.33/100.74 ( join( X, Y ) ), X ) ) }.
% 100.33/100.74 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.74 parent1[0; 2]: (217162) {G2,W10,D6,L1,V2,M1} { top ==> join( join(
% 100.33/100.74 complement( join( X, Y ) ), X ), Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := join( complement( join( X, Y ) ), X )
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217178) {G1,W10,D6,L1,V2,M1} { top ==> join( join( X, complement
% 100.33/100.74 ( join( Y, X ) ) ), Y ) }.
% 100.33/100.74 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.33/100.74 join( X, Y ), Z ) }.
% 100.33/100.74 parent1[0; 2]: (217164) {G1,W10,D6,L1,V2,M1} { top ==> join( Y, join(
% 100.33/100.74 complement( join( X, Y ) ), X ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := complement( join( Y, X ) )
% 100.33/100.74 Z := Y
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217179) {G1,W10,D6,L1,V2,M1} { join( join( X, complement( join( Y
% 100.33/100.74 , X ) ) ), Y ) ==> top }.
% 100.33/100.74 parent0[0]: (217178) {G1,W10,D6,L1,V2,M1} { top ==> join( join( X,
% 100.33/100.74 complement( join( Y, X ) ) ), Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (201) {G3,W10,D6,L1,V2,M1} P(23,0);d(1) { join( join( Y,
% 100.33/100.74 complement( join( X, Y ) ) ), X ) ==> top }.
% 100.33/100.74 parent0: (217179) {G1,W10,D6,L1,V2,M1} { join( join( X, complement( join(
% 100.33/100.74 Y, X ) ) ), Y ) ==> top }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217180) {G2,W10,D6,L1,V2,M1} { top ==> join( join( complement(
% 100.33/100.74 join( X, Y ) ), X ), Y ) }.
% 100.33/100.74 parent0[0]: (23) {G2,W10,D6,L1,V2,M1} P(1,15) { join( join( complement(
% 100.33/100.74 join( X, Y ) ), X ), Y ) ==> top }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217182) {G1,W10,D6,L1,V2,M1} { top ==> join( join( X, complement
% 100.33/100.74 ( join( X, Y ) ) ), Y ) }.
% 100.33/100.74 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.74 parent1[0; 3]: (217180) {G2,W10,D6,L1,V2,M1} { top ==> join( join(
% 100.33/100.74 complement( join( X, Y ) ), X ), Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := complement( join( X, Y ) )
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217190) {G1,W10,D6,L1,V2,M1} { join( join( X, complement( join( X
% 100.33/100.74 , Y ) ) ), Y ) ==> top }.
% 100.33/100.74 parent0[0]: (217182) {G1,W10,D6,L1,V2,M1} { top ==> join( join( X,
% 100.33/100.74 complement( join( X, Y ) ) ), Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (202) {G3,W10,D6,L1,V2,M1} P(0,23) { join( join( X, complement
% 100.33/100.74 ( join( X, Y ) ) ), Y ) ==> top }.
% 100.33/100.74 parent0: (217190) {G1,W10,D6,L1,V2,M1} { join( join( X, complement( join(
% 100.33/100.74 X, Y ) ) ), Y ) ==> top }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217197) {G2,W10,D6,L1,V2,M1} { top ==> join( join( complement(
% 100.33/100.74 join( X, Y ) ), X ), Y ) }.
% 100.33/100.74 parent0[0]: (23) {G2,W10,D6,L1,V2,M1} P(1,15) { join( join( complement(
% 100.33/100.74 join( X, Y ) ), X ), Y ) ==> top }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217200) {G1,W10,D6,L1,V2,M1} { top ==> join( join( complement(
% 100.33/100.74 join( Y, X ) ), X ), Y ) }.
% 100.33/100.74 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.74 parent1[0; 5]: (217197) {G2,W10,D6,L1,V2,M1} { top ==> join( join(
% 100.33/100.74 complement( join( X, Y ) ), X ), Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217213) {G1,W10,D6,L1,V2,M1} { join( join( complement( join( X, Y
% 100.33/100.74 ) ), Y ), X ) ==> top }.
% 100.33/100.74 parent0[0]: (217200) {G1,W10,D6,L1,V2,M1} { top ==> join( join( complement
% 100.33/100.74 ( join( Y, X ) ), X ), Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (203) {G3,W10,D6,L1,V2,M1} P(0,23) { join( join( complement(
% 100.33/100.74 join( Y, X ) ), X ), Y ) ==> top }.
% 100.33/100.74 parent0: (217213) {G1,W10,D6,L1,V2,M1} { join( join( complement( join( X,
% 100.33/100.74 Y ) ), Y ), X ) ==> top }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217215) {G2,W10,D5,L1,V2,M1} { join( X, top ) ==> join( join( X,
% 100.33/100.74 complement( Y ) ), Y ) }.
% 100.33/100.74 parent0[0]: (24) {G2,W10,D5,L1,V2,M1} P(15,1) { join( join( Y, complement(
% 100.33/100.74 X ) ), X ) ==> join( Y, top ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217217) {G3,W9,D4,L1,V1,M1} { join( complement( X ), top ) ==>
% 100.33/100.74 join( complement( X ), X ) }.
% 100.33/100.74 parent0[0]: (140) {G5,W8,D4,L1,V1,M1} P(137,10);d(130) { join( complement(
% 100.33/100.74 X ), complement( X ) ) ==> complement( X ) }.
% 100.33/100.74 parent1[0; 6]: (217215) {G2,W10,D5,L1,V2,M1} { join( X, top ) ==> join(
% 100.33/100.74 join( X, complement( Y ) ), Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := complement( X )
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217218) {G2,W6,D4,L1,V1,M1} { join( complement( X ), top ) ==>
% 100.33/100.74 top }.
% 100.33/100.74 parent0[0]: (15) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X )
% 100.33/100.74 ==> top }.
% 100.33/100.74 parent1[0; 5]: (217217) {G3,W9,D4,L1,V1,M1} { join( complement( X ), top )
% 100.33/100.74 ==> join( complement( X ), X ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (224) {G6,W6,D4,L1,V1,M1} P(140,24);d(15) { join( complement(
% 100.33/100.74 X ), top ) ==> top }.
% 100.33/100.74 parent0: (217218) {G2,W6,D4,L1,V1,M1} { join( complement( X ), top ) ==>
% 100.33/100.74 top }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217221) {G2,W10,D5,L1,V2,M1} { join( X, top ) ==> join( join( X,
% 100.33/100.74 complement( Y ) ), Y ) }.
% 100.33/100.74 parent0[0]: (24) {G2,W10,D5,L1,V2,M1} P(15,1) { join( join( Y, complement(
% 100.33/100.74 X ) ), X ) ==> join( Y, top ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217224) {G2,W9,D5,L1,V1,M1} { join( complement( complement( X )
% 100.33/100.74 ), top ) ==> join( top, X ) }.
% 100.33/100.74 parent0[0]: (15) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X )
% 100.33/100.74 ==> top }.
% 100.33/100.74 parent1[0; 7]: (217221) {G2,W10,D5,L1,V2,M1} { join( X, top ) ==> join(
% 100.33/100.74 join( X, complement( Y ) ), Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := complement( X )
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := complement( complement( X ) )
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217225) {G3,W5,D3,L1,V1,M1} { top ==> join( top, X ) }.
% 100.33/100.74 parent0[0]: (224) {G6,W6,D4,L1,V1,M1} P(140,24);d(15) { join( complement( X
% 100.33/100.74 ), top ) ==> top }.
% 100.33/100.74 parent1[0; 1]: (217224) {G2,W9,D5,L1,V1,M1} { join( complement( complement
% 100.33/100.74 ( X ) ), top ) ==> join( top, X ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := complement( X )
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217226) {G3,W5,D3,L1,V1,M1} { join( top, X ) ==> top }.
% 100.33/100.74 parent0[0]: (217225) {G3,W5,D3,L1,V1,M1} { top ==> join( top, X ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (230) {G7,W5,D3,L1,V1,M1} P(15,24);d(224) { join( top, X ) ==>
% 100.33/100.74 top }.
% 100.33/100.74 parent0: (217226) {G3,W5,D3,L1,V1,M1} { join( top, X ) ==> top }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217227) {G2,W10,D5,L1,V2,M1} { join( X, top ) ==> join( join( X,
% 100.33/100.74 complement( Y ) ), Y ) }.
% 100.33/100.74 parent0[0]: (24) {G2,W10,D5,L1,V2,M1} P(15,1) { join( join( Y, complement(
% 100.33/100.74 X ) ), X ) ==> join( Y, top ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217230) {G1,W10,D5,L1,V2,M1} { join( X, top ) ==> join( Y, join
% 100.33/100.74 ( X, complement( Y ) ) ) }.
% 100.33/100.74 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.74 parent1[0; 4]: (217227) {G2,W10,D5,L1,V2,M1} { join( X, top ) ==> join(
% 100.33/100.74 join( X, complement( Y ) ), Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := join( X, complement( Y ) )
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217243) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join( join( Y
% 100.33/100.74 , X ), complement( Y ) ) }.
% 100.33/100.74 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.33/100.74 join( X, Y ), Z ) }.
% 100.33/100.74 parent1[0; 4]: (217230) {G1,W10,D5,L1,V2,M1} { join( X, top ) ==> join( Y
% 100.33/100.74 , join( X, complement( Y ) ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 Z := complement( Y )
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217244) {G1,W10,D4,L1,V2,M1} { join( join( Y, X ), complement( Y
% 100.33/100.74 ) ) ==> join( X, top ) }.
% 100.33/100.74 parent0[0]: (217243) {G1,W10,D4,L1,V2,M1} { join( X, top ) ==> join( join
% 100.33/100.74 ( Y, X ), complement( Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (231) {G3,W10,D4,L1,V2,M1} P(24,0);d(1) { join( join( Y, X ),
% 100.33/100.74 complement( Y ) ) ==> join( X, top ) }.
% 100.33/100.74 parent0: (217244) {G1,W10,D4,L1,V2,M1} { join( join( Y, X ), complement( Y
% 100.33/100.74 ) ) ==> join( X, top ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217246) {G2,W10,D5,L1,V2,M1} { join( X, top ) ==> join( join( X,
% 100.33/100.74 complement( Y ) ), Y ) }.
% 100.33/100.74 parent0[0]: (24) {G2,W10,D5,L1,V2,M1} P(15,1) { join( join( Y, complement(
% 100.33/100.74 X ) ), X ) ==> join( Y, top ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := Y
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217248) {G1,W7,D3,L1,V1,M1} { join( X, top ) ==> join( top, X )
% 100.33/100.74 }.
% 100.33/100.74 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 100.33/100.74 }.
% 100.33/100.74 parent1[0; 5]: (217246) {G2,W10,D5,L1,V2,M1} { join( X, top ) ==> join(
% 100.33/100.74 join( X, complement( Y ) ), Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217249) {G2,W5,D3,L1,V1,M1} { join( X, top ) ==> top }.
% 100.33/100.74 parent0[0]: (230) {G7,W5,D3,L1,V1,M1} P(15,24);d(224) { join( top, X ) ==>
% 100.33/100.74 top }.
% 100.33/100.74 parent1[0; 4]: (217248) {G1,W7,D3,L1,V1,M1} { join( X, top ) ==> join( top
% 100.33/100.74 , X ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (233) {G8,W5,D3,L1,V1,M1} P(11,24);d(230) { join( X, top ) ==>
% 100.33/100.74 top }.
% 100.33/100.74 parent0: (217249) {G2,W5,D3,L1,V1,M1} { join( X, top ) ==> top }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217252) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) ) ==>
% 100.33/100.74 converse( join( converse( X ), Y ) ) }.
% 100.33/100.74 parent0[0]: (20) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 100.33/100.74 ), Y ) ) ==> join( X, converse( Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217253) {G2,W7,D4,L1,V1,M1} { join( X, converse( top ) ) ==>
% 100.33/100.74 converse( top ) }.
% 100.33/100.74 parent0[0]: (233) {G8,W5,D3,L1,V1,M1} P(11,24);d(230) { join( X, top ) ==>
% 100.33/100.74 top }.
% 100.33/100.74 parent1[0; 6]: (217252) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) )
% 100.33/100.74 ==> converse( join( converse( X ), Y ) ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := converse( X )
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := top
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 subsumption: (235) {G9,W7,D4,L1,V1,M1} P(233,20) { join( X, converse( top )
% 100.33/100.74 ) ==> converse( top ) }.
% 100.33/100.74 parent0: (217253) {G2,W7,D4,L1,V1,M1} { join( X, converse( top ) ) ==>
% 100.33/100.74 converse( top ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 end
% 100.33/100.74 permutation0:
% 100.33/100.74 0 ==> 0
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217255) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 100.33/100.74 join( X, Y ), Z ) }.
% 100.33/100.74 parent0[0]: (26) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 100.33/100.74 join( join( Y, Z ), X ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217256) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 100.33/100.74 join( X, Y ), Z ) }.
% 100.33/100.74 parent0[0]: (26) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 100.33/100.74 join( join( Y, Z ), X ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217261) {G2,W15,D5,L1,V4,M1} { join( join( X, Y ), join( Z, T )
% 100.33/100.74 ) = join( join( join( X, Z ), T ), Y ) }.
% 100.33/100.74 parent0[0]: (217255) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join
% 100.33/100.74 ( join( X, Y ), Z ) }.
% 100.33/100.74 parent1[0; 9]: (217256) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) =
% 100.33/100.74 join( join( X, Y ), Z ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Z
% 100.33/100.74 Z := T
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := join( Z, T )
% 100.33/100.74 Y := X
% 100.33/100.74 Z := Y
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217264) {G2,W15,D5,L1,V4,M1} { join( join( X, Y ), join( Z, T )
% 100.33/100.74 ) = join( join( join( T, X ), Z ), Y ) }.
% 100.33/100.74 parent0[0]: (217255) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join
% 100.33/100.74 ( join( X, Y ), Z ) }.
% 100.33/100.74 parent1[0; 9]: (217261) {G2,W15,D5,L1,V4,M1} { join( join( X, Y ), join( Z
% 100.33/100.74 , T ) ) = join( join( join( X, Z ), T ), Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := T
% 100.33/100.74 Y := X
% 100.33/100.74 Z := Z
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 T := T
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 paramod: (217280) {G1,W15,D5,L1,V4,M1} { join( join( join( X, Y ), Z ), T
% 100.33/100.74 ) = join( join( join( T, X ), Z ), Y ) }.
% 100.33/100.74 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.33/100.74 join( X, Y ), Z ) }.
% 100.33/100.74 parent1[0; 1]: (217264) {G2,W15,D5,L1,V4,M1} { join( join( X, Y ), join( Z
% 100.33/100.74 , T ) ) = join( join( join( T, X ), Z ), Y ) }.
% 100.33/100.74 substitution0:
% 100.33/100.74 X := join( X, Y )
% 100.33/100.74 Y := Z
% 100.33/100.74 Z := T
% 100.33/100.74 end
% 100.33/100.74 substitution1:
% 100.33/100.74 X := X
% 100.33/100.74 Y := Y
% 100.33/100.74 Z := Z
% 100.33/100.74 T := T
% 100.33/100.74 end
% 100.33/100.74
% 100.33/100.74 eqswap: (217281) {G1,W15,D5,L1,V4,M1} { join( join( join( T, X ), Z ), Y )
% 100.33/100.75 = join( join( join( X, Y ), Z ), T ) }.
% 100.33/100.75 parent0[0]: (217280) {G1,W15,D5,L1,V4,M1} { join( join( join( X, Y ), Z )
% 100.33/100.75 , T ) = join( join( join( T, X ), Z ), Y ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 Z := Z
% 100.33/100.75 T := T
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (236) {G2,W15,D5,L1,V4,M1} P(26,26);d(1) { join( join( join( Y
% 100.33/100.75 , Z ), X ), T ) = join( join( join( Z, T ), X ), Y ) }.
% 100.33/100.75 parent0: (217281) {G1,W15,D5,L1,V4,M1} { join( join( join( T, X ), Z ), Y
% 100.33/100.75 ) = join( join( join( X, Y ), Z ), T ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Z
% 100.33/100.75 Y := T
% 100.33/100.75 Z := X
% 100.33/100.75 T := Y
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217282) {G9,W7,D4,L1,V1,M1} { converse( top ) ==> join( X,
% 100.33/100.75 converse( top ) ) }.
% 100.33/100.75 parent0[0]: (235) {G9,W7,D4,L1,V1,M1} P(233,20) { join( X, converse( top )
% 100.33/100.75 ) ==> converse( top ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217284) {G8,W4,D3,L1,V0,M1} { converse( top ) ==> top }.
% 100.33/100.75 parent0[0]: (230) {G7,W5,D3,L1,V1,M1} P(15,24);d(224) { join( top, X ) ==>
% 100.33/100.75 top }.
% 100.33/100.75 parent1[0; 3]: (217282) {G9,W7,D4,L1,V1,M1} { converse( top ) ==> join( X
% 100.33/100.75 , converse( top ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := converse( top )
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := top
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (260) {G10,W4,D3,L1,V0,M1} P(235,230) { converse( top ) ==>
% 100.33/100.75 top }.
% 100.33/100.75 parent0: (217284) {G8,W4,D3,L1,V0,M1} { converse( top ) ==> top }.
% 100.33/100.75 substitution0:
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217287) {G1,W10,D5,L1,V2,M1} { composition( converse( Y ), X )
% 100.33/100.75 ==> converse( composition( converse( X ), Y ) ) }.
% 100.33/100.75 parent0[0]: (18) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition(
% 100.33/100.75 converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217289) {G2,W9,D4,L1,V1,M1} { composition( converse( X ), top )
% 100.33/100.75 ==> converse( composition( top, X ) ) }.
% 100.33/100.75 parent0[0]: (260) {G10,W4,D3,L1,V0,M1} P(235,230) { converse( top ) ==> top
% 100.33/100.75 }.
% 100.33/100.75 parent1[0; 7]: (217287) {G1,W10,D5,L1,V2,M1} { composition( converse( Y )
% 100.33/100.75 , X ) ==> converse( composition( converse( X ), Y ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := top
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (261) {G11,W9,D4,L1,V1,M1} P(260,18) { composition( converse(
% 100.33/100.75 X ), top ) ==> converse( composition( top, X ) ) }.
% 100.33/100.75 parent0: (217289) {G2,W9,D4,L1,V1,M1} { composition( converse( X ), top )
% 100.33/100.75 ==> converse( composition( top, X ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217293) {G1,W10,D5,L1,V2,M1} { composition( Y, converse( X ) )
% 100.33/100.75 ==> converse( composition( X, converse( Y ) ) ) }.
% 100.33/100.75 parent0[0]: (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 100.33/100.75 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217295) {G2,W9,D4,L1,V1,M1} { composition( top, converse( X ) )
% 100.33/100.75 ==> converse( composition( X, top ) ) }.
% 100.33/100.75 parent0[0]: (260) {G10,W4,D3,L1,V0,M1} P(235,230) { converse( top ) ==> top
% 100.33/100.75 }.
% 100.33/100.75 parent1[0; 8]: (217293) {G1,W10,D5,L1,V2,M1} { composition( Y, converse( X
% 100.33/100.75 ) ) ==> converse( composition( X, converse( Y ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := top
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (262) {G11,W9,D4,L1,V1,M1} P(260,17) { composition( top,
% 100.33/100.75 converse( X ) ) ==> converse( composition( X, top ) ) }.
% 100.33/100.75 parent0: (217295) {G2,W9,D4,L1,V1,M1} { composition( top, converse( X ) )
% 100.33/100.75 ==> converse( composition( X, top ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217298) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 100.33/100.75 join( X, Y ), Z ) }.
% 100.33/100.75 parent0[0]: (26) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 100.33/100.75 join( join( Y, Z ), X ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 Z := Z
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217299) {G2,W11,D4,L1,V3,M1} { join( join( X, Z ), Y ) = join(
% 100.33/100.75 join( Z, X ), Y ) }.
% 100.33/100.75 parent0[0]: (27) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X )
% 100.33/100.75 = join( join( Z, X ), Y ) }.
% 100.33/100.75 parent1[0; 1]: (217298) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) =
% 100.33/100.75 join( join( X, Y ), Z ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Z
% 100.33/100.75 Y := Y
% 100.33/100.75 Z := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := Z
% 100.33/100.75 Y := X
% 100.33/100.75 Z := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (268) {G2,W11,D4,L1,V3,M1} P(27,26) { join( join( Z, X ), Y )
% 100.33/100.75 = join( join( X, Z ), Y ) }.
% 100.33/100.75 parent0: (217299) {G2,W11,D4,L1,V3,M1} { join( join( X, Z ), Y ) = join(
% 100.33/100.75 join( Z, X ), Y ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Z
% 100.33/100.75 Y := Y
% 100.33/100.75 Z := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217331) {G2,W14,D7,L1,V3,M1} { join( join( join( complement(
% 100.33/100.75 join( X, Y ) ), X ), Z ), Y ) = join( top, Z ) }.
% 100.33/100.75 parent0[0]: (23) {G2,W10,D6,L1,V2,M1} P(1,15) { join( join( complement(
% 100.33/100.75 join( X, Y ) ), X ), Y ) ==> top }.
% 100.33/100.75 parent1[0; 12]: (27) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y )
% 100.33/100.75 , X ) = join( join( Z, X ), Y ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := Z
% 100.33/100.75 Z := join( complement( join( X, Y ) ), X )
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217332) {G3,W12,D7,L1,V3,M1} { join( join( join( complement(
% 100.33/100.75 join( X, Y ) ), X ), Z ), Y ) = top }.
% 100.33/100.75 parent0[0]: (230) {G7,W5,D3,L1,V1,M1} P(15,24);d(224) { join( top, X ) ==>
% 100.33/100.75 top }.
% 100.33/100.75 parent1[0; 11]: (217331) {G2,W14,D7,L1,V3,M1} { join( join( join(
% 100.33/100.75 complement( join( X, Y ) ), X ), Z ), Y ) = join( top, Z ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Z
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 Z := Z
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (270) {G8,W12,D7,L1,V3,M1} P(23,27);d(230) { join( join( join
% 100.33/100.75 ( complement( join( X, Y ) ), X ), Z ), Y ) ==> top }.
% 100.33/100.75 parent0: (217332) {G3,W12,D7,L1,V3,M1} { join( join( join( complement(
% 100.33/100.75 join( X, Y ) ), X ), Z ), Y ) = top }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 Z := Z
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217335) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ), Y ) ==>
% 100.33/100.75 join( composition( X, Y ), composition( Z, Y ) ) }.
% 100.33/100.75 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 100.33/100.75 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Z
% 100.33/100.75 Z := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217336) {G1,W15,D5,L1,V2,M1} { composition( join( converse( X )
% 100.33/100.75 , Y ), top ) ==> join( converse( composition( top, X ) ), composition( Y
% 100.33/100.75 , top ) ) }.
% 100.33/100.75 parent0[0]: (261) {G11,W9,D4,L1,V1,M1} P(260,18) { composition( converse( X
% 100.33/100.75 ), top ) ==> converse( composition( top, X ) ) }.
% 100.33/100.75 parent1[0; 8]: (217335) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ),
% 100.33/100.75 Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := converse( X )
% 100.33/100.75 Y := top
% 100.33/100.75 Z := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217338) {G1,W15,D5,L1,V2,M1} { join( converse( composition( top,
% 100.33/100.75 X ) ), composition( Y, top ) ) ==> composition( join( converse( X ), Y )
% 100.33/100.75 , top ) }.
% 100.33/100.75 parent0[0]: (217336) {G1,W15,D5,L1,V2,M1} { composition( join( converse( X
% 100.33/100.75 ), Y ), top ) ==> join( converse( composition( top, X ) ), composition(
% 100.33/100.75 Y, top ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (282) {G12,W15,D5,L1,V2,M1} P(261,6) { join( converse(
% 100.33/100.75 composition( top, X ) ), composition( Y, top ) ) ==> composition( join(
% 100.33/100.75 converse( X ), Y ), top ) }.
% 100.33/100.75 parent0: (217338) {G1,W15,D5,L1,V2,M1} { join( converse( composition( top
% 100.33/100.75 , X ) ), composition( Y, top ) ) ==> composition( join( converse( X ), Y
% 100.33/100.75 ), top ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217342) {G2,W8,D4,L1,V2,M1} { join( join( X, Y ), complement( Y
% 100.33/100.75 ) ) ==> top }.
% 100.33/100.75 parent0[0]: (233) {G8,W5,D3,L1,V1,M1} P(11,24);d(230) { join( X, top ) ==>
% 100.33/100.75 top }.
% 100.33/100.75 parent1[0; 7]: (28) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ),
% 100.33/100.75 complement( X ) ) ==> join( Y, top ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (296) {G9,W8,D4,L1,V2,M1} S(28);d(233) { join( join( Y, X ),
% 100.33/100.75 complement( X ) ) ==> top }.
% 100.33/100.75 parent0: (217342) {G2,W8,D4,L1,V2,M1} { join( join( X, Y ), complement( Y
% 100.33/100.75 ) ) ==> top }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217346) {G3,W8,D6,L1,V1,M1} { join( converse( complement(
% 100.33/100.75 converse( X ) ) ), X ) ==> top }.
% 100.33/100.75 parent0[0]: (260) {G10,W4,D3,L1,V0,M1} P(235,230) { converse( top ) ==> top
% 100.33/100.75 }.
% 100.33/100.75 parent1[0; 7]: (168) {G2,W9,D6,L1,V1,M1} P(15,21) { join( converse(
% 100.33/100.75 complement( converse( X ) ) ), X ) ==> converse( top ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (355) {G11,W8,D6,L1,V1,M1} S(168);d(260) { join( converse(
% 100.33/100.75 complement( converse( X ) ) ), X ) ==> top }.
% 100.33/100.75 parent0: (217346) {G3,W8,D6,L1,V1,M1} { join( converse( complement(
% 100.33/100.75 converse( X ) ) ), X ) ==> top }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217349) {G1,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join( X,
% 100.33/100.75 skol1 ), one ) }.
% 100.33/100.75 parent0[0]: (29) {G1,W9,D4,L1,V1,M1} P(13,1) { join( join( X, skol1 ), one
% 100.33/100.75 ) ==> join( X, one ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217353) {G2,W10,D6,L1,V0,M1} { join( converse( complement(
% 100.33/100.75 converse( skol1 ) ) ), one ) ==> join( top, one ) }.
% 100.33/100.75 parent0[0]: (355) {G11,W8,D6,L1,V1,M1} S(168);d(260) { join( converse(
% 100.33/100.75 complement( converse( X ) ) ), X ) ==> top }.
% 100.33/100.75 parent1[0; 8]: (217349) {G1,W9,D4,L1,V1,M1} { join( X, one ) ==> join(
% 100.33/100.75 join( X, skol1 ), one ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := skol1
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := converse( complement( converse( skol1 ) ) )
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217354) {G3,W8,D6,L1,V0,M1} { join( converse( complement(
% 100.33/100.75 converse( skol1 ) ) ), one ) ==> top }.
% 100.33/100.75 parent0[0]: (230) {G7,W5,D3,L1,V1,M1} P(15,24);d(224) { join( top, X ) ==>
% 100.33/100.75 top }.
% 100.33/100.75 parent1[0; 7]: (217353) {G2,W10,D6,L1,V0,M1} { join( converse( complement
% 100.33/100.75 ( converse( skol1 ) ) ), one ) ==> join( top, one ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := one
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217355) {G4,W8,D6,L1,V0,M1} { converse( join( complement(
% 100.33/100.75 converse( skol1 ) ), one ) ) ==> top }.
% 100.33/100.75 parent0[0]: (139) {G4,W9,D4,L1,V1,M1} P(136,8) { join( converse( X ), one )
% 100.33/100.75 ==> converse( join( X, one ) ) }.
% 100.33/100.75 parent1[0; 1]: (217354) {G3,W8,D6,L1,V0,M1} { join( converse( complement(
% 100.33/100.75 converse( skol1 ) ) ), one ) ==> top }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := complement( converse( skol1 ) )
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (364) {G12,W8,D6,L1,V0,M1} P(355,29);d(230);d(139) { converse
% 100.33/100.75 ( join( complement( converse( skol1 ) ), one ) ) ==> top }.
% 100.33/100.75 parent0: (217355) {G4,W8,D6,L1,V0,M1} { converse( join( complement(
% 100.33/100.75 converse( skol1 ) ), one ) ) ==> top }.
% 100.33/100.75 substitution0:
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217358) {G0,W5,D4,L1,V1,M1} { X ==> converse( converse( X ) ) }.
% 100.33/100.75 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217360) {G1,W8,D5,L1,V0,M1} { join( complement( converse( skol1
% 100.33/100.75 ) ), one ) ==> converse( top ) }.
% 100.33/100.75 parent0[0]: (364) {G12,W8,D6,L1,V0,M1} P(355,29);d(230);d(139) { converse(
% 100.33/100.75 join( complement( converse( skol1 ) ), one ) ) ==> top }.
% 100.33/100.75 parent1[0; 7]: (217358) {G0,W5,D4,L1,V1,M1} { X ==> converse( converse( X
% 100.33/100.75 ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := join( complement( converse( skol1 ) ), one )
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217361) {G2,W7,D5,L1,V0,M1} { join( complement( converse( skol1
% 100.33/100.75 ) ), one ) ==> top }.
% 100.33/100.75 parent0[0]: (260) {G10,W4,D3,L1,V0,M1} P(235,230) { converse( top ) ==> top
% 100.33/100.75 }.
% 100.33/100.75 parent1[0; 6]: (217360) {G1,W8,D5,L1,V0,M1} { join( complement( converse(
% 100.33/100.75 skol1 ) ), one ) ==> converse( top ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (383) {G13,W7,D5,L1,V0,M1} P(364,7);d(260) { join( complement
% 100.33/100.75 ( converse( skol1 ) ), one ) ==> top }.
% 100.33/100.75 parent0: (217361) {G2,W7,D5,L1,V0,M1} { join( complement( converse( skol1
% 100.33/100.75 ) ), one ) ==> top }.
% 100.33/100.75 substitution0:
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217365) {G3,W8,D6,L1,V1,M1} { join( X, converse( complement(
% 100.33/100.75 converse( X ) ) ) ) ==> top }.
% 100.33/100.75 parent0[0]: (260) {G10,W4,D3,L1,V0,M1} P(235,230) { converse( top ) ==> top
% 100.33/100.75 }.
% 100.33/100.75 parent1[0; 7]: (156) {G2,W9,D6,L1,V1,M1} P(11,20) { join( X, converse(
% 100.33/100.75 complement( converse( X ) ) ) ) ==> converse( top ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (404) {G11,W8,D6,L1,V1,M1} S(156);d(260) { join( X, converse(
% 100.33/100.75 complement( converse( X ) ) ) ) ==> top }.
% 100.33/100.75 parent0: (217365) {G3,W8,D6,L1,V1,M1} { join( X, converse( complement(
% 100.33/100.75 converse( X ) ) ) ) ==> top }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217369) {G4,W8,D4,L1,V2,M1} { join( join( X, Y ), complement( X
% 100.33/100.75 ) ) ==> top }.
% 100.33/100.75 parent0[0]: (233) {G8,W5,D3,L1,V1,M1} P(11,24);d(230) { join( X, top ) ==>
% 100.33/100.75 top }.
% 100.33/100.75 parent1[0; 7]: (231) {G3,W10,D4,L1,V2,M1} P(24,0);d(1) { join( join( Y, X )
% 100.33/100.75 , complement( Y ) ) ==> join( X, top ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Y
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (413) {G9,W8,D4,L1,V2,M1} S(231);d(233) { join( join( Y, X ),
% 100.33/100.75 complement( Y ) ) ==> top }.
% 100.33/100.75 parent0: (217369) {G4,W8,D4,L1,V2,M1} { join( join( X, Y ), complement( X
% 100.33/100.75 ) ) ==> top }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217372) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 100.33/100.75 complement( join( complement( X ), Y ) ) ) }.
% 100.33/100.75 parent0[0]: (43) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 100.33/100.75 complement( join( complement( X ), Y ) ) ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217375) {G2,W10,D5,L1,V1,M1} { X ==> join( meet( X, converse(
% 100.33/100.75 top ) ), complement( converse( top ) ) ) }.
% 100.33/100.75 parent0[0]: (235) {G9,W7,D4,L1,V1,M1} P(233,20) { join( X, converse( top )
% 100.33/100.75 ) ==> converse( top ) }.
% 100.33/100.75 parent1[0; 8]: (217372) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 100.33/100.75 complement( join( complement( X ), Y ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := complement( X )
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := converse( top )
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217377) {G3,W9,D5,L1,V1,M1} { X ==> join( meet( X, converse( top
% 100.33/100.75 ) ), complement( top ) ) }.
% 100.33/100.75 parent0[0]: (260) {G10,W4,D3,L1,V0,M1} P(235,230) { converse( top ) ==> top
% 100.33/100.75 }.
% 100.33/100.75 parent1[0; 8]: (217375) {G2,W10,D5,L1,V1,M1} { X ==> join( meet( X,
% 100.33/100.75 converse( top ) ), complement( converse( top ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217378) {G4,W8,D4,L1,V1,M1} { X ==> join( meet( X, top ),
% 100.33/100.75 complement( top ) ) }.
% 100.33/100.75 parent0[0]: (260) {G10,W4,D3,L1,V0,M1} P(235,230) { converse( top ) ==> top
% 100.33/100.75 }.
% 100.33/100.75 parent1[0; 5]: (217377) {G3,W9,D5,L1,V1,M1} { X ==> join( meet( X,
% 100.33/100.75 converse( top ) ), complement( top ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217381) {G2,W7,D4,L1,V1,M1} { X ==> join( meet( X, top ), zero )
% 100.33/100.75 }.
% 100.33/100.75 parent0[0]: (58) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 100.33/100.75 zero }.
% 100.33/100.75 parent1[0; 6]: (217378) {G4,W8,D4,L1,V1,M1} { X ==> join( meet( X, top ),
% 100.33/100.75 complement( top ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217382) {G2,W7,D4,L1,V1,M1} { join( meet( X, top ), zero ) ==> X
% 100.33/100.75 }.
% 100.33/100.75 parent0[0]: (217381) {G2,W7,D4,L1,V1,M1} { X ==> join( meet( X, top ),
% 100.33/100.75 zero ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (418) {G11,W7,D4,L1,V1,M1} P(235,43);d(260);d(58) { join( meet
% 100.33/100.75 ( X, top ), zero ) ==> X }.
% 100.33/100.75 parent0: (217382) {G2,W7,D4,L1,V1,M1} { join( meet( X, top ), zero ) ==> X
% 100.33/100.75 }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217384) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 100.33/100.75 complement( join( complement( X ), Y ) ) ) }.
% 100.33/100.75 parent0[0]: (43) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 100.33/100.75 complement( join( complement( X ), Y ) ) ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217385) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement(
% 100.33/100.75 Y ) ), meet( X, Y ) ) }.
% 100.33/100.75 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 100.33/100.75 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 100.33/100.75 parent1[0; 7]: (217384) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 100.33/100.75 complement( join( complement( X ), Y ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := complement( Y )
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217387) {G1,W10,D5,L1,V2,M1} { join( meet( X, complement( Y ) ),
% 100.33/100.75 meet( X, Y ) ) ==> X }.
% 100.33/100.75 parent0[0]: (217385) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( X,
% 100.33/100.75 complement( Y ) ), meet( X, Y ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (432) {G2,W10,D5,L1,V2,M1} P(3,43) { join( meet( X, complement
% 100.33/100.75 ( Y ) ), meet( X, Y ) ) ==> X }.
% 100.33/100.75 parent0: (217387) {G1,W10,D5,L1,V2,M1} { join( meet( X, complement( Y ) )
% 100.33/100.75 , meet( X, Y ) ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217390) {G7,W9,D4,L1,V1,M1} { join( X, zero ) ==> join( join( X,
% 100.33/100.75 zero ), zero ) }.
% 100.33/100.75 parent0[0]: (158) {G7,W9,D4,L1,V1,M1} P(145,1) { join( join( X, zero ),
% 100.33/100.75 zero ) ==> join( X, zero ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217392) {G8,W9,D4,L1,V1,M1} { join( meet( X, top ), zero ) ==>
% 100.33/100.75 join( X, zero ) }.
% 100.33/100.75 parent0[0]: (418) {G11,W7,D4,L1,V1,M1} P(235,43);d(260);d(58) { join( meet
% 100.33/100.75 ( X, top ), zero ) ==> X }.
% 100.33/100.75 parent1[0; 7]: (217390) {G7,W9,D4,L1,V1,M1} { join( X, zero ) ==> join(
% 100.33/100.75 join( X, zero ), zero ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := meet( X, top )
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217393) {G9,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 100.33/100.75 parent0[0]: (418) {G11,W7,D4,L1,V1,M1} P(235,43);d(260);d(58) { join( meet
% 100.33/100.75 ( X, top ), zero ) ==> X }.
% 100.33/100.75 parent1[0; 1]: (217392) {G8,W9,D4,L1,V1,M1} { join( meet( X, top ), zero )
% 100.33/100.75 ==> join( X, zero ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217395) {G9,W5,D3,L1,V1,M1} { join( X, zero ) ==> X }.
% 100.33/100.75 parent0[0]: (217393) {G9,W5,D3,L1,V1,M1} { X ==> join( X, zero ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (450) {G12,W5,D3,L1,V1,M1} P(418,158) { join( X, zero ) ==> X
% 100.33/100.75 }.
% 100.33/100.75 parent0: (217395) {G9,W5,D3,L1,V1,M1} { join( X, zero ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217397) {G6,W7,D4,L1,V1,M1} { meet( X, X ) = complement(
% 100.33/100.75 complement( X ) ) }.
% 100.33/100.75 parent0[0]: (146) {G6,W7,D4,L1,V1,M1} P(140,3) { complement( complement( X
% 100.33/100.75 ) ) = meet( X, X ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217398) {G11,W7,D4,L1,V1,M1} { X ==> join( meet( X, top ), zero )
% 100.33/100.75 }.
% 100.33/100.75 parent0[0]: (418) {G11,W7,D4,L1,V1,M1} P(235,43);d(260);d(58) { join( meet
% 100.33/100.75 ( X, top ), zero ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217401) {G7,W7,D5,L1,V0,M1} { top ==> join( complement(
% 100.33/100.75 complement( top ) ), zero ) }.
% 100.33/100.75 parent0[0]: (217397) {G6,W7,D4,L1,V1,M1} { meet( X, X ) = complement(
% 100.33/100.75 complement( X ) ) }.
% 100.33/100.75 parent1[0; 3]: (217398) {G11,W7,D4,L1,V1,M1} { X ==> join( meet( X, top )
% 100.33/100.75 , zero ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := top
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := top
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217402) {G8,W5,D4,L1,V0,M1} { top ==> complement( complement(
% 100.33/100.75 top ) ) }.
% 100.33/100.75 parent0[0]: (450) {G12,W5,D3,L1,V1,M1} P(418,158) { join( X, zero ) ==> X
% 100.33/100.75 }.
% 100.33/100.75 parent1[0; 2]: (217401) {G7,W7,D5,L1,V0,M1} { top ==> join( complement(
% 100.33/100.75 complement( top ) ), zero ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := complement( complement( top ) )
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217403) {G2,W4,D3,L1,V0,M1} { top ==> complement( zero ) }.
% 100.33/100.75 parent0[0]: (58) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 100.33/100.75 zero }.
% 100.33/100.75 parent1[0; 3]: (217402) {G8,W5,D4,L1,V0,M1} { top ==> complement(
% 100.33/100.75 complement( top ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217404) {G2,W4,D3,L1,V0,M1} { complement( zero ) ==> top }.
% 100.33/100.75 parent0[0]: (217403) {G2,W4,D3,L1,V0,M1} { top ==> complement( zero ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (451) {G13,W4,D3,L1,V0,M1} P(146,418);d(450);d(58) {
% 100.33/100.75 complement( zero ) ==> top }.
% 100.33/100.75 parent0: (217404) {G2,W4,D3,L1,V0,M1} { complement( zero ) ==> top }.
% 100.33/100.75 substitution0:
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217405) {G11,W7,D4,L1,V1,M1} { X ==> join( meet( X, top ), zero )
% 100.33/100.75 }.
% 100.33/100.75 parent0[0]: (418) {G11,W7,D4,L1,V1,M1} P(235,43);d(260);d(58) { join( meet
% 100.33/100.75 ( X, top ), zero ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217407) {G2,W7,D4,L1,V1,M1} { X ==> join( meet( top, X ), zero )
% 100.33/100.75 }.
% 100.33/100.75 parent0[0]: (56) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 100.33/100.75 Y ) }.
% 100.33/100.75 parent1[0; 3]: (217405) {G11,W7,D4,L1,V1,M1} { X ==> join( meet( X, top )
% 100.33/100.75 , zero ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := top
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217409) {G3,W5,D3,L1,V1,M1} { X ==> meet( top, X ) }.
% 100.33/100.75 parent0[0]: (450) {G12,W5,D3,L1,V1,M1} P(418,158) { join( X, zero ) ==> X
% 100.33/100.75 }.
% 100.33/100.75 parent1[0; 2]: (217407) {G2,W7,D4,L1,V1,M1} { X ==> join( meet( top, X ),
% 100.33/100.75 zero ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := meet( top, X )
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217410) {G3,W5,D3,L1,V1,M1} { meet( top, X ) ==> X }.
% 100.33/100.75 parent0[0]: (217409) {G3,W5,D3,L1,V1,M1} { X ==> meet( top, X ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (452) {G13,W5,D3,L1,V1,M1} P(56,418);d(450) { meet( top, X )
% 100.33/100.75 ==> X }.
% 100.33/100.75 parent0: (217410) {G3,W5,D3,L1,V1,M1} { meet( top, X ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217412) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z ) ==> join(
% 100.33/100.75 X, join( Y, Z ) ) }.
% 100.33/100.75 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.33/100.75 join( X, Y ), Z ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 Z := Z
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217415) {G1,W11,D5,L1,V2,M1} { join( join( X, meet( Y, top ) ),
% 100.33/100.75 zero ) ==> join( X, Y ) }.
% 100.33/100.75 parent0[0]: (418) {G11,W7,D4,L1,V1,M1} P(235,43);d(260);d(58) { join( meet
% 100.33/100.75 ( X, top ), zero ) ==> X }.
% 100.33/100.75 parent1[0; 10]: (217412) {G0,W11,D4,L1,V3,M1} { join( join( X, Y ), Z )
% 100.33/100.75 ==> join( X, join( Y, Z ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Y
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := meet( Y, top )
% 100.33/100.75 Z := zero
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217416) {G2,W9,D4,L1,V2,M1} { join( X, meet( Y, top ) ) ==> join
% 100.33/100.75 ( X, Y ) }.
% 100.33/100.75 parent0[0]: (450) {G12,W5,D3,L1,V1,M1} P(418,158) { join( X, zero ) ==> X
% 100.33/100.75 }.
% 100.33/100.75 parent1[0; 1]: (217415) {G1,W11,D5,L1,V2,M1} { join( join( X, meet( Y, top
% 100.33/100.75 ) ), zero ) ==> join( X, Y ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := join( X, meet( Y, top ) )
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (454) {G13,W9,D4,L1,V2,M1} P(418,1);d(450) { join( Y, meet( X
% 100.33/100.75 , top ) ) ==> join( Y, X ) }.
% 100.33/100.75 parent0: (217416) {G2,W9,D4,L1,V2,M1} { join( X, meet( Y, top ) ) ==> join
% 100.33/100.75 ( X, Y ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217418) {G11,W7,D4,L1,V1,M1} { X ==> join( meet( X, top ), zero )
% 100.33/100.75 }.
% 100.33/100.75 parent0[0]: (418) {G11,W7,D4,L1,V1,M1} P(235,43);d(260);d(58) { join( meet
% 100.33/100.75 ( X, top ), zero ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217420) {G1,W7,D4,L1,V1,M1} { X ==> join( zero, meet( X, top ) )
% 100.33/100.75 }.
% 100.33/100.75 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.75 parent1[0; 2]: (217418) {G11,W7,D4,L1,V1,M1} { X ==> join( meet( X, top )
% 100.33/100.75 , zero ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := meet( X, top )
% 100.33/100.75 Y := zero
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217422) {G2,W5,D3,L1,V1,M1} { X ==> join( zero, X ) }.
% 100.33/100.75 parent0[0]: (454) {G13,W9,D4,L1,V2,M1} P(418,1);d(450) { join( Y, meet( X,
% 100.33/100.75 top ) ) ==> join( Y, X ) }.
% 100.33/100.75 parent1[0; 2]: (217420) {G1,W7,D4,L1,V1,M1} { X ==> join( zero, meet( X,
% 100.33/100.75 top ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := zero
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217423) {G2,W5,D3,L1,V1,M1} { join( zero, X ) ==> X }.
% 100.33/100.75 parent0[0]: (217422) {G2,W5,D3,L1,V1,M1} { X ==> join( zero, X ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (455) {G14,W5,D3,L1,V1,M1} P(418,0);d(454) { join( zero, X )
% 100.33/100.75 ==> X }.
% 100.33/100.75 parent0: (217423) {G2,W5,D3,L1,V1,M1} { join( zero, X ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217425) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 100.33/100.75 ( complement( X ), complement( Y ) ) ) }.
% 100.33/100.75 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 100.33/100.75 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217429) {G1,W9,D5,L1,V1,M1} { meet( X, zero ) ==> complement(
% 100.33/100.75 join( complement( X ), top ) ) }.
% 100.33/100.75 parent0[0]: (451) {G13,W4,D3,L1,V0,M1} P(146,418);d(450);d(58) { complement
% 100.33/100.75 ( zero ) ==> top }.
% 100.33/100.75 parent1[0; 8]: (217425) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 100.33/100.75 ( join( complement( X ), complement( Y ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := zero
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217430) {G2,W6,D3,L1,V1,M1} { meet( X, zero ) ==> complement(
% 100.33/100.75 top ) }.
% 100.33/100.75 parent0[0]: (233) {G8,W5,D3,L1,V1,M1} P(11,24);d(230) { join( X, top ) ==>
% 100.33/100.75 top }.
% 100.33/100.75 parent1[0; 5]: (217429) {G1,W9,D5,L1,V1,M1} { meet( X, zero ) ==>
% 100.33/100.75 complement( join( complement( X ), top ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := complement( X )
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217431) {G2,W5,D3,L1,V1,M1} { meet( X, zero ) ==> zero }.
% 100.33/100.75 parent0[0]: (58) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 100.33/100.75 zero }.
% 100.33/100.75 parent1[0; 4]: (217430) {G2,W6,D3,L1,V1,M1} { meet( X, zero ) ==>
% 100.33/100.75 complement( top ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (457) {G14,W5,D3,L1,V1,M1} P(451,3);d(233);d(58) { meet( X,
% 100.33/100.75 zero ) ==> zero }.
% 100.33/100.75 parent0: (217431) {G2,W5,D3,L1,V1,M1} { meet( X, zero ) ==> zero }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217434) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 100.33/100.75 complement( join( complement( X ), Y ) ) ) }.
% 100.33/100.75 parent0[0]: (43) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 100.33/100.75 complement( join( complement( X ), Y ) ) ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217437) {G2,W9,D6,L1,V1,M1} { X ==> join( zero, complement( join
% 100.33/100.75 ( complement( X ), zero ) ) ) }.
% 100.33/100.75 parent0[0]: (457) {G14,W5,D3,L1,V1,M1} P(451,3);d(233);d(58) { meet( X,
% 100.33/100.75 zero ) ==> zero }.
% 100.33/100.75 parent1[0; 3]: (217434) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 100.33/100.75 complement( join( complement( X ), Y ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := zero
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217438) {G3,W7,D5,L1,V1,M1} { X ==> complement( join( complement
% 100.33/100.75 ( X ), zero ) ) }.
% 100.33/100.75 parent0[0]: (455) {G14,W5,D3,L1,V1,M1} P(418,0);d(454) { join( zero, X )
% 100.33/100.75 ==> X }.
% 100.33/100.75 parent1[0; 2]: (217437) {G2,W9,D6,L1,V1,M1} { X ==> join( zero, complement
% 100.33/100.75 ( join( complement( X ), zero ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := complement( join( complement( X ), zero ) )
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217439) {G3,W5,D3,L1,V1,M1} { X ==> meet( X, top ) }.
% 100.33/100.75 parent0[0]: (60) {G2,W9,D5,L1,V1,M1} P(58,3) { complement( join( complement
% 100.33/100.75 ( X ), zero ) ) ==> meet( X, top ) }.
% 100.33/100.75 parent1[0; 2]: (217438) {G3,W7,D5,L1,V1,M1} { X ==> complement( join(
% 100.33/100.75 complement( X ), zero ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217440) {G3,W5,D3,L1,V1,M1} { meet( X, top ) ==> X }.
% 100.33/100.75 parent0[0]: (217439) {G3,W5,D3,L1,V1,M1} { X ==> meet( X, top ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (458) {G15,W5,D3,L1,V1,M1} P(457,43);d(455);d(60) { meet( X,
% 100.33/100.75 top ) ==> X }.
% 100.33/100.75 parent0: (217440) {G3,W5,D3,L1,V1,M1} { meet( X, top ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217442) {G2,W9,D5,L1,V1,M1} { meet( X, top ) ==> complement( join
% 100.33/100.75 ( complement( X ), zero ) ) }.
% 100.33/100.75 parent0[0]: (60) {G2,W9,D5,L1,V1,M1} P(58,3) { complement( join( complement
% 100.33/100.75 ( X ), zero ) ) ==> meet( X, top ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217444) {G3,W7,D4,L1,V1,M1} { meet( X, top ) ==> complement(
% 100.33/100.75 complement( X ) ) }.
% 100.33/100.75 parent0[0]: (450) {G12,W5,D3,L1,V1,M1} P(418,158) { join( X, zero ) ==> X
% 100.33/100.75 }.
% 100.33/100.75 parent1[0; 5]: (217442) {G2,W9,D5,L1,V1,M1} { meet( X, top ) ==>
% 100.33/100.75 complement( join( complement( X ), zero ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := complement( X )
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217445) {G4,W5,D4,L1,V1,M1} { X ==> complement( complement( X )
% 100.33/100.75 ) }.
% 100.33/100.75 parent0[0]: (458) {G15,W5,D3,L1,V1,M1} P(457,43);d(455);d(60) { meet( X,
% 100.33/100.75 top ) ==> X }.
% 100.33/100.75 parent1[0; 1]: (217444) {G3,W7,D4,L1,V1,M1} { meet( X, top ) ==>
% 100.33/100.75 complement( complement( X ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217446) {G4,W5,D4,L1,V1,M1} { complement( complement( X ) ) ==> X
% 100.33/100.75 }.
% 100.33/100.75 parent0[0]: (217445) {G4,W5,D4,L1,V1,M1} { X ==> complement( complement( X
% 100.33/100.75 ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.75 complement( X ) ) ==> X }.
% 100.33/100.75 parent0: (217446) {G4,W5,D4,L1,V1,M1} { complement( complement( X ) ) ==>
% 100.33/100.75 X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217448) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y ) ==>
% 100.33/100.75 converse( join( X, converse( Y ) ) ) }.
% 100.33/100.75 parent0[0]: (21) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 100.33/100.75 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217450) {G2,W8,D4,L1,V1,M1} { join( converse( zero ), X ) ==>
% 100.33/100.75 converse( converse( X ) ) }.
% 100.33/100.75 parent0[0]: (455) {G14,W5,D3,L1,V1,M1} P(418,0);d(454) { join( zero, X )
% 100.33/100.75 ==> X }.
% 100.33/100.75 parent1[0; 6]: (217448) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y )
% 100.33/100.75 ==> converse( join( X, converse( Y ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := converse( X )
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := zero
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217451) {G1,W6,D4,L1,V1,M1} { join( converse( zero ), X ) ==> X
% 100.33/100.75 }.
% 100.33/100.75 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 100.33/100.75 parent1[0; 5]: (217450) {G2,W8,D4,L1,V1,M1} { join( converse( zero ), X )
% 100.33/100.75 ==> converse( converse( X ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (462) {G15,W6,D4,L1,V1,M1} P(455,21);d(7) { join( converse(
% 100.33/100.75 zero ), X ) ==> X }.
% 100.33/100.75 parent0: (217451) {G1,W6,D4,L1,V1,M1} { join( converse( zero ), X ) ==> X
% 100.33/100.75 }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217453) {G16,W5,D4,L1,V1,M1} { X ==> complement( complement( X )
% 100.33/100.75 ) }.
% 100.33/100.75 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.75 complement( X ) ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217455) {G7,W5,D3,L1,V1,M1} { X ==> meet( X, X ) }.
% 100.33/100.75 parent0[0]: (146) {G6,W7,D4,L1,V1,M1} P(140,3) { complement( complement( X
% 100.33/100.75 ) ) = meet( X, X ) }.
% 100.33/100.75 parent1[0; 2]: (217453) {G16,W5,D4,L1,V1,M1} { X ==> complement(
% 100.33/100.75 complement( X ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217457) {G7,W5,D3,L1,V1,M1} { meet( X, X ) ==> X }.
% 100.33/100.75 parent0[0]: (217455) {G7,W5,D3,L1,V1,M1} { X ==> meet( X, X ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (468) {G17,W5,D3,L1,V1,M1} P(460,146) { meet( X, X ) ==> X }.
% 100.33/100.75 parent0: (217457) {G7,W5,D3,L1,V1,M1} { meet( X, X ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217460) {G5,W8,D4,L1,V1,M1} { complement( X ) ==> join(
% 100.33/100.75 complement( X ), complement( X ) ) }.
% 100.33/100.75 parent0[0]: (140) {G5,W8,D4,L1,V1,M1} P(137,10);d(130) { join( complement(
% 100.33/100.75 X ), complement( X ) ) ==> complement( X ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217463) {G6,W9,D5,L1,V1,M1} { complement( complement( X ) ) ==>
% 100.33/100.75 join( complement( complement( X ) ), X ) }.
% 100.33/100.75 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.75 complement( X ) ) ==> X }.
% 100.33/100.75 parent1[0; 8]: (217460) {G5,W8,D4,L1,V1,M1} { complement( X ) ==> join(
% 100.33/100.75 complement( X ), complement( X ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := complement( X )
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217465) {G7,W7,D4,L1,V1,M1} { complement( complement( X ) ) ==>
% 100.33/100.75 join( X, X ) }.
% 100.33/100.75 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.75 complement( X ) ) ==> X }.
% 100.33/100.75 parent1[0; 5]: (217463) {G6,W9,D5,L1,V1,M1} { complement( complement( X )
% 100.33/100.75 ) ==> join( complement( complement( X ) ), X ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217466) {G8,W5,D3,L1,V1,M1} { X ==> join( X, X ) }.
% 100.33/100.75 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.75 complement( X ) ) ==> X }.
% 100.33/100.75 parent1[0; 1]: (217465) {G7,W7,D4,L1,V1,M1} { complement( complement( X )
% 100.33/100.75 ) ==> join( X, X ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217472) {G8,W5,D3,L1,V1,M1} { join( X, X ) ==> X }.
% 100.33/100.75 parent0[0]: (217466) {G8,W5,D3,L1,V1,M1} { X ==> join( X, X ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (469) {G17,W5,D3,L1,V1,M1} P(460,140) { join( X, X ) ==> X }.
% 100.33/100.75 parent0: (217472) {G8,W5,D3,L1,V1,M1} { join( X, X ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217476) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 100.33/100.75 composition( converse( X ), complement( composition( X, Y ) ) ),
% 100.33/100.75 complement( Y ) ) }.
% 100.33/100.75 parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 100.33/100.75 , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement(
% 100.33/100.75 Y ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217478) {G1,W14,D7,L1,V2,M1} { complement( complement( X ) ) ==>
% 100.33/100.75 join( composition( converse( Y ), complement( composition( Y, complement
% 100.33/100.75 ( X ) ) ) ), X ) }.
% 100.33/100.75 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.75 complement( X ) ) ==> X }.
% 100.33/100.75 parent1[0; 13]: (217476) {G0,W13,D6,L1,V2,M1} { complement( Y ) ==> join(
% 100.33/100.75 composition( converse( X ), complement( composition( X, Y ) ) ),
% 100.33/100.75 complement( Y ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := complement( X )
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217479) {G2,W12,D7,L1,V2,M1} { X ==> join( composition( converse
% 100.33/100.75 ( Y ), complement( composition( Y, complement( X ) ) ) ), X ) }.
% 100.33/100.75 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.75 complement( X ) ) ==> X }.
% 100.33/100.75 parent1[0; 1]: (217478) {G1,W14,D7,L1,V2,M1} { complement( complement( X )
% 100.33/100.75 ) ==> join( composition( converse( Y ), complement( composition( Y,
% 100.33/100.75 complement( X ) ) ) ), X ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217481) {G2,W12,D7,L1,V2,M1} { join( composition( converse( Y ),
% 100.33/100.75 complement( composition( Y, complement( X ) ) ) ), X ) ==> X }.
% 100.33/100.75 parent0[0]: (217479) {G2,W12,D7,L1,V2,M1} { X ==> join( composition(
% 100.33/100.75 converse( Y ), complement( composition( Y, complement( X ) ) ) ), X ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (470) {G17,W12,D7,L1,V2,M1} P(460,10) { join( composition(
% 100.33/100.75 converse( Y ), complement( composition( Y, complement( X ) ) ) ), X ) ==>
% 100.33/100.75 X }.
% 100.33/100.75 parent0: (217481) {G2,W12,D7,L1,V2,M1} { join( composition( converse( Y )
% 100.33/100.75 , complement( composition( Y, complement( X ) ) ) ), X ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217484) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 100.33/100.75 ( complement( X ), complement( Y ) ) ) }.
% 100.33/100.75 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 100.33/100.75 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217487) {G1,W10,D5,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 100.33/100.75 complement( join( X, complement( Y ) ) ) }.
% 100.33/100.75 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.75 complement( X ) ) ==> X }.
% 100.33/100.75 parent1[0; 7]: (217484) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 100.33/100.75 ( join( complement( X ), complement( Y ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := complement( X )
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217489) {G1,W10,D5,L1,V2,M1} { complement( join( X, complement( Y
% 100.33/100.75 ) ) ) ==> meet( complement( X ), Y ) }.
% 100.33/100.75 parent0[0]: (217487) {G1,W10,D5,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 100.33/100.75 complement( join( X, complement( Y ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (471) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( X,
% 100.33/100.75 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 100.33/100.75 parent0: (217489) {G1,W10,D5,L1,V2,M1} { complement( join( X, complement(
% 100.33/100.75 Y ) ) ) ==> meet( complement( X ), Y ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217492) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 100.33/100.75 ( complement( X ), complement( Y ) ) ) }.
% 100.33/100.75 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 100.33/100.75 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217496) {G1,W10,D5,L1,V2,M1} { meet( X, complement( Y ) ) ==>
% 100.33/100.75 complement( join( complement( X ), Y ) ) }.
% 100.33/100.75 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.75 complement( X ) ) ==> X }.
% 100.33/100.75 parent1[0; 9]: (217492) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 100.33/100.75 ( join( complement( X ), complement( Y ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Y
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := complement( Y )
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217498) {G1,W10,D5,L1,V2,M1} { complement( join( complement( X )
% 100.33/100.75 , Y ) ) ==> meet( X, complement( Y ) ) }.
% 100.33/100.75 parent0[0]: (217496) {G1,W10,D5,L1,V2,M1} { meet( X, complement( Y ) ) ==>
% 100.33/100.75 complement( join( complement( X ), Y ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (472) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join(
% 100.33/100.75 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 100.33/100.75 parent0: (217498) {G1,W10,D5,L1,V2,M1} { complement( join( complement( X )
% 100.33/100.75 , Y ) ) ==> meet( X, complement( Y ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217500) {G16,W5,D4,L1,V1,M1} { X ==> complement( complement( X )
% 100.33/100.75 ) }.
% 100.33/100.75 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.75 complement( X ) ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217505) {G1,W10,D4,L1,V2,M1} { join( complement( X ), complement
% 100.33/100.75 ( Y ) ) ==> complement( meet( X, Y ) ) }.
% 100.33/100.75 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 100.33/100.75 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 100.33/100.75 parent1[0; 7]: (217500) {G16,W5,D4,L1,V1,M1} { X ==> complement(
% 100.33/100.75 complement( X ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := join( complement( X ), complement( Y ) )
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (473) {G17,W10,D4,L1,V2,M1} P(3,460) { join( complement( X ),
% 100.33/100.75 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 100.33/100.75 parent0: (217505) {G1,W10,D4,L1,V2,M1} { join( complement( X ), complement
% 100.33/100.75 ( Y ) ) ==> complement( meet( X, Y ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217507) {G17,W5,D3,L1,V1,M1} { X ==> join( X, X ) }.
% 100.33/100.75 parent0[0]: (469) {G17,W5,D3,L1,V1,M1} P(460,140) { join( X, X ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217510) {G2,W11,D5,L1,V2,M1} { join( X, Y ) ==> join( join( X,
% 100.33/100.75 join( X, Y ) ), Y ) }.
% 100.33/100.75 parent0[0]: (27) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X )
% 100.33/100.75 = join( join( Z, X ), Y ) }.
% 100.33/100.75 parent1[0; 4]: (217507) {G17,W5,D3,L1,V1,M1} { X ==> join( X, X ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := join( X, Y )
% 100.33/100.75 Y := Y
% 100.33/100.75 Z := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := join( X, Y )
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217512) {G1,W11,D5,L1,V2,M1} { join( X, Y ) ==> join( join( join
% 100.33/100.75 ( X, X ), Y ), Y ) }.
% 100.33/100.75 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.33/100.75 join( X, Y ), Z ) }.
% 100.33/100.75 parent1[0; 5]: (217510) {G2,W11,D5,L1,V2,M1} { join( X, Y ) ==> join( join
% 100.33/100.75 ( X, join( X, Y ) ), Y ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := X
% 100.33/100.75 Z := Y
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217513) {G2,W9,D4,L1,V2,M1} { join( X, Y ) ==> join( join( X, Y
% 100.33/100.75 ), Y ) }.
% 100.33/100.75 parent0[0]: (469) {G17,W5,D3,L1,V1,M1} P(460,140) { join( X, X ) ==> X }.
% 100.33/100.75 parent1[0; 6]: (217512) {G1,W11,D5,L1,V2,M1} { join( X, Y ) ==> join( join
% 100.33/100.75 ( join( X, X ), Y ), Y ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217514) {G2,W9,D4,L1,V2,M1} { join( join( X, Y ), Y ) ==> join( X
% 100.33/100.75 , Y ) }.
% 100.33/100.75 parent0[0]: (217513) {G2,W9,D4,L1,V2,M1} { join( X, Y ) ==> join( join( X
% 100.33/100.75 , Y ), Y ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (478) {G18,W9,D4,L1,V2,M1} P(469,27);d(1);d(469) { join( join
% 100.33/100.75 ( X, Y ), Y ) ==> join( X, Y ) }.
% 100.33/100.75 parent0: (217514) {G2,W9,D4,L1,V2,M1} { join( join( X, Y ), Y ) ==> join(
% 100.33/100.75 X, Y ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217523) {G2,W9,D4,L1,V2,M1} { join( join( X, Y ), X ) = join( X
% 100.33/100.75 , Y ) }.
% 100.33/100.75 parent0[0]: (469) {G17,W5,D3,L1,V1,M1} P(460,140) { join( X, X ) ==> X }.
% 100.33/100.75 parent1[0; 7]: (27) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ),
% 100.33/100.75 X ) = join( join( Z, X ), Y ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 Z := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (479) {G18,W9,D4,L1,V2,M1} P(469,27) { join( join( X, Y ), X )
% 100.33/100.75 ==> join( X, Y ) }.
% 100.33/100.75 parent0: (217523) {G2,W9,D4,L1,V2,M1} { join( join( X, Y ), X ) = join( X
% 100.33/100.75 , Y ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217524) {G15,W6,D4,L1,V1,M1} { X ==> join( converse( zero ), X )
% 100.33/100.75 }.
% 100.33/100.75 parent0[0]: (462) {G15,W6,D4,L1,V1,M1} P(455,21);d(7) { join( converse(
% 100.33/100.75 zero ), X ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217526) {G13,W4,D3,L1,V0,M1} { zero ==> converse( zero ) }.
% 100.33/100.75 parent0[0]: (450) {G12,W5,D3,L1,V1,M1} P(418,158) { join( X, zero ) ==> X
% 100.33/100.75 }.
% 100.33/100.75 parent1[0; 2]: (217524) {G15,W6,D4,L1,V1,M1} { X ==> join( converse( zero
% 100.33/100.75 ), X ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := converse( zero )
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := zero
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217527) {G13,W4,D3,L1,V0,M1} { converse( zero ) ==> zero }.
% 100.33/100.75 parent0[0]: (217526) {G13,W4,D3,L1,V0,M1} { zero ==> converse( zero ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (480) {G16,W4,D3,L1,V0,M1} P(462,450) { converse( zero ) ==>
% 100.33/100.75 zero }.
% 100.33/100.75 parent0: (217527) {G13,W4,D3,L1,V0,M1} { converse( zero ) ==> zero }.
% 100.33/100.75 substitution0:
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217529) {G9,W8,D4,L1,V2,M1} { top ==> join( join( X, Y ),
% 100.33/100.75 complement( X ) ) }.
% 100.33/100.75 parent0[0]: (413) {G9,W8,D4,L1,V2,M1} S(231);d(233) { join( join( Y, X ),
% 100.33/100.75 complement( Y ) ) ==> top }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217530) {G2,W8,D5,L1,V2,M1} { top ==> join( X, complement( meet
% 100.33/100.75 ( X, Y ) ) ) }.
% 100.33/100.75 parent0[0]: (43) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 100.33/100.75 complement( join( complement( X ), Y ) ) ) ==> X }.
% 100.33/100.75 parent1[0; 3]: (217529) {G9,W8,D4,L1,V2,M1} { top ==> join( join( X, Y ),
% 100.33/100.75 complement( X ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := meet( X, Y )
% 100.33/100.75 Y := complement( join( complement( X ), Y ) )
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217531) {G2,W8,D5,L1,V2,M1} { join( X, complement( meet( X, Y ) )
% 100.33/100.75 ) ==> top }.
% 100.33/100.75 parent0[0]: (217530) {G2,W8,D5,L1,V2,M1} { top ==> join( X, complement(
% 100.33/100.75 meet( X, Y ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (490) {G10,W8,D5,L1,V2,M1} P(43,413) { join( X, complement(
% 100.33/100.75 meet( X, Y ) ) ) ==> top }.
% 100.33/100.75 parent0: (217531) {G2,W8,D5,L1,V2,M1} { join( X, complement( meet( X, Y )
% 100.33/100.75 ) ) ==> top }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217533) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 100.33/100.75 complement( join( complement( X ), Y ) ) ) }.
% 100.33/100.75 parent0[0]: (43) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 100.33/100.75 complement( join( complement( X ), Y ) ) ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217536) {G2,W12,D7,L1,V2,M1} { X ==> join( meet( X, complement(
% 100.33/100.75 meet( complement( X ), Y ) ) ), complement( top ) ) }.
% 100.33/100.75 parent0[0]: (490) {G10,W8,D5,L1,V2,M1} P(43,413) { join( X, complement(
% 100.33/100.75 meet( X, Y ) ) ) ==> top }.
% 100.33/100.75 parent1[0; 11]: (217533) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 100.33/100.75 complement( join( complement( X ), Y ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := complement( X )
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := complement( meet( complement( X ), Y ) )
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217537) {G2,W11,D7,L1,V2,M1} { X ==> join( meet( X, complement(
% 100.33/100.75 meet( complement( X ), Y ) ) ), zero ) }.
% 100.33/100.75 parent0[0]: (58) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 100.33/100.75 zero }.
% 100.33/100.75 parent1[0; 10]: (217536) {G2,W12,D7,L1,V2,M1} { X ==> join( meet( X,
% 100.33/100.75 complement( meet( complement( X ), Y ) ) ), complement( top ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217538) {G3,W9,D6,L1,V2,M1} { X ==> meet( X, complement( meet(
% 100.33/100.75 complement( X ), Y ) ) ) }.
% 100.33/100.75 parent0[0]: (450) {G12,W5,D3,L1,V1,M1} P(418,158) { join( X, zero ) ==> X
% 100.33/100.75 }.
% 100.33/100.75 parent1[0; 2]: (217537) {G2,W11,D7,L1,V2,M1} { X ==> join( meet( X,
% 100.33/100.75 complement( meet( complement( X ), Y ) ) ), zero ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := meet( X, complement( meet( complement( X ), Y ) ) )
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217539) {G3,W9,D6,L1,V2,M1} { meet( X, complement( meet(
% 100.33/100.75 complement( X ), Y ) ) ) ==> X }.
% 100.33/100.75 parent0[0]: (217538) {G3,W9,D6,L1,V2,M1} { X ==> meet( X, complement( meet
% 100.33/100.75 ( complement( X ), Y ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (513) {G13,W9,D6,L1,V2,M1} P(490,43);d(58);d(450) { meet( X,
% 100.33/100.75 complement( meet( complement( X ), Y ) ) ) ==> X }.
% 100.33/100.75 parent0: (217539) {G3,W9,D6,L1,V2,M1} { meet( X, complement( meet(
% 100.33/100.75 complement( X ), Y ) ) ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217541) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 100.33/100.75 join( X, Y ), Z ) }.
% 100.33/100.75 parent0[0]: (26) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 100.33/100.75 join( join( Y, Z ), X ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 Z := Z
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217550) {G2,W12,D5,L1,V3,M1} { join( top, Z ) = join( join( Z, X
% 100.33/100.75 ), complement( meet( X, Y ) ) ) }.
% 100.33/100.75 parent0[0]: (490) {G10,W8,D5,L1,V2,M1} P(43,413) { join( X, complement(
% 100.33/100.75 meet( X, Y ) ) ) ==> top }.
% 100.33/100.75 parent1[0; 2]: (217541) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) =
% 100.33/100.75 join( join( X, Y ), Z ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := Z
% 100.33/100.75 Y := X
% 100.33/100.75 Z := complement( meet( X, Y ) )
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217555) {G3,W10,D5,L1,V3,M1} { top = join( join( X, Y ),
% 100.33/100.75 complement( meet( Y, Z ) ) ) }.
% 100.33/100.75 parent0[0]: (230) {G7,W5,D3,L1,V1,M1} P(15,24);d(224) { join( top, X ) ==>
% 100.33/100.75 top }.
% 100.33/100.75 parent1[0; 1]: (217550) {G2,W12,D5,L1,V3,M1} { join( top, Z ) = join( join
% 100.33/100.75 ( Z, X ), complement( meet( X, Y ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := Z
% 100.33/100.75 Z := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217556) {G3,W10,D5,L1,V3,M1} { join( join( X, Y ), complement(
% 100.33/100.75 meet( Y, Z ) ) ) = top }.
% 100.33/100.75 parent0[0]: (217555) {G3,W10,D5,L1,V3,M1} { top = join( join( X, Y ),
% 100.33/100.75 complement( meet( Y, Z ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 Z := Z
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (529) {G11,W10,D5,L1,V3,M1} P(490,26);d(230) { join( join( Z,
% 100.33/100.75 X ), complement( meet( X, Y ) ) ) ==> top }.
% 100.33/100.75 parent0: (217556) {G3,W10,D5,L1,V3,M1} { join( join( X, Y ), complement(
% 100.33/100.75 meet( Y, Z ) ) ) = top }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Z
% 100.33/100.75 Y := X
% 100.33/100.75 Z := Y
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217557) {G10,W8,D5,L1,V2,M1} { top ==> join( X, complement( meet
% 100.33/100.75 ( X, Y ) ) ) }.
% 100.33/100.75 parent0[0]: (490) {G10,W8,D5,L1,V2,M1} P(43,413) { join( X, complement(
% 100.33/100.75 meet( X, Y ) ) ) ==> top }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217558) {G2,W8,D5,L1,V2,M1} { top ==> join( X, complement( meet
% 100.33/100.75 ( Y, X ) ) ) }.
% 100.33/100.75 parent0[0]: (56) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 100.33/100.75 Y ) }.
% 100.33/100.75 parent1[0; 5]: (217557) {G10,W8,D5,L1,V2,M1} { top ==> join( X, complement
% 100.33/100.75 ( meet( X, Y ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217561) {G2,W8,D5,L1,V2,M1} { join( X, complement( meet( Y, X ) )
% 100.33/100.75 ) ==> top }.
% 100.33/100.75 parent0[0]: (217558) {G2,W8,D5,L1,V2,M1} { top ==> join( X, complement(
% 100.33/100.75 meet( Y, X ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (532) {G11,W8,D5,L1,V2,M1} P(56,490) { join( X, complement(
% 100.33/100.75 meet( Y, X ) ) ) ==> top }.
% 100.33/100.75 parent0: (217561) {G2,W8,D5,L1,V2,M1} { join( X, complement( meet( Y, X )
% 100.33/100.75 ) ) ==> top }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217562) {G10,W8,D5,L1,V2,M1} { top ==> join( X, complement( meet
% 100.33/100.75 ( X, Y ) ) ) }.
% 100.33/100.75 parent0[0]: (490) {G10,W8,D5,L1,V2,M1} P(43,413) { join( X, complement(
% 100.33/100.75 meet( X, Y ) ) ) ==> top }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217563) {G1,W8,D5,L1,V2,M1} { top ==> join( complement( meet( X
% 100.33/100.75 , Y ) ), X ) }.
% 100.33/100.75 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.75 parent1[0; 2]: (217562) {G10,W8,D5,L1,V2,M1} { top ==> join( X, complement
% 100.33/100.75 ( meet( X, Y ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := complement( meet( X, Y ) )
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217566) {G1,W8,D5,L1,V2,M1} { join( complement( meet( X, Y ) ), X
% 100.33/100.75 ) ==> top }.
% 100.33/100.75 parent0[0]: (217563) {G1,W8,D5,L1,V2,M1} { top ==> join( complement( meet
% 100.33/100.75 ( X, Y ) ), X ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (535) {G11,W8,D5,L1,V2,M1} P(490,0) { join( complement( meet(
% 100.33/100.75 X, Y ) ), X ) ==> top }.
% 100.33/100.75 parent0: (217566) {G1,W8,D5,L1,V2,M1} { join( complement( meet( X, Y ) ),
% 100.33/100.75 X ) ==> top }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217568) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 100.33/100.75 ( complement( X ), complement( Y ) ) ) }.
% 100.33/100.75 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 100.33/100.75 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217570) {G1,W9,D5,L1,V2,M1} { meet( X, meet( Y, complement( X )
% 100.33/100.75 ) ) ==> complement( top ) }.
% 100.33/100.75 parent0[0]: (532) {G11,W8,D5,L1,V2,M1} P(56,490) { join( X, complement(
% 100.33/100.75 meet( Y, X ) ) ) ==> top }.
% 100.33/100.75 parent1[0; 8]: (217568) {G0,W10,D5,L1,V2,M1} { meet( X, Y ) ==> complement
% 100.33/100.75 ( join( complement( X ), complement( Y ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := complement( X )
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := meet( Y, complement( X ) )
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217571) {G2,W8,D5,L1,V2,M1} { meet( X, meet( Y, complement( X )
% 100.33/100.75 ) ) ==> zero }.
% 100.33/100.75 parent0[0]: (58) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 100.33/100.75 zero }.
% 100.33/100.75 parent1[0; 7]: (217570) {G1,W9,D5,L1,V2,M1} { meet( X, meet( Y, complement
% 100.33/100.75 ( X ) ) ) ==> complement( top ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (555) {G12,W8,D5,L1,V2,M1} P(532,3);d(58) { meet( X, meet( Y,
% 100.33/100.75 complement( X ) ) ) ==> zero }.
% 100.33/100.75 parent0: (217571) {G2,W8,D5,L1,V2,M1} { meet( X, meet( Y, complement( X )
% 100.33/100.75 ) ) ==> zero }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217574) {G12,W8,D5,L1,V2,M1} { zero ==> meet( X, meet( Y,
% 100.33/100.75 complement( X ) ) ) }.
% 100.33/100.75 parent0[0]: (555) {G12,W8,D5,L1,V2,M1} P(532,3);d(58) { meet( X, meet( Y,
% 100.33/100.75 complement( X ) ) ) ==> zero }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217575) {G13,W8,D4,L1,V2,M1} { zero ==> meet( complement( X ),
% 100.33/100.75 meet( Y, X ) ) }.
% 100.33/100.75 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.75 complement( X ) ) ==> X }.
% 100.33/100.75 parent1[0; 7]: (217574) {G12,W8,D5,L1,V2,M1} { zero ==> meet( X, meet( Y,
% 100.33/100.75 complement( X ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := complement( X )
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217576) {G13,W8,D4,L1,V2,M1} { meet( complement( X ), meet( Y, X
% 100.33/100.75 ) ) ==> zero }.
% 100.33/100.75 parent0[0]: (217575) {G13,W8,D4,L1,V2,M1} { zero ==> meet( complement( X )
% 100.33/100.75 , meet( Y, X ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (571) {G17,W8,D4,L1,V2,M1} P(460,555) { meet( complement( X )
% 100.33/100.75 , meet( Y, X ) ) ==> zero }.
% 100.33/100.75 parent0: (217576) {G13,W8,D4,L1,V2,M1} { meet( complement( X ), meet( Y, X
% 100.33/100.75 ) ) ==> zero }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217577) {G17,W8,D4,L1,V2,M1} { zero ==> meet( complement( X ),
% 100.33/100.75 meet( Y, X ) ) }.
% 100.33/100.75 parent0[0]: (571) {G17,W8,D4,L1,V2,M1} P(460,555) { meet( complement( X ),
% 100.33/100.75 meet( Y, X ) ) ==> zero }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217578) {G2,W8,D4,L1,V2,M1} { zero ==> meet( meet( Y, X ),
% 100.33/100.75 complement( X ) ) }.
% 100.33/100.75 parent0[0]: (56) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 100.33/100.75 Y ) }.
% 100.33/100.75 parent1[0; 2]: (217577) {G17,W8,D4,L1,V2,M1} { zero ==> meet( complement(
% 100.33/100.75 X ), meet( Y, X ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := meet( Y, X )
% 100.33/100.75 Y := complement( X )
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217582) {G2,W8,D4,L1,V2,M1} { meet( meet( X, Y ), complement( Y )
% 100.33/100.75 ) ==> zero }.
% 100.33/100.75 parent0[0]: (217578) {G2,W8,D4,L1,V2,M1} { zero ==> meet( meet( Y, X ),
% 100.33/100.75 complement( X ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (575) {G18,W8,D4,L1,V2,M1} P(571,56) { meet( meet( Y, X ),
% 100.33/100.75 complement( X ) ) ==> zero }.
% 100.33/100.75 parent0: (217582) {G2,W8,D4,L1,V2,M1} { meet( meet( X, Y ), complement( Y
% 100.33/100.75 ) ) ==> zero }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217586) {G17,W8,D4,L1,V2,M1} { zero ==> meet( complement( X ),
% 100.33/100.75 meet( Y, X ) ) }.
% 100.33/100.75 parent0[0]: (571) {G17,W8,D4,L1,V2,M1} P(460,555) { meet( complement( X ),
% 100.33/100.75 meet( Y, X ) ) ==> zero }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217588) {G2,W8,D4,L1,V2,M1} { zero ==> meet( complement( X ),
% 100.33/100.75 meet( X, Y ) ) }.
% 100.33/100.75 parent0[0]: (56) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 100.33/100.75 Y ) }.
% 100.33/100.75 parent1[0; 5]: (217586) {G17,W8,D4,L1,V2,M1} { zero ==> meet( complement(
% 100.33/100.75 X ), meet( Y, X ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217594) {G2,W8,D4,L1,V2,M1} { meet( complement( X ), meet( X, Y )
% 100.33/100.75 ) ==> zero }.
% 100.33/100.75 parent0[0]: (217588) {G2,W8,D4,L1,V2,M1} { zero ==> meet( complement( X )
% 100.33/100.75 , meet( X, Y ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (576) {G18,W8,D4,L1,V2,M1} P(56,571) { meet( complement( Y ),
% 100.33/100.75 meet( Y, X ) ) ==> zero }.
% 100.33/100.75 parent0: (217594) {G2,W8,D4,L1,V2,M1} { meet( complement( X ), meet( X, Y
% 100.33/100.75 ) ) ==> zero }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217596) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 100.33/100.75 complement( join( complement( X ), Y ) ) ) }.
% 100.33/100.75 parent0[0]: (43) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 100.33/100.75 complement( join( complement( X ), Y ) ) ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217599) {G2,W14,D7,L1,V2,M1} { meet( X, Y ) ==> join( zero,
% 100.33/100.75 complement( join( complement( meet( X, Y ) ), complement( Y ) ) ) ) }.
% 100.33/100.75 parent0[0]: (575) {G18,W8,D4,L1,V2,M1} P(571,56) { meet( meet( Y, X ),
% 100.33/100.75 complement( X ) ) ==> zero }.
% 100.33/100.75 parent1[0; 5]: (217596) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 100.33/100.75 complement( join( complement( X ), Y ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := meet( X, Y )
% 100.33/100.75 Y := complement( Y )
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217600) {G3,W12,D6,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 100.33/100.75 ( complement( meet( X, Y ) ), complement( Y ) ) ) }.
% 100.33/100.75 parent0[0]: (455) {G14,W5,D3,L1,V1,M1} P(418,0);d(454) { join( zero, X )
% 100.33/100.75 ==> X }.
% 100.33/100.75 parent1[0; 4]: (217599) {G2,W14,D7,L1,V2,M1} { meet( X, Y ) ==> join( zero
% 100.33/100.75 , complement( join( complement( meet( X, Y ) ), complement( Y ) ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := complement( join( complement( meet( X, Y ) ), complement( Y ) ) )
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217601) {G1,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X, Y
% 100.33/100.75 ), Y ) }.
% 100.33/100.75 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 100.33/100.75 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 100.33/100.75 parent1[0; 4]: (217600) {G3,W12,D6,L1,V2,M1} { meet( X, Y ) ==> complement
% 100.33/100.75 ( join( complement( meet( X, Y ) ), complement( Y ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := meet( X, Y )
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217602) {G1,W9,D4,L1,V2,M1} { meet( meet( X, Y ), Y ) ==> meet( X
% 100.33/100.75 , Y ) }.
% 100.33/100.75 parent0[0]: (217601) {G1,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X
% 100.33/100.75 , Y ), Y ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (579) {G19,W9,D4,L1,V2,M1} P(575,43);d(455);d(3) { meet( meet
% 100.33/100.75 ( X, Y ), Y ) ==> meet( X, Y ) }.
% 100.33/100.75 parent0: (217602) {G1,W9,D4,L1,V2,M1} { meet( meet( X, Y ), Y ) ==> meet(
% 100.33/100.75 X, Y ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217603) {G18,W8,D4,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 100.33/100.75 complement( Y ) ) }.
% 100.33/100.75 parent0[0]: (575) {G18,W8,D4,L1,V2,M1} P(571,56) { meet( meet( Y, X ),
% 100.33/100.75 complement( X ) ) ==> zero }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217605) {G2,W8,D4,L1,V2,M1} { zero ==> meet( meet( Y, X ),
% 100.33/100.75 complement( Y ) ) }.
% 100.33/100.75 parent0[0]: (56) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 100.33/100.75 Y ) }.
% 100.33/100.75 parent1[0; 3]: (217603) {G18,W8,D4,L1,V2,M1} { zero ==> meet( meet( X, Y )
% 100.33/100.75 , complement( Y ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217611) {G2,W8,D4,L1,V2,M1} { meet( meet( X, Y ), complement( X )
% 100.33/100.75 ) ==> zero }.
% 100.33/100.75 parent0[0]: (217605) {G2,W8,D4,L1,V2,M1} { zero ==> meet( meet( Y, X ),
% 100.33/100.75 complement( Y ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 subsumption: (580) {G19,W8,D4,L1,V2,M1} P(56,575) { meet( meet( Y, X ),
% 100.33/100.75 complement( Y ) ) ==> zero }.
% 100.33/100.75 parent0: (217611) {G2,W8,D4,L1,V2,M1} { meet( meet( X, Y ), complement( X
% 100.33/100.75 ) ) ==> zero }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75 permutation0:
% 100.33/100.75 0 ==> 0
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 eqswap: (217613) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 100.33/100.75 complement( join( complement( X ), Y ) ) ) }.
% 100.33/100.75 parent0[0]: (43) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 100.33/100.75 complement( join( complement( X ), Y ) ) ) ==> X }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217616) {G2,W14,D7,L1,V2,M1} { meet( X, Y ) ==> join( zero,
% 100.33/100.75 complement( join( complement( meet( X, Y ) ), complement( X ) ) ) ) }.
% 100.33/100.75 parent0[0]: (580) {G19,W8,D4,L1,V2,M1} P(56,575) { meet( meet( Y, X ),
% 100.33/100.75 complement( Y ) ) ==> zero }.
% 100.33/100.75 parent1[0; 5]: (217613) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 100.33/100.75 complement( join( complement( X ), Y ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := Y
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := meet( X, Y )
% 100.33/100.75 Y := complement( X )
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217617) {G3,W12,D6,L1,V2,M1} { meet( X, Y ) ==> complement( join
% 100.33/100.75 ( complement( meet( X, Y ) ), complement( X ) ) ) }.
% 100.33/100.75 parent0[0]: (455) {G14,W5,D3,L1,V1,M1} P(418,0);d(454) { join( zero, X )
% 100.33/100.75 ==> X }.
% 100.33/100.75 parent1[0; 4]: (217616) {G2,W14,D7,L1,V2,M1} { meet( X, Y ) ==> join( zero
% 100.33/100.75 , complement( join( complement( meet( X, Y ) ), complement( X ) ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := complement( join( complement( meet( X, Y ) ), complement( X ) ) )
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.75 X := X
% 100.33/100.75 Y := Y
% 100.33/100.75 end
% 100.33/100.75
% 100.33/100.75 paramod: (217618) {G1,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X, Y
% 100.33/100.75 ), X ) }.
% 100.33/100.75 parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 100.33/100.75 , complement( Y ) ) ) ==> meet( X, Y ) }.
% 100.33/100.75 parent1[0; 4]: (217617) {G3,W12,D6,L1,V2,M1} { meet( X, Y ) ==> complement
% 100.33/100.75 ( join( complement( meet( X, Y ) ), complement( X ) ) ) }.
% 100.33/100.75 substitution0:
% 100.33/100.75 X := meet( X, Y )
% 100.33/100.75 Y := X
% 100.33/100.75 end
% 100.33/100.75 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217619) {G1,W9,D4,L1,V2,M1} { meet( meet( X, Y ), X ) ==> meet( X
% 100.33/100.76 , Y ) }.
% 100.33/100.76 parent0[0]: (217618) {G1,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X
% 100.33/100.76 , Y ), X ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (582) {G20,W9,D4,L1,V2,M1} P(580,43);d(455);d(3) { meet( meet
% 100.33/100.76 ( X, Y ), X ) ==> meet( X, Y ) }.
% 100.33/100.76 parent0: (217619) {G1,W9,D4,L1,V2,M1} { meet( meet( X, Y ), X ) ==> meet(
% 100.33/100.76 X, Y ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217621) {G1,W14,D5,L1,V3,M1} { join( X, converse( join( Y, Z ) )
% 100.33/100.76 ) ==> join( join( X, converse( Y ) ), converse( Z ) ) }.
% 100.33/100.76 parent0[0]: (22) {G1,W14,D5,L1,V3,M1} P(8,1) { join( join( Z, converse( X )
% 100.33/100.76 ), converse( Y ) ) ==> join( Z, converse( join( X, Y ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := Z
% 100.33/100.76 Z := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217625) {G2,W15,D6,L1,V3,M1} { join( complement( meet( converse
% 100.33/100.76 ( X ), Y ) ), converse( join( X, Z ) ) ) ==> join( top, converse( Z ) )
% 100.33/100.76 }.
% 100.33/100.76 parent0[0]: (535) {G11,W8,D5,L1,V2,M1} P(490,0) { join( complement( meet( X
% 100.33/100.76 , Y ) ), X ) ==> top }.
% 100.33/100.76 parent1[0; 12]: (217621) {G1,W14,D5,L1,V3,M1} { join( X, converse( join( Y
% 100.33/100.76 , Z ) ) ) ==> join( join( X, converse( Y ) ), converse( Z ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := converse( X )
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := complement( meet( converse( X ), Y ) )
% 100.33/100.76 Y := X
% 100.33/100.76 Z := Z
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217626) {G3,W12,D6,L1,V3,M1} { join( complement( meet( converse
% 100.33/100.76 ( X ), Y ) ), converse( join( X, Z ) ) ) ==> top }.
% 100.33/100.76 parent0[0]: (230) {G7,W5,D3,L1,V1,M1} P(15,24);d(224) { join( top, X ) ==>
% 100.33/100.76 top }.
% 100.33/100.76 parent1[0; 11]: (217625) {G2,W15,D6,L1,V3,M1} { join( complement( meet(
% 100.33/100.76 converse( X ), Y ) ), converse( join( X, Z ) ) ) ==> join( top, converse
% 100.33/100.76 ( Z ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := converse( Z )
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 Z := Z
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (603) {G12,W12,D6,L1,V3,M1} P(535,22);d(230) { join(
% 100.33/100.76 complement( meet( converse( X ), Y ) ), converse( join( X, Z ) ) ) ==>
% 100.33/100.76 top }.
% 100.33/100.76 parent0: (217626) {G3,W12,D6,L1,V3,M1} { join( complement( meet( converse
% 100.33/100.76 ( X ), Y ) ), converse( join( X, Z ) ) ) ==> top }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 Z := Z
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217628) {G20,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X, Y
% 100.33/100.76 ), X ) }.
% 100.33/100.76 parent0[0]: (582) {G20,W9,D4,L1,V2,M1} P(580,43);d(455);d(3) { meet( meet(
% 100.33/100.76 X, Y ), X ) ==> meet( X, Y ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217631) {G2,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( X, meet( X
% 100.33/100.76 , Y ) ) }.
% 100.33/100.76 parent0[0]: (56) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 100.33/100.76 Y ) }.
% 100.33/100.76 parent1[0; 4]: (217628) {G20,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet
% 100.33/100.76 ( X, Y ), X ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := meet( X, Y )
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217644) {G2,W9,D4,L1,V2,M1} { meet( X, meet( X, Y ) ) ==> meet( X
% 100.33/100.76 , Y ) }.
% 100.33/100.76 parent0[0]: (217631) {G2,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( X, meet
% 100.33/100.76 ( X, Y ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (689) {G21,W9,D4,L1,V2,M1} P(582,56) { meet( X, meet( X, Y ) )
% 100.33/100.76 ==> meet( X, Y ) }.
% 100.33/100.76 parent0: (217644) {G2,W9,D4,L1,V2,M1} { meet( X, meet( X, Y ) ) ==> meet(
% 100.33/100.76 X, Y ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217645) {G21,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( X, meet( X
% 100.33/100.76 , Y ) ) }.
% 100.33/100.76 parent0[0]: (689) {G21,W9,D4,L1,V2,M1} P(582,56) { meet( X, meet( X, Y ) )
% 100.33/100.76 ==> meet( X, Y ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217648) {G2,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X, Y
% 100.33/100.76 ), X ) }.
% 100.33/100.76 parent0[0]: (56) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 100.33/100.76 Y ) }.
% 100.33/100.76 parent1[0; 4]: (217645) {G21,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( X,
% 100.33/100.76 meet( X, Y ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := meet( X, Y )
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217650) {G2,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet( Y, X
% 100.33/100.76 ), X ) }.
% 100.33/100.76 parent0[0]: (56) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 100.33/100.76 Y ) }.
% 100.33/100.76 parent1[0; 5]: (217648) {G2,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet
% 100.33/100.76 ( X, Y ), X ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217652) {G2,W9,D4,L1,V2,M1} { meet( Y, X ) ==> meet( meet( Y, X
% 100.33/100.76 ), X ) }.
% 100.33/100.76 parent0[0]: (56) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 100.33/100.76 Y ) }.
% 100.33/100.76 parent1[0; 1]: (217650) {G2,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet
% 100.33/100.76 ( Y, X ), X ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217653) {G2,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( Y, meet( X
% 100.33/100.76 , Y ) ) }.
% 100.33/100.76 parent0[0]: (56) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 100.33/100.76 Y ) }.
% 100.33/100.76 parent1[0; 4]: (217652) {G2,W9,D4,L1,V2,M1} { meet( Y, X ) ==> meet( meet
% 100.33/100.76 ( Y, X ), X ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := meet( X, Y )
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217657) {G2,W9,D4,L1,V2,M1} { meet( Y, meet( X, Y ) ) ==> meet( X
% 100.33/100.76 , Y ) }.
% 100.33/100.76 parent0[0]: (217653) {G2,W9,D4,L1,V2,M1} { meet( X, Y ) ==> meet( Y, meet
% 100.33/100.76 ( X, Y ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (691) {G22,W9,D4,L1,V2,M1} P(56,689) { meet( X, meet( Y, X ) )
% 100.33/100.76 ==> meet( Y, X ) }.
% 100.33/100.76 parent0: (217657) {G2,W9,D4,L1,V2,M1} { meet( Y, meet( X, Y ) ) ==> meet(
% 100.33/100.76 X, Y ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217663) {G18,W9,D4,L1,V2,M1} { join( X, Y ) ==> join( join( X, Y
% 100.33/100.76 ), Y ) }.
% 100.33/100.76 parent0[0]: (478) {G18,W9,D4,L1,V2,M1} P(469,27);d(1);d(469) { join( join(
% 100.33/100.76 X, Y ), Y ) ==> join( X, Y ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217666) {G2,W17,D6,L1,V2,M1} { join( meet( X, Y ), complement(
% 100.33/100.76 join( complement( X ), Y ) ) ) ==> join( X, complement( join( complement
% 100.33/100.76 ( X ), Y ) ) ) }.
% 100.33/100.76 parent0[0]: (43) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 100.33/100.76 complement( join( complement( X ), Y ) ) ) ==> X }.
% 100.33/100.76 parent1[0; 11]: (217663) {G18,W9,D4,L1,V2,M1} { join( X, Y ) ==> join(
% 100.33/100.76 join( X, Y ), Y ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := meet( X, Y )
% 100.33/100.76 Y := complement( join( complement( X ), Y ) )
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217667) {G2,W9,D6,L1,V2,M1} { X ==> join( X, complement( join(
% 100.33/100.76 complement( X ), Y ) ) ) }.
% 100.33/100.76 parent0[0]: (43) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 100.33/100.76 complement( join( complement( X ), Y ) ) ) ==> X }.
% 100.33/100.76 parent1[0; 1]: (217666) {G2,W17,D6,L1,V2,M1} { join( meet( X, Y ),
% 100.33/100.76 complement( join( complement( X ), Y ) ) ) ==> join( X, complement( join
% 100.33/100.76 ( complement( X ), Y ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217674) {G3,W8,D5,L1,V2,M1} { X ==> join( X, meet( X, complement
% 100.33/100.76 ( Y ) ) ) }.
% 100.33/100.76 parent0[0]: (472) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join(
% 100.33/100.76 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 100.33/100.76 parent1[0; 4]: (217667) {G2,W9,D6,L1,V2,M1} { X ==> join( X, complement(
% 100.33/100.76 join( complement( X ), Y ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217675) {G3,W8,D5,L1,V2,M1} { join( X, meet( X, complement( Y ) )
% 100.33/100.76 ) ==> X }.
% 100.33/100.76 parent0[0]: (217674) {G3,W8,D5,L1,V2,M1} { X ==> join( X, meet( X,
% 100.33/100.76 complement( Y ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (693) {G19,W8,D5,L1,V2,M1} P(43,478);d(472) { join( X, meet( X
% 100.33/100.76 , complement( Y ) ) ) ==> X }.
% 100.33/100.76 parent0: (217675) {G3,W8,D5,L1,V2,M1} { join( X, meet( X, complement( Y )
% 100.33/100.76 ) ) ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217677) {G19,W8,D5,L1,V2,M1} { X ==> join( X, meet( X, complement
% 100.33/100.76 ( Y ) ) ) }.
% 100.33/100.76 parent0[0]: (693) {G19,W8,D5,L1,V2,M1} P(43,478);d(472) { join( X, meet( X
% 100.33/100.76 , complement( Y ) ) ) ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217678) {G17,W7,D4,L1,V2,M1} { X ==> join( X, meet( X, Y ) ) }.
% 100.33/100.76 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.76 complement( X ) ) ==> X }.
% 100.33/100.76 parent1[0; 6]: (217677) {G19,W8,D5,L1,V2,M1} { X ==> join( X, meet( X,
% 100.33/100.76 complement( Y ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := complement( Y )
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217679) {G17,W7,D4,L1,V2,M1} { join( X, meet( X, Y ) ) ==> X }.
% 100.33/100.76 parent0[0]: (217678) {G17,W7,D4,L1,V2,M1} { X ==> join( X, meet( X, Y ) )
% 100.33/100.76 }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (699) {G20,W7,D4,L1,V2,M1} P(460,693) { join( Y, meet( Y, X )
% 100.33/100.76 ) ==> Y }.
% 100.33/100.76 parent0: (217679) {G17,W7,D4,L1,V2,M1} { join( X, meet( X, Y ) ) ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217681) {G20,W7,D4,L1,V2,M1} { X ==> join( X, meet( X, Y ) ) }.
% 100.33/100.76 parent0[0]: (699) {G20,W7,D4,L1,V2,M1} P(460,693) { join( Y, meet( Y, X ) )
% 100.33/100.76 ==> Y }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217682) {G21,W7,D4,L1,V2,M1} { X ==> join( X, meet( Y, X ) ) }.
% 100.33/100.76 parent0[0]: (691) {G22,W9,D4,L1,V2,M1} P(56,689) { meet( X, meet( Y, X ) )
% 100.33/100.76 ==> meet( Y, X ) }.
% 100.33/100.76 parent1[0; 4]: (217681) {G20,W7,D4,L1,V2,M1} { X ==> join( X, meet( X, Y )
% 100.33/100.76 ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := meet( Y, X )
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217683) {G21,W7,D4,L1,V2,M1} { join( X, meet( Y, X ) ) ==> X }.
% 100.33/100.76 parent0[0]: (217682) {G21,W7,D4,L1,V2,M1} { X ==> join( X, meet( Y, X ) )
% 100.33/100.76 }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (716) {G23,W7,D4,L1,V2,M1} P(691,699) { join( X, meet( Y, X )
% 100.33/100.76 ) ==> X }.
% 100.33/100.76 parent0: (217683) {G21,W7,D4,L1,V2,M1} { join( X, meet( Y, X ) ) ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217692) {G2,W11,D4,L1,V3,M1} { join( join( X, Y ), meet( X, Z )
% 100.33/100.76 ) = join( X, Y ) }.
% 100.33/100.76 parent0[0]: (699) {G20,W7,D4,L1,V2,M1} P(460,693) { join( Y, meet( Y, X ) )
% 100.33/100.76 ==> Y }.
% 100.33/100.76 parent1[0; 9]: (27) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ),
% 100.33/100.76 X ) = join( join( Z, X ), Y ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Z
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := meet( X, Z )
% 100.33/100.76 Y := Y
% 100.33/100.76 Z := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (728) {G21,W11,D4,L1,V3,M1} P(699,27) { join( join( X, Z ),
% 100.33/100.76 meet( X, Y ) ) ==> join( X, Z ) }.
% 100.33/100.76 parent0: (217692) {G2,W11,D4,L1,V3,M1} { join( join( X, Y ), meet( X, Z )
% 100.33/100.76 ) = join( X, Y ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Z
% 100.33/100.76 Z := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217694) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 100.33/100.76 join( X, Y ), Z ) }.
% 100.33/100.76 parent0[0]: (26) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 100.33/100.76 join( join( Y, Z ), X ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 Z := Z
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217710) {G2,W11,D5,L1,V3,M1} { join( join( meet( X, Y ), Z ), X
% 100.33/100.76 ) = join( X, Z ) }.
% 100.33/100.76 parent0[0]: (699) {G20,W7,D4,L1,V2,M1} P(460,693) { join( Y, meet( Y, X ) )
% 100.33/100.76 ==> Y }.
% 100.33/100.76 parent1[0; 9]: (217694) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) =
% 100.33/100.76 join( join( X, Y ), Z ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := meet( X, Y )
% 100.33/100.76 Z := Z
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (730) {G21,W11,D5,L1,V3,M1} P(699,26) { join( join( meet( X, Y
% 100.33/100.76 ), Z ), X ) ==> join( X, Z ) }.
% 100.33/100.76 parent0: (217710) {G2,W11,D5,L1,V3,M1} { join( join( meet( X, Y ), Z ), X
% 100.33/100.76 ) = join( X, Z ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 Z := Z
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217716) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) ) ==>
% 100.33/100.76 converse( join( converse( X ), Y ) ) }.
% 100.33/100.76 parent0[0]: (20) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 100.33/100.76 ), Y ) ) ==> join( X, converse( Y ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217718) {G2,W11,D6,L1,V2,M1} { join( X, converse( meet( converse
% 100.33/100.76 ( X ), Y ) ) ) ==> converse( converse( X ) ) }.
% 100.33/100.76 parent0[0]: (699) {G20,W7,D4,L1,V2,M1} P(460,693) { join( Y, meet( Y, X ) )
% 100.33/100.76 ==> Y }.
% 100.33/100.76 parent1[0; 9]: (217716) {G1,W10,D5,L1,V2,M1} { join( X, converse( Y ) )
% 100.33/100.76 ==> converse( join( converse( X ), Y ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := converse( X )
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := meet( converse( X ), Y )
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217719) {G1,W9,D6,L1,V2,M1} { join( X, converse( meet( converse
% 100.33/100.76 ( X ), Y ) ) ) ==> X }.
% 100.33/100.76 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 100.33/100.76 parent1[0; 8]: (217718) {G2,W11,D6,L1,V2,M1} { join( X, converse( meet(
% 100.33/100.76 converse( X ), Y ) ) ) ==> converse( converse( X ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (733) {G21,W9,D6,L1,V2,M1} P(699,20);d(7) { join( X, converse
% 100.33/100.76 ( meet( converse( X ), Y ) ) ) ==> X }.
% 100.33/100.76 parent0: (217719) {G1,W9,D6,L1,V2,M1} { join( X, converse( meet( converse
% 100.33/100.76 ( X ), Y ) ) ) ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217721) {G20,W7,D4,L1,V2,M1} { X ==> join( X, meet( X, Y ) ) }.
% 100.33/100.76 parent0[0]: (699) {G20,W7,D4,L1,V2,M1} P(460,693) { join( Y, meet( Y, X ) )
% 100.33/100.76 ==> Y }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217722) {G1,W7,D4,L1,V2,M1} { X ==> join( meet( X, Y ), X ) }.
% 100.33/100.76 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.76 parent1[0; 2]: (217721) {G20,W7,D4,L1,V2,M1} { X ==> join( X, meet( X, Y )
% 100.33/100.76 ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := meet( X, Y )
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217725) {G1,W7,D4,L1,V2,M1} { join( meet( X, Y ), X ) ==> X }.
% 100.33/100.76 parent0[0]: (217722) {G1,W7,D4,L1,V2,M1} { X ==> join( meet( X, Y ), X )
% 100.33/100.76 }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (736) {G21,W7,D4,L1,V2,M1} P(699,0) { join( meet( X, Y ), X )
% 100.33/100.76 ==> X }.
% 100.33/100.76 parent0: (217725) {G1,W7,D4,L1,V2,M1} { join( meet( X, Y ), X ) ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217734) {G2,W11,D4,L1,V3,M1} { join( join( X, Y ), meet( Z, X )
% 100.33/100.76 ) = join( X, Y ) }.
% 100.33/100.76 parent0[0]: (716) {G23,W7,D4,L1,V2,M1} P(691,699) { join( X, meet( Y, X ) )
% 100.33/100.76 ==> X }.
% 100.33/100.76 parent1[0; 9]: (27) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ),
% 100.33/100.76 X ) = join( join( Z, X ), Y ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Z
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := meet( Z, X )
% 100.33/100.76 Y := Y
% 100.33/100.76 Z := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (748) {G24,W11,D4,L1,V3,M1} P(716,27) { join( join( X, Z ),
% 100.33/100.76 meet( Y, X ) ) ==> join( X, Z ) }.
% 100.33/100.76 parent0: (217734) {G2,W11,D4,L1,V3,M1} { join( join( X, Y ), meet( Z, X )
% 100.33/100.76 ) = join( X, Y ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Z
% 100.33/100.76 Z := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217735) {G23,W7,D4,L1,V2,M1} { X ==> join( X, meet( Y, X ) ) }.
% 100.33/100.76 parent0[0]: (716) {G23,W7,D4,L1,V2,M1} P(691,699) { join( X, meet( Y, X ) )
% 100.33/100.76 ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217736) {G1,W7,D4,L1,V2,M1} { X ==> join( meet( Y, X ), X ) }.
% 100.33/100.76 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.76 parent1[0; 2]: (217735) {G23,W7,D4,L1,V2,M1} { X ==> join( X, meet( Y, X )
% 100.33/100.76 ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := meet( Y, X )
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217739) {G1,W7,D4,L1,V2,M1} { join( meet( Y, X ), X ) ==> X }.
% 100.33/100.76 parent0[0]: (217736) {G1,W7,D4,L1,V2,M1} { X ==> join( meet( Y, X ), X )
% 100.33/100.76 }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (756) {G24,W7,D4,L1,V2,M1} P(716,0) { join( meet( Y, X ), X )
% 100.33/100.76 ==> X }.
% 100.33/100.76 parent0: (217739) {G1,W7,D4,L1,V2,M1} { join( meet( Y, X ), X ) ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217741) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 100.33/100.76 join( X, Y ), Z ) }.
% 100.33/100.76 parent0[0]: (26) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 100.33/100.76 join( join( Y, Z ), X ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 Z := Z
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217742) {G2,W11,D5,L1,V3,M1} { join( Y, Z ) = join( join( Z,
% 100.33/100.76 meet( X, Y ) ), Y ) }.
% 100.33/100.76 parent0[0]: (756) {G24,W7,D4,L1,V2,M1} P(716,0) { join( meet( Y, X ), X )
% 100.33/100.76 ==> X }.
% 100.33/100.76 parent1[0; 2]: (217741) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) =
% 100.33/100.76 join( join( X, Y ), Z ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := Z
% 100.33/100.76 Y := meet( X, Y )
% 100.33/100.76 Z := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217744) {G2,W11,D5,L1,V3,M1} { join( join( Y, meet( Z, X ) ), X )
% 100.33/100.76 = join( X, Y ) }.
% 100.33/100.76 parent0[0]: (217742) {G2,W11,D5,L1,V3,M1} { join( Y, Z ) = join( join( Z,
% 100.33/100.76 meet( X, Y ) ), Y ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Z
% 100.33/100.76 Y := X
% 100.33/100.76 Z := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (758) {G25,W11,D5,L1,V3,M1} P(756,26) { join( join( Z, meet( X
% 100.33/100.76 , Y ) ), Y ) ==> join( Y, Z ) }.
% 100.33/100.76 parent0: (217744) {G2,W11,D5,L1,V3,M1} { join( join( Y, meet( Z, X ) ), X
% 100.33/100.76 ) = join( X, Y ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := Z
% 100.33/100.76 Z := X
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217747) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y ) ==>
% 100.33/100.76 converse( join( X, converse( Y ) ) ) }.
% 100.33/100.76 parent0[0]: (21) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 100.33/100.76 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217749) {G2,W11,D6,L1,V2,M1} { join( converse( meet( X, converse
% 100.33/100.76 ( Y ) ) ), Y ) ==> converse( converse( Y ) ) }.
% 100.33/100.76 parent0[0]: (756) {G24,W7,D4,L1,V2,M1} P(716,0) { join( meet( Y, X ), X )
% 100.33/100.76 ==> X }.
% 100.33/100.76 parent1[0; 9]: (217747) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y )
% 100.33/100.76 ==> converse( join( X, converse( Y ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := converse( Y )
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := meet( X, converse( Y ) )
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217750) {G1,W9,D6,L1,V2,M1} { join( converse( meet( X, converse
% 100.33/100.76 ( Y ) ) ), Y ) ==> Y }.
% 100.33/100.76 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 100.33/100.76 parent1[0; 8]: (217749) {G2,W11,D6,L1,V2,M1} { join( converse( meet( X,
% 100.33/100.76 converse( Y ) ) ), Y ) ==> converse( converse( Y ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (760) {G25,W9,D6,L1,V2,M1} P(756,21);d(7) { join( converse(
% 100.33/100.76 meet( X, converse( Y ) ) ), Y ) ==> Y }.
% 100.33/100.76 parent0: (217750) {G1,W9,D6,L1,V2,M1} { join( converse( meet( X, converse
% 100.33/100.76 ( Y ) ) ), Y ) ==> Y }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217753) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 100.33/100.76 join( X, Y ), Z ) }.
% 100.33/100.76 parent0[0]: (26) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 100.33/100.76 join( join( Y, Z ), X ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 Z := Z
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217754) {G2,W11,D5,L1,V3,M1} { join( X, Z ) = join( join( Z,
% 100.33/100.76 meet( X, Y ) ), X ) }.
% 100.33/100.76 parent0[0]: (736) {G21,W7,D4,L1,V2,M1} P(699,0) { join( meet( X, Y ), X )
% 100.33/100.76 ==> X }.
% 100.33/100.76 parent1[0; 2]: (217753) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) =
% 100.33/100.76 join( join( X, Y ), Z ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := Z
% 100.33/100.76 Y := meet( X, Y )
% 100.33/100.76 Z := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217756) {G2,W11,D5,L1,V3,M1} { join( join( Y, meet( X, Z ) ), X )
% 100.33/100.76 = join( X, Y ) }.
% 100.33/100.76 parent0[0]: (217754) {G2,W11,D5,L1,V3,M1} { join( X, Z ) = join( join( Z,
% 100.33/100.76 meet( X, Y ) ), X ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Z
% 100.33/100.76 Z := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (762) {G22,W11,D5,L1,V3,M1} P(736,26) { join( join( Z, meet( X
% 100.33/100.76 , Y ) ), X ) ==> join( X, Z ) }.
% 100.33/100.76 parent0: (217756) {G2,W11,D5,L1,V3,M1} { join( join( Y, meet( X, Z ) ), X
% 100.33/100.76 ) = join( X, Y ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Z
% 100.33/100.76 Z := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217760) {G3,W9,D5,L1,V1,M1} { composition( converse( X ),
% 100.33/100.76 complement( composition( X, top ) ) ) ==> zero }.
% 100.33/100.76 parent0[0]: (450) {G12,W5,D3,L1,V1,M1} P(418,158) { join( X, zero ) ==> X
% 100.33/100.76 }.
% 100.33/100.76 parent1[0; 1]: (84) {G2,W11,D6,L1,V1,M1} P(58,10) { join( composition(
% 100.33/100.76 converse( X ), complement( composition( X, top ) ) ), zero ) ==> zero }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := composition( converse( X ), complement( composition( X, top ) ) )
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (794) {G13,W9,D5,L1,V1,M1} S(84);d(450) { composition(
% 100.33/100.76 converse( X ), complement( composition( X, top ) ) ) ==> zero }.
% 100.33/100.76 parent0: (217760) {G3,W9,D5,L1,V1,M1} { composition( converse( X ),
% 100.33/100.76 complement( composition( X, top ) ) ) ==> zero }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217763) {G13,W9,D5,L1,V1,M1} { zero ==> composition( converse( X
% 100.33/100.76 ), complement( composition( X, top ) ) ) }.
% 100.33/100.76 parent0[0]: (794) {G13,W9,D5,L1,V1,M1} S(84);d(450) { composition( converse
% 100.33/100.76 ( X ), complement( composition( X, top ) ) ) ==> zero }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217765) {G13,W12,D8,L1,V0,M1} { zero ==> composition( top,
% 100.33/100.76 complement( composition( join( complement( converse( skol1 ) ), one ),
% 100.33/100.76 top ) ) ) }.
% 100.33/100.76 parent0[0]: (364) {G12,W8,D6,L1,V0,M1} P(355,29);d(230);d(139) { converse(
% 100.33/100.76 join( complement( converse( skol1 ) ), one ) ) ==> top }.
% 100.33/100.76 parent1[0; 3]: (217763) {G13,W9,D5,L1,V1,M1} { zero ==> composition(
% 100.33/100.76 converse( X ), complement( composition( X, top ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := join( complement( converse( skol1 ) ), one )
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217766) {G14,W8,D5,L1,V0,M1} { zero ==> composition( top,
% 100.33/100.76 complement( composition( top, top ) ) ) }.
% 100.33/100.76 parent0[0]: (383) {G13,W7,D5,L1,V0,M1} P(364,7);d(260) { join( complement(
% 100.33/100.76 converse( skol1 ) ), one ) ==> top }.
% 100.33/100.76 parent1[0; 6]: (217765) {G13,W12,D8,L1,V0,M1} { zero ==> composition( top
% 100.33/100.76 , complement( composition( join( complement( converse( skol1 ) ), one ),
% 100.33/100.76 top ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217767) {G14,W8,D5,L1,V0,M1} { composition( top, complement(
% 100.33/100.76 composition( top, top ) ) ) ==> zero }.
% 100.33/100.76 parent0[0]: (217766) {G14,W8,D5,L1,V0,M1} { zero ==> composition( top,
% 100.33/100.76 complement( composition( top, top ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (824) {G14,W8,D5,L1,V0,M1} P(364,794);d(383) { composition(
% 100.33/100.76 top, complement( composition( top, top ) ) ) ==> zero }.
% 100.33/100.76 parent0: (217767) {G14,W8,D5,L1,V0,M1} { composition( top, complement(
% 100.33/100.76 composition( top, top ) ) ) ==> zero }.
% 100.33/100.76 substitution0:
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217769) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ), Y ) ==>
% 100.33/100.76 join( composition( X, Y ), composition( Z, Y ) ) }.
% 100.33/100.76 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 100.33/100.76 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Z
% 100.33/100.76 Z := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217774) {G1,W17,D6,L1,V1,M1} { composition( join( X, top ),
% 100.33/100.76 complement( composition( top, top ) ) ) ==> join( composition( X,
% 100.33/100.76 complement( composition( top, top ) ) ), zero ) }.
% 100.33/100.76 parent0[0]: (824) {G14,W8,D5,L1,V0,M1} P(364,794);d(383) { composition( top
% 100.33/100.76 , complement( composition( top, top ) ) ) ==> zero }.
% 100.33/100.76 parent1[0; 16]: (217769) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z )
% 100.33/100.76 , Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := complement( composition( top, top ) )
% 100.33/100.76 Z := top
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217775) {G2,W15,D5,L1,V1,M1} { composition( join( X, top ),
% 100.33/100.76 complement( composition( top, top ) ) ) ==> composition( X, complement(
% 100.33/100.76 composition( top, top ) ) ) }.
% 100.33/100.76 parent0[0]: (450) {G12,W5,D3,L1,V1,M1} P(418,158) { join( X, zero ) ==> X
% 100.33/100.76 }.
% 100.33/100.76 parent1[0; 9]: (217774) {G1,W17,D6,L1,V1,M1} { composition( join( X, top )
% 100.33/100.76 , complement( composition( top, top ) ) ) ==> join( composition( X,
% 100.33/100.76 complement( composition( top, top ) ) ), zero ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := composition( X, complement( composition( top, top ) ) )
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217776) {G3,W13,D5,L1,V1,M1} { composition( top, complement(
% 100.33/100.76 composition( top, top ) ) ) ==> composition( X, complement( composition(
% 100.33/100.76 top, top ) ) ) }.
% 100.33/100.76 parent0[0]: (233) {G8,W5,D3,L1,V1,M1} P(11,24);d(230) { join( X, top ) ==>
% 100.33/100.76 top }.
% 100.33/100.76 parent1[0; 2]: (217775) {G2,W15,D5,L1,V1,M1} { composition( join( X, top )
% 100.33/100.76 , complement( composition( top, top ) ) ) ==> composition( X, complement
% 100.33/100.76 ( composition( top, top ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217777) {G4,W8,D5,L1,V1,M1} { zero ==> composition( X,
% 100.33/100.76 complement( composition( top, top ) ) ) }.
% 100.33/100.76 parent0[0]: (824) {G14,W8,D5,L1,V0,M1} P(364,794);d(383) { composition( top
% 100.33/100.76 , complement( composition( top, top ) ) ) ==> zero }.
% 100.33/100.76 parent1[0; 1]: (217776) {G3,W13,D5,L1,V1,M1} { composition( top,
% 100.33/100.76 complement( composition( top, top ) ) ) ==> composition( X, complement(
% 100.33/100.76 composition( top, top ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217778) {G4,W8,D5,L1,V1,M1} { composition( X, complement(
% 100.33/100.76 composition( top, top ) ) ) ==> zero }.
% 100.33/100.76 parent0[0]: (217777) {G4,W8,D5,L1,V1,M1} { zero ==> composition( X,
% 100.33/100.76 complement( composition( top, top ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (843) {G15,W8,D5,L1,V1,M1} P(824,6);d(450);d(233);d(824) {
% 100.33/100.76 composition( X, complement( composition( top, top ) ) ) ==> zero }.
% 100.33/100.76 parent0: (217778) {G4,W8,D5,L1,V1,M1} { composition( X, complement(
% 100.33/100.76 composition( top, top ) ) ) ==> zero }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217780) {G18,W9,D4,L1,V2,M1} { join( X, Y ) ==> join( join( X, Y
% 100.33/100.76 ), X ) }.
% 100.33/100.76 parent0[0]: (479) {G18,W9,D4,L1,V2,M1} P(469,27) { join( join( X, Y ), X )
% 100.33/100.76 ==> join( X, Y ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217782) {G2,W23,D7,L1,V2,M1} { join( composition( X, complement
% 100.33/100.76 ( converse( composition( Y, X ) ) ) ), complement( converse( Y ) ) ) ==>
% 100.33/100.76 join( complement( converse( Y ) ), composition( X, complement( converse(
% 100.33/100.76 composition( Y, X ) ) ) ) ) }.
% 100.33/100.76 parent0[0]: (88) {G1,W15,D7,L1,V2,M1} P(9,10);d(7) { join( composition( X,
% 100.33/100.76 complement( converse( composition( Y, X ) ) ) ), complement( converse( Y
% 100.33/100.76 ) ) ) ==> complement( converse( Y ) ) }.
% 100.33/100.76 parent1[0; 13]: (217780) {G18,W9,D4,L1,V2,M1} { join( X, Y ) ==> join(
% 100.33/100.76 join( X, Y ), X ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := composition( X, complement( converse( composition( Y, X ) ) ) )
% 100.33/100.76 Y := complement( converse( Y ) )
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217783) {G2,W15,D7,L1,V2,M1} { complement( converse( Y ) ) ==>
% 100.33/100.76 join( complement( converse( Y ) ), composition( X, complement( converse(
% 100.33/100.76 composition( Y, X ) ) ) ) ) }.
% 100.33/100.76 parent0[0]: (88) {G1,W15,D7,L1,V2,M1} P(9,10);d(7) { join( composition( X,
% 100.33/100.76 complement( converse( composition( Y, X ) ) ) ), complement( converse( Y
% 100.33/100.76 ) ) ) ==> complement( converse( Y ) ) }.
% 100.33/100.76 parent1[0; 1]: (217782) {G2,W23,D7,L1,V2,M1} { join( composition( X,
% 100.33/100.76 complement( converse( composition( Y, X ) ) ) ), complement( converse( Y
% 100.33/100.76 ) ) ) ==> join( complement( converse( Y ) ), composition( X, complement
% 100.33/100.76 ( converse( composition( Y, X ) ) ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217785) {G2,W15,D7,L1,V2,M1} { join( complement( converse( X ) )
% 100.33/100.76 , composition( Y, complement( converse( composition( X, Y ) ) ) ) ) ==>
% 100.33/100.76 complement( converse( X ) ) }.
% 100.33/100.76 parent0[0]: (217783) {G2,W15,D7,L1,V2,M1} { complement( converse( Y ) )
% 100.33/100.76 ==> join( complement( converse( Y ) ), composition( X, complement(
% 100.33/100.76 converse( composition( Y, X ) ) ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (850) {G19,W15,D7,L1,V2,M1} P(88,479) { join( complement(
% 100.33/100.76 converse( Y ) ), composition( X, complement( converse( composition( Y, X
% 100.33/100.76 ) ) ) ) ) ==> complement( converse( Y ) ) }.
% 100.33/100.76 parent0: (217785) {G2,W15,D7,L1,V2,M1} { join( complement( converse( X ) )
% 100.33/100.76 , composition( Y, complement( converse( composition( X, Y ) ) ) ) ) ==>
% 100.33/100.76 complement( converse( X ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217787) {G15,W8,D5,L1,V1,M1} { zero ==> composition( X,
% 100.33/100.76 complement( composition( top, top ) ) ) }.
% 100.33/100.76 parent0[0]: (843) {G15,W8,D5,L1,V1,M1} P(824,6);d(450);d(233);d(824) {
% 100.33/100.76 composition( X, complement( composition( top, top ) ) ) ==> zero }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217789) {G5,W6,D4,L1,V0,M1} { zero ==> complement( composition(
% 100.33/100.76 top, top ) ) }.
% 100.33/100.76 parent0[0]: (137) {G4,W5,D3,L1,V1,M1} P(136,130) { composition( one, X )
% 100.33/100.76 ==> X }.
% 100.33/100.76 parent1[0; 2]: (217787) {G15,W8,D5,L1,V1,M1} { zero ==> composition( X,
% 100.33/100.76 complement( composition( top, top ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := complement( composition( top, top ) )
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := one
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217790) {G5,W6,D4,L1,V0,M1} { complement( composition( top, top )
% 100.33/100.76 ) ==> zero }.
% 100.33/100.76 parent0[0]: (217789) {G5,W6,D4,L1,V0,M1} { zero ==> complement(
% 100.33/100.76 composition( top, top ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (853) {G16,W6,D4,L1,V0,M1} P(843,137) { complement(
% 100.33/100.76 composition( top, top ) ) ==> zero }.
% 100.33/100.76 parent0: (217790) {G5,W6,D4,L1,V0,M1} { complement( composition( top, top
% 100.33/100.76 ) ) ==> zero }.
% 100.33/100.76 substitution0:
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217792) {G16,W5,D4,L1,V1,M1} { X ==> complement( complement( X )
% 100.33/100.76 ) }.
% 100.33/100.76 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.76 complement( X ) ) ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217794) {G17,W6,D3,L1,V0,M1} { composition( top, top ) ==>
% 100.33/100.76 complement( zero ) }.
% 100.33/100.76 parent0[0]: (853) {G16,W6,D4,L1,V0,M1} P(843,137) { complement( composition
% 100.33/100.76 ( top, top ) ) ==> zero }.
% 100.33/100.76 parent1[0; 5]: (217792) {G16,W5,D4,L1,V1,M1} { X ==> complement(
% 100.33/100.76 complement( X ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := composition( top, top )
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217795) {G14,W5,D3,L1,V0,M1} { composition( top, top ) ==> top
% 100.33/100.76 }.
% 100.33/100.76 parent0[0]: (451) {G13,W4,D3,L1,V0,M1} P(146,418);d(450);d(58) { complement
% 100.33/100.76 ( zero ) ==> top }.
% 100.33/100.76 parent1[0; 4]: (217794) {G17,W6,D3,L1,V0,M1} { composition( top, top ) ==>
% 100.33/100.76 complement( zero ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (860) {G17,W5,D3,L1,V0,M1} P(853,460);d(451) { composition(
% 100.33/100.76 top, top ) ==> top }.
% 100.33/100.76 parent0: (217795) {G14,W5,D3,L1,V0,M1} { composition( top, top ) ==> top
% 100.33/100.76 }.
% 100.33/100.76 substitution0:
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217798) {G0,W11,D4,L1,V3,M1} { composition( composition( X, Y ),
% 100.33/100.76 Z ) ==> composition( X, composition( Y, Z ) ) }.
% 100.33/100.76 parent0[0]: (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z
% 100.33/100.76 ) ) ==> composition( composition( X, Y ), Z ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 Z := Z
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217800) {G1,W9,D4,L1,V1,M1} { composition( composition( X, top )
% 100.33/100.76 , top ) ==> composition( X, top ) }.
% 100.33/100.76 parent0[0]: (860) {G17,W5,D3,L1,V0,M1} P(853,460);d(451) { composition( top
% 100.33/100.76 , top ) ==> top }.
% 100.33/100.76 parent1[0; 8]: (217798) {G0,W11,D4,L1,V3,M1} { composition( composition( X
% 100.33/100.76 , Y ), Z ) ==> composition( X, composition( Y, Z ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := top
% 100.33/100.76 Z := top
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (861) {G18,W9,D4,L1,V1,M1} P(860,4) { composition( composition
% 100.33/100.76 ( X, top ), top ) ==> composition( X, top ) }.
% 100.33/100.76 parent0: (217800) {G1,W9,D4,L1,V1,M1} { composition( composition( X, top )
% 100.33/100.76 , top ) ==> composition( X, top ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217804) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z ), Y ) ==>
% 100.33/100.76 join( composition( X, Y ), composition( Z, Y ) ) }.
% 100.33/100.76 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 100.33/100.76 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Z
% 100.33/100.76 Z := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217807) {G1,W15,D5,L1,V2,M1} { composition( join( X, composition
% 100.33/100.76 ( Y, top ) ), top ) ==> join( composition( X, top ), composition( Y, top
% 100.33/100.76 ) ) }.
% 100.33/100.76 parent0[0]: (861) {G18,W9,D4,L1,V1,M1} P(860,4) { composition( composition
% 100.33/100.76 ( X, top ), top ) ==> composition( X, top ) }.
% 100.33/100.76 parent1[0; 12]: (217804) {G0,W13,D4,L1,V3,M1} { composition( join( X, Z )
% 100.33/100.76 , Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := top
% 100.33/100.76 Z := composition( Y, top )
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217808) {G1,W13,D5,L1,V2,M1} { composition( join( X, composition
% 100.33/100.76 ( Y, top ) ), top ) ==> composition( join( X, Y ), top ) }.
% 100.33/100.76 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 100.33/100.76 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 100.33/100.76 parent1[0; 8]: (217807) {G1,W15,D5,L1,V2,M1} { composition( join( X,
% 100.33/100.76 composition( Y, top ) ), top ) ==> join( composition( X, top ),
% 100.33/100.76 composition( Y, top ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 Z := top
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (868) {G19,W13,D5,L1,V2,M1} P(861,6);d(6) { composition( join
% 100.33/100.76 ( Y, composition( X, top ) ), top ) ==> composition( join( Y, X ), top )
% 100.33/100.76 }.
% 100.33/100.76 parent0: (217808) {G1,W13,D5,L1,V2,M1} { composition( join( X, composition
% 100.33/100.76 ( Y, top ) ), top ) ==> composition( join( X, Y ), top ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217811) {G1,W9,D4,L1,V1,M1} { join( X, one ) ==> join( join( X,
% 100.33/100.76 skol1 ), one ) }.
% 100.33/100.76 parent0[0]: (29) {G1,W9,D4,L1,V1,M1} P(13,1) { join( join( X, skol1 ), one
% 100.33/100.76 ) ==> join( X, one ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217815) {G2,W11,D6,L1,V1,M1} { join( converse( meet( X, converse
% 100.33/100.76 ( skol1 ) ) ), one ) ==> join( skol1, one ) }.
% 100.33/100.76 parent0[0]: (760) {G25,W9,D6,L1,V2,M1} P(756,21);d(7) { join( converse(
% 100.33/100.76 meet( X, converse( Y ) ) ), Y ) ==> Y }.
% 100.33/100.76 parent1[0; 9]: (217811) {G1,W9,D4,L1,V1,M1} { join( X, one ) ==> join(
% 100.33/100.76 join( X, skol1 ), one ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := skol1
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := converse( meet( X, converse( skol1 ) ) )
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217816) {G1,W9,D6,L1,V1,M1} { join( converse( meet( X, converse
% 100.33/100.76 ( skol1 ) ) ), one ) ==> one }.
% 100.33/100.76 parent0[0]: (13) {G0,W5,D3,L1,V0,M1} I { join( skol1, one ) ==> one }.
% 100.33/100.76 parent1[0; 8]: (217815) {G2,W11,D6,L1,V1,M1} { join( converse( meet( X,
% 100.33/100.76 converse( skol1 ) ) ), one ) ==> join( skol1, one ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217817) {G2,W9,D6,L1,V1,M1} { converse( join( meet( X, converse
% 100.33/100.76 ( skol1 ) ), one ) ) ==> one }.
% 100.33/100.76 parent0[0]: (139) {G4,W9,D4,L1,V1,M1} P(136,8) { join( converse( X ), one )
% 100.33/100.76 ==> converse( join( X, one ) ) }.
% 100.33/100.76 parent1[0; 1]: (217816) {G1,W9,D6,L1,V1,M1} { join( converse( meet( X,
% 100.33/100.76 converse( skol1 ) ) ), one ) ==> one }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := meet( X, converse( skol1 ) )
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (899) {G26,W9,D6,L1,V1,M1} P(760,29);d(13);d(139) { converse(
% 100.33/100.76 join( meet( X, converse( skol1 ) ), one ) ) ==> one }.
% 100.33/100.76 parent0: (217817) {G2,W9,D6,L1,V1,M1} { converse( join( meet( X, converse
% 100.33/100.76 ( skol1 ) ), one ) ) ==> one }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217820) {G2,W13,D5,L1,V3,M1} { converse( join( join( Y, Z ), X )
% 100.33/100.76 ) = converse( join( join( X, Y ), Z ) ) }.
% 100.33/100.76 parent0[0]: (30) {G2,W13,D5,L1,V3,M1} P(1,19) { converse( join( join( X, Y
% 100.33/100.76 ), Z ) ) = converse( join( join( Y, Z ), X ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 Z := Z
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217829) {G3,W15,D7,L1,V3,M1} { converse( join( X, Z ) ) =
% 100.33/100.76 converse( join( join( Z, X ), converse( meet( converse( X ), Y ) ) ) )
% 100.33/100.76 }.
% 100.33/100.76 parent0[0]: (733) {G21,W9,D6,L1,V2,M1} P(699,20);d(7) { join( X, converse(
% 100.33/100.76 meet( converse( X ), Y ) ) ) ==> X }.
% 100.33/100.76 parent1[0; 3]: (217820) {G2,W13,D5,L1,V3,M1} { converse( join( join( Y, Z
% 100.33/100.76 ), X ) ) = converse( join( join( X, Y ), Z ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := Z
% 100.33/100.76 Y := X
% 100.33/100.76 Z := converse( meet( converse( X ), Y ) )
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217832) {G2,W14,D5,L1,V3,M1} { converse( join( X, Y ) ) = join(
% 100.33/100.76 converse( join( Y, X ) ), meet( converse( X ), Z ) ) }.
% 100.33/100.76 parent0[0]: (21) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 100.33/100.76 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 100.33/100.76 parent1[0; 5]: (217829) {G3,W15,D7,L1,V3,M1} { converse( join( X, Z ) ) =
% 100.33/100.76 converse( join( join( Z, X ), converse( meet( converse( X ), Y ) ) ) )
% 100.33/100.76 }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := meet( converse( X ), Z )
% 100.33/100.76 Y := join( Y, X )
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Z
% 100.33/100.76 Z := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217833) {G2,W14,D5,L1,V3,M1} { join( converse( join( Y, X ) ),
% 100.33/100.76 meet( converse( X ), Z ) ) = converse( join( X, Y ) ) }.
% 100.33/100.76 parent0[0]: (217832) {G2,W14,D5,L1,V3,M1} { converse( join( X, Y ) ) =
% 100.33/100.76 join( converse( join( Y, X ) ), meet( converse( X ), Z ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 Z := Z
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (908) {G22,W14,D5,L1,V3,M1} P(733,30);d(21) { join( converse(
% 100.33/100.76 join( Z, X ) ), meet( converse( X ), Y ) ) ==> converse( join( X, Z ) )
% 100.33/100.76 }.
% 100.33/100.76 parent0: (217833) {G2,W14,D5,L1,V3,M1} { join( converse( join( Y, X ) ),
% 100.33/100.76 meet( converse( X ), Z ) ) = converse( join( X, Y ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Z
% 100.33/100.76 Z := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217835) {G0,W5,D4,L1,V1,M1} { X ==> converse( converse( X ) ) }.
% 100.33/100.76 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217837) {G1,W9,D5,L1,V1,M1} { join( meet( X, converse( skol1 ) )
% 100.33/100.76 , one ) ==> converse( one ) }.
% 100.33/100.76 parent0[0]: (899) {G26,W9,D6,L1,V1,M1} P(760,29);d(13);d(139) { converse(
% 100.33/100.76 join( meet( X, converse( skol1 ) ), one ) ) ==> one }.
% 100.33/100.76 parent1[0; 8]: (217835) {G0,W5,D4,L1,V1,M1} { X ==> converse( converse( X
% 100.33/100.76 ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := join( meet( X, converse( skol1 ) ), one )
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217838) {G2,W8,D5,L1,V1,M1} { join( meet( X, converse( skol1 ) )
% 100.33/100.76 , one ) ==> one }.
% 100.33/100.76 parent0[0]: (136) {G3,W4,D3,L1,V0,M1} P(130,5) { converse( one ) ==> one
% 100.33/100.76 }.
% 100.33/100.76 parent1[0; 7]: (217837) {G1,W9,D5,L1,V1,M1} { join( meet( X, converse(
% 100.33/100.76 skol1 ) ), one ) ==> converse( one ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (938) {G27,W8,D5,L1,V1,M1} P(899,7);d(136) { join( meet( X,
% 100.33/100.76 converse( skol1 ) ), one ) ==> one }.
% 100.33/100.76 parent0: (217838) {G2,W8,D5,L1,V1,M1} { join( meet( X, converse( skol1 ) )
% 100.33/100.76 , one ) ==> one }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217841) {G18,W9,D4,L1,V2,M1} { join( X, Y ) ==> join( join( X, Y
% 100.33/100.76 ), X ) }.
% 100.33/100.76 parent0[0]: (479) {G18,W9,D4,L1,V2,M1} P(469,27) { join( join( X, Y ), X )
% 100.33/100.76 ==> join( X, Y ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217843) {G19,W13,D5,L1,V1,M1} { join( meet( X, converse( skol1 )
% 100.33/100.76 ), one ) ==> join( one, meet( X, converse( skol1 ) ) ) }.
% 100.33/100.76 parent0[0]: (938) {G27,W8,D5,L1,V1,M1} P(899,7);d(136) { join( meet( X,
% 100.33/100.76 converse( skol1 ) ), one ) ==> one }.
% 100.33/100.76 parent1[0; 8]: (217841) {G18,W9,D4,L1,V2,M1} { join( X, Y ) ==> join( join
% 100.33/100.76 ( X, Y ), X ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := meet( X, converse( skol1 ) )
% 100.33/100.76 Y := one
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217844) {G20,W8,D5,L1,V1,M1} { one ==> join( one, meet( X,
% 100.33/100.76 converse( skol1 ) ) ) }.
% 100.33/100.76 parent0[0]: (938) {G27,W8,D5,L1,V1,M1} P(899,7);d(136) { join( meet( X,
% 100.33/100.76 converse( skol1 ) ), one ) ==> one }.
% 100.33/100.76 parent1[0; 1]: (217843) {G19,W13,D5,L1,V1,M1} { join( meet( X, converse(
% 100.33/100.76 skol1 ) ), one ) ==> join( one, meet( X, converse( skol1 ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217846) {G20,W8,D5,L1,V1,M1} { join( one, meet( X, converse(
% 100.33/100.76 skol1 ) ) ) ==> one }.
% 100.33/100.76 parent0[0]: (217844) {G20,W8,D5,L1,V1,M1} { one ==> join( one, meet( X,
% 100.33/100.76 converse( skol1 ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (939) {G28,W8,D5,L1,V1,M1} P(938,479) { join( one, meet( X,
% 100.33/100.76 converse( skol1 ) ) ) ==> one }.
% 100.33/100.76 parent0: (217846) {G20,W8,D5,L1,V1,M1} { join( one, meet( X, converse(
% 100.33/100.76 skol1 ) ) ) ==> one }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217849) {G28,W8,D5,L1,V1,M1} { one ==> join( one, meet( X,
% 100.33/100.76 converse( skol1 ) ) ) }.
% 100.33/100.76 parent0[0]: (939) {G28,W8,D5,L1,V1,M1} P(938,479) { join( one, meet( X,
% 100.33/100.76 converse( skol1 ) ) ) ==> one }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217850) {G21,W8,D5,L1,V1,M1} { one ==> join( one, meet( converse
% 100.33/100.76 ( skol1 ), X ) ) }.
% 100.33/100.76 parent0[0]: (582) {G20,W9,D4,L1,V2,M1} P(580,43);d(455);d(3) { meet( meet(
% 100.33/100.76 X, Y ), X ) ==> meet( X, Y ) }.
% 100.33/100.76 parent1[0; 4]: (217849) {G28,W8,D5,L1,V1,M1} { one ==> join( one, meet( X
% 100.33/100.76 , converse( skol1 ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := converse( skol1 )
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := meet( converse( skol1 ), X )
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217851) {G21,W8,D5,L1,V1,M1} { join( one, meet( converse( skol1 )
% 100.33/100.76 , X ) ) ==> one }.
% 100.33/100.76 parent0[0]: (217850) {G21,W8,D5,L1,V1,M1} { one ==> join( one, meet(
% 100.33/100.76 converse( skol1 ), X ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (947) {G29,W8,D5,L1,V1,M1} P(582,939) { join( one, meet(
% 100.33/100.76 converse( skol1 ), X ) ) ==> one }.
% 100.33/100.76 parent0: (217851) {G21,W8,D5,L1,V1,M1} { join( one, meet( converse( skol1
% 100.33/100.76 ), X ) ) ==> one }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217853) {G9,W8,D4,L1,V2,M1} { top ==> join( join( X, Y ),
% 100.33/100.76 complement( Y ) ) }.
% 100.33/100.76 parent0[0]: (296) {G9,W8,D4,L1,V2,M1} S(28);d(233) { join( join( Y, X ),
% 100.33/100.76 complement( X ) ) ==> top }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217854) {G10,W9,D6,L1,V1,M1} { top ==> join( one, complement(
% 100.33/100.76 meet( converse( skol1 ), X ) ) ) }.
% 100.33/100.76 parent0[0]: (947) {G29,W8,D5,L1,V1,M1} P(582,939) { join( one, meet(
% 100.33/100.76 converse( skol1 ), X ) ) ==> one }.
% 100.33/100.76 parent1[0; 3]: (217853) {G9,W8,D4,L1,V2,M1} { top ==> join( join( X, Y ),
% 100.33/100.76 complement( Y ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := one
% 100.33/100.76 Y := meet( converse( skol1 ), X )
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217855) {G10,W9,D6,L1,V1,M1} { join( one, complement( meet(
% 100.33/100.76 converse( skol1 ), X ) ) ) ==> top }.
% 100.33/100.76 parent0[0]: (217854) {G10,W9,D6,L1,V1,M1} { top ==> join( one, complement
% 100.33/100.76 ( meet( converse( skol1 ), X ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (953) {G30,W9,D6,L1,V1,M1} P(947,296) { join( one, complement
% 100.33/100.76 ( meet( converse( skol1 ), X ) ) ) ==> top }.
% 100.33/100.76 parent0: (217855) {G10,W9,D6,L1,V1,M1} { join( one, complement( meet(
% 100.33/100.76 converse( skol1 ), X ) ) ) ==> top }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217856) {G30,W9,D6,L1,V1,M1} { top ==> join( one, complement(
% 100.33/100.76 meet( converse( skol1 ), X ) ) ) }.
% 100.33/100.76 parent0[0]: (953) {G30,W9,D6,L1,V1,M1} P(947,296) { join( one, complement(
% 100.33/100.76 meet( converse( skol1 ), X ) ) ) ==> top }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217857) {G1,W9,D6,L1,V1,M1} { top ==> join( complement( meet(
% 100.33/100.76 converse( skol1 ), X ) ), one ) }.
% 100.33/100.76 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.76 parent1[0; 2]: (217856) {G30,W9,D6,L1,V1,M1} { top ==> join( one,
% 100.33/100.76 complement( meet( converse( skol1 ), X ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := one
% 100.33/100.76 Y := complement( meet( converse( skol1 ), X ) )
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217860) {G1,W9,D6,L1,V1,M1} { join( complement( meet( converse(
% 100.33/100.76 skol1 ), X ) ), one ) ==> top }.
% 100.33/100.76 parent0[0]: (217857) {G1,W9,D6,L1,V1,M1} { top ==> join( complement( meet
% 100.33/100.76 ( converse( skol1 ), X ) ), one ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (969) {G31,W9,D6,L1,V1,M1} P(953,0) { join( complement( meet(
% 100.33/100.76 converse( skol1 ), X ) ), one ) ==> top }.
% 100.33/100.76 parent0: (217860) {G1,W9,D6,L1,V1,M1} { join( complement( meet( converse(
% 100.33/100.76 skol1 ), X ) ), one ) ==> top }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217862) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 100.33/100.76 complement( join( complement( X ), Y ) ) ) }.
% 100.33/100.76 parent0[0]: (43) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 100.33/100.76 complement( join( complement( X ), Y ) ) ) ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217865) {G2,W14,D6,L1,V1,M1} { meet( converse( skol1 ), X ) ==>
% 100.33/100.76 join( meet( meet( converse( skol1 ), X ), one ), complement( top ) ) }.
% 100.33/100.76 parent0[0]: (969) {G31,W9,D6,L1,V1,M1} P(953,0) { join( complement( meet(
% 100.33/100.76 converse( skol1 ), X ) ), one ) ==> top }.
% 100.33/100.76 parent1[0; 13]: (217862) {G1,W11,D6,L1,V2,M1} { X ==> join( meet( X, Y ),
% 100.33/100.76 complement( join( complement( X ), Y ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := meet( converse( skol1 ), X )
% 100.33/100.76 Y := one
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217866) {G2,W13,D6,L1,V1,M1} { meet( converse( skol1 ), X ) ==>
% 100.33/100.76 join( meet( meet( converse( skol1 ), X ), one ), zero ) }.
% 100.33/100.76 parent0[0]: (58) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 100.33/100.76 zero }.
% 100.33/100.76 parent1[0; 12]: (217865) {G2,W14,D6,L1,V1,M1} { meet( converse( skol1 ), X
% 100.33/100.76 ) ==> join( meet( meet( converse( skol1 ), X ), one ), complement( top )
% 100.33/100.76 ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217867) {G3,W11,D5,L1,V1,M1} { meet( converse( skol1 ), X ) ==>
% 100.33/100.76 meet( meet( converse( skol1 ), X ), one ) }.
% 100.33/100.76 parent0[0]: (450) {G12,W5,D3,L1,V1,M1} P(418,158) { join( X, zero ) ==> X
% 100.33/100.76 }.
% 100.33/100.76 parent1[0; 5]: (217866) {G2,W13,D6,L1,V1,M1} { meet( converse( skol1 ), X
% 100.33/100.76 ) ==> join( meet( meet( converse( skol1 ), X ), one ), zero ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := meet( meet( converse( skol1 ), X ), one )
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217868) {G3,W11,D5,L1,V1,M1} { meet( meet( converse( skol1 ), X )
% 100.33/100.76 , one ) ==> meet( converse( skol1 ), X ) }.
% 100.33/100.76 parent0[0]: (217867) {G3,W11,D5,L1,V1,M1} { meet( converse( skol1 ), X )
% 100.33/100.76 ==> meet( meet( converse( skol1 ), X ), one ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (971) {G32,W11,D5,L1,V1,M1} P(969,43);d(58);d(450) { meet(
% 100.33/100.76 meet( converse( skol1 ), X ), one ) ==> meet( converse( skol1 ), X ) }.
% 100.33/100.76 parent0: (217868) {G3,W11,D5,L1,V1,M1} { meet( meet( converse( skol1 ), X
% 100.33/100.76 ), one ) ==> meet( converse( skol1 ), X ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217870) {G17,W10,D4,L1,V2,M1} { complement( meet( X, Y ) ) ==>
% 100.33/100.76 join( complement( X ), complement( Y ) ) }.
% 100.33/100.76 parent0[0]: (473) {G17,W10,D4,L1,V2,M1} P(3,460) { join( complement( X ),
% 100.33/100.76 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217871) {G17,W10,D5,L1,V2,M1} { complement( meet( complement( X
% 100.33/100.76 ), Y ) ) ==> join( X, complement( Y ) ) }.
% 100.33/100.76 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.76 complement( X ) ) ==> X }.
% 100.33/100.76 parent1[0; 7]: (217870) {G17,W10,D4,L1,V2,M1} { complement( meet( X, Y ) )
% 100.33/100.76 ==> join( complement( X ), complement( Y ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := complement( X )
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (994) {G18,W10,D5,L1,V2,M1} P(460,473) { complement( meet(
% 100.33/100.76 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 100.33/100.76 parent0: (217871) {G17,W10,D5,L1,V2,M1} { complement( meet( complement( X
% 100.33/100.76 ), Y ) ) ==> join( X, complement( Y ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217876) {G17,W10,D4,L1,V2,M1} { complement( meet( X, Y ) ) ==>
% 100.33/100.76 join( complement( X ), complement( Y ) ) }.
% 100.33/100.76 parent0[0]: (473) {G17,W10,D4,L1,V2,M1} P(3,460) { join( complement( X ),
% 100.33/100.76 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217878) {G17,W10,D5,L1,V2,M1} { complement( meet( X, complement
% 100.33/100.76 ( Y ) ) ) ==> join( complement( X ), Y ) }.
% 100.33/100.76 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.76 complement( X ) ) ==> X }.
% 100.33/100.76 parent1[0; 9]: (217876) {G17,W10,D4,L1,V2,M1} { complement( meet( X, Y ) )
% 100.33/100.76 ==> join( complement( X ), complement( Y ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := complement( Y )
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (995) {G18,W10,D5,L1,V2,M1} P(460,473) { complement( meet( Y,
% 100.33/100.76 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 100.33/100.76 parent0: (217878) {G17,W10,D5,L1,V2,M1} { complement( meet( X, complement
% 100.33/100.76 ( Y ) ) ) ==> join( complement( X ), Y ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217883) {G2,W14,D5,L1,V3,M1} { join( join( complement( X ), Y )
% 100.33/100.76 , complement( Z ) ) = join( complement( meet( X, Z ) ), Y ) }.
% 100.33/100.76 parent0[0]: (473) {G17,W10,D4,L1,V2,M1} P(3,460) { join( complement( X ),
% 100.33/100.76 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 100.33/100.76 parent1[0; 9]: (27) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ),
% 100.33/100.76 X ) = join( join( Z, X ), Y ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Z
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := complement( Z )
% 100.33/100.76 Y := Y
% 100.33/100.76 Z := complement( X )
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (999) {G18,W14,D5,L1,V3,M1} P(473,27) { join( join( complement
% 100.33/100.76 ( X ), Z ), complement( Y ) ) ==> join( complement( meet( X, Y ) ), Z )
% 100.33/100.76 }.
% 100.33/100.76 parent0: (217883) {G2,W14,D5,L1,V3,M1} { join( join( complement( X ), Y )
% 100.33/100.76 , complement( Z ) ) = join( complement( meet( X, Z ) ), Y ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Z
% 100.33/100.76 Z := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217884) {G17,W10,D4,L1,V2,M1} { complement( meet( X, Y ) ) ==>
% 100.33/100.76 join( complement( X ), complement( Y ) ) }.
% 100.33/100.76 parent0[0]: (473) {G17,W10,D4,L1,V2,M1} P(3,460) { join( complement( X ),
% 100.33/100.76 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217886) {G1,W10,D4,L1,V2,M1} { complement( meet( X, Y ) ) ==>
% 100.33/100.76 join( complement( Y ), complement( X ) ) }.
% 100.33/100.76 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.76 parent1[0; 5]: (217884) {G17,W10,D4,L1,V2,M1} { complement( meet( X, Y ) )
% 100.33/100.76 ==> join( complement( X ), complement( Y ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := complement( X )
% 100.33/100.76 Y := complement( Y )
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217888) {G2,W9,D4,L1,V2,M1} { complement( meet( X, Y ) ) ==>
% 100.33/100.76 complement( meet( Y, X ) ) }.
% 100.33/100.76 parent0[0]: (473) {G17,W10,D4,L1,V2,M1} P(3,460) { join( complement( X ),
% 100.33/100.76 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 100.33/100.76 parent1[0; 5]: (217886) {G1,W10,D4,L1,V2,M1} { complement( meet( X, Y ) )
% 100.33/100.76 ==> join( complement( Y ), complement( X ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (1004) {G18,W9,D4,L1,V2,M1} P(473,0);d(473) { complement( meet
% 100.33/100.76 ( X, Y ) ) = complement( meet( Y, X ) ) }.
% 100.33/100.76 parent0: (217888) {G2,W9,D4,L1,V2,M1} { complement( meet( X, Y ) ) ==>
% 100.33/100.76 complement( meet( Y, X ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217891) {G14,W8,D5,L1,V2,M1} { meet( X, join( X, complement( Y )
% 100.33/100.76 ) ) ==> X }.
% 100.33/100.76 parent0[0]: (994) {G18,W10,D5,L1,V2,M1} P(460,473) { complement( meet(
% 100.33/100.76 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 100.33/100.76 parent1[0; 3]: (513) {G13,W9,D6,L1,V2,M1} P(490,43);d(58);d(450) { meet( X
% 100.33/100.76 , complement( meet( complement( X ), Y ) ) ) ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (1005) {G19,W8,D5,L1,V2,M1} S(513);d(994) { meet( X, join( X,
% 100.33/100.76 complement( Y ) ) ) ==> X }.
% 100.33/100.76 parent0: (217891) {G14,W8,D5,L1,V2,M1} { meet( X, join( X, complement( Y )
% 100.33/100.76 ) ) ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217895) {G2,W10,D5,L1,V2,M1} { join( meet( X, Y ), meet( X,
% 100.33/100.76 complement( Y ) ) ) ==> X }.
% 100.33/100.76 parent0[0]: (472) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join(
% 100.33/100.76 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 100.33/100.76 parent1[0; 5]: (43) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ),
% 100.33/100.76 complement( join( complement( X ), Y ) ) ) ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (1009) {G18,W10,D5,L1,V2,M1} S(43);d(472) { join( meet( X, Y )
% 100.33/100.76 , meet( X, complement( Y ) ) ) ==> X }.
% 100.33/100.76 parent0: (217895) {G2,W10,D5,L1,V2,M1} { join( meet( X, Y ), meet( X,
% 100.33/100.76 complement( Y ) ) ) ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217898) {G19,W8,D5,L1,V2,M1} { X ==> meet( X, join( X, complement
% 100.33/100.76 ( Y ) ) ) }.
% 100.33/100.76 parent0[0]: (1005) {G19,W8,D5,L1,V2,M1} S(513);d(994) { meet( X, join( X,
% 100.33/100.76 complement( Y ) ) ) ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217899) {G17,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y ) ) }.
% 100.33/100.76 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.76 complement( X ) ) ==> X }.
% 100.33/100.76 parent1[0; 6]: (217898) {G19,W8,D5,L1,V2,M1} { X ==> meet( X, join( X,
% 100.33/100.76 complement( Y ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := complement( Y )
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217900) {G17,W7,D4,L1,V2,M1} { meet( X, join( X, Y ) ) ==> X }.
% 100.33/100.76 parent0[0]: (217899) {G17,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y ) )
% 100.33/100.76 }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (1028) {G20,W7,D4,L1,V2,M1} P(460,1005) { meet( Y, join( Y, X
% 100.33/100.76 ) ) ==> Y }.
% 100.33/100.76 parent0: (217900) {G17,W7,D4,L1,V2,M1} { meet( X, join( X, Y ) ) ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217902) {G22,W9,D4,L1,V2,M1} { meet( Y, X ) ==> meet( X, meet( Y
% 100.33/100.76 , X ) ) }.
% 100.33/100.76 parent0[0]: (691) {G22,W9,D4,L1,V2,M1} P(56,689) { meet( X, meet( Y, X ) )
% 100.33/100.76 ==> meet( Y, X ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217904) {G21,W11,D4,L1,V2,M1} { meet( X, join( X, Y ) ) ==> meet
% 100.33/100.76 ( join( X, Y ), X ) }.
% 100.33/100.76 parent0[0]: (1028) {G20,W7,D4,L1,V2,M1} P(460,1005) { meet( Y, join( Y, X )
% 100.33/100.76 ) ==> Y }.
% 100.33/100.76 parent1[0; 10]: (217902) {G22,W9,D4,L1,V2,M1} { meet( Y, X ) ==> meet( X,
% 100.33/100.76 meet( Y, X ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := join( X, Y )
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217905) {G21,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X ) }.
% 100.33/100.76 parent0[0]: (1028) {G20,W7,D4,L1,V2,M1} P(460,1005) { meet( Y, join( Y, X )
% 100.33/100.76 ) ==> Y }.
% 100.33/100.76 parent1[0; 1]: (217904) {G21,W11,D4,L1,V2,M1} { meet( X, join( X, Y ) )
% 100.33/100.76 ==> meet( join( X, Y ), X ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217907) {G21,W7,D4,L1,V2,M1} { meet( join( X, Y ), X ) ==> X }.
% 100.33/100.76 parent0[0]: (217905) {G21,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X )
% 100.33/100.76 }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (1034) {G23,W7,D4,L1,V2,M1} P(1028,691) { meet( join( X, Y ),
% 100.33/100.76 X ) ==> X }.
% 100.33/100.76 parent0: (217907) {G21,W7,D4,L1,V2,M1} { meet( join( X, Y ), X ) ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217910) {G18,W8,D4,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 100.33/100.76 complement( Y ) ) }.
% 100.33/100.76 parent0[0]: (575) {G18,W8,D4,L1,V2,M1} P(571,56) { meet( meet( Y, X ),
% 100.33/100.76 complement( X ) ) ==> zero }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217911) {G19,W8,D5,L1,V2,M1} { zero ==> meet( X, complement(
% 100.33/100.76 join( X, Y ) ) ) }.
% 100.33/100.76 parent0[0]: (1028) {G20,W7,D4,L1,V2,M1} P(460,1005) { meet( Y, join( Y, X )
% 100.33/100.76 ) ==> Y }.
% 100.33/100.76 parent1[0; 3]: (217910) {G18,W8,D4,L1,V2,M1} { zero ==> meet( meet( X, Y )
% 100.33/100.76 , complement( Y ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := join( X, Y )
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217912) {G19,W8,D5,L1,V2,M1} { meet( X, complement( join( X, Y )
% 100.33/100.76 ) ) ==> zero }.
% 100.33/100.76 parent0[0]: (217911) {G19,W8,D5,L1,V2,M1} { zero ==> meet( X, complement(
% 100.33/100.76 join( X, Y ) ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (1035) {G21,W8,D5,L1,V2,M1} P(1028,575) { meet( X, complement
% 100.33/100.76 ( join( X, Y ) ) ) ==> zero }.
% 100.33/100.76 parent0: (217912) {G19,W8,D5,L1,V2,M1} { meet( X, complement( join( X, Y )
% 100.33/100.76 ) ) ==> zero }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217914) {G17,W8,D4,L1,V2,M1} { zero ==> meet( complement( X ),
% 100.33/100.76 meet( Y, X ) ) }.
% 100.33/100.76 parent0[0]: (571) {G17,W8,D4,L1,V2,M1} P(460,555) { meet( complement( X ),
% 100.33/100.76 meet( Y, X ) ) ==> zero }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217915) {G18,W8,D5,L1,V2,M1} { zero ==> meet( complement( join(
% 100.33/100.76 X, Y ) ), X ) }.
% 100.33/100.76 parent0[0]: (1028) {G20,W7,D4,L1,V2,M1} P(460,1005) { meet( Y, join( Y, X )
% 100.33/100.76 ) ==> Y }.
% 100.33/100.76 parent1[0; 7]: (217914) {G17,W8,D4,L1,V2,M1} { zero ==> meet( complement(
% 100.33/100.76 X ), meet( Y, X ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := join( X, Y )
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217916) {G18,W8,D5,L1,V2,M1} { meet( complement( join( X, Y ) ),
% 100.33/100.76 X ) ==> zero }.
% 100.33/100.76 parent0[0]: (217915) {G18,W8,D5,L1,V2,M1} { zero ==> meet( complement(
% 100.33/100.76 join( X, Y ) ), X ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (1036) {G21,W8,D5,L1,V2,M1} P(1028,571) { meet( complement(
% 100.33/100.76 join( X, Y ) ), X ) ==> zero }.
% 100.33/100.76 parent0: (217916) {G18,W8,D5,L1,V2,M1} { meet( complement( join( X, Y ) )
% 100.33/100.76 , X ) ==> zero }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217917) {G20,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y ) ) }.
% 100.33/100.76 parent0[0]: (1028) {G20,W7,D4,L1,V2,M1} P(460,1005) { meet( Y, join( Y, X )
% 100.33/100.76 ) ==> Y }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217918) {G1,W7,D4,L1,V2,M1} { X ==> meet( X, join( Y, X ) ) }.
% 100.33/100.76 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.76 parent1[0; 4]: (217917) {G20,W7,D4,L1,V2,M1} { X ==> meet( X, join( X, Y )
% 100.33/100.76 ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217921) {G1,W7,D4,L1,V2,M1} { meet( X, join( Y, X ) ) ==> X }.
% 100.33/100.76 parent0[0]: (217918) {G1,W7,D4,L1,V2,M1} { X ==> meet( X, join( Y, X ) )
% 100.33/100.76 }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (1047) {G21,W7,D4,L1,V2,M1} P(0,1028) { meet( X, join( Y, X )
% 100.33/100.76 ) ==> X }.
% 100.33/100.76 parent0: (217921) {G1,W7,D4,L1,V2,M1} { meet( X, join( Y, X ) ) ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217923) {G23,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X ) }.
% 100.33/100.76 parent0[0]: (1034) {G23,W7,D4,L1,V2,M1} P(1028,691) { meet( join( X, Y ), X
% 100.33/100.76 ) ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217924) {G1,W9,D5,L1,V3,M1} { X ==> meet( join( join( X, Y ), Z
% 100.33/100.76 ), X ) }.
% 100.33/100.76 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.33/100.76 join( X, Y ), Z ) }.
% 100.33/100.76 parent1[0; 3]: (217923) {G23,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X
% 100.33/100.76 ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 Z := Z
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := join( Y, Z )
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217925) {G1,W9,D5,L1,V3,M1} { meet( join( join( X, Y ), Z ), X )
% 100.33/100.76 ==> X }.
% 100.33/100.76 parent0[0]: (217924) {G1,W9,D5,L1,V3,M1} { X ==> meet( join( join( X, Y )
% 100.33/100.76 , Z ), X ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 Z := Z
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (1061) {G24,W9,D5,L1,V3,M1} P(1,1034) { meet( join( join( X, Y
% 100.33/100.76 ), Z ), X ) ==> X }.
% 100.33/100.76 parent0: (217925) {G1,W9,D5,L1,V3,M1} { meet( join( join( X, Y ), Z ), X )
% 100.33/100.76 ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 Z := Z
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217926) {G23,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X ) }.
% 100.33/100.76 parent0[0]: (1034) {G23,W7,D4,L1,V2,M1} P(1028,691) { meet( join( X, Y ), X
% 100.33/100.76 ) ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217927) {G1,W7,D4,L1,V2,M1} { X ==> meet( join( Y, X ), X ) }.
% 100.33/100.76 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.76 parent1[0; 3]: (217926) {G23,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X
% 100.33/100.76 ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217930) {G1,W7,D4,L1,V2,M1} { meet( join( Y, X ), X ) ==> X }.
% 100.33/100.76 parent0[0]: (217927) {G1,W7,D4,L1,V2,M1} { X ==> meet( join( Y, X ), X )
% 100.33/100.76 }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 subsumption: (1063) {G24,W7,D4,L1,V2,M1} P(0,1034) { meet( join( Y, X ), X
% 100.33/100.76 ) ==> X }.
% 100.33/100.76 parent0: (217930) {G1,W7,D4,L1,V2,M1} { meet( join( Y, X ), X ) ==> X }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := X
% 100.33/100.76 Y := Y
% 100.33/100.76 end
% 100.33/100.76 permutation0:
% 100.33/100.76 0 ==> 0
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 eqswap: (217932) {G18,W8,D4,L1,V2,M1} { zero ==> meet( complement( X ),
% 100.33/100.76 meet( X, Y ) ) }.
% 100.33/100.76 parent0[0]: (576) {G18,W8,D4,L1,V2,M1} P(56,571) { meet( complement( Y ),
% 100.33/100.76 meet( Y, X ) ) ==> zero }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76
% 100.33/100.76 paramod: (217933) {G19,W8,D5,L1,V2,M1} { zero ==> meet( complement( join(
% 100.33/100.76 X, Y ) ), Y ) }.
% 100.33/100.76 parent0[0]: (1063) {G24,W7,D4,L1,V2,M1} P(0,1034) { meet( join( Y, X ), X )
% 100.33/100.76 ==> X }.
% 100.33/100.76 parent1[0; 7]: (217932) {G18,W8,D4,L1,V2,M1} { zero ==> meet( complement(
% 100.33/100.76 X ), meet( X, Y ) ) }.
% 100.33/100.76 substitution0:
% 100.33/100.76 X := Y
% 100.33/100.76 Y := X
% 100.33/100.76 end
% 100.33/100.76 substitution1:
% 100.33/100.76 X := join( X, Y )
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217934) {G19,W8,D5,L1,V2,M1} { meet( complement( join( X, Y ) ),
% 100.33/100.77 Y ) ==> zero }.
% 100.33/100.77 parent0[0]: (217933) {G19,W8,D5,L1,V2,M1} { zero ==> meet( complement(
% 100.33/100.77 join( X, Y ) ), Y ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1074) {G25,W8,D5,L1,V2,M1} P(1063,576) { meet( complement(
% 100.33/100.77 join( X, Y ) ), Y ) ==> zero }.
% 100.33/100.77 parent0: (217934) {G19,W8,D5,L1,V2,M1} { meet( complement( join( X, Y ) )
% 100.33/100.77 , Y ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217935) {G24,W7,D4,L1,V2,M1} { Y ==> meet( join( X, Y ), Y ) }.
% 100.33/100.77 parent0[0]: (1063) {G24,W7,D4,L1,V2,M1} P(0,1034) { meet( join( Y, X ), X )
% 100.33/100.77 ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (217936) {G2,W9,D5,L1,V3,M1} { X ==> meet( join( join( Y, X ), Z
% 100.33/100.77 ), X ) }.
% 100.33/100.77 parent0[0]: (27) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X )
% 100.33/100.77 = join( join( Z, X ), Y ) }.
% 100.33/100.77 parent1[0; 3]: (217935) {G24,W7,D4,L1,V2,M1} { Y ==> meet( join( X, Y ), Y
% 100.33/100.77 ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Z
% 100.33/100.77 Z := Y
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := join( Y, Z )
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217939) {G2,W9,D5,L1,V3,M1} { meet( join( join( Y, X ), Z ), X )
% 100.33/100.77 ==> X }.
% 100.33/100.77 parent0[0]: (217936) {G2,W9,D5,L1,V3,M1} { X ==> meet( join( join( Y, X )
% 100.33/100.77 , Z ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 Z := Z
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1076) {G25,W9,D5,L1,V3,M1} P(27,1063) { meet( join( join( X,
% 100.33/100.77 Z ), Y ), Z ) ==> Z }.
% 100.33/100.77 parent0: (217939) {G2,W9,D5,L1,V3,M1} { meet( join( join( Y, X ), Z ), X )
% 100.33/100.77 ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Z
% 100.33/100.77 Y := X
% 100.33/100.77 Z := Y
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217941) {G24,W7,D4,L1,V2,M1} { Y ==> meet( join( X, Y ), Y ) }.
% 100.33/100.77 parent0[0]: (1063) {G24,W7,D4,L1,V2,M1} P(0,1034) { meet( join( Y, X ), X )
% 100.33/100.77 ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (217942) {G1,W10,D5,L1,V2,M1} { converse( X ) ==> meet( converse
% 100.33/100.77 ( join( Y, X ) ), converse( X ) ) }.
% 100.33/100.77 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 100.33/100.77 ) ==> converse( join( X, Y ) ) }.
% 100.33/100.77 parent1[0; 4]: (217941) {G24,W7,D4,L1,V2,M1} { Y ==> meet( join( X, Y ), Y
% 100.33/100.77 ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := converse( Y )
% 100.33/100.77 Y := converse( X )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217943) {G1,W10,D5,L1,V2,M1} { meet( converse( join( Y, X ) ),
% 100.33/100.77 converse( X ) ) ==> converse( X ) }.
% 100.33/100.77 parent0[0]: (217942) {G1,W10,D5,L1,V2,M1} { converse( X ) ==> meet(
% 100.33/100.77 converse( join( Y, X ) ), converse( X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1083) {G25,W10,D5,L1,V2,M1} P(8,1063) { meet( converse( join
% 100.33/100.77 ( X, Y ) ), converse( Y ) ) ==> converse( Y ) }.
% 100.33/100.77 parent0: (217943) {G1,W10,D5,L1,V2,M1} { meet( converse( join( Y, X ) ),
% 100.33/100.77 converse( X ) ) ==> converse( X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217944) {G21,W7,D4,L1,V2,M1} { X ==> meet( X, join( Y, X ) ) }.
% 100.33/100.77 parent0[0]: (1047) {G21,W7,D4,L1,V2,M1} P(0,1028) { meet( X, join( Y, X ) )
% 100.33/100.77 ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (217945) {G2,W9,D5,L1,V3,M1} { X ==> meet( X, join( join( Y, X )
% 100.33/100.77 , Z ) ) }.
% 100.33/100.77 parent0[0]: (27) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X )
% 100.33/100.77 = join( join( Z, X ), Y ) }.
% 100.33/100.77 parent1[0; 4]: (217944) {G21,W7,D4,L1,V2,M1} { X ==> meet( X, join( Y, X )
% 100.33/100.77 ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Z
% 100.33/100.77 Z := Y
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 Y := join( Y, Z )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217948) {G2,W9,D5,L1,V3,M1} { meet( X, join( join( Y, X ), Z ) )
% 100.33/100.77 ==> X }.
% 100.33/100.77 parent0[0]: (217945) {G2,W9,D5,L1,V3,M1} { X ==> meet( X, join( join( Y, X
% 100.33/100.77 ), Z ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 Z := Z
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1085) {G22,W9,D5,L1,V3,M1} P(27,1047) { meet( Z, join( join(
% 100.33/100.77 X, Z ), Y ) ) ==> Z }.
% 100.33/100.77 parent0: (217948) {G2,W9,D5,L1,V3,M1} { meet( X, join( join( Y, X ), Z ) )
% 100.33/100.77 ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Z
% 100.33/100.77 Y := X
% 100.33/100.77 Z := Y
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217950) {G21,W7,D4,L1,V2,M1} { X ==> meet( X, join( Y, X ) ) }.
% 100.33/100.77 parent0[0]: (1047) {G21,W7,D4,L1,V2,M1} P(0,1028) { meet( X, join( Y, X ) )
% 100.33/100.77 ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (217951) {G4,W7,D4,L1,V1,M1} { skol1 ==> meet( skol1, join( one,
% 100.33/100.77 X ) ) }.
% 100.33/100.77 parent0[0]: (38) {G3,W9,D4,L1,V1,M1} P(0,25) { join( join( one, X ), skol1
% 100.33/100.77 ) ==> join( one, X ) }.
% 100.33/100.77 parent1[0; 4]: (217950) {G21,W7,D4,L1,V2,M1} { X ==> meet( X, join( Y, X )
% 100.33/100.77 ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := skol1
% 100.33/100.77 Y := join( one, X )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217952) {G4,W7,D4,L1,V1,M1} { meet( skol1, join( one, X ) ) ==>
% 100.33/100.77 skol1 }.
% 100.33/100.77 parent0[0]: (217951) {G4,W7,D4,L1,V1,M1} { skol1 ==> meet( skol1, join(
% 100.33/100.77 one, X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1089) {G22,W7,D4,L1,V1,M1} P(38,1047) { meet( skol1, join(
% 100.33/100.77 one, X ) ) ==> skol1 }.
% 100.33/100.77 parent0: (217952) {G4,W7,D4,L1,V1,M1} { meet( skol1, join( one, X ) ) ==>
% 100.33/100.77 skol1 }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217954) {G17,W8,D4,L1,V2,M1} { zero ==> meet( complement( X ),
% 100.33/100.77 meet( Y, X ) ) }.
% 100.33/100.77 parent0[0]: (571) {G17,W8,D4,L1,V2,M1} P(460,555) { meet( complement( X ),
% 100.33/100.77 meet( Y, X ) ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (217955) {G18,W8,D5,L1,V1,M1} { zero ==> meet( complement( join(
% 100.33/100.77 one, X ) ), skol1 ) }.
% 100.33/100.77 parent0[0]: (1089) {G22,W7,D4,L1,V1,M1} P(38,1047) { meet( skol1, join( one
% 100.33/100.77 , X ) ) ==> skol1 }.
% 100.33/100.77 parent1[0; 7]: (217954) {G17,W8,D4,L1,V2,M1} { zero ==> meet( complement(
% 100.33/100.77 X ), meet( Y, X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := join( one, X )
% 100.33/100.77 Y := skol1
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217956) {G18,W8,D5,L1,V1,M1} { meet( complement( join( one, X ) )
% 100.33/100.77 , skol1 ) ==> zero }.
% 100.33/100.77 parent0[0]: (217955) {G18,W8,D5,L1,V1,M1} { zero ==> meet( complement(
% 100.33/100.77 join( one, X ) ), skol1 ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1094) {G23,W8,D5,L1,V1,M1} P(1089,571) { meet( complement(
% 100.33/100.77 join( one, X ) ), skol1 ) ==> zero }.
% 100.33/100.77 parent0: (217956) {G18,W8,D5,L1,V1,M1} { meet( complement( join( one, X )
% 100.33/100.77 ), skol1 ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217958) {G25,W8,D5,L1,V2,M1} { zero ==> meet( complement( join( X
% 100.33/100.77 , Y ) ), Y ) }.
% 100.33/100.77 parent0[0]: (1074) {G25,W8,D5,L1,V2,M1} P(1063,576) { meet( complement(
% 100.33/100.77 join( X, Y ) ), Y ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (217960) {G2,W13,D6,L1,V2,M1} { zero ==> meet( complement(
% 100.33/100.77 complement( X ) ), composition( converse( Y ), complement( composition( Y
% 100.33/100.77 , X ) ) ) ) }.
% 100.33/100.77 parent0[0]: (89) {G1,W13,D6,L1,V2,M1} P(10,0) { join( complement( Y ),
% 100.33/100.77 composition( converse( X ), complement( composition( X, Y ) ) ) ) ==>
% 100.33/100.77 complement( Y ) }.
% 100.33/100.77 parent1[0; 4]: (217958) {G25,W8,D5,L1,V2,M1} { zero ==> meet( complement(
% 100.33/100.77 join( X, Y ) ), Y ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := complement( X )
% 100.33/100.77 Y := composition( converse( Y ), complement( composition( Y, X ) ) )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (217961) {G3,W11,D6,L1,V2,M1} { zero ==> meet( X, composition(
% 100.33/100.77 converse( Y ), complement( composition( Y, X ) ) ) ) }.
% 100.33/100.77 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.77 complement( X ) ) ==> X }.
% 100.33/100.77 parent1[0; 3]: (217960) {G2,W13,D6,L1,V2,M1} { zero ==> meet( complement(
% 100.33/100.77 complement( X ) ), composition( converse( Y ), complement( composition( Y
% 100.33/100.77 , X ) ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217962) {G3,W11,D6,L1,V2,M1} { meet( X, composition( converse( Y
% 100.33/100.77 ), complement( composition( Y, X ) ) ) ) ==> zero }.
% 100.33/100.77 parent0[0]: (217961) {G3,W11,D6,L1,V2,M1} { zero ==> meet( X, composition
% 100.33/100.77 ( converse( Y ), complement( composition( Y, X ) ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1109) {G26,W11,D6,L1,V2,M1} P(89,1074);d(460) { meet( X,
% 100.33/100.77 composition( converse( Y ), complement( composition( Y, X ) ) ) ) ==>
% 100.33/100.77 zero }.
% 100.33/100.77 parent0: (217962) {G3,W11,D6,L1,V2,M1} { meet( X, composition( converse( Y
% 100.33/100.77 ), complement( composition( Y, X ) ) ) ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217964) {G21,W8,D5,L1,V2,M1} { zero ==> meet( X, complement( join
% 100.33/100.77 ( X, Y ) ) ) }.
% 100.33/100.77 parent0[0]: (1035) {G21,W8,D5,L1,V2,M1} P(1028,575) { meet( X, complement(
% 100.33/100.77 join( X, Y ) ) ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (217966) {G2,W11,D5,L1,V1,M1} { zero ==> meet( composition(
% 100.33/100.77 converse( X ), complement( X ) ), complement( complement( one ) ) ) }.
% 100.33/100.77 parent0[0]: (91) {G1,W11,D5,L1,V1,M1} P(5,10) { join( composition( converse
% 100.33/100.77 ( X ), complement( X ) ), complement( one ) ) ==> complement( one ) }.
% 100.33/100.77 parent1[0; 9]: (217964) {G21,W8,D5,L1,V2,M1} { zero ==> meet( X,
% 100.33/100.77 complement( join( X, Y ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := composition( converse( X ), complement( X ) )
% 100.33/100.77 Y := complement( one )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (217967) {G3,W9,D5,L1,V1,M1} { zero ==> meet( composition(
% 100.33/100.77 converse( X ), complement( X ) ), one ) }.
% 100.33/100.77 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.77 complement( X ) ) ==> X }.
% 100.33/100.77 parent1[0; 8]: (217966) {G2,W11,D5,L1,V1,M1} { zero ==> meet( composition
% 100.33/100.77 ( converse( X ), complement( X ) ), complement( complement( one ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := one
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217968) {G3,W9,D5,L1,V1,M1} { meet( composition( converse( X ),
% 100.33/100.77 complement( X ) ), one ) ==> zero }.
% 100.33/100.77 parent0[0]: (217967) {G3,W9,D5,L1,V1,M1} { zero ==> meet( composition(
% 100.33/100.77 converse( X ), complement( X ) ), one ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1136) {G22,W9,D5,L1,V1,M1} P(91,1035);d(460) { meet(
% 100.33/100.77 composition( converse( X ), complement( X ) ), one ) ==> zero }.
% 100.33/100.77 parent0: (217968) {G3,W9,D5,L1,V1,M1} { meet( composition( converse( X ),
% 100.33/100.77 complement( X ) ), one ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217969) {G0,W6,D4,L1,V1,M1} { top ==> join( X, complement( X ) )
% 100.33/100.77 }.
% 100.33/100.77 parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 100.33/100.77 }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (217970) {G1,W10,D5,L1,V2,M1} { top ==> join( meet( X, Y ),
% 100.33/100.77 complement( meet( Y, X ) ) ) }.
% 100.33/100.77 parent0[0]: (1004) {G18,W9,D4,L1,V2,M1} P(473,0);d(473) { complement( meet
% 100.33/100.77 ( X, Y ) ) = complement( meet( Y, X ) ) }.
% 100.33/100.77 parent1[0; 6]: (217969) {G0,W6,D4,L1,V1,M1} { top ==> join( X, complement
% 100.33/100.77 ( X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := meet( X, Y )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217973) {G1,W10,D5,L1,V2,M1} { join( meet( X, Y ), complement(
% 100.33/100.77 meet( Y, X ) ) ) ==> top }.
% 100.33/100.77 parent0[0]: (217970) {G1,W10,D5,L1,V2,M1} { top ==> join( meet( X, Y ),
% 100.33/100.77 complement( meet( Y, X ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1208) {G19,W10,D5,L1,V2,M1} P(1004,11) { join( meet( X, Y ),
% 100.33/100.77 complement( meet( Y, X ) ) ) ==> top }.
% 100.33/100.77 parent0: (217973) {G1,W10,D5,L1,V2,M1} { join( meet( X, Y ), complement(
% 100.33/100.77 meet( Y, X ) ) ) ==> top }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217974) {G0,W6,D4,L1,V1,M1} { zero ==> meet( X, complement( X ) )
% 100.33/100.77 }.
% 100.33/100.77 parent0[0]: (12) {G0,W6,D4,L1,V1,M1} I { meet( X, complement( X ) ) ==>
% 100.33/100.77 zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (217975) {G1,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 100.33/100.77 complement( meet( Y, X ) ) ) }.
% 100.33/100.77 parent0[0]: (1004) {G18,W9,D4,L1,V2,M1} P(473,0);d(473) { complement( meet
% 100.33/100.77 ( X, Y ) ) = complement( meet( Y, X ) ) }.
% 100.33/100.77 parent1[0; 6]: (217974) {G0,W6,D4,L1,V1,M1} { zero ==> meet( X, complement
% 100.33/100.77 ( X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := meet( X, Y )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217978) {G1,W10,D5,L1,V2,M1} { meet( meet( X, Y ), complement(
% 100.33/100.77 meet( Y, X ) ) ) ==> zero }.
% 100.33/100.77 parent0[0]: (217975) {G1,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 100.33/100.77 complement( meet( Y, X ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1209) {G19,W10,D5,L1,V2,M1} P(1004,12) { meet( meet( X, Y ),
% 100.33/100.77 complement( meet( Y, X ) ) ) ==> zero }.
% 100.33/100.77 parent0: (217978) {G1,W10,D5,L1,V2,M1} { meet( meet( X, Y ), complement(
% 100.33/100.77 meet( Y, X ) ) ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217980) {G22,W9,D5,L1,V1,M1} { zero ==> meet( composition(
% 100.33/100.77 converse( X ), complement( X ) ), one ) }.
% 100.33/100.77 parent0[0]: (1136) {G22,W9,D5,L1,V1,M1} P(91,1035);d(460) { meet(
% 100.33/100.77 composition( converse( X ), complement( X ) ), one ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (217981) {G17,W9,D6,L1,V1,M1} { zero ==> meet( composition(
% 100.33/100.77 converse( complement( X ) ), X ), one ) }.
% 100.33/100.77 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.77 complement( X ) ) ==> X }.
% 100.33/100.77 parent1[0; 7]: (217980) {G22,W9,D5,L1,V1,M1} { zero ==> meet( composition
% 100.33/100.77 ( converse( X ), complement( X ) ), one ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := complement( X )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217982) {G17,W9,D6,L1,V1,M1} { meet( composition( converse(
% 100.33/100.77 complement( X ) ), X ), one ) ==> zero }.
% 100.33/100.77 parent0[0]: (217981) {G17,W9,D6,L1,V1,M1} { zero ==> meet( composition(
% 100.33/100.77 converse( complement( X ) ), X ), one ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1292) {G23,W9,D6,L1,V1,M1} P(460,1136) { meet( composition(
% 100.33/100.77 converse( complement( X ) ), X ), one ) ==> zero }.
% 100.33/100.77 parent0: (217982) {G17,W9,D6,L1,V1,M1} { meet( composition( converse(
% 100.33/100.77 complement( X ) ), X ), one ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217984) {G23,W9,D6,L1,V1,M1} { zero ==> meet( composition(
% 100.33/100.77 converse( complement( X ) ), X ), one ) }.
% 100.33/100.77 parent0[0]: (1292) {G23,W9,D6,L1,V1,M1} P(460,1136) { meet( composition(
% 100.33/100.77 converse( complement( X ) ), X ), one ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (217985) {G1,W7,D5,L1,V0,M1} { zero ==> meet( converse(
% 100.33/100.77 complement( one ) ), one ) }.
% 100.33/100.77 parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 100.33/100.77 parent1[0; 3]: (217984) {G23,W9,D6,L1,V1,M1} { zero ==> meet( composition
% 100.33/100.77 ( converse( complement( X ) ), X ), one ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := converse( complement( one ) )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := one
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217986) {G1,W7,D5,L1,V0,M1} { meet( converse( complement( one ) )
% 100.33/100.77 , one ) ==> zero }.
% 100.33/100.77 parent0[0]: (217985) {G1,W7,D5,L1,V0,M1} { zero ==> meet( converse(
% 100.33/100.77 complement( one ) ), one ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1302) {G24,W7,D5,L1,V0,M1} P(5,1292) { meet( converse(
% 100.33/100.77 complement( one ) ), one ) ==> zero }.
% 100.33/100.77 parent0: (217986) {G1,W7,D5,L1,V0,M1} { meet( converse( complement( one )
% 100.33/100.77 ), one ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217987) {G24,W7,D5,L1,V0,M1} { zero ==> meet( converse(
% 100.33/100.77 complement( one ) ), one ) }.
% 100.33/100.77 parent0[0]: (1302) {G24,W7,D5,L1,V0,M1} P(5,1292) { meet( converse(
% 100.33/100.77 complement( one ) ), one ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (217988) {G2,W7,D5,L1,V0,M1} { zero ==> meet( one, converse(
% 100.33/100.77 complement( one ) ) ) }.
% 100.33/100.77 parent0[0]: (56) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 100.33/100.77 Y ) }.
% 100.33/100.77 parent1[0; 2]: (217987) {G24,W7,D5,L1,V0,M1} { zero ==> meet( converse(
% 100.33/100.77 complement( one ) ), one ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := one
% 100.33/100.77 Y := converse( complement( one ) )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217991) {G2,W7,D5,L1,V0,M1} { meet( one, converse( complement(
% 100.33/100.77 one ) ) ) ==> zero }.
% 100.33/100.77 parent0[0]: (217988) {G2,W7,D5,L1,V0,M1} { zero ==> meet( one, converse(
% 100.33/100.77 complement( one ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1304) {G25,W7,D5,L1,V0,M1} P(1302,56) { meet( one, converse(
% 100.33/100.77 complement( one ) ) ) ==> zero }.
% 100.33/100.77 parent0: (217991) {G2,W7,D5,L1,V0,M1} { meet( one, converse( complement(
% 100.33/100.77 one ) ) ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (217993) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet( X
% 100.33/100.77 , complement( Y ) ) ) }.
% 100.33/100.77 parent0[0]: (1009) {G18,W10,D5,L1,V2,M1} S(43);d(472) { join( meet( X, Y )
% 100.33/100.77 , meet( X, complement( Y ) ) ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (217996) {G19,W15,D7,L1,V2,M1} { meet( X, Y ) ==> join( zero,
% 100.33/100.77 meet( meet( X, Y ), complement( complement( meet( Y, X ) ) ) ) ) }.
% 100.33/100.77 parent0[0]: (1209) {G19,W10,D5,L1,V2,M1} P(1004,12) { meet( meet( X, Y ),
% 100.33/100.77 complement( meet( Y, X ) ) ) ==> zero }.
% 100.33/100.77 parent1[0; 5]: (217993) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 100.33/100.77 meet( X, complement( Y ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := meet( X, Y )
% 100.33/100.77 Y := complement( meet( Y, X ) )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (217998) {G15,W13,D6,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X,
% 100.33/100.77 Y ), complement( complement( meet( Y, X ) ) ) ) }.
% 100.33/100.77 parent0[0]: (455) {G14,W5,D3,L1,V1,M1} P(418,0);d(454) { join( zero, X )
% 100.33/100.77 ==> X }.
% 100.33/100.77 parent1[0; 4]: (217996) {G19,W15,D7,L1,V2,M1} { meet( X, Y ) ==> join(
% 100.33/100.77 zero, meet( meet( X, Y ), complement( complement( meet( Y, X ) ) ) ) )
% 100.33/100.77 }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := meet( meet( X, Y ), complement( complement( meet( Y, X ) ) ) )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (217999) {G16,W11,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X,
% 100.33/100.77 Y ), meet( Y, X ) ) }.
% 100.33/100.77 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.77 complement( X ) ) ==> X }.
% 100.33/100.77 parent1[0; 8]: (217998) {G15,W13,D6,L1,V2,M1} { meet( X, Y ) ==> meet(
% 100.33/100.77 meet( X, Y ), complement( complement( meet( Y, X ) ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := meet( Y, X )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218000) {G16,W11,D4,L1,V2,M1} { meet( meet( X, Y ), meet( Y, X )
% 100.33/100.77 ) ==> meet( X, Y ) }.
% 100.33/100.77 parent0[0]: (217999) {G16,W11,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet(
% 100.33/100.77 X, Y ), meet( Y, X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1493) {G20,W11,D4,L1,V2,M1} P(1209,1009);d(455);d(460) { meet
% 100.33/100.77 ( meet( X, Y ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 100.33/100.77 parent0: (218000) {G16,W11,D4,L1,V2,M1} { meet( meet( X, Y ), meet( Y, X )
% 100.33/100.77 ) ==> meet( X, Y ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218002) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet( X
% 100.33/100.77 , complement( Y ) ) ) }.
% 100.33/100.77 parent0[0]: (1009) {G18,W10,D5,L1,V2,M1} S(43);d(472) { join( meet( X, Y )
% 100.33/100.77 , meet( X, complement( Y ) ) ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218004) {G19,W10,D7,L1,V0,M1} { one ==> join( zero, meet( one,
% 100.33/100.77 complement( converse( complement( one ) ) ) ) ) }.
% 100.33/100.77 parent0[0]: (1304) {G25,W7,D5,L1,V0,M1} P(1302,56) { meet( one, converse(
% 100.33/100.77 complement( one ) ) ) ==> zero }.
% 100.33/100.77 parent1[0; 3]: (218002) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 100.33/100.77 meet( X, complement( Y ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := one
% 100.33/100.77 Y := converse( complement( one ) )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218005) {G15,W8,D6,L1,V0,M1} { one ==> meet( one, complement(
% 100.33/100.77 converse( complement( one ) ) ) ) }.
% 100.33/100.77 parent0[0]: (455) {G14,W5,D3,L1,V1,M1} P(418,0);d(454) { join( zero, X )
% 100.33/100.77 ==> X }.
% 100.33/100.77 parent1[0; 2]: (218004) {G19,W10,D7,L1,V0,M1} { one ==> join( zero, meet(
% 100.33/100.77 one, complement( converse( complement( one ) ) ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := meet( one, complement( converse( complement( one ) ) ) )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218006) {G15,W8,D6,L1,V0,M1} { meet( one, complement( converse(
% 100.33/100.77 complement( one ) ) ) ) ==> one }.
% 100.33/100.77 parent0[0]: (218005) {G15,W8,D6,L1,V0,M1} { one ==> meet( one, complement
% 100.33/100.77 ( converse( complement( one ) ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1506) {G26,W8,D6,L1,V0,M1} P(1304,1009);d(455) { meet( one,
% 100.33/100.77 complement( converse( complement( one ) ) ) ) ==> one }.
% 100.33/100.77 parent0: (218006) {G15,W8,D6,L1,V0,M1} { meet( one, complement( converse(
% 100.33/100.77 complement( one ) ) ) ) ==> one }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218008) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet( X
% 100.33/100.77 , complement( Y ) ) ) }.
% 100.33/100.77 parent0[0]: (1009) {G18,W10,D5,L1,V2,M1} S(43);d(472) { join( meet( X, Y )
% 100.33/100.77 , meet( X, complement( Y ) ) ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218010) {G19,W12,D6,L1,V0,M1} { converse( complement( one ) )
% 100.33/100.77 ==> join( zero, meet( converse( complement( one ) ), complement( one ) )
% 100.33/100.77 ) }.
% 100.33/100.77 parent0[0]: (1302) {G24,W7,D5,L1,V0,M1} P(5,1292) { meet( converse(
% 100.33/100.77 complement( one ) ), one ) ==> zero }.
% 100.33/100.77 parent1[0; 5]: (218008) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 100.33/100.77 meet( X, complement( Y ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := converse( complement( one ) )
% 100.33/100.77 Y := one
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218011) {G15,W10,D5,L1,V0,M1} { converse( complement( one ) )
% 100.33/100.77 ==> meet( converse( complement( one ) ), complement( one ) ) }.
% 100.33/100.77 parent0[0]: (455) {G14,W5,D3,L1,V1,M1} P(418,0);d(454) { join( zero, X )
% 100.33/100.77 ==> X }.
% 100.33/100.77 parent1[0; 4]: (218010) {G19,W12,D6,L1,V0,M1} { converse( complement( one
% 100.33/100.77 ) ) ==> join( zero, meet( converse( complement( one ) ), complement( one
% 100.33/100.77 ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := meet( converse( complement( one ) ), complement( one ) )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218012) {G15,W10,D5,L1,V0,M1} { meet( converse( complement( one )
% 100.33/100.77 ), complement( one ) ) ==> converse( complement( one ) ) }.
% 100.33/100.77 parent0[0]: (218011) {G15,W10,D5,L1,V0,M1} { converse( complement( one ) )
% 100.33/100.77 ==> meet( converse( complement( one ) ), complement( one ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1507) {G25,W10,D5,L1,V0,M1} P(1302,1009);d(455) { meet(
% 100.33/100.77 converse( complement( one ) ), complement( one ) ) ==> converse(
% 100.33/100.77 complement( one ) ) }.
% 100.33/100.77 parent0: (218012) {G15,W10,D5,L1,V0,M1} { meet( converse( complement( one
% 100.33/100.77 ) ), complement( one ) ) ==> converse( complement( one ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218013) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet( X
% 100.33/100.77 , complement( Y ) ) ) }.
% 100.33/100.77 parent0[0]: (1009) {G18,W10,D5,L1,V2,M1} S(43);d(472) { join( meet( X, Y )
% 100.33/100.77 , meet( X, complement( Y ) ) ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218014) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( Y, X ), meet( X
% 100.33/100.77 , complement( Y ) ) ) }.
% 100.33/100.77 parent0[0]: (56) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 100.33/100.77 Y ) }.
% 100.33/100.77 parent1[0; 3]: (218013) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 100.33/100.77 meet( X, complement( Y ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218018) {G2,W10,D5,L1,V2,M1} { join( meet( Y, X ), meet( X,
% 100.33/100.77 complement( Y ) ) ) ==> X }.
% 100.33/100.77 parent0[0]: (218014) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( Y, X ), meet
% 100.33/100.77 ( X, complement( Y ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1534) {G19,W10,D5,L1,V2,M1} P(56,1009) { join( meet( Y, X ),
% 100.33/100.77 meet( X, complement( Y ) ) ) ==> X }.
% 100.33/100.77 parent0: (218018) {G2,W10,D5,L1,V2,M1} { join( meet( Y, X ), meet( X,
% 100.33/100.77 complement( Y ) ) ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218022) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet( X
% 100.33/100.77 , complement( Y ) ) ) }.
% 100.33/100.77 parent0[0]: (1009) {G18,W10,D5,L1,V2,M1} S(43);d(472) { join( meet( X, Y )
% 100.33/100.77 , meet( X, complement( Y ) ) ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218024) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet(
% 100.33/100.77 complement( Y ), X ) ) }.
% 100.33/100.77 parent0[0]: (56) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 100.33/100.77 Y ) }.
% 100.33/100.77 parent1[0; 6]: (218022) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 100.33/100.77 meet( X, complement( Y ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := complement( Y )
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218030) {G2,W10,D5,L1,V2,M1} { join( meet( X, Y ), meet(
% 100.33/100.77 complement( Y ), X ) ) ==> X }.
% 100.33/100.77 parent0[0]: (218024) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet
% 100.33/100.77 ( complement( Y ), X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1535) {G19,W10,D5,L1,V2,M1} P(56,1009) { join( meet( X, Y ),
% 100.33/100.77 meet( complement( Y ), X ) ) ==> X }.
% 100.33/100.77 parent0: (218030) {G2,W10,D5,L1,V2,M1} { join( meet( X, Y ), meet(
% 100.33/100.77 complement( Y ), X ) ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218032) {G22,W9,D4,L1,V2,M1} { meet( Y, X ) ==> meet( X, meet( Y
% 100.33/100.77 , X ) ) }.
% 100.33/100.77 parent0[0]: (691) {G22,W9,D4,L1,V2,M1} P(56,689) { meet( X, meet( Y, X ) )
% 100.33/100.77 ==> meet( Y, X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218034) {G23,W13,D6,L1,V0,M1} { meet( one, complement( converse
% 100.33/100.77 ( complement( one ) ) ) ) ==> meet( complement( converse( complement( one
% 100.33/100.77 ) ) ), one ) }.
% 100.33/100.77 parent0[0]: (1506) {G26,W8,D6,L1,V0,M1} P(1304,1009);d(455) { meet( one,
% 100.33/100.77 complement( converse( complement( one ) ) ) ) ==> one }.
% 100.33/100.77 parent1[0; 12]: (218032) {G22,W9,D4,L1,V2,M1} { meet( Y, X ) ==> meet( X,
% 100.33/100.77 meet( Y, X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := complement( converse( complement( one ) ) )
% 100.33/100.77 Y := one
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218035) {G24,W8,D6,L1,V0,M1} { one ==> meet( complement(
% 100.33/100.77 converse( complement( one ) ) ), one ) }.
% 100.33/100.77 parent0[0]: (1506) {G26,W8,D6,L1,V0,M1} P(1304,1009);d(455) { meet( one,
% 100.33/100.77 complement( converse( complement( one ) ) ) ) ==> one }.
% 100.33/100.77 parent1[0; 1]: (218034) {G23,W13,D6,L1,V0,M1} { meet( one, complement(
% 100.33/100.77 converse( complement( one ) ) ) ) ==> meet( complement( converse(
% 100.33/100.77 complement( one ) ) ), one ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218037) {G24,W8,D6,L1,V0,M1} { meet( complement( converse(
% 100.33/100.77 complement( one ) ) ), one ) ==> one }.
% 100.33/100.77 parent0[0]: (218035) {G24,W8,D6,L1,V0,M1} { one ==> meet( complement(
% 100.33/100.77 converse( complement( one ) ) ), one ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1546) {G27,W8,D6,L1,V0,M1} P(1506,691) { meet( complement(
% 100.33/100.77 converse( complement( one ) ) ), one ) ==> one }.
% 100.33/100.77 parent0: (218037) {G24,W8,D6,L1,V0,M1} { meet( complement( converse(
% 100.33/100.77 complement( one ) ) ), one ) ==> one }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218042) {G19,W10,D7,L1,V0,M1} { complement( meet( one,
% 100.33/100.77 complement( converse( complement( one ) ) ) ) ) = complement( one ) }.
% 100.33/100.77 parent0[0]: (1546) {G27,W8,D6,L1,V0,M1} P(1506,691) { meet( complement(
% 100.33/100.77 converse( complement( one ) ) ), one ) ==> one }.
% 100.33/100.77 parent1[0; 9]: (1004) {G18,W9,D4,L1,V2,M1} P(473,0);d(473) { complement(
% 100.33/100.77 meet( X, Y ) ) = complement( meet( Y, X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := one
% 100.33/100.77 Y := complement( converse( complement( one ) ) )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218043) {G19,W9,D5,L1,V0,M1} { join( complement( one ), converse
% 100.33/100.77 ( complement( one ) ) ) = complement( one ) }.
% 100.33/100.77 parent0[0]: (995) {G18,W10,D5,L1,V2,M1} P(460,473) { complement( meet( Y,
% 100.33/100.77 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 100.33/100.77 parent1[0; 1]: (218042) {G19,W10,D7,L1,V0,M1} { complement( meet( one,
% 100.33/100.77 complement( converse( complement( one ) ) ) ) ) = complement( one ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := converse( complement( one ) )
% 100.33/100.77 Y := one
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1550) {G28,W9,D5,L1,V0,M1} P(1546,1004);d(995) { join(
% 100.33/100.77 complement( one ), converse( complement( one ) ) ) ==> complement( one )
% 100.33/100.77 }.
% 100.33/100.77 parent0: (218043) {G19,W9,D5,L1,V0,M1} { join( complement( one ), converse
% 100.33/100.77 ( complement( one ) ) ) = complement( one ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218046) {G25,W10,D5,L1,V2,M1} { converse( Y ) ==> meet( converse
% 100.33/100.77 ( join( X, Y ) ), converse( Y ) ) }.
% 100.33/100.77 parent0[0]: (1083) {G25,W10,D5,L1,V2,M1} P(8,1063) { meet( converse( join(
% 100.33/100.77 X, Y ) ), converse( Y ) ) ==> converse( Y ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218049) {G26,W13,D6,L1,V0,M1} { converse( converse( complement(
% 100.33/100.77 one ) ) ) ==> meet( converse( complement( one ) ), converse( converse(
% 100.33/100.77 complement( one ) ) ) ) }.
% 100.33/100.77 parent0[0]: (1550) {G28,W9,D5,L1,V0,M1} P(1546,1004);d(995) { join(
% 100.33/100.77 complement( one ), converse( complement( one ) ) ) ==> complement( one )
% 100.33/100.77 }.
% 100.33/100.77 parent1[0; 7]: (218046) {G25,W10,D5,L1,V2,M1} { converse( Y ) ==> meet(
% 100.33/100.77 converse( join( X, Y ) ), converse( Y ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := complement( one )
% 100.33/100.77 Y := converse( complement( one ) )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218051) {G1,W11,D5,L1,V0,M1} { converse( converse( complement(
% 100.33/100.77 one ) ) ) ==> meet( converse( complement( one ) ), complement( one ) )
% 100.33/100.77 }.
% 100.33/100.77 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 100.33/100.77 parent1[0; 9]: (218049) {G26,W13,D6,L1,V0,M1} { converse( converse(
% 100.33/100.77 complement( one ) ) ) ==> meet( converse( complement( one ) ), converse(
% 100.33/100.77 converse( complement( one ) ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := complement( one )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218052) {G1,W9,D5,L1,V0,M1} { complement( one ) ==> meet(
% 100.33/100.77 converse( complement( one ) ), complement( one ) ) }.
% 100.33/100.77 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 100.33/100.77 parent1[0; 1]: (218051) {G1,W11,D5,L1,V0,M1} { converse( converse(
% 100.33/100.77 complement( one ) ) ) ==> meet( converse( complement( one ) ), complement
% 100.33/100.77 ( one ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := complement( one )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218055) {G2,W6,D4,L1,V0,M1} { complement( one ) ==> converse(
% 100.33/100.77 complement( one ) ) }.
% 100.33/100.77 parent0[0]: (1507) {G25,W10,D5,L1,V0,M1} P(1302,1009);d(455) { meet(
% 100.33/100.77 converse( complement( one ) ), complement( one ) ) ==> converse(
% 100.33/100.77 complement( one ) ) }.
% 100.33/100.77 parent1[0; 3]: (218052) {G1,W9,D5,L1,V0,M1} { complement( one ) ==> meet(
% 100.33/100.77 converse( complement( one ) ), complement( one ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218056) {G2,W6,D4,L1,V0,M1} { converse( complement( one ) ) ==>
% 100.33/100.77 complement( one ) }.
% 100.33/100.77 parent0[0]: (218055) {G2,W6,D4,L1,V0,M1} { complement( one ) ==> converse
% 100.33/100.77 ( complement( one ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1551) {G29,W6,D4,L1,V0,M1} P(1550,1083);d(7);d(1507) {
% 100.33/100.77 converse( complement( one ) ) ==> complement( one ) }.
% 100.33/100.77 parent0: (218056) {G2,W6,D4,L1,V0,M1} { converse( complement( one ) ) ==>
% 100.33/100.77 complement( one ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218058) {G1,W14,D5,L1,V3,M1} { join( X, converse( join( Y, Z ) )
% 100.33/100.77 ) ==> join( join( X, converse( Y ) ), converse( Z ) ) }.
% 100.33/100.77 parent0[0]: (22) {G1,W14,D5,L1,V3,M1} P(8,1) { join( join( Z, converse( X )
% 100.33/100.77 ), converse( Y ) ) ==> join( Z, converse( join( X, Y ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := Z
% 100.33/100.77 Z := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218059) {G2,W15,D6,L1,V2,M1} { join( X, converse( join(
% 100.33/100.77 complement( one ), Y ) ) ) ==> join( join( X, complement( one ) ),
% 100.33/100.77 converse( Y ) ) }.
% 100.33/100.77 parent0[0]: (1551) {G29,W6,D4,L1,V0,M1} P(1550,1083);d(7);d(1507) {
% 100.33/100.77 converse( complement( one ) ) ==> complement( one ) }.
% 100.33/100.77 parent1[0; 11]: (218058) {G1,W14,D5,L1,V3,M1} { join( X, converse( join( Y
% 100.33/100.77 , Z ) ) ) ==> join( join( X, converse( Y ) ), converse( Z ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 Y := complement( one )
% 100.33/100.77 Z := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1572) {G30,W15,D6,L1,V2,M1} P(1551,22) { join( X, converse(
% 100.33/100.77 join( complement( one ), Y ) ) ) ==> join( join( X, complement( one ) ),
% 100.33/100.77 converse( Y ) ) }.
% 100.33/100.77 parent0: (218059) {G2,W15,D6,L1,V2,M1} { join( X, converse( join(
% 100.33/100.77 complement( one ), Y ) ) ) ==> join( join( X, complement( one ) ),
% 100.33/100.77 converse( Y ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218063) {G19,W10,D5,L1,V2,M1} { Y ==> join( meet( X, Y ), meet( Y
% 100.33/100.77 , complement( X ) ) ) }.
% 100.33/100.77 parent0[0]: (1534) {G19,W10,D5,L1,V2,M1} P(56,1009) { join( meet( Y, X ),
% 100.33/100.77 meet( X, complement( Y ) ) ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218065) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( Y, X ), meet(
% 100.33/100.77 complement( Y ), X ) ) }.
% 100.33/100.77 parent0[0]: (56) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 100.33/100.77 Y ) }.
% 100.33/100.77 parent1[0; 6]: (218063) {G19,W10,D5,L1,V2,M1} { Y ==> join( meet( X, Y ),
% 100.33/100.77 meet( Y, complement( X ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := complement( Y )
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218071) {G2,W10,D5,L1,V2,M1} { join( meet( Y, X ), meet(
% 100.33/100.77 complement( Y ), X ) ) ==> X }.
% 100.33/100.77 parent0[0]: (218065) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( Y, X ), meet
% 100.33/100.77 ( complement( Y ), X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1587) {G20,W10,D5,L1,V2,M1} P(56,1534) { join( meet( Y, X ),
% 100.33/100.77 meet( complement( Y ), X ) ) ==> X }.
% 100.33/100.77 parent0: (218071) {G2,W10,D5,L1,V2,M1} { join( meet( Y, X ), meet(
% 100.33/100.77 complement( Y ), X ) ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218072) {G19,W10,D5,L1,V2,M1} { Y ==> join( meet( X, Y ), meet( Y
% 100.33/100.77 , complement( X ) ) ) }.
% 100.33/100.77 parent0[0]: (1534) {G19,W10,D5,L1,V2,M1} P(56,1009) { join( meet( Y, X ),
% 100.33/100.77 meet( X, complement( Y ) ) ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218073) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement(
% 100.33/100.77 Y ) ), meet( Y, X ) ) }.
% 100.33/100.77 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.77 parent1[0; 2]: (218072) {G19,W10,D5,L1,V2,M1} { Y ==> join( meet( X, Y ),
% 100.33/100.77 meet( Y, complement( X ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := meet( Y, X )
% 100.33/100.77 Y := meet( X, complement( Y ) )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218076) {G1,W10,D5,L1,V2,M1} { join( meet( X, complement( Y ) ),
% 100.33/100.77 meet( Y, X ) ) ==> X }.
% 100.33/100.77 parent0[0]: (218073) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( X,
% 100.33/100.77 complement( Y ) ), meet( Y, X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1589) {G20,W10,D5,L1,V2,M1} P(1534,0) { join( meet( Y,
% 100.33/100.77 complement( X ) ), meet( X, Y ) ) ==> Y }.
% 100.33/100.77 parent0: (218076) {G1,W10,D5,L1,V2,M1} { join( meet( X, complement( Y ) )
% 100.33/100.77 , meet( Y, X ) ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218078) {G23,W8,D5,L1,V1,M1} { zero ==> meet( complement( join(
% 100.33/100.77 one, X ) ), skol1 ) }.
% 100.33/100.77 parent0[0]: (1094) {G23,W8,D5,L1,V1,M1} P(1089,571) { meet( complement(
% 100.33/100.77 join( one, X ) ), skol1 ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218081) {G18,W8,D5,L1,V1,M1} { zero ==> meet( meet( complement(
% 100.33/100.77 one ), X ), skol1 ) }.
% 100.33/100.77 parent0[0]: (471) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( X,
% 100.33/100.77 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 100.33/100.77 parent1[0; 3]: (218078) {G23,W8,D5,L1,V1,M1} { zero ==> meet( complement(
% 100.33/100.77 join( one, X ) ), skol1 ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := one
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := complement( X )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218082) {G18,W8,D5,L1,V1,M1} { meet( meet( complement( one ), X )
% 100.33/100.77 , skol1 ) ==> zero }.
% 100.33/100.77 parent0[0]: (218081) {G18,W8,D5,L1,V1,M1} { zero ==> meet( meet(
% 100.33/100.77 complement( one ), X ), skol1 ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1788) {G24,W8,D5,L1,V1,M1} P(471,1094) { meet( meet(
% 100.33/100.77 complement( one ), X ), skol1 ) ==> zero }.
% 100.33/100.77 parent0: (218082) {G18,W8,D5,L1,V1,M1} { meet( meet( complement( one ), X
% 100.33/100.77 ), skol1 ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218084) {G17,W10,D5,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 100.33/100.77 complement( join( X, complement( Y ) ) ) }.
% 100.33/100.77 parent0[0]: (471) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( X,
% 100.33/100.77 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218088) {G17,W10,D4,L1,V2,M1} { meet( complement( X ),
% 100.33/100.77 complement( Y ) ) ==> complement( join( X, Y ) ) }.
% 100.33/100.77 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.77 complement( X ) ) ==> X }.
% 100.33/100.77 parent1[0; 9]: (218084) {G17,W10,D5,L1,V2,M1} { meet( complement( X ), Y )
% 100.33/100.77 ==> complement( join( X, complement( Y ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 Y := complement( Y )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1795) {G18,W10,D4,L1,V2,M1} P(460,471) { meet( complement( Y
% 100.33/100.77 ), complement( X ) ) ==> complement( join( Y, X ) ) }.
% 100.33/100.77 parent0: (218088) {G17,W10,D4,L1,V2,M1} { meet( complement( X ),
% 100.33/100.77 complement( Y ) ) ==> complement( join( X, Y ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218091) {G17,W10,D5,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 100.33/100.77 complement( join( X, complement( Y ) ) ) }.
% 100.33/100.77 parent0[0]: (471) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( X,
% 100.33/100.77 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218092) {G2,W14,D6,L1,V3,M1} { meet( complement( join( X, Y ) )
% 100.33/100.77 , Z ) ==> complement( join( join( X, complement( Z ) ), Y ) ) }.
% 100.33/100.77 parent0[0]: (27) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X )
% 100.33/100.77 = join( join( Z, X ), Y ) }.
% 100.33/100.77 parent1[0; 8]: (218091) {G17,W10,D5,L1,V2,M1} { meet( complement( X ), Y )
% 100.33/100.77 ==> complement( join( X, complement( Y ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := complement( Z )
% 100.33/100.77 Y := Y
% 100.33/100.77 Z := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := join( X, Y )
% 100.33/100.77 Y := Z
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218095) {G2,W14,D6,L1,V3,M1} { complement( join( join( X,
% 100.33/100.77 complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 100.33/100.77 parent0[0]: (218092) {G2,W14,D6,L1,V3,M1} { meet( complement( join( X, Y )
% 100.33/100.77 ), Z ) ==> complement( join( join( X, complement( Z ) ), Y ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 Z := Z
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1797) {G18,W14,D6,L1,V3,M1} P(27,471) { complement( join(
% 100.33/100.77 join( X, complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z
% 100.33/100.77 ) }.
% 100.33/100.77 parent0: (218095) {G2,W14,D6,L1,V3,M1} { complement( join( join( X,
% 100.33/100.77 complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 Z := Z
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218096) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 100.33/100.77 join( X, Y ), Z ) }.
% 100.33/100.77 parent0[0]: (26) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 100.33/100.77 join( join( Y, Z ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 Z := Z
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218097) {G17,W10,D5,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 100.33/100.77 complement( join( X, complement( Y ) ) ) }.
% 100.33/100.77 parent0[0]: (471) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( X,
% 100.33/100.77 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218098) {G2,W14,D6,L1,V3,M1} { meet( complement( join( X, Y ) )
% 100.33/100.77 , Z ) ==> complement( join( join( complement( Z ), X ), Y ) ) }.
% 100.33/100.77 parent0[0]: (218096) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join
% 100.33/100.77 ( join( X, Y ), Z ) }.
% 100.33/100.77 parent1[0; 8]: (218097) {G17,W10,D5,L1,V2,M1} { meet( complement( X ), Y )
% 100.33/100.77 ==> complement( join( X, complement( Y ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := complement( Z )
% 100.33/100.77 Y := X
% 100.33/100.77 Z := Y
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := join( X, Y )
% 100.33/100.77 Y := Z
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218103) {G2,W14,D6,L1,V3,M1} { complement( join( join( complement
% 100.33/100.77 ( Z ), X ), Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 100.33/100.77 parent0[0]: (218098) {G2,W14,D6,L1,V3,M1} { meet( complement( join( X, Y )
% 100.33/100.77 ), Z ) ==> complement( join( join( complement( Z ), X ), Y ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 Z := Z
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1799) {G18,W14,D6,L1,V3,M1} P(26,471) { complement( join(
% 100.33/100.77 join( complement( Z ), X ), Y ) ) ==> meet( complement( join( X, Y ) ), Z
% 100.33/100.77 ) }.
% 100.33/100.77 parent0: (218103) {G2,W14,D6,L1,V3,M1} { complement( join( join(
% 100.33/100.77 complement( Z ), X ), Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 Z := Z
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218105) {G24,W8,D5,L1,V1,M1} { zero ==> meet( meet( complement(
% 100.33/100.77 one ), X ), skol1 ) }.
% 100.33/100.77 parent0[0]: (1788) {G24,W8,D5,L1,V1,M1} P(471,1094) { meet( meet(
% 100.33/100.77 complement( one ), X ), skol1 ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218112) {G23,W8,D5,L1,V1,M1} { zero ==> meet( meet( X,
% 100.33/100.77 complement( one ) ), skol1 ) }.
% 100.33/100.77 parent0[0]: (691) {G22,W9,D4,L1,V2,M1} P(56,689) { meet( X, meet( Y, X ) )
% 100.33/100.77 ==> meet( Y, X ) }.
% 100.33/100.77 parent1[0; 3]: (218105) {G24,W8,D5,L1,V1,M1} { zero ==> meet( meet(
% 100.33/100.77 complement( one ), X ), skol1 ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := complement( one )
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := meet( X, complement( one ) )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218113) {G23,W8,D5,L1,V1,M1} { meet( meet( X, complement( one ) )
% 100.33/100.77 , skol1 ) ==> zero }.
% 100.33/100.77 parent0[0]: (218112) {G23,W8,D5,L1,V1,M1} { zero ==> meet( meet( X,
% 100.33/100.77 complement( one ) ), skol1 ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1803) {G25,W8,D5,L1,V1,M1} P(691,1788) { meet( meet( X,
% 100.33/100.77 complement( one ) ), skol1 ) ==> zero }.
% 100.33/100.77 parent0: (218113) {G23,W8,D5,L1,V1,M1} { meet( meet( X, complement( one )
% 100.33/100.77 ), skol1 ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218115) {G19,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 100.33/100.77 complement( meet( Y, X ) ) ) }.
% 100.33/100.77 parent0[0]: (1209) {G19,W10,D5,L1,V2,M1} P(1004,12) { meet( meet( X, Y ),
% 100.33/100.77 complement( meet( Y, X ) ) ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218119) {G20,W11,D6,L1,V1,M1} { zero ==> meet( meet( skol1, meet
% 100.33/100.77 ( X, complement( one ) ) ), complement( zero ) ) }.
% 100.33/100.77 parent0[0]: (1803) {G25,W8,D5,L1,V1,M1} P(691,1788) { meet( meet( X,
% 100.33/100.77 complement( one ) ), skol1 ) ==> zero }.
% 100.33/100.77 parent1[0; 10]: (218115) {G19,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y
% 100.33/100.77 ), complement( meet( Y, X ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := skol1
% 100.33/100.77 Y := meet( X, complement( one ) )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218120) {G14,W10,D6,L1,V1,M1} { zero ==> meet( meet( skol1, meet
% 100.33/100.77 ( X, complement( one ) ) ), top ) }.
% 100.33/100.77 parent0[0]: (451) {G13,W4,D3,L1,V0,M1} P(146,418);d(450);d(58) { complement
% 100.33/100.77 ( zero ) ==> top }.
% 100.33/100.77 parent1[0; 9]: (218119) {G20,W11,D6,L1,V1,M1} { zero ==> meet( meet( skol1
% 100.33/100.77 , meet( X, complement( one ) ) ), complement( zero ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218121) {G15,W8,D5,L1,V1,M1} { zero ==> meet( skol1, meet( X,
% 100.33/100.77 complement( one ) ) ) }.
% 100.33/100.77 parent0[0]: (458) {G15,W5,D3,L1,V1,M1} P(457,43);d(455);d(60) { meet( X,
% 100.33/100.77 top ) ==> X }.
% 100.33/100.77 parent1[0; 2]: (218120) {G14,W10,D6,L1,V1,M1} { zero ==> meet( meet( skol1
% 100.33/100.77 , meet( X, complement( one ) ) ), top ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := meet( skol1, meet( X, complement( one ) ) )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218122) {G15,W8,D5,L1,V1,M1} { meet( skol1, meet( X, complement(
% 100.33/100.77 one ) ) ) ==> zero }.
% 100.33/100.77 parent0[0]: (218121) {G15,W8,D5,L1,V1,M1} { zero ==> meet( skol1, meet( X
% 100.33/100.77 , complement( one ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1805) {G26,W8,D5,L1,V1,M1} P(1803,1209);d(451);d(458) { meet
% 100.33/100.77 ( skol1, meet( X, complement( one ) ) ) ==> zero }.
% 100.33/100.77 parent0: (218122) {G15,W8,D5,L1,V1,M1} { meet( skol1, meet( X, complement
% 100.33/100.77 ( one ) ) ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218124) {G22,W9,D5,L1,V3,M1} { X ==> meet( X, join( join( Y, X )
% 100.33/100.77 , Z ) ) }.
% 100.33/100.77 parent0[0]: (1085) {G22,W9,D5,L1,V3,M1} P(27,1047) { meet( Z, join( join( X
% 100.33/100.77 , Z ), Y ) ) ==> Z }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := Z
% 100.33/100.77 Z := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218125) {G6,W11,D5,L1,V3,M1} { X ==> meet( X, composition( join
% 100.33/100.77 ( one, Z ), join( Y, X ) ) ) }.
% 100.33/100.77 parent0[0]: (141) {G5,W11,D4,L1,V2,M1} P(137,6) { join( X, composition( Y,
% 100.33/100.77 X ) ) = composition( join( one, Y ), X ) }.
% 100.33/100.77 parent1[0; 4]: (218124) {G22,W9,D5,L1,V3,M1} { X ==> meet( X, join( join(
% 100.33/100.77 Y, X ), Z ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := join( Y, X )
% 100.33/100.77 Y := Z
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 Z := composition( Z, join( Y, X ) )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218127) {G6,W11,D5,L1,V3,M1} { meet( X, composition( join( one, Y
% 100.33/100.77 ), join( Z, X ) ) ) ==> X }.
% 100.33/100.77 parent0[0]: (218125) {G6,W11,D5,L1,V3,M1} { X ==> meet( X, composition(
% 100.33/100.77 join( one, Z ), join( Y, X ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Z
% 100.33/100.77 Z := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1823) {G23,W11,D5,L1,V3,M1} P(141,1085) { meet( Y,
% 100.33/100.77 composition( join( one, Z ), join( X, Y ) ) ) ==> Y }.
% 100.33/100.77 parent0: (218127) {G6,W11,D5,L1,V3,M1} { meet( X, composition( join( one,
% 100.33/100.77 Y ), join( Z, X ) ) ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := Z
% 100.33/100.77 Z := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218130) {G5,W11,D4,L1,V2,M1} { composition( join( one, Y ), X ) =
% 100.33/100.77 join( X, composition( Y, X ) ) }.
% 100.33/100.77 parent0[0]: (141) {G5,W11,D4,L1,V2,M1} P(137,6) { join( X, composition( Y,
% 100.33/100.77 X ) ) = composition( join( one, Y ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218143) {G6,W13,D5,L1,V1,M1} { composition( join( one,
% 100.33/100.77 composition( X, top ) ), top ) = join( top, composition( X, top ) ) }.
% 100.33/100.77 parent0[0]: (861) {G18,W9,D4,L1,V1,M1} P(860,4) { composition( composition
% 100.33/100.77 ( X, top ), top ) ==> composition( X, top ) }.
% 100.33/100.77 parent1[0; 10]: (218130) {G5,W11,D4,L1,V2,M1} { composition( join( one, Y
% 100.33/100.77 ), X ) = join( X, composition( Y, X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := top
% 100.33/100.77 Y := composition( X, top )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218144) {G7,W9,D5,L1,V1,M1} { composition( join( one,
% 100.33/100.77 composition( X, top ) ), top ) = top }.
% 100.33/100.77 parent0[0]: (230) {G7,W5,D3,L1,V1,M1} P(15,24);d(224) { join( top, X ) ==>
% 100.33/100.77 top }.
% 100.33/100.77 parent1[0; 8]: (218143) {G6,W13,D5,L1,V1,M1} { composition( join( one,
% 100.33/100.77 composition( X, top ) ), top ) = join( top, composition( X, top ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := composition( X, top )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218145) {G8,W7,D4,L1,V1,M1} { composition( join( one, X ), top )
% 100.33/100.77 = top }.
% 100.33/100.77 parent0[0]: (868) {G19,W13,D5,L1,V2,M1} P(861,6);d(6) { composition( join(
% 100.33/100.77 Y, composition( X, top ) ), top ) ==> composition( join( Y, X ), top )
% 100.33/100.77 }.
% 100.33/100.77 parent1[0; 1]: (218144) {G7,W9,D5,L1,V1,M1} { composition( join( one,
% 100.33/100.77 composition( X, top ) ), top ) = top }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := one
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1837) {G20,W7,D4,L1,V1,M1} P(861,141);d(230);d(868) {
% 100.33/100.77 composition( join( one, X ), top ) ==> top }.
% 100.33/100.77 parent0: (218145) {G8,W7,D4,L1,V1,M1} { composition( join( one, X ), top )
% 100.33/100.77 = top }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218148) {G5,W11,D4,L1,V2,M1} { composition( join( one, Y ), X ) =
% 100.33/100.77 join( X, composition( Y, X ) ) }.
% 100.33/100.77 parent0[0]: (141) {G5,W11,D4,L1,V2,M1} P(137,6) { join( X, composition( Y,
% 100.33/100.77 X ) ) = composition( join( one, Y ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218149) {G6,W9,D4,L1,V1,M1} { composition( top, X ) = join( X,
% 100.33/100.77 composition( top, X ) ) }.
% 100.33/100.77 parent0[0]: (233) {G8,W5,D3,L1,V1,M1} P(11,24);d(230) { join( X, top ) ==>
% 100.33/100.77 top }.
% 100.33/100.77 parent1[0; 2]: (218148) {G5,W11,D4,L1,V2,M1} { composition( join( one, Y )
% 100.33/100.77 , X ) = join( X, composition( Y, X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := one
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 Y := top
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218150) {G6,W9,D4,L1,V1,M1} { join( X, composition( top, X ) ) =
% 100.33/100.77 composition( top, X ) }.
% 100.33/100.77 parent0[0]: (218149) {G6,W9,D4,L1,V1,M1} { composition( top, X ) = join( X
% 100.33/100.77 , composition( top, X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1864) {G9,W9,D4,L1,V1,M1} P(233,141) { join( X, composition(
% 100.33/100.77 top, X ) ) ==> composition( top, X ) }.
% 100.33/100.77 parent0: (218150) {G6,W9,D4,L1,V1,M1} { join( X, composition( top, X ) ) =
% 100.33/100.77 composition( top, X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218152) {G5,W11,D4,L1,V2,M1} { composition( join( one, Y ), X ) =
% 100.33/100.77 join( X, composition( Y, X ) ) }.
% 100.33/100.77 parent0[0]: (141) {G5,W11,D4,L1,V2,M1} P(137,6) { join( X, composition( Y,
% 100.33/100.77 X ) ) = composition( join( one, Y ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218154) {G2,W9,D4,L1,V1,M1} { composition( one, X ) = join( X,
% 100.33/100.77 composition( skol1, X ) ) }.
% 100.33/100.77 parent0[0]: (16) {G1,W5,D3,L1,V0,M1} P(0,13) { join( one, skol1 ) ==> one
% 100.33/100.77 }.
% 100.33/100.77 parent1[0; 2]: (218152) {G5,W11,D4,L1,V2,M1} { composition( join( one, Y )
% 100.33/100.77 , X ) = join( X, composition( Y, X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 Y := skol1
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218155) {G3,W7,D4,L1,V1,M1} { X = join( X, composition( skol1, X
% 100.33/100.77 ) ) }.
% 100.33/100.77 parent0[0]: (137) {G4,W5,D3,L1,V1,M1} P(136,130) { composition( one, X )
% 100.33/100.77 ==> X }.
% 100.33/100.77 parent1[0; 1]: (218154) {G2,W9,D4,L1,V1,M1} { composition( one, X ) = join
% 100.33/100.77 ( X, composition( skol1, X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218156) {G3,W7,D4,L1,V1,M1} { join( X, composition( skol1, X ) )
% 100.33/100.77 = X }.
% 100.33/100.77 parent0[0]: (218155) {G3,W7,D4,L1,V1,M1} { X = join( X, composition( skol1
% 100.33/100.77 , X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1872) {G6,W7,D4,L1,V1,M1} P(16,141);d(137) { join( X,
% 100.33/100.77 composition( skol1, X ) ) ==> X }.
% 100.33/100.77 parent0: (218156) {G3,W7,D4,L1,V1,M1} { join( X, composition( skol1, X ) )
% 100.33/100.77 = X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218157) {G20,W7,D4,L1,V1,M1} { top ==> composition( join( one, X
% 100.33/100.77 ), top ) }.
% 100.33/100.77 parent0[0]: (1837) {G20,W7,D4,L1,V1,M1} P(861,141);d(230);d(868) {
% 100.33/100.77 composition( join( one, X ), top ) ==> top }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218158) {G2,W7,D4,L1,V1,M1} { top ==> composition( join( X, one
% 100.33/100.77 ), top ) }.
% 100.33/100.77 parent0[0]: (72) {G1,W11,D4,L1,V3,M1} P(6,0);d(6) { composition( join( X, Z
% 100.33/100.77 ), Y ) = composition( join( Z, X ), Y ) }.
% 100.33/100.77 parent1[0; 2]: (218157) {G20,W7,D4,L1,V1,M1} { top ==> composition( join(
% 100.33/100.77 one, X ), top ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := one
% 100.33/100.77 Y := top
% 100.33/100.77 Z := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218161) {G2,W7,D4,L1,V1,M1} { composition( join( X, one ), top )
% 100.33/100.77 ==> top }.
% 100.33/100.77 parent0[0]: (218158) {G2,W7,D4,L1,V1,M1} { top ==> composition( join( X,
% 100.33/100.77 one ), top ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1875) {G21,W7,D4,L1,V1,M1} P(1837,72) { composition( join( X
% 100.33/100.77 , one ), top ) ==> top }.
% 100.33/100.77 parent0: (218161) {G2,W7,D4,L1,V1,M1} { composition( join( X, one ), top )
% 100.33/100.77 ==> top }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218163) {G21,W7,D4,L1,V1,M1} { top ==> composition( join( X, one
% 100.33/100.77 ), top ) }.
% 100.33/100.77 parent0[0]: (1875) {G21,W7,D4,L1,V1,M1} P(1837,72) { composition( join( X,
% 100.33/100.77 one ), top ) ==> top }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218165) {G5,W8,D5,L1,V1,M1} { top ==> composition( converse(
% 100.33/100.77 join( X, one ) ), top ) }.
% 100.33/100.77 parent0[0]: (139) {G4,W9,D4,L1,V1,M1} P(136,8) { join( converse( X ), one )
% 100.33/100.77 ==> converse( join( X, one ) ) }.
% 100.33/100.77 parent1[0; 3]: (218163) {G21,W7,D4,L1,V1,M1} { top ==> composition( join(
% 100.33/100.77 X, one ), top ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := converse( X )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218166) {G6,W8,D5,L1,V1,M1} { top ==> converse( composition( top
% 100.33/100.77 , join( X, one ) ) ) }.
% 100.33/100.77 parent0[0]: (261) {G11,W9,D4,L1,V1,M1} P(260,18) { composition( converse( X
% 100.33/100.77 ), top ) ==> converse( composition( top, X ) ) }.
% 100.33/100.77 parent1[0; 2]: (218165) {G5,W8,D5,L1,V1,M1} { top ==> composition(
% 100.33/100.77 converse( join( X, one ) ), top ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := join( X, one )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218167) {G6,W8,D5,L1,V1,M1} { converse( composition( top, join( X
% 100.33/100.77 , one ) ) ) ==> top }.
% 100.33/100.77 parent0[0]: (218166) {G6,W8,D5,L1,V1,M1} { top ==> converse( composition(
% 100.33/100.77 top, join( X, one ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1883) {G22,W8,D5,L1,V1,M1} P(139,1875);d(261) { converse(
% 100.33/100.77 composition( top, join( X, one ) ) ) ==> top }.
% 100.33/100.77 parent0: (218167) {G6,W8,D5,L1,V1,M1} { converse( composition( top, join(
% 100.33/100.77 X, one ) ) ) ==> top }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218169) {G25,W8,D5,L1,V2,M1} { zero ==> meet( complement( join( X
% 100.33/100.77 , Y ) ), Y ) }.
% 100.33/100.77 parent0[0]: (1074) {G25,W8,D5,L1,V2,M1} P(1063,576) { meet( complement(
% 100.33/100.77 join( X, Y ) ), Y ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218170) {G7,W8,D4,L1,V1,M1} { zero ==> meet( complement( X ),
% 100.33/100.77 composition( skol1, X ) ) }.
% 100.33/100.77 parent0[0]: (1872) {G6,W7,D4,L1,V1,M1} P(16,141);d(137) { join( X,
% 100.33/100.77 composition( skol1, X ) ) ==> X }.
% 100.33/100.77 parent1[0; 4]: (218169) {G25,W8,D5,L1,V2,M1} { zero ==> meet( complement(
% 100.33/100.77 join( X, Y ) ), Y ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 Y := composition( skol1, X )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218171) {G7,W8,D4,L1,V1,M1} { meet( complement( X ), composition
% 100.33/100.77 ( skol1, X ) ) ==> zero }.
% 100.33/100.77 parent0[0]: (218170) {G7,W8,D4,L1,V1,M1} { zero ==> meet( complement( X )
% 100.33/100.77 , composition( skol1, X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1893) {G26,W8,D4,L1,V1,M1} P(1872,1074) { meet( complement( X
% 100.33/100.77 ), composition( skol1, X ) ) ==> zero }.
% 100.33/100.77 parent0: (218171) {G7,W8,D4,L1,V1,M1} { meet( complement( X ), composition
% 100.33/100.77 ( skol1, X ) ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218173) {G21,W7,D4,L1,V2,M1} { X ==> meet( X, join( Y, X ) ) }.
% 100.33/100.77 parent0[0]: (1047) {G21,W7,D4,L1,V2,M1} P(0,1028) { meet( X, join( Y, X ) )
% 100.33/100.77 ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218174) {G7,W9,D4,L1,V1,M1} { composition( skol1, X ) ==> meet(
% 100.33/100.77 composition( skol1, X ), X ) }.
% 100.33/100.77 parent0[0]: (1872) {G6,W7,D4,L1,V1,M1} P(16,141);d(137) { join( X,
% 100.33/100.77 composition( skol1, X ) ) ==> X }.
% 100.33/100.77 parent1[0; 8]: (218173) {G21,W7,D4,L1,V2,M1} { X ==> meet( X, join( Y, X )
% 100.33/100.77 ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := composition( skol1, X )
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218175) {G7,W9,D4,L1,V1,M1} { meet( composition( skol1, X ), X )
% 100.33/100.77 ==> composition( skol1, X ) }.
% 100.33/100.77 parent0[0]: (218174) {G7,W9,D4,L1,V1,M1} { composition( skol1, X ) ==>
% 100.33/100.77 meet( composition( skol1, X ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1894) {G22,W9,D4,L1,V1,M1} P(1872,1047) { meet( composition(
% 100.33/100.77 skol1, X ), X ) ==> composition( skol1, X ) }.
% 100.33/100.77 parent0: (218175) {G7,W9,D4,L1,V1,M1} { meet( composition( skol1, X ), X )
% 100.33/100.77 ==> composition( skol1, X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218176) {G6,W7,D4,L1,V1,M1} { X ==> join( X, composition( skol1,
% 100.33/100.77 X ) ) }.
% 100.33/100.77 parent0[0]: (1872) {G6,W7,D4,L1,V1,M1} P(16,141);d(137) { join( X,
% 100.33/100.77 composition( skol1, X ) ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218177) {G1,W7,D4,L1,V1,M1} { X ==> join( composition( skol1, X
% 100.33/100.77 ), X ) }.
% 100.33/100.77 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.77 parent1[0; 2]: (218176) {G6,W7,D4,L1,V1,M1} { X ==> join( X, composition(
% 100.33/100.77 skol1, X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := composition( skol1, X )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218180) {G1,W7,D4,L1,V1,M1} { join( composition( skol1, X ), X )
% 100.33/100.77 ==> X }.
% 100.33/100.77 parent0[0]: (218177) {G1,W7,D4,L1,V1,M1} { X ==> join( composition( skol1
% 100.33/100.77 , X ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1920) {G7,W7,D4,L1,V1,M1} P(1872,0) { join( composition(
% 100.33/100.77 skol1, X ), X ) ==> X }.
% 100.33/100.77 parent0: (218180) {G1,W7,D4,L1,V1,M1} { join( composition( skol1, X ), X )
% 100.33/100.77 ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218182) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y ) ==>
% 100.33/100.77 converse( join( X, converse( Y ) ) ) }.
% 100.33/100.77 parent0[0]: (21) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 100.33/100.77 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218185) {G2,W11,D6,L1,V1,M1} { join( converse( composition(
% 100.33/100.77 skol1, converse( X ) ) ), X ) ==> converse( converse( X ) ) }.
% 100.33/100.77 parent0[0]: (1920) {G7,W7,D4,L1,V1,M1} P(1872,0) { join( composition( skol1
% 100.33/100.77 , X ), X ) ==> X }.
% 100.33/100.77 parent1[0; 9]: (218182) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y )
% 100.33/100.77 ==> converse( join( X, converse( Y ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := converse( X )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := composition( skol1, converse( X ) )
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218186) {G1,W9,D6,L1,V1,M1} { join( converse( composition( skol1
% 100.33/100.77 , converse( X ) ) ), X ) ==> X }.
% 100.33/100.77 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 100.33/100.77 parent1[0; 8]: (218185) {G2,W11,D6,L1,V1,M1} { join( converse( composition
% 100.33/100.77 ( skol1, converse( X ) ) ), X ) ==> converse( converse( X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218187) {G2,W8,D5,L1,V1,M1} { join( composition( X, converse(
% 100.33/100.77 skol1 ) ), X ) ==> X }.
% 100.33/100.77 parent0[0]: (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 100.33/100.77 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 100.33/100.77 parent1[0; 2]: (218186) {G1,W9,D6,L1,V1,M1} { join( converse( composition
% 100.33/100.77 ( skol1, converse( X ) ) ), X ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := skol1
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1927) {G8,W8,D5,L1,V1,M1} P(1920,21);d(7);d(17) { join(
% 100.33/100.77 composition( X, converse( skol1 ) ), X ) ==> X }.
% 100.33/100.77 parent0: (218187) {G2,W8,D5,L1,V1,M1} { join( composition( X, converse(
% 100.33/100.77 skol1 ) ), X ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218190) {G5,W11,D4,L1,V2,M1} { composition( join( X, one ), Y ) =
% 100.33/100.77 join( composition( X, Y ), Y ) }.
% 100.33/100.77 parent0[0]: (142) {G5,W11,D4,L1,V2,M1} P(137,6) { join( composition( Y, X )
% 100.33/100.77 , X ) = composition( join( Y, one ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218192) {G6,W11,D5,L1,V2,M1} { composition( one, Y ) = join(
% 100.33/100.77 composition( meet( one, X ), Y ), Y ) }.
% 100.33/100.77 parent0[0]: (736) {G21,W7,D4,L1,V2,M1} P(699,0) { join( meet( X, Y ), X )
% 100.33/100.77 ==> X }.
% 100.33/100.77 parent1[0; 2]: (218190) {G5,W11,D4,L1,V2,M1} { composition( join( X, one )
% 100.33/100.77 , Y ) = join( composition( X, Y ), Y ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := one
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := meet( one, X )
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218193) {G5,W9,D5,L1,V2,M1} { X = join( composition( meet( one,
% 100.33/100.77 Y ), X ), X ) }.
% 100.33/100.77 parent0[0]: (137) {G4,W5,D3,L1,V1,M1} P(136,130) { composition( one, X )
% 100.33/100.77 ==> X }.
% 100.33/100.77 parent1[0; 1]: (218192) {G6,W11,D5,L1,V2,M1} { composition( one, Y ) =
% 100.33/100.77 join( composition( meet( one, X ), Y ), Y ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218194) {G5,W9,D5,L1,V2,M1} { join( composition( meet( one, Y ),
% 100.33/100.77 X ), X ) = X }.
% 100.33/100.77 parent0[0]: (218193) {G5,W9,D5,L1,V2,M1} { X = join( composition( meet(
% 100.33/100.77 one, Y ), X ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1957) {G22,W9,D5,L1,V2,M1} P(736,142);d(137) { join(
% 100.33/100.77 composition( meet( one, X ), Y ), Y ) ==> Y }.
% 100.33/100.77 parent0: (218194) {G5,W9,D5,L1,V2,M1} { join( composition( meet( one, Y )
% 100.33/100.77 , X ), X ) = X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218196) {G5,W11,D4,L1,V2,M1} { composition( join( X, one ), Y ) =
% 100.33/100.77 join( composition( X, Y ), Y ) }.
% 100.33/100.77 parent0[0]: (142) {G5,W11,D4,L1,V2,M1} P(137,6) { join( composition( Y, X )
% 100.33/100.77 , X ) = composition( join( Y, one ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218199) {G6,W12,D7,L1,V1,M1} { composition( top, X ) = join(
% 100.33/100.77 composition( converse( complement( converse( one ) ) ), X ), X ) }.
% 100.33/100.77 parent0[0]: (355) {G11,W8,D6,L1,V1,M1} S(168);d(260) { join( converse(
% 100.33/100.77 complement( converse( X ) ) ), X ) ==> top }.
% 100.33/100.77 parent1[0; 2]: (218196) {G5,W11,D4,L1,V2,M1} { composition( join( X, one )
% 100.33/100.77 , Y ) = join( composition( X, Y ), Y ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := one
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := converse( complement( converse( one ) ) )
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218200) {G4,W11,D6,L1,V1,M1} { composition( top, X ) = join(
% 100.33/100.77 composition( converse( complement( one ) ), X ), X ) }.
% 100.33/100.77 parent0[0]: (136) {G3,W4,D3,L1,V0,M1} P(130,5) { converse( one ) ==> one
% 100.33/100.77 }.
% 100.33/100.77 parent1[0; 8]: (218199) {G6,W12,D7,L1,V1,M1} { composition( top, X ) =
% 100.33/100.77 join( composition( converse( complement( converse( one ) ) ), X ), X )
% 100.33/100.77 }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218201) {G5,W10,D5,L1,V1,M1} { composition( top, X ) = join(
% 100.33/100.77 composition( complement( one ), X ), X ) }.
% 100.33/100.77 parent0[0]: (1551) {G29,W6,D4,L1,V0,M1} P(1550,1083);d(7);d(1507) {
% 100.33/100.77 converse( complement( one ) ) ==> complement( one ) }.
% 100.33/100.77 parent1[0; 6]: (218200) {G4,W11,D6,L1,V1,M1} { composition( top, X ) =
% 100.33/100.77 join( composition( converse( complement( one ) ), X ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218202) {G5,W10,D5,L1,V1,M1} { join( composition( complement( one
% 100.33/100.77 ), X ), X ) = composition( top, X ) }.
% 100.33/100.77 parent0[0]: (218201) {G5,W10,D5,L1,V1,M1} { composition( top, X ) = join(
% 100.33/100.77 composition( complement( one ), X ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1970) {G30,W10,D5,L1,V1,M1} P(355,142);d(136);d(1551) { join
% 100.33/100.77 ( composition( complement( one ), X ), X ) ==> composition( top, X ) }.
% 100.33/100.77 parent0: (218202) {G5,W10,D5,L1,V1,M1} { join( composition( complement(
% 100.33/100.77 one ), X ), X ) = composition( top, X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218204) {G5,W11,D4,L1,V2,M1} { composition( join( X, one ), Y ) =
% 100.33/100.77 join( composition( X, Y ), Y ) }.
% 100.33/100.77 parent0[0]: (142) {G5,W11,D4,L1,V2,M1} P(137,6) { join( composition( Y, X )
% 100.33/100.77 , X ) = composition( join( Y, one ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218205) {G6,W9,D4,L1,V1,M1} { composition( top, X ) = join(
% 100.33/100.77 composition( top, X ), X ) }.
% 100.33/100.77 parent0[0]: (230) {G7,W5,D3,L1,V1,M1} P(15,24);d(224) { join( top, X ) ==>
% 100.33/100.77 top }.
% 100.33/100.77 parent1[0; 2]: (218204) {G5,W11,D4,L1,V2,M1} { composition( join( X, one )
% 100.33/100.77 , Y ) = join( composition( X, Y ), Y ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := one
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := top
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218206) {G6,W9,D4,L1,V1,M1} { join( composition( top, X ), X ) =
% 100.33/100.77 composition( top, X ) }.
% 100.33/100.77 parent0[0]: (218205) {G6,W9,D4,L1,V1,M1} { composition( top, X ) = join(
% 100.33/100.77 composition( top, X ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (1984) {G8,W9,D4,L1,V1,M1} P(230,142) { join( composition( top
% 100.33/100.77 , X ), X ) ==> composition( top, X ) }.
% 100.33/100.77 parent0: (218206) {G6,W9,D4,L1,V1,M1} { join( composition( top, X ), X ) =
% 100.33/100.77 composition( top, X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218208) {G26,W8,D4,L1,V1,M1} { zero ==> meet( complement( X ),
% 100.33/100.77 composition( skol1, X ) ) }.
% 100.33/100.77 parent0[0]: (1893) {G26,W8,D4,L1,V1,M1} P(1872,1074) { meet( complement( X
% 100.33/100.77 ), composition( skol1, X ) ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218209) {G17,W8,D5,L1,V1,M1} { zero ==> meet( X, composition(
% 100.33/100.77 skol1, complement( X ) ) ) }.
% 100.33/100.77 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.77 complement( X ) ) ==> X }.
% 100.33/100.77 parent1[0; 3]: (218208) {G26,W8,D4,L1,V1,M1} { zero ==> meet( complement(
% 100.33/100.77 X ), composition( skol1, X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := complement( X )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218210) {G17,W8,D5,L1,V1,M1} { meet( X, composition( skol1,
% 100.33/100.77 complement( X ) ) ) ==> zero }.
% 100.33/100.77 parent0[0]: (218209) {G17,W8,D5,L1,V1,M1} { zero ==> meet( X, composition
% 100.33/100.77 ( skol1, complement( X ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (2027) {G27,W8,D5,L1,V1,M1} P(460,1893) { meet( X, composition
% 100.33/100.77 ( skol1, complement( X ) ) ) ==> zero }.
% 100.33/100.77 parent0: (218210) {G17,W8,D5,L1,V1,M1} { meet( X, composition( skol1,
% 100.33/100.77 complement( X ) ) ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218212) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet( X
% 100.33/100.77 , complement( Y ) ) ) }.
% 100.33/100.77 parent0[0]: (1009) {G18,W10,D5,L1,V2,M1} S(43);d(472) { join( meet( X, Y )
% 100.33/100.77 , meet( X, complement( Y ) ) ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218214) {G19,W11,D7,L1,V1,M1} { X ==> join( zero, meet( X,
% 100.33/100.77 complement( composition( skol1, complement( X ) ) ) ) ) }.
% 100.33/100.77 parent0[0]: (2027) {G27,W8,D5,L1,V1,M1} P(460,1893) { meet( X, composition
% 100.33/100.77 ( skol1, complement( X ) ) ) ==> zero }.
% 100.33/100.77 parent1[0; 3]: (218212) {G18,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 100.33/100.77 meet( X, complement( Y ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 Y := composition( skol1, complement( X ) )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218215) {G15,W9,D6,L1,V1,M1} { X ==> meet( X, complement(
% 100.33/100.77 composition( skol1, complement( X ) ) ) ) }.
% 100.33/100.77 parent0[0]: (455) {G14,W5,D3,L1,V1,M1} P(418,0);d(454) { join( zero, X )
% 100.33/100.77 ==> X }.
% 100.33/100.77 parent1[0; 2]: (218214) {G19,W11,D7,L1,V1,M1} { X ==> join( zero, meet( X
% 100.33/100.77 , complement( composition( skol1, complement( X ) ) ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := meet( X, complement( composition( skol1, complement( X ) ) ) )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218216) {G15,W9,D6,L1,V1,M1} { meet( X, complement( composition(
% 100.33/100.77 skol1, complement( X ) ) ) ) ==> X }.
% 100.33/100.77 parent0[0]: (218215) {G15,W9,D6,L1,V1,M1} { X ==> meet( X, complement(
% 100.33/100.77 composition( skol1, complement( X ) ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (2031) {G28,W9,D6,L1,V1,M1} P(2027,1009);d(455) { meet( X,
% 100.33/100.77 complement( composition( skol1, complement( X ) ) ) ) ==> X }.
% 100.33/100.77 parent0: (218216) {G15,W9,D6,L1,V1,M1} { meet( X, complement( composition
% 100.33/100.77 ( skol1, complement( X ) ) ) ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218218) {G5,W11,D4,L1,V2,M1} { composition( join( X, one ), Y ) =
% 100.33/100.77 join( composition( X, Y ), Y ) }.
% 100.33/100.77 parent0[0]: (142) {G5,W11,D4,L1,V2,M1} P(137,6) { join( composition( Y, X )
% 100.33/100.77 , X ) = composition( join( Y, one ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218223) {G6,W12,D6,L1,V1,M1} { composition( one, X ) = join(
% 100.33/100.77 composition( composition( one, converse( skol1 ) ), X ), X ) }.
% 100.33/100.77 parent0[0]: (1927) {G8,W8,D5,L1,V1,M1} P(1920,21);d(7);d(17) { join(
% 100.33/100.77 composition( X, converse( skol1 ) ), X ) ==> X }.
% 100.33/100.77 parent1[0; 2]: (218218) {G5,W11,D4,L1,V2,M1} { composition( join( X, one )
% 100.33/100.77 , Y ) = join( composition( X, Y ), Y ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := one
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := composition( one, converse( skol1 ) )
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218226) {G5,W10,D5,L1,V1,M1} { composition( one, X ) = join(
% 100.33/100.77 composition( converse( skol1 ), X ), X ) }.
% 100.33/100.77 parent0[0]: (137) {G4,W5,D3,L1,V1,M1} P(136,130) { composition( one, X )
% 100.33/100.77 ==> X }.
% 100.33/100.77 parent1[0; 6]: (218223) {G6,W12,D6,L1,V1,M1} { composition( one, X ) =
% 100.33/100.77 join( composition( composition( one, converse( skol1 ) ), X ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := converse( skol1 )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218228) {G5,W8,D5,L1,V1,M1} { X = join( composition( converse(
% 100.33/100.77 skol1 ), X ), X ) }.
% 100.33/100.77 parent0[0]: (137) {G4,W5,D3,L1,V1,M1} P(136,130) { composition( one, X )
% 100.33/100.77 ==> X }.
% 100.33/100.77 parent1[0; 1]: (218226) {G5,W10,D5,L1,V1,M1} { composition( one, X ) =
% 100.33/100.77 join( composition( converse( skol1 ), X ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218229) {G5,W8,D5,L1,V1,M1} { join( composition( converse( skol1
% 100.33/100.77 ), X ), X ) = X }.
% 100.33/100.77 parent0[0]: (218228) {G5,W8,D5,L1,V1,M1} { X = join( composition( converse
% 100.33/100.77 ( skol1 ), X ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (2046) {G9,W8,D5,L1,V1,M1} P(1927,142);d(137);d(137) { join(
% 100.33/100.77 composition( converse( skol1 ), X ), X ) ==> X }.
% 100.33/100.77 parent0: (218229) {G5,W8,D5,L1,V1,M1} { join( composition( converse( skol1
% 100.33/100.77 ), X ), X ) = X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218231) {G21,W8,D5,L1,V2,M1} { zero ==> meet( complement( join( X
% 100.33/100.77 , Y ) ), X ) }.
% 100.33/100.77 parent0[0]: (1036) {G21,W8,D5,L1,V2,M1} P(1028,571) { meet( complement(
% 100.33/100.77 join( X, Y ) ), X ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218232) {G9,W9,D5,L1,V1,M1} { zero ==> meet( complement( X ),
% 100.33/100.77 composition( X, converse( skol1 ) ) ) }.
% 100.33/100.77 parent0[0]: (1927) {G8,W8,D5,L1,V1,M1} P(1920,21);d(7);d(17) { join(
% 100.33/100.77 composition( X, converse( skol1 ) ), X ) ==> X }.
% 100.33/100.77 parent1[0; 4]: (218231) {G21,W8,D5,L1,V2,M1} { zero ==> meet( complement(
% 100.33/100.77 join( X, Y ) ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := composition( X, converse( skol1 ) )
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218233) {G9,W9,D5,L1,V1,M1} { meet( complement( X ), composition
% 100.33/100.77 ( X, converse( skol1 ) ) ) ==> zero }.
% 100.33/100.77 parent0[0]: (218232) {G9,W9,D5,L1,V1,M1} { zero ==> meet( complement( X )
% 100.33/100.77 , composition( X, converse( skol1 ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (2055) {G22,W9,D5,L1,V1,M1} P(1927,1036) { meet( complement( X
% 100.33/100.77 ), composition( X, converse( skol1 ) ) ) ==> zero }.
% 100.33/100.77 parent0: (218233) {G9,W9,D5,L1,V1,M1} { meet( complement( X ), composition
% 100.33/100.77 ( X, converse( skol1 ) ) ) ==> zero }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218235) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y ) ==>
% 100.33/100.77 converse( join( X, converse( Y ) ) ) }.
% 100.33/100.77 parent0[0]: (21) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 100.33/100.77 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218239) {G2,W12,D6,L1,V1,M1} { join( converse( composition(
% 100.33/100.77 converse( skol1 ), converse( X ) ) ), X ) ==> converse( converse( X ) )
% 100.33/100.77 }.
% 100.33/100.77 parent0[0]: (2046) {G9,W8,D5,L1,V1,M1} P(1927,142);d(137);d(137) { join(
% 100.33/100.77 composition( converse( skol1 ), X ), X ) ==> X }.
% 100.33/100.77 parent1[0; 10]: (218235) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y )
% 100.33/100.77 ==> converse( join( X, converse( Y ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := converse( X )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := composition( converse( skol1 ), converse( X ) )
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218240) {G1,W10,D6,L1,V1,M1} { join( converse( composition(
% 100.33/100.77 converse( skol1 ), converse( X ) ) ), X ) ==> X }.
% 100.33/100.77 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 100.33/100.77 parent1[0; 9]: (218239) {G2,W12,D6,L1,V1,M1} { join( converse( composition
% 100.33/100.77 ( converse( skol1 ), converse( X ) ) ), X ) ==> converse( converse( X ) )
% 100.33/100.77 }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218241) {G2,W9,D6,L1,V1,M1} { join( composition( X, converse(
% 100.33/100.77 converse( skol1 ) ) ), X ) ==> X }.
% 100.33/100.77 parent0[0]: (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 100.33/100.77 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 100.33/100.77 parent1[0; 2]: (218240) {G1,W10,D6,L1,V1,M1} { join( converse( composition
% 100.33/100.77 ( converse( skol1 ), converse( X ) ) ), X ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := converse( skol1 )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218242) {G1,W7,D4,L1,V1,M1} { join( composition( X, skol1 ), X )
% 100.33/100.77 ==> X }.
% 100.33/100.77 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 100.33/100.77 parent1[0; 4]: (218241) {G2,W9,D6,L1,V1,M1} { join( composition( X,
% 100.33/100.77 converse( converse( skol1 ) ) ), X ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := skol1
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (2094) {G10,W7,D4,L1,V1,M1} P(2046,21);d(7);d(17);d(7) { join
% 100.33/100.77 ( composition( X, skol1 ), X ) ==> X }.
% 100.33/100.77 parent0: (218242) {G1,W7,D4,L1,V1,M1} { join( composition( X, skol1 ), X )
% 100.33/100.77 ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218245) {G17,W10,D5,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 100.33/100.77 complement( join( X, complement( Y ) ) ) }.
% 100.33/100.77 parent0[0]: (471) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( X,
% 100.33/100.77 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218247) {G11,W11,D6,L1,V1,M1} { meet( complement( composition(
% 100.33/100.77 complement( X ), skol1 ) ), X ) ==> complement( complement( X ) ) }.
% 100.33/100.77 parent0[0]: (2094) {G10,W7,D4,L1,V1,M1} P(2046,21);d(7);d(17);d(7) { join(
% 100.33/100.77 composition( X, skol1 ), X ) ==> X }.
% 100.33/100.77 parent1[0; 9]: (218245) {G17,W10,D5,L1,V2,M1} { meet( complement( X ), Y )
% 100.33/100.77 ==> complement( join( X, complement( Y ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := complement( X )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := composition( complement( X ), skol1 )
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218248) {G12,W9,D6,L1,V1,M1} { meet( complement( composition(
% 100.33/100.77 complement( X ), skol1 ) ), X ) ==> X }.
% 100.33/100.77 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.77 complement( X ) ) ==> X }.
% 100.33/100.77 parent1[0; 8]: (218247) {G11,W11,D6,L1,V1,M1} { meet( complement(
% 100.33/100.77 composition( complement( X ), skol1 ) ), X ) ==> complement( complement(
% 100.33/100.77 X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (2098) {G18,W9,D6,L1,V1,M1} P(2094,471);d(460) { meet(
% 100.33/100.77 complement( composition( complement( X ), skol1 ) ), X ) ==> X }.
% 100.33/100.77 parent0: (218248) {G12,W9,D6,L1,V1,M1} { meet( complement( composition(
% 100.33/100.77 complement( X ), skol1 ) ), X ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218251) {G23,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X ) }.
% 100.33/100.77 parent0[0]: (1034) {G23,W7,D4,L1,V2,M1} P(1028,691) { meet( join( X, Y ), X
% 100.33/100.77 ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218252) {G11,W9,D4,L1,V1,M1} { composition( X, skol1 ) ==> meet
% 100.33/100.77 ( X, composition( X, skol1 ) ) }.
% 100.33/100.77 parent0[0]: (2094) {G10,W7,D4,L1,V1,M1} P(2046,21);d(7);d(17);d(7) { join(
% 100.33/100.77 composition( X, skol1 ), X ) ==> X }.
% 100.33/100.77 parent1[0; 5]: (218251) {G23,W7,D4,L1,V2,M1} { X ==> meet( join( X, Y ), X
% 100.33/100.77 ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := composition( X, skol1 )
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218253) {G11,W9,D4,L1,V1,M1} { meet( X, composition( X, skol1 ) )
% 100.33/100.77 ==> composition( X, skol1 ) }.
% 100.33/100.77 parent0[0]: (218252) {G11,W9,D4,L1,V1,M1} { composition( X, skol1 ) ==>
% 100.33/100.77 meet( X, composition( X, skol1 ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (2108) {G24,W9,D4,L1,V1,M1} P(2094,1034) { meet( X,
% 100.33/100.77 composition( X, skol1 ) ) ==> composition( X, skol1 ) }.
% 100.33/100.77 parent0: (218253) {G11,W9,D4,L1,V1,M1} { meet( X, composition( X, skol1 )
% 100.33/100.77 ) ==> composition( X, skol1 ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218255) {G18,W9,D4,L1,V2,M1} { join( X, Y ) ==> join( join( X, Y
% 100.33/100.77 ), X ) }.
% 100.33/100.77 parent0[0]: (479) {G18,W9,D4,L1,V2,M1} P(469,27) { join( join( X, Y ), X )
% 100.33/100.77 ==> join( X, Y ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218257) {G11,W11,D4,L1,V1,M1} { join( composition( X, skol1 ), X
% 100.33/100.77 ) ==> join( X, composition( X, skol1 ) ) }.
% 100.33/100.77 parent0[0]: (2094) {G10,W7,D4,L1,V1,M1} P(2046,21);d(7);d(17);d(7) { join(
% 100.33/100.77 composition( X, skol1 ), X ) ==> X }.
% 100.33/100.77 parent1[0; 7]: (218255) {G18,W9,D4,L1,V2,M1} { join( X, Y ) ==> join( join
% 100.33/100.77 ( X, Y ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := composition( X, skol1 )
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218258) {G11,W7,D4,L1,V1,M1} { X ==> join( X, composition( X,
% 100.33/100.77 skol1 ) ) }.
% 100.33/100.77 parent0[0]: (2094) {G10,W7,D4,L1,V1,M1} P(2046,21);d(7);d(17);d(7) { join(
% 100.33/100.77 composition( X, skol1 ), X ) ==> X }.
% 100.33/100.77 parent1[0; 1]: (218257) {G11,W11,D4,L1,V1,M1} { join( composition( X,
% 100.33/100.77 skol1 ), X ) ==> join( X, composition( X, skol1 ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218260) {G11,W7,D4,L1,V1,M1} { join( X, composition( X, skol1 ) )
% 100.33/100.77 ==> X }.
% 100.33/100.77 parent0[0]: (218258) {G11,W7,D4,L1,V1,M1} { X ==> join( X, composition( X
% 100.33/100.77 , skol1 ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (2111) {G19,W7,D4,L1,V1,M1} P(2094,479) { join( X, composition
% 100.33/100.77 ( X, skol1 ) ) ==> X }.
% 100.33/100.77 parent0: (218260) {G11,W7,D4,L1,V1,M1} { join( X, composition( X, skol1 )
% 100.33/100.77 ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218263) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 100.33/100.77 join( X, Y ), Z ) }.
% 100.33/100.77 parent0[0]: (26) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 100.33/100.77 join( join( Y, Z ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 Z := Z
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218265) {G2,W11,D4,L1,V2,M1} { join( join( X, Y ), composition(
% 100.33/100.77 X, skol1 ) ) = join( X, Y ) }.
% 100.33/100.77 parent0[0]: (2094) {G10,W7,D4,L1,V1,M1} P(2046,21);d(7);d(17);d(7) { join(
% 100.33/100.77 composition( X, skol1 ), X ) ==> X }.
% 100.33/100.77 parent1[0; 9]: (218263) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) =
% 100.33/100.77 join( join( X, Y ), Z ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := composition( X, skol1 )
% 100.33/100.77 Y := X
% 100.33/100.77 Z := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (2118) {G11,W11,D4,L1,V2,M1} P(2094,26) { join( join( X, Y ),
% 100.33/100.77 composition( X, skol1 ) ) ==> join( X, Y ) }.
% 100.33/100.77 parent0: (218265) {G2,W11,D4,L1,V2,M1} { join( join( X, Y ), composition(
% 100.33/100.77 X, skol1 ) ) = join( X, Y ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218268) {G19,W7,D4,L1,V1,M1} { X ==> join( X, composition( X,
% 100.33/100.77 skol1 ) ) }.
% 100.33/100.77 parent0[0]: (2111) {G19,W7,D4,L1,V1,M1} P(2094,479) { join( X, composition
% 100.33/100.77 ( X, skol1 ) ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218272) {G2,W17,D7,L1,V2,M1} { join( X, composition( Y, skol1 )
% 100.33/100.77 ) ==> join( X, composition( join( Y, join( X, composition( Y, skol1 ) )
% 100.33/100.77 ), skol1 ) ) }.
% 100.33/100.77 parent0[0]: (69) {G1,W17,D5,L1,V4,M1} P(6,1) { join( join( T, composition(
% 100.33/100.77 X, Y ) ), composition( Z, Y ) ) ==> join( T, composition( join( X, Z ), Y
% 100.33/100.77 ) ) }.
% 100.33/100.77 parent1[0; 6]: (218268) {G19,W7,D4,L1,V1,M1} { X ==> join( X, composition
% 100.33/100.77 ( X, skol1 ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := skol1
% 100.33/100.77 Z := join( X, composition( Y, skol1 ) )
% 100.33/100.77 T := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := join( X, composition( Y, skol1 ) )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218273) {G1,W17,D6,L1,V2,M1} { join( X, composition( Y, skol1 )
% 100.33/100.77 ) ==> join( X, composition( join( join( Y, X ), composition( Y, skol1 )
% 100.33/100.77 ), skol1 ) ) }.
% 100.33/100.77 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.33/100.77 join( X, Y ), Z ) }.
% 100.33/100.77 parent1[0; 9]: (218272) {G2,W17,D7,L1,V2,M1} { join( X, composition( Y,
% 100.33/100.77 skol1 ) ) ==> join( X, composition( join( Y, join( X, composition( Y,
% 100.33/100.77 skol1 ) ) ), skol1 ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 Z := composition( Y, skol1 )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218274) {G2,W13,D5,L1,V2,M1} { join( X, composition( Y, skol1 )
% 100.33/100.77 ) ==> join( X, composition( join( Y, X ), skol1 ) ) }.
% 100.33/100.77 parent0[0]: (2118) {G11,W11,D4,L1,V2,M1} P(2094,26) { join( join( X, Y ),
% 100.33/100.77 composition( X, skol1 ) ) ==> join( X, Y ) }.
% 100.33/100.77 parent1[0; 9]: (218273) {G1,W17,D6,L1,V2,M1} { join( X, composition( Y,
% 100.33/100.77 skol1 ) ) ==> join( X, composition( join( join( Y, X ), composition( Y,
% 100.33/100.77 skol1 ) ), skol1 ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218275) {G2,W13,D5,L1,V2,M1} { join( X, composition( join( Y, X )
% 100.33/100.77 , skol1 ) ) ==> join( X, composition( Y, skol1 ) ) }.
% 100.33/100.77 parent0[0]: (218274) {G2,W13,D5,L1,V2,M1} { join( X, composition( Y, skol1
% 100.33/100.77 ) ) ==> join( X, composition( join( Y, X ), skol1 ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (2125) {G20,W13,D5,L1,V2,M1} P(2111,69);d(1);d(2118) { join( X
% 100.33/100.77 , composition( join( Y, X ), skol1 ) ) ==> join( X, composition( Y, skol1
% 100.33/100.77 ) ) }.
% 100.33/100.77 parent0: (218275) {G2,W13,D5,L1,V2,M1} { join( X, composition( join( Y, X
% 100.33/100.77 ), skol1 ) ) ==> join( X, composition( Y, skol1 ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218277) {G21,W9,D6,L1,V2,M1} { X ==> join( X, converse( meet(
% 100.33/100.77 converse( X ), Y ) ) ) }.
% 100.33/100.77 parent0[0]: (733) {G21,W9,D6,L1,V2,M1} P(699,20);d(7) { join( X, converse(
% 100.33/100.77 meet( converse( X ), Y ) ) ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218279) {G22,W16,D5,L1,V2,M1} { composition( top, join( X, one )
% 100.33/100.77 ) ==> join( composition( top, join( X, one ) ), converse( meet( top, Y )
% 100.33/100.77 ) ) }.
% 100.33/100.77 parent0[0]: (1883) {G22,W8,D5,L1,V1,M1} P(139,1875);d(261) { converse(
% 100.33/100.77 composition( top, join( X, one ) ) ) ==> top }.
% 100.33/100.77 parent1[0; 14]: (218277) {G21,W9,D6,L1,V2,M1} { X ==> join( X, converse(
% 100.33/100.77 meet( converse( X ), Y ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := composition( top, join( X, one ) )
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218280) {G14,W14,D5,L1,V2,M1} { composition( top, join( X, one )
% 100.33/100.77 ) ==> join( composition( top, join( X, one ) ), converse( Y ) ) }.
% 100.33/100.77 parent0[0]: (452) {G13,W5,D3,L1,V1,M1} P(56,418);d(450) { meet( top, X )
% 100.33/100.77 ==> X }.
% 100.33/100.77 parent1[0; 13]: (218279) {G22,W16,D5,L1,V2,M1} { composition( top, join( X
% 100.33/100.77 , one ) ) ==> join( composition( top, join( X, one ) ), converse( meet(
% 100.33/100.77 top, Y ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218281) {G14,W14,D5,L1,V2,M1} { join( composition( top, join( X,
% 100.33/100.77 one ) ), converse( Y ) ) ==> composition( top, join( X, one ) ) }.
% 100.33/100.77 parent0[0]: (218280) {G14,W14,D5,L1,V2,M1} { composition( top, join( X,
% 100.33/100.77 one ) ) ==> join( composition( top, join( X, one ) ), converse( Y ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (2207) {G23,W14,D5,L1,V2,M1} P(1883,733);d(452) { join(
% 100.33/100.77 composition( top, join( X, one ) ), converse( Y ) ) ==> composition( top
% 100.33/100.77 , join( X, one ) ) }.
% 100.33/100.77 parent0: (218281) {G14,W14,D5,L1,V2,M1} { join( composition( top, join( X
% 100.33/100.77 , one ) ), converse( Y ) ) ==> composition( top, join( X, one ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218283) {G11,W8,D6,L1,V1,M1} { top ==> join( X, converse(
% 100.33/100.77 complement( converse( X ) ) ) ) }.
% 100.33/100.77 parent0[0]: (404) {G11,W8,D6,L1,V1,M1} S(156);d(260) { join( X, converse(
% 100.33/100.77 complement( converse( X ) ) ) ) ==> top }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218285) {G12,W11,D5,L1,V1,M1} { top ==> join( composition( top,
% 100.33/100.77 join( X, one ) ), converse( complement( top ) ) ) }.
% 100.33/100.77 parent0[0]: (1883) {G22,W8,D5,L1,V1,M1} P(139,1875);d(261) { converse(
% 100.33/100.77 composition( top, join( X, one ) ) ) ==> top }.
% 100.33/100.77 parent1[0; 10]: (218283) {G11,W8,D6,L1,V1,M1} { top ==> join( X, converse
% 100.33/100.77 ( complement( converse( X ) ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := composition( top, join( X, one ) )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218286) {G13,W7,D4,L1,V1,M1} { top ==> composition( top, join( X
% 100.33/100.77 , one ) ) }.
% 100.33/100.77 parent0[0]: (2207) {G23,W14,D5,L1,V2,M1} P(1883,733);d(452) { join(
% 100.33/100.77 composition( top, join( X, one ) ), converse( Y ) ) ==> composition( top
% 100.33/100.77 , join( X, one ) ) }.
% 100.33/100.77 parent1[0; 2]: (218285) {G12,W11,D5,L1,V1,M1} { top ==> join( composition
% 100.33/100.77 ( top, join( X, one ) ), converse( complement( top ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := complement( top )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218287) {G13,W7,D4,L1,V1,M1} { composition( top, join( X, one ) )
% 100.33/100.77 ==> top }.
% 100.33/100.77 parent0[0]: (218286) {G13,W7,D4,L1,V1,M1} { top ==> composition( top, join
% 100.33/100.77 ( X, one ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (2211) {G24,W7,D4,L1,V1,M1} P(1883,404);d(2207) { composition
% 100.33/100.77 ( top, join( X, one ) ) ==> top }.
% 100.33/100.77 parent0: (218287) {G13,W7,D4,L1,V1,M1} { composition( top, join( X, one )
% 100.33/100.77 ) ==> top }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218289) {G24,W7,D4,L1,V1,M1} { top ==> composition( top, join( X
% 100.33/100.77 , one ) ) }.
% 100.33/100.77 parent0[0]: (2211) {G24,W7,D4,L1,V1,M1} P(1883,404);d(2207) { composition(
% 100.33/100.77 top, join( X, one ) ) ==> top }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218290) {G19,W7,D4,L1,V1,M1} { top ==> composition( top, join(
% 100.33/100.77 one, X ) ) }.
% 100.33/100.77 parent0[0]: (479) {G18,W9,D4,L1,V2,M1} P(469,27) { join( join( X, Y ), X )
% 100.33/100.77 ==> join( X, Y ) }.
% 100.33/100.77 parent1[0; 4]: (218289) {G24,W7,D4,L1,V1,M1} { top ==> composition( top,
% 100.33/100.77 join( X, one ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := one
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := join( one, X )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218291) {G19,W7,D4,L1,V1,M1} { composition( top, join( one, X ) )
% 100.33/100.77 ==> top }.
% 100.33/100.77 parent0[0]: (218290) {G19,W7,D4,L1,V1,M1} { top ==> composition( top, join
% 100.33/100.77 ( one, X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (2217) {G25,W7,D4,L1,V1,M1} P(479,2211) { composition( top,
% 100.33/100.77 join( one, X ) ) ==> top }.
% 100.33/100.77 parent0: (218291) {G19,W7,D4,L1,V1,M1} { composition( top, join( one, X )
% 100.33/100.77 ) ==> top }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218293) {G18,W10,D5,L1,V2,M1} { join( X, complement( Y ) ) ==>
% 100.33/100.77 complement( meet( complement( X ), Y ) ) }.
% 100.33/100.77 parent0[0]: (994) {G18,W10,D5,L1,V2,M1} P(460,473) { complement( meet(
% 100.33/100.77 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218294) {G19,W13,D6,L1,V1,M1} { join( X, complement( composition
% 100.33/100.77 ( complement( X ), skol1 ) ) ) ==> complement( composition( complement( X
% 100.33/100.77 ), skol1 ) ) }.
% 100.33/100.77 parent0[0]: (2108) {G24,W9,D4,L1,V1,M1} P(2094,1034) { meet( X, composition
% 100.33/100.77 ( X, skol1 ) ) ==> composition( X, skol1 ) }.
% 100.33/100.77 parent1[0; 9]: (218293) {G18,W10,D5,L1,V2,M1} { join( X, complement( Y ) )
% 100.33/100.77 ==> complement( meet( complement( X ), Y ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := complement( X )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 Y := composition( complement( X ), skol1 )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (2275) {G25,W13,D6,L1,V1,M1} P(2108,994) { join( X, complement
% 100.33/100.77 ( composition( complement( X ), skol1 ) ) ) ==> complement( composition(
% 100.33/100.77 complement( X ), skol1 ) ) }.
% 100.33/100.77 parent0: (218294) {G19,W13,D6,L1,V1,M1} { join( X, complement( composition
% 100.33/100.77 ( complement( X ), skol1 ) ) ) ==> complement( composition( complement( X
% 100.33/100.77 ), skol1 ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218297) {G21,W7,D4,L1,V2,M1} { X ==> meet( X, join( Y, X ) ) }.
% 100.33/100.77 parent0[0]: (1047) {G21,W7,D4,L1,V2,M1} P(0,1028) { meet( X, join( Y, X ) )
% 100.33/100.77 ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218298) {G9,W7,D4,L1,V1,M1} { X ==> meet( X, composition( top, X
% 100.33/100.77 ) ) }.
% 100.33/100.77 parent0[0]: (1984) {G8,W9,D4,L1,V1,M1} P(230,142) { join( composition( top
% 100.33/100.77 , X ), X ) ==> composition( top, X ) }.
% 100.33/100.77 parent1[0; 4]: (218297) {G21,W7,D4,L1,V2,M1} { X ==> meet( X, join( Y, X )
% 100.33/100.77 ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 Y := composition( top, X )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218299) {G9,W7,D4,L1,V1,M1} { meet( X, composition( top, X ) )
% 100.33/100.77 ==> X }.
% 100.33/100.77 parent0[0]: (218298) {G9,W7,D4,L1,V1,M1} { X ==> meet( X, composition( top
% 100.33/100.77 , X ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (2320) {G22,W7,D4,L1,V1,M1} P(1984,1047) { meet( X,
% 100.33/100.77 composition( top, X ) ) ==> X }.
% 100.33/100.77 parent0: (218299) {G9,W7,D4,L1,V1,M1} { meet( X, composition( top, X ) )
% 100.33/100.77 ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218301) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 100.33/100.77 join( X, Y ), Z ) }.
% 100.33/100.77 parent0[0]: (26) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 100.33/100.77 join( join( Y, Z ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 Z := Z
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218303) {G2,W13,D4,L1,V2,M1} { join( join( X, Y ), composition(
% 100.33/100.77 top, X ) ) = join( composition( top, X ), Y ) }.
% 100.33/100.77 parent0[0]: (1984) {G8,W9,D4,L1,V1,M1} P(230,142) { join( composition( top
% 100.33/100.77 , X ), X ) ==> composition( top, X ) }.
% 100.33/100.77 parent1[0; 9]: (218301) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) =
% 100.33/100.77 join( join( X, Y ), Z ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := composition( top, X )
% 100.33/100.77 Y := X
% 100.33/100.77 Z := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (2329) {G9,W13,D4,L1,V2,M1} P(1984,26) { join( join( X, Y ),
% 100.33/100.77 composition( top, X ) ) ==> join( composition( top, X ), Y ) }.
% 100.33/100.77 parent0: (218303) {G2,W13,D4,L1,V2,M1} { join( join( X, Y ), composition(
% 100.33/100.77 top, X ) ) = join( composition( top, X ), Y ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218307) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y ) ==>
% 100.33/100.77 converse( join( X, converse( Y ) ) ) }.
% 100.33/100.77 parent0[0]: (21) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 100.33/100.77 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := Y
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218310) {G2,W13,D6,L1,V1,M1} { join( converse( composition( top
% 100.33/100.77 , converse( X ) ) ), X ) ==> converse( composition( top, converse( X ) )
% 100.33/100.77 ) }.
% 100.33/100.77 parent0[0]: (1984) {G8,W9,D4,L1,V1,M1} P(230,142) { join( composition( top
% 100.33/100.77 , X ), X ) ==> composition( top, X ) }.
% 100.33/100.77 parent1[0; 9]: (218307) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y )
% 100.33/100.77 ==> converse( join( X, converse( Y ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := converse( X )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := composition( top, converse( X ) )
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218312) {G2,W12,D6,L1,V1,M1} { join( converse( composition( top
% 100.33/100.77 , converse( X ) ) ), X ) ==> composition( X, converse( top ) ) }.
% 100.33/100.77 parent0[0]: (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 100.33/100.77 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 100.33/100.77 parent1[0; 8]: (218310) {G2,W13,D6,L1,V1,M1} { join( converse( composition
% 100.33/100.77 ( top, converse( X ) ) ), X ) ==> converse( composition( top, converse( X
% 100.33/100.77 ) ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := top
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218313) {G2,W11,D5,L1,V1,M1} { join( composition( X, converse(
% 100.33/100.77 top ) ), X ) ==> composition( X, converse( top ) ) }.
% 100.33/100.77 parent0[0]: (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 100.33/100.77 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 100.33/100.77 parent1[0; 2]: (218312) {G2,W12,D6,L1,V1,M1} { join( converse( composition
% 100.33/100.77 ( top, converse( X ) ) ), X ) ==> composition( X, converse( top ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := top
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218317) {G3,W10,D5,L1,V1,M1} { join( composition( X, converse(
% 100.33/100.77 top ) ), X ) ==> composition( X, top ) }.
% 100.33/100.77 parent0[0]: (260) {G10,W4,D3,L1,V0,M1} P(235,230) { converse( top ) ==> top
% 100.33/100.77 }.
% 100.33/100.77 parent1[0; 9]: (218313) {G2,W11,D5,L1,V1,M1} { join( composition( X,
% 100.33/100.77 converse( top ) ), X ) ==> composition( X, converse( top ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218318) {G4,W9,D4,L1,V1,M1} { join( composition( X, top ), X )
% 100.33/100.77 ==> composition( X, top ) }.
% 100.33/100.77 parent0[0]: (260) {G10,W4,D3,L1,V0,M1} P(235,230) { converse( top ) ==> top
% 100.33/100.77 }.
% 100.33/100.77 parent1[0; 4]: (218317) {G3,W10,D5,L1,V1,M1} { join( composition( X,
% 100.33/100.77 converse( top ) ), X ) ==> composition( X, top ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (2332) {G11,W9,D4,L1,V1,M1} P(1984,21);d(17);d(260) { join(
% 100.33/100.77 composition( X, top ), X ) ==> composition( X, top ) }.
% 100.33/100.77 parent0: (218318) {G4,W9,D4,L1,V1,M1} { join( composition( X, top ), X )
% 100.33/100.77 ==> composition( X, top ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218323) {G18,W10,D5,L1,V2,M1} { join( X, complement( Y ) ) ==>
% 100.33/100.77 complement( meet( complement( X ), Y ) ) }.
% 100.33/100.77 parent0[0]: (994) {G18,W10,D5,L1,V2,M1} P(460,473) { complement( meet(
% 100.33/100.77 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218325) {G19,W11,D6,L1,V1,M1} { join( X, complement( composition
% 100.33/100.77 ( top, complement( X ) ) ) ) ==> complement( complement( X ) ) }.
% 100.33/100.77 parent0[0]: (2320) {G22,W7,D4,L1,V1,M1} P(1984,1047) { meet( X, composition
% 100.33/100.77 ( top, X ) ) ==> X }.
% 100.33/100.77 parent1[0; 9]: (218323) {G18,W10,D5,L1,V2,M1} { join( X, complement( Y ) )
% 100.33/100.77 ==> complement( meet( complement( X ), Y ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := complement( X )
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 Y := composition( top, complement( X ) )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218326) {G17,W9,D6,L1,V1,M1} { join( X, complement( composition
% 100.33/100.77 ( top, complement( X ) ) ) ) ==> X }.
% 100.33/100.77 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.33/100.77 complement( X ) ) ==> X }.
% 100.33/100.77 parent1[0; 8]: (218325) {G19,W11,D6,L1,V1,M1} { join( X, complement(
% 100.33/100.77 composition( top, complement( X ) ) ) ) ==> complement( complement( X ) )
% 100.33/100.77 }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (2334) {G23,W9,D6,L1,V1,M1} P(2320,994);d(460) { join( X,
% 100.33/100.77 complement( composition( top, complement( X ) ) ) ) ==> X }.
% 100.33/100.77 parent0: (218326) {G17,W9,D6,L1,V1,M1} { join( X, complement( composition
% 100.33/100.77 ( top, complement( X ) ) ) ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218329) {G21,W7,D4,L1,V2,M1} { X ==> meet( X, join( Y, X ) ) }.
% 100.33/100.77 parent0[0]: (1047) {G21,W7,D4,L1,V2,M1} P(0,1028) { meet( X, join( Y, X ) )
% 100.33/100.77 ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218330) {G12,W7,D4,L1,V1,M1} { X ==> meet( X, composition( X,
% 100.33/100.77 top ) ) }.
% 100.33/100.77 parent0[0]: (2332) {G11,W9,D4,L1,V1,M1} P(1984,21);d(17);d(260) { join(
% 100.33/100.77 composition( X, top ), X ) ==> composition( X, top ) }.
% 100.33/100.77 parent1[0; 4]: (218329) {G21,W7,D4,L1,V2,M1} { X ==> meet( X, join( Y, X )
% 100.33/100.77 ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 Y := composition( X, top )
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218331) {G12,W7,D4,L1,V1,M1} { meet( X, composition( X, top ) )
% 100.33/100.77 ==> X }.
% 100.33/100.77 parent0[0]: (218330) {G12,W7,D4,L1,V1,M1} { X ==> meet( X, composition( X
% 100.33/100.77 , top ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (2428) {G22,W7,D4,L1,V1,M1} P(2332,1047) { meet( X,
% 100.33/100.77 composition( X, top ) ) ==> X }.
% 100.33/100.77 parent0: (218331) {G12,W7,D4,L1,V1,M1} { meet( X, composition( X, top ) )
% 100.33/100.77 ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218332) {G11,W9,D4,L1,V1,M1} { composition( X, top ) ==> join(
% 100.33/100.77 composition( X, top ), X ) }.
% 100.33/100.77 parent0[0]: (2332) {G11,W9,D4,L1,V1,M1} P(1984,21);d(17);d(260) { join(
% 100.33/100.77 composition( X, top ), X ) ==> composition( X, top ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 paramod: (218333) {G1,W9,D4,L1,V1,M1} { composition( X, top ) ==> join( X
% 100.33/100.77 , composition( X, top ) ) }.
% 100.33/100.77 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.33/100.77 parent1[0; 4]: (218332) {G11,W9,D4,L1,V1,M1} { composition( X, top ) ==>
% 100.33/100.77 join( composition( X, top ), X ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := composition( X, top )
% 100.33/100.77 Y := X
% 100.33/100.77 end
% 100.33/100.77 substitution1:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218336) {G1,W9,D4,L1,V1,M1} { join( X, composition( X, top ) )
% 100.33/100.77 ==> composition( X, top ) }.
% 100.33/100.77 parent0[0]: (218333) {G1,W9,D4,L1,V1,M1} { composition( X, top ) ==> join
% 100.33/100.77 ( X, composition( X, top ) ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 subsumption: (2443) {G12,W9,D4,L1,V1,M1} P(2332,0) { join( X, composition(
% 100.33/100.77 X, top ) ) ==> composition( X, top ) }.
% 100.33/100.77 parent0: (218336) {G1,W9,D4,L1,V1,M1} { join( X, composition( X, top ) )
% 100.33/100.77 ==> composition( X, top ) }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 end
% 100.33/100.77 permutation0:
% 100.33/100.77 0 ==> 0
% 100.33/100.77 end
% 100.33/100.77
% 100.33/100.77 eqswap: (218338) {G24,W9,D5,L1,V3,M1} { X ==> meet( join( join( X, Y ), Z
% 100.33/100.77 ), X ) }.
% 100.33/100.77 parent0[0]: (1061) {G24,W9,D5,L1,V3,M1} P(1,1034) { meet( join( join( X, Y
% 100.33/100.77 ), Z ), X ) ==> X }.
% 100.33/100.77 substitution0:
% 100.33/100.77 X := X
% 100.33/100.77 Y := Y
% 100.33/100.77 Z := Z
% 100.33/100.78 end
% 100.33/100.78
% 100.33/100.78 paramod: (218339) {G13,W9,D5,L1,V2,M1} { X ==> meet( composition( join( X
% 100.33/100.78 , Y ), top ), X ) }.
% 100.33/100.78 parent0[0]: (2443) {G12,W9,D4,L1,V1,M1} P(2332,0) { join( X, composition( X
% 100.33/100.78 , top ) ) ==> composition( X, top ) }.
% 100.33/100.78 parent1[0; 3]: (218338) {G24,W9,D5,L1,V3,M1} { X ==> meet( join( join( X,
% 100.33/100.78 Y ), Z ), X ) }.
% 100.33/100.78 substitution0:
% 100.33/100.78 X := join( X, Y )
% 100.33/100.78 end
% 100.33/100.78 substitution1:
% 100.33/100.78 X := X
% 100.33/100.78 Y := Y
% 100.33/100.78 Z := composition( join( X, Y ), top )
% 100.33/100.78 end
% 100.33/100.78
% 100.33/100.78 eqswap: (218341) {G13,W9,D5,L1,V2,M1} { meet( composition( join( X, Y ),
% 100.33/100.78 top ), X ) ==> X }.
% 100.33/100.78 parent0[0]: (218339) {G13,W9,D5,L1,V2,M1} { X ==> meet( composition( join
% 100.33/100.78 ( X, Y ), top ), X ) }.
% 100.33/100.78 substitution0:
% 100.33/100.78 X := X
% 100.33/100.78 Y := Y
% 100.33/100.78 end
% 100.33/100.78
% 100.33/100.78 subsumption: (2533) {G25,W9,D5,L1,V2,M1} P(2443,1061) { meet( composition(
% 100.33/100.78 join( X, Y ), top ), X ) ==> X }.
% 100.33/100.78 parent0: (218341) {G13,W9,D5,L1,V2,M1} { meet( composition( join( X, Y ),
% 100.33/100.78 top ), X ) ==> X }.
% 100.33/100.78 substitution0:
% 100.33/100.78 X := X
% 100.33/100.78 Y := Y
% 100.33/100.78 end
% 100.33/100.78 permutation0:
% 100.33/100.78 0 ==> 0
% 100.33/100.78 end
% 100.33/100.78
% 100.33/100.78 eqswap: (218344) {G26,W8,D5,L1,V1,M1} { zero ==> meet( skol1, meet( X,
% 100.42/100.78 complement( one ) ) ) }.
% 100.42/100.78 parent0[0]: (1805) {G26,W8,D5,L1,V1,M1} P(1803,1209);d(451);d(458) { meet(
% 100.42/100.78 skol1, meet( X, complement( one ) ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218345) {G23,W8,D5,L1,V0,M1} { zero ==> meet( skol1, composition
% 100.42/100.78 ( skol1, complement( one ) ) ) }.
% 100.42/100.78 parent0[0]: (1894) {G22,W9,D4,L1,V1,M1} P(1872,1047) { meet( composition(
% 100.42/100.78 skol1, X ), X ) ==> composition( skol1, X ) }.
% 100.42/100.78 parent1[0; 4]: (218344) {G26,W8,D5,L1,V1,M1} { zero ==> meet( skol1, meet
% 100.42/100.78 ( X, complement( one ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := complement( one )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := composition( skol1, complement( one ) )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218346) {G23,W8,D5,L1,V0,M1} { meet( skol1, composition( skol1,
% 100.42/100.78 complement( one ) ) ) ==> zero }.
% 100.42/100.78 parent0[0]: (218345) {G23,W8,D5,L1,V0,M1} { zero ==> meet( skol1,
% 100.42/100.78 composition( skol1, complement( one ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (2543) {G27,W8,D5,L1,V0,M1} P(1894,1805) { meet( skol1,
% 100.42/100.78 composition( skol1, complement( one ) ) ) ==> zero }.
% 100.42/100.78 parent0: (218346) {G23,W8,D5,L1,V0,M1} { meet( skol1, composition( skol1,
% 100.42/100.78 complement( one ) ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218348) {G19,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ), meet(
% 100.42/100.78 complement( Y ), X ) ) }.
% 100.42/100.78 parent0[0]: (1535) {G19,W10,D5,L1,V2,M1} P(56,1009) { join( meet( X, Y ),
% 100.42/100.78 meet( complement( Y ), X ) ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218350) {G20,W11,D7,L1,V0,M1} { skol1 ==> join( zero, meet(
% 100.42/100.78 complement( composition( skol1, complement( one ) ) ), skol1 ) ) }.
% 100.42/100.78 parent0[0]: (2543) {G27,W8,D5,L1,V0,M1} P(1894,1805) { meet( skol1,
% 100.42/100.78 composition( skol1, complement( one ) ) ) ==> zero }.
% 100.42/100.78 parent1[0; 3]: (218348) {G19,W10,D5,L1,V2,M1} { X ==> join( meet( X, Y ),
% 100.42/100.78 meet( complement( Y ), X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := skol1
% 100.42/100.78 Y := composition( skol1, complement( one ) )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218351) {G15,W9,D6,L1,V0,M1} { skol1 ==> meet( complement(
% 100.42/100.78 composition( skol1, complement( one ) ) ), skol1 ) }.
% 100.42/100.78 parent0[0]: (455) {G14,W5,D3,L1,V1,M1} P(418,0);d(454) { join( zero, X )
% 100.42/100.78 ==> X }.
% 100.42/100.78 parent1[0; 2]: (218350) {G20,W11,D7,L1,V0,M1} { skol1 ==> join( zero, meet
% 100.42/100.78 ( complement( composition( skol1, complement( one ) ) ), skol1 ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := meet( complement( composition( skol1, complement( one ) ) ), skol1
% 100.42/100.78 )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218352) {G15,W9,D6,L1,V0,M1} { meet( complement( composition(
% 100.42/100.78 skol1, complement( one ) ) ), skol1 ) ==> skol1 }.
% 100.42/100.78 parent0[0]: (218351) {G15,W9,D6,L1,V0,M1} { skol1 ==> meet( complement(
% 100.42/100.78 composition( skol1, complement( one ) ) ), skol1 ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (2552) {G28,W9,D6,L1,V0,M1} P(2543,1535);d(455) { meet(
% 100.42/100.78 complement( composition( skol1, complement( one ) ) ), skol1 ) ==> skol1
% 100.42/100.78 }.
% 100.42/100.78 parent0: (218352) {G15,W9,D6,L1,V0,M1} { meet( complement( composition(
% 100.42/100.78 skol1, complement( one ) ) ), skol1 ) ==> skol1 }.
% 100.42/100.78 substitution0:
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218354) {G24,W9,D5,L1,V3,M1} { X ==> meet( join( join( X, Y ), Z
% 100.42/100.78 ), X ) }.
% 100.42/100.78 parent0[0]: (1061) {G24,W9,D5,L1,V3,M1} P(1,1034) { meet( join( join( X, Y
% 100.42/100.78 ), Z ), X ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218355) {G10,W9,D5,L1,V2,M1} { X ==> meet( composition( top,
% 100.42/100.78 join( X, Y ) ), X ) }.
% 100.42/100.78 parent0[0]: (1864) {G9,W9,D4,L1,V1,M1} P(233,141) { join( X, composition(
% 100.42/100.78 top, X ) ) ==> composition( top, X ) }.
% 100.42/100.78 parent1[0; 3]: (218354) {G24,W9,D5,L1,V3,M1} { X ==> meet( join( join( X,
% 100.42/100.78 Y ), Z ), X ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := join( X, Y )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := composition( top, join( X, Y ) )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218357) {G10,W9,D5,L1,V2,M1} { meet( composition( top, join( X, Y
% 100.42/100.78 ) ), X ) ==> X }.
% 100.42/100.78 parent0[0]: (218355) {G10,W9,D5,L1,V2,M1} { X ==> meet( composition( top,
% 100.42/100.78 join( X, Y ) ), X ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (2561) {G25,W9,D5,L1,V2,M1} P(1864,1061) { meet( composition(
% 100.42/100.78 top, join( X, Y ) ), X ) ==> X }.
% 100.42/100.78 parent0: (218357) {G10,W9,D5,L1,V2,M1} { meet( composition( top, join( X,
% 100.42/100.78 Y ) ), X ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218360) {G25,W9,D5,L1,V3,M1} { Y ==> meet( join( join( X, Y ), Z
% 100.42/100.78 ), Y ) }.
% 100.42/100.78 parent0[0]: (1076) {G25,W9,D5,L1,V3,M1} P(27,1063) { meet( join( join( X, Z
% 100.42/100.78 ), Y ), Z ) ==> Z }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Z
% 100.42/100.78 Z := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218361) {G10,W9,D5,L1,V2,M1} { X ==> meet( composition( top,
% 100.42/100.78 join( Y, X ) ), X ) }.
% 100.42/100.78 parent0[0]: (1864) {G9,W9,D4,L1,V1,M1} P(233,141) { join( X, composition(
% 100.42/100.78 top, X ) ) ==> composition( top, X ) }.
% 100.42/100.78 parent1[0; 3]: (218360) {G25,W9,D5,L1,V3,M1} { Y ==> meet( join( join( X,
% 100.42/100.78 Y ), Z ), Y ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := join( Y, X )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 Z := composition( top, join( Y, X ) )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218363) {G10,W9,D5,L1,V2,M1} { meet( composition( top, join( Y, X
% 100.42/100.78 ) ), X ) ==> X }.
% 100.42/100.78 parent0[0]: (218361) {G10,W9,D5,L1,V2,M1} { X ==> meet( composition( top,
% 100.42/100.78 join( Y, X ) ), X ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (2562) {G26,W9,D5,L1,V2,M1} P(1864,1076) { meet( composition(
% 100.42/100.78 top, join( X, Y ) ), Y ) ==> Y }.
% 100.42/100.78 parent0: (218363) {G10,W9,D5,L1,V2,M1} { meet( composition( top, join( Y,
% 100.42/100.78 X ) ), X ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218366) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 100.42/100.78 join( X, Y ), Z ) }.
% 100.42/100.78 parent0[0]: (26) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 100.42/100.78 join( join( Y, Z ), X ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218380) {G2,W13,D4,L1,V2,M1} { join( composition( top, X ), Y )
% 100.42/100.78 = join( join( Y, X ), composition( top, X ) ) }.
% 100.42/100.78 parent0[0]: (1864) {G9,W9,D4,L1,V1,M1} P(233,141) { join( X, composition(
% 100.42/100.78 top, X ) ) ==> composition( top, X ) }.
% 100.42/100.78 parent1[0; 2]: (218366) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) =
% 100.42/100.78 join( join( X, Y ), Z ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 Z := composition( top, X )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218384) {G2,W13,D4,L1,V2,M1} { join( join( Y, X ), composition(
% 100.42/100.78 top, X ) ) = join( composition( top, X ), Y ) }.
% 100.42/100.78 parent0[0]: (218380) {G2,W13,D4,L1,V2,M1} { join( composition( top, X ), Y
% 100.42/100.78 ) = join( join( Y, X ), composition( top, X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (2567) {G10,W13,D4,L1,V2,M1} P(1864,26) { join( join( Y, X ),
% 100.42/100.78 composition( top, X ) ) ==> join( composition( top, X ), Y ) }.
% 100.42/100.78 parent0: (218384) {G2,W13,D4,L1,V2,M1} { join( join( Y, X ), composition(
% 100.42/100.78 top, X ) ) = join( composition( top, X ), Y ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218388) {G25,W9,D5,L1,V2,M1} { X ==> meet( composition( top, join
% 100.42/100.78 ( X, Y ) ), X ) }.
% 100.42/100.78 parent0[0]: (2561) {G25,W9,D5,L1,V2,M1} P(1864,1061) { meet( composition(
% 100.42/100.78 top, join( X, Y ) ), X ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218391) {G6,W15,D6,L1,V2,M1} { composition( X, Y ) ==> meet(
% 100.42/100.78 composition( top, composition( join( X, one ), Y ) ), composition( X, Y )
% 100.42/100.78 ) }.
% 100.42/100.78 parent0[0]: (142) {G5,W11,D4,L1,V2,M1} P(137,6) { join( composition( Y, X )
% 100.42/100.78 , X ) = composition( join( Y, one ), X ) }.
% 100.42/100.78 parent1[0; 7]: (218388) {G25,W9,D5,L1,V2,M1} { X ==> meet( composition(
% 100.42/100.78 top, join( X, Y ) ), X ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := composition( X, Y )
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218392) {G1,W15,D6,L1,V2,M1} { composition( X, Y ) ==> meet(
% 100.42/100.78 composition( composition( top, join( X, one ) ), Y ), composition( X, Y )
% 100.42/100.78 ) }.
% 100.42/100.78 parent0[0]: (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z
% 100.42/100.78 ) ) ==> composition( composition( X, Y ), Z ) }.
% 100.42/100.78 parent1[0; 5]: (218391) {G6,W15,D6,L1,V2,M1} { composition( X, Y ) ==>
% 100.42/100.78 meet( composition( top, composition( join( X, one ), Y ) ), composition(
% 100.42/100.78 X, Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := top
% 100.42/100.78 Y := join( X, one )
% 100.42/100.78 Z := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218393) {G2,W11,D4,L1,V2,M1} { composition( X, Y ) ==> meet(
% 100.42/100.78 composition( top, Y ), composition( X, Y ) ) }.
% 100.42/100.78 parent0[0]: (2211) {G24,W7,D4,L1,V1,M1} P(1883,404);d(2207) { composition(
% 100.42/100.78 top, join( X, one ) ) ==> top }.
% 100.42/100.78 parent1[0; 6]: (218392) {G1,W15,D6,L1,V2,M1} { composition( X, Y ) ==>
% 100.42/100.78 meet( composition( composition( top, join( X, one ) ), Y ), composition(
% 100.42/100.78 X, Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218394) {G2,W11,D4,L1,V2,M1} { meet( composition( top, Y ),
% 100.42/100.78 composition( X, Y ) ) ==> composition( X, Y ) }.
% 100.42/100.78 parent0[0]: (218393) {G2,W11,D4,L1,V2,M1} { composition( X, Y ) ==> meet(
% 100.42/100.78 composition( top, Y ), composition( X, Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (2602) {G26,W11,D4,L1,V2,M1} P(142,2561);d(4);d(2211) { meet(
% 100.42/100.78 composition( top, Y ), composition( X, Y ) ) ==> composition( X, Y ) }.
% 100.42/100.78 parent0: (218394) {G2,W11,D4,L1,V2,M1} { meet( composition( top, Y ),
% 100.42/100.78 composition( X, Y ) ) ==> composition( X, Y ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218396) {G11,W8,D5,L1,V2,M1} { top ==> join( complement( meet( X
% 100.42/100.78 , Y ) ), X ) }.
% 100.42/100.78 parent0[0]: (535) {G11,W8,D5,L1,V2,M1} P(490,0) { join( complement( meet( X
% 100.42/100.78 , Y ) ), X ) ==> top }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218399) {G12,W10,D5,L1,V2,M1} { top ==> join( complement( Y ),
% 100.42/100.78 composition( top, join( X, Y ) ) ) }.
% 100.42/100.78 parent0[0]: (2562) {G26,W9,D5,L1,V2,M1} P(1864,1076) { meet( composition(
% 100.42/100.78 top, join( X, Y ) ), Y ) ==> Y }.
% 100.42/100.78 parent1[0; 4]: (218396) {G11,W8,D5,L1,V2,M1} { top ==> join( complement(
% 100.42/100.78 meet( X, Y ) ), X ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := composition( top, join( X, Y ) )
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218400) {G12,W10,D5,L1,V2,M1} { join( complement( X ),
% 100.42/100.78 composition( top, join( Y, X ) ) ) ==> top }.
% 100.42/100.78 parent0[0]: (218399) {G12,W10,D5,L1,V2,M1} { top ==> join( complement( Y )
% 100.42/100.78 , composition( top, join( X, Y ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (2625) {G27,W10,D5,L1,V2,M1} P(2562,535) { join( complement( Y
% 100.42/100.78 ), composition( top, join( X, Y ) ) ) ==> top }.
% 100.42/100.78 parent0: (218400) {G12,W10,D5,L1,V2,M1} { join( complement( X ),
% 100.42/100.78 composition( top, join( Y, X ) ) ) ==> top }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218402) {G25,W9,D5,L1,V2,M1} { X ==> meet( composition( join( X,
% 100.42/100.78 Y ), top ), X ) }.
% 100.42/100.78 parent0[0]: (2533) {G25,W9,D5,L1,V2,M1} P(2443,1061) { meet( composition(
% 100.42/100.78 join( X, Y ), top ), X ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218403) {G23,W15,D5,L1,V2,M1} { composition( meet( one, X ), Y )
% 100.42/100.78 ==> meet( composition( Y, top ), composition( meet( one, X ), Y ) ) }.
% 100.42/100.78 parent0[0]: (1957) {G22,W9,D5,L1,V2,M1} P(736,142);d(137) { join(
% 100.42/100.78 composition( meet( one, X ), Y ), Y ) ==> Y }.
% 100.42/100.78 parent1[0; 8]: (218402) {G25,W9,D5,L1,V2,M1} { X ==> meet( composition(
% 100.42/100.78 join( X, Y ), top ), X ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := composition( meet( one, X ), Y )
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218404) {G23,W15,D5,L1,V2,M1} { meet( composition( Y, top ),
% 100.42/100.78 composition( meet( one, X ), Y ) ) ==> composition( meet( one, X ), Y )
% 100.42/100.78 }.
% 100.42/100.78 parent0[0]: (218403) {G23,W15,D5,L1,V2,M1} { composition( meet( one, X ),
% 100.42/100.78 Y ) ==> meet( composition( Y, top ), composition( meet( one, X ), Y ) )
% 100.42/100.78 }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (2927) {G26,W15,D5,L1,V2,M1} P(1957,2533) { meet( composition
% 100.42/100.78 ( Y, top ), composition( meet( one, X ), Y ) ) ==> composition( meet( one
% 100.42/100.78 , X ), Y ) }.
% 100.42/100.78 parent0: (218404) {G23,W15,D5,L1,V2,M1} { meet( composition( Y, top ),
% 100.42/100.78 composition( meet( one, X ), Y ) ) ==> composition( meet( one, X ), Y )
% 100.42/100.78 }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218406) {G22,W9,D5,L1,V1,M1} { zero ==> meet( complement( X ),
% 100.42/100.78 composition( X, converse( skol1 ) ) ) }.
% 100.42/100.78 parent0[0]: (2055) {G22,W9,D5,L1,V1,M1} P(1927,1036) { meet( complement( X
% 100.42/100.78 ), composition( X, converse( skol1 ) ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218407) {G17,W9,D5,L1,V1,M1} { zero ==> meet( X, composition(
% 100.42/100.78 complement( X ), converse( skol1 ) ) ) }.
% 100.42/100.78 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.42/100.78 complement( X ) ) ==> X }.
% 100.42/100.78 parent1[0; 3]: (218406) {G22,W9,D5,L1,V1,M1} { zero ==> meet( complement(
% 100.42/100.78 X ), composition( X, converse( skol1 ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := complement( X )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218408) {G17,W9,D5,L1,V1,M1} { meet( X, composition( complement(
% 100.42/100.78 X ), converse( skol1 ) ) ) ==> zero }.
% 100.42/100.78 parent0[0]: (218407) {G17,W9,D5,L1,V1,M1} { zero ==> meet( X, composition
% 100.42/100.78 ( complement( X ), converse( skol1 ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (3194) {G23,W9,D5,L1,V1,M1} P(460,2055) { meet( X, composition
% 100.42/100.78 ( complement( X ), converse( skol1 ) ) ) ==> zero }.
% 100.42/100.78 parent0: (218408) {G17,W9,D5,L1,V1,M1} { meet( X, composition( complement
% 100.42/100.78 ( X ), converse( skol1 ) ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218409) {G23,W9,D6,L1,V1,M1} { X ==> join( X, complement(
% 100.42/100.78 composition( top, complement( X ) ) ) ) }.
% 100.42/100.78 parent0[0]: (2334) {G23,W9,D6,L1,V1,M1} P(2320,994);d(460) { join( X,
% 100.42/100.78 complement( composition( top, complement( X ) ) ) ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218410) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join(
% 100.42/100.78 join( X, Y ), Z ) }.
% 100.42/100.78 parent0[0]: (26) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) =
% 100.42/100.78 join( join( Y, Z ), X ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218411) {G2,W15,D8,L1,V2,M1} { join( X, Y ) ==> join( join(
% 100.42/100.78 complement( composition( top, complement( join( X, Y ) ) ) ), X ), Y )
% 100.42/100.78 }.
% 100.42/100.78 parent0[0]: (218410) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join
% 100.42/100.78 ( join( X, Y ), Z ) }.
% 100.42/100.78 parent1[0; 4]: (218409) {G23,W9,D6,L1,V1,M1} { X ==> join( X, complement(
% 100.42/100.78 composition( top, complement( X ) ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := complement( composition( top, complement( join( X, Y ) ) ) )
% 100.42/100.78 Y := X
% 100.42/100.78 Z := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := join( X, Y )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218412) {G2,W15,D8,L1,V2,M1} { join( X, Y ) ==> join( join( Y,
% 100.42/100.78 complement( composition( top, complement( join( X, Y ) ) ) ) ), X ) }.
% 100.42/100.78 parent0[0]: (218410) {G1,W11,D4,L1,V3,M1} { join( join( Y, Z ), X ) = join
% 100.42/100.78 ( join( X, Y ), Z ) }.
% 100.42/100.78 parent1[0; 4]: (218411) {G2,W15,D8,L1,V2,M1} { join( X, Y ) ==> join( join
% 100.42/100.78 ( complement( composition( top, complement( join( X, Y ) ) ) ), X ), Y )
% 100.42/100.78 }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := complement( composition( top, complement( join( X, Y ) ) ) )
% 100.42/100.78 Z := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218415) {G2,W15,D8,L1,V2,M1} { join( join( Y, complement(
% 100.42/100.78 composition( top, complement( join( X, Y ) ) ) ) ), X ) ==> join( X, Y )
% 100.42/100.78 }.
% 100.42/100.78 parent0[0]: (218412) {G2,W15,D8,L1,V2,M1} { join( X, Y ) ==> join( join( Y
% 100.42/100.78 , complement( composition( top, complement( join( X, Y ) ) ) ) ), X ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (3378) {G24,W15,D8,L1,V2,M1} P(2334,26) { join( join( Y,
% 100.42/100.78 complement( composition( top, complement( join( X, Y ) ) ) ) ), X ) ==>
% 100.42/100.78 join( X, Y ) }.
% 100.42/100.78 parent0: (218415) {G2,W15,D8,L1,V2,M1} { join( join( Y, complement(
% 100.42/100.78 composition( top, complement( join( X, Y ) ) ) ) ), X ) ==> join( X, Y )
% 100.42/100.78 }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218417) {G28,W9,D6,L1,V1,M1} { X ==> meet( X, complement(
% 100.42/100.78 composition( skol1, complement( X ) ) ) ) }.
% 100.42/100.78 parent0[0]: (2031) {G28,W9,D6,L1,V1,M1} P(2027,1009);d(455) { meet( X,
% 100.42/100.78 complement( composition( skol1, complement( X ) ) ) ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218418) {G19,W15,D7,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X,
% 100.42/100.78 Y ), complement( composition( skol1, complement( meet( Y, X ) ) ) ) ) }.
% 100.42/100.78 parent0[0]: (1004) {G18,W9,D4,L1,V2,M1} P(473,0);d(473) { complement( meet
% 100.42/100.78 ( X, Y ) ) = complement( meet( Y, X ) ) }.
% 100.42/100.78 parent1[0; 11]: (218417) {G28,W9,D6,L1,V1,M1} { X ==> meet( X, complement
% 100.42/100.78 ( composition( skol1, complement( X ) ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := meet( X, Y )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218421) {G19,W15,D7,L1,V2,M1} { meet( meet( X, Y ), complement(
% 100.42/100.78 composition( skol1, complement( meet( Y, X ) ) ) ) ) ==> meet( X, Y ) }.
% 100.42/100.78 parent0[0]: (218418) {G19,W15,D7,L1,V2,M1} { meet( X, Y ) ==> meet( meet(
% 100.42/100.78 X, Y ), complement( composition( skol1, complement( meet( Y, X ) ) ) ) )
% 100.42/100.78 }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (3434) {G29,W15,D7,L1,V2,M1} P(1004,2031) { meet( meet( X, Y )
% 100.42/100.78 , complement( composition( skol1, complement( meet( Y, X ) ) ) ) ) ==>
% 100.42/100.78 meet( X, Y ) }.
% 100.42/100.78 parent0: (218421) {G19,W15,D7,L1,V2,M1} { meet( meet( X, Y ), complement(
% 100.42/100.78 composition( skol1, complement( meet( Y, X ) ) ) ) ) ==> meet( X, Y ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218425) {G19,W11,D7,L1,V0,M1} { complement( meet( skol1,
% 100.42/100.78 complement( composition( skol1, complement( one ) ) ) ) ) = complement(
% 100.42/100.78 skol1 ) }.
% 100.42/100.78 parent0[0]: (2552) {G28,W9,D6,L1,V0,M1} P(2543,1535);d(455) { meet(
% 100.42/100.78 complement( composition( skol1, complement( one ) ) ), skol1 ) ==> skol1
% 100.42/100.78 }.
% 100.42/100.78 parent1[0; 10]: (1004) {G18,W9,D4,L1,V2,M1} P(473,0);d(473) { complement(
% 100.42/100.78 meet( X, Y ) ) = complement( meet( Y, X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := skol1
% 100.42/100.78 Y := complement( composition( skol1, complement( one ) ) )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218426) {G19,W10,D5,L1,V0,M1} { join( complement( skol1 ),
% 100.42/100.78 composition( skol1, complement( one ) ) ) = complement( skol1 ) }.
% 100.42/100.78 parent0[0]: (995) {G18,W10,D5,L1,V2,M1} P(460,473) { complement( meet( Y,
% 100.42/100.78 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 100.42/100.78 parent1[0; 1]: (218425) {G19,W11,D7,L1,V0,M1} { complement( meet( skol1,
% 100.42/100.78 complement( composition( skol1, complement( one ) ) ) ) ) = complement(
% 100.42/100.78 skol1 ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := composition( skol1, complement( one ) )
% 100.42/100.78 Y := skol1
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (3504) {G29,W10,D5,L1,V0,M1} P(2552,1004);d(995) { join(
% 100.42/100.78 complement( skol1 ), composition( skol1, complement( one ) ) ) ==>
% 100.42/100.78 complement( skol1 ) }.
% 100.42/100.78 parent0: (218426) {G19,W10,D5,L1,V0,M1} { join( complement( skol1 ),
% 100.42/100.78 composition( skol1, complement( one ) ) ) = complement( skol1 ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218429) {G18,W10,D4,L1,V2,M1} { complement( join( X, Y ) ) ==>
% 100.42/100.78 meet( complement( X ), complement( Y ) ) }.
% 100.42/100.78 parent0[0]: (1795) {G18,W10,D4,L1,V2,M1} P(460,471) { meet( complement( Y )
% 100.42/100.78 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218433) {G18,W15,D6,L1,V3,M1} { complement( join( join( X,
% 100.42/100.78 complement( Y ) ), Z ) ) ==> meet( meet( complement( X ), Y ), complement
% 100.42/100.78 ( Z ) ) }.
% 100.42/100.78 parent0[0]: (471) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( X,
% 100.42/100.78 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 100.42/100.78 parent1[0; 9]: (218429) {G18,W10,D4,L1,V2,M1} { complement( join( X, Y ) )
% 100.42/100.78 ==> meet( complement( X ), complement( Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := join( X, complement( Y ) )
% 100.42/100.78 Y := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218435) {G19,W14,D5,L1,V3,M1} { meet( complement( join( X, Z ) )
% 100.42/100.78 , Y ) ==> meet( meet( complement( X ), Y ), complement( Z ) ) }.
% 100.42/100.78 parent0[0]: (1797) {G18,W14,D6,L1,V3,M1} P(27,471) { complement( join( join
% 100.42/100.78 ( X, complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z )
% 100.42/100.78 }.
% 100.42/100.78 parent1[0; 1]: (218433) {G18,W15,D6,L1,V3,M1} { complement( join( join( X
% 100.42/100.78 , complement( Y ) ), Z ) ) ==> meet( meet( complement( X ), Y ),
% 100.42/100.78 complement( Z ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Z
% 100.42/100.78 Z := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218436) {G19,W14,D5,L1,V3,M1} { meet( meet( complement( X ), Z )
% 100.42/100.78 , complement( Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 100.42/100.78 parent0[0]: (218435) {G19,W14,D5,L1,V3,M1} { meet( complement( join( X, Z
% 100.42/100.78 ) ), Y ) ==> meet( meet( complement( X ), Y ), complement( Z ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Z
% 100.42/100.78 Z := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (3570) {G19,W14,D5,L1,V3,M1} P(471,1795);d(1797) { meet( meet
% 100.42/100.78 ( complement( X ), Y ), complement( Z ) ) ==> meet( complement( join( X,
% 100.42/100.78 Z ) ), Y ) }.
% 100.42/100.78 parent0: (218436) {G19,W14,D5,L1,V3,M1} { meet( meet( complement( X ), Z )
% 100.42/100.78 , complement( Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Z
% 100.42/100.78 Z := Y
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218438) {G18,W10,D4,L1,V2,M1} { complement( join( X, Y ) ) ==>
% 100.42/100.78 meet( complement( X ), complement( Y ) ) }.
% 100.42/100.78 parent0[0]: (1795) {G18,W10,D4,L1,V2,M1} P(460,471) { meet( complement( Y )
% 100.42/100.78 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218441) {G19,W15,D6,L1,V3,M1} { complement( join( meet(
% 100.42/100.78 complement( X ), Y ), Z ) ) ==> meet( join( X, complement( Y ) ),
% 100.42/100.78 complement( Z ) ) }.
% 100.42/100.78 parent0[0]: (994) {G18,W10,D5,L1,V2,M1} P(460,473) { complement( meet(
% 100.42/100.78 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 100.42/100.78 parent1[0; 9]: (218438) {G18,W10,D4,L1,V2,M1} { complement( join( X, Y ) )
% 100.42/100.78 ==> meet( complement( X ), complement( Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := meet( complement( X ), Y )
% 100.42/100.78 Y := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218443) {G19,W15,D6,L1,V3,M1} { meet( join( X, complement( Y ) )
% 100.42/100.78 , complement( Z ) ) ==> complement( join( meet( complement( X ), Y ), Z )
% 100.42/100.78 ) }.
% 100.42/100.78 parent0[0]: (218441) {G19,W15,D6,L1,V3,M1} { complement( join( meet(
% 100.42/100.78 complement( X ), Y ), Z ) ) ==> meet( join( X, complement( Y ) ),
% 100.42/100.78 complement( Z ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (3573) {G19,W15,D6,L1,V3,M1} P(994,1795) { meet( join( X,
% 100.42/100.78 complement( Y ) ), complement( Z ) ) ==> complement( join( meet(
% 100.42/100.78 complement( X ), Y ), Z ) ) }.
% 100.42/100.78 parent0: (218443) {G19,W15,D6,L1,V3,M1} { meet( join( X, complement( Y ) )
% 100.42/100.78 , complement( Z ) ) ==> complement( join( meet( complement( X ), Y ), Z )
% 100.42/100.78 ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218446) {G19,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 100.42/100.78 complement( meet( Y, X ) ) ) }.
% 100.42/100.78 parent0[0]: (1209) {G19,W10,D5,L1,V2,M1} P(1004,12) { meet( meet( X, Y ),
% 100.42/100.78 complement( meet( Y, X ) ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218451) {G19,W13,D6,L1,V2,M1} { zero ==> meet( meet( complement
% 100.42/100.78 ( X ), complement( Y ) ), complement( complement( join( Y, X ) ) ) ) }.
% 100.42/100.78 parent0[0]: (1795) {G18,W10,D4,L1,V2,M1} P(460,471) { meet( complement( Y )
% 100.42/100.78 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 100.42/100.78 parent1[0; 9]: (218446) {G19,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y
% 100.42/100.78 ), complement( meet( Y, X ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := complement( X )
% 100.42/100.78 Y := complement( Y )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218455) {G19,W12,D6,L1,V2,M1} { zero ==> meet( complement( join
% 100.42/100.78 ( X, Y ) ), complement( complement( join( Y, X ) ) ) ) }.
% 100.42/100.78 parent0[0]: (1795) {G18,W10,D4,L1,V2,M1} P(460,471) { meet( complement( Y )
% 100.42/100.78 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 100.42/100.78 parent1[0; 3]: (218451) {G19,W13,D6,L1,V2,M1} { zero ==> meet( meet(
% 100.42/100.78 complement( X ), complement( Y ) ), complement( complement( join( Y, X )
% 100.42/100.78 ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218457) {G19,W11,D6,L1,V2,M1} { zero ==> complement( join( join
% 100.42/100.78 ( X, Y ), complement( join( Y, X ) ) ) ) }.
% 100.42/100.78 parent0[0]: (1795) {G18,W10,D4,L1,V2,M1} P(460,471) { meet( complement( Y )
% 100.42/100.78 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 100.42/100.78 parent1[0; 2]: (218455) {G19,W12,D6,L1,V2,M1} { zero ==> meet( complement
% 100.42/100.78 ( join( X, Y ) ), complement( complement( join( Y, X ) ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := complement( join( Y, X ) )
% 100.42/100.78 Y := join( X, Y )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218458) {G18,W10,D5,L1,V2,M1} { zero ==> meet( complement( join
% 100.42/100.78 ( X, Y ) ), join( Y, X ) ) }.
% 100.42/100.78 parent0[0]: (471) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( X,
% 100.42/100.78 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 100.42/100.78 parent1[0; 2]: (218457) {G19,W11,D6,L1,V2,M1} { zero ==> complement( join
% 100.42/100.78 ( join( X, Y ), complement( join( Y, X ) ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := join( X, Y )
% 100.42/100.78 Y := join( Y, X )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218459) {G18,W10,D5,L1,V2,M1} { meet( complement( join( X, Y ) )
% 100.42/100.78 , join( Y, X ) ) ==> zero }.
% 100.42/100.78 parent0[0]: (218458) {G18,W10,D5,L1,V2,M1} { zero ==> meet( complement(
% 100.42/100.78 join( X, Y ) ), join( Y, X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (3581) {G20,W10,D5,L1,V2,M1} P(1795,1209);d(1795);d(1795);d(
% 100.42/100.78 471) { meet( complement( join( X, Y ) ), join( Y, X ) ) ==> zero }.
% 100.42/100.78 parent0: (218459) {G18,W10,D5,L1,V2,M1} { meet( complement( join( X, Y ) )
% 100.42/100.78 , join( Y, X ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218460) {G18,W10,D4,L1,V2,M1} { complement( join( X, Y ) ) ==>
% 100.42/100.78 meet( complement( X ), complement( Y ) ) }.
% 100.42/100.78 parent0[0]: (1795) {G18,W10,D4,L1,V2,M1} P(460,471) { meet( complement( Y )
% 100.42/100.78 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218462) {G2,W10,D4,L1,V2,M1} { complement( join( X, Y ) ) ==>
% 100.42/100.78 meet( complement( Y ), complement( X ) ) }.
% 100.42/100.78 parent0[0]: (56) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 100.42/100.78 Y ) }.
% 100.42/100.78 parent1[0; 5]: (218460) {G18,W10,D4,L1,V2,M1} { complement( join( X, Y ) )
% 100.42/100.78 ==> meet( complement( X ), complement( Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := complement( Y )
% 100.42/100.78 Y := complement( X )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218464) {G3,W9,D4,L1,V2,M1} { complement( join( X, Y ) ) ==>
% 100.42/100.78 complement( join( Y, X ) ) }.
% 100.42/100.78 parent0[0]: (1795) {G18,W10,D4,L1,V2,M1} P(460,471) { meet( complement( Y )
% 100.42/100.78 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 100.42/100.78 parent1[0; 5]: (218462) {G2,W10,D4,L1,V2,M1} { complement( join( X, Y ) )
% 100.42/100.78 ==> meet( complement( Y ), complement( X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (3585) {G19,W9,D4,L1,V2,M1} P(1795,56);d(1795) { complement(
% 100.42/100.78 join( X, Y ) ) = complement( join( Y, X ) ) }.
% 100.42/100.78 parent0: (218464) {G3,W9,D4,L1,V2,M1} { complement( join( X, Y ) ) ==>
% 100.42/100.78 complement( join( Y, X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218469) {G12,W12,D6,L1,V3,M1} { complement( join( complement(
% 100.42/100.78 meet( X, Y ) ), join( Z, X ) ) ) = complement( top ) }.
% 100.42/100.78 parent0[0]: (529) {G11,W10,D5,L1,V3,M1} P(490,26);d(230) { join( join( Z, X
% 100.42/100.78 ), complement( meet( X, Y ) ) ) ==> top }.
% 100.42/100.78 parent1[0; 11]: (3585) {G19,W9,D4,L1,V2,M1} P(1795,56);d(1795) { complement
% 100.42/100.78 ( join( X, Y ) ) = complement( join( Y, X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := complement( meet( X, Y ) )
% 100.42/100.78 Y := join( Z, X )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218470) {G2,W11,D6,L1,V3,M1} { complement( join( complement(
% 100.42/100.78 meet( X, Y ) ), join( Z, X ) ) ) = zero }.
% 100.42/100.78 parent0[0]: (58) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 100.42/100.78 zero }.
% 100.42/100.78 parent1[0; 10]: (218469) {G12,W12,D6,L1,V3,M1} { complement( join(
% 100.42/100.78 complement( meet( X, Y ) ), join( Z, X ) ) ) = complement( top ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218471) {G3,W10,D5,L1,V3,M1} { meet( meet( X, Y ), complement(
% 100.42/100.78 join( Z, X ) ) ) = zero }.
% 100.42/100.78 parent0[0]: (472) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join(
% 100.42/100.78 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 100.42/100.78 parent1[0; 1]: (218470) {G2,W11,D6,L1,V3,M1} { complement( join(
% 100.42/100.78 complement( meet( X, Y ) ), join( Z, X ) ) ) = zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := join( Z, X )
% 100.42/100.78 Y := meet( X, Y )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (3637) {G20,W10,D5,L1,V3,M1} P(529,3585);d(58);d(472) { meet(
% 100.42/100.78 meet( Y, Z ), complement( join( X, Y ) ) ) ==> zero }.
% 100.42/100.78 parent0: (218471) {G3,W10,D5,L1,V3,M1} { meet( meet( X, Y ), complement(
% 100.42/100.78 join( Z, X ) ) ) = zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := Z
% 100.42/100.78 Z := X
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218474) {G20,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, Y ),
% 100.42/100.78 complement( join( Z, X ) ) ) }.
% 100.42/100.78 parent0[0]: (3637) {G20,W10,D5,L1,V3,M1} P(529,3585);d(58);d(472) { meet(
% 100.42/100.78 meet( Y, Z ), complement( join( X, Y ) ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Z
% 100.42/100.78 Y := X
% 100.42/100.78 Z := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218479) {G21,W10,D5,L1,V3,M1} { zero ==> meet( meet( meet( X, Y
% 100.42/100.78 ), Z ), complement( Y ) ) }.
% 100.42/100.78 parent0[0]: (1589) {G20,W10,D5,L1,V2,M1} P(1534,0) { join( meet( Y,
% 100.42/100.78 complement( X ) ), meet( X, Y ) ) ==> Y }.
% 100.42/100.78 parent1[0; 9]: (218474) {G20,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, Y
% 100.42/100.78 ), complement( join( Z, X ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := meet( X, Y )
% 100.42/100.78 Y := Z
% 100.42/100.78 Z := meet( Y, complement( X ) )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218480) {G21,W10,D5,L1,V3,M1} { meet( meet( meet( X, Y ), Z ),
% 100.42/100.78 complement( Y ) ) ==> zero }.
% 100.42/100.78 parent0[0]: (218479) {G21,W10,D5,L1,V3,M1} { zero ==> meet( meet( meet( X
% 100.42/100.78 , Y ), Z ), complement( Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (3707) {G21,W10,D5,L1,V3,M1} P(1589,3637) { meet( meet( meet(
% 100.42/100.78 Y, X ), Z ), complement( X ) ) ==> zero }.
% 100.42/100.78 parent0: (218480) {G21,W10,D5,L1,V3,M1} { meet( meet( meet( X, Y ), Z ),
% 100.42/100.78 complement( Y ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218482) {G19,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 100.42/100.78 complement( meet( Y, X ) ) ) }.
% 100.42/100.78 parent0[0]: (1209) {G19,W10,D5,L1,V2,M1} P(1004,12) { meet( meet( X, Y ),
% 100.42/100.78 complement( meet( Y, X ) ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218488) {G20,W13,D6,L1,V3,M1} { zero ==> meet( meet( complement
% 100.42/100.78 ( X ), meet( meet( Y, X ), Z ) ), complement( zero ) ) }.
% 100.42/100.78 parent0[0]: (3707) {G21,W10,D5,L1,V3,M1} P(1589,3637) { meet( meet( meet( Y
% 100.42/100.78 , X ), Z ), complement( X ) ) ==> zero }.
% 100.42/100.78 parent1[0; 12]: (218482) {G19,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y
% 100.42/100.78 ), complement( meet( Y, X ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := complement( X )
% 100.42/100.78 Y := meet( meet( Y, X ), Z )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218489) {G20,W12,D5,L1,V3,M1} { zero ==> meet( complement( join
% 100.42/100.78 ( X, zero ) ), meet( meet( Y, X ), Z ) ) }.
% 100.42/100.78 parent0[0]: (3570) {G19,W14,D5,L1,V3,M1} P(471,1795);d(1797) { meet( meet(
% 100.42/100.78 complement( X ), Y ), complement( Z ) ) ==> meet( complement( join( X, Z
% 100.42/100.78 ) ), Y ) }.
% 100.42/100.78 parent1[0; 2]: (218488) {G20,W13,D6,L1,V3,M1} { zero ==> meet( meet(
% 100.42/100.78 complement( X ), meet( meet( Y, X ), Z ) ), complement( zero ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := meet( meet( Y, X ), Z )
% 100.42/100.78 Z := zero
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218490) {G13,W10,D5,L1,V3,M1} { zero ==> meet( complement( X ),
% 100.42/100.78 meet( meet( Y, X ), Z ) ) }.
% 100.42/100.78 parent0[0]: (450) {G12,W5,D3,L1,V1,M1} P(418,158) { join( X, zero ) ==> X
% 100.42/100.78 }.
% 100.42/100.78 parent1[0; 4]: (218489) {G20,W12,D5,L1,V3,M1} { zero ==> meet( complement
% 100.42/100.78 ( join( X, zero ) ), meet( meet( Y, X ), Z ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218491) {G13,W10,D5,L1,V3,M1} { meet( complement( X ), meet( meet
% 100.42/100.78 ( Y, X ), Z ) ) ==> zero }.
% 100.42/100.78 parent0[0]: (218490) {G13,W10,D5,L1,V3,M1} { zero ==> meet( complement( X
% 100.42/100.78 ), meet( meet( Y, X ), Z ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (3760) {G22,W10,D5,L1,V3,M1} P(3707,1209);d(3570);d(450) {
% 100.42/100.78 meet( complement( Y ), meet( meet( X, Y ), Z ) ) ==> zero }.
% 100.42/100.78 parent0: (218491) {G13,W10,D5,L1,V3,M1} { meet( complement( X ), meet(
% 100.42/100.78 meet( Y, X ), Z ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218493) {G22,W10,D5,L1,V3,M1} { zero ==> meet( complement( X ),
% 100.42/100.78 meet( meet( Y, X ), Z ) ) }.
% 100.42/100.78 parent0[0]: (3760) {G22,W10,D5,L1,V3,M1} P(3707,1209);d(3570);d(450) { meet
% 100.42/100.78 ( complement( Y ), meet( meet( X, Y ), Z ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218503) {G23,W10,D5,L1,V3,M1} { zero ==> meet( complement( X ),
% 100.42/100.78 meet( Z, meet( Y, X ) ) ) }.
% 100.42/100.78 parent0[0]: (691) {G22,W9,D4,L1,V2,M1} P(56,689) { meet( X, meet( Y, X ) )
% 100.42/100.78 ==> meet( Y, X ) }.
% 100.42/100.78 parent1[0; 5]: (218493) {G22,W10,D5,L1,V3,M1} { zero ==> meet( complement
% 100.42/100.78 ( X ), meet( meet( Y, X ), Z ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := meet( Y, X )
% 100.42/100.78 Y := Z
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := meet( Z, meet( Y, X ) )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218506) {G23,W10,D5,L1,V3,M1} { meet( complement( X ), meet( Y,
% 100.42/100.78 meet( Z, X ) ) ) ==> zero }.
% 100.42/100.78 parent0[0]: (218503) {G23,W10,D5,L1,V3,M1} { zero ==> meet( complement( X
% 100.42/100.78 ), meet( Z, meet( Y, X ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Z
% 100.42/100.78 Z := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (3806) {G23,W10,D5,L1,V3,M1} P(691,3760) { meet( complement( Y
% 100.42/100.78 ), meet( Z, meet( X, Y ) ) ) ==> zero }.
% 100.42/100.78 parent0: (218506) {G23,W10,D5,L1,V3,M1} { meet( complement( X ), meet( Y,
% 100.42/100.78 meet( Z, X ) ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := Z
% 100.42/100.78 Z := X
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218509) {G23,W10,D5,L1,V3,M1} { zero ==> meet( complement( X ),
% 100.42/100.78 meet( Y, meet( Z, X ) ) ) }.
% 100.42/100.78 parent0[0]: (3806) {G23,W10,D5,L1,V3,M1} P(691,3760) { meet( complement( Y
% 100.42/100.78 ), meet( Z, meet( X, Y ) ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Z
% 100.42/100.78 Y := X
% 100.42/100.78 Z := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218517) {G21,W10,D5,L1,V3,M1} { zero ==> meet( complement( X ),
% 100.42/100.78 meet( Y, meet( X, Z ) ) ) }.
% 100.42/100.78 parent0[0]: (582) {G20,W9,D4,L1,V2,M1} P(580,43);d(455);d(3) { meet( meet(
% 100.42/100.78 X, Y ), X ) ==> meet( X, Y ) }.
% 100.42/100.78 parent1[0; 7]: (218509) {G23,W10,D5,L1,V3,M1} { zero ==> meet( complement
% 100.42/100.78 ( X ), meet( Y, meet( Z, X ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Z
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := meet( X, Z )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218519) {G21,W10,D5,L1,V3,M1} { meet( complement( X ), meet( Y,
% 100.42/100.78 meet( X, Z ) ) ) ==> zero }.
% 100.42/100.78 parent0[0]: (218517) {G21,W10,D5,L1,V3,M1} { zero ==> meet( complement( X
% 100.42/100.78 ), meet( Y, meet( X, Z ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (3853) {G24,W10,D5,L1,V3,M1} P(582,3806) { meet( complement( X
% 100.42/100.78 ), meet( Z, meet( X, Y ) ) ) ==> zero }.
% 100.42/100.78 parent0: (218519) {G21,W10,D5,L1,V3,M1} { meet( complement( X ), meet( Y,
% 100.42/100.78 meet( X, Z ) ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Z
% 100.42/100.78 Z := Y
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218521) {G19,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 100.42/100.78 complement( meet( Y, X ) ) ) }.
% 100.42/100.78 parent0[0]: (1209) {G19,W10,D5,L1,V2,M1} P(1004,12) { meet( meet( X, Y ),
% 100.42/100.78 complement( meet( Y, X ) ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218526) {G20,W13,D6,L1,V3,M1} { zero ==> meet( meet( meet( X,
% 100.42/100.78 meet( Y, Z ) ), complement( Y ) ), complement( zero ) ) }.
% 100.42/100.78 parent0[0]: (3853) {G24,W10,D5,L1,V3,M1} P(582,3806) { meet( complement( X
% 100.42/100.78 ), meet( Z, meet( X, Y ) ) ) ==> zero }.
% 100.42/100.78 parent1[0; 12]: (218521) {G19,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y
% 100.42/100.78 ), complement( meet( Y, X ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := Z
% 100.42/100.78 Z := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := meet( X, meet( Y, Z ) )
% 100.42/100.78 Y := complement( Y )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218527) {G14,W12,D6,L1,V3,M1} { zero ==> meet( meet( meet( X,
% 100.42/100.78 meet( Y, Z ) ), complement( Y ) ), top ) }.
% 100.42/100.78 parent0[0]: (451) {G13,W4,D3,L1,V0,M1} P(146,418);d(450);d(58) { complement
% 100.42/100.78 ( zero ) ==> top }.
% 100.42/100.78 parent1[0; 11]: (218526) {G20,W13,D6,L1,V3,M1} { zero ==> meet( meet( meet
% 100.42/100.78 ( X, meet( Y, Z ) ), complement( Y ) ), complement( zero ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218528) {G15,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, meet( Y
% 100.42/100.78 , Z ) ), complement( Y ) ) }.
% 100.42/100.78 parent0[0]: (458) {G15,W5,D3,L1,V1,M1} P(457,43);d(455);d(60) { meet( X,
% 100.42/100.78 top ) ==> X }.
% 100.42/100.78 parent1[0; 2]: (218527) {G14,W12,D6,L1,V3,M1} { zero ==> meet( meet( meet
% 100.42/100.78 ( X, meet( Y, Z ) ), complement( Y ) ), top ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := meet( meet( X, meet( Y, Z ) ), complement( Y ) )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218529) {G15,W10,D5,L1,V3,M1} { meet( meet( X, meet( Y, Z ) ),
% 100.42/100.78 complement( Y ) ) ==> zero }.
% 100.42/100.78 parent0[0]: (218528) {G15,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, meet
% 100.42/100.78 ( Y, Z ) ), complement( Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (3865) {G25,W10,D5,L1,V3,M1} P(3853,1209);d(451);d(458) { meet
% 100.42/100.78 ( meet( Y, meet( X, Z ) ), complement( X ) ) ==> zero }.
% 100.42/100.78 parent0: (218529) {G15,W10,D5,L1,V3,M1} { meet( meet( X, meet( Y, Z ) ),
% 100.42/100.78 complement( Y ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218531) {G25,W10,D5,L1,V3,M1} { zero ==> meet( meet( X, meet( Y,
% 100.42/100.78 Z ) ), complement( Y ) ) }.
% 100.42/100.78 parent0[0]: (3865) {G25,W10,D5,L1,V3,M1} P(3853,1209);d(451);d(458) { meet
% 100.42/100.78 ( meet( Y, meet( X, Z ) ), complement( X ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218534) {G19,W12,D7,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 100.42/100.78 complement( complement( composition( complement( Y ), skol1 ) ) ) ) }.
% 100.42/100.78 parent0[0]: (2098) {G18,W9,D6,L1,V1,M1} P(2094,471);d(460) { meet(
% 100.42/100.78 complement( composition( complement( X ), skol1 ) ), X ) ==> X }.
% 100.42/100.78 parent1[0; 5]: (218531) {G25,W10,D5,L1,V3,M1} { zero ==> meet( meet( X,
% 100.42/100.78 meet( Y, Z ) ), complement( Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := complement( composition( complement( Y ), skol1 ) )
% 100.42/100.78 Z := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218535) {G17,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 100.42/100.78 composition( complement( Y ), skol1 ) ) }.
% 100.42/100.78 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.42/100.78 complement( X ) ) ==> X }.
% 100.42/100.78 parent1[0; 6]: (218534) {G19,W12,D7,L1,V2,M1} { zero ==> meet( meet( X, Y
% 100.42/100.78 ), complement( complement( composition( complement( Y ), skol1 ) ) ) )
% 100.42/100.78 }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := composition( complement( Y ), skol1 )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218536) {G17,W10,D5,L1,V2,M1} { meet( meet( X, Y ), composition(
% 100.42/100.78 complement( Y ), skol1 ) ) ==> zero }.
% 100.42/100.78 parent0[0]: (218535) {G17,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 100.42/100.78 composition( complement( Y ), skol1 ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (3874) {G26,W10,D5,L1,V2,M1} P(2098,3865);d(460) { meet( meet
% 100.42/100.78 ( Y, X ), composition( complement( X ), skol1 ) ) ==> zero }.
% 100.42/100.78 parent0: (218536) {G17,W10,D5,L1,V2,M1} { meet( meet( X, Y ), composition
% 100.42/100.78 ( complement( Y ), skol1 ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218538) {G26,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y ),
% 100.42/100.78 composition( complement( Y ), skol1 ) ) }.
% 100.42/100.78 parent0[0]: (3874) {G26,W10,D5,L1,V2,M1} P(2098,3865);d(460) { meet( meet(
% 100.42/100.78 Y, X ), composition( complement( X ), skol1 ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218539) {G21,W10,D6,L1,V2,M1} { zero ==> meet( X, composition(
% 100.42/100.78 complement( join( X, Y ) ), skol1 ) ) }.
% 100.42/100.78 parent0[0]: (1028) {G20,W7,D4,L1,V2,M1} P(460,1005) { meet( Y, join( Y, X )
% 100.42/100.78 ) ==> Y }.
% 100.42/100.78 parent1[0; 3]: (218538) {G26,W10,D5,L1,V2,M1} { zero ==> meet( meet( X, Y
% 100.42/100.78 ), composition( complement( Y ), skol1 ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := join( X, Y )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218540) {G21,W10,D6,L1,V2,M1} { meet( X, composition( complement
% 100.42/100.78 ( join( X, Y ) ), skol1 ) ) ==> zero }.
% 100.42/100.78 parent0[0]: (218539) {G21,W10,D6,L1,V2,M1} { zero ==> meet( X, composition
% 100.42/100.78 ( complement( join( X, Y ) ), skol1 ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (4742) {G27,W10,D6,L1,V2,M1} P(1028,3874) { meet( X,
% 100.42/100.78 composition( complement( join( X, Y ) ), skol1 ) ) ==> zero }.
% 100.42/100.78 parent0: (218540) {G21,W10,D6,L1,V2,M1} { meet( X, composition( complement
% 100.42/100.78 ( join( X, Y ) ), skol1 ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218542) {G20,W10,D5,L1,V2,M1} { zero ==> meet( complement( join(
% 100.42/100.78 X, Y ) ), join( Y, X ) ) }.
% 100.42/100.78 parent0[0]: (3581) {G20,W10,D5,L1,V2,M1} P(1795,1209);d(1795);d(1795);d(471
% 100.42/100.78 ) { meet( complement( join( X, Y ) ), join( Y, X ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218548) {G18,W13,D6,L1,V2,M1} { zero ==> meet( complement( join
% 100.42/100.78 ( complement( X ), complement( Y ) ) ), complement( meet( Y, X ) ) ) }.
% 100.42/100.78 parent0[0]: (473) {G17,W10,D4,L1,V2,M1} P(3,460) { join( complement( X ),
% 100.42/100.78 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 100.42/100.78 parent1[0; 9]: (218542) {G20,W10,D5,L1,V2,M1} { zero ==> meet( complement
% 100.42/100.78 ( join( X, Y ) ), join( Y, X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := complement( X )
% 100.42/100.78 Y := complement( Y )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218550) {G19,W12,D6,L1,V2,M1} { zero ==> complement( join( join
% 100.42/100.78 ( complement( X ), complement( Y ) ), meet( Y, X ) ) ) }.
% 100.42/100.78 parent0[0]: (1795) {G18,W10,D4,L1,V2,M1} P(460,471) { meet( complement( Y )
% 100.42/100.78 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 100.42/100.78 parent1[0; 2]: (218548) {G18,W13,D6,L1,V2,M1} { zero ==> meet( complement
% 100.42/100.78 ( join( complement( X ), complement( Y ) ) ), complement( meet( Y, X ) )
% 100.42/100.78 ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := meet( Y, X )
% 100.42/100.78 Y := join( complement( X ), complement( Y ) )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218551) {G19,W11,D6,L1,V2,M1} { zero ==> meet( complement( join
% 100.42/100.78 ( complement( X ), meet( Y, X ) ) ), Y ) }.
% 100.42/100.78 parent0[0]: (1797) {G18,W14,D6,L1,V3,M1} P(27,471) { complement( join( join
% 100.42/100.78 ( X, complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z )
% 100.42/100.78 }.
% 100.42/100.78 parent1[0; 2]: (218550) {G19,W12,D6,L1,V2,M1} { zero ==> complement( join
% 100.42/100.78 ( join( complement( X ), complement( Y ) ), meet( Y, X ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := complement( X )
% 100.42/100.78 Y := meet( Y, X )
% 100.42/100.78 Z := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218552) {G18,W10,D6,L1,V2,M1} { zero ==> meet( meet( X,
% 100.42/100.78 complement( meet( Y, X ) ) ), Y ) }.
% 100.42/100.78 parent0[0]: (472) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join(
% 100.42/100.78 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 100.42/100.78 parent1[0; 3]: (218551) {G19,W11,D6,L1,V2,M1} { zero ==> meet( complement
% 100.42/100.78 ( join( complement( X ), meet( Y, X ) ) ), Y ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := meet( Y, X )
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218553) {G18,W10,D6,L1,V2,M1} { meet( meet( X, complement( meet(
% 100.42/100.78 Y, X ) ) ), Y ) ==> zero }.
% 100.42/100.78 parent0[0]: (218552) {G18,W10,D6,L1,V2,M1} { zero ==> meet( meet( X,
% 100.42/100.78 complement( meet( Y, X ) ) ), Y ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (5214) {G21,W10,D6,L1,V2,M1} P(473,3581);d(1795);d(1797);d(472
% 100.42/100.78 ) { meet( meet( Y, complement( meet( X, Y ) ) ), X ) ==> zero }.
% 100.42/100.78 parent0: (218553) {G18,W10,D6,L1,V2,M1} { meet( meet( X, complement( meet
% 100.42/100.78 ( Y, X ) ) ), Y ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218555) {G2,W15,D5,L1,V4,M1} { join( join( join( Y, T ), Z ), X )
% 100.42/100.78 = join( join( join( X, Y ), Z ), T ) }.
% 100.42/100.78 parent0[0]: (236) {G2,W15,D5,L1,V4,M1} P(26,26);d(1) { join( join( join( Y
% 100.42/100.78 , Z ), X ), T ) = join( join( join( Z, T ), X ), Y ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Z
% 100.42/100.78 Y := X
% 100.42/100.78 Z := Y
% 100.42/100.78 T := T
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218573) {G3,W15,D6,L1,V4,M1} { join( join( join( meet( X, Y ), Z
% 100.42/100.78 ), T ), Y ) = join( join( Y, T ), Z ) }.
% 100.42/100.78 parent0[0]: (716) {G23,W7,D4,L1,V2,M1} P(691,699) { join( X, meet( Y, X ) )
% 100.42/100.78 ==> X }.
% 100.42/100.78 parent1[0; 12]: (218555) {G2,W15,D5,L1,V4,M1} { join( join( join( Y, T ),
% 100.42/100.78 Z ), X ) = join( join( join( X, Y ), Z ), T ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := meet( X, Y )
% 100.42/100.78 Z := T
% 100.42/100.78 T := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (5728) {G24,W15,D6,L1,V4,M1} P(716,236) { join( join( join(
% 100.42/100.78 meet( Y, X ), T ), Z ), X ) ==> join( join( X, Z ), T ) }.
% 100.42/100.78 parent0: (218573) {G3,W15,D6,L1,V4,M1} { join( join( join( meet( X, Y ), Z
% 100.42/100.78 ), T ), Y ) = join( join( Y, T ), Z ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 Z := T
% 100.42/100.78 T := Z
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218581) {G27,W10,D5,L1,V2,M1} { top ==> join( complement( X ),
% 100.42/100.78 composition( top, join( Y, X ) ) ) }.
% 100.42/100.78 parent0[0]: (2625) {G27,W10,D5,L1,V2,M1} P(2562,535) { join( complement( Y
% 100.42/100.78 ), composition( top, join( X, Y ) ) ) ==> top }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218584) {G6,W14,D6,L1,V2,M1} { top ==> join( complement(
% 100.42/100.78 composition( X, Y ) ), composition( top, composition( join( one, X ), Y )
% 100.42/100.78 ) ) }.
% 100.42/100.78 parent0[0]: (141) {G5,W11,D4,L1,V2,M1} P(137,6) { join( X, composition( Y,
% 100.42/100.78 X ) ) = composition( join( one, Y ), X ) }.
% 100.42/100.78 parent1[0; 9]: (218581) {G27,W10,D5,L1,V2,M1} { top ==> join( complement(
% 100.42/100.78 X ), composition( top, join( Y, X ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := composition( X, Y )
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218585) {G1,W14,D6,L1,V2,M1} { top ==> join( complement(
% 100.42/100.78 composition( X, Y ) ), composition( composition( top, join( one, X ) ), Y
% 100.42/100.78 ) ) }.
% 100.42/100.78 parent0[0]: (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z
% 100.42/100.78 ) ) ==> composition( composition( X, Y ), Z ) }.
% 100.42/100.78 parent1[0; 7]: (218584) {G6,W14,D6,L1,V2,M1} { top ==> join( complement(
% 100.42/100.78 composition( X, Y ) ), composition( top, composition( join( one, X ), Y )
% 100.42/100.78 ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := top
% 100.42/100.78 Y := join( one, X )
% 100.42/100.78 Z := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218586) {G2,W10,D5,L1,V2,M1} { top ==> join( complement(
% 100.42/100.78 composition( X, Y ) ), composition( top, Y ) ) }.
% 100.42/100.78 parent0[0]: (2217) {G25,W7,D4,L1,V1,M1} P(479,2211) { composition( top,
% 100.42/100.78 join( one, X ) ) ==> top }.
% 100.42/100.78 parent1[0; 8]: (218585) {G1,W14,D6,L1,V2,M1} { top ==> join( complement(
% 100.42/100.78 composition( X, Y ) ), composition( composition( top, join( one, X ) ), Y
% 100.42/100.78 ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218587) {G2,W10,D5,L1,V2,M1} { join( complement( composition( X,
% 100.42/100.78 Y ) ), composition( top, Y ) ) ==> top }.
% 100.42/100.78 parent0[0]: (218586) {G2,W10,D5,L1,V2,M1} { top ==> join( complement(
% 100.42/100.78 composition( X, Y ) ), composition( top, Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (5969) {G28,W10,D5,L1,V2,M1} P(141,2625);d(4);d(2217) { join(
% 100.42/100.78 complement( composition( Y, X ) ), composition( top, X ) ) ==> top }.
% 100.42/100.78 parent0: (218587) {G2,W10,D5,L1,V2,M1} { join( complement( composition( X
% 100.42/100.78 , Y ) ), composition( top, Y ) ) ==> top }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218589) {G20,W10,D5,L1,V2,M1} { zero ==> meet( complement( join(
% 100.42/100.78 X, Y ) ), join( Y, X ) ) }.
% 100.42/100.78 parent0[0]: (3581) {G20,W10,D5,L1,V2,M1} P(1795,1209);d(1795);d(1795);d(471
% 100.42/100.78 ) { meet( complement( join( X, Y ) ), join( Y, X ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218593) {G21,W13,D7,L1,V2,M1} { zero ==> meet( complement( join
% 100.42/100.78 ( composition( top, X ), complement( composition( Y, X ) ) ) ), top ) }.
% 100.42/100.78 parent0[0]: (5969) {G28,W10,D5,L1,V2,M1} P(141,2625);d(4);d(2217) { join(
% 100.42/100.78 complement( composition( Y, X ) ), composition( top, X ) ) ==> top }.
% 100.42/100.78 parent1[0; 12]: (218589) {G20,W10,D5,L1,V2,M1} { zero ==> meet( complement
% 100.42/100.78 ( join( X, Y ) ), join( Y, X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := composition( top, X )
% 100.42/100.78 Y := complement( composition( Y, X ) )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218594) {G16,W11,D6,L1,V2,M1} { zero ==> complement( join(
% 100.42/100.78 composition( top, X ), complement( composition( Y, X ) ) ) ) }.
% 100.42/100.78 parent0[0]: (458) {G15,W5,D3,L1,V1,M1} P(457,43);d(455);d(60) { meet( X,
% 100.42/100.78 top ) ==> X }.
% 100.42/100.78 parent1[0; 2]: (218593) {G21,W13,D7,L1,V2,M1} { zero ==> meet( complement
% 100.42/100.78 ( join( composition( top, X ), complement( composition( Y, X ) ) ) ), top
% 100.42/100.78 ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := complement( join( composition( top, X ), complement( composition( Y
% 100.42/100.78 , X ) ) ) )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218595) {G17,W10,D5,L1,V2,M1} { zero ==> meet( complement(
% 100.42/100.78 composition( top, X ) ), composition( Y, X ) ) }.
% 100.42/100.78 parent0[0]: (471) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( X,
% 100.42/100.78 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 100.42/100.78 parent1[0; 2]: (218594) {G16,W11,D6,L1,V2,M1} { zero ==> complement( join
% 100.42/100.78 ( composition( top, X ), complement( composition( Y, X ) ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := composition( top, X )
% 100.42/100.78 Y := composition( Y, X )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218596) {G17,W10,D5,L1,V2,M1} { meet( complement( composition(
% 100.42/100.78 top, X ) ), composition( Y, X ) ) ==> zero }.
% 100.42/100.78 parent0[0]: (218595) {G17,W10,D5,L1,V2,M1} { zero ==> meet( complement(
% 100.42/100.78 composition( top, X ) ), composition( Y, X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (5993) {G29,W10,D5,L1,V2,M1} P(5969,3581);d(458);d(471) { meet
% 100.42/100.78 ( complement( composition( top, Y ) ), composition( X, Y ) ) ==> zero }.
% 100.42/100.78 parent0: (218596) {G17,W10,D5,L1,V2,M1} { meet( complement( composition(
% 100.42/100.78 top, X ) ), composition( Y, X ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218597) {G29,W10,D5,L1,V2,M1} { zero ==> meet( complement(
% 100.42/100.78 composition( top, X ) ), composition( Y, X ) ) }.
% 100.42/100.78 parent0[0]: (5993) {G29,W10,D5,L1,V2,M1} P(5969,3581);d(458);d(471) { meet
% 100.42/100.78 ( complement( composition( top, Y ) ), composition( X, Y ) ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218599) {G25,W8,D5,L1,V0,M1} { zero ==> composition( complement
% 100.42/100.78 ( composition( top, skol1 ) ), skol1 ) }.
% 100.42/100.78 parent0[0]: (2108) {G24,W9,D4,L1,V1,M1} P(2094,1034) { meet( X, composition
% 100.42/100.78 ( X, skol1 ) ) ==> composition( X, skol1 ) }.
% 100.42/100.78 parent1[0; 2]: (218597) {G29,W10,D5,L1,V2,M1} { zero ==> meet( complement
% 100.42/100.78 ( composition( top, X ) ), composition( Y, X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := complement( composition( top, skol1 ) )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := skol1
% 100.42/100.78 Y := complement( composition( top, skol1 ) )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218600) {G25,W8,D5,L1,V0,M1} { composition( complement(
% 100.42/100.78 composition( top, skol1 ) ), skol1 ) ==> zero }.
% 100.42/100.78 parent0[0]: (218599) {G25,W8,D5,L1,V0,M1} { zero ==> composition(
% 100.42/100.78 complement( composition( top, skol1 ) ), skol1 ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (6015) {G30,W8,D5,L1,V0,M1} P(5993,2108) { composition(
% 100.42/100.78 complement( composition( top, skol1 ) ), skol1 ) ==> zero }.
% 100.42/100.78 parent0: (218600) {G25,W8,D5,L1,V0,M1} { composition( complement(
% 100.42/100.78 composition( top, skol1 ) ), skol1 ) ==> zero }.
% 100.42/100.78 substitution0:
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218602) {G18,W10,D4,L1,V2,M1} { complement( join( X, Y ) ) ==>
% 100.42/100.78 meet( complement( X ), complement( Y ) ) }.
% 100.42/100.78 parent0[0]: (1795) {G18,W10,D4,L1,V2,M1} P(460,471) { meet( complement( Y )
% 100.42/100.78 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218606) {G18,W15,D6,L1,V3,M1} { complement( join( join(
% 100.42/100.78 complement( X ), Y ), Z ) ) ==> meet( meet( X, complement( Y ) ),
% 100.42/100.78 complement( Z ) ) }.
% 100.42/100.78 parent0[0]: (472) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join(
% 100.42/100.78 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 100.42/100.78 parent1[0; 9]: (218602) {G18,W10,D4,L1,V2,M1} { complement( join( X, Y ) )
% 100.42/100.78 ==> meet( complement( X ), complement( Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := join( complement( X ), Y )
% 100.42/100.78 Y := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218608) {G19,W14,D5,L1,V3,M1} { meet( complement( join( Y, Z ) )
% 100.42/100.78 , X ) ==> meet( meet( X, complement( Y ) ), complement( Z ) ) }.
% 100.42/100.78 parent0[0]: (1799) {G18,W14,D6,L1,V3,M1} P(26,471) { complement( join( join
% 100.42/100.78 ( complement( Z ), X ), Y ) ) ==> meet( complement( join( X, Y ) ), Z )
% 100.42/100.78 }.
% 100.42/100.78 parent1[0; 1]: (218606) {G18,W15,D6,L1,V3,M1} { complement( join( join(
% 100.42/100.78 complement( X ), Y ), Z ) ) ==> meet( meet( X, complement( Y ) ),
% 100.42/100.78 complement( Z ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := Z
% 100.42/100.78 Z := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218609) {G19,W14,D5,L1,V3,M1} { meet( meet( Z, complement( X ) )
% 100.42/100.78 , complement( Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 100.42/100.78 parent0[0]: (218608) {G19,W14,D5,L1,V3,M1} { meet( complement( join( Y, Z
% 100.42/100.78 ) ), X ) ==> meet( meet( X, complement( Y ) ), complement( Z ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Z
% 100.42/100.78 Y := X
% 100.42/100.78 Z := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (7023) {G19,W14,D5,L1,V3,M1} P(472,1795);d(1799) { meet( meet
% 100.42/100.78 ( X, complement( Y ) ), complement( Z ) ) ==> meet( complement( join( Y,
% 100.42/100.78 Z ) ), X ) }.
% 100.42/100.78 parent0: (218609) {G19,W14,D5,L1,V3,M1} { meet( meet( Z, complement( X ) )
% 100.42/100.78 , complement( Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := Z
% 100.42/100.78 Z := X
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218611) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y ) ==>
% 100.42/100.78 converse( join( X, converse( Y ) ) ) }.
% 100.42/100.78 parent0[0]: (21) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 100.42/100.78 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218616) {G2,W14,D6,L1,V1,M1} { join( converse( composition(
% 100.42/100.78 complement( one ), converse( X ) ) ), X ) ==> converse( composition( top
% 100.42/100.78 , converse( X ) ) ) }.
% 100.42/100.78 parent0[0]: (1970) {G30,W10,D5,L1,V1,M1} P(355,142);d(136);d(1551) { join(
% 100.42/100.78 composition( complement( one ), X ), X ) ==> composition( top, X ) }.
% 100.42/100.78 parent1[0; 10]: (218611) {G1,W10,D5,L1,V2,M1} { join( converse( X ), Y )
% 100.42/100.78 ==> converse( join( X, converse( Y ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := converse( X )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := composition( complement( one ), converse( X ) )
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218618) {G2,W13,D6,L1,V1,M1} { join( converse( composition(
% 100.42/100.78 complement( one ), converse( X ) ) ), X ) ==> composition( X, converse(
% 100.42/100.78 top ) ) }.
% 100.42/100.78 parent0[0]: (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 100.42/100.78 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 100.42/100.78 parent1[0; 9]: (218616) {G2,W14,D6,L1,V1,M1} { join( converse( composition
% 100.42/100.78 ( complement( one ), converse( X ) ) ), X ) ==> converse( composition(
% 100.42/100.78 top, converse( X ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := top
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218620) {G3,W12,D6,L1,V1,M1} { join( converse( composition(
% 100.42/100.78 complement( one ), converse( X ) ) ), X ) ==> composition( X, top ) }.
% 100.42/100.78 parent0[0]: (260) {G10,W4,D3,L1,V0,M1} P(235,230) { converse( top ) ==> top
% 100.42/100.78 }.
% 100.42/100.78 parent1[0; 11]: (218618) {G2,W13,D6,L1,V1,M1} { join( converse(
% 100.42/100.78 composition( complement( one ), converse( X ) ) ), X ) ==> composition( X
% 100.42/100.78 , converse( top ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218621) {G2,W11,D6,L1,V1,M1} { join( composition( X, converse(
% 100.42/100.78 complement( one ) ) ), X ) ==> composition( X, top ) }.
% 100.42/100.78 parent0[0]: (17) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y,
% 100.42/100.78 converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 100.42/100.78 parent1[0; 2]: (218620) {G3,W12,D6,L1,V1,M1} { join( converse( composition
% 100.42/100.78 ( complement( one ), converse( X ) ) ), X ) ==> composition( X, top ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := complement( one )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218622) {G3,W10,D5,L1,V1,M1} { join( composition( X, complement
% 100.42/100.78 ( one ) ), X ) ==> composition( X, top ) }.
% 100.42/100.78 parent0[0]: (1551) {G29,W6,D4,L1,V0,M1} P(1550,1083);d(7);d(1507) {
% 100.42/100.78 converse( complement( one ) ) ==> complement( one ) }.
% 100.42/100.78 parent1[0; 4]: (218621) {G2,W11,D6,L1,V1,M1} { join( composition( X,
% 100.42/100.78 converse( complement( one ) ) ), X ) ==> composition( X, top ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (7978) {G31,W10,D5,L1,V1,M1} P(1970,21);d(17);d(260);d(17);d(
% 100.42/100.78 1551) { join( composition( X, complement( one ) ), X ) ==> composition( X
% 100.42/100.78 , top ) }.
% 100.42/100.78 parent0: (218622) {G3,W10,D5,L1,V1,M1} { join( composition( X, complement
% 100.42/100.78 ( one ) ), X ) ==> composition( X, top ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218624) {G31,W10,D5,L1,V1,M1} { composition( X, top ) ==> join(
% 100.42/100.78 composition( X, complement( one ) ), X ) }.
% 100.42/100.78 parent0[0]: (7978) {G31,W10,D5,L1,V1,M1} P(1970,21);d(17);d(260);d(17);d(
% 100.42/100.78 1551) { join( composition( X, complement( one ) ), X ) ==> composition( X
% 100.42/100.78 , top ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218625) {G1,W10,D5,L1,V1,M1} { composition( X, top ) ==> join( X
% 100.42/100.78 , composition( X, complement( one ) ) ) }.
% 100.42/100.78 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.42/100.78 parent1[0; 4]: (218624) {G31,W10,D5,L1,V1,M1} { composition( X, top ) ==>
% 100.42/100.78 join( composition( X, complement( one ) ), X ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := composition( X, complement( one ) )
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218628) {G1,W10,D5,L1,V1,M1} { join( X, composition( X,
% 100.42/100.78 complement( one ) ) ) ==> composition( X, top ) }.
% 100.42/100.78 parent0[0]: (218625) {G1,W10,D5,L1,V1,M1} { composition( X, top ) ==> join
% 100.42/100.78 ( X, composition( X, complement( one ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (8031) {G32,W10,D5,L1,V1,M1} P(7978,0) { join( X, composition
% 100.42/100.78 ( X, complement( one ) ) ) ==> composition( X, top ) }.
% 100.42/100.78 parent0: (218628) {G1,W10,D5,L1,V1,M1} { join( X, composition( X,
% 100.42/100.78 complement( one ) ) ) ==> composition( X, top ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218630) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement( Y
% 100.42/100.78 ) ), meet( X, Y ) ) }.
% 100.42/100.78 parent0[0]: (432) {G2,W10,D5,L1,V2,M1} P(3,43) { join( meet( X, complement
% 100.42/100.78 ( Y ) ), meet( X, Y ) ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218635) {G3,W18,D7,L1,V2,M1} { meet( X, complement( meet( Y, X )
% 100.42/100.78 ) ) ==> join( meet( meet( X, complement( meet( Y, X ) ) ), complement( Y
% 100.42/100.78 ) ), zero ) }.
% 100.42/100.78 parent0[0]: (5214) {G21,W10,D6,L1,V2,M1} P(473,3581);d(1795);d(1797);d(472)
% 100.42/100.78 { meet( meet( Y, complement( meet( X, Y ) ) ), X ) ==> zero }.
% 100.42/100.78 parent1[0; 17]: (218630) {G2,W10,D5,L1,V2,M1} { X ==> join( meet( X,
% 100.42/100.78 complement( Y ) ), meet( X, Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := meet( X, complement( meet( Y, X ) ) )
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218636) {G4,W16,D6,L1,V2,M1} { meet( X, complement( meet( Y, X )
% 100.42/100.78 ) ) ==> meet( meet( X, complement( meet( Y, X ) ) ), complement( Y ) )
% 100.42/100.78 }.
% 100.42/100.78 parent0[0]: (450) {G12,W5,D3,L1,V1,M1} P(418,158) { join( X, zero ) ==> X
% 100.42/100.78 }.
% 100.42/100.78 parent1[0; 7]: (218635) {G3,W18,D7,L1,V2,M1} { meet( X, complement( meet(
% 100.42/100.78 Y, X ) ) ) ==> join( meet( meet( X, complement( meet( Y, X ) ) ),
% 100.42/100.78 complement( Y ) ), zero ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := meet( meet( X, complement( meet( Y, X ) ) ), complement( Y ) )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218637) {G5,W15,D6,L1,V2,M1} { meet( X, complement( meet( Y, X )
% 100.42/100.78 ) ) ==> meet( complement( join( meet( Y, X ), Y ) ), X ) }.
% 100.42/100.78 parent0[0]: (7023) {G19,W14,D5,L1,V3,M1} P(472,1795);d(1799) { meet( meet(
% 100.42/100.78 X, complement( Y ) ), complement( Z ) ) ==> meet( complement( join( Y, Z
% 100.42/100.78 ) ), X ) }.
% 100.42/100.78 parent1[0; 7]: (218636) {G4,W16,D6,L1,V2,M1} { meet( X, complement( meet(
% 100.42/100.78 Y, X ) ) ) ==> meet( meet( X, complement( meet( Y, X ) ) ), complement( Y
% 100.42/100.78 ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := meet( Y, X )
% 100.42/100.78 Z := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218638) {G6,W11,D5,L1,V2,M1} { meet( X, complement( meet( Y, X )
% 100.42/100.78 ) ) ==> meet( complement( Y ), X ) }.
% 100.42/100.78 parent0[0]: (736) {G21,W7,D4,L1,V2,M1} P(699,0) { join( meet( X, Y ), X )
% 100.42/100.78 ==> X }.
% 100.42/100.78 parent1[0; 9]: (218637) {G5,W15,D6,L1,V2,M1} { meet( X, complement( meet(
% 100.42/100.78 Y, X ) ) ) ==> meet( complement( join( meet( Y, X ), Y ) ), X ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (10310) {G22,W11,D5,L1,V2,M1} P(5214,432);d(450);d(7023);d(736
% 100.42/100.78 ) { meet( X, complement( meet( Y, X ) ) ) ==> meet( complement( Y ), X )
% 100.42/100.78 }.
% 100.42/100.78 parent0: (218638) {G6,W11,D5,L1,V2,M1} { meet( X, complement( meet( Y, X )
% 100.42/100.78 ) ) ==> meet( complement( Y ), X ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218641) {G20,W10,D5,L1,V2,M1} { X ==> join( meet( X, complement(
% 100.42/100.78 Y ) ), meet( Y, X ) ) }.
% 100.42/100.78 parent0[0]: (1589) {G20,W10,D5,L1,V2,M1} P(1534,0) { join( meet( Y,
% 100.42/100.78 complement( X ) ), meet( X, Y ) ) ==> Y }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218645) {G21,W13,D8,L1,V2,M1} { X ==> join( meet( X, complement
% 100.42/100.78 ( meet( Y, complement( meet( X, Y ) ) ) ) ), zero ) }.
% 100.42/100.78 parent0[0]: (5214) {G21,W10,D6,L1,V2,M1} P(473,3581);d(1795);d(1797);d(472)
% 100.42/100.78 { meet( meet( Y, complement( meet( X, Y ) ) ), X ) ==> zero }.
% 100.42/100.78 parent1[0; 12]: (218641) {G20,W10,D5,L1,V2,M1} { X ==> join( meet( X,
% 100.42/100.78 complement( Y ) ), meet( Y, X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := meet( Y, complement( meet( X, Y ) ) )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218646) {G13,W11,D7,L1,V2,M1} { X ==> meet( X, complement( meet
% 100.42/100.78 ( Y, complement( meet( X, Y ) ) ) ) ) }.
% 100.42/100.78 parent0[0]: (450) {G12,W5,D3,L1,V1,M1} P(418,158) { join( X, zero ) ==> X
% 100.42/100.78 }.
% 100.42/100.78 parent1[0; 2]: (218645) {G21,W13,D8,L1,V2,M1} { X ==> join( meet( X,
% 100.42/100.78 complement( meet( Y, complement( meet( X, Y ) ) ) ) ), zero ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := meet( X, complement( meet( Y, complement( meet( X, Y ) ) ) ) )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218647) {G14,W10,D5,L1,V2,M1} { X ==> meet( X, join( complement
% 100.42/100.78 ( Y ), meet( X, Y ) ) ) }.
% 100.42/100.78 parent0[0]: (995) {G18,W10,D5,L1,V2,M1} P(460,473) { complement( meet( Y,
% 100.42/100.78 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 100.42/100.78 parent1[0; 4]: (218646) {G13,W11,D7,L1,V2,M1} { X ==> meet( X, complement
% 100.42/100.78 ( meet( Y, complement( meet( X, Y ) ) ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := meet( X, Y )
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218648) {G14,W10,D5,L1,V2,M1} { meet( X, join( complement( Y ),
% 100.42/100.78 meet( X, Y ) ) ) ==> X }.
% 100.42/100.78 parent0[0]: (218647) {G14,W10,D5,L1,V2,M1} { X ==> meet( X, join(
% 100.42/100.78 complement( Y ), meet( X, Y ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (10312) {G22,W10,D5,L1,V2,M1} P(5214,1589);d(450);d(995) {
% 100.42/100.78 meet( Y, join( complement( X ), meet( Y, X ) ) ) ==> Y }.
% 100.42/100.78 parent0: (218648) {G14,W10,D5,L1,V2,M1} { meet( X, join( complement( Y ),
% 100.42/100.78 meet( X, Y ) ) ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218650) {G24,W7,D4,L1,V2,M1} { Y ==> join( meet( X, Y ), Y ) }.
% 100.42/100.78 parent0[0]: (756) {G24,W7,D4,L1,V2,M1} P(716,0) { join( meet( Y, X ), X )
% 100.42/100.78 ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218653) {G23,W15,D5,L1,V2,M1} { join( complement( X ), meet( Y,
% 100.42/100.78 X ) ) ==> join( Y, join( complement( X ), meet( Y, X ) ) ) }.
% 100.42/100.78 parent0[0]: (10312) {G22,W10,D5,L1,V2,M1} P(5214,1589);d(450);d(995) { meet
% 100.42/100.78 ( Y, join( complement( X ), meet( Y, X ) ) ) ==> Y }.
% 100.42/100.78 parent1[0; 8]: (218650) {G24,W7,D4,L1,V2,M1} { Y ==> join( meet( X, Y ), Y
% 100.42/100.78 ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := join( complement( X ), meet( Y, X ) )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218654) {G1,W15,D5,L1,V2,M1} { join( complement( X ), meet( Y, X
% 100.42/100.78 ) ) ==> join( join( Y, complement( X ) ), meet( Y, X ) ) }.
% 100.42/100.78 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.42/100.78 join( X, Y ), Z ) }.
% 100.42/100.78 parent1[0; 7]: (218653) {G23,W15,D5,L1,V2,M1} { join( complement( X ),
% 100.42/100.78 meet( Y, X ) ) ==> join( Y, join( complement( X ), meet( Y, X ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := complement( X )
% 100.42/100.78 Z := meet( Y, X )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218655) {G2,W11,D4,L1,V2,M1} { join( complement( X ), meet( Y, X
% 100.42/100.78 ) ) ==> join( Y, complement( X ) ) }.
% 100.42/100.78 parent0[0]: (728) {G21,W11,D4,L1,V3,M1} P(699,27) { join( join( X, Z ),
% 100.42/100.78 meet( X, Y ) ) ==> join( X, Z ) }.
% 100.42/100.78 parent1[0; 7]: (218654) {G1,W15,D5,L1,V2,M1} { join( complement( X ), meet
% 100.42/100.78 ( Y, X ) ) ==> join( join( Y, complement( X ) ), meet( Y, X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 Z := complement( X )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (10348) {G25,W11,D4,L1,V2,M1} P(10312,756);d(1);d(728) { join
% 100.42/100.78 ( complement( Y ), meet( X, Y ) ) ==> join( X, complement( Y ) ) }.
% 100.42/100.78 parent0: (218655) {G2,W11,D4,L1,V2,M1} { join( complement( X ), meet( Y, X
% 100.42/100.78 ) ) ==> join( Y, complement( X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218657) {G22,W10,D5,L1,V2,M1} { X ==> meet( X, join( complement(
% 100.42/100.78 Y ), meet( X, Y ) ) ) }.
% 100.42/100.78 parent0[0]: (10312) {G22,W10,D5,L1,V2,M1} P(5214,1589);d(450);d(995) { meet
% 100.42/100.78 ( Y, join( complement( X ), meet( Y, X ) ) ) ==> Y }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218659) {G2,W10,D5,L1,V2,M1} { X ==> meet( X, join( complement(
% 100.42/100.78 Y ), meet( Y, X ) ) ) }.
% 100.42/100.78 parent0[0]: (56) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 100.42/100.78 Y ) }.
% 100.42/100.78 parent1[0; 7]: (218657) {G22,W10,D5,L1,V2,M1} { X ==> meet( X, join(
% 100.42/100.78 complement( Y ), meet( X, Y ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218665) {G2,W10,D5,L1,V2,M1} { meet( X, join( complement( Y ),
% 100.42/100.78 meet( Y, X ) ) ) ==> X }.
% 100.42/100.78 parent0[0]: (218659) {G2,W10,D5,L1,V2,M1} { X ==> meet( X, join(
% 100.42/100.78 complement( Y ), meet( Y, X ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (10350) {G23,W10,D5,L1,V2,M1} P(56,10312) { meet( X, join(
% 100.42/100.78 complement( Y ), meet( Y, X ) ) ) ==> X }.
% 100.42/100.78 parent0: (218665) {G2,W10,D5,L1,V2,M1} { meet( X, join( complement( Y ),
% 100.42/100.78 meet( Y, X ) ) ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218666) {G22,W10,D5,L1,V2,M1} { X ==> meet( X, join( complement(
% 100.42/100.78 Y ), meet( X, Y ) ) ) }.
% 100.42/100.78 parent0[0]: (10312) {G22,W10,D5,L1,V2,M1} P(5214,1589);d(450);d(995) { meet
% 100.42/100.78 ( Y, join( complement( X ), meet( Y, X ) ) ) ==> Y }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218667) {G1,W10,D5,L1,V2,M1} { X ==> meet( X, join( meet( X, Y )
% 100.42/100.78 , complement( Y ) ) ) }.
% 100.42/100.78 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.42/100.78 parent1[0; 4]: (218666) {G22,W10,D5,L1,V2,M1} { X ==> meet( X, join(
% 100.42/100.78 complement( Y ), meet( X, Y ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := complement( Y )
% 100.42/100.78 Y := meet( X, Y )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218670) {G1,W10,D5,L1,V2,M1} { meet( X, join( meet( X, Y ),
% 100.42/100.78 complement( Y ) ) ) ==> X }.
% 100.42/100.78 parent0[0]: (218667) {G1,W10,D5,L1,V2,M1} { X ==> meet( X, join( meet( X,
% 100.42/100.78 Y ), complement( Y ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (10351) {G23,W10,D5,L1,V2,M1} P(0,10312) { meet( Y, join( meet
% 100.42/100.78 ( Y, X ), complement( X ) ) ) ==> Y }.
% 100.42/100.78 parent0: (218670) {G1,W10,D5,L1,V2,M1} { meet( X, join( meet( X, Y ),
% 100.42/100.78 complement( Y ) ) ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218672) {G24,W7,D4,L1,V2,M1} { Y ==> join( meet( X, Y ), Y ) }.
% 100.42/100.78 parent0[0]: (756) {G24,W7,D4,L1,V2,M1} P(716,0) { join( meet( Y, X ), X )
% 100.42/100.78 ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218675) {G24,W15,D5,L1,V2,M1} { join( complement( X ), meet( X,
% 100.42/100.78 Y ) ) ==> join( Y, join( complement( X ), meet( X, Y ) ) ) }.
% 100.42/100.78 parent0[0]: (10350) {G23,W10,D5,L1,V2,M1} P(56,10312) { meet( X, join(
% 100.42/100.78 complement( Y ), meet( Y, X ) ) ) ==> X }.
% 100.42/100.78 parent1[0; 8]: (218672) {G24,W7,D4,L1,V2,M1} { Y ==> join( meet( X, Y ), Y
% 100.42/100.78 ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := join( complement( X ), meet( X, Y ) )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218676) {G1,W15,D5,L1,V2,M1} { join( complement( X ), meet( X, Y
% 100.42/100.78 ) ) ==> join( join( Y, complement( X ) ), meet( X, Y ) ) }.
% 100.42/100.78 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.42/100.78 join( X, Y ), Z ) }.
% 100.42/100.78 parent1[0; 7]: (218675) {G24,W15,D5,L1,V2,M1} { join( complement( X ),
% 100.42/100.78 meet( X, Y ) ) ==> join( Y, join( complement( X ), meet( X, Y ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := complement( X )
% 100.42/100.78 Z := meet( X, Y )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218677) {G2,W11,D4,L1,V2,M1} { join( complement( X ), meet( X, Y
% 100.42/100.78 ) ) ==> join( Y, complement( X ) ) }.
% 100.42/100.78 parent0[0]: (748) {G24,W11,D4,L1,V3,M1} P(716,27) { join( join( X, Z ),
% 100.42/100.78 meet( Y, X ) ) ==> join( X, Z ) }.
% 100.42/100.78 parent1[0; 7]: (218676) {G1,W15,D5,L1,V2,M1} { join( complement( X ), meet
% 100.42/100.78 ( X, Y ) ) ==> join( join( Y, complement( X ) ), meet( X, Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 Z := complement( X )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (10406) {G25,W11,D4,L1,V2,M1} P(10350,756);d(1);d(748) { join
% 100.42/100.78 ( complement( Y ), meet( Y, X ) ) ==> join( X, complement( Y ) ) }.
% 100.42/100.78 parent0: (218677) {G2,W11,D4,L1,V2,M1} { join( complement( X ), meet( X, Y
% 100.42/100.78 ) ) ==> join( Y, complement( X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218680) {G18,W10,D5,L1,V2,M1} { join( X, complement( Y ) ) ==>
% 100.42/100.78 complement( meet( complement( X ), Y ) ) }.
% 100.42/100.78 parent0[0]: (994) {G18,W10,D5,L1,V2,M1} P(460,473) { complement( meet(
% 100.42/100.78 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218685) {G19,W14,D7,L1,V2,M1} { join( X, complement( join( meet
% 100.42/100.78 ( complement( X ), Y ), complement( Y ) ) ) ) ==> complement( complement
% 100.42/100.78 ( X ) ) }.
% 100.42/100.78 parent0[0]: (10351) {G23,W10,D5,L1,V2,M1} P(0,10312) { meet( Y, join( meet
% 100.42/100.78 ( Y, X ), complement( X ) ) ) ==> Y }.
% 100.42/100.78 parent1[0; 12]: (218680) {G18,W10,D5,L1,V2,M1} { join( X, complement( Y )
% 100.42/100.78 ) ==> complement( meet( complement( X ), Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := complement( X )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := join( meet( complement( X ), Y ), complement( Y ) )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218686) {G17,W12,D7,L1,V2,M1} { join( X, complement( join( meet
% 100.42/100.78 ( complement( X ), Y ), complement( Y ) ) ) ) ==> X }.
% 100.42/100.78 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.42/100.78 complement( X ) ) ==> X }.
% 100.42/100.78 parent1[0; 11]: (218685) {G19,W14,D7,L1,V2,M1} { join( X, complement( join
% 100.42/100.78 ( meet( complement( X ), Y ), complement( Y ) ) ) ) ==> complement(
% 100.42/100.78 complement( X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218687) {G18,W11,D7,L1,V2,M1} { join( X, meet( complement( meet
% 100.42/100.78 ( complement( X ), Y ) ), Y ) ) ==> X }.
% 100.42/100.78 parent0[0]: (471) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( X,
% 100.42/100.78 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 100.42/100.78 parent1[0; 3]: (218686) {G17,W12,D7,L1,V2,M1} { join( X, complement( join
% 100.42/100.78 ( meet( complement( X ), Y ), complement( Y ) ) ) ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := meet( complement( X ), Y )
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218688) {G19,W10,D6,L1,V2,M1} { join( X, meet( join( X,
% 100.42/100.78 complement( Y ) ), Y ) ) ==> X }.
% 100.42/100.78 parent0[0]: (994) {G18,W10,D5,L1,V2,M1} P(460,473) { complement( meet(
% 100.42/100.78 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 100.42/100.78 parent1[0; 4]: (218687) {G18,W11,D7,L1,V2,M1} { join( X, meet( complement
% 100.42/100.78 ( meet( complement( X ), Y ) ), Y ) ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (10499) {G24,W10,D6,L1,V2,M1} P(10351,994);d(460);d(471);d(994
% 100.42/100.78 ) { join( X, meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 100.42/100.78 parent0: (218688) {G19,W10,D6,L1,V2,M1} { join( X, meet( join( X,
% 100.42/100.78 complement( Y ) ), Y ) ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218691) {G24,W10,D6,L1,V2,M1} { X ==> join( X, meet( join( X,
% 100.42/100.78 complement( Y ) ), Y ) ) }.
% 100.42/100.78 parent0[0]: (10499) {G24,W10,D6,L1,V2,M1} P(10351,994);d(460);d(471);d(994)
% 100.42/100.78 { join( X, meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218697) {G9,W23,D8,L1,V3,M1} { join( join( complement( join( X,
% 100.42/100.78 complement( Y ) ) ), X ), Z ) ==> join( join( join( complement( join( X,
% 100.42/100.78 complement( Y ) ) ), X ), Z ), meet( top, Y ) ) }.
% 100.42/100.78 parent0[0]: (270) {G8,W12,D7,L1,V3,M1} P(23,27);d(230) { join( join( join(
% 100.42/100.78 complement( join( X, Y ) ), X ), Z ), Y ) ==> top }.
% 100.42/100.78 parent1[0; 21]: (218691) {G24,W10,D6,L1,V2,M1} { X ==> join( X, meet( join
% 100.42/100.78 ( X, complement( Y ) ), Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := complement( Y )
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := join( join( complement( join( X, complement( Y ) ) ), X ), Z )
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218699) {G10,W22,D7,L1,V3,M1} { join( join( complement( join( X
% 100.42/100.78 , complement( Y ) ) ), X ), Z ) ==> join( join( join( meet( complement( X
% 100.42/100.78 ), Y ), X ), Z ), meet( top, Y ) ) }.
% 100.42/100.78 parent0[0]: (471) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( X,
% 100.42/100.78 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 100.42/100.78 parent1[0; 13]: (218697) {G9,W23,D8,L1,V3,M1} { join( join( complement(
% 100.42/100.78 join( X, complement( Y ) ) ), X ), Z ) ==> join( join( join( complement(
% 100.42/100.78 join( X, complement( Y ) ) ), X ), Z ), meet( top, Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218700) {G11,W21,D7,L1,V3,M1} { join( join( meet( complement( X
% 100.42/100.78 ), Y ), X ), Z ) ==> join( join( join( meet( complement( X ), Y ), X ),
% 100.42/100.78 Z ), meet( top, Y ) ) }.
% 100.42/100.78 parent0[0]: (471) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( X,
% 100.42/100.78 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 100.42/100.78 parent1[0; 3]: (218699) {G10,W22,D7,L1,V3,M1} { join( join( complement(
% 100.42/100.78 join( X, complement( Y ) ) ), X ), Z ) ==> join( join( join( meet(
% 100.42/100.78 complement( X ), Y ), X ), Z ), meet( top, Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218704) {G12,W19,D7,L1,V3,M1} { join( join( meet( complement( X
% 100.42/100.78 ), Y ), X ), Z ) ==> join( join( join( meet( complement( X ), Y ), X ),
% 100.42/100.78 Z ), Y ) }.
% 100.42/100.78 parent0[0]: (452) {G13,W5,D3,L1,V1,M1} P(56,418);d(450) { meet( top, X )
% 100.42/100.78 ==> X }.
% 100.42/100.78 parent1[0; 18]: (218700) {G11,W21,D7,L1,V3,M1} { join( join( meet(
% 100.42/100.78 complement( X ), Y ), X ), Z ) ==> join( join( join( meet( complement( X
% 100.42/100.78 ), Y ), X ), Z ), meet( top, Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218705) {G13,W14,D6,L1,V3,M1} { join( join( meet( complement( X
% 100.42/100.78 ), Y ), X ), Z ) ==> join( join( Y, Z ), X ) }.
% 100.42/100.78 parent0[0]: (5728) {G24,W15,D6,L1,V4,M1} P(716,236) { join( join( join(
% 100.42/100.78 meet( Y, X ), T ), Z ), X ) ==> join( join( X, Z ), T ) }.
% 100.42/100.78 parent1[0; 9]: (218704) {G12,W19,D7,L1,V3,M1} { join( join( meet(
% 100.42/100.78 complement( X ), Y ), X ), Z ) ==> join( join( join( meet( complement( X
% 100.42/100.78 ), Y ), X ), Z ), Y ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := complement( X )
% 100.42/100.78 Z := Z
% 100.42/100.78 T := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (10531) {G25,W14,D6,L1,V3,M1} P(270,10499);d(471);d(452);d(
% 100.42/100.78 5728) { join( join( meet( complement( X ), Y ), X ), Z ) ==> join( join(
% 100.42/100.78 Y, Z ), X ) }.
% 100.42/100.78 parent0: (218705) {G13,W14,D6,L1,V3,M1} { join( join( meet( complement( X
% 100.42/100.78 ), Y ), X ), Z ) ==> join( join( Y, Z ), X ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := Z
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218708) {G24,W10,D6,L1,V2,M1} { X ==> join( X, meet( join( X,
% 100.42/100.78 complement( Y ) ), Y ) ) }.
% 100.42/100.78 parent0[0]: (10499) {G24,W10,D6,L1,V2,M1} P(10351,994);d(460);d(471);d(994)
% 100.42/100.78 { join( X, meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218713) {G4,W19,D7,L1,V2,M1} { join( complement( join(
% 100.42/100.78 complement( X ), Y ) ), Y ) ==> join( join( complement( join( complement
% 100.42/100.78 ( X ), Y ) ), Y ), meet( top, X ) ) }.
% 100.42/100.78 parent0[0]: (203) {G3,W10,D6,L1,V2,M1} P(0,23) { join( join( complement(
% 100.42/100.78 join( Y, X ) ), X ), Y ) ==> top }.
% 100.42/100.78 parent1[0; 17]: (218708) {G24,W10,D6,L1,V2,M1} { X ==> join( X, meet( join
% 100.42/100.78 ( X, complement( Y ) ), Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := complement( X )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := join( complement( join( complement( X ), Y ) ), Y )
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218715) {G5,W18,D6,L1,V2,M1} { join( complement( join(
% 100.42/100.78 complement( X ), Y ) ), Y ) ==> join( join( meet( X, complement( Y ) ), Y
% 100.42/100.78 ), meet( top, X ) ) }.
% 100.42/100.78 parent0[0]: (472) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join(
% 100.42/100.78 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 100.42/100.78 parent1[0; 10]: (218713) {G4,W19,D7,L1,V2,M1} { join( complement( join(
% 100.42/100.78 complement( X ), Y ) ), Y ) ==> join( join( complement( join( complement
% 100.42/100.78 ( X ), Y ) ), Y ), meet( top, X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218716) {G6,W17,D6,L1,V2,M1} { join( meet( X, complement( Y ) )
% 100.42/100.78 , Y ) ==> join( join( meet( X, complement( Y ) ), Y ), meet( top, X ) )
% 100.42/100.78 }.
% 100.42/100.78 parent0[0]: (472) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join(
% 100.42/100.78 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 100.42/100.78 parent1[0; 2]: (218715) {G5,W18,D6,L1,V2,M1} { join( complement( join(
% 100.42/100.78 complement( X ), Y ) ), Y ) ==> join( join( meet( X, complement( Y ) ), Y
% 100.42/100.78 ), meet( top, X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218720) {G7,W15,D6,L1,V2,M1} { join( meet( X, complement( Y ) )
% 100.42/100.78 , Y ) ==> join( join( meet( X, complement( Y ) ), Y ), X ) }.
% 100.42/100.78 parent0[0]: (452) {G13,W5,D3,L1,V1,M1} P(56,418);d(450) { meet( top, X )
% 100.42/100.78 ==> X }.
% 100.42/100.78 parent1[0; 14]: (218716) {G6,W17,D6,L1,V2,M1} { join( meet( X, complement
% 100.42/100.78 ( Y ) ), Y ) ==> join( join( meet( X, complement( Y ) ), Y ), meet( top,
% 100.42/100.78 X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218721) {G8,W10,D5,L1,V2,M1} { join( meet( X, complement( Y ) )
% 100.42/100.78 , Y ) ==> join( X, Y ) }.
% 100.42/100.78 parent0[0]: (730) {G21,W11,D5,L1,V3,M1} P(699,26) { join( join( meet( X, Y
% 100.42/100.78 ), Z ), X ) ==> join( X, Z ) }.
% 100.42/100.78 parent1[0; 7]: (218720) {G7,W15,D6,L1,V2,M1} { join( meet( X, complement(
% 100.42/100.78 Y ) ), Y ) ==> join( join( meet( X, complement( Y ) ), Y ), X ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := complement( Y )
% 100.42/100.78 Z := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (10556) {G25,W10,D5,L1,V2,M1} P(203,10499);d(472);d(452);d(730
% 100.42/100.78 ) { join( meet( X, complement( Y ) ), Y ) ==> join( X, Y ) }.
% 100.42/100.78 parent0: (218721) {G8,W10,D5,L1,V2,M1} { join( meet( X, complement( Y ) )
% 100.42/100.78 , Y ) ==> join( X, Y ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218724) {G24,W10,D6,L1,V2,M1} { X ==> join( X, meet( join( X,
% 100.42/100.78 complement( Y ) ), Y ) ) }.
% 100.42/100.78 parent0[0]: (10499) {G24,W10,D6,L1,V2,M1} P(10351,994);d(460);d(471);d(994)
% 100.42/100.78 { join( X, meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218729) {G4,W19,D7,L1,V2,M1} { join( X, complement( join( X,
% 100.42/100.78 complement( Y ) ) ) ) ==> join( join( X, complement( join( X, complement
% 100.42/100.78 ( Y ) ) ) ), meet( top, Y ) ) }.
% 100.42/100.78 parent0[0]: (202) {G3,W10,D6,L1,V2,M1} P(0,23) { join( join( X, complement
% 100.42/100.78 ( join( X, Y ) ) ), Y ) ==> top }.
% 100.42/100.78 parent1[0; 17]: (218724) {G24,W10,D6,L1,V2,M1} { X ==> join( X, meet( join
% 100.42/100.78 ( X, complement( Y ) ), Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := complement( Y )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := join( X, complement( join( X, complement( Y ) ) ) )
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218731) {G5,W18,D6,L1,V2,M1} { join( X, complement( join( X,
% 100.42/100.78 complement( Y ) ) ) ) ==> join( join( X, meet( complement( X ), Y ) ),
% 100.42/100.78 meet( top, Y ) ) }.
% 100.42/100.78 parent0[0]: (471) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( X,
% 100.42/100.78 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 100.42/100.78 parent1[0; 11]: (218729) {G4,W19,D7,L1,V2,M1} { join( X, complement( join
% 100.42/100.78 ( X, complement( Y ) ) ) ) ==> join( join( X, complement( join( X,
% 100.42/100.78 complement( Y ) ) ) ), meet( top, Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218732) {G6,W17,D6,L1,V2,M1} { join( X, meet( complement( X ), Y
% 100.42/100.78 ) ) ==> join( join( X, meet( complement( X ), Y ) ), meet( top, Y ) )
% 100.42/100.78 }.
% 100.42/100.78 parent0[0]: (471) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( X,
% 100.42/100.78 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 100.42/100.78 parent1[0; 3]: (218731) {G5,W18,D6,L1,V2,M1} { join( X, complement( join(
% 100.42/100.78 X, complement( Y ) ) ) ) ==> join( join( X, meet( complement( X ), Y ) )
% 100.42/100.78 , meet( top, Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218736) {G7,W15,D6,L1,V2,M1} { join( X, meet( complement( X ), Y
% 100.42/100.78 ) ) ==> join( join( X, meet( complement( X ), Y ) ), Y ) }.
% 100.42/100.78 parent0[0]: (452) {G13,W5,D3,L1,V1,M1} P(56,418);d(450) { meet( top, X )
% 100.42/100.78 ==> X }.
% 100.42/100.78 parent1[0; 14]: (218732) {G6,W17,D6,L1,V2,M1} { join( X, meet( complement
% 100.42/100.78 ( X ), Y ) ) ==> join( join( X, meet( complement( X ), Y ) ), meet( top,
% 100.42/100.78 Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218737) {G8,W10,D5,L1,V2,M1} { join( X, meet( complement( X ), Y
% 100.42/100.78 ) ) ==> join( Y, X ) }.
% 100.42/100.78 parent0[0]: (758) {G25,W11,D5,L1,V3,M1} P(756,26) { join( join( Z, meet( X
% 100.42/100.78 , Y ) ), Y ) ==> join( Y, Z ) }.
% 100.42/100.78 parent1[0; 7]: (218736) {G7,W15,D6,L1,V2,M1} { join( X, meet( complement(
% 100.42/100.78 X ), Y ) ) ==> join( join( X, meet( complement( X ), Y ) ), Y ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := complement( X )
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (10559) {G26,W10,D5,L1,V2,M1} P(202,10499);d(471);d(452);d(758
% 100.42/100.78 ) { join( X, meet( complement( X ), Y ) ) ==> join( Y, X ) }.
% 100.42/100.78 parent0: (218737) {G8,W10,D5,L1,V2,M1} { join( X, meet( complement( X ), Y
% 100.42/100.78 ) ) ==> join( Y, X ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218740) {G24,W10,D6,L1,V2,M1} { X ==> join( X, meet( join( X,
% 100.42/100.78 complement( Y ) ), Y ) ) }.
% 100.42/100.78 parent0[0]: (10499) {G24,W10,D6,L1,V2,M1} P(10351,994);d(460);d(471);d(994)
% 100.42/100.78 { join( X, meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218745) {G4,W19,D7,L1,V2,M1} { join( X, complement( join(
% 100.42/100.78 complement( Y ), X ) ) ) ==> join( join( X, complement( join( complement
% 100.42/100.78 ( Y ), X ) ) ), meet( top, Y ) ) }.
% 100.42/100.78 parent0[0]: (201) {G3,W10,D6,L1,V2,M1} P(23,0);d(1) { join( join( Y,
% 100.42/100.78 complement( join( X, Y ) ) ), X ) ==> top }.
% 100.42/100.78 parent1[0; 17]: (218740) {G24,W10,D6,L1,V2,M1} { X ==> join( X, meet( join
% 100.42/100.78 ( X, complement( Y ) ), Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := complement( Y )
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := join( X, complement( join( complement( Y ), X ) ) )
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218747) {G5,W18,D6,L1,V2,M1} { join( X, complement( join(
% 100.42/100.78 complement( Y ), X ) ) ) ==> join( join( X, meet( Y, complement( X ) ) )
% 100.42/100.78 , meet( top, Y ) ) }.
% 100.42/100.78 parent0[0]: (472) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join(
% 100.42/100.78 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 100.42/100.78 parent1[0; 11]: (218745) {G4,W19,D7,L1,V2,M1} { join( X, complement( join
% 100.42/100.78 ( complement( Y ), X ) ) ) ==> join( join( X, complement( join(
% 100.42/100.78 complement( Y ), X ) ) ), meet( top, Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218748) {G6,W17,D6,L1,V2,M1} { join( X, meet( Y, complement( X )
% 100.42/100.78 ) ) ==> join( join( X, meet( Y, complement( X ) ) ), meet( top, Y ) )
% 100.42/100.78 }.
% 100.42/100.78 parent0[0]: (472) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join(
% 100.42/100.78 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 100.42/100.78 parent1[0; 3]: (218747) {G5,W18,D6,L1,V2,M1} { join( X, complement( join(
% 100.42/100.78 complement( Y ), X ) ) ) ==> join( join( X, meet( Y, complement( X ) ) )
% 100.42/100.78 , meet( top, Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218752) {G7,W15,D6,L1,V2,M1} { join( X, meet( Y, complement( X )
% 100.42/100.78 ) ) ==> join( join( X, meet( Y, complement( X ) ) ), Y ) }.
% 100.42/100.78 parent0[0]: (452) {G13,W5,D3,L1,V1,M1} P(56,418);d(450) { meet( top, X )
% 100.42/100.78 ==> X }.
% 100.42/100.78 parent1[0; 14]: (218748) {G6,W17,D6,L1,V2,M1} { join( X, meet( Y,
% 100.42/100.78 complement( X ) ) ) ==> join( join( X, meet( Y, complement( X ) ) ), meet
% 100.42/100.78 ( top, Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218753) {G8,W10,D5,L1,V2,M1} { join( X, meet( Y, complement( X )
% 100.42/100.78 ) ) ==> join( Y, X ) }.
% 100.42/100.78 parent0[0]: (762) {G22,W11,D5,L1,V3,M1} P(736,26) { join( join( Z, meet( X
% 100.42/100.78 , Y ) ), X ) ==> join( X, Z ) }.
% 100.42/100.78 parent1[0; 7]: (218752) {G7,W15,D6,L1,V2,M1} { join( X, meet( Y,
% 100.42/100.78 complement( X ) ) ) ==> join( join( X, meet( Y, complement( X ) ) ), Y )
% 100.42/100.78 }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := complement( X )
% 100.42/100.78 Z := X
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (10561) {G25,W10,D5,L1,V2,M1} P(201,10499);d(472);d(452);d(762
% 100.42/100.78 ) { join( X, meet( Y, complement( X ) ) ) ==> join( Y, X ) }.
% 100.42/100.78 parent0: (218753) {G8,W10,D5,L1,V2,M1} { join( X, meet( Y, complement( X )
% 100.42/100.78 ) ) ==> join( Y, X ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218756) {G24,W10,D6,L1,V2,M1} { X ==> join( X, meet( join( X,
% 100.42/100.78 complement( Y ) ), Y ) ) }.
% 100.42/100.78 parent0[0]: (10499) {G24,W10,D6,L1,V2,M1} P(10351,994);d(460);d(471);d(994)
% 100.42/100.78 { join( X, meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218758) {G20,W13,D5,L1,V2,M1} { meet( X, Y ) ==> join( meet( X,
% 100.42/100.78 Y ), meet( top, meet( Y, X ) ) ) }.
% 100.42/100.78 parent0[0]: (1208) {G19,W10,D5,L1,V2,M1} P(1004,11) { join( meet( X, Y ),
% 100.42/100.78 complement( meet( Y, X ) ) ) ==> top }.
% 100.42/100.78 parent1[0; 9]: (218756) {G24,W10,D6,L1,V2,M1} { X ==> join( X, meet( join
% 100.42/100.78 ( X, complement( Y ) ), Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := meet( X, Y )
% 100.42/100.78 Y := meet( Y, X )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218759) {G14,W11,D4,L1,V2,M1} { meet( X, Y ) ==> join( meet( X,
% 100.42/100.78 Y ), meet( Y, X ) ) }.
% 100.42/100.78 parent0[0]: (452) {G13,W5,D3,L1,V1,M1} P(56,418);d(450) { meet( top, X )
% 100.42/100.78 ==> X }.
% 100.42/100.78 parent1[0; 8]: (218758) {G20,W13,D5,L1,V2,M1} { meet( X, Y ) ==> join(
% 100.42/100.78 meet( X, Y ), meet( top, meet( Y, X ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := meet( Y, X )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218760) {G14,W11,D4,L1,V2,M1} { join( meet( X, Y ), meet( Y, X )
% 100.42/100.78 ) ==> meet( X, Y ) }.
% 100.42/100.78 parent0[0]: (218759) {G14,W11,D4,L1,V2,M1} { meet( X, Y ) ==> join( meet(
% 100.42/100.78 X, Y ), meet( Y, X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (10571) {G25,W11,D4,L1,V2,M1} P(1208,10499);d(452) { join(
% 100.42/100.78 meet( X, Y ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 100.42/100.78 parent0: (218760) {G14,W11,D4,L1,V2,M1} { join( meet( X, Y ), meet( Y, X )
% 100.42/100.78 ) ==> meet( X, Y ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218762) {G24,W10,D6,L1,V2,M1} { X ==> join( X, meet( join( X,
% 100.42/100.78 complement( Y ) ), Y ) ) }.
% 100.42/100.78 parent0[0]: (10499) {G24,W10,D6,L1,V2,M1} P(10351,994);d(460);d(471);d(994)
% 100.42/100.78 { join( X, meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218763) {G17,W10,D5,L1,V2,M1} { X ==> join( X, meet( join( X, Y
% 100.42/100.78 ), complement( Y ) ) ) }.
% 100.42/100.78 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.42/100.78 complement( X ) ) ==> X }.
% 100.42/100.78 parent1[0; 7]: (218762) {G24,W10,D6,L1,V2,M1} { X ==> join( X, meet( join
% 100.42/100.78 ( X, complement( Y ) ), Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := complement( Y )
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218764) {G17,W10,D5,L1,V2,M1} { join( X, meet( join( X, Y ),
% 100.42/100.78 complement( Y ) ) ) ==> X }.
% 100.42/100.78 parent0[0]: (218763) {G17,W10,D5,L1,V2,M1} { X ==> join( X, meet( join( X
% 100.42/100.78 , Y ), complement( Y ) ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (10581) {G25,W10,D5,L1,V2,M1} P(460,10499) { join( Y, meet(
% 100.42/100.78 join( Y, X ), complement( X ) ) ) ==> Y }.
% 100.42/100.78 parent0: (218764) {G17,W10,D5,L1,V2,M1} { join( X, meet( join( X, Y ),
% 100.42/100.78 complement( Y ) ) ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218766) {G24,W10,D6,L1,V2,M1} { X ==> join( X, meet( join( X,
% 100.42/100.78 complement( Y ) ), Y ) ) }.
% 100.42/100.78 parent0[0]: (10499) {G24,W10,D6,L1,V2,M1} P(10351,994);d(460);d(471);d(994)
% 100.42/100.78 { join( X, meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218771) {G3,W19,D7,L1,V2,M1} { join( complement( join( X,
% 100.42/100.78 complement( Y ) ) ), X ) ==> join( join( complement( join( X, complement
% 100.42/100.78 ( Y ) ) ), X ), meet( top, Y ) ) }.
% 100.42/100.78 parent0[0]: (23) {G2,W10,D6,L1,V2,M1} P(1,15) { join( join( complement(
% 100.42/100.78 join( X, Y ) ), X ), Y ) ==> top }.
% 100.42/100.78 parent1[0; 17]: (218766) {G24,W10,D6,L1,V2,M1} { X ==> join( X, meet( join
% 100.42/100.78 ( X, complement( Y ) ), Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := complement( Y )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := join( complement( join( X, complement( Y ) ) ), X )
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218773) {G4,W18,D6,L1,V2,M1} { join( complement( join( X,
% 100.42/100.78 complement( Y ) ) ), X ) ==> join( join( meet( complement( X ), Y ), X )
% 100.42/100.78 , meet( top, Y ) ) }.
% 100.42/100.78 parent0[0]: (471) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( X,
% 100.42/100.78 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 100.42/100.78 parent1[0; 10]: (218771) {G3,W19,D7,L1,V2,M1} { join( complement( join( X
% 100.42/100.78 , complement( Y ) ) ), X ) ==> join( join( complement( join( X,
% 100.42/100.78 complement( Y ) ) ), X ), meet( top, Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218774) {G5,W17,D6,L1,V2,M1} { join( meet( complement( X ), Y )
% 100.42/100.78 , X ) ==> join( join( meet( complement( X ), Y ), X ), meet( top, Y ) )
% 100.42/100.78 }.
% 100.42/100.78 parent0[0]: (471) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( X,
% 100.42/100.78 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 100.42/100.78 parent1[0; 2]: (218773) {G4,W18,D6,L1,V2,M1} { join( complement( join( X,
% 100.42/100.78 complement( Y ) ) ), X ) ==> join( join( meet( complement( X ), Y ), X )
% 100.42/100.78 , meet( top, Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218778) {G6,W14,D5,L1,V2,M1} { join( meet( complement( X ), Y )
% 100.42/100.78 , X ) ==> join( join( Y, meet( top, Y ) ), X ) }.
% 100.42/100.78 parent0[0]: (10531) {G25,W14,D6,L1,V3,M1} P(270,10499);d(471);d(452);d(5728
% 100.42/100.78 ) { join( join( meet( complement( X ), Y ), X ), Z ) ==> join( join( Y, Z
% 100.42/100.78 ), X ) }.
% 100.42/100.78 parent1[0; 7]: (218774) {G5,W17,D6,L1,V2,M1} { join( meet( complement( X )
% 100.42/100.78 , Y ), X ) ==> join( join( meet( complement( X ), Y ), X ), meet( top, Y
% 100.42/100.78 ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 Z := meet( top, Y )
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218779) {G7,W10,D5,L1,V2,M1} { join( meet( complement( X ), Y )
% 100.42/100.78 , X ) ==> join( Y, X ) }.
% 100.42/100.78 parent0[0]: (716) {G23,W7,D4,L1,V2,M1} P(691,699) { join( X, meet( Y, X ) )
% 100.42/100.78 ==> X }.
% 100.42/100.78 parent1[0; 8]: (218778) {G6,W14,D5,L1,V2,M1} { join( meet( complement( X )
% 100.42/100.78 , Y ), X ) ==> join( join( Y, meet( top, Y ) ), X ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := top
% 100.42/100.78 end
% 100.42/100.78 substitution1:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 subsumption: (10586) {G26,W10,D5,L1,V2,M1} P(23,10499);d(471);d(10531);d(
% 100.42/100.78 716) { join( meet( complement( X ), Y ), X ) ==> join( Y, X ) }.
% 100.42/100.78 parent0: (218779) {G7,W10,D5,L1,V2,M1} { join( meet( complement( X ), Y )
% 100.42/100.78 , X ) ==> join( Y, X ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := X
% 100.42/100.78 Y := Y
% 100.42/100.78 end
% 100.42/100.78 permutation0:
% 100.42/100.78 0 ==> 0
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 eqswap: (218782) {G17,W10,D5,L1,V2,M1} { meet( X, complement( Y ) ) ==>
% 100.42/100.78 complement( join( complement( X ), Y ) ) }.
% 100.42/100.78 parent0[0]: (472) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join(
% 100.42/100.78 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := Y
% 100.42/100.78 Y := X
% 100.42/100.78 end
% 100.42/100.78
% 100.42/100.78 paramod: (218787) {G18,W14,D7,L1,V2,M1} { meet( X, complement( meet(
% 100.42/100.78 complement( complement( X ) ), Y ) ) ) ==> complement( join( Y,
% 100.42/100.78 complement( X ) ) ) }.
% 100.42/100.78 parent0[0]: (10559) {G26,W10,D5,L1,V2,M1} P(202,10499);d(471);d(452);d(758)
% 100.42/100.78 { join( X, meet( complement( X ), Y ) ) ==> join( Y, X ) }.
% 100.42/100.78 parent1[0; 10]: (218782) {G17,W10,D5,L1,V2,M1} { meet( X, complement( Y )
% 100.42/100.78 ) ==> complement( join( complement( X ), Y ) ) }.
% 100.42/100.78 substitution0:
% 100.42/100.78 X := complement( X )
% 100.42/100.79 Y := Y
% 100.42/100.79 end
% 100.42/100.79 substitution1:
% 100.42/100.79 X := X
% 100.42/100.79 Y := meet( complement( complement( X ) ), Y )
% 100.42/100.79 end
% 100.42/100.79
% 100.42/100.79 paramod: (218788) {G18,W13,D7,L1,V2,M1} { meet( X, complement( meet(
% 100.42/100.79 complement( complement( X ) ), Y ) ) ) ==> meet( complement( Y ), X ) }.
% 100.42/100.79 parent0[0]: (471) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( X,
% 100.42/100.79 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 100.42/100.79 parent1[0; 9]: (218787) {G18,W14,D7,L1,V2,M1} { meet( X, complement( meet
% 100.42/100.79 ( complement( complement( X ) ), Y ) ) ) ==> complement( join( Y,
% 100.42/100.79 complement( X ) ) ) }.
% 100.42/100.79 substitution0:
% 100.42/100.79 X := Y
% 100.42/100.79 Y := X
% 100.42/100.79 end
% 100.42/100.79 substitution1:
% 100.42/100.79 X := X
% 100.42/100.79 Y := Y
% 100.42/100.79 end
% 100.42/100.79
% 100.42/100.79 paramod: (218789) {G19,W12,D5,L1,V2,M1} { meet( X, join( complement( X ),
% 100.42/100.79 complement( Y ) ) ) ==> meet( complement( Y ), X ) }.
% 100.42/100.79 parent0[0]: (994) {G18,W10,D5,L1,V2,M1} P(460,473) { complement( meet(
% 100.42/100.79 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 100.42/100.79 parent1[0; 3]: (218788) {G18,W13,D7,L1,V2,M1} { meet( X, complement( meet
% 100.42/100.79 ( complement( complement( X ) ), Y ) ) ) ==> meet( complement( Y ), X )
% 100.42/100.79 }.
% 100.42/100.79 substitution0:
% 100.42/100.79 X := complement( X )
% 100.42/100.79 Y := Y
% 100.42/100.79 end
% 100.42/100.79 substitution1:
% 100.42/100.79 X := X
% 100.42/100.79 Y := Y
% 100.42/100.79 end
% 100.42/100.79
% 100.42/100.79 paramod: (218790) {G18,W11,D5,L1,V2,M1} { meet( X, complement( meet( X, Y
% 100.42/100.79 ) ) ) ==> meet( complement( Y ), X ) }.
% 100.42/100.79 parent0[0]: (473) {G17,W10,D4,L1,V2,M1} P(3,460) { join( complement( X ),
% 100.42/100.79 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 100.42/100.79 parent1[0; 3]: (218789) {G19,W12,D5,L1,V2,M1} { meet( X, join( complement
% 100.42/100.79 ( X ), complement( Y ) ) ) ==> meet( complement( Y ), X ) }.
% 100.42/100.79 substitution0:
% 100.42/100.79 X := X
% 100.42/100.79 Y := Y
% 100.42/100.79 end
% 100.42/100.79 substitution1:
% 100.42/100.79 X := X
% 100.42/100.79 Y := Y
% 100.42/100.79 end
% 100.42/100.79
% 100.42/100.79 subsumption: (12201) {G27,W11,D5,L1,V2,M1} P(10559,472);d(471);d(994);d(473
% 100.42/100.79 ) { meet( X, complement( meet( X, Y ) ) ) ==> meet( complement( Y ), X )
% 100.42/100.79 }.
% 100.42/100.79 parent0: (218790) {G18,W11,D5,L1,V2,M1} { meet( X, complement( meet( X, Y
% 100.42/100.79 ) ) ) ==> meet( complement( Y ), X ) }.
% 100.42/100.79 substitution0:
% 100.42/100.79 X := X
% 100.42/100.79 Y := Y
% 100.42/100.79 end
% 100.42/100.79 permutation0:
% 100.42/100.79 0 ==> 0
% 100.42/100.79 end
% 100.42/100.79
% 100.42/100.79 eqswap: (218793) {G26,W10,D5,L1,V2,M1} { join( Y, X ) ==> join( X, meet(
% 100.42/100.79 complement( X ), Y ) ) }.
% 100.42/100.79 parent0[0]: (10559) {G26,W10,D5,L1,V2,M1} P(202,10499);d(471);d(452);d(758)
% 100.42/100.79 { join( X, meet( complement( X ), Y ) ) ==> join( Y, X ) }.
% 100.42/100.79 substitution0:
% 100.42/100.79 X := X
% 100.42/100.79 Y := Y
% 100.42/100.79 end
% 100.42/100.79
% 100.42/100.79 paramod: (218796) {G19,W11,D5,L1,V2,M1} { join( complement( X ), Y ) ==>
% 100.42/100.79 join( Y, complement( join( Y, X ) ) ) }.
% 100.42/100.79 parent0[0]: (1795) {G18,W10,D4,L1,V2,M1} P(460,471) { meet( complement( Y )
% 100.42/100.79 , complement( X ) ) ==> complement( join( Y, X ) ) }.
% 100.42/100.79 parent1[0; 7]: (218793) {G26,W10,D5,L1,V2,M1} { join( Y, X ) ==> join( X,
% 100.42/100.79 meet( complement( X ), Y ) ) }.
% 100.42/100.79 substitution0:
% 100.42/100.79 X := X
% 100.42/100.79 Y := Y
% 100.42/100.79 end
% 100.42/100.79 substitution1:
% 100.42/100.79 X := Y
% 100.42/100.79 Y := complement( X )
% 100.42/100.79 end
% 100.42/100.79
% 100.42/100.79 eqswap: (218797) {G19,W11,D5,L1,V2,M1} { join( Y, complement( join( Y, X )
% 100.42/100.79 ) ) ==> join( complement( X ), Y ) }.
% 100.42/100.79 parent0[0]: (218796) {G19,W11,D5,L1,V2,M1} { join( complement( X ), Y )
% 100.42/100.79 ==> join( Y, complement( join( Y, X ) ) ) }.
% 100.42/100.79 substitution0:
% 100.42/100.79 X := X
% 100.42/100.79 Y := Y
% 100.42/100.79 end
% 100.42/100.79
% 100.42/100.79 subsumption: (12205) {G27,W11,D5,L1,V2,M1} P(1795,10559) { join( X,
% 100.42/100.79 complement( join( X, Y ) ) ) ==> join( complement( Y ), X ) }.
% 100.42/100.79 parent0: (218797) {G19,W11,D5,L1,V2,M1} { join( Y, complement( join( Y, X
% 100.42/100.79 ) ) ) ==> join( complement( X ), Y ) }.
% 100.42/100.79 substitution0:
% 100.42/100.79 X := Y
% 100.42/100.79 Y := X
% 100.42/100.79 end
% 100.42/100.79 permutation0:
% 100.42/100.79 0 ==> 0
% 100.42/100.79 end
% 100.42/100.79
% 100.42/100.79 eqswap: (218799) {G25,W10,D5,L1,V2,M1} { X ==> join( X, meet( join( X, Y )
% 100.42/100.79 , complement( Y ) ) ) }.
% 100.42/100.79 parent0[0]: (10581) {G25,W10,D5,L1,V2,M1} P(460,10499) { join( Y, meet(
% 100.42/100.79 join( Y, X ), complement( X ) ) ) ==> Y }.
% 100.42/100.79 substitution0:
% 100.42/100.79 X := Y
% 100.42/100.79 Y := X
% 100.42/100.79 end
% 100.42/100.79
% 100.42/100.79 paramod: (218801) {G12,W11,D8,L1,V1,M1} { X ==> join( X, meet( top,
% 100.42/100.79 complement( converse( complement( converse( X ) ) ) ) ) ) }.
% 100.42/100.79 parent0[0]: (404) {G11,W8,D6,L1,V1,M1} S(156);d(260) { join( X, converse(
% 100.42/100.79 complement( converse( X ) ) ) ) ==> top }.
% 100.42/100.79 parent1[0; 5]: (218799) {G25,W10,D5,L1,V2,M1} { X ==> join( X, meet( join
% 100.42/100.79 ( X, Y ), complement( Y ) ) ) }.
% 100.42/100.79 substitution0:
% 100.42/100.79 X := X
% 100.42/100.79 end
% 100.42/100.79 substitution1:
% 100.42/100.79 X := X
% 100.42/100.79 Y := converse( complement( converse( X ) ) )
% 100.42/100.79 end
% 100.42/100.79
% 100.42/100.79 paramod: (218802) {G13,W9,D7,L1,V1,M1} { X ==> join( X, complement(
% 100.42/100.79 converse( complement( converse( X ) ) ) ) ) }.
% 100.42/100.79 parent0[0]: (452) {G13,W5,D3,L1,V1,M1} P(56,418);d(450) { meet( top, X )
% 100.42/100.79 ==> X }.
% 100.42/100.79 parent1[0; 4]: (218801) {G12,W11,D8,L1,V1,M1} { X ==> join( X, meet( top,
% 100.42/100.79 complement( converse( complement( converse( X ) ) ) ) ) ) }.
% 100.42/100.79 substitution0:
% 100.42/100.79 X := complement( converse( complement( converse( X ) ) ) )
% 100.42/100.79 end
% 100.42/100.79 substitution1:
% 100.42/100.79 X := X
% 100.42/100.79 end
% 100.42/100.79
% 100.42/100.79 eqswap: (218803) {G13,W9,D7,L1,V1,M1} { join( X, complement( converse(
% 100.42/100.79 complement( converse( X ) ) ) ) ) ==> X }.
% 100.42/100.79 parent0[0]: (218802) {G13,W9,D7,L1,V1,M1} { X ==> join( X, complement(
% 100.42/100.79 converse( complement( converse( X ) ) ) ) ) }.
% 100.42/100.79 substitution0:
% 100.42/100.79 X := X
% 100.42/100.79 end
% 100.42/100.79
% 100.42/100.79 subsumption: (12299) {G26,W9,D7,L1,V1,M1} P(404,10581);d(452) { join( X,
% 100.42/100.79 complement( converse( complement( converse( X ) ) ) ) ) ==> X }.
% 100.42/100.79 parent0: (218803) {G13,W9,D7,L1,V1,M1} { join( X, complement( converse(
% 100.42/100.79 complement( converse( X ) ) ) ) ) ==> X }.
% 100.42/100.79 substitution0:
% 100.42/100.79 X := X
% 100.42/100.79 end
% 100.42/100.79 permutation0:
% 100.42/100.79 0 ==> 0
% 100.42/100.79 end
% 100.42/100.79
% 100.42/100.79 eqswap: (218804) {G25,W10,D5,L1,V2,M1} { X ==> join( X, meet( join( X, Y )
% 100.43/100.79 , complement( Y ) ) ) }.
% 100.43/100.79 parent0[0]: (10581) {G25,W10,D5,L1,V2,M1} P(460,10499) { join( Y, meet(
% 100.43/100.79 join( Y, X ), complement( X ) ) ) ==> Y }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218805) {G2,W10,D5,L1,V2,M1} { X ==> join( X, meet( complement(
% 100.43/100.79 Y ), join( X, Y ) ) ) }.
% 100.43/100.79 parent0[0]: (56) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 100.43/100.79 Y ) }.
% 100.43/100.79 parent1[0; 4]: (218804) {G25,W10,D5,L1,V2,M1} { X ==> join( X, meet( join
% 100.43/100.79 ( X, Y ), complement( Y ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := complement( Y )
% 100.43/100.79 Y := join( X, Y )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218808) {G2,W10,D5,L1,V2,M1} { join( X, meet( complement( Y ),
% 100.43/100.79 join( X, Y ) ) ) ==> X }.
% 100.43/100.79 parent0[0]: (218805) {G2,W10,D5,L1,V2,M1} { X ==> join( X, meet(
% 100.43/100.79 complement( Y ), join( X, Y ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (12313) {G26,W10,D5,L1,V2,M1} P(56,10581) { join( X, meet(
% 100.43/100.79 complement( Y ), join( X, Y ) ) ) ==> X }.
% 100.43/100.79 parent0: (218808) {G2,W10,D5,L1,V2,M1} { join( X, meet( complement( Y ),
% 100.43/100.79 join( X, Y ) ) ) ==> X }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218810) {G17,W10,D5,L1,V2,M1} { meet( X, complement( Y ) ) ==>
% 100.43/100.79 complement( join( complement( X ), Y ) ) }.
% 100.43/100.79 parent0[0]: (472) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join(
% 100.43/100.79 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218813) {G18,W13,D9,L1,V1,M1} { meet( X, complement( complement
% 100.43/100.79 ( converse( complement( converse( complement( X ) ) ) ) ) ) ) ==>
% 100.43/100.79 complement( complement( X ) ) }.
% 100.43/100.79 parent0[0]: (12299) {G26,W9,D7,L1,V1,M1} P(404,10581);d(452) { join( X,
% 100.43/100.79 complement( converse( complement( converse( X ) ) ) ) ) ==> X }.
% 100.43/100.79 parent1[0; 11]: (218810) {G17,W10,D5,L1,V2,M1} { meet( X, complement( Y )
% 100.43/100.79 ) ==> complement( join( complement( X ), Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := complement( X )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := complement( converse( complement( converse( complement( X ) ) ) ) )
% 100.43/100.79
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218815) {G17,W11,D9,L1,V1,M1} { meet( X, complement( complement
% 100.43/100.79 ( converse( complement( converse( complement( X ) ) ) ) ) ) ) ==> X }.
% 100.43/100.79 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.43/100.79 complement( X ) ) ==> X }.
% 100.43/100.79 parent1[0; 10]: (218813) {G18,W13,D9,L1,V1,M1} { meet( X, complement(
% 100.43/100.79 complement( converse( complement( converse( complement( X ) ) ) ) ) ) )
% 100.43/100.79 ==> complement( complement( X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218817) {G17,W9,D7,L1,V1,M1} { meet( X, converse( complement(
% 100.43/100.79 converse( complement( X ) ) ) ) ) ==> X }.
% 100.43/100.79 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.43/100.79 complement( X ) ) ==> X }.
% 100.43/100.79 parent1[0; 3]: (218815) {G17,W11,D9,L1,V1,M1} { meet( X, complement(
% 100.43/100.79 complement( converse( complement( converse( complement( X ) ) ) ) ) ) )
% 100.43/100.79 ==> X }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := converse( complement( converse( complement( X ) ) ) )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (12334) {G27,W9,D7,L1,V1,M1} P(12299,472);d(460);d(460) { meet
% 100.43/100.79 ( X, converse( complement( converse( complement( X ) ) ) ) ) ==> X }.
% 100.43/100.79 parent0: (218817) {G17,W9,D7,L1,V1,M1} { meet( X, converse( complement(
% 100.43/100.79 converse( complement( X ) ) ) ) ) ==> X }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218820) {G26,W9,D7,L1,V1,M1} { X ==> join( X, complement(
% 100.43/100.79 converse( complement( converse( X ) ) ) ) ) }.
% 100.43/100.79 parent0[0]: (12299) {G26,W9,D7,L1,V1,M1} P(404,10581);d(452) { join( X,
% 100.43/100.79 complement( converse( complement( converse( X ) ) ) ) ) ==> X }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218821) {G1,W10,D6,L1,V1,M1} { converse( X ) ==> join( converse
% 100.43/100.79 ( X ), complement( converse( complement( X ) ) ) ) }.
% 100.43/100.79 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 100.43/100.79 parent1[0; 9]: (218820) {G26,W9,D7,L1,V1,M1} { X ==> join( X, complement(
% 100.43/100.79 converse( complement( converse( X ) ) ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := converse( X )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218822) {G1,W10,D6,L1,V1,M1} { join( converse( X ), complement(
% 100.43/100.79 converse( complement( X ) ) ) ) ==> converse( X ) }.
% 100.43/100.79 parent0[0]: (218821) {G1,W10,D6,L1,V1,M1} { converse( X ) ==> join(
% 100.43/100.79 converse( X ), complement( converse( complement( X ) ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (12374) {G27,W10,D6,L1,V1,M1} P(7,12299) { join( converse( X )
% 100.43/100.79 , complement( converse( complement( X ) ) ) ) ==> converse( X ) }.
% 100.43/100.79 parent0: (218822) {G1,W10,D6,L1,V1,M1} { join( converse( X ), complement(
% 100.43/100.79 converse( complement( X ) ) ) ) ==> converse( X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218824) {G25,W9,D6,L1,V2,M1} { Y ==> join( converse( meet( X,
% 100.43/100.79 converse( Y ) ) ), Y ) }.
% 100.43/100.79 parent0[0]: (760) {G25,W9,D6,L1,V2,M1} P(756,21);d(7) { join( converse(
% 100.43/100.79 meet( X, converse( Y ) ) ), Y ) ==> Y }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218826) {G26,W12,D6,L1,V1,M1} { complement( converse( complement
% 100.43/100.79 ( X ) ) ) ==> join( converse( X ), complement( converse( complement( X )
% 100.43/100.79 ) ) ) }.
% 100.43/100.79 parent0[0]: (12334) {G27,W9,D7,L1,V1,M1} P(12299,472);d(460);d(460) { meet
% 100.43/100.79 ( X, converse( complement( converse( complement( X ) ) ) ) ) ==> X }.
% 100.43/100.79 parent1[0; 7]: (218824) {G25,W9,D6,L1,V2,M1} { Y ==> join( converse( meet
% 100.43/100.79 ( X, converse( Y ) ) ), Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := complement( converse( complement( X ) ) )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218827) {G27,W7,D5,L1,V1,M1} { complement( converse( complement
% 100.43/100.79 ( X ) ) ) ==> converse( X ) }.
% 100.43/100.79 parent0[0]: (12374) {G27,W10,D6,L1,V1,M1} P(7,12299) { join( converse( X )
% 100.43/100.79 , complement( converse( complement( X ) ) ) ) ==> converse( X ) }.
% 100.43/100.79 parent1[0; 5]: (218826) {G26,W12,D6,L1,V1,M1} { complement( converse(
% 100.43/100.79 complement( X ) ) ) ==> join( converse( X ), complement( converse(
% 100.43/100.79 complement( X ) ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (12515) {G28,W7,D5,L1,V1,M1} P(12334,760);d(12374) {
% 100.43/100.79 complement( converse( complement( X ) ) ) ==> converse( X ) }.
% 100.43/100.79 parent0: (218827) {G27,W7,D5,L1,V1,M1} { complement( converse( complement
% 100.43/100.79 ( X ) ) ) ==> converse( X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218830) {G17,W10,D5,L1,V2,M1} { meet( X, complement( Y ) ) ==>
% 100.43/100.79 complement( join( complement( X ), Y ) ) }.
% 100.43/100.79 parent0[0]: (472) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join(
% 100.43/100.79 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218834) {G18,W12,D5,L1,V2,M1} { meet( converse( complement( X )
% 100.43/100.79 ), complement( Y ) ) ==> complement( join( converse( X ), Y ) ) }.
% 100.43/100.79 parent0[0]: (12515) {G28,W7,D5,L1,V1,M1} P(12334,760);d(12374) { complement
% 100.43/100.79 ( converse( complement( X ) ) ) ==> converse( X ) }.
% 100.43/100.79 parent1[0; 9]: (218830) {G17,W10,D5,L1,V2,M1} { meet( X, complement( Y ) )
% 100.43/100.79 ==> complement( join( complement( X ), Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := converse( complement( X ) )
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (12562) {G29,W12,D5,L1,V2,M1} P(12515,472) { meet( converse(
% 100.43/100.79 complement( X ) ), complement( Y ) ) ==> complement( join( converse( X )
% 100.43/100.79 , Y ) ) }.
% 100.43/100.79 parent0: (218834) {G18,W12,D5,L1,V2,M1} { meet( converse( complement( X )
% 100.43/100.79 ), complement( Y ) ) ==> complement( join( converse( X ), Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218838) {G28,W7,D5,L1,V1,M1} { converse( X ) ==> complement(
% 100.43/100.79 converse( complement( X ) ) ) }.
% 100.43/100.79 parent0[0]: (12515) {G28,W7,D5,L1,V1,M1} P(12334,760);d(12374) { complement
% 100.43/100.79 ( converse( complement( X ) ) ) ==> converse( X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218843) {G18,W12,D6,L1,V2,M1} { converse( join( complement( X )
% 100.43/100.79 , Y ) ) ==> complement( converse( meet( X, complement( Y ) ) ) ) }.
% 100.43/100.79 parent0[0]: (472) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join(
% 100.43/100.79 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 100.43/100.79 parent1[0; 8]: (218838) {G28,W7,D5,L1,V1,M1} { converse( X ) ==>
% 100.43/100.79 complement( converse( complement( X ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := join( complement( X ), Y )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218844) {G18,W12,D6,L1,V2,M1} { complement( converse( meet( X,
% 100.43/100.79 complement( Y ) ) ) ) ==> converse( join( complement( X ), Y ) ) }.
% 100.43/100.79 parent0[0]: (218843) {G18,W12,D6,L1,V2,M1} { converse( join( complement( X
% 100.43/100.79 ), Y ) ) ==> complement( converse( meet( X, complement( Y ) ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (12563) {G29,W12,D6,L1,V2,M1} P(472,12515) { complement(
% 100.43/100.79 converse( meet( X, complement( Y ) ) ) ) ==> converse( join( complement(
% 100.43/100.79 X ), Y ) ) }.
% 100.43/100.79 parent0: (218844) {G18,W12,D6,L1,V2,M1} { complement( converse( meet( X,
% 100.43/100.79 complement( Y ) ) ) ) ==> converse( join( complement( X ), Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218846) {G28,W9,D6,L1,V1,M1} { X ==> meet( X, complement(
% 100.43/100.79 composition( skol1, complement( X ) ) ) ) }.
% 100.43/100.79 parent0[0]: (2031) {G28,W9,D6,L1,V1,M1} P(2027,1009);d(455) { meet( X,
% 100.43/100.79 complement( composition( skol1, complement( X ) ) ) ) ==> X }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218849) {G29,W13,D6,L1,V1,M1} { converse( complement( X ) ) ==>
% 100.43/100.79 meet( converse( complement( X ) ), complement( composition( skol1,
% 100.43/100.79 converse( X ) ) ) ) }.
% 100.43/100.79 parent0[0]: (12515) {G28,W7,D5,L1,V1,M1} P(12334,760);d(12374) { complement
% 100.43/100.79 ( converse( complement( X ) ) ) ==> converse( X ) }.
% 100.43/100.79 parent1[0; 11]: (218846) {G28,W9,D6,L1,V1,M1} { X ==> meet( X, complement
% 100.43/100.79 ( composition( skol1, complement( X ) ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := converse( complement( X ) )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218850) {G30,W12,D6,L1,V1,M1} { converse( complement( X ) ) ==>
% 100.43/100.79 complement( join( converse( X ), composition( skol1, converse( X ) ) ) )
% 100.43/100.79 }.
% 100.43/100.79 parent0[0]: (12562) {G29,W12,D5,L1,V2,M1} P(12515,472) { meet( converse(
% 100.43/100.79 complement( X ) ), complement( Y ) ) ==> complement( join( converse( X )
% 100.43/100.79 , Y ) ) }.
% 100.43/100.79 parent1[0; 4]: (218849) {G29,W13,D6,L1,V1,M1} { converse( complement( X )
% 100.43/100.79 ) ==> meet( converse( complement( X ) ), complement( composition( skol1
% 100.43/100.79 , converse( X ) ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := composition( skol1, converse( X ) )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218851) {G7,W7,D4,L1,V1,M1} { converse( complement( X ) ) ==>
% 100.43/100.79 complement( converse( X ) ) }.
% 100.43/100.79 parent0[0]: (1872) {G6,W7,D4,L1,V1,M1} P(16,141);d(137) { join( X,
% 100.43/100.79 composition( skol1, X ) ) ==> X }.
% 100.43/100.79 parent1[0; 5]: (218850) {G30,W12,D6,L1,V1,M1} { converse( complement( X )
% 100.43/100.79 ) ==> complement( join( converse( X ), composition( skol1, converse( X )
% 100.43/100.79 ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := converse( X )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (12649) {G30,W7,D4,L1,V1,M1} P(12515,2031);d(12562);d(1872) {
% 100.43/100.79 converse( complement( X ) ) ==> complement( converse( X ) ) }.
% 100.43/100.79 parent0: (218851) {G7,W7,D4,L1,V1,M1} { converse( complement( X ) ) ==>
% 100.43/100.79 complement( converse( X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218854) {G28,W7,D5,L1,V1,M1} { converse( X ) ==> complement(
% 100.43/100.79 converse( complement( X ) ) ) }.
% 100.43/100.79 parent0[0]: (12515) {G28,W7,D5,L1,V1,M1} P(12334,760);d(12374) { complement
% 100.43/100.79 ( converse( complement( X ) ) ) ==> converse( X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218859) {G18,W12,D6,L1,V2,M1} { converse( join( X, complement( Y
% 100.43/100.79 ) ) ) ==> complement( converse( meet( complement( X ), Y ) ) ) }.
% 100.43/100.79 parent0[0]: (471) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( X,
% 100.43/100.79 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 100.43/100.79 parent1[0; 8]: (218854) {G28,W7,D5,L1,V1,M1} { converse( X ) ==>
% 100.43/100.79 complement( converse( complement( X ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := join( X, complement( Y ) )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218860) {G18,W12,D6,L1,V2,M1} { complement( converse( meet(
% 100.43/100.79 complement( X ), Y ) ) ) ==> converse( join( X, complement( Y ) ) ) }.
% 100.43/100.79 parent0[0]: (218859) {G18,W12,D6,L1,V2,M1} { converse( join( X, complement
% 100.43/100.79 ( Y ) ) ) ==> complement( converse( meet( complement( X ), Y ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (12650) {G29,W12,D6,L1,V2,M1} P(471,12515) { complement(
% 100.43/100.79 converse( meet( complement( X ), Y ) ) ) ==> converse( join( X,
% 100.43/100.79 complement( Y ) ) ) }.
% 100.43/100.79 parent0: (218860) {G18,W12,D6,L1,V2,M1} { complement( converse( meet(
% 100.43/100.79 complement( X ), Y ) ) ) ==> converse( join( X, complement( Y ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218862) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) ==> join
% 100.43/100.79 ( converse( X ), converse( Y ) ) }.
% 100.43/100.79 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 100.43/100.79 ) ==> converse( join( X, Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218863) {G1,W12,D5,L1,V2,M1} { converse( join( complement( X ),
% 100.43/100.79 Y ) ) ==> join( complement( converse( X ) ), converse( Y ) ) }.
% 100.43/100.79 parent0[0]: (12649) {G30,W7,D4,L1,V1,M1} P(12515,2031);d(12562);d(1872) {
% 100.43/100.79 converse( complement( X ) ) ==> complement( converse( X ) ) }.
% 100.43/100.79 parent1[0; 7]: (218862) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) )
% 100.43/100.79 ==> join( converse( X ), converse( Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := complement( X )
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218865) {G1,W12,D5,L1,V2,M1} { join( complement( converse( X ) )
% 100.43/100.79 , converse( Y ) ) ==> converse( join( complement( X ), Y ) ) }.
% 100.43/100.79 parent0[0]: (218863) {G1,W12,D5,L1,V2,M1} { converse( join( complement( X
% 100.43/100.79 ), Y ) ) ==> join( complement( converse( X ) ), converse( Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (12696) {G31,W12,D5,L1,V2,M1} P(12649,8) { join( complement(
% 100.43/100.79 converse( X ) ), converse( Y ) ) ==> converse( join( complement( X ), Y )
% 100.43/100.79 ) }.
% 100.43/100.79 parent0: (218865) {G1,W12,D5,L1,V2,M1} { join( complement( converse( X ) )
% 100.43/100.79 , converse( Y ) ) ==> converse( join( complement( X ), Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218868) {G0,W10,D4,L1,V2,M1} { converse( composition( Y, X ) )
% 100.43/100.79 ==> composition( converse( X ), converse( Y ) ) }.
% 100.43/100.79 parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ),
% 100.43/100.79 converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218869) {G1,W12,D5,L1,V2,M1} { converse( composition( X,
% 100.43/100.79 complement( Y ) ) ) ==> composition( complement( converse( Y ) ),
% 100.43/100.79 converse( X ) ) }.
% 100.43/100.79 parent0[0]: (12649) {G30,W7,D4,L1,V1,M1} P(12515,2031);d(12562);d(1872) {
% 100.43/100.79 converse( complement( X ) ) ==> complement( converse( X ) ) }.
% 100.43/100.79 parent1[0; 7]: (218868) {G0,W10,D4,L1,V2,M1} { converse( composition( Y, X
% 100.43/100.79 ) ) ==> composition( converse( X ), converse( Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := complement( Y )
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218871) {G1,W12,D5,L1,V2,M1} { composition( complement( converse
% 100.43/100.79 ( Y ) ), converse( X ) ) ==> converse( composition( X, complement( Y ) )
% 100.43/100.79 ) }.
% 100.43/100.79 parent0[0]: (218869) {G1,W12,D5,L1,V2,M1} { converse( composition( X,
% 100.43/100.79 complement( Y ) ) ) ==> composition( complement( converse( Y ) ),
% 100.43/100.79 converse( X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (12698) {G31,W12,D5,L1,V2,M1} P(12649,9) { composition(
% 100.43/100.79 complement( converse( X ) ), converse( Y ) ) ==> converse( composition( Y
% 100.43/100.79 , complement( X ) ) ) }.
% 100.43/100.79 parent0: (218871) {G1,W12,D5,L1,V2,M1} { composition( complement( converse
% 100.43/100.79 ( Y ) ), converse( X ) ) ==> converse( composition( X, complement( Y ) )
% 100.43/100.79 ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218873) {G26,W10,D5,L1,V2,M1} { X ==> join( X, meet( complement(
% 100.43/100.79 Y ), join( X, Y ) ) ) }.
% 100.43/100.79 parent0[0]: (12313) {G26,W10,D5,L1,V2,M1} P(56,10581) { join( X, meet(
% 100.43/100.79 complement( Y ), join( X, Y ) ) ) ==> X }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218874) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( complement( Y )
% 100.43/100.79 , join( X, Y ) ), X ) }.
% 100.43/100.79 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.43/100.79 parent1[0; 2]: (218873) {G26,W10,D5,L1,V2,M1} { X ==> join( X, meet(
% 100.43/100.79 complement( Y ), join( X, Y ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := meet( complement( Y ), join( X, Y ) )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218878) {G1,W10,D5,L1,V2,M1} { join( meet( complement( Y ), join
% 100.43/100.79 ( X, Y ) ), X ) ==> X }.
% 100.43/100.79 parent0[0]: (218874) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( complement(
% 100.43/100.79 Y ), join( X, Y ) ), X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (12860) {G27,W10,D5,L1,V2,M1} P(12313,0) { join( meet(
% 100.43/100.79 complement( Y ), join( X, Y ) ), X ) ==> X }.
% 100.43/100.79 parent0: (218878) {G1,W10,D5,L1,V2,M1} { join( meet( complement( Y ), join
% 100.43/100.79 ( X, Y ) ), X ) ==> X }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218882) {G27,W10,D5,L1,V2,M1} { Y ==> join( meet( complement( X )
% 100.43/100.79 , join( Y, X ) ), Y ) }.
% 100.43/100.79 parent0[0]: (12860) {G27,W10,D5,L1,V2,M1} P(12313,0) { join( meet(
% 100.43/100.79 complement( Y ), join( X, Y ) ), X ) ==> X }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218884) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( complement( Y )
% 100.43/100.79 , join( Y, X ) ), X ) }.
% 100.43/100.79 parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.43/100.79 parent1[0; 6]: (218882) {G27,W10,D5,L1,V2,M1} { Y ==> join( meet(
% 100.43/100.79 complement( X ), join( Y, X ) ), Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218890) {G1,W10,D5,L1,V2,M1} { join( meet( complement( Y ), join
% 100.43/100.79 ( Y, X ) ), X ) ==> X }.
% 100.43/100.79 parent0[0]: (218884) {G1,W10,D5,L1,V2,M1} { X ==> join( meet( complement(
% 100.43/100.79 Y ), join( Y, X ) ), X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (12900) {G28,W10,D5,L1,V2,M1} P(0,12860) { join( meet(
% 100.43/100.79 complement( Y ), join( Y, X ) ), X ) ==> X }.
% 100.43/100.79 parent0: (218890) {G1,W10,D5,L1,V2,M1} { join( meet( complement( Y ), join
% 100.43/100.79 ( Y, X ) ), X ) ==> X }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218892) {G28,W10,D5,L1,V2,M1} { Y ==> join( meet( complement( X )
% 100.43/100.79 , join( X, Y ) ), Y ) }.
% 100.43/100.79 parent0[0]: (12900) {G28,W10,D5,L1,V2,M1} P(0,12860) { join( meet(
% 100.43/100.79 complement( Y ), join( Y, X ) ), X ) ==> X }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218893) {G17,W10,D6,L1,V2,M1} { X ==> join( meet( Y, join(
% 100.43/100.79 complement( Y ), X ) ), X ) }.
% 100.43/100.79 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.43/100.79 complement( X ) ) ==> X }.
% 100.43/100.79 parent1[0; 4]: (218892) {G28,W10,D5,L1,V2,M1} { Y ==> join( meet(
% 100.43/100.79 complement( X ), join( X, Y ) ), Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := complement( Y )
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218894) {G17,W10,D6,L1,V2,M1} { join( meet( Y, join( complement(
% 100.43/100.79 Y ), X ) ), X ) ==> X }.
% 100.43/100.79 parent0[0]: (218893) {G17,W10,D6,L1,V2,M1} { X ==> join( meet( Y, join(
% 100.43/100.79 complement( Y ), X ) ), X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (12960) {G29,W10,D6,L1,V2,M1} P(460,12900) { join( meet( X,
% 100.43/100.79 join( complement( X ), Y ) ), Y ) ==> Y }.
% 100.43/100.79 parent0: (218894) {G17,W10,D6,L1,V2,M1} { join( meet( Y, join( complement
% 100.43/100.79 ( Y ), X ) ), X ) ==> X }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218896) {G17,W10,D5,L1,V2,M1} { meet( complement( X ), Y ) ==>
% 100.43/100.79 complement( join( X, complement( Y ) ) ) }.
% 100.43/100.79 parent0[0]: (471) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( X,
% 100.43/100.79 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218901) {G18,W14,D7,L1,V2,M1} { meet( complement( meet(
% 100.43/100.79 complement( complement( X ) ), Y ) ), X ) ==> complement( join( Y,
% 100.43/100.79 complement( X ) ) ) }.
% 100.43/100.79 parent0[0]: (10586) {G26,W10,D5,L1,V2,M1} P(23,10499);d(471);d(10531);d(716
% 100.43/100.79 ) { join( meet( complement( X ), Y ), X ) ==> join( Y, X ) }.
% 100.43/100.79 parent1[0; 10]: (218896) {G17,W10,D5,L1,V2,M1} { meet( complement( X ), Y
% 100.43/100.79 ) ==> complement( join( X, complement( Y ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := complement( X )
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := meet( complement( complement( X ) ), Y )
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218902) {G18,W13,D7,L1,V2,M1} { meet( complement( meet(
% 100.43/100.79 complement( complement( X ) ), Y ) ), X ) ==> meet( complement( Y ), X )
% 100.43/100.79 }.
% 100.43/100.79 parent0[0]: (471) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join( X,
% 100.43/100.79 complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 100.43/100.79 parent1[0; 9]: (218901) {G18,W14,D7,L1,V2,M1} { meet( complement( meet(
% 100.43/100.79 complement( complement( X ) ), Y ) ), X ) ==> complement( join( Y,
% 100.43/100.79 complement( X ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218903) {G19,W12,D5,L1,V2,M1} { meet( join( complement( X ),
% 100.43/100.79 complement( Y ) ), X ) ==> meet( complement( Y ), X ) }.
% 100.43/100.79 parent0[0]: (994) {G18,W10,D5,L1,V2,M1} P(460,473) { complement( meet(
% 100.43/100.79 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 100.43/100.79 parent1[0; 2]: (218902) {G18,W13,D7,L1,V2,M1} { meet( complement( meet(
% 100.43/100.79 complement( complement( X ) ), Y ) ), X ) ==> meet( complement( Y ), X )
% 100.43/100.79 }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := complement( X )
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218904) {G18,W11,D5,L1,V2,M1} { meet( complement( meet( X, Y ) )
% 100.43/100.79 , X ) ==> meet( complement( Y ), X ) }.
% 100.43/100.79 parent0[0]: (473) {G17,W10,D4,L1,V2,M1} P(3,460) { join( complement( X ),
% 100.43/100.79 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 100.43/100.79 parent1[0; 2]: (218903) {G19,W12,D5,L1,V2,M1} { meet( join( complement( X
% 100.43/100.79 ), complement( Y ) ), X ) ==> meet( complement( Y ), X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (13102) {G27,W11,D5,L1,V2,M1} P(10586,471);d(471);d(994);d(473
% 100.43/100.79 ) { meet( complement( meet( X, Y ) ), X ) ==> meet( complement( Y ), X )
% 100.43/100.79 }.
% 100.43/100.79 parent0: (218904) {G18,W11,D5,L1,V2,M1} { meet( complement( meet( X, Y ) )
% 100.43/100.79 , X ) ==> meet( complement( Y ), X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218907) {G29,W10,D6,L1,V2,M1} { Y ==> join( meet( X, join(
% 100.43/100.79 complement( X ), Y ) ), Y ) }.
% 100.43/100.79 parent0[0]: (12960) {G29,W10,D6,L1,V2,M1} P(460,12900) { join( meet( X,
% 100.43/100.79 join( complement( X ), Y ) ), Y ) ==> Y }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218910) {G26,W18,D6,L1,V2,M1} { meet( X, complement( complement
% 100.43/100.79 ( Y ) ) ) ==> join( meet( Y, join( X, complement( Y ) ) ), meet( X,
% 100.43/100.79 complement( complement( Y ) ) ) ) }.
% 100.43/100.79 parent0[0]: (10561) {G25,W10,D5,L1,V2,M1} P(201,10499);d(472);d(452);d(762)
% 100.43/100.79 { join( X, meet( Y, complement( X ) ) ) ==> join( Y, X ) }.
% 100.43/100.79 parent1[0; 9]: (218907) {G29,W10,D6,L1,V2,M1} { Y ==> join( meet( X, join
% 100.43/100.79 ( complement( X ), Y ) ), Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := complement( Y )
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := meet( X, complement( complement( Y ) ) )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218912) {G17,W16,D6,L1,V2,M1} { meet( X, complement( complement
% 100.43/100.79 ( Y ) ) ) ==> join( meet( Y, join( X, complement( Y ) ) ), meet( X, Y ) )
% 100.43/100.79 }.
% 100.43/100.79 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.43/100.79 complement( X ) ) ==> X }.
% 100.43/100.79 parent1[0; 15]: (218910) {G26,W18,D6,L1,V2,M1} { meet( X, complement(
% 100.43/100.79 complement( Y ) ) ) ==> join( meet( Y, join( X, complement( Y ) ) ), meet
% 100.43/100.79 ( X, complement( complement( Y ) ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218913) {G17,W14,D6,L1,V2,M1} { meet( X, Y ) ==> join( meet( Y,
% 100.43/100.79 join( X, complement( Y ) ) ), meet( X, Y ) ) }.
% 100.43/100.79 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.43/100.79 complement( X ) ) ==> X }.
% 100.43/100.79 parent1[0; 3]: (218912) {G17,W16,D6,L1,V2,M1} { meet( X, complement(
% 100.43/100.79 complement( Y ) ) ) ==> join( meet( Y, join( X, complement( Y ) ) ), meet
% 100.43/100.79 ( X, Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218915) {G17,W14,D6,L1,V2,M1} { join( meet( Y, join( X,
% 100.43/100.79 complement( Y ) ) ), meet( X, Y ) ) ==> meet( X, Y ) }.
% 100.43/100.79 parent0[0]: (218913) {G17,W14,D6,L1,V2,M1} { meet( X, Y ) ==> join( meet(
% 100.43/100.79 Y, join( X, complement( Y ) ) ), meet( X, Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (13436) {G30,W14,D6,L1,V2,M1} P(10561,12960);d(460) { join(
% 100.43/100.79 meet( X, join( Y, complement( X ) ) ), meet( Y, X ) ) ==> meet( Y, X )
% 100.43/100.79 }.
% 100.43/100.79 parent0: (218915) {G17,W14,D6,L1,V2,M1} { join( meet( Y, join( X,
% 100.43/100.79 complement( Y ) ) ), meet( X, Y ) ) ==> meet( X, Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218920) {G3,W15,D5,L1,V3,M1} { join( join( meet( X, Y ), meet( Y
% 100.43/100.79 , X ) ), Z ) = join( meet( Y, X ), Z ) }.
% 100.43/100.79 parent0[0]: (10571) {G25,W11,D4,L1,V2,M1} P(1208,10499);d(452) { join( meet
% 100.43/100.79 ( X, Y ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 100.43/100.79 parent1[0; 11]: (268) {G2,W11,D4,L1,V3,M1} P(27,26) { join( join( Z, X ), Y
% 100.43/100.79 ) = join( join( X, Z ), Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := meet( Y, X )
% 100.43/100.79 Y := Z
% 100.43/100.79 Z := meet( X, Y )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218922) {G4,W11,D4,L1,V3,M1} { join( meet( X, Y ), Z ) = join(
% 100.43/100.79 meet( Y, X ), Z ) }.
% 100.43/100.79 parent0[0]: (10571) {G25,W11,D4,L1,V2,M1} P(1208,10499);d(452) { join( meet
% 100.43/100.79 ( X, Y ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 100.43/100.79 parent1[0; 2]: (218920) {G3,W15,D5,L1,V3,M1} { join( join( meet( X, Y ),
% 100.43/100.79 meet( Y, X ) ), Z ) = join( meet( Y, X ), Z ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 Z := Z
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (22367) {G26,W11,D4,L1,V3,M1} P(10571,268);d(10571) { join(
% 100.43/100.79 meet( X, Y ), Z ) = join( meet( Y, X ), Z ) }.
% 100.43/100.79 parent0: (218922) {G4,W11,D4,L1,V3,M1} { join( meet( X, Y ), Z ) = join(
% 100.43/100.79 meet( Y, X ), Z ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 Z := Z
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218926) {G2,W15,D5,L1,V3,M1} { composition( join( meet( X, Y ),
% 100.43/100.79 meet( Y, X ) ), Z ) = composition( meet( Y, X ), Z ) }.
% 100.43/100.79 parent0[0]: (10571) {G25,W11,D4,L1,V2,M1} P(1208,10499);d(452) { join( meet
% 100.43/100.79 ( X, Y ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 100.43/100.79 parent1[0; 11]: (72) {G1,W11,D4,L1,V3,M1} P(6,0);d(6) { composition( join(
% 100.43/100.79 X, Z ), Y ) = composition( join( Z, X ), Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := meet( X, Y )
% 100.43/100.79 Y := Z
% 100.43/100.79 Z := meet( Y, X )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218928) {G3,W11,D4,L1,V3,M1} { composition( meet( X, Y ), Z ) =
% 100.43/100.79 composition( meet( Y, X ), Z ) }.
% 100.43/100.79 parent0[0]: (10571) {G25,W11,D4,L1,V2,M1} P(1208,10499);d(452) { join( meet
% 100.43/100.79 ( X, Y ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 100.43/100.79 parent1[0; 2]: (218926) {G2,W15,D5,L1,V3,M1} { composition( join( meet( X
% 100.43/100.79 , Y ), meet( Y, X ) ), Z ) = composition( meet( Y, X ), Z ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 Z := Z
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (22382) {G26,W11,D4,L1,V3,M1} P(10571,72);d(10571) {
% 100.43/100.79 composition( meet( X, Y ), Z ) = composition( meet( Y, X ), Z ) }.
% 100.43/100.79 parent0: (218928) {G3,W11,D4,L1,V3,M1} { composition( meet( X, Y ), Z ) =
% 100.43/100.79 composition( meet( Y, X ), Z ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 Z := Z
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218929) {G1,W11,D4,L1,V3,M1} { join( meet( Y, X ), Z ) = join( Z
% 100.43/100.79 , meet( X, Y ) ) }.
% 100.43/100.79 parent0[0]: (22367) {G26,W11,D4,L1,V3,M1} P(10571,268);d(10571) { join(
% 100.43/100.79 meet( X, Y ), Z ) = join( meet( Y, X ), Z ) }.
% 100.43/100.79 parent1[0; 1]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 Z := Z
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := meet( X, Y )
% 100.43/100.79 Y := Z
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (22589) {G27,W11,D4,L1,V3,M1} P(22367,0) { join( meet( Y, X )
% 100.43/100.79 , Z ) = join( Z, meet( X, Y ) ) }.
% 100.43/100.79 parent0: (218929) {G1,W11,D4,L1,V3,M1} { join( meet( Y, X ), Z ) = join( Z
% 100.43/100.79 , meet( X, Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 Z := Z
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218933) {G26,W11,D4,L1,V2,M1} { composition( Y, X ) ==> meet(
% 100.43/100.79 composition( top, X ), composition( Y, X ) ) }.
% 100.43/100.79 parent0[0]: (2602) {G26,W11,D4,L1,V2,M1} P(142,2561);d(4);d(2211) { meet(
% 100.43/100.79 composition( top, Y ), composition( X, Y ) ) ==> composition( X, Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218937) {G24,W10,D6,L1,V0,M1} { composition( complement(
% 100.43/100.79 composition( top, converse( skol1 ) ) ), converse( skol1 ) ) ==> zero }.
% 100.43/100.79 parent0[0]: (3194) {G23,W9,D5,L1,V1,M1} P(460,2055) { meet( X, composition
% 100.43/100.79 ( complement( X ), converse( skol1 ) ) ) ==> zero }.
% 100.43/100.79 parent1[0; 9]: (218933) {G26,W11,D4,L1,V2,M1} { composition( Y, X ) ==>
% 100.43/100.79 meet( composition( top, X ), composition( Y, X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := composition( top, converse( skol1 ) )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := converse( skol1 )
% 100.43/100.79 Y := complement( composition( top, converse( skol1 ) ) )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218938) {G12,W10,D6,L1,V0,M1} { composition( complement(
% 100.43/100.79 converse( composition( skol1, top ) ) ), converse( skol1 ) ) ==> zero }.
% 100.43/100.79 parent0[0]: (262) {G11,W9,D4,L1,V1,M1} P(260,17) { composition( top,
% 100.43/100.79 converse( X ) ) ==> converse( composition( X, top ) ) }.
% 100.43/100.79 parent1[0; 3]: (218937) {G24,W10,D6,L1,V0,M1} { composition( complement(
% 100.43/100.79 composition( top, converse( skol1 ) ) ), converse( skol1 ) ) ==> zero }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := skol1
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218939) {G13,W9,D6,L1,V0,M1} { converse( composition( skol1,
% 100.43/100.79 complement( composition( skol1, top ) ) ) ) ==> zero }.
% 100.43/100.79 parent0[0]: (12698) {G31,W12,D5,L1,V2,M1} P(12649,9) { composition(
% 100.43/100.79 complement( converse( X ) ), converse( Y ) ) ==> converse( composition( Y
% 100.43/100.79 , complement( X ) ) ) }.
% 100.43/100.79 parent1[0; 1]: (218938) {G12,W10,D6,L1,V0,M1} { composition( complement(
% 100.43/100.79 converse( composition( skol1, top ) ) ), converse( skol1 ) ) ==> zero }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := composition( skol1, top )
% 100.43/100.79 Y := skol1
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (23702) {G32,W9,D6,L1,V0,M1} P(2602,3194);d(262);d(12698) {
% 100.43/100.79 converse( composition( skol1, complement( composition( skol1, top ) ) ) )
% 100.43/100.79 ==> zero }.
% 100.43/100.79 parent0: (218939) {G13,W9,D6,L1,V0,M1} { converse( composition( skol1,
% 100.43/100.79 complement( composition( skol1, top ) ) ) ) ==> zero }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218942) {G0,W5,D4,L1,V1,M1} { X ==> converse( converse( X ) ) }.
% 100.43/100.79 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218944) {G1,W9,D5,L1,V0,M1} { composition( skol1, complement(
% 100.43/100.79 composition( skol1, top ) ) ) ==> converse( zero ) }.
% 100.43/100.79 parent0[0]: (23702) {G32,W9,D6,L1,V0,M1} P(2602,3194);d(262);d(12698) {
% 100.43/100.79 converse( composition( skol1, complement( composition( skol1, top ) ) ) )
% 100.43/100.79 ==> zero }.
% 100.43/100.79 parent1[0; 8]: (218942) {G0,W5,D4,L1,V1,M1} { X ==> converse( converse( X
% 100.43/100.79 ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := composition( skol1, complement( composition( skol1, top ) ) )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218945) {G2,W8,D5,L1,V0,M1} { composition( skol1, complement(
% 100.43/100.79 composition( skol1, top ) ) ) ==> zero }.
% 100.43/100.79 parent0[0]: (480) {G16,W4,D3,L1,V0,M1} P(462,450) { converse( zero ) ==>
% 100.43/100.79 zero }.
% 100.43/100.79 parent1[0; 7]: (218944) {G1,W9,D5,L1,V0,M1} { composition( skol1,
% 100.43/100.79 complement( composition( skol1, top ) ) ) ==> converse( zero ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (23766) {G33,W8,D5,L1,V0,M1} P(23702,7);d(480) { composition(
% 100.43/100.79 skol1, complement( composition( skol1, top ) ) ) ==> zero }.
% 100.43/100.79 parent0: (218945) {G2,W8,D5,L1,V0,M1} { composition( skol1, complement(
% 100.43/100.79 composition( skol1, top ) ) ) ==> zero }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218948) {G17,W12,D7,L1,V2,M1} { Y ==> join( composition( converse
% 100.43/100.79 ( X ), complement( composition( X, complement( Y ) ) ) ), Y ) }.
% 100.43/100.79 parent0[0]: (470) {G17,W12,D7,L1,V2,M1} P(460,10) { join( composition(
% 100.43/100.79 converse( Y ), complement( composition( Y, complement( X ) ) ) ), X ) ==>
% 100.43/100.79 X }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218951) {G18,W13,D5,L1,V0,M1} { composition( skol1, top ) ==>
% 100.43/100.79 join( composition( converse( skol1 ), complement( zero ) ), composition(
% 100.43/100.79 skol1, top ) ) }.
% 100.43/100.79 parent0[0]: (23766) {G33,W8,D5,L1,V0,M1} P(23702,7);d(480) { composition(
% 100.43/100.79 skol1, complement( composition( skol1, top ) ) ) ==> zero }.
% 100.43/100.79 parent1[0; 9]: (218948) {G17,W12,D7,L1,V2,M1} { Y ==> join( composition(
% 100.43/100.79 converse( X ), complement( composition( X, complement( Y ) ) ) ), Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := skol1
% 100.43/100.79 Y := composition( skol1, top )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218952) {G14,W12,D5,L1,V0,M1} { composition( skol1, top ) ==>
% 100.43/100.79 join( composition( converse( skol1 ), top ), composition( skol1, top ) )
% 100.43/100.79 }.
% 100.43/100.79 parent0[0]: (451) {G13,W4,D3,L1,V0,M1} P(146,418);d(450);d(58) { complement
% 100.43/100.79 ( zero ) ==> top }.
% 100.43/100.79 parent1[0; 8]: (218951) {G18,W13,D5,L1,V0,M1} { composition( skol1, top )
% 100.43/100.79 ==> join( composition( converse( skol1 ), complement( zero ) ),
% 100.43/100.79 composition( skol1, top ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218953) {G1,W10,D5,L1,V0,M1} { composition( skol1, top ) ==>
% 100.43/100.79 composition( join( converse( skol1 ), skol1 ), top ) }.
% 100.43/100.79 parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ),
% 100.43/100.79 composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 100.43/100.79 parent1[0; 4]: (218952) {G14,W12,D5,L1,V0,M1} { composition( skol1, top )
% 100.43/100.79 ==> join( composition( converse( skol1 ), top ), composition( skol1, top
% 100.43/100.79 ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := converse( skol1 )
% 100.43/100.79 Y := skol1
% 100.43/100.79 Z := top
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218954) {G1,W10,D5,L1,V0,M1} { composition( join( converse( skol1
% 100.43/100.79 ), skol1 ), top ) ==> composition( skol1, top ) }.
% 100.43/100.79 parent0[0]: (218953) {G1,W10,D5,L1,V0,M1} { composition( skol1, top ) ==>
% 100.43/100.79 composition( join( converse( skol1 ), skol1 ), top ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (23767) {G34,W10,D5,L1,V0,M1} P(23766,470);d(451);d(6) {
% 100.43/100.79 composition( join( converse( skol1 ), skol1 ), top ) ==> composition(
% 100.43/100.79 skol1, top ) }.
% 100.43/100.79 parent0: (218954) {G1,W10,D5,L1,V0,M1} { composition( join( converse(
% 100.43/100.79 skol1 ), skol1 ), top ) ==> composition( skol1, top ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218956) {G25,W9,D5,L1,V2,M1} { X ==> meet( composition( join( X,
% 100.43/100.79 Y ), top ), X ) }.
% 100.43/100.79 parent0[0]: (2533) {G25,W9,D5,L1,V2,M1} P(2443,1061) { meet( composition(
% 100.43/100.79 join( X, Y ), top ), X ) ==> X }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218957) {G26,W9,D4,L1,V0,M1} { converse( skol1 ) ==> meet(
% 100.43/100.79 composition( skol1, top ), converse( skol1 ) ) }.
% 100.43/100.79 parent0[0]: (23767) {G34,W10,D5,L1,V0,M1} P(23766,470);d(451);d(6) {
% 100.43/100.79 composition( join( converse( skol1 ), skol1 ), top ) ==> composition(
% 100.43/100.79 skol1, top ) }.
% 100.43/100.79 parent1[0; 4]: (218956) {G25,W9,D5,L1,V2,M1} { X ==> meet( composition(
% 100.43/100.79 join( X, Y ), top ), X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := converse( skol1 )
% 100.43/100.79 Y := skol1
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218958) {G26,W9,D4,L1,V0,M1} { meet( composition( skol1, top ),
% 100.43/100.79 converse( skol1 ) ) ==> converse( skol1 ) }.
% 100.43/100.79 parent0[0]: (218957) {G26,W9,D4,L1,V0,M1} { converse( skol1 ) ==> meet(
% 100.43/100.79 composition( skol1, top ), converse( skol1 ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (23991) {G35,W9,D4,L1,V0,M1} P(23767,2533) { meet( composition
% 100.43/100.79 ( skol1, top ), converse( skol1 ) ) ==> converse( skol1 ) }.
% 100.43/100.79 parent0: (218958) {G26,W9,D4,L1,V0,M1} { meet( composition( skol1, top ),
% 100.43/100.79 converse( skol1 ) ) ==> converse( skol1 ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218960) {G21,W11,D4,L1,V3,M1} { join( X, Y ) ==> join( join( X, Y
% 100.43/100.79 ), meet( X, Z ) ) }.
% 100.43/100.79 parent0[0]: (728) {G21,W11,D4,L1,V3,M1} P(699,27) { join( join( X, Z ),
% 100.43/100.79 meet( X, Y ) ) ==> join( X, Z ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Z
% 100.43/100.79 Z := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218961) {G22,W14,D5,L1,V1,M1} { join( composition( skol1, top )
% 100.43/100.79 , X ) ==> join( join( composition( skol1, top ), X ), converse( skol1 ) )
% 100.43/100.79 }.
% 100.43/100.79 parent0[0]: (23991) {G35,W9,D4,L1,V0,M1} P(23767,2533) { meet( composition
% 100.43/100.79 ( skol1, top ), converse( skol1 ) ) ==> converse( skol1 ) }.
% 100.43/100.79 parent1[0; 12]: (218960) {G21,W11,D4,L1,V3,M1} { join( X, Y ) ==> join(
% 100.43/100.79 join( X, Y ), meet( X, Z ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := composition( skol1, top )
% 100.43/100.79 Y := X
% 100.43/100.79 Z := converse( skol1 )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218962) {G22,W14,D5,L1,V1,M1} { join( join( composition( skol1,
% 100.43/100.79 top ), X ), converse( skol1 ) ) ==> join( composition( skol1, top ), X )
% 100.43/100.79 }.
% 100.43/100.79 parent0[0]: (218961) {G22,W14,D5,L1,V1,M1} { join( composition( skol1, top
% 100.43/100.79 ), X ) ==> join( join( composition( skol1, top ), X ), converse( skol1 )
% 100.43/100.79 ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (24011) {G36,W14,D5,L1,V1,M1} P(23991,728) { join( join(
% 100.43/100.79 composition( skol1, top ), X ), converse( skol1 ) ) ==> join( composition
% 100.43/100.79 ( skol1, top ), X ) }.
% 100.43/100.79 parent0: (218962) {G22,W14,D5,L1,V1,M1} { join( join( composition( skol1,
% 100.43/100.79 top ), X ), converse( skol1 ) ) ==> join( composition( skol1, top ), X )
% 100.43/100.79 }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218964) {G19,W15,D7,L1,V2,M1} { complement( converse( X ) ) ==>
% 100.43/100.79 join( complement( converse( X ) ), composition( Y, complement( converse(
% 100.43/100.79 composition( X, Y ) ) ) ) ) }.
% 100.43/100.79 parent0[0]: (850) {G19,W15,D7,L1,V2,M1} P(88,479) { join( complement(
% 100.43/100.79 converse( Y ) ), composition( X, complement( converse( composition( Y, X
% 100.43/100.79 ) ) ) ) ) ==> complement( converse( Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218971) {G20,W19,D7,L1,V0,M1} { complement( converse( complement
% 100.43/100.79 ( composition( top, skol1 ) ) ) ) ==> join( complement( converse(
% 100.43/100.79 complement( composition( top, skol1 ) ) ) ), composition( skol1,
% 100.43/100.79 complement( converse( zero ) ) ) ) }.
% 100.43/100.79 parent0[0]: (6015) {G30,W8,D5,L1,V0,M1} P(5993,2108) { composition(
% 100.43/100.79 complement( composition( top, skol1 ) ), skol1 ) ==> zero }.
% 100.43/100.79 parent1[0; 18]: (218964) {G19,W15,D7,L1,V2,M1} { complement( converse( X )
% 100.43/100.79 ) ==> join( complement( converse( X ) ), composition( Y, complement(
% 100.43/100.79 converse( composition( X, Y ) ) ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := complement( composition( top, skol1 ) )
% 100.43/100.79 Y := skol1
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218973) {G21,W19,D7,L1,V0,M1} { complement( converse( complement
% 100.43/100.79 ( composition( top, skol1 ) ) ) ) ==> join( complement( complement(
% 100.43/100.79 converse( composition( top, skol1 ) ) ) ), composition( skol1, complement
% 100.43/100.79 ( converse( zero ) ) ) ) }.
% 100.43/100.79 parent0[0]: (12649) {G30,W7,D4,L1,V1,M1} P(12515,2031);d(12562);d(1872) {
% 100.43/100.79 converse( complement( X ) ) ==> complement( converse( X ) ) }.
% 100.43/100.79 parent1[0; 9]: (218971) {G20,W19,D7,L1,V0,M1} { complement( converse(
% 100.43/100.79 complement( composition( top, skol1 ) ) ) ) ==> join( complement(
% 100.43/100.79 converse( complement( composition( top, skol1 ) ) ) ), composition( skol1
% 100.43/100.79 , complement( converse( zero ) ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := composition( top, skol1 )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218974) {G22,W19,D7,L1,V0,M1} { complement( complement( converse
% 100.43/100.79 ( composition( top, skol1 ) ) ) ) ==> join( complement( complement(
% 100.43/100.79 converse( composition( top, skol1 ) ) ) ), composition( skol1, complement
% 100.43/100.79 ( converse( zero ) ) ) ) }.
% 100.43/100.79 parent0[0]: (12649) {G30,W7,D4,L1,V1,M1} P(12515,2031);d(12562);d(1872) {
% 100.43/100.79 converse( complement( X ) ) ==> complement( converse( X ) ) }.
% 100.43/100.79 parent1[0; 2]: (218973) {G21,W19,D7,L1,V0,M1} { complement( converse(
% 100.43/100.79 complement( composition( top, skol1 ) ) ) ) ==> join( complement(
% 100.43/100.79 complement( converse( composition( top, skol1 ) ) ) ), composition( skol1
% 100.43/100.79 , complement( converse( zero ) ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := composition( top, skol1 )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218982) {G17,W17,D6,L1,V0,M1} { complement( complement( converse
% 100.43/100.79 ( composition( top, skol1 ) ) ) ) ==> join( converse( composition( top,
% 100.43/100.79 skol1 ) ), composition( skol1, complement( converse( zero ) ) ) ) }.
% 100.43/100.79 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.43/100.79 complement( X ) ) ==> X }.
% 100.43/100.79 parent1[0; 8]: (218974) {G22,W19,D7,L1,V0,M1} { complement( complement(
% 100.43/100.79 converse( composition( top, skol1 ) ) ) ) ==> join( complement(
% 100.43/100.79 complement( converse( composition( top, skol1 ) ) ) ), composition( skol1
% 100.43/100.79 , complement( converse( zero ) ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := converse( composition( top, skol1 ) )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218983) {G17,W15,D6,L1,V0,M1} { converse( composition( top,
% 100.43/100.79 skol1 ) ) ==> join( converse( composition( top, skol1 ) ), composition(
% 100.43/100.79 skol1, complement( converse( zero ) ) ) ) }.
% 100.43/100.79 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.43/100.79 complement( X ) ) ==> X }.
% 100.43/100.79 parent1[0; 1]: (218982) {G17,W17,D6,L1,V0,M1} { complement( complement(
% 100.43/100.79 converse( composition( top, skol1 ) ) ) ) ==> join( converse( composition
% 100.43/100.79 ( top, skol1 ) ), composition( skol1, complement( converse( zero ) ) ) )
% 100.43/100.79 }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := converse( composition( top, skol1 ) )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218989) {G17,W14,D5,L1,V0,M1} { converse( composition( top,
% 100.43/100.79 skol1 ) ) ==> join( converse( composition( top, skol1 ) ), composition(
% 100.43/100.79 skol1, complement( zero ) ) ) }.
% 100.43/100.79 parent0[0]: (480) {G16,W4,D3,L1,V0,M1} P(462,450) { converse( zero ) ==>
% 100.43/100.79 zero }.
% 100.43/100.79 parent1[0; 13]: (218983) {G17,W15,D6,L1,V0,M1} { converse( composition(
% 100.43/100.79 top, skol1 ) ) ==> join( converse( composition( top, skol1 ) ),
% 100.43/100.79 composition( skol1, complement( converse( zero ) ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218990) {G14,W13,D5,L1,V0,M1} { converse( composition( top,
% 100.43/100.79 skol1 ) ) ==> join( converse( composition( top, skol1 ) ), composition(
% 100.43/100.79 skol1, top ) ) }.
% 100.43/100.79 parent0[0]: (451) {G13,W4,D3,L1,V0,M1} P(146,418);d(450);d(58) { complement
% 100.43/100.79 ( zero ) ==> top }.
% 100.43/100.79 parent1[0; 12]: (218989) {G17,W14,D5,L1,V0,M1} { converse( composition(
% 100.43/100.79 top, skol1 ) ) ==> join( converse( composition( top, skol1 ) ),
% 100.43/100.79 composition( skol1, complement( zero ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218991) {G13,W11,D5,L1,V0,M1} { converse( composition( top,
% 100.43/100.79 skol1 ) ) ==> composition( join( converse( skol1 ), skol1 ), top ) }.
% 100.43/100.79 parent0[0]: (282) {G12,W15,D5,L1,V2,M1} P(261,6) { join( converse(
% 100.43/100.79 composition( top, X ) ), composition( Y, top ) ) ==> composition( join(
% 100.43/100.79 converse( X ), Y ), top ) }.
% 100.43/100.79 parent1[0; 5]: (218990) {G14,W13,D5,L1,V0,M1} { converse( composition( top
% 100.43/100.79 , skol1 ) ) ==> join( converse( composition( top, skol1 ) ), composition
% 100.43/100.79 ( skol1, top ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := skol1
% 100.43/100.79 Y := skol1
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218992) {G14,W8,D4,L1,V0,M1} { converse( composition( top, skol1
% 100.43/100.79 ) ) ==> composition( skol1, top ) }.
% 100.43/100.79 parent0[0]: (23767) {G34,W10,D5,L1,V0,M1} P(23766,470);d(451);d(6) {
% 100.43/100.79 composition( join( converse( skol1 ), skol1 ), top ) ==> composition(
% 100.43/100.79 skol1, top ) }.
% 100.43/100.79 parent1[0; 5]: (218991) {G13,W11,D5,L1,V0,M1} { converse( composition( top
% 100.43/100.79 , skol1 ) ) ==> composition( join( converse( skol1 ), skol1 ), top ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (26361) {G35,W8,D4,L1,V0,M1} P(6015,850);d(12649);d(460);d(480
% 100.43/100.79 );d(451);d(282);d(23767) { converse( composition( top, skol1 ) ) ==>
% 100.43/100.79 composition( skol1, top ) }.
% 100.43/100.79 parent0: (218992) {G14,W8,D4,L1,V0,M1} { converse( composition( top, skol1
% 100.43/100.79 ) ) ==> composition( skol1, top ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218995) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) ) ==> join
% 100.43/100.79 ( converse( X ), converse( Y ) ) }.
% 100.43/100.79 parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 100.43/100.79 ) ==> converse( join( X, Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (218997) {G1,W13,D5,L1,V1,M1} { converse( join( X, composition(
% 100.43/100.79 top, skol1 ) ) ) ==> join( converse( X ), composition( skol1, top ) ) }.
% 100.43/100.79 parent0[0]: (26361) {G35,W8,D4,L1,V0,M1} P(6015,850);d(12649);d(460);d(480)
% 100.43/100.79 ;d(451);d(282);d(23767) { converse( composition( top, skol1 ) ) ==>
% 100.43/100.79 composition( skol1, top ) }.
% 100.43/100.79 parent1[0; 10]: (218995) {G0,W10,D4,L1,V2,M1} { converse( join( X, Y ) )
% 100.43/100.79 ==> join( converse( X ), converse( Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := composition( top, skol1 )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (218999) {G1,W13,D5,L1,V1,M1} { join( converse( X ), composition(
% 100.43/100.79 skol1, top ) ) ==> converse( join( X, composition( top, skol1 ) ) ) }.
% 100.43/100.79 parent0[0]: (218997) {G1,W13,D5,L1,V1,M1} { converse( join( X, composition
% 100.43/100.79 ( top, skol1 ) ) ) ==> join( converse( X ), composition( skol1, top ) )
% 100.43/100.79 }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (26439) {G36,W13,D5,L1,V1,M1} P(26361,8) { join( converse( X )
% 100.43/100.79 , composition( skol1, top ) ) ==> converse( join( X, composition( top,
% 100.43/100.79 skol1 ) ) ) }.
% 100.43/100.79 parent0: (218999) {G1,W13,D5,L1,V1,M1} { join( converse( X ), composition
% 100.43/100.79 ( skol1, top ) ) ==> converse( join( X, composition( top, skol1 ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219001) {G27,W11,D5,L1,V2,M1} { meet( complement( Y ), X ) ==>
% 100.43/100.79 meet( complement( meet( X, Y ) ), X ) }.
% 100.43/100.79 parent0[0]: (13102) {G27,W11,D5,L1,V2,M1} P(10586,471);d(471);d(994);d(473)
% 100.43/100.79 { meet( complement( meet( X, Y ) ), X ) ==> meet( complement( Y ), X )
% 100.43/100.79 }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219007) {G19,W12,D5,L1,V2,M1} { meet( complement( complement( X
% 100.43/100.79 ) ), Y ) ==> meet( join( complement( Y ), X ), Y ) }.
% 100.43/100.79 parent0[0]: (995) {G18,W10,D5,L1,V2,M1} P(460,473) { complement( meet( Y,
% 100.43/100.79 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 100.43/100.79 parent1[0; 7]: (219001) {G27,W11,D5,L1,V2,M1} { meet( complement( Y ), X )
% 100.43/100.79 ==> meet( complement( meet( X, Y ) ), X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := complement( X )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219008) {G17,W10,D5,L1,V2,M1} { meet( X, Y ) ==> meet( join(
% 100.43/100.79 complement( Y ), X ), Y ) }.
% 100.43/100.79 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.43/100.79 complement( X ) ) ==> X }.
% 100.43/100.79 parent1[0; 2]: (219007) {G19,W12,D5,L1,V2,M1} { meet( complement(
% 100.43/100.79 complement( X ) ), Y ) ==> meet( join( complement( Y ), X ), Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219009) {G17,W10,D5,L1,V2,M1} { meet( join( complement( Y ), X )
% 100.43/100.79 , Y ) ==> meet( X, Y ) }.
% 100.43/100.79 parent0[0]: (219008) {G17,W10,D5,L1,V2,M1} { meet( X, Y ) ==> meet( join(
% 100.43/100.79 complement( Y ), X ), Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (32126) {G28,W10,D5,L1,V2,M1} P(995,13102);d(460) { meet( join
% 100.43/100.79 ( complement( X ), Y ), X ) ==> meet( Y, X ) }.
% 100.43/100.79 parent0: (219009) {G17,W10,D5,L1,V2,M1} { meet( join( complement( Y ), X )
% 100.43/100.79 , Y ) ==> meet( X, Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219011) {G28,W10,D5,L1,V2,M1} { meet( Y, X ) ==> meet( join(
% 100.43/100.79 complement( X ), Y ), X ) }.
% 100.43/100.79 parent0[0]: (32126) {G28,W10,D5,L1,V2,M1} P(995,13102);d(460) { meet( join
% 100.43/100.79 ( complement( X ), Y ), X ) ==> meet( Y, X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219014) {G26,W12,D5,L1,V2,M1} { meet( meet( X, Y ), Y ) ==> meet
% 100.43/100.79 ( join( X, complement( Y ) ), Y ) }.
% 100.43/100.79 parent0[0]: (10348) {G25,W11,D4,L1,V2,M1} P(10312,756);d(1);d(728) { join(
% 100.43/100.79 complement( Y ), meet( X, Y ) ) ==> join( X, complement( Y ) ) }.
% 100.43/100.79 parent1[0; 7]: (219011) {G28,W10,D5,L1,V2,M1} { meet( Y, X ) ==> meet(
% 100.43/100.79 join( complement( X ), Y ), X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := meet( X, Y )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219015) {G20,W10,D5,L1,V2,M1} { meet( X, Y ) ==> meet( join( X,
% 100.43/100.79 complement( Y ) ), Y ) }.
% 100.43/100.79 parent0[0]: (579) {G19,W9,D4,L1,V2,M1} P(575,43);d(455);d(3) { meet( meet(
% 100.43/100.79 X, Y ), Y ) ==> meet( X, Y ) }.
% 100.43/100.79 parent1[0; 1]: (219014) {G26,W12,D5,L1,V2,M1} { meet( meet( X, Y ), Y )
% 100.43/100.79 ==> meet( join( X, complement( Y ) ), Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219016) {G20,W10,D5,L1,V2,M1} { meet( join( X, complement( Y ) )
% 100.43/100.79 , Y ) ==> meet( X, Y ) }.
% 100.43/100.79 parent0[0]: (219015) {G20,W10,D5,L1,V2,M1} { meet( X, Y ) ==> meet( join(
% 100.43/100.79 X, complement( Y ) ), Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (32157) {G29,W10,D5,L1,V2,M1} P(10348,32126);d(579) { meet(
% 100.43/100.79 join( Y, complement( X ) ), X ) ==> meet( Y, X ) }.
% 100.43/100.79 parent0: (219016) {G20,W10,D5,L1,V2,M1} { meet( join( X, complement( Y ) )
% 100.43/100.79 , Y ) ==> meet( X, Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219018) {G27,W11,D4,L1,V3,M1} { join( Z, meet( Y, X ) ) = join(
% 100.43/100.79 meet( X, Y ), Z ) }.
% 100.43/100.79 parent0[0]: (22589) {G27,W11,D4,L1,V3,M1} P(22367,0) { join( meet( Y, X ),
% 100.43/100.79 Z ) = join( Z, meet( X, Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 Z := Z
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219021) {G28,W14,D6,L1,V3,M1} { join( X, meet( Z, Y ) ) = join(
% 100.43/100.79 meet( Y, join( complement( Y ), Z ) ), X ) }.
% 100.43/100.79 parent0[0]: (32126) {G28,W10,D5,L1,V2,M1} P(995,13102);d(460) { meet( join
% 100.43/100.79 ( complement( X ), Y ), X ) ==> meet( Y, X ) }.
% 100.43/100.79 parent1[0; 3]: (219018) {G27,W11,D4,L1,V3,M1} { join( Z, meet( Y, X ) ) =
% 100.43/100.79 join( meet( X, Y ), Z ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := Z
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := join( complement( Y ), Z )
% 100.43/100.79 Z := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219023) {G28,W14,D6,L1,V3,M1} { join( meet( Z, join( complement(
% 100.43/100.79 Z ), Y ) ), X ) = join( X, meet( Y, Z ) ) }.
% 100.43/100.79 parent0[0]: (219021) {G28,W14,D6,L1,V3,M1} { join( X, meet( Z, Y ) ) =
% 100.43/100.79 join( meet( Y, join( complement( Y ), Z ) ), X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Z
% 100.43/100.79 Z := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (32160) {G29,W14,D6,L1,V3,M1} P(32126,22589) { join( meet( X,
% 100.43/100.79 join( complement( X ), Y ) ), Z ) ==> join( Z, meet( Y, X ) ) }.
% 100.43/100.79 parent0: (219023) {G28,W14,D6,L1,V3,M1} { join( meet( Z, join( complement
% 100.43/100.79 ( Z ), Y ) ), X ) = join( X, meet( Y, Z ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Z
% 100.43/100.79 Y := Y
% 100.43/100.79 Z := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219025) {G27,W11,D4,L1,V3,M1} { join( Z, meet( Y, X ) ) = join(
% 100.43/100.79 meet( X, Y ), Z ) }.
% 100.43/100.79 parent0[0]: (22589) {G27,W11,D4,L1,V3,M1} P(22367,0) { join( meet( Y, X ),
% 100.43/100.79 Z ) = join( Z, meet( X, Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 Z := Z
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219026) {G28,W10,D5,L1,V2,M1} { meet( Y, X ) ==> meet( join(
% 100.43/100.79 complement( X ), Y ), X ) }.
% 100.43/100.79 parent0[0]: (32126) {G28,W10,D5,L1,V2,M1} P(995,13102);d(460) { meet( join
% 100.43/100.79 ( complement( X ), Y ), X ) ==> meet( Y, X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219028) {G28,W14,D5,L1,V3,M1} { meet( meet( X, Y ), Z ) ==> meet
% 100.43/100.79 ( join( meet( Y, X ), complement( Z ) ), Z ) }.
% 100.43/100.79 parent0[0]: (219025) {G27,W11,D4,L1,V3,M1} { join( Z, meet( Y, X ) ) =
% 100.43/100.79 join( meet( X, Y ), Z ) }.
% 100.43/100.79 parent1[0; 7]: (219026) {G28,W10,D5,L1,V2,M1} { meet( Y, X ) ==> meet(
% 100.43/100.79 join( complement( X ), Y ), X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 Z := complement( Z )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := Z
% 100.43/100.79 Y := meet( X, Y )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219029) {G29,W11,D4,L1,V3,M1} { meet( meet( X, Y ), Z ) ==> meet
% 100.43/100.79 ( meet( Y, X ), Z ) }.
% 100.43/100.79 parent0[0]: (32157) {G29,W10,D5,L1,V2,M1} P(10348,32126);d(579) { meet(
% 100.43/100.79 join( Y, complement( X ) ), X ) ==> meet( Y, X ) }.
% 100.43/100.79 parent1[0; 6]: (219028) {G28,W14,D5,L1,V3,M1} { meet( meet( X, Y ), Z )
% 100.43/100.79 ==> meet( join( meet( Y, X ), complement( Z ) ), Z ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Z
% 100.43/100.79 Y := meet( Y, X )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 Z := Z
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (32161) {G30,W11,D4,L1,V3,M1} P(22589,32126);d(32157) { meet(
% 100.43/100.79 meet( Z, Y ), X ) = meet( meet( Y, Z ), X ) }.
% 100.43/100.79 parent0: (219029) {G29,W11,D4,L1,V3,M1} { meet( meet( X, Y ), Z ) ==> meet
% 100.43/100.79 ( meet( Y, X ), Z ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Z
% 100.43/100.79 Y := Y
% 100.43/100.79 Z := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219031) {G25,W11,D4,L1,V2,M1} { meet( X, Y ) ==> join( meet( X, Y
% 100.43/100.79 ), meet( Y, X ) ) }.
% 100.43/100.79 parent0[0]: (10571) {G25,W11,D4,L1,V2,M1} P(1208,10499);d(452) { join( meet
% 100.43/100.79 ( X, Y ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219036) {G26,W17,D6,L1,V2,M1} { meet( X, join( complement( X ),
% 100.43/100.79 Y ) ) ==> join( meet( X, join( complement( X ), Y ) ), meet( Y, X ) ) }.
% 100.43/100.79 parent0[0]: (32126) {G28,W10,D5,L1,V2,M1} P(995,13102);d(460) { meet( join
% 100.43/100.79 ( complement( X ), Y ), X ) ==> meet( Y, X ) }.
% 100.43/100.79 parent1[0; 14]: (219031) {G25,W11,D4,L1,V2,M1} { meet( X, Y ) ==> join(
% 100.43/100.79 meet( X, Y ), meet( Y, X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := join( complement( X ), Y )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219038) {G27,W14,D5,L1,V2,M1} { meet( X, join( complement( X ),
% 100.43/100.79 Y ) ) ==> join( meet( Y, X ), meet( Y, X ) ) }.
% 100.43/100.79 parent0[0]: (32160) {G29,W14,D6,L1,V3,M1} P(32126,22589) { join( meet( X,
% 100.43/100.79 join( complement( X ), Y ) ), Z ) ==> join( Z, meet( Y, X ) ) }.
% 100.43/100.79 parent1[0; 7]: (219036) {G26,W17,D6,L1,V2,M1} { meet( X, join( complement
% 100.43/100.79 ( X ), Y ) ) ==> join( meet( X, join( complement( X ), Y ) ), meet( Y, X
% 100.43/100.79 ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 Z := meet( Y, X )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219039) {G18,W10,D5,L1,V2,M1} { meet( X, join( complement( X ),
% 100.43/100.79 Y ) ) ==> meet( Y, X ) }.
% 100.43/100.79 parent0[0]: (469) {G17,W5,D3,L1,V1,M1} P(460,140) { join( X, X ) ==> X }.
% 100.43/100.79 parent1[0; 7]: (219038) {G27,W14,D5,L1,V2,M1} { meet( X, join( complement
% 100.43/100.79 ( X ), Y ) ) ==> join( meet( Y, X ), meet( Y, X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := meet( Y, X )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (32163) {G30,W10,D5,L1,V2,M1} P(32126,10571);d(32160);d(469)
% 100.43/100.79 { meet( X, join( complement( X ), Y ) ) ==> meet( Y, X ) }.
% 100.43/100.79 parent0: (219039) {G18,W10,D5,L1,V2,M1} { meet( X, join( complement( X ),
% 100.43/100.79 Y ) ) ==> meet( Y, X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219042) {G29,W10,D5,L1,V2,M1} { meet( X, Y ) ==> meet( join( X,
% 100.43/100.79 complement( Y ) ), Y ) }.
% 100.43/100.79 parent0[0]: (32157) {G29,W10,D5,L1,V2,M1} P(10348,32126);d(579) { meet(
% 100.43/100.79 join( Y, complement( X ) ), X ) ==> meet( Y, X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219045) {G23,W15,D6,L1,V3,M1} { meet( join( X, meet( complement
% 100.43/100.79 ( Y ), Z ) ), Y ) ==> meet( join( complement( Y ), X ), Y ) }.
% 100.43/100.79 parent0[0]: (762) {G22,W11,D5,L1,V3,M1} P(736,26) { join( join( Z, meet( X
% 100.43/100.79 , Y ) ), X ) ==> join( X, Z ) }.
% 100.43/100.79 parent1[0; 10]: (219042) {G29,W10,D5,L1,V2,M1} { meet( X, Y ) ==> meet(
% 100.43/100.79 join( X, complement( Y ) ), Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := complement( Y )
% 100.43/100.79 Y := Z
% 100.43/100.79 Z := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := join( X, meet( complement( Y ), Z ) )
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219046) {G24,W12,D6,L1,V3,M1} { meet( join( X, meet( complement
% 100.43/100.79 ( Y ), Z ) ), Y ) ==> meet( X, Y ) }.
% 100.43/100.79 parent0[0]: (32126) {G28,W10,D5,L1,V2,M1} P(995,13102);d(460) { meet( join
% 100.43/100.79 ( complement( X ), Y ), X ) ==> meet( Y, X ) }.
% 100.43/100.79 parent1[0; 9]: (219045) {G23,W15,D6,L1,V3,M1} { meet( join( X, meet(
% 100.43/100.79 complement( Y ), Z ) ), Y ) ==> meet( join( complement( Y ), X ), Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 Z := Z
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (32188) {G30,W12,D6,L1,V3,M1} P(762,32157);d(32126) { meet(
% 100.43/100.79 join( X, meet( complement( Y ), Z ) ), Y ) ==> meet( X, Y ) }.
% 100.43/100.79 parent0: (219046) {G24,W12,D6,L1,V3,M1} { meet( join( X, meet( complement
% 100.43/100.79 ( Y ), Z ) ), Y ) ==> meet( X, Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 Z := Z
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219049) {G25,W11,D4,L1,V2,M1} { meet( X, Y ) ==> join( meet( X, Y
% 100.43/100.79 ), meet( Y, X ) ) }.
% 100.43/100.79 parent0[0]: (10571) {G25,W11,D4,L1,V2,M1} P(1208,10499);d(452) { join( meet
% 100.43/100.79 ( X, Y ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219053) {G26,W17,D6,L1,V2,M1} { meet( X, join( Y, complement( X
% 100.43/100.79 ) ) ) ==> join( meet( X, join( Y, complement( X ) ) ), meet( Y, X ) )
% 100.43/100.79 }.
% 100.43/100.79 parent0[0]: (32157) {G29,W10,D5,L1,V2,M1} P(10348,32126);d(579) { meet(
% 100.43/100.79 join( Y, complement( X ) ), X ) ==> meet( Y, X ) }.
% 100.43/100.79 parent1[0; 14]: (219049) {G25,W11,D4,L1,V2,M1} { meet( X, Y ) ==> join(
% 100.43/100.79 meet( X, Y ), meet( Y, X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := join( Y, complement( X ) )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219055) {G27,W10,D5,L1,V2,M1} { meet( X, join( Y, complement( X
% 100.43/100.79 ) ) ) ==> meet( Y, X ) }.
% 100.43/100.79 parent0[0]: (13436) {G30,W14,D6,L1,V2,M1} P(10561,12960);d(460) { join(
% 100.43/100.79 meet( X, join( Y, complement( X ) ) ), meet( Y, X ) ) ==> meet( Y, X )
% 100.43/100.79 }.
% 100.43/100.79 parent1[0; 7]: (219053) {G26,W17,D6,L1,V2,M1} { meet( X, join( Y,
% 100.43/100.79 complement( X ) ) ) ==> join( meet( X, join( Y, complement( X ) ) ), meet
% 100.43/100.79 ( Y, X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (32201) {G31,W10,D5,L1,V2,M1} P(32157,10571);d(13436) { meet(
% 100.43/100.79 Y, join( X, complement( Y ) ) ) ==> meet( X, Y ) }.
% 100.43/100.79 parent0: (219055) {G27,W10,D5,L1,V2,M1} { meet( X, join( Y, complement( X
% 100.43/100.79 ) ) ) ==> meet( Y, X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219057) {G29,W10,D5,L1,V2,M1} { meet( X, Y ) ==> meet( join( X,
% 100.43/100.79 complement( Y ) ), Y ) }.
% 100.43/100.79 parent0[0]: (32157) {G29,W10,D5,L1,V2,M1} P(10348,32126);d(579) { meet(
% 100.43/100.79 join( Y, complement( X ) ), X ) ==> meet( Y, X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219059) {G3,W14,D5,L1,V3,M1} { meet( join( X, Y ), Z ) ==> meet
% 100.43/100.79 ( join( join( Y, X ), complement( Z ) ), Z ) }.
% 100.43/100.79 parent0[0]: (268) {G2,W11,D4,L1,V3,M1} P(27,26) { join( join( Z, X ), Y ) =
% 100.43/100.79 join( join( X, Z ), Y ) }.
% 100.43/100.79 parent1[0; 7]: (219057) {G29,W10,D5,L1,V2,M1} { meet( X, Y ) ==> meet(
% 100.43/100.79 join( X, complement( Y ) ), Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := complement( Z )
% 100.43/100.79 Z := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := join( X, Y )
% 100.43/100.79 Y := Z
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219061) {G4,W11,D4,L1,V3,M1} { meet( join( X, Y ), Z ) ==> meet
% 100.43/100.79 ( join( Y, X ), Z ) }.
% 100.43/100.79 parent0[0]: (32157) {G29,W10,D5,L1,V2,M1} P(10348,32126);d(579) { meet(
% 100.43/100.79 join( Y, complement( X ) ), X ) ==> meet( Y, X ) }.
% 100.43/100.79 parent1[0; 6]: (219059) {G3,W14,D5,L1,V3,M1} { meet( join( X, Y ), Z ) ==>
% 100.43/100.79 meet( join( join( Y, X ), complement( Z ) ), Z ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Z
% 100.43/100.79 Y := join( Y, X )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 Z := Z
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (32211) {G30,W11,D4,L1,V3,M1} P(268,32157);d(32157) { meet(
% 100.43/100.79 join( Y, X ), Z ) = meet( join( X, Y ), Z ) }.
% 100.43/100.79 parent0: (219061) {G4,W11,D4,L1,V3,M1} { meet( join( X, Y ), Z ) ==> meet
% 100.43/100.79 ( join( Y, X ), Z ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 Z := Z
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219063) {G31,W10,D5,L1,V2,M1} { meet( Y, X ) ==> meet( X, join( Y
% 100.43/100.79 , complement( X ) ) ) }.
% 100.43/100.79 parent0[0]: (32201) {G31,W10,D5,L1,V2,M1} P(32157,10571);d(13436) { meet( Y
% 100.43/100.79 , join( X, complement( Y ) ) ) ==> meet( X, Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219064) {G17,W11,D4,L1,V2,M1} { meet( X, complement( Y ) ) ==>
% 100.43/100.79 meet( complement( Y ), join( X, Y ) ) }.
% 100.43/100.79 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.43/100.79 complement( X ) ) ==> X }.
% 100.43/100.79 parent1[0; 10]: (219063) {G31,W10,D5,L1,V2,M1} { meet( Y, X ) ==> meet( X
% 100.43/100.79 , join( Y, complement( X ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := complement( Y )
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219065) {G17,W11,D4,L1,V2,M1} { meet( complement( Y ), join( X, Y
% 100.43/100.79 ) ) ==> meet( X, complement( Y ) ) }.
% 100.43/100.79 parent0[0]: (219064) {G17,W11,D4,L1,V2,M1} { meet( X, complement( Y ) )
% 100.43/100.79 ==> meet( complement( Y ), join( X, Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (32220) {G32,W11,D4,L1,V2,M1} P(460,32201) { meet( complement
% 100.43/100.79 ( X ), join( Y, X ) ) ==> meet( Y, complement( X ) ) }.
% 100.43/100.79 parent0: (219065) {G17,W11,D4,L1,V2,M1} { meet( complement( Y ), join( X,
% 100.43/100.79 Y ) ) ==> meet( X, complement( Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219067) {G30,W10,D5,L1,V2,M1} { meet( Y, X ) ==> meet( X, join(
% 100.43/100.79 complement( X ), Y ) ) }.
% 100.43/100.79 parent0[0]: (32163) {G30,W10,D5,L1,V2,M1} P(32126,10571);d(32160);d(469) {
% 100.43/100.79 meet( X, join( complement( X ), Y ) ) ==> meet( Y, X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219068) {G17,W11,D4,L1,V2,M1} { meet( X, complement( Y ) ) ==>
% 100.43/100.79 meet( complement( Y ), join( Y, X ) ) }.
% 100.43/100.79 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.43/100.79 complement( X ) ) ==> X }.
% 100.43/100.79 parent1[0; 9]: (219067) {G30,W10,D5,L1,V2,M1} { meet( Y, X ) ==> meet( X,
% 100.43/100.79 join( complement( X ), Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := complement( Y )
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219069) {G17,W11,D4,L1,V2,M1} { meet( complement( Y ), join( Y, X
% 100.43/100.79 ) ) ==> meet( X, complement( Y ) ) }.
% 100.43/100.79 parent0[0]: (219068) {G17,W11,D4,L1,V2,M1} { meet( X, complement( Y ) )
% 100.43/100.79 ==> meet( complement( Y ), join( Y, X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (32223) {G31,W11,D4,L1,V2,M1} P(460,32163) { meet( complement
% 100.43/100.79 ( X ), join( X, Y ) ) ==> meet( Y, complement( X ) ) }.
% 100.43/100.79 parent0: (219069) {G17,W11,D4,L1,V2,M1} { meet( complement( Y ), join( Y,
% 100.43/100.79 X ) ) ==> meet( X, complement( Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219070) {G2,W11,D4,L1,V3,M1} { meet( join( Y, X ), Z ) = meet( Z
% 100.43/100.79 , join( X, Y ) ) }.
% 100.43/100.79 parent0[0]: (32211) {G30,W11,D4,L1,V3,M1} P(268,32157);d(32157) { meet(
% 100.43/100.79 join( Y, X ), Z ) = meet( join( X, Y ), Z ) }.
% 100.43/100.79 parent1[0; 1]: (56) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet(
% 100.43/100.79 X, Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 Z := Z
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := Z
% 100.43/100.79 Y := join( X, Y )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (32247) {G31,W11,D4,L1,V3,M1} P(32211,56) { meet( join( Y, X )
% 100.43/100.79 , Z ) = meet( Z, join( X, Y ) ) }.
% 100.43/100.79 parent0: (219070) {G2,W11,D4,L1,V3,M1} { meet( join( Y, X ), Z ) = meet( Z
% 100.43/100.79 , join( X, Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 Z := Z
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219075) {G31,W11,D4,L1,V3,M1} { meet( Z, join( Y, X ) ) = meet(
% 100.43/100.79 join( X, Y ), Z ) }.
% 100.43/100.79 parent0[0]: (32247) {G31,W11,D4,L1,V3,M1} P(32211,56) { meet( join( Y, X )
% 100.43/100.79 , Z ) = meet( Z, join( X, Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 Z := Z
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219088) {G26,W15,D5,L1,V3,M1} { meet( X, join( meet( Y, Z ),
% 100.43/100.79 meet( Z, Y ) ) ) = meet( meet( Z, Y ), X ) }.
% 100.43/100.79 parent0[0]: (10571) {G25,W11,D4,L1,V2,M1} P(1208,10499);d(452) { join( meet
% 100.43/100.79 ( X, Y ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 100.43/100.79 parent1[0; 11]: (219075) {G31,W11,D4,L1,V3,M1} { meet( Z, join( Y, X ) ) =
% 100.43/100.79 meet( join( X, Y ), Z ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Z
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := meet( Z, Y )
% 100.43/100.79 Y := meet( Y, Z )
% 100.43/100.79 Z := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219090) {G26,W11,D4,L1,V3,M1} { meet( X, meet( Y, Z ) ) = meet(
% 100.43/100.79 meet( Z, Y ), X ) }.
% 100.43/100.79 parent0[0]: (10571) {G25,W11,D4,L1,V2,M1} P(1208,10499);d(452) { join( meet
% 100.43/100.79 ( X, Y ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 100.43/100.79 parent1[0; 3]: (219088) {G26,W15,D5,L1,V3,M1} { meet( X, join( meet( Y, Z
% 100.43/100.79 ), meet( Z, Y ) ) ) = meet( meet( Z, Y ), X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := Z
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 Z := Z
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219091) {G26,W11,D4,L1,V3,M1} { meet( meet( Z, Y ), X ) = meet( X
% 100.43/100.79 , meet( Y, Z ) ) }.
% 100.43/100.79 parent0[0]: (219090) {G26,W11,D4,L1,V3,M1} { meet( X, meet( Y, Z ) ) =
% 100.43/100.79 meet( meet( Z, Y ), X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 Z := Z
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (32268) {G32,W11,D4,L1,V3,M1} P(10571,32247);d(10571) { meet(
% 100.43/100.79 meet( X, Y ), Z ) = meet( Z, meet( Y, X ) ) }.
% 100.43/100.79 parent0: (219091) {G26,W11,D4,L1,V3,M1} { meet( meet( Z, Y ), X ) = meet(
% 100.43/100.79 X, meet( Y, Z ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Z
% 100.43/100.79 Y := Y
% 100.43/100.79 Z := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219092) {G32,W11,D4,L1,V3,M1} { meet( Z, meet( Y, X ) ) = meet(
% 100.43/100.79 meet( X, Y ), Z ) }.
% 100.43/100.79 parent0[0]: (32268) {G32,W11,D4,L1,V3,M1} P(10571,32247);d(10571) { meet(
% 100.43/100.79 meet( X, Y ), Z ) = meet( Z, meet( Y, X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 Z := Z
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219096) {G2,W11,D4,L1,V3,M1} { meet( X, meet( Y, Z ) ) = meet( X
% 100.43/100.79 , meet( Z, Y ) ) }.
% 100.43/100.79 parent0[0]: (56) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X,
% 100.43/100.79 Y ) }.
% 100.43/100.79 parent1[0; 6]: (219092) {G32,W11,D4,L1,V3,M1} { meet( Z, meet( Y, X ) ) =
% 100.43/100.79 meet( meet( X, Y ), Z ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := meet( Z, Y )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := Z
% 100.43/100.79 Y := Y
% 100.43/100.79 Z := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (32324) {G33,W11,D4,L1,V3,M1} P(32268,56) { meet( Z, meet( Y,
% 100.43/100.79 X ) ) = meet( Z, meet( X, Y ) ) }.
% 100.43/100.79 parent0: (219096) {G2,W11,D4,L1,V3,M1} { meet( X, meet( Y, Z ) ) = meet( X
% 100.43/100.79 , meet( Z, Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Z
% 100.43/100.79 Y := Y
% 100.43/100.79 Z := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219103) {G31,W11,D4,L1,V2,M1} { meet( Y, complement( X ) ) ==>
% 100.43/100.79 meet( complement( X ), join( X, Y ) ) }.
% 100.43/100.79 parent0[0]: (32223) {G31,W11,D4,L1,V2,M1} P(460,32163) { meet( complement(
% 100.43/100.79 X ), join( X, Y ) ) ==> meet( Y, complement( X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219107) {G27,W17,D6,L1,V2,M1} { meet( X, complement( meet(
% 100.43/100.79 complement( X ), Y ) ) ) ==> meet( complement( meet( complement( X ), Y )
% 100.43/100.79 ), join( Y, X ) ) }.
% 100.43/100.79 parent0[0]: (10586) {G26,W10,D5,L1,V2,M1} P(23,10499);d(471);d(10531);d(716
% 100.43/100.79 ) { join( meet( complement( X ), Y ), X ) ==> join( Y, X ) }.
% 100.43/100.79 parent1[0; 14]: (219103) {G31,W11,D4,L1,V2,M1} { meet( Y, complement( X )
% 100.43/100.79 ) ==> meet( complement( X ), join( X, Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := meet( complement( X ), Y )
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219109) {G19,W16,D6,L1,V2,M1} { meet( X, complement( meet(
% 100.43/100.79 complement( X ), Y ) ) ) ==> meet( join( X, complement( Y ) ), join( Y, X
% 100.43/100.79 ) ) }.
% 100.43/100.79 parent0[0]: (994) {G18,W10,D5,L1,V2,M1} P(460,473) { complement( meet(
% 100.43/100.79 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 100.43/100.79 parent1[0; 9]: (219107) {G27,W17,D6,L1,V2,M1} { meet( X, complement( meet
% 100.43/100.79 ( complement( X ), Y ) ) ) ==> meet( complement( meet( complement( X ), Y
% 100.43/100.79 ) ), join( Y, X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219110) {G19,W15,D5,L1,V2,M1} { meet( X, join( X, complement( Y
% 100.43/100.79 ) ) ) ==> meet( join( X, complement( Y ) ), join( Y, X ) ) }.
% 100.43/100.79 parent0[0]: (994) {G18,W10,D5,L1,V2,M1} P(460,473) { complement( meet(
% 100.43/100.79 complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 100.43/100.79 parent1[0; 3]: (219109) {G19,W16,D6,L1,V2,M1} { meet( X, complement( meet
% 100.43/100.79 ( complement( X ), Y ) ) ) ==> meet( join( X, complement( Y ) ), join( Y
% 100.43/100.79 , X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219111) {G20,W10,D5,L1,V2,M1} { X ==> meet( join( X, complement
% 100.43/100.79 ( Y ) ), join( Y, X ) ) }.
% 100.43/100.79 parent0[0]: (1028) {G20,W7,D4,L1,V2,M1} P(460,1005) { meet( Y, join( Y, X )
% 100.43/100.79 ) ==> Y }.
% 100.43/100.79 parent1[0; 1]: (219110) {G19,W15,D5,L1,V2,M1} { meet( X, join( X,
% 100.43/100.79 complement( Y ) ) ) ==> meet( join( X, complement( Y ) ), join( Y, X ) )
% 100.43/100.79 }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := complement( Y )
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219112) {G20,W10,D5,L1,V2,M1} { meet( join( X, complement( Y ) )
% 100.43/100.79 , join( Y, X ) ) ==> X }.
% 100.43/100.79 parent0[0]: (219111) {G20,W10,D5,L1,V2,M1} { X ==> meet( join( X,
% 100.43/100.79 complement( Y ) ), join( Y, X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (32504) {G32,W10,D5,L1,V2,M1} P(10586,32223);d(994);d(1028) {
% 100.43/100.79 meet( join( X, complement( Y ) ), join( Y, X ) ) ==> X }.
% 100.43/100.79 parent0: (219112) {G20,W10,D5,L1,V2,M1} { meet( join( X, complement( Y ) )
% 100.43/100.79 , join( Y, X ) ) ==> X }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219114) {G31,W11,D4,L1,V2,M1} { meet( Y, complement( X ) ) ==>
% 100.43/100.79 meet( complement( X ), join( X, Y ) ) }.
% 100.43/100.79 parent0[0]: (32223) {G31,W11,D4,L1,V2,M1} P(460,32163) { meet( complement(
% 100.43/100.79 X ), join( X, Y ) ) ==> meet( Y, complement( X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219117) {G26,W17,D6,L1,V2,M1} { meet( X, complement( meet( Y,
% 100.43/100.79 complement( X ) ) ) ) ==> meet( complement( meet( Y, complement( X ) ) )
% 100.43/100.79 , join( Y, X ) ) }.
% 100.43/100.79 parent0[0]: (10556) {G25,W10,D5,L1,V2,M1} P(203,10499);d(472);d(452);d(730)
% 100.43/100.79 { join( meet( X, complement( Y ) ), Y ) ==> join( X, Y ) }.
% 100.43/100.79 parent1[0; 14]: (219114) {G31,W11,D4,L1,V2,M1} { meet( Y, complement( X )
% 100.43/100.79 ) ==> meet( complement( X ), join( X, Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := meet( Y, complement( X ) )
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219119) {G19,W16,D6,L1,V2,M1} { meet( X, complement( meet( Y,
% 100.43/100.79 complement( X ) ) ) ) ==> meet( join( complement( Y ), X ), join( Y, X )
% 100.43/100.79 ) }.
% 100.43/100.79 parent0[0]: (995) {G18,W10,D5,L1,V2,M1} P(460,473) { complement( meet( Y,
% 100.43/100.79 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 100.43/100.79 parent1[0; 9]: (219117) {G26,W17,D6,L1,V2,M1} { meet( X, complement( meet
% 100.43/100.79 ( Y, complement( X ) ) ) ) ==> meet( complement( meet( Y, complement( X )
% 100.43/100.79 ) ), join( Y, X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219120) {G19,W15,D5,L1,V2,M1} { meet( X, join( complement( Y ),
% 100.43/100.79 X ) ) ==> meet( join( complement( Y ), X ), join( Y, X ) ) }.
% 100.43/100.79 parent0[0]: (995) {G18,W10,D5,L1,V2,M1} P(460,473) { complement( meet( Y,
% 100.43/100.79 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 100.43/100.79 parent1[0; 3]: (219119) {G19,W16,D6,L1,V2,M1} { meet( X, complement( meet
% 100.43/100.79 ( Y, complement( X ) ) ) ) ==> meet( join( complement( Y ), X ), join( Y
% 100.43/100.79 , X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219121) {G20,W10,D5,L1,V2,M1} { X ==> meet( join( complement( Y
% 100.43/100.79 ), X ), join( Y, X ) ) }.
% 100.43/100.79 parent0[0]: (1047) {G21,W7,D4,L1,V2,M1} P(0,1028) { meet( X, join( Y, X ) )
% 100.43/100.79 ==> X }.
% 100.43/100.79 parent1[0; 1]: (219120) {G19,W15,D5,L1,V2,M1} { meet( X, join( complement
% 100.43/100.79 ( Y ), X ) ) ==> meet( join( complement( Y ), X ), join( Y, X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := complement( Y )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219122) {G20,W10,D5,L1,V2,M1} { meet( join( complement( Y ), X )
% 100.43/100.79 , join( Y, X ) ) ==> X }.
% 100.43/100.79 parent0[0]: (219121) {G20,W10,D5,L1,V2,M1} { X ==> meet( join( complement
% 100.43/100.79 ( Y ), X ), join( Y, X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (32505) {G32,W10,D5,L1,V2,M1} P(10556,32223);d(995);d(1047) {
% 100.43/100.79 meet( join( complement( X ), Y ), join( X, Y ) ) ==> Y }.
% 100.43/100.79 parent0: (219122) {G20,W10,D5,L1,V2,M1} { meet( join( complement( Y ), X )
% 100.43/100.79 , join( Y, X ) ) ==> X }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219124) {G31,W11,D4,L1,V2,M1} { meet( Y, complement( X ) ) ==>
% 100.43/100.79 meet( complement( X ), join( X, Y ) ) }.
% 100.43/100.79 parent0[0]: (32223) {G31,W11,D4,L1,V2,M1} P(460,32163) { meet( complement(
% 100.43/100.79 X ), join( X, Y ) ) ==> meet( Y, complement( X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219125) {G32,W14,D5,L1,V1,M1} { meet( composition( X, complement
% 100.43/100.79 ( one ) ), complement( X ) ) ==> meet( complement( X ), composition( X,
% 100.43/100.79 top ) ) }.
% 100.43/100.79 parent0[0]: (8031) {G32,W10,D5,L1,V1,M1} P(7978,0) { join( X, composition(
% 100.43/100.79 X, complement( one ) ) ) ==> composition( X, top ) }.
% 100.43/100.79 parent1[0; 11]: (219124) {G31,W11,D4,L1,V2,M1} { meet( Y, complement( X )
% 100.43/100.79 ) ==> meet( complement( X ), join( X, Y ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := composition( X, complement( one ) )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (32513) {G33,W14,D5,L1,V1,M1} P(8031,32223) { meet(
% 100.43/100.79 composition( X, complement( one ) ), complement( X ) ) ==> meet(
% 100.43/100.79 complement( X ), composition( X, top ) ) }.
% 100.43/100.79 parent0: (219125) {G32,W14,D5,L1,V1,M1} { meet( composition( X, complement
% 100.43/100.79 ( one ) ), complement( X ) ) ==> meet( complement( X ), composition( X,
% 100.43/100.79 top ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219129) {G31,W14,D6,L1,V3,M1} { meet( meet( join( X, Y ), join(
% 100.43/100.79 Y, complement( X ) ) ), Z ) = meet( Y, Z ) }.
% 100.43/100.79 parent0[0]: (32504) {G32,W10,D5,L1,V2,M1} P(10586,32223);d(994);d(1028) {
% 100.43/100.79 meet( join( X, complement( Y ) ), join( Y, X ) ) ==> X }.
% 100.43/100.79 parent1[0; 12]: (32161) {G30,W11,D4,L1,V3,M1} P(22589,32126);d(32157) {
% 100.43/100.79 meet( meet( Z, Y ), X ) = meet( meet( Y, Z ), X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := Z
% 100.43/100.79 Y := join( Y, complement( X ) )
% 100.43/100.79 Z := join( X, Y )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (32553) {G33,W14,D6,L1,V3,M1} P(32504,32161) { meet( meet(
% 100.43/100.79 join( Y, X ), join( X, complement( Y ) ) ), Z ) ==> meet( X, Z ) }.
% 100.43/100.79 parent0: (219129) {G31,W14,D6,L1,V3,M1} { meet( meet( join( X, Y ), join(
% 100.43/100.79 Y, complement( X ) ) ), Z ) = meet( Y, Z ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 Z := Z
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219131) {G20,W11,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X, Y
% 100.43/100.79 ), meet( Y, X ) ) }.
% 100.43/100.79 parent0[0]: (1493) {G20,W11,D4,L1,V2,M1} P(1209,1009);d(455);d(460) { meet
% 100.43/100.79 ( meet( X, Y ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219136) {G21,W19,D6,L1,V2,M1} { meet( join( X, Y ), join( Y,
% 100.43/100.79 complement( X ) ) ) ==> meet( meet( join( X, Y ), join( Y, complement( X
% 100.43/100.79 ) ) ), Y ) }.
% 100.43/100.79 parent0[0]: (32504) {G32,W10,D5,L1,V2,M1} P(10586,32223);d(994);d(1028) {
% 100.43/100.79 meet( join( X, complement( Y ) ), join( Y, X ) ) ==> X }.
% 100.43/100.79 parent1[0; 18]: (219131) {G20,W11,D4,L1,V2,M1} { meet( X, Y ) ==> meet(
% 100.43/100.79 meet( X, Y ), meet( Y, X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := join( X, Y )
% 100.43/100.79 Y := join( Y, complement( X ) )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219138) {G22,W12,D5,L1,V2,M1} { meet( join( X, Y ), join( Y,
% 100.43/100.79 complement( X ) ) ) ==> meet( Y, Y ) }.
% 100.43/100.79 parent0[0]: (32553) {G33,W14,D6,L1,V3,M1} P(32504,32161) { meet( meet( join
% 100.43/100.79 ( Y, X ), join( X, complement( Y ) ) ), Z ) ==> meet( X, Z ) }.
% 100.43/100.79 parent1[0; 9]: (219136) {G21,W19,D6,L1,V2,M1} { meet( join( X, Y ), join(
% 100.43/100.79 Y, complement( X ) ) ) ==> meet( meet( join( X, Y ), join( Y, complement
% 100.43/100.79 ( X ) ) ), Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 Z := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219139) {G18,W10,D5,L1,V2,M1} { meet( join( X, Y ), join( Y,
% 100.43/100.79 complement( X ) ) ) ==> Y }.
% 100.43/100.79 parent0[0]: (468) {G17,W5,D3,L1,V1,M1} P(460,146) { meet( X, X ) ==> X }.
% 100.43/100.79 parent1[0; 9]: (219138) {G22,W12,D5,L1,V2,M1} { meet( join( X, Y ), join(
% 100.43/100.79 Y, complement( X ) ) ) ==> meet( Y, Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (32559) {G34,W10,D5,L1,V2,M1} P(32504,1493);d(32553);d(468) {
% 100.43/100.79 meet( join( Y, X ), join( X, complement( Y ) ) ) ==> X }.
% 100.43/100.79 parent0: (219139) {G18,W10,D5,L1,V2,M1} { meet( join( X, Y ), join( Y,
% 100.43/100.79 complement( X ) ) ) ==> Y }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := Y
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219142) {G32,W10,D5,L1,V2,M1} { X ==> meet( join( X, complement(
% 100.43/100.79 Y ) ), join( Y, X ) ) }.
% 100.43/100.79 parent0[0]: (32504) {G32,W10,D5,L1,V2,M1} P(10586,32223);d(994);d(1028) {
% 100.43/100.79 meet( join( X, complement( Y ) ), join( Y, X ) ) ==> X }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219147) {G30,W16,D6,L1,V0,M1} { composition( skol1, complement(
% 100.43/100.79 one ) ) ==> meet( join( composition( skol1, complement( one ) ),
% 100.43/100.79 complement( complement( skol1 ) ) ), complement( skol1 ) ) }.
% 100.43/100.79 parent0[0]: (3504) {G29,W10,D5,L1,V0,M1} P(2552,1004);d(995) { join(
% 100.43/100.79 complement( skol1 ), composition( skol1, complement( one ) ) ) ==>
% 100.43/100.79 complement( skol1 ) }.
% 100.43/100.79 parent1[0; 14]: (219142) {G32,W10,D5,L1,V2,M1} { X ==> meet( join( X,
% 100.43/100.79 complement( Y ) ), join( Y, X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := composition( skol1, complement( one ) )
% 100.43/100.79 Y := complement( skol1 )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219148) {G20,W16,D8,L1,V0,M1} { composition( skol1, complement(
% 100.43/100.79 one ) ) ==> complement( join( meet( complement( composition( skol1,
% 100.43/100.79 complement( one ) ) ), complement( skol1 ) ), skol1 ) ) }.
% 100.43/100.79 parent0[0]: (3573) {G19,W15,D6,L1,V3,M1} P(994,1795) { meet( join( X,
% 100.43/100.79 complement( Y ) ), complement( Z ) ) ==> complement( join( meet(
% 100.43/100.79 complement( X ), Y ), Z ) ) }.
% 100.43/100.79 parent1[0; 5]: (219147) {G30,W16,D6,L1,V0,M1} { composition( skol1,
% 100.43/100.79 complement( one ) ) ==> meet( join( composition( skol1, complement( one )
% 100.43/100.79 ), complement( complement( skol1 ) ) ), complement( skol1 ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := composition( skol1, complement( one ) )
% 100.43/100.79 Y := complement( skol1 )
% 100.43/100.79 Z := skol1
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219149) {G21,W13,D7,L1,V0,M1} { composition( skol1, complement(
% 100.43/100.79 one ) ) ==> complement( join( complement( composition( skol1, complement
% 100.43/100.79 ( one ) ) ), skol1 ) ) }.
% 100.43/100.79 parent0[0]: (10556) {G25,W10,D5,L1,V2,M1} P(203,10499);d(472);d(452);d(730)
% 100.43/100.79 { join( meet( X, complement( Y ) ), Y ) ==> join( X, Y ) }.
% 100.43/100.79 parent1[0; 6]: (219148) {G20,W16,D8,L1,V0,M1} { composition( skol1,
% 100.43/100.79 complement( one ) ) ==> complement( join( meet( complement( composition(
% 100.43/100.79 skol1, complement( one ) ) ), complement( skol1 ) ), skol1 ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := complement( composition( skol1, complement( one ) ) )
% 100.43/100.79 Y := skol1
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219150) {G18,W12,D5,L1,V0,M1} { composition( skol1, complement(
% 100.43/100.79 one ) ) ==> meet( composition( skol1, complement( one ) ), complement(
% 100.43/100.79 skol1 ) ) }.
% 100.43/100.79 parent0[0]: (472) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join(
% 100.43/100.79 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 100.43/100.79 parent1[0; 5]: (219149) {G21,W13,D7,L1,V0,M1} { composition( skol1,
% 100.43/100.79 complement( one ) ) ==> complement( join( complement( composition( skol1
% 100.43/100.79 , complement( one ) ) ), skol1 ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := skol1
% 100.43/100.79 Y := composition( skol1, complement( one ) )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219151) {G19,W11,D4,L1,V0,M1} { composition( skol1, complement(
% 100.43/100.79 one ) ) ==> meet( complement( skol1 ), composition( skol1, top ) ) }.
% 100.43/100.79 parent0[0]: (32513) {G33,W14,D5,L1,V1,M1} P(8031,32223) { meet( composition
% 100.43/100.79 ( X, complement( one ) ), complement( X ) ) ==> meet( complement( X ),
% 100.43/100.79 composition( X, top ) ) }.
% 100.43/100.79 parent1[0; 5]: (219150) {G18,W12,D5,L1,V0,M1} { composition( skol1,
% 100.43/100.79 complement( one ) ) ==> meet( composition( skol1, complement( one ) ),
% 100.43/100.79 complement( skol1 ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := skol1
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219152) {G19,W11,D4,L1,V0,M1} { meet( complement( skol1 ),
% 100.43/100.79 composition( skol1, top ) ) ==> composition( skol1, complement( one ) )
% 100.43/100.79 }.
% 100.43/100.79 parent0[0]: (219151) {G19,W11,D4,L1,V0,M1} { composition( skol1,
% 100.43/100.79 complement( one ) ) ==> meet( complement( skol1 ), composition( skol1,
% 100.43/100.79 top ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (32571) {G34,W11,D4,L1,V0,M1} P(3504,32504);d(3573);d(10556);d
% 100.43/100.79 (472);d(32513) { meet( complement( skol1 ), composition( skol1, top ) )
% 100.43/100.79 ==> composition( skol1, complement( one ) ) }.
% 100.43/100.79 parent0: (219152) {G19,W11,D4,L1,V0,M1} { meet( complement( skol1 ),
% 100.43/100.79 composition( skol1, top ) ) ==> composition( skol1, complement( one ) )
% 100.43/100.79 }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219154) {G32,W11,D4,L1,V2,M1} { meet( Y, complement( X ) ) ==>
% 100.43/100.79 meet( complement( X ), join( Y, X ) ) }.
% 100.43/100.79 parent0[0]: (32220) {G32,W11,D4,L1,V2,M1} P(460,32201) { meet( complement(
% 100.43/100.79 X ), join( Y, X ) ) ==> meet( Y, complement( X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219156) {G2,W13,D4,L1,V1,M1} { meet( join( X, skol1 ),
% 100.43/100.79 complement( one ) ) ==> meet( complement( one ), join( X, one ) ) }.
% 100.43/100.79 parent0[0]: (29) {G1,W9,D4,L1,V1,M1} P(13,1) { join( join( X, skol1 ), one
% 100.43/100.79 ) ==> join( X, one ) }.
% 100.43/100.79 parent1[0; 10]: (219154) {G32,W11,D4,L1,V2,M1} { meet( Y, complement( X )
% 100.43/100.79 ) ==> meet( complement( X ), join( Y, X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := one
% 100.43/100.79 Y := join( X, skol1 )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219157) {G3,W11,D4,L1,V1,M1} { meet( join( X, skol1 ),
% 100.43/100.79 complement( one ) ) ==> meet( X, complement( one ) ) }.
% 100.43/100.79 parent0[0]: (32220) {G32,W11,D4,L1,V2,M1} P(460,32201) { meet( complement(
% 100.43/100.79 X ), join( Y, X ) ) ==> meet( Y, complement( X ) ) }.
% 100.43/100.79 parent1[0; 7]: (219156) {G2,W13,D4,L1,V1,M1} { meet( join( X, skol1 ),
% 100.43/100.79 complement( one ) ) ==> meet( complement( one ), join( X, one ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := one
% 100.43/100.79 Y := X
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (32784) {G33,W11,D4,L1,V1,M1} P(29,32220);d(32220) { meet(
% 100.43/100.79 join( X, skol1 ), complement( one ) ) ==> meet( X, complement( one ) )
% 100.43/100.79 }.
% 100.43/100.79 parent0: (219157) {G3,W11,D4,L1,V1,M1} { meet( join( X, skol1 ),
% 100.43/100.79 complement( one ) ) ==> meet( X, complement( one ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219160) {G33,W11,D4,L1,V1,M1} { meet( X, complement( one ) ) ==>
% 100.43/100.79 meet( join( X, skol1 ), complement( one ) ) }.
% 100.43/100.79 parent0[0]: (32784) {G33,W11,D4,L1,V1,M1} P(29,32220);d(32220) { meet( join
% 100.43/100.79 ( X, skol1 ), complement( one ) ) ==> meet( X, complement( one ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219162) {G32,W14,D5,L1,V0,M1} { meet( composition( skol1,
% 100.43/100.79 complement( one ) ), complement( one ) ) ==> meet( composition( skol1,
% 100.43/100.79 top ), complement( one ) ) }.
% 100.43/100.79 parent0[0]: (7978) {G31,W10,D5,L1,V1,M1} P(1970,21);d(17);d(260);d(17);d(
% 100.43/100.79 1551) { join( composition( X, complement( one ) ), X ) ==> composition( X
% 100.43/100.79 , top ) }.
% 100.43/100.79 parent1[0; 9]: (219160) {G33,W11,D4,L1,V1,M1} { meet( X, complement( one )
% 100.43/100.79 ) ==> meet( join( X, skol1 ), complement( one ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := skol1
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := composition( skol1, complement( one ) )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219163) {G23,W11,D4,L1,V0,M1} { composition( skol1, complement(
% 100.43/100.79 one ) ) ==> meet( composition( skol1, top ), complement( one ) ) }.
% 100.43/100.79 parent0[0]: (1894) {G22,W9,D4,L1,V1,M1} P(1872,1047) { meet( composition(
% 100.43/100.79 skol1, X ), X ) ==> composition( skol1, X ) }.
% 100.43/100.79 parent1[0; 1]: (219162) {G32,W14,D5,L1,V0,M1} { meet( composition( skol1,
% 100.43/100.79 complement( one ) ), complement( one ) ) ==> meet( composition( skol1,
% 100.43/100.79 top ), complement( one ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := complement( one )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219164) {G23,W11,D4,L1,V0,M1} { meet( composition( skol1, top ),
% 100.43/100.79 complement( one ) ) ==> composition( skol1, complement( one ) ) }.
% 100.43/100.79 parent0[0]: (219163) {G23,W11,D4,L1,V0,M1} { composition( skol1,
% 100.43/100.79 complement( one ) ) ==> meet( composition( skol1, top ), complement( one
% 100.43/100.79 ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (32819) {G34,W11,D4,L1,V0,M1} P(7978,32784);d(1894) { meet(
% 100.43/100.79 composition( skol1, top ), complement( one ) ) ==> composition( skol1,
% 100.43/100.79 complement( one ) ) }.
% 100.43/100.79 parent0: (219164) {G23,W11,D4,L1,V0,M1} { meet( composition( skol1, top )
% 100.43/100.79 , complement( one ) ) ==> composition( skol1, complement( one ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219166) {G27,W11,D5,L1,V2,M1} { meet( complement( Y ), X ) ==>
% 100.43/100.79 meet( complement( meet( X, Y ) ), X ) }.
% 100.43/100.79 parent0[0]: (13102) {G27,W11,D5,L1,V2,M1} P(10586,471);d(471);d(994);d(473)
% 100.43/100.79 { meet( complement( meet( X, Y ) ), X ) ==> meet( complement( Y ), X )
% 100.43/100.79 }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219168) {G28,W17,D6,L1,V0,M1} { meet( complement( complement(
% 100.43/100.79 one ) ), composition( skol1, top ) ) ==> meet( complement( composition(
% 100.43/100.79 skol1, complement( one ) ) ), composition( skol1, top ) ) }.
% 100.43/100.79 parent0[0]: (32819) {G34,W11,D4,L1,V0,M1} P(7978,32784);d(1894) { meet(
% 100.43/100.79 composition( skol1, top ), complement( one ) ) ==> composition( skol1,
% 100.43/100.79 complement( one ) ) }.
% 100.43/100.79 parent1[0; 10]: (219166) {G27,W11,D5,L1,V2,M1} { meet( complement( Y ), X
% 100.43/100.79 ) ==> meet( complement( meet( X, Y ) ), X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := composition( skol1, top )
% 100.43/100.79 Y := complement( one )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219169) {G17,W15,D6,L1,V0,M1} { meet( one, composition( skol1,
% 100.43/100.79 top ) ) ==> meet( complement( composition( skol1, complement( one ) ) ),
% 100.43/100.79 composition( skol1, top ) ) }.
% 100.43/100.79 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.43/100.79 complement( X ) ) ==> X }.
% 100.43/100.79 parent1[0; 2]: (219168) {G28,W17,D6,L1,V0,M1} { meet( complement(
% 100.43/100.79 complement( one ) ), composition( skol1, top ) ) ==> meet( complement(
% 100.43/100.79 composition( skol1, complement( one ) ) ), composition( skol1, top ) )
% 100.43/100.79 }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := one
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219170) {G17,W15,D6,L1,V0,M1} { meet( complement( composition(
% 100.43/100.79 skol1, complement( one ) ) ), composition( skol1, top ) ) ==> meet( one,
% 100.43/100.79 composition( skol1, top ) ) }.
% 100.43/100.79 parent0[0]: (219169) {G17,W15,D6,L1,V0,M1} { meet( one, composition( skol1
% 100.43/100.79 , top ) ) ==> meet( complement( composition( skol1, complement( one ) ) )
% 100.43/100.79 , composition( skol1, top ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (33040) {G35,W15,D6,L1,V0,M1} P(32819,13102);d(460) { meet(
% 100.43/100.79 complement( composition( skol1, complement( one ) ) ), composition( skol1
% 100.43/100.79 , top ) ) ==> meet( one, composition( skol1, top ) ) }.
% 100.43/100.79 parent0: (219170) {G17,W15,D6,L1,V0,M1} { meet( complement( composition(
% 100.43/100.79 skol1, complement( one ) ) ), composition( skol1, top ) ) ==> meet( one,
% 100.43/100.79 composition( skol1, top ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219173) {G31,W15,D5,L1,V1,M1} { meet( meet( composition( skol1,
% 100.43/100.79 top ), complement( skol1 ) ), X ) = meet( composition( skol1, complement
% 100.43/100.79 ( one ) ), X ) }.
% 100.43/100.79 parent0[0]: (32571) {G34,W11,D4,L1,V0,M1} P(3504,32504);d(3573);d(10556);d(
% 100.43/100.79 472);d(32513) { meet( complement( skol1 ), composition( skol1, top ) )
% 100.43/100.79 ==> composition( skol1, complement( one ) ) }.
% 100.43/100.79 parent1[0; 10]: (32161) {G30,W11,D4,L1,V3,M1} P(22589,32126);d(32157) {
% 100.43/100.79 meet( meet( Z, Y ), X ) = meet( meet( Y, Z ), X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := X
% 100.43/100.79 Y := complement( skol1 )
% 100.43/100.79 Z := composition( skol1, top )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (33043) {G35,W15,D5,L1,V1,M1} P(32571,32161) { meet( meet(
% 100.43/100.79 composition( skol1, top ), complement( skol1 ) ), X ) ==> meet(
% 100.43/100.79 composition( skol1, complement( one ) ), X ) }.
% 100.43/100.79 parent0: (219173) {G31,W15,D5,L1,V1,M1} { meet( meet( composition( skol1,
% 100.43/100.79 top ), complement( skol1 ) ), X ) = meet( composition( skol1, complement
% 100.43/100.79 ( one ) ), X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219175) {G20,W11,D4,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X, Y
% 100.43/100.79 ), meet( Y, X ) ) }.
% 100.43/100.79 parent0[0]: (1493) {G20,W11,D4,L1,V2,M1} P(1209,1009);d(455);d(460) { meet
% 100.43/100.79 ( meet( X, Y ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219180) {G21,W18,D5,L1,V0,M1} { meet( composition( skol1, top )
% 100.43/100.79 , complement( skol1 ) ) ==> meet( meet( composition( skol1, top ),
% 100.43/100.79 complement( skol1 ) ), composition( skol1, complement( one ) ) ) }.
% 100.43/100.79 parent0[0]: (32571) {G34,W11,D4,L1,V0,M1} P(3504,32504);d(3573);d(10556);d(
% 100.43/100.79 472);d(32513) { meet( complement( skol1 ), composition( skol1, top ) )
% 100.43/100.79 ==> composition( skol1, complement( one ) ) }.
% 100.43/100.79 parent1[0; 14]: (219175) {G20,W11,D4,L1,V2,M1} { meet( X, Y ) ==> meet(
% 100.43/100.79 meet( X, Y ), meet( Y, X ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := composition( skol1, top )
% 100.43/100.79 Y := complement( skol1 )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219182) {G22,W16,D5,L1,V0,M1} { meet( composition( skol1, top )
% 100.43/100.79 , complement( skol1 ) ) ==> meet( composition( skol1, complement( one ) )
% 100.43/100.79 , composition( skol1, complement( one ) ) ) }.
% 100.43/100.79 parent0[0]: (33043) {G35,W15,D5,L1,V1,M1} P(32571,32161) { meet( meet(
% 100.43/100.79 composition( skol1, top ), complement( skol1 ) ), X ) ==> meet(
% 100.43/100.79 composition( skol1, complement( one ) ), X ) }.
% 100.43/100.79 parent1[0; 7]: (219180) {G21,W18,D5,L1,V0,M1} { meet( composition( skol1,
% 100.43/100.79 top ), complement( skol1 ) ) ==> meet( meet( composition( skol1, top ),
% 100.43/100.79 complement( skol1 ) ), composition( skol1, complement( one ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := composition( skol1, complement( one ) )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219183) {G18,W11,D4,L1,V0,M1} { meet( composition( skol1, top )
% 100.43/100.79 , complement( skol1 ) ) ==> composition( skol1, complement( one ) ) }.
% 100.43/100.79 parent0[0]: (468) {G17,W5,D3,L1,V1,M1} P(460,146) { meet( X, X ) ==> X }.
% 100.43/100.79 parent1[0; 7]: (219182) {G22,W16,D5,L1,V0,M1} { meet( composition( skol1,
% 100.43/100.79 top ), complement( skol1 ) ) ==> meet( composition( skol1, complement(
% 100.43/100.79 one ) ), composition( skol1, complement( one ) ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := composition( skol1, complement( one ) )
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (33063) {G36,W11,D4,L1,V0,M1} P(32571,1493);d(33043);d(468) {
% 100.43/100.79 meet( composition( skol1, top ), complement( skol1 ) ) ==> composition(
% 100.43/100.79 skol1, complement( one ) ) }.
% 100.43/100.79 parent0: (219183) {G18,W11,D4,L1,V0,M1} { meet( composition( skol1, top )
% 100.43/100.79 , complement( skol1 ) ) ==> composition( skol1, complement( one ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 permutation0:
% 100.43/100.79 0 ==> 0
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219186) {G27,W11,D5,L1,V2,M1} { meet( complement( Y ), X ) ==>
% 100.43/100.79 meet( complement( meet( X, Y ) ), X ) }.
% 100.43/100.79 parent0[0]: (13102) {G27,W11,D5,L1,V2,M1} P(10586,471);d(471);d(994);d(473)
% 100.43/100.79 { meet( complement( meet( X, Y ) ), X ) ==> meet( complement( Y ), X )
% 100.43/100.79 }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := X
% 100.43/100.79 Y := Y
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219190) {G28,W17,D6,L1,V0,M1} { meet( complement( complement(
% 100.43/100.79 skol1 ) ), composition( skol1, top ) ) ==> meet( complement( composition
% 100.43/100.79 ( skol1, complement( one ) ) ), composition( skol1, top ) ) }.
% 100.43/100.79 parent0[0]: (33063) {G36,W11,D4,L1,V0,M1} P(32571,1493);d(33043);d(468) {
% 100.43/100.79 meet( composition( skol1, top ), complement( skol1 ) ) ==> composition(
% 100.43/100.79 skol1, complement( one ) ) }.
% 100.43/100.79 parent1[0; 10]: (219186) {G27,W11,D5,L1,V2,M1} { meet( complement( Y ), X
% 100.43/100.79 ) ==> meet( complement( meet( X, Y ) ), X ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 X := composition( skol1, top )
% 100.43/100.79 Y := complement( skol1 )
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219191) {G29,W13,D5,L1,V0,M1} { meet( complement( complement(
% 100.43/100.79 skol1 ) ), composition( skol1, top ) ) ==> meet( one, composition( skol1
% 100.43/100.79 , top ) ) }.
% 100.43/100.79 parent0[0]: (33040) {G35,W15,D6,L1,V0,M1} P(32819,13102);d(460) { meet(
% 100.43/100.79 complement( composition( skol1, complement( one ) ) ), composition( skol1
% 100.43/100.79 , top ) ) ==> meet( one, composition( skol1, top ) ) }.
% 100.43/100.79 parent1[0; 8]: (219190) {G28,W17,D6,L1,V0,M1} { meet( complement(
% 100.43/100.79 complement( skol1 ) ), composition( skol1, top ) ) ==> meet( complement(
% 100.43/100.79 composition( skol1, complement( one ) ) ), composition( skol1, top ) )
% 100.43/100.79 }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219192) {G17,W11,D4,L1,V0,M1} { meet( skol1, composition( skol1
% 100.43/100.79 , top ) ) ==> meet( one, composition( skol1, top ) ) }.
% 100.43/100.79 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.43/100.79 complement( X ) ) ==> X }.
% 100.43/100.79 parent1[0; 2]: (219191) {G29,W13,D5,L1,V0,M1} { meet( complement(
% 100.43/100.79 complement( skol1 ) ), composition( skol1, top ) ) ==> meet( one,
% 100.43/100.79 composition( skol1, top ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := skol1
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 paramod: (219193) {G18,W7,D4,L1,V0,M1} { skol1 ==> meet( one, composition
% 100.43/100.79 ( skol1, top ) ) }.
% 100.43/100.79 parent0[0]: (2428) {G22,W7,D4,L1,V1,M1} P(2332,1047) { meet( X, composition
% 100.43/100.79 ( X, top ) ) ==> X }.
% 100.43/100.79 parent1[0; 1]: (219192) {G17,W11,D4,L1,V0,M1} { meet( skol1, composition(
% 100.43/100.79 skol1, top ) ) ==> meet( one, composition( skol1, top ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 X := skol1
% 100.43/100.79 end
% 100.43/100.79 substitution1:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 eqswap: (219194) {G18,W7,D4,L1,V0,M1} { meet( one, composition( skol1, top
% 100.43/100.79 ) ) ==> skol1 }.
% 100.43/100.79 parent0[0]: (219193) {G18,W7,D4,L1,V0,M1} { skol1 ==> meet( one,
% 100.43/100.79 composition( skol1, top ) ) }.
% 100.43/100.79 substitution0:
% 100.43/100.79 end
% 100.43/100.79
% 100.43/100.79 subsumption: (33077) {G37,W7,D4,L1,V0,M1} P(33063,13102);d(33040);d(460);d(
% 100.43/100.79 2428) { meet( one, composition( skol1, top ) ) ==> skol1 }.
% 100.43/100.80 parent0: (219194) {G18,W7,D4,L1,V0,M1} { meet( one, composition( skol1,
% 100.43/100.80 top ) ) ==> skol1 }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219196) {G25,W11,D4,L1,V2,M1} { join( Y, complement( X ) ) ==>
% 100.43/100.80 join( complement( X ), meet( X, Y ) ) }.
% 100.43/100.80 parent0[0]: (10406) {G25,W11,D4,L1,V2,M1} P(10350,756);d(1);d(748) { join(
% 100.43/100.80 complement( Y ), meet( Y, X ) ) ==> join( X, complement( Y ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219197) {G26,W11,D4,L1,V0,M1} { join( composition( skol1, top )
% 100.43/100.80 , complement( one ) ) ==> join( complement( one ), skol1 ) }.
% 100.43/100.80 parent0[0]: (33077) {G37,W7,D4,L1,V0,M1} P(33063,13102);d(33040);d(460);d(
% 100.43/100.80 2428) { meet( one, composition( skol1, top ) ) ==> skol1 }.
% 100.43/100.80 parent1[0; 10]: (219196) {G25,W11,D4,L1,V2,M1} { join( Y, complement( X )
% 100.43/100.80 ) ==> join( complement( X ), meet( X, Y ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := one
% 100.43/100.80 Y := composition( skol1, top )
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (33082) {G38,W11,D4,L1,V0,M1} P(33077,10406) { join(
% 100.43/100.80 composition( skol1, top ), complement( one ) ) ==> join( complement( one
% 100.43/100.80 ), skol1 ) }.
% 100.43/100.80 parent0: (219197) {G26,W11,D4,L1,V0,M1} { join( composition( skol1, top )
% 100.43/100.80 , complement( one ) ) ==> join( complement( one ), skol1 ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219200) {G27,W10,D6,L1,V2,M1} { zero ==> meet( X, composition(
% 100.43/100.80 complement( join( X, Y ) ), skol1 ) ) }.
% 100.43/100.80 parent0[0]: (4742) {G27,W10,D6,L1,V2,M1} P(1028,3874) { meet( X,
% 100.43/100.80 composition( complement( join( X, Y ) ), skol1 ) ) ==> zero }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219203) {G28,W13,D7,L1,V0,M1} { zero ==> meet( composition(
% 100.43/100.80 skol1, top ), composition( complement( join( complement( one ), skol1 ) )
% 100.43/100.80 , skol1 ) ) }.
% 100.43/100.80 parent0[0]: (33082) {G38,W11,D4,L1,V0,M1} P(33077,10406) { join(
% 100.43/100.80 composition( skol1, top ), complement( one ) ) ==> join( complement( one
% 100.43/100.80 ), skol1 ) }.
% 100.43/100.80 parent1[0; 8]: (219200) {G27,W10,D6,L1,V2,M1} { zero ==> meet( X,
% 100.43/100.80 composition( complement( join( X, Y ) ), skol1 ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := composition( skol1, top )
% 100.43/100.80 Y := complement( one )
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219204) {G18,W12,D6,L1,V0,M1} { zero ==> meet( composition(
% 100.43/100.80 skol1, top ), composition( meet( one, complement( skol1 ) ), skol1 ) )
% 100.43/100.80 }.
% 100.43/100.80 parent0[0]: (472) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join(
% 100.43/100.80 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 100.43/100.80 parent1[0; 7]: (219203) {G28,W13,D7,L1,V0,M1} { zero ==> meet( composition
% 100.43/100.80 ( skol1, top ), composition( complement( join( complement( one ), skol1 )
% 100.43/100.80 ), skol1 ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := skol1
% 100.43/100.80 Y := one
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219205) {G19,W8,D5,L1,V0,M1} { zero ==> composition( meet( one,
% 100.43/100.80 complement( skol1 ) ), skol1 ) }.
% 100.43/100.80 parent0[0]: (2927) {G26,W15,D5,L1,V2,M1} P(1957,2533) { meet( composition(
% 100.43/100.80 Y, top ), composition( meet( one, X ), Y ) ) ==> composition( meet( one,
% 100.43/100.80 X ), Y ) }.
% 100.43/100.80 parent1[0; 2]: (219204) {G18,W12,D6,L1,V0,M1} { zero ==> meet( composition
% 100.43/100.80 ( skol1, top ), composition( meet( one, complement( skol1 ) ), skol1 ) )
% 100.43/100.80 }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := complement( skol1 )
% 100.43/100.80 Y := skol1
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219206) {G19,W8,D5,L1,V0,M1} { composition( meet( one, complement
% 100.43/100.80 ( skol1 ) ), skol1 ) ==> zero }.
% 100.43/100.80 parent0[0]: (219205) {G19,W8,D5,L1,V0,M1} { zero ==> composition( meet(
% 100.43/100.80 one, complement( skol1 ) ), skol1 ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (33161) {G39,W8,D5,L1,V0,M1} P(33082,4742);d(472);d(2927) {
% 100.43/100.80 composition( meet( one, complement( skol1 ) ), skol1 ) ==> zero }.
% 100.43/100.80 parent0: (219206) {G19,W8,D5,L1,V0,M1} { composition( meet( one,
% 100.43/100.80 complement( skol1 ) ), skol1 ) ==> zero }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219208) {G19,W15,D7,L1,V2,M1} { complement( converse( X ) ) ==>
% 100.43/100.80 join( complement( converse( X ) ), composition( Y, complement( converse(
% 100.43/100.80 composition( X, Y ) ) ) ) ) }.
% 100.43/100.80 parent0[0]: (850) {G19,W15,D7,L1,V2,M1} P(88,479) { join( complement(
% 100.43/100.80 converse( Y ) ), composition( X, complement( converse( composition( Y, X
% 100.43/100.80 ) ) ) ) ) ==> complement( converse( Y ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219214) {G20,W19,D7,L1,V0,M1} { complement( converse( meet( one
% 100.43/100.80 , complement( skol1 ) ) ) ) ==> join( complement( converse( meet( one,
% 100.43/100.80 complement( skol1 ) ) ) ), composition( skol1, complement( converse( zero
% 100.43/100.80 ) ) ) ) }.
% 100.43/100.80 parent0[0]: (33161) {G39,W8,D5,L1,V0,M1} P(33082,4742);d(472);d(2927) {
% 100.43/100.80 composition( meet( one, complement( skol1 ) ), skol1 ) ==> zero }.
% 100.43/100.80 parent1[0; 18]: (219208) {G19,W15,D7,L1,V2,M1} { complement( converse( X )
% 100.43/100.80 ) ==> join( complement( converse( X ) ), composition( Y, complement(
% 100.43/100.80 converse( composition( X, Y ) ) ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := meet( one, complement( skol1 ) )
% 100.43/100.80 Y := skol1
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219216) {G21,W18,D6,L1,V0,M1} { complement( converse( meet( one
% 100.43/100.80 , complement( skol1 ) ) ) ) ==> join( converse( join( complement( one ),
% 100.43/100.80 skol1 ) ), composition( skol1, complement( converse( zero ) ) ) ) }.
% 100.43/100.80 parent0[0]: (12563) {G29,W12,D6,L1,V2,M1} P(472,12515) { complement(
% 100.43/100.80 converse( meet( X, complement( Y ) ) ) ) ==> converse( join( complement(
% 100.43/100.80 X ), Y ) ) }.
% 100.43/100.80 parent1[0; 8]: (219214) {G20,W19,D7,L1,V0,M1} { complement( converse( meet
% 100.43/100.80 ( one, complement( skol1 ) ) ) ) ==> join( complement( converse( meet(
% 100.43/100.80 one, complement( skol1 ) ) ) ), composition( skol1, complement( converse
% 100.43/100.80 ( zero ) ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := one
% 100.43/100.80 Y := skol1
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219217) {G22,W17,D6,L1,V0,M1} { converse( join( complement( one
% 100.43/100.80 ), skol1 ) ) ==> join( converse( join( complement( one ), skol1 ) ),
% 100.43/100.80 composition( skol1, complement( converse( zero ) ) ) ) }.
% 100.43/100.80 parent0[0]: (12563) {G29,W12,D6,L1,V2,M1} P(472,12515) { complement(
% 100.43/100.80 converse( meet( X, complement( Y ) ) ) ) ==> converse( join( complement(
% 100.43/100.80 X ), Y ) ) }.
% 100.43/100.80 parent1[0; 1]: (219216) {G21,W18,D6,L1,V0,M1} { complement( converse( meet
% 100.43/100.80 ( one, complement( skol1 ) ) ) ) ==> join( converse( join( complement(
% 100.43/100.80 one ), skol1 ) ), composition( skol1, complement( converse( zero ) ) ) )
% 100.43/100.80 }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := one
% 100.43/100.80 Y := skol1
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219223) {G17,W16,D6,L1,V0,M1} { converse( join( complement( one
% 100.43/100.80 ), skol1 ) ) ==> join( converse( join( complement( one ), skol1 ) ),
% 100.43/100.80 composition( skol1, complement( zero ) ) ) }.
% 100.43/100.80 parent0[0]: (480) {G16,W4,D3,L1,V0,M1} P(462,450) { converse( zero ) ==>
% 100.43/100.80 zero }.
% 100.43/100.80 parent1[0; 15]: (219217) {G22,W17,D6,L1,V0,M1} { converse( join(
% 100.43/100.80 complement( one ), skol1 ) ) ==> join( converse( join( complement( one )
% 100.43/100.80 , skol1 ) ), composition( skol1, complement( converse( zero ) ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219224) {G14,W15,D6,L1,V0,M1} { converse( join( complement( one
% 100.43/100.80 ), skol1 ) ) ==> join( converse( join( complement( one ), skol1 ) ),
% 100.43/100.80 composition( skol1, top ) ) }.
% 100.43/100.80 parent0[0]: (451) {G13,W4,D3,L1,V0,M1} P(146,418);d(450);d(58) { complement
% 100.43/100.80 ( zero ) ==> top }.
% 100.43/100.80 parent1[0; 14]: (219223) {G17,W16,D6,L1,V0,M1} { converse( join(
% 100.43/100.80 complement( one ), skol1 ) ) ==> join( converse( join( complement( one )
% 100.43/100.80 , skol1 ) ), composition( skol1, complement( zero ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219225) {G15,W15,D6,L1,V0,M1} { converse( join( complement( one
% 100.43/100.80 ), skol1 ) ) ==> converse( join( join( complement( one ), skol1 ),
% 100.43/100.80 composition( top, skol1 ) ) ) }.
% 100.43/100.80 parent0[0]: (26439) {G36,W13,D5,L1,V1,M1} P(26361,8) { join( converse( X )
% 100.43/100.80 , composition( skol1, top ) ) ==> converse( join( X, composition( top,
% 100.43/100.80 skol1 ) ) ) }.
% 100.43/100.80 parent1[0; 6]: (219224) {G14,W15,D6,L1,V0,M1} { converse( join( complement
% 100.43/100.80 ( one ), skol1 ) ) ==> join( converse( join( complement( one ), skol1 ) )
% 100.43/100.80 , composition( skol1, top ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := join( complement( one ), skol1 )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219226) {G11,W13,D5,L1,V0,M1} { converse( join( complement( one
% 100.43/100.80 ), skol1 ) ) ==> converse( join( composition( top, skol1 ), complement(
% 100.43/100.80 one ) ) ) }.
% 100.43/100.80 parent0[0]: (2567) {G10,W13,D4,L1,V2,M1} P(1864,26) { join( join( Y, X ),
% 100.43/100.80 composition( top, X ) ) ==> join( composition( top, X ), Y ) }.
% 100.43/100.80 parent1[0; 7]: (219225) {G15,W15,D6,L1,V0,M1} { converse( join( complement
% 100.43/100.80 ( one ), skol1 ) ) ==> converse( join( join( complement( one ), skol1 ),
% 100.43/100.80 composition( top, skol1 ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := skol1
% 100.43/100.80 Y := complement( one )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219227) {G11,W13,D5,L1,V0,M1} { converse( join( composition( top
% 100.43/100.80 , skol1 ), complement( one ) ) ) ==> converse( join( complement( one ),
% 100.43/100.80 skol1 ) ) }.
% 100.43/100.80 parent0[0]: (219226) {G11,W13,D5,L1,V0,M1} { converse( join( complement(
% 100.43/100.80 one ), skol1 ) ) ==> converse( join( composition( top, skol1 ),
% 100.43/100.80 complement( one ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (33220) {G40,W13,D5,L1,V0,M1} P(33161,850);d(12563);d(480);d(
% 100.43/100.80 451);d(26439);d(2567) { converse( join( composition( top, skol1 ),
% 100.43/100.80 complement( one ) ) ) ==> converse( join( complement( one ), skol1 ) )
% 100.43/100.80 }.
% 100.43/100.80 parent0: (219227) {G11,W13,D5,L1,V0,M1} { converse( join( composition( top
% 100.43/100.80 , skol1 ), complement( one ) ) ) ==> converse( join( complement( one ),
% 100.43/100.80 skol1 ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219228) {G39,W8,D5,L1,V0,M1} { zero ==> composition( meet( one,
% 100.43/100.80 complement( skol1 ) ), skol1 ) }.
% 100.43/100.80 parent0[0]: (33161) {G39,W8,D5,L1,V0,M1} P(33082,4742);d(472);d(2927) {
% 100.43/100.80 composition( meet( one, complement( skol1 ) ), skol1 ) ==> zero }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219229) {G27,W8,D5,L1,V0,M1} { zero ==> composition( meet(
% 100.43/100.80 complement( skol1 ), one ), skol1 ) }.
% 100.43/100.80 parent0[0]: (22382) {G26,W11,D4,L1,V3,M1} P(10571,72);d(10571) {
% 100.43/100.80 composition( meet( X, Y ), Z ) = composition( meet( Y, X ), Z ) }.
% 100.43/100.80 parent1[0; 2]: (219228) {G39,W8,D5,L1,V0,M1} { zero ==> composition( meet
% 100.43/100.80 ( one, complement( skol1 ) ), skol1 ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := one
% 100.43/100.80 Y := complement( skol1 )
% 100.43/100.80 Z := skol1
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219232) {G27,W8,D5,L1,V0,M1} { composition( meet( complement(
% 100.43/100.80 skol1 ), one ), skol1 ) ==> zero }.
% 100.43/100.80 parent0[0]: (219229) {G27,W8,D5,L1,V0,M1} { zero ==> composition( meet(
% 100.43/100.80 complement( skol1 ), one ), skol1 ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (33223) {G40,W8,D5,L1,V0,M1} P(33161,22382) { composition(
% 100.43/100.80 meet( complement( skol1 ), one ), skol1 ) ==> zero }.
% 100.43/100.80 parent0: (219232) {G27,W8,D5,L1,V0,M1} { composition( meet( complement(
% 100.43/100.80 skol1 ), one ), skol1 ) ==> zero }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219234) {G1,W15,D7,L1,V2,M1} { complement( converse( Y ) ) ==>
% 100.43/100.80 join( composition( X, complement( converse( composition( Y, X ) ) ) ),
% 100.43/100.80 complement( converse( Y ) ) ) }.
% 100.43/100.80 parent0[0]: (88) {G1,W15,D7,L1,V2,M1} P(9,10);d(7) { join( composition( X,
% 100.43/100.80 complement( converse( composition( Y, X ) ) ) ), complement( converse( Y
% 100.43/100.80 ) ) ) ==> complement( converse( Y ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219241) {G2,W19,D7,L1,V0,M1} { complement( converse( meet( one,
% 100.43/100.80 complement( skol1 ) ) ) ) ==> join( composition( skol1, complement(
% 100.43/100.80 converse( zero ) ) ), complement( converse( meet( one, complement( skol1
% 100.43/100.80 ) ) ) ) ) }.
% 100.43/100.80 parent0[0]: (33161) {G39,W8,D5,L1,V0,M1} P(33082,4742);d(472);d(2927) {
% 100.43/100.80 composition( meet( one, complement( skol1 ) ), skol1 ) ==> zero }.
% 100.43/100.80 parent1[0; 12]: (219234) {G1,W15,D7,L1,V2,M1} { complement( converse( Y )
% 100.43/100.80 ) ==> join( composition( X, complement( converse( composition( Y, X ) )
% 100.43/100.80 ) ), complement( converse( Y ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := skol1
% 100.43/100.80 Y := meet( one, complement( skol1 ) )
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219242) {G3,W18,D7,L1,V0,M1} { complement( converse( meet( one,
% 100.43/100.80 complement( skol1 ) ) ) ) ==> join( composition( skol1, complement( zero
% 100.43/100.80 ) ), complement( converse( meet( one, complement( skol1 ) ) ) ) ) }.
% 100.43/100.80 parent0[0]: (480) {G16,W4,D3,L1,V0,M1} P(462,450) { converse( zero ) ==>
% 100.43/100.80 zero }.
% 100.43/100.80 parent1[0; 11]: (219241) {G2,W19,D7,L1,V0,M1} { complement( converse( meet
% 100.43/100.80 ( one, complement( skol1 ) ) ) ) ==> join( composition( skol1, complement
% 100.43/100.80 ( converse( zero ) ) ), complement( converse( meet( one, complement(
% 100.43/100.80 skol1 ) ) ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219243) {G4,W17,D7,L1,V0,M1} { complement( converse( meet( one,
% 100.43/100.80 complement( skol1 ) ) ) ) ==> join( composition( skol1, top ), complement
% 100.43/100.80 ( converse( meet( one, complement( skol1 ) ) ) ) ) }.
% 100.43/100.80 parent0[0]: (451) {G13,W4,D3,L1,V0,M1} P(146,418);d(450);d(58) { complement
% 100.43/100.80 ( zero ) ==> top }.
% 100.43/100.80 parent1[0; 10]: (219242) {G3,W18,D7,L1,V0,M1} { complement( converse( meet
% 100.43/100.80 ( one, complement( skol1 ) ) ) ) ==> join( composition( skol1, complement
% 100.43/100.80 ( zero ) ), complement( converse( meet( one, complement( skol1 ) ) ) ) )
% 100.43/100.80 }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219245) {G5,W16,D6,L1,V0,M1} { complement( converse( meet( one,
% 100.43/100.80 complement( skol1 ) ) ) ) ==> join( composition( skol1, top ), converse(
% 100.43/100.80 join( complement( one ), skol1 ) ) ) }.
% 100.43/100.80 parent0[0]: (12563) {G29,W12,D6,L1,V2,M1} P(472,12515) { complement(
% 100.43/100.80 converse( meet( X, complement( Y ) ) ) ) ==> converse( join( complement(
% 100.43/100.80 X ), Y ) ) }.
% 100.43/100.80 parent1[0; 11]: (219243) {G4,W17,D7,L1,V0,M1} { complement( converse( meet
% 100.43/100.80 ( one, complement( skol1 ) ) ) ) ==> join( composition( skol1, top ),
% 100.43/100.80 complement( converse( meet( one, complement( skol1 ) ) ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := one
% 100.43/100.80 Y := skol1
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219246) {G6,W15,D6,L1,V0,M1} { converse( join( complement( one )
% 100.43/100.80 , skol1 ) ) ==> join( composition( skol1, top ), converse( join(
% 100.43/100.80 complement( one ), skol1 ) ) ) }.
% 100.43/100.80 parent0[0]: (12563) {G29,W12,D6,L1,V2,M1} P(472,12515) { complement(
% 100.43/100.80 converse( meet( X, complement( Y ) ) ) ) ==> converse( join( complement(
% 100.43/100.80 X ), Y ) ) }.
% 100.43/100.80 parent1[0; 1]: (219245) {G5,W16,D6,L1,V0,M1} { complement( converse( meet
% 100.43/100.80 ( one, complement( skol1 ) ) ) ) ==> join( composition( skol1, top ),
% 100.43/100.80 converse( join( complement( one ), skol1 ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := one
% 100.43/100.80 Y := skol1
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219251) {G7,W15,D5,L1,V0,M1} { converse( join( complement( one )
% 100.43/100.80 , skol1 ) ) ==> join( join( composition( skol1, top ), complement( one )
% 100.43/100.80 ), converse( skol1 ) ) }.
% 100.43/100.80 parent0[0]: (1572) {G30,W15,D6,L1,V2,M1} P(1551,22) { join( X, converse(
% 100.43/100.80 join( complement( one ), Y ) ) ) ==> join( join( X, complement( one ) ),
% 100.43/100.80 converse( Y ) ) }.
% 100.43/100.80 parent1[0; 6]: (219246) {G6,W15,D6,L1,V0,M1} { converse( join( complement
% 100.43/100.80 ( one ), skol1 ) ) ==> join( composition( skol1, top ), converse( join(
% 100.43/100.80 complement( one ), skol1 ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := composition( skol1, top )
% 100.43/100.80 Y := skol1
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219252) {G8,W12,D5,L1,V0,M1} { converse( join( complement( one )
% 100.43/100.80 , skol1 ) ) ==> join( composition( skol1, top ), complement( one ) ) }.
% 100.43/100.80 parent0[0]: (24011) {G36,W14,D5,L1,V1,M1} P(23991,728) { join( join(
% 100.43/100.80 composition( skol1, top ), X ), converse( skol1 ) ) ==> join( composition
% 100.43/100.80 ( skol1, top ), X ) }.
% 100.43/100.80 parent1[0; 6]: (219251) {G7,W15,D5,L1,V0,M1} { converse( join( complement
% 100.43/100.80 ( one ), skol1 ) ) ==> join( join( composition( skol1, top ), complement
% 100.43/100.80 ( one ) ), converse( skol1 ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := complement( one )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219253) {G9,W10,D5,L1,V0,M1} { converse( join( complement( one )
% 100.43/100.80 , skol1 ) ) ==> join( complement( one ), skol1 ) }.
% 100.43/100.80 parent0[0]: (33082) {G38,W11,D4,L1,V0,M1} P(33077,10406) { join(
% 100.43/100.80 composition( skol1, top ), complement( one ) ) ==> join( complement( one
% 100.43/100.80 ), skol1 ) }.
% 100.43/100.80 parent1[0; 6]: (219252) {G8,W12,D5,L1,V0,M1} { converse( join( complement
% 100.43/100.80 ( one ), skol1 ) ) ==> join( composition( skol1, top ), complement( one )
% 100.43/100.80 ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (33225) {G40,W10,D5,L1,V0,M1} P(33161,88);d(480);d(451);d(
% 100.43/100.80 12563);d(1572);d(24011);d(33082) { converse( join( complement( one ),
% 100.43/100.80 skol1 ) ) ==> join( complement( one ), skol1 ) }.
% 100.43/100.80 parent0: (219253) {G9,W10,D5,L1,V0,M1} { converse( join( complement( one )
% 100.43/100.80 , skol1 ) ) ==> join( complement( one ), skol1 ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219256) {G19,W15,D7,L1,V2,M1} { complement( converse( X ) ) ==>
% 100.43/100.80 join( complement( converse( X ) ), composition( Y, complement( converse(
% 100.43/100.80 composition( X, Y ) ) ) ) ) }.
% 100.43/100.80 parent0[0]: (850) {G19,W15,D7,L1,V2,M1} P(88,479) { join( complement(
% 100.43/100.80 converse( Y ) ), composition( X, complement( converse( composition( Y, X
% 100.43/100.80 ) ) ) ) ) ==> complement( converse( Y ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219264) {G20,W19,D7,L1,V0,M1} { complement( converse( meet(
% 100.43/100.80 complement( skol1 ), one ) ) ) ==> join( complement( converse( meet(
% 100.43/100.80 complement( skol1 ), one ) ) ), composition( skol1, complement( converse
% 100.43/100.80 ( zero ) ) ) ) }.
% 100.43/100.80 parent0[0]: (33223) {G40,W8,D5,L1,V0,M1} P(33161,22382) { composition( meet
% 100.43/100.80 ( complement( skol1 ), one ), skol1 ) ==> zero }.
% 100.43/100.80 parent1[0; 18]: (219256) {G19,W15,D7,L1,V2,M1} { complement( converse( X )
% 100.43/100.80 ) ==> join( complement( converse( X ) ), composition( Y, complement(
% 100.43/100.80 converse( composition( X, Y ) ) ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := meet( complement( skol1 ), one )
% 100.43/100.80 Y := skol1
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219266) {G21,W18,D6,L1,V0,M1} { complement( converse( meet(
% 100.43/100.80 complement( skol1 ), one ) ) ) ==> join( converse( join( skol1,
% 100.43/100.80 complement( one ) ) ), composition( skol1, complement( converse( zero ) )
% 100.43/100.80 ) ) }.
% 100.43/100.80 parent0[0]: (12650) {G29,W12,D6,L1,V2,M1} P(471,12515) { complement(
% 100.43/100.80 converse( meet( complement( X ), Y ) ) ) ==> converse( join( X,
% 100.43/100.80 complement( Y ) ) ) }.
% 100.43/100.80 parent1[0; 8]: (219264) {G20,W19,D7,L1,V0,M1} { complement( converse( meet
% 100.43/100.80 ( complement( skol1 ), one ) ) ) ==> join( complement( converse( meet(
% 100.43/100.80 complement( skol1 ), one ) ) ), composition( skol1, complement( converse
% 100.43/100.80 ( zero ) ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := skol1
% 100.43/100.80 Y := one
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219267) {G22,W17,D6,L1,V0,M1} { converse( join( skol1,
% 100.43/100.80 complement( one ) ) ) ==> join( converse( join( skol1, complement( one )
% 100.43/100.80 ) ), composition( skol1, complement( converse( zero ) ) ) ) }.
% 100.43/100.80 parent0[0]: (12650) {G29,W12,D6,L1,V2,M1} P(471,12515) { complement(
% 100.43/100.80 converse( meet( complement( X ), Y ) ) ) ==> converse( join( X,
% 100.43/100.80 complement( Y ) ) ) }.
% 100.43/100.80 parent1[0; 1]: (219266) {G21,W18,D6,L1,V0,M1} { complement( converse( meet
% 100.43/100.80 ( complement( skol1 ), one ) ) ) ==> join( converse( join( skol1,
% 100.43/100.80 complement( one ) ) ), composition( skol1, complement( converse( zero ) )
% 100.43/100.80 ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := skol1
% 100.43/100.80 Y := one
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219275) {G17,W16,D6,L1,V0,M1} { converse( join( skol1,
% 100.43/100.80 complement( one ) ) ) ==> join( converse( join( skol1, complement( one )
% 100.43/100.80 ) ), composition( skol1, complement( zero ) ) ) }.
% 100.43/100.80 parent0[0]: (480) {G16,W4,D3,L1,V0,M1} P(462,450) { converse( zero ) ==>
% 100.43/100.80 zero }.
% 100.43/100.80 parent1[0; 15]: (219267) {G22,W17,D6,L1,V0,M1} { converse( join( skol1,
% 100.43/100.80 complement( one ) ) ) ==> join( converse( join( skol1, complement( one )
% 100.43/100.80 ) ), composition( skol1, complement( converse( zero ) ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219276) {G14,W15,D6,L1,V0,M1} { converse( join( skol1,
% 100.43/100.80 complement( one ) ) ) ==> join( converse( join( skol1, complement( one )
% 100.43/100.80 ) ), composition( skol1, top ) ) }.
% 100.43/100.80 parent0[0]: (451) {G13,W4,D3,L1,V0,M1} P(146,418);d(450);d(58) { complement
% 100.43/100.80 ( zero ) ==> top }.
% 100.43/100.80 parent1[0; 14]: (219275) {G17,W16,D6,L1,V0,M1} { converse( join( skol1,
% 100.43/100.80 complement( one ) ) ) ==> join( converse( join( skol1, complement( one )
% 100.43/100.80 ) ), composition( skol1, complement( zero ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219277) {G15,W15,D6,L1,V0,M1} { converse( join( skol1,
% 100.43/100.80 complement( one ) ) ) ==> converse( join( join( skol1, complement( one )
% 100.43/100.80 ), composition( top, skol1 ) ) ) }.
% 100.43/100.80 parent0[0]: (26439) {G36,W13,D5,L1,V1,M1} P(26361,8) { join( converse( X )
% 100.43/100.80 , composition( skol1, top ) ) ==> converse( join( X, composition( top,
% 100.43/100.80 skol1 ) ) ) }.
% 100.43/100.80 parent1[0; 6]: (219276) {G14,W15,D6,L1,V0,M1} { converse( join( skol1,
% 100.43/100.80 complement( one ) ) ) ==> join( converse( join( skol1, complement( one )
% 100.43/100.80 ) ), composition( skol1, top ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := join( skol1, complement( one ) )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219278) {G10,W13,D5,L1,V0,M1} { converse( join( skol1,
% 100.43/100.80 complement( one ) ) ) ==> converse( join( composition( top, skol1 ),
% 100.43/100.80 complement( one ) ) ) }.
% 100.43/100.80 parent0[0]: (2329) {G9,W13,D4,L1,V2,M1} P(1984,26) { join( join( X, Y ),
% 100.43/100.80 composition( top, X ) ) ==> join( composition( top, X ), Y ) }.
% 100.43/100.80 parent1[0; 7]: (219277) {G15,W15,D6,L1,V0,M1} { converse( join( skol1,
% 100.43/100.80 complement( one ) ) ) ==> converse( join( join( skol1, complement( one )
% 100.43/100.80 ), composition( top, skol1 ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := skol1
% 100.43/100.80 Y := complement( one )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219279) {G11,W11,D5,L1,V0,M1} { converse( join( skol1,
% 100.43/100.80 complement( one ) ) ) ==> converse( join( complement( one ), skol1 ) )
% 100.43/100.80 }.
% 100.43/100.80 parent0[0]: (33220) {G40,W13,D5,L1,V0,M1} P(33161,850);d(12563);d(480);d(
% 100.43/100.80 451);d(26439);d(2567) { converse( join( composition( top, skol1 ),
% 100.43/100.80 complement( one ) ) ) ==> converse( join( complement( one ), skol1 ) )
% 100.43/100.80 }.
% 100.43/100.80 parent1[0; 6]: (219278) {G10,W13,D5,L1,V0,M1} { converse( join( skol1,
% 100.43/100.80 complement( one ) ) ) ==> converse( join( composition( top, skol1 ),
% 100.43/100.80 complement( one ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219280) {G12,W10,D5,L1,V0,M1} { converse( join( skol1,
% 100.43/100.80 complement( one ) ) ) ==> join( complement( one ), skol1 ) }.
% 100.43/100.80 parent0[0]: (33225) {G40,W10,D5,L1,V0,M1} P(33161,88);d(480);d(451);d(12563
% 100.43/100.80 );d(1572);d(24011);d(33082) { converse( join( complement( one ), skol1 )
% 100.43/100.80 ) ==> join( complement( one ), skol1 ) }.
% 100.43/100.80 parent1[0; 6]: (219279) {G11,W11,D5,L1,V0,M1} { converse( join( skol1,
% 100.43/100.80 complement( one ) ) ) ==> converse( join( complement( one ), skol1 ) )
% 100.43/100.80 }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (33230) {G41,W10,D5,L1,V0,M1} P(33223,850);d(12650);d(480);d(
% 100.43/100.80 451);d(26439);d(2329);d(33220);d(33225) { converse( join( skol1,
% 100.43/100.80 complement( one ) ) ) ==> join( complement( one ), skol1 ) }.
% 100.43/100.80 parent0: (219280) {G12,W10,D5,L1,V0,M1} { converse( join( skol1,
% 100.43/100.80 complement( one ) ) ) ==> join( complement( one ), skol1 ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219283) {G12,W12,D6,L1,V3,M1} { top ==> join( complement( meet(
% 100.43/100.80 converse( X ), Y ) ), converse( join( X, Z ) ) ) }.
% 100.43/100.80 parent0[0]: (603) {G12,W12,D6,L1,V3,M1} P(535,22);d(230) { join( complement
% 100.43/100.80 ( meet( converse( X ), Y ) ), converse( join( X, Z ) ) ) ==> top }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219288) {G13,W12,D6,L1,V1,M1} { top ==> join( complement( meet(
% 100.43/100.80 converse( skol1 ), X ) ), join( complement( one ), skol1 ) ) }.
% 100.43/100.80 parent0[0]: (33230) {G41,W10,D5,L1,V0,M1} P(33223,850);d(12650);d(480);d(
% 100.43/100.80 451);d(26439);d(2329);d(33220);d(33225) { converse( join( skol1,
% 100.43/100.80 complement( one ) ) ) ==> join( complement( one ), skol1 ) }.
% 100.43/100.80 parent1[0; 8]: (219283) {G12,W12,D6,L1,V3,M1} { top ==> join( complement(
% 100.43/100.80 meet( converse( X ), Y ) ), converse( join( X, Z ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := skol1
% 100.43/100.80 Y := X
% 100.43/100.80 Z := complement( one )
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219289) {G1,W12,D7,L1,V1,M1} { top ==> join( join( complement(
% 100.43/100.80 meet( converse( skol1 ), X ) ), complement( one ) ), skol1 ) }.
% 100.43/100.80 parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join(
% 100.43/100.80 join( X, Y ), Z ) }.
% 100.43/100.80 parent1[0; 2]: (219288) {G13,W12,D6,L1,V1,M1} { top ==> join( complement(
% 100.43/100.80 meet( converse( skol1 ), X ) ), join( complement( one ), skol1 ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := complement( meet( converse( skol1 ), X ) )
% 100.43/100.80 Y := complement( one )
% 100.43/100.80 Z := skol1
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219290) {G2,W11,D7,L1,V1,M1} { top ==> join( complement( meet(
% 100.43/100.80 meet( converse( skol1 ), X ), one ) ), skol1 ) }.
% 100.43/100.80 parent0[0]: (473) {G17,W10,D4,L1,V2,M1} P(3,460) { join( complement( X ),
% 100.43/100.80 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 100.43/100.80 parent1[0; 3]: (219289) {G1,W12,D7,L1,V1,M1} { top ==> join( join(
% 100.43/100.80 complement( meet( converse( skol1 ), X ) ), complement( one ) ), skol1 )
% 100.43/100.80 }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := meet( converse( skol1 ), X )
% 100.43/100.80 Y := one
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219291) {G3,W9,D6,L1,V1,M1} { top ==> join( complement( meet(
% 100.43/100.80 converse( skol1 ), X ) ), skol1 ) }.
% 100.43/100.80 parent0[0]: (971) {G32,W11,D5,L1,V1,M1} P(969,43);d(58);d(450) { meet( meet
% 100.43/100.80 ( converse( skol1 ), X ), one ) ==> meet( converse( skol1 ), X ) }.
% 100.43/100.80 parent1[0; 4]: (219290) {G2,W11,D7,L1,V1,M1} { top ==> join( complement(
% 100.43/100.80 meet( meet( converse( skol1 ), X ), one ) ), skol1 ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219292) {G3,W9,D6,L1,V1,M1} { join( complement( meet( converse(
% 100.43/100.80 skol1 ), X ) ), skol1 ) ==> top }.
% 100.43/100.80 parent0[0]: (219291) {G3,W9,D6,L1,V1,M1} { top ==> join( complement( meet
% 100.43/100.80 ( converse( skol1 ), X ) ), skol1 ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (33270) {G42,W9,D6,L1,V1,M1} P(33230,603);d(1);d(473);d(971)
% 100.43/100.80 { join( complement( meet( converse( skol1 ), X ) ), skol1 ) ==> top }.
% 100.43/100.80 parent0: (219292) {G3,W9,D6,L1,V1,M1} { join( complement( meet( converse(
% 100.43/100.80 skol1 ), X ) ), skol1 ) ==> top }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219294) {G42,W9,D6,L1,V1,M1} { top ==> join( complement( meet(
% 100.43/100.80 converse( skol1 ), X ) ), skol1 ) }.
% 100.43/100.80 parent0[0]: (33270) {G42,W9,D6,L1,V1,M1} P(33230,603);d(1);d(473);d(971) {
% 100.43/100.80 join( complement( meet( converse( skol1 ), X ) ), skol1 ) ==> top }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219297) {G24,W7,D5,L1,V0,M1} { top ==> join( complement(
% 100.43/100.80 converse( skol1 ) ), skol1 ) }.
% 100.43/100.80 parent0[0]: (1823) {G23,W11,D5,L1,V3,M1} P(141,1085) { meet( Y, composition
% 100.43/100.80 ( join( one, Z ), join( X, Y ) ) ) ==> Y }.
% 100.43/100.80 parent1[0; 4]: (219294) {G42,W9,D6,L1,V1,M1} { top ==> join( complement(
% 100.43/100.80 meet( converse( skol1 ), X ) ), skol1 ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := converse( skol1 )
% 100.43/100.80 Z := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := composition( join( one, X ), join( Y, converse( skol1 ) ) )
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219298) {G24,W7,D5,L1,V0,M1} { join( complement( converse( skol1
% 100.43/100.80 ) ), skol1 ) ==> top }.
% 100.43/100.80 parent0[0]: (219297) {G24,W7,D5,L1,V0,M1} { top ==> join( complement(
% 100.43/100.80 converse( skol1 ) ), skol1 ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (33407) {G43,W7,D5,L1,V0,M1} P(1823,33270) { join( complement
% 100.43/100.80 ( converse( skol1 ) ), skol1 ) ==> top }.
% 100.43/100.80 parent0: (219298) {G24,W7,D5,L1,V0,M1} { join( complement( converse( skol1
% 100.43/100.80 ) ), skol1 ) ==> top }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219300) {G32,W10,D5,L1,V2,M1} { Y ==> meet( join( complement( X )
% 100.43/100.80 , Y ), join( X, Y ) ) }.
% 100.43/100.80 parent0[0]: (32505) {G32,W10,D5,L1,V2,M1} P(10556,32223);d(995);d(1047) {
% 100.43/100.80 meet( join( complement( X ), Y ), join( X, Y ) ) ==> Y }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219302) {G33,W8,D5,L1,V0,M1} { skol1 ==> meet( top, join(
% 100.43/100.80 converse( skol1 ), skol1 ) ) }.
% 100.43/100.80 parent0[0]: (33407) {G43,W7,D5,L1,V0,M1} P(1823,33270) { join( complement(
% 100.43/100.80 converse( skol1 ) ), skol1 ) ==> top }.
% 100.43/100.80 parent1[0; 3]: (219300) {G32,W10,D5,L1,V2,M1} { Y ==> meet( join(
% 100.43/100.80 complement( X ), Y ), join( X, Y ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := converse( skol1 )
% 100.43/100.80 Y := skol1
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219304) {G14,W6,D4,L1,V0,M1} { skol1 ==> join( converse( skol1 )
% 100.43/100.80 , skol1 ) }.
% 100.43/100.80 parent0[0]: (452) {G13,W5,D3,L1,V1,M1} P(56,418);d(450) { meet( top, X )
% 100.43/100.80 ==> X }.
% 100.43/100.80 parent1[0; 2]: (219302) {G33,W8,D5,L1,V0,M1} { skol1 ==> meet( top, join(
% 100.43/100.80 converse( skol1 ), skol1 ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := join( converse( skol1 ), skol1 )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219305) {G14,W6,D4,L1,V0,M1} { join( converse( skol1 ), skol1 )
% 100.43/100.80 ==> skol1 }.
% 100.43/100.80 parent0[0]: (219304) {G14,W6,D4,L1,V0,M1} { skol1 ==> join( converse(
% 100.43/100.80 skol1 ), skol1 ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (33425) {G44,W6,D4,L1,V0,M1} P(33407,32505);d(452) { join(
% 100.43/100.80 converse( skol1 ), skol1 ) ==> skol1 }.
% 100.43/100.80 parent0: (219305) {G14,W6,D4,L1,V0,M1} { join( converse( skol1 ), skol1 )
% 100.43/100.80 ==> skol1 }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219307) {G22,W14,D5,L1,V3,M1} { converse( join( Y, X ) ) ==> join
% 100.43/100.80 ( converse( join( X, Y ) ), meet( converse( Y ), Z ) ) }.
% 100.43/100.80 parent0[0]: (908) {G22,W14,D5,L1,V3,M1} P(733,30);d(21) { join( converse(
% 100.43/100.80 join( Z, X ) ), meet( converse( X ), Y ) ) ==> converse( join( X, Z ) )
% 100.43/100.80 }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := Z
% 100.43/100.80 Z := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219312) {G23,W13,D5,L1,V1,M1} { converse( join( skol1, converse
% 100.43/100.80 ( skol1 ) ) ) ==> join( converse( skol1 ), meet( converse( skol1 ), X ) )
% 100.43/100.80 }.
% 100.43/100.80 parent0[0]: (33425) {G44,W6,D4,L1,V0,M1} P(33407,32505);d(452) { join(
% 100.43/100.80 converse( skol1 ), skol1 ) ==> skol1 }.
% 100.43/100.80 parent1[0; 8]: (219307) {G22,W14,D5,L1,V3,M1} { converse( join( Y, X ) )
% 100.43/100.80 ==> join( converse( join( X, Y ) ), meet( converse( Y ), Z ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := converse( skol1 )
% 100.43/100.80 Y := skol1
% 100.43/100.80 Z := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219313) {G21,W8,D5,L1,V0,M1} { converse( join( skol1, converse(
% 100.43/100.80 skol1 ) ) ) ==> converse( skol1 ) }.
% 100.43/100.80 parent0[0]: (699) {G20,W7,D4,L1,V2,M1} P(460,693) { join( Y, meet( Y, X ) )
% 100.43/100.80 ==> Y }.
% 100.43/100.80 parent1[0; 6]: (219312) {G23,W13,D5,L1,V1,M1} { converse( join( skol1,
% 100.43/100.80 converse( skol1 ) ) ) ==> join( converse( skol1 ), meet( converse( skol1
% 100.43/100.80 ), X ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := converse( skol1 )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219314) {G2,W7,D4,L1,V0,M1} { join( converse( skol1 ), skol1 )
% 100.43/100.80 ==> converse( skol1 ) }.
% 100.43/100.80 parent0[0]: (21) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 100.43/100.80 ( X ) ) ) ==> join( converse( Y ), X ) }.
% 100.43/100.80 parent1[0; 1]: (219313) {G21,W8,D5,L1,V0,M1} { converse( join( skol1,
% 100.43/100.80 converse( skol1 ) ) ) ==> converse( skol1 ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := skol1
% 100.43/100.80 Y := skol1
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219315) {G3,W4,D3,L1,V0,M1} { skol1 ==> converse( skol1 ) }.
% 100.43/100.80 parent0[0]: (33425) {G44,W6,D4,L1,V0,M1} P(33407,32505);d(452) { join(
% 100.43/100.80 converse( skol1 ), skol1 ) ==> skol1 }.
% 100.43/100.80 parent1[0; 1]: (219314) {G2,W7,D4,L1,V0,M1} { join( converse( skol1 ),
% 100.43/100.80 skol1 ) ==> converse( skol1 ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219316) {G3,W4,D3,L1,V0,M1} { converse( skol1 ) ==> skol1 }.
% 100.43/100.80 parent0[0]: (219315) {G3,W4,D3,L1,V0,M1} { skol1 ==> converse( skol1 ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (33452) {G45,W4,D3,L1,V0,M1} P(33425,908);d(699);d(21);d(33425
% 100.43/100.80 ) { converse( skol1 ) ==> skol1 }.
% 100.43/100.80 parent0: (219316) {G3,W4,D3,L1,V0,M1} { converse( skol1 ) ==> skol1 }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219326) {G19,W16,D6,L1,V3,M1} { complement( join( complement( X
% 100.43/100.80 ), join( complement( Y ), Z ) ) ) = complement( join( complement( meet(
% 100.43/100.80 Y, X ) ), Z ) ) }.
% 100.43/100.80 parent0[0]: (999) {G18,W14,D5,L1,V3,M1} P(473,27) { join( join( complement
% 100.43/100.80 ( X ), Z ), complement( Y ) ) ==> join( complement( meet( X, Y ) ), Z )
% 100.43/100.80 }.
% 100.43/100.80 parent1[0; 10]: (3585) {G19,W9,D4,L1,V2,M1} P(1795,56);d(1795) { complement
% 100.43/100.80 ( join( X, Y ) ) = complement( join( Y, X ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := X
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := complement( X )
% 100.43/100.80 Y := join( complement( Y ), Z )
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219328) {G18,W15,D6,L1,V3,M1} { complement( join( complement( X
% 100.43/100.80 ), join( complement( Y ), Z ) ) ) = meet( meet( Y, X ), complement( Z )
% 100.43/100.80 ) }.
% 100.43/100.80 parent0[0]: (472) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join(
% 100.43/100.80 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 100.43/100.80 parent1[0; 9]: (219326) {G19,W16,D6,L1,V3,M1} { complement( join(
% 100.43/100.80 complement( X ), join( complement( Y ), Z ) ) ) = complement( join(
% 100.43/100.80 complement( meet( Y, X ) ), Z ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := meet( Y, X )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219332) {G18,W14,D6,L1,V3,M1} { meet( X, complement( join(
% 100.43/100.80 complement( Y ), Z ) ) ) = meet( meet( Y, X ), complement( Z ) ) }.
% 100.43/100.80 parent0[0]: (472) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join(
% 100.43/100.80 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 100.43/100.80 parent1[0; 1]: (219328) {G18,W15,D6,L1,V3,M1} { complement( join(
% 100.43/100.80 complement( X ), join( complement( Y ), Z ) ) ) = meet( meet( Y, X ),
% 100.43/100.80 complement( Z ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := join( complement( Y ), Z )
% 100.43/100.80 Y := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219334) {G18,W13,D5,L1,V3,M1} { meet( X, meet( Y, complement( Z
% 100.43/100.80 ) ) ) = meet( meet( Y, X ), complement( Z ) ) }.
% 100.43/100.80 parent0[0]: (472) {G17,W10,D5,L1,V2,M1} P(460,3) { complement( join(
% 100.43/100.80 complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 100.43/100.80 parent1[0; 3]: (219332) {G18,W14,D6,L1,V3,M1} { meet( X, complement( join
% 100.43/100.80 ( complement( Y ), Z ) ) ) = meet( meet( Y, X ), complement( Z ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (34145) {G20,W13,D5,L1,V3,M1} P(999,3585);d(472);d(472);d(472)
% 100.43/100.80 { meet( Z, meet( X, complement( Y ) ) ) ==> meet( meet( X, Z ),
% 100.43/100.80 complement( Y ) ) }.
% 100.43/100.80 parent0: (219334) {G18,W13,D5,L1,V3,M1} { meet( X, meet( Y, complement( Z
% 100.43/100.80 ) ) ) = meet( meet( Y, X ), complement( Z ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := X
% 100.43/100.80 Z := Y
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219337) {G26,W11,D6,L1,V2,M1} { zero ==> meet( X, composition(
% 100.43/100.80 converse( Y ), complement( composition( Y, X ) ) ) ) }.
% 100.43/100.80 parent0[0]: (1109) {G26,W11,D6,L1,V2,M1} P(89,1074);d(460) { meet( X,
% 100.43/100.80 composition( converse( Y ), complement( composition( Y, X ) ) ) ) ==>
% 100.43/100.80 zero }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219338) {G27,W10,D6,L1,V1,M1} { zero ==> meet( X, composition(
% 100.43/100.80 skol1, complement( composition( skol1, X ) ) ) ) }.
% 100.43/100.80 parent0[0]: (33452) {G45,W4,D3,L1,V0,M1} P(33425,908);d(699);d(21);d(33425)
% 100.43/100.80 { converse( skol1 ) ==> skol1 }.
% 100.43/100.80 parent1[0; 5]: (219337) {G26,W11,D6,L1,V2,M1} { zero ==> meet( X,
% 100.43/100.80 composition( converse( Y ), complement( composition( Y, X ) ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := skol1
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219339) {G27,W10,D6,L1,V1,M1} { meet( X, composition( skol1,
% 100.43/100.80 complement( composition( skol1, X ) ) ) ) ==> zero }.
% 100.43/100.80 parent0[0]: (219338) {G27,W10,D6,L1,V1,M1} { zero ==> meet( X, composition
% 100.43/100.80 ( skol1, complement( composition( skol1, X ) ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (36322) {G46,W10,D6,L1,V1,M1} P(33452,1109) { meet( X,
% 100.43/100.80 composition( skol1, complement( composition( skol1, X ) ) ) ) ==> zero
% 100.43/100.80 }.
% 100.43/100.80 parent0: (219339) {G27,W10,D6,L1,V1,M1} { meet( X, composition( skol1,
% 100.43/100.80 complement( composition( skol1, X ) ) ) ) ==> zero }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219341) {G27,W11,D5,L1,V2,M1} { meet( complement( Y ), X ) ==>
% 100.43/100.80 meet( X, complement( meet( X, Y ) ) ) }.
% 100.43/100.80 parent0[0]: (12201) {G27,W11,D5,L1,V2,M1} P(10559,472);d(471);d(994);d(473)
% 100.43/100.80 { meet( X, complement( meet( X, Y ) ) ) ==> meet( complement( Y ), X )
% 100.43/100.80 }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219345) {G28,W14,D7,L1,V1,M1} { meet( complement( composition(
% 100.43/100.80 skol1, complement( composition( skol1, X ) ) ) ), X ) ==> meet( X,
% 100.43/100.80 complement( zero ) ) }.
% 100.43/100.80 parent0[0]: (36322) {G46,W10,D6,L1,V1,M1} P(33452,1109) { meet( X,
% 100.43/100.80 composition( skol1, complement( composition( skol1, X ) ) ) ) ==> zero
% 100.43/100.80 }.
% 100.43/100.80 parent1[0; 13]: (219341) {G27,W11,D5,L1,V2,M1} { meet( complement( Y ), X
% 100.43/100.80 ) ==> meet( X, complement( meet( X, Y ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := composition( skol1, complement( composition( skol1, X ) ) )
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219346) {G14,W13,D7,L1,V1,M1} { meet( complement( composition(
% 100.43/100.80 skol1, complement( composition( skol1, X ) ) ) ), X ) ==> meet( X, top )
% 100.43/100.80 }.
% 100.43/100.80 parent0[0]: (451) {G13,W4,D3,L1,V0,M1} P(146,418);d(450);d(58) { complement
% 100.43/100.80 ( zero ) ==> top }.
% 100.43/100.80 parent1[0; 12]: (219345) {G28,W14,D7,L1,V1,M1} { meet( complement(
% 100.43/100.80 composition( skol1, complement( composition( skol1, X ) ) ) ), X ) ==>
% 100.43/100.80 meet( X, complement( zero ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219347) {G15,W11,D7,L1,V1,M1} { meet( complement( composition(
% 100.43/100.80 skol1, complement( composition( skol1, X ) ) ) ), X ) ==> X }.
% 100.43/100.80 parent0[0]: (458) {G15,W5,D3,L1,V1,M1} P(457,43);d(455);d(60) { meet( X,
% 100.43/100.80 top ) ==> X }.
% 100.43/100.80 parent1[0; 10]: (219346) {G14,W13,D7,L1,V1,M1} { meet( complement(
% 100.43/100.80 composition( skol1, complement( composition( skol1, X ) ) ) ), X ) ==>
% 100.43/100.80 meet( X, top ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (36390) {G47,W11,D7,L1,V1,M1} P(36322,12201);d(451);d(458) {
% 100.43/100.80 meet( complement( composition( skol1, complement( composition( skol1, X )
% 100.43/100.80 ) ) ), X ) ==> X }.
% 100.43/100.80 parent0: (219347) {G15,W11,D7,L1,V1,M1} { meet( complement( composition(
% 100.43/100.80 skol1, complement( composition( skol1, X ) ) ) ), X ) ==> X }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219350) {G20,W13,D5,L1,V2,M1} { join( X, composition( Y, skol1 )
% 100.43/100.80 ) ==> join( X, composition( join( Y, X ), skol1 ) ) }.
% 100.43/100.80 parent0[0]: (2125) {G20,W13,D5,L1,V2,M1} P(2111,69);d(1);d(2118) { join( X
% 100.43/100.80 , composition( join( Y, X ), skol1 ) ) ==> join( X, composition( Y, skol1
% 100.43/100.80 ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219352) {G2,W12,D5,L1,V1,M1} { join( X, composition( complement
% 100.43/100.80 ( X ), skol1 ) ) ==> join( X, composition( top, skol1 ) ) }.
% 100.43/100.80 parent0[0]: (15) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X )
% 100.43/100.80 ==> top }.
% 100.43/100.80 parent1[0; 10]: (219350) {G20,W13,D5,L1,V2,M1} { join( X, composition( Y,
% 100.43/100.80 skol1 ) ) ==> join( X, composition( join( Y, X ), skol1 ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := complement( X )
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (73603) {G21,W12,D5,L1,V1,M1} P(15,2125) { join( X,
% 100.43/100.80 composition( complement( X ), skol1 ) ) ==> join( X, composition( top,
% 100.43/100.80 skol1 ) ) }.
% 100.43/100.80 parent0: (219352) {G2,W12,D5,L1,V1,M1} { join( X, composition( complement
% 100.43/100.80 ( X ), skol1 ) ) ==> join( X, composition( top, skol1 ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219356) {G27,W11,D5,L1,V2,M1} { join( complement( Y ), X ) ==>
% 100.43/100.80 join( X, complement( join( X, Y ) ) ) }.
% 100.43/100.80 parent0[0]: (12205) {G27,W11,D5,L1,V2,M1} P(1795,10559) { join( X,
% 100.43/100.80 complement( join( X, Y ) ) ) ==> join( complement( Y ), X ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219360) {G26,W17,D7,L1,V1,M1} { join( complement( complement(
% 100.43/100.80 composition( complement( X ), skol1 ) ) ), X ) ==> join( X, complement(
% 100.43/100.80 complement( composition( complement( X ), skol1 ) ) ) ) }.
% 100.43/100.80 parent0[0]: (2275) {G25,W13,D6,L1,V1,M1} P(2108,994) { join( X, complement
% 100.43/100.80 ( composition( complement( X ), skol1 ) ) ) ==> complement( composition(
% 100.43/100.80 complement( X ), skol1 ) ) }.
% 100.43/100.80 parent1[0; 12]: (219356) {G27,W11,D5,L1,V2,M1} { join( complement( Y ), X
% 100.43/100.80 ) ==> join( X, complement( join( X, Y ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := complement( composition( complement( X ), skol1 ) )
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219362) {G17,W15,D7,L1,V1,M1} { join( complement( complement(
% 100.43/100.80 composition( complement( X ), skol1 ) ) ), X ) ==> join( X, composition(
% 100.43/100.80 complement( X ), skol1 ) ) }.
% 100.43/100.80 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.43/100.80 complement( X ) ) ==> X }.
% 100.43/100.80 parent1[0; 11]: (219360) {G26,W17,D7,L1,V1,M1} { join( complement(
% 100.43/100.80 complement( composition( complement( X ), skol1 ) ) ), X ) ==> join( X,
% 100.43/100.80 complement( complement( composition( complement( X ), skol1 ) ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := composition( complement( X ), skol1 )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219363) {G17,W13,D5,L1,V1,M1} { join( composition( complement( X
% 100.43/100.80 ), skol1 ), X ) ==> join( X, composition( complement( X ), skol1 ) ) }.
% 100.43/100.80 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.43/100.80 complement( X ) ) ==> X }.
% 100.43/100.80 parent1[0; 2]: (219362) {G17,W15,D7,L1,V1,M1} { join( complement(
% 100.43/100.80 complement( composition( complement( X ), skol1 ) ) ), X ) ==> join( X,
% 100.43/100.80 composition( complement( X ), skol1 ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := composition( complement( X ), skol1 )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219366) {G18,W12,D5,L1,V1,M1} { join( composition( complement( X
% 100.43/100.80 ), skol1 ), X ) ==> join( X, composition( top, skol1 ) ) }.
% 100.43/100.80 parent0[0]: (73603) {G21,W12,D5,L1,V1,M1} P(15,2125) { join( X, composition
% 100.43/100.80 ( complement( X ), skol1 ) ) ==> join( X, composition( top, skol1 ) ) }.
% 100.43/100.80 parent1[0; 7]: (219363) {G17,W13,D5,L1,V1,M1} { join( composition(
% 100.43/100.80 complement( X ), skol1 ), X ) ==> join( X, composition( complement( X ),
% 100.43/100.80 skol1 ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (76952) {G28,W12,D5,L1,V1,M1} P(2275,12205);d(460);d(73603) {
% 100.43/100.80 join( composition( complement( X ), skol1 ), X ) ==> join( X, composition
% 100.43/100.80 ( top, skol1 ) ) }.
% 100.43/100.80 parent0: (219366) {G18,W12,D5,L1,V1,M1} { join( composition( complement( X
% 100.43/100.80 ), skol1 ), X ) ==> join( X, composition( top, skol1 ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219375) {G34,W15,D8,L1,V2,M1} { meet( X, meet( Y, complement(
% 100.43/100.80 composition( skol1, complement( composition( skol1, Y ) ) ) ) ) ) = meet
% 100.43/100.80 ( X, Y ) }.
% 100.43/100.80 parent0[0]: (36390) {G47,W11,D7,L1,V1,M1} P(36322,12201);d(451);d(458) {
% 100.43/100.80 meet( complement( composition( skol1, complement( composition( skol1, X )
% 100.43/100.80 ) ) ), X ) ==> X }.
% 100.43/100.80 parent1[0; 14]: (32324) {G33,W11,D4,L1,V3,M1} P(32268,56) { meet( Z, meet(
% 100.43/100.80 Y, X ) ) = meet( Z, meet( X, Y ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := complement( composition( skol1, complement( composition( skol1, Y )
% 100.43/100.80 ) ) )
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219376) {G21,W15,D7,L1,V2,M1} { meet( meet( Y, X ), complement(
% 100.43/100.80 composition( skol1, complement( composition( skol1, Y ) ) ) ) ) = meet( X
% 100.43/100.80 , Y ) }.
% 100.43/100.80 parent0[0]: (34145) {G20,W13,D5,L1,V3,M1} P(999,3585);d(472);d(472);d(472)
% 100.43/100.80 { meet( Z, meet( X, complement( Y ) ) ) ==> meet( meet( X, Z ),
% 100.43/100.80 complement( Y ) ) }.
% 100.43/100.80 parent1[0; 1]: (219375) {G34,W15,D8,L1,V2,M1} { meet( X, meet( Y,
% 100.43/100.80 complement( composition( skol1, complement( composition( skol1, Y ) ) ) )
% 100.43/100.80 ) ) = meet( X, Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := composition( skol1, complement( composition( skol1, Y ) ) )
% 100.43/100.80 Z := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (85064) {G48,W15,D7,L1,V2,M1} P(36390,32324);d(34145) { meet(
% 100.43/100.80 meet( X, Y ), complement( composition( skol1, complement( composition(
% 100.43/100.80 skol1, X ) ) ) ) ) ==> meet( Y, X ) }.
% 100.43/100.80 parent0: (219376) {G21,W15,D7,L1,V2,M1} { meet( meet( Y, X ), complement(
% 100.43/100.80 composition( skol1, complement( composition( skol1, Y ) ) ) ) ) = meet( X
% 100.43/100.80 , Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := X
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219379) {G31,W12,D5,L1,V2,M1} { converse( join( complement( X ),
% 100.43/100.80 Y ) ) ==> join( complement( converse( X ) ), converse( Y ) ) }.
% 100.43/100.80 parent0[0]: (12696) {G31,W12,D5,L1,V2,M1} P(12649,8) { join( complement(
% 100.43/100.80 converse( X ) ), converse( Y ) ) ==> converse( join( complement( X ), Y )
% 100.43/100.80 ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219384) {G31,W14,D5,L1,V2,M1} { converse( join( complement( X )
% 100.43/100.80 , complement( Y ) ) ) ==> join( complement( converse( X ) ), complement(
% 100.43/100.80 converse( Y ) ) ) }.
% 100.43/100.80 parent0[0]: (12649) {G30,W7,D4,L1,V1,M1} P(12515,2031);d(12562);d(1872) {
% 100.43/100.80 converse( complement( X ) ) ==> complement( converse( X ) ) }.
% 100.43/100.80 parent1[0; 11]: (219379) {G31,W12,D5,L1,V2,M1} { converse( join(
% 100.43/100.80 complement( X ), Y ) ) ==> join( complement( converse( X ) ), converse( Y
% 100.43/100.80 ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := complement( Y )
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219386) {G18,W13,D5,L1,V2,M1} { converse( join( complement( X )
% 100.43/100.80 , complement( Y ) ) ) ==> complement( meet( converse( X ), converse( Y )
% 100.43/100.80 ) ) }.
% 100.43/100.80 parent0[0]: (473) {G17,W10,D4,L1,V2,M1} P(3,460) { join( complement( X ),
% 100.43/100.80 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 100.43/100.80 parent1[0; 7]: (219384) {G31,W14,D5,L1,V2,M1} { converse( join( complement
% 100.43/100.80 ( X ), complement( Y ) ) ) ==> join( complement( converse( X ) ),
% 100.43/100.80 complement( converse( Y ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := converse( X )
% 100.43/100.80 Y := converse( Y )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219388) {G18,W12,D5,L1,V2,M1} { converse( complement( meet( X, Y
% 100.43/100.80 ) ) ) ==> complement( meet( converse( X ), converse( Y ) ) ) }.
% 100.43/100.80 parent0[0]: (473) {G17,W10,D4,L1,V2,M1} P(3,460) { join( complement( X ),
% 100.43/100.80 complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 100.43/100.80 parent1[0; 2]: (219386) {G18,W13,D5,L1,V2,M1} { converse( join( complement
% 100.43/100.80 ( X ), complement( Y ) ) ) ==> complement( meet( converse( X ), converse
% 100.43/100.80 ( Y ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219389) {G19,W12,D5,L1,V2,M1} { complement( converse( meet( X, Y
% 100.43/100.80 ) ) ) ==> complement( meet( converse( X ), converse( Y ) ) ) }.
% 100.43/100.80 parent0[0]: (12649) {G30,W7,D4,L1,V1,M1} P(12515,2031);d(12562);d(1872) {
% 100.43/100.80 converse( complement( X ) ) ==> complement( converse( X ) ) }.
% 100.43/100.80 parent1[0; 1]: (219388) {G18,W12,D5,L1,V2,M1} { converse( complement( meet
% 100.43/100.80 ( X, Y ) ) ) ==> complement( meet( converse( X ), converse( Y ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := meet( X, Y )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219390) {G19,W12,D5,L1,V2,M1} { complement( meet( converse( X ),
% 100.43/100.80 converse( Y ) ) ) ==> complement( converse( meet( X, Y ) ) ) }.
% 100.43/100.80 parent0[0]: (219389) {G19,W12,D5,L1,V2,M1} { complement( converse( meet( X
% 100.43/100.80 , Y ) ) ) ==> complement( meet( converse( X ), converse( Y ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (126884) {G32,W12,D5,L1,V2,M1} P(12649,12696);d(473);d(473);d(
% 100.43/100.80 12649) { complement( meet( converse( Y ), converse( X ) ) ) ==>
% 100.43/100.80 complement( converse( meet( Y, X ) ) ) }.
% 100.43/100.80 parent0: (219390) {G19,W12,D5,L1,V2,M1} { complement( meet( converse( X )
% 100.43/100.80 , converse( Y ) ) ) ==> complement( converse( meet( X, Y ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := X
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219392) {G16,W5,D4,L1,V1,M1} { X ==> complement( complement( X )
% 100.43/100.80 ) }.
% 100.43/100.80 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.43/100.80 complement( X ) ) ==> X }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219394) {G17,W12,D6,L1,V2,M1} { meet( converse( X ), converse( Y
% 100.43/100.80 ) ) ==> complement( complement( converse( meet( X, Y ) ) ) ) }.
% 100.43/100.80 parent0[0]: (126884) {G32,W12,D5,L1,V2,M1} P(12649,12696);d(473);d(473);d(
% 100.43/100.80 12649) { complement( meet( converse( Y ), converse( X ) ) ) ==>
% 100.43/100.80 complement( converse( meet( Y, X ) ) ) }.
% 100.43/100.80 parent1[0; 7]: (219392) {G16,W5,D4,L1,V1,M1} { X ==> complement(
% 100.43/100.80 complement( X ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := meet( converse( X ), converse( Y ) )
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219395) {G17,W10,D4,L1,V2,M1} { meet( converse( X ), converse( Y
% 100.43/100.80 ) ) ==> converse( meet( X, Y ) ) }.
% 100.43/100.80 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.43/100.80 complement( X ) ) ==> X }.
% 100.43/100.80 parent1[0; 6]: (219394) {G17,W12,D6,L1,V2,M1} { meet( converse( X ),
% 100.43/100.80 converse( Y ) ) ==> complement( complement( converse( meet( X, Y ) ) ) )
% 100.43/100.80 }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := converse( meet( X, Y ) )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (126999) {G33,W10,D4,L1,V2,M1} P(126884,460);d(460) { meet(
% 100.43/100.80 converse( X ), converse( Y ) ) ==> converse( meet( X, Y ) ) }.
% 100.43/100.80 parent0: (219395) {G17,W10,D4,L1,V2,M1} { meet( converse( X ), converse( Y
% 100.43/100.80 ) ) ==> converse( meet( X, Y ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219398) {G33,W10,D4,L1,V2,M1} { converse( meet( X, Y ) ) ==> meet
% 100.43/100.80 ( converse( X ), converse( Y ) ) }.
% 100.43/100.80 parent0[0]: (126999) {G33,W10,D4,L1,V2,M1} P(126884,460);d(460) { meet(
% 100.43/100.80 converse( X ), converse( Y ) ) ==> converse( meet( X, Y ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219400) {G1,W10,D5,L1,V2,M1} { converse( meet( X, converse( Y )
% 100.43/100.80 ) ) ==> meet( converse( X ), Y ) }.
% 100.43/100.80 parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 100.43/100.80 parent1[0; 9]: (219398) {G33,W10,D4,L1,V2,M1} { converse( meet( X, Y ) )
% 100.43/100.80 ==> meet( converse( X ), converse( Y ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := converse( Y )
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (127029) {G34,W10,D5,L1,V2,M1} P(7,126999) { converse( meet( Y
% 100.43/100.80 , converse( X ) ) ) ==> meet( converse( Y ), X ) }.
% 100.43/100.80 parent0: (219400) {G1,W10,D5,L1,V2,M1} { converse( meet( X, converse( Y )
% 100.43/100.80 ) ) ==> meet( converse( X ), Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := X
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219404) {G34,W10,D5,L1,V2,M1} { Y ==> meet( join( X, Y ), join( Y
% 100.43/100.80 , complement( X ) ) ) }.
% 100.43/100.80 parent0[0]: (32559) {G34,W10,D5,L1,V2,M1} P(32504,1493);d(32553);d(468) {
% 100.43/100.80 meet( join( Y, X ), join( X, complement( Y ) ) ) ==> X }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219409) {G29,W20,D7,L1,V1,M1} { composition( complement(
% 100.43/100.80 complement( X ) ), skol1 ) ==> meet( join( X, composition( complement(
% 100.43/100.80 complement( X ) ), skol1 ) ), join( complement( X ), composition( top,
% 100.43/100.80 skol1 ) ) ) }.
% 100.43/100.80 parent0[0]: (76952) {G28,W12,D5,L1,V1,M1} P(2275,12205);d(460);d(73603) {
% 100.43/100.80 join( composition( complement( X ), skol1 ), X ) ==> join( X, composition
% 100.43/100.80 ( top, skol1 ) ) }.
% 100.43/100.80 parent1[0; 14]: (219404) {G34,W10,D5,L1,V2,M1} { Y ==> meet( join( X, Y )
% 100.43/100.80 , join( Y, complement( X ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := complement( X )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := composition( complement( complement( X ) ), skol1 )
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219411) {G17,W18,D5,L1,V1,M1} { composition( complement(
% 100.43/100.80 complement( X ) ), skol1 ) ==> meet( join( X, composition( X, skol1 ) ),
% 100.43/100.80 join( complement( X ), composition( top, skol1 ) ) ) }.
% 100.43/100.80 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.43/100.80 complement( X ) ) ==> X }.
% 100.43/100.80 parent1[0; 10]: (219409) {G29,W20,D7,L1,V1,M1} { composition( complement(
% 100.43/100.80 complement( X ) ), skol1 ) ==> meet( join( X, composition( complement(
% 100.43/100.80 complement( X ) ), skol1 ) ), join( complement( X ), composition( top,
% 100.43/100.80 skol1 ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219412) {G17,W16,D5,L1,V1,M1} { composition( X, skol1 ) ==> meet
% 100.43/100.80 ( join( X, composition( X, skol1 ) ), join( complement( X ), composition
% 100.43/100.80 ( top, skol1 ) ) ) }.
% 100.43/100.80 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.43/100.80 complement( X ) ) ==> X }.
% 100.43/100.80 parent1[0; 2]: (219411) {G17,W18,D5,L1,V1,M1} { composition( complement(
% 100.43/100.80 complement( X ) ), skol1 ) ==> meet( join( X, composition( X, skol1 ) ),
% 100.43/100.80 join( complement( X ), composition( top, skol1 ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219416) {G18,W12,D5,L1,V1,M1} { composition( X, skol1 ) ==> meet
% 100.43/100.80 ( X, join( complement( X ), composition( top, skol1 ) ) ) }.
% 100.43/100.80 parent0[0]: (2111) {G19,W7,D4,L1,V1,M1} P(2094,479) { join( X, composition
% 100.43/100.80 ( X, skol1 ) ) ==> X }.
% 100.43/100.80 parent1[0; 5]: (219412) {G17,W16,D5,L1,V1,M1} { composition( X, skol1 )
% 100.43/100.80 ==> meet( join( X, composition( X, skol1 ) ), join( complement( X ),
% 100.43/100.80 composition( top, skol1 ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219417) {G19,W9,D4,L1,V1,M1} { composition( X, skol1 ) ==> meet
% 100.43/100.80 ( composition( top, skol1 ), X ) }.
% 100.43/100.80 parent0[0]: (32163) {G30,W10,D5,L1,V2,M1} P(32126,10571);d(32160);d(469) {
% 100.43/100.80 meet( X, join( complement( X ), Y ) ) ==> meet( Y, X ) }.
% 100.43/100.80 parent1[0; 4]: (219416) {G18,W12,D5,L1,V1,M1} { composition( X, skol1 )
% 100.43/100.80 ==> meet( X, join( complement( X ), composition( top, skol1 ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := composition( top, skol1 )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219418) {G19,W9,D4,L1,V1,M1} { meet( composition( top, skol1 ), X
% 100.43/100.80 ) ==> composition( X, skol1 ) }.
% 100.43/100.80 parent0[0]: (219417) {G19,W9,D4,L1,V1,M1} { composition( X, skol1 ) ==>
% 100.43/100.80 meet( composition( top, skol1 ), X ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (137140) {G35,W9,D4,L1,V1,M1} P(76952,32559);d(460);d(2111);d(
% 100.43/100.80 32163) { meet( composition( top, skol1 ), X ) ==> composition( X, skol1 )
% 100.43/100.80 }.
% 100.43/100.80 parent0: (219418) {G19,W9,D4,L1,V1,M1} { meet( composition( top, skol1 ),
% 100.43/100.80 X ) ==> composition( X, skol1 ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219420) {G34,W10,D5,L1,V2,M1} { meet( converse( X ), Y ) ==>
% 100.43/100.80 converse( meet( X, converse( Y ) ) ) }.
% 100.43/100.80 parent0[0]: (127029) {G34,W10,D5,L1,V2,M1} P(7,126999) { converse( meet( Y
% 100.43/100.80 , converse( X ) ) ) ==> meet( converse( Y ), X ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219424) {G35,W12,D5,L1,V1,M1} { meet( converse( composition( top
% 100.43/100.80 , skol1 ) ), X ) ==> converse( composition( converse( X ), skol1 ) ) }.
% 100.43/100.80 parent0[0]: (137140) {G35,W9,D4,L1,V1,M1} P(76952,32559);d(460);d(2111);d(
% 100.43/100.80 32163) { meet( composition( top, skol1 ), X ) ==> composition( X, skol1 )
% 100.43/100.80 }.
% 100.43/100.80 parent1[0; 8]: (219420) {G34,W10,D5,L1,V2,M1} { meet( converse( X ), Y )
% 100.43/100.80 ==> converse( meet( X, converse( Y ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := converse( X )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := composition( top, skol1 )
% 100.43/100.80 Y := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219425) {G2,W11,D5,L1,V1,M1} { meet( converse( composition( top
% 100.43/100.80 , skol1 ) ), X ) ==> composition( converse( skol1 ), X ) }.
% 100.43/100.80 parent0[0]: (18) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition(
% 100.43/100.80 converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 100.43/100.80 parent1[0; 7]: (219424) {G35,W12,D5,L1,V1,M1} { meet( converse(
% 100.43/100.80 composition( top, skol1 ) ), X ) ==> converse( composition( converse( X )
% 100.43/100.80 , skol1 ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := skol1
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219426) {G3,W10,D5,L1,V1,M1} { meet( converse( composition( top
% 100.43/100.80 , skol1 ) ), X ) ==> composition( skol1, X ) }.
% 100.43/100.80 parent0[0]: (33452) {G45,W4,D3,L1,V0,M1} P(33425,908);d(699);d(21);d(33425)
% 100.43/100.80 { converse( skol1 ) ==> skol1 }.
% 100.43/100.80 parent1[0; 8]: (219425) {G2,W11,D5,L1,V1,M1} { meet( converse( composition
% 100.43/100.80 ( top, skol1 ) ), X ) ==> composition( converse( skol1 ), X ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219427) {G4,W9,D4,L1,V1,M1} { meet( composition( skol1, top ), X
% 100.43/100.80 ) ==> composition( skol1, X ) }.
% 100.43/100.80 parent0[0]: (26361) {G35,W8,D4,L1,V0,M1} P(6015,850);d(12649);d(460);d(480)
% 100.43/100.80 ;d(451);d(282);d(23767) { converse( composition( top, skol1 ) ) ==>
% 100.43/100.80 composition( skol1, top ) }.
% 100.43/100.80 parent1[0; 2]: (219426) {G3,W10,D5,L1,V1,M1} { meet( converse( composition
% 100.43/100.80 ( top, skol1 ) ), X ) ==> composition( skol1, X ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (137152) {G46,W9,D4,L1,V1,M1} P(137140,127029);d(18);d(33452);
% 100.43/100.80 d(26361) { meet( composition( skol1, top ), X ) ==> composition( skol1, X
% 100.43/100.80 ) }.
% 100.43/100.80 parent0: (219427) {G4,W9,D4,L1,V1,M1} { meet( composition( skol1, top ), X
% 100.43/100.80 ) ==> composition( skol1, X ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219430) {G29,W15,D7,L1,V2,M1} { meet( X, Y ) ==> meet( meet( X, Y
% 100.43/100.80 ), complement( composition( skol1, complement( meet( Y, X ) ) ) ) ) }.
% 100.43/100.80 parent0[0]: (3434) {G29,W15,D7,L1,V2,M1} P(1004,2031) { meet( meet( X, Y )
% 100.43/100.80 , complement( composition( skol1, complement( meet( Y, X ) ) ) ) ) ==>
% 100.43/100.80 meet( X, Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219435) {G30,W19,D7,L1,V1,M1} { meet( X, composition( skol1, top
% 100.43/100.80 ) ) ==> meet( meet( X, composition( skol1, top ) ), complement(
% 100.43/100.80 composition( skol1, complement( composition( skol1, X ) ) ) ) ) }.
% 100.43/100.80 parent0[0]: (137152) {G46,W9,D4,L1,V1,M1} P(137140,127029);d(18);d(33452);d
% 100.43/100.80 (26361) { meet( composition( skol1, top ), X ) ==> composition( skol1, X
% 100.43/100.80 ) }.
% 100.43/100.80 parent1[0; 16]: (219430) {G29,W15,D7,L1,V2,M1} { meet( X, Y ) ==> meet(
% 100.43/100.80 meet( X, Y ), complement( composition( skol1, complement( meet( Y, X ) )
% 100.43/100.80 ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := composition( skol1, top )
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219437) {G31,W11,D4,L1,V1,M1} { meet( X, composition( skol1, top
% 100.43/100.80 ) ) ==> meet( composition( skol1, top ), X ) }.
% 100.43/100.80 parent0[0]: (85064) {G48,W15,D7,L1,V2,M1} P(36390,32324);d(34145) { meet(
% 100.43/100.80 meet( X, Y ), complement( composition( skol1, complement( composition(
% 100.43/100.80 skol1, X ) ) ) ) ) ==> meet( Y, X ) }.
% 100.43/100.80 parent1[0; 6]: (219435) {G30,W19,D7,L1,V1,M1} { meet( X, composition(
% 100.43/100.80 skol1, top ) ) ==> meet( meet( X, composition( skol1, top ) ), complement
% 100.43/100.80 ( composition( skol1, complement( composition( skol1, X ) ) ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := composition( skol1, top )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219438) {G32,W9,D4,L1,V1,M1} { meet( X, composition( skol1, top
% 100.43/100.80 ) ) ==> composition( skol1, X ) }.
% 100.43/100.80 parent0[0]: (137152) {G46,W9,D4,L1,V1,M1} P(137140,127029);d(18);d(33452);d
% 100.43/100.80 (26361) { meet( composition( skol1, top ), X ) ==> composition( skol1, X
% 100.43/100.80 ) }.
% 100.43/100.80 parent1[0; 6]: (219437) {G31,W11,D4,L1,V1,M1} { meet( X, composition(
% 100.43/100.80 skol1, top ) ) ==> meet( composition( skol1, top ), X ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (137234) {G49,W9,D4,L1,V1,M1} P(137152,3434);d(85064);d(137152
% 100.43/100.80 ) { meet( X, composition( skol1, top ) ) ==> composition( skol1, X ) }.
% 100.43/100.80 parent0: (219438) {G32,W9,D4,L1,V1,M1} { meet( X, composition( skol1, top
% 100.43/100.80 ) ) ==> composition( skol1, X ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219440) {G46,W9,D4,L1,V1,M1} { composition( skol1, X ) ==> meet(
% 100.43/100.80 composition( skol1, top ), X ) }.
% 100.43/100.80 parent0[0]: (137152) {G46,W9,D4,L1,V1,M1} P(137140,127029);d(18);d(33452);d
% 100.43/100.80 (26361) { meet( composition( skol1, top ), X ) ==> composition( skol1, X
% 100.43/100.80 ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219444) {G23,W15,D6,L1,V1,M1} { composition( skol1, complement(
% 100.43/100.80 meet( X, composition( skol1, top ) ) ) ) ==> meet( complement( X ),
% 100.43/100.80 composition( skol1, top ) ) }.
% 100.43/100.80 parent0[0]: (10310) {G22,W11,D5,L1,V2,M1} P(5214,432);d(450);d(7023);d(736)
% 100.43/100.80 { meet( X, complement( meet( Y, X ) ) ) ==> meet( complement( Y ), X )
% 100.43/100.80 }.
% 100.43/100.80 parent1[0; 9]: (219440) {G46,W9,D4,L1,V1,M1} { composition( skol1, X ) ==>
% 100.43/100.80 meet( composition( skol1, top ), X ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := composition( skol1, top )
% 100.43/100.80 Y := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := complement( meet( X, composition( skol1, top ) ) )
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219446) {G24,W13,D6,L1,V1,M1} { composition( skol1, complement(
% 100.43/100.80 meet( X, composition( skol1, top ) ) ) ) ==> composition( skol1,
% 100.43/100.80 complement( X ) ) }.
% 100.43/100.80 parent0[0]: (137234) {G49,W9,D4,L1,V1,M1} P(137152,3434);d(85064);d(137152)
% 100.43/100.80 { meet( X, composition( skol1, top ) ) ==> composition( skol1, X ) }.
% 100.43/100.80 parent1[0; 9]: (219444) {G23,W15,D6,L1,V1,M1} { composition( skol1,
% 100.43/100.80 complement( meet( X, composition( skol1, top ) ) ) ) ==> meet( complement
% 100.43/100.80 ( X ), composition( skol1, top ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := complement( X )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219448) {G25,W11,D5,L1,V1,M1} { composition( skol1, complement(
% 100.43/100.80 composition( skol1, X ) ) ) ==> composition( skol1, complement( X ) ) }.
% 100.43/100.80 parent0[0]: (137234) {G49,W9,D4,L1,V1,M1} P(137152,3434);d(85064);d(137152)
% 100.43/100.80 { meet( X, composition( skol1, top ) ) ==> composition( skol1, X ) }.
% 100.43/100.80 parent1[0; 4]: (219446) {G24,W13,D6,L1,V1,M1} { composition( skol1,
% 100.43/100.80 complement( meet( X, composition( skol1, top ) ) ) ) ==> composition(
% 100.43/100.80 skol1, complement( X ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (137318) {G50,W11,D5,L1,V1,M1} P(137152,10310);d(137234);d(
% 100.43/100.80 137234) { composition( skol1, complement( composition( skol1, X ) ) ) ==>
% 100.43/100.80 composition( skol1, complement( X ) ) }.
% 100.43/100.80 parent0: (219448) {G25,W11,D5,L1,V1,M1} { composition( skol1, complement(
% 100.43/100.80 composition( skol1, X ) ) ) ==> composition( skol1, complement( X ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219450) {G30,W12,D6,L1,V3,M1} { meet( X, Y ) ==> meet( join( X,
% 100.43/100.80 meet( complement( Y ), Z ) ), Y ) }.
% 100.43/100.80 parent0[0]: (32188) {G30,W12,D6,L1,V3,M1} P(762,32157);d(32126) { meet(
% 100.43/100.80 join( X, meet( complement( Y ), Z ) ), Y ) ==> meet( X, Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219471) {G31,W12,D6,L1,V3,M1} { meet( X, Y ) ==> meet( Y, join(
% 100.43/100.80 meet( complement( Y ), Z ), X ) ) }.
% 100.43/100.80 parent0[0]: (32247) {G31,W11,D4,L1,V3,M1} P(32211,56) { meet( join( Y, X )
% 100.43/100.80 , Z ) = meet( Z, join( X, Y ) ) }.
% 100.43/100.80 parent1[0; 4]: (219450) {G30,W12,D6,L1,V3,M1} { meet( X, Y ) ==> meet(
% 100.43/100.80 join( X, meet( complement( Y ), Z ) ), Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := meet( complement( Y ), Z )
% 100.43/100.80 Y := X
% 100.43/100.80 Z := Y
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219475) {G31,W12,D6,L1,V3,M1} { meet( Y, join( meet( complement(
% 100.43/100.80 Y ), Z ), X ) ) ==> meet( X, Y ) }.
% 100.43/100.80 parent0[0]: (219471) {G31,W12,D6,L1,V3,M1} { meet( X, Y ) ==> meet( Y,
% 100.43/100.80 join( meet( complement( Y ), Z ), X ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (212001) {G32,W12,D6,L1,V3,M1} P(32188,32247) { meet( Y, join
% 100.43/100.80 ( meet( complement( Y ), Z ), X ) ) ==> meet( X, Y ) }.
% 100.43/100.80 parent0: (219475) {G31,W12,D6,L1,V3,M1} { meet( Y, join( meet( complement
% 100.43/100.80 ( Y ), Z ), X ) ) ==> meet( X, Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219476) {G32,W12,D6,L1,V3,M1} { meet( Z, X ) ==> meet( X, join(
% 100.43/100.80 meet( complement( X ), Y ), Z ) ) }.
% 100.43/100.80 parent0[0]: (212001) {G32,W12,D6,L1,V3,M1} P(32188,32247) { meet( Y, join(
% 100.43/100.80 meet( complement( Y ), Z ), X ) ) ==> meet( X, Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := X
% 100.43/100.80 Z := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219480) {G33,W12,D6,L1,V3,M1} { meet( X, Y ) ==> meet( Y, join(
% 100.43/100.80 meet( T, complement( Y ) ), X ) ) }.
% 100.43/100.80 parent0[0]: (212001) {G32,W12,D6,L1,V3,M1} P(32188,32247) { meet( Y, join(
% 100.43/100.80 meet( complement( Y ), Z ), X ) ) ==> meet( X, Y ) }.
% 100.43/100.80 parent1[0; 7]: (219476) {G32,W12,D6,L1,V3,M1} { meet( Z, X ) ==> meet( X,
% 100.43/100.80 join( meet( complement( X ), Y ), Z ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := T
% 100.43/100.80 Y := complement( Y )
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := join( meet( complement( complement( Y ) ), Z ), T )
% 100.43/100.80 Z := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219484) {G33,W12,D6,L1,V3,M1} { meet( Y, join( meet( Z,
% 100.43/100.80 complement( Y ) ), X ) ) ==> meet( X, Y ) }.
% 100.43/100.80 parent0[0]: (219480) {G33,W12,D6,L1,V3,M1} { meet( X, Y ) ==> meet( Y,
% 100.43/100.80 join( meet( T, complement( Y ) ), X ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := T
% 100.43/100.80 T := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (212572) {G33,W12,D6,L1,V3,M1} P(212001,212001) { meet( X,
% 100.43/100.80 join( meet( Z, complement( X ) ), T ) ) ==> meet( T, X ) }.
% 100.43/100.80 parent0: (219484) {G33,W12,D6,L1,V3,M1} { meet( Y, join( meet( Z,
% 100.43/100.80 complement( Y ) ), X ) ) ==> meet( X, Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := T
% 100.43/100.80 Y := X
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219486) {G32,W12,D6,L1,V3,M1} { meet( Z, X ) ==> meet( X, join(
% 100.43/100.80 meet( complement( X ), Y ), Z ) ) }.
% 100.43/100.80 parent0[0]: (212001) {G32,W12,D6,L1,V3,M1} P(32188,32247) { meet( Y, join(
% 100.43/100.80 meet( complement( Y ), Z ), X ) ) ==> meet( X, Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := X
% 100.43/100.80 Z := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219507) {G28,W12,D6,L1,V3,M1} { meet( X, Y ) ==> meet( Y, join(
% 100.43/100.80 X, meet( Z, complement( Y ) ) ) ) }.
% 100.43/100.80 parent0[0]: (22589) {G27,W11,D4,L1,V3,M1} P(22367,0) { join( meet( Y, X ),
% 100.43/100.80 Z ) = join( Z, meet( X, Y ) ) }.
% 100.43/100.80 parent1[0; 6]: (219486) {G32,W12,D6,L1,V3,M1} { meet( Z, X ) ==> meet( X,
% 100.43/100.80 join( meet( complement( X ), Y ), Z ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := complement( Y )
% 100.43/100.80 Z := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := Z
% 100.43/100.80 Z := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219508) {G28,W12,D6,L1,V3,M1} { meet( Y, join( X, meet( Z,
% 100.43/100.80 complement( Y ) ) ) ) ==> meet( X, Y ) }.
% 100.43/100.80 parent0[0]: (219507) {G28,W12,D6,L1,V3,M1} { meet( X, Y ) ==> meet( Y,
% 100.43/100.80 join( X, meet( Z, complement( Y ) ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (212621) {G33,W12,D6,L1,V3,M1} P(22589,212001) { meet( X, join
% 100.43/100.80 ( Z, meet( Y, complement( X ) ) ) ) ==> meet( Z, X ) }.
% 100.43/100.80 parent0: (219508) {G28,W12,D6,L1,V3,M1} { meet( Y, join( X, meet( Z,
% 100.43/100.80 complement( Y ) ) ) ) ==> meet( X, Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := X
% 100.43/100.80 Z := Y
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219510) {G33,W12,D6,L1,V3,M1} { meet( Z, X ) ==> meet( X, join(
% 100.43/100.80 meet( Y, complement( X ) ), Z ) ) }.
% 100.43/100.80 parent0[0]: (212572) {G33,W12,D6,L1,V3,M1} P(212001,212001) { meet( X, join
% 100.43/100.80 ( meet( Z, complement( X ) ), T ) ) ==> meet( T, X ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := T
% 100.43/100.80 Z := Y
% 100.43/100.80 T := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219513) {G26,W18,D7,L1,V3,M1} { meet( meet( X, complement( meet
% 100.43/100.80 ( Y, complement( Z ) ) ) ), Z ) ==> meet( Z, join( X, meet( Y, complement
% 100.43/100.80 ( Z ) ) ) ) }.
% 100.43/100.80 parent0[0]: (10561) {G25,W10,D5,L1,V2,M1} P(201,10499);d(472);d(452);d(762)
% 100.43/100.80 { join( X, meet( Y, complement( X ) ) ) ==> join( Y, X ) }.
% 100.43/100.80 parent1[0; 12]: (219510) {G33,W12,D6,L1,V3,M1} { meet( Z, X ) ==> meet( X
% 100.43/100.80 , join( meet( Y, complement( X ) ), Z ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := meet( Y, complement( Z ) )
% 100.43/100.80 Y := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := meet( X, complement( meet( Y, complement( Z ) ) ) )
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219514) {G27,W13,D7,L1,V3,M1} { meet( meet( X, complement( meet
% 100.43/100.80 ( Y, complement( Z ) ) ) ), Z ) ==> meet( X, Z ) }.
% 100.43/100.80 parent0[0]: (212621) {G33,W12,D6,L1,V3,M1} P(22589,212001) { meet( X, join
% 100.43/100.80 ( Z, meet( Y, complement( X ) ) ) ) ==> meet( Z, X ) }.
% 100.43/100.80 parent1[0; 10]: (219513) {G26,W18,D7,L1,V3,M1} { meet( meet( X, complement
% 100.43/100.80 ( meet( Y, complement( Z ) ) ) ), Z ) ==> meet( Z, join( X, meet( Y,
% 100.43/100.80 complement( Z ) ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219515) {G19,W12,D6,L1,V3,M1} { meet( meet( X, join( complement
% 100.43/100.80 ( Y ), Z ) ), Z ) ==> meet( X, Z ) }.
% 100.43/100.80 parent0[0]: (995) {G18,W10,D5,L1,V2,M1} P(460,473) { complement( meet( Y,
% 100.43/100.80 complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 100.43/100.80 parent1[0; 4]: (219514) {G27,W13,D7,L1,V3,M1} { meet( meet( X, complement
% 100.43/100.80 ( meet( Y, complement( Z ) ) ) ), Z ) ==> meet( X, Z ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (212751) {G34,W12,D6,L1,V3,M1} P(10561,212572);d(212621);d(995
% 100.43/100.80 ) { meet( meet( Z, join( complement( X ), Y ) ), Y ) ==> meet( Z, Y ) }.
% 100.43/100.80 parent0: (219515) {G19,W12,D6,L1,V3,M1} { meet( meet( X, join( complement
% 100.43/100.80 ( Y ), Z ) ), Z ) ==> meet( X, Z ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := X
% 100.43/100.80 Z := Y
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219518) {G34,W12,D6,L1,V3,M1} { meet( X, Z ) ==> meet( meet( X,
% 100.43/100.80 join( complement( Y ), Z ) ), Z ) }.
% 100.43/100.80 parent0[0]: (212751) {G34,W12,D6,L1,V3,M1} P(10561,212572);d(212621);d(995)
% 100.43/100.80 { meet( meet( Z, join( complement( X ), Y ) ), Y ) ==> meet( Z, Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := Z
% 100.43/100.80 Z := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219519) {G17,W11,D5,L1,V3,M1} { meet( X, Y ) ==> meet( meet( X,
% 100.43/100.80 join( Z, Y ) ), Y ) }.
% 100.43/100.80 parent0[0]: (460) {G16,W5,D4,L1,V1,M1} P(450,60);d(458) { complement(
% 100.43/100.80 complement( X ) ) ==> X }.
% 100.43/100.80 parent1[0; 8]: (219518) {G34,W12,D6,L1,V3,M1} { meet( X, Z ) ==> meet(
% 100.43/100.80 meet( X, join( complement( Y ), Z ) ), Z ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Z
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := complement( Z )
% 100.43/100.80 Z := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219520) {G17,W11,D5,L1,V3,M1} { meet( meet( X, join( Z, Y ) ), Y
% 100.43/100.80 ) ==> meet( X, Y ) }.
% 100.43/100.80 parent0[0]: (219519) {G17,W11,D5,L1,V3,M1} { meet( X, Y ) ==> meet( meet(
% 100.43/100.80 X, join( Z, Y ) ), Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (212897) {G35,W11,D5,L1,V3,M1} P(460,212751) { meet( meet( Y,
% 100.43/100.80 join( X, Z ) ), Z ) ==> meet( Y, Z ) }.
% 100.43/100.80 parent0: (219520) {G17,W11,D5,L1,V3,M1} { meet( meet( X, join( Z, Y ) ), Y
% 100.43/100.80 ) ==> meet( X, Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := Z
% 100.43/100.80 Z := X
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219522) {G35,W11,D5,L1,V3,M1} { meet( X, Z ) ==> meet( meet( X,
% 100.43/100.80 join( Y, Z ) ), Z ) }.
% 100.43/100.80 parent0[0]: (212897) {G35,W11,D5,L1,V3,M1} P(460,212751) { meet( meet( Y,
% 100.43/100.80 join( X, Z ) ), Z ) ==> meet( Y, Z ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := X
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219523) {G25,W11,D5,L1,V3,M1} { meet( X, Y ) ==> meet( meet( X,
% 100.43/100.80 join( Y, Z ) ), Y ) }.
% 100.43/100.80 parent0[0]: (3378) {G24,W15,D8,L1,V2,M1} P(2334,26) { join( join( Y,
% 100.43/100.80 complement( composition( top, complement( join( X, Y ) ) ) ) ), X ) ==>
% 100.43/100.80 join( X, Y ) }.
% 100.43/100.80 parent1[0; 7]: (219522) {G35,W11,D5,L1,V3,M1} { meet( X, Z ) ==> meet(
% 100.43/100.80 meet( X, join( Y, Z ) ), Z ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := Z
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := join( Z, complement( composition( top, complement( join( Y, Z ) ) )
% 100.43/100.80 ) )
% 100.43/100.80 Z := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219524) {G25,W11,D5,L1,V3,M1} { meet( meet( X, join( Y, Z ) ), Y
% 100.43/100.80 ) ==> meet( X, Y ) }.
% 100.43/100.80 parent0[0]: (219523) {G25,W11,D5,L1,V3,M1} { meet( X, Y ) ==> meet( meet(
% 100.43/100.80 X, join( Y, Z ) ), Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (213058) {G36,W11,D5,L1,V3,M1} P(3378,212897) { meet( meet( Z
% 100.43/100.80 , join( Y, X ) ), Y ) ==> meet( Z, Y ) }.
% 100.43/100.80 parent0: (219524) {G25,W11,D5,L1,V3,M1} { meet( meet( X, join( Y, Z ) ), Y
% 100.43/100.80 ) ==> meet( X, Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := X
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219526) {G35,W11,D5,L1,V3,M1} { meet( X, Z ) ==> meet( meet( X,
% 100.43/100.80 join( Y, Z ) ), Z ) }.
% 100.43/100.80 parent0[0]: (212897) {G35,W11,D5,L1,V3,M1} P(460,212751) { meet( meet( Y,
% 100.43/100.80 join( X, Z ) ), Z ) ==> meet( Y, Z ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := X
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219531) {G3,W13,D4,L1,V3,M1} { meet( X, meet( Y, Z ) ) ==> meet
% 100.43/100.80 ( meet( X, Y ), meet( Y, Z ) ) }.
% 100.43/100.80 parent0[0]: (432) {G2,W10,D5,L1,V2,M1} P(3,43) { join( meet( X, complement
% 100.43/100.80 ( Y ) ), meet( X, Y ) ) ==> X }.
% 100.43/100.80 parent1[0; 9]: (219526) {G35,W11,D5,L1,V3,M1} { meet( X, Z ) ==> meet(
% 100.43/100.80 meet( X, join( Y, Z ) ), Z ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := Z
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := meet( Y, complement( Z ) )
% 100.43/100.80 Z := meet( Y, Z )
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219532) {G3,W13,D4,L1,V3,M1} { meet( meet( X, Y ), meet( Y, Z ) )
% 100.43/100.80 ==> meet( X, meet( Y, Z ) ) }.
% 100.43/100.80 parent0[0]: (219531) {G3,W13,D4,L1,V3,M1} { meet( X, meet( Y, Z ) ) ==>
% 100.43/100.80 meet( meet( X, Y ), meet( Y, Z ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (213210) {G36,W13,D4,L1,V3,M1} P(432,212897) { meet( meet( Z,
% 100.43/100.80 X ), meet( X, Y ) ) ==> meet( Z, meet( X, Y ) ) }.
% 100.43/100.80 parent0: (219532) {G3,W13,D4,L1,V3,M1} { meet( meet( X, Y ), meet( Y, Z )
% 100.43/100.80 ) ==> meet( X, meet( Y, Z ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := X
% 100.43/100.80 Z := Y
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219533) {G36,W11,D5,L1,V3,M1} { meet( X, Y ) ==> meet( meet( X,
% 100.43/100.80 join( Y, Z ) ), Y ) }.
% 100.43/100.80 parent0[0]: (213058) {G36,W11,D5,L1,V3,M1} P(3378,212897) { meet( meet( Z,
% 100.43/100.80 join( Y, X ) ), Y ) ==> meet( Z, Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219552) {G33,W11,D5,L1,V3,M1} { meet( X, Y ) ==> meet( Y, meet(
% 100.43/100.80 join( Y, Z ), X ) ) }.
% 100.43/100.80 parent0[0]: (32268) {G32,W11,D4,L1,V3,M1} P(10571,32247);d(10571) { meet(
% 100.43/100.80 meet( X, Y ), Z ) = meet( Z, meet( Y, X ) ) }.
% 100.43/100.80 parent1[0; 4]: (219533) {G36,W11,D5,L1,V3,M1} { meet( X, Y ) ==> meet(
% 100.43/100.80 meet( X, join( Y, Z ) ), Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := join( Y, Z )
% 100.43/100.80 Z := Y
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219559) {G33,W11,D5,L1,V3,M1} { meet( Y, meet( join( Y, Z ), X )
% 100.43/100.80 ) ==> meet( X, Y ) }.
% 100.43/100.80 parent0[0]: (219552) {G33,W11,D5,L1,V3,M1} { meet( X, Y ) ==> meet( Y,
% 100.43/100.80 meet( join( Y, Z ), X ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (213438) {G37,W11,D5,L1,V3,M1} P(213058,32268) { meet( Y, meet
% 100.43/100.80 ( join( Y, Z ), X ) ) ==> meet( X, Y ) }.
% 100.43/100.80 parent0: (219559) {G33,W11,D5,L1,V3,M1} { meet( Y, meet( join( Y, Z ), X )
% 100.43/100.80 ) ==> meet( X, Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219566) {G37,W11,D5,L1,V3,M1} { meet( Z, X ) ==> meet( X, meet(
% 100.43/100.80 join( X, Y ), Z ) ) }.
% 100.43/100.80 parent0[0]: (213438) {G37,W11,D5,L1,V3,M1} P(213058,32268) { meet( Y, meet
% 100.43/100.80 ( join( Y, Z ), X ) ) ==> meet( X, Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := X
% 100.43/100.80 Z := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219570) {G21,W13,D4,L1,V3,M1} { meet( X, meet( Y, Z ) ) ==> meet
% 100.43/100.80 ( meet( Y, Z ), meet( Z, X ) ) }.
% 100.43/100.80 parent0[0]: (1587) {G20,W10,D5,L1,V2,M1} P(56,1534) { join( meet( Y, X ),
% 100.43/100.80 meet( complement( Y ), X ) ) ==> X }.
% 100.43/100.80 parent1[0; 11]: (219566) {G37,W11,D5,L1,V3,M1} { meet( Z, X ) ==> meet( X
% 100.43/100.80 , meet( join( X, Y ), Z ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := meet( Y, Z )
% 100.43/100.80 Y := meet( complement( Y ), Z )
% 100.43/100.80 Z := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219571) {G22,W11,D4,L1,V3,M1} { meet( X, meet( Y, Z ) ) ==> meet
% 100.43/100.80 ( Y, meet( Z, X ) ) }.
% 100.43/100.80 parent0[0]: (213210) {G36,W13,D4,L1,V3,M1} P(432,212897) { meet( meet( Z, X
% 100.43/100.80 ), meet( X, Y ) ) ==> meet( Z, meet( X, Y ) ) }.
% 100.43/100.80 parent1[0; 6]: (219570) {G21,W13,D4,L1,V3,M1} { meet( X, meet( Y, Z ) )
% 100.43/100.80 ==> meet( meet( Y, Z ), meet( Z, X ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := X
% 100.43/100.80 Z := Y
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219572) {G22,W11,D4,L1,V3,M1} { meet( Y, meet( Z, X ) ) ==> meet
% 100.43/100.80 ( X, meet( Y, Z ) ) }.
% 100.43/100.80 parent0[0]: (219571) {G22,W11,D4,L1,V3,M1} { meet( X, meet( Y, Z ) ) ==>
% 100.43/100.80 meet( Y, meet( Z, X ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (213725) {G38,W11,D4,L1,V3,M1} P(1587,213438);d(213210) { meet
% 100.43/100.80 ( X, meet( Y, Z ) ) = meet( Z, meet( X, Y ) ) }.
% 100.43/100.80 parent0: (219572) {G22,W11,D4,L1,V3,M1} { meet( Y, meet( Z, X ) ) ==> meet
% 100.43/100.80 ( X, meet( Y, Z ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := X
% 100.43/100.80 Z := Y
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219573) {G38,W11,D4,L1,V3,M1} { meet( Z, meet( X, Y ) ) = meet( X
% 100.43/100.80 , meet( Y, Z ) ) }.
% 100.43/100.80 parent0[0]: (213725) {G38,W11,D4,L1,V3,M1} P(1587,213438);d(213210) { meet
% 100.43/100.80 ( X, meet( Y, Z ) ) = meet( Z, meet( X, Y ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219574) {G37,W11,D5,L1,V3,M1} { meet( Z, X ) ==> meet( X, meet(
% 100.43/100.80 join( X, Y ), Z ) ) }.
% 100.43/100.80 parent0[0]: (213438) {G37,W11,D5,L1,V3,M1} P(213058,32268) { meet( Y, meet
% 100.43/100.80 ( join( Y, Z ), X ) ) ==> meet( X, Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := X
% 100.43/100.80 Z := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219577) {G38,W15,D6,L1,V4,M1} { meet( meet( X, Y ), Z ) ==> meet
% 100.43/100.80 ( Z, meet( X, meet( Y, join( Z, T ) ) ) ) }.
% 100.43/100.80 parent0[0]: (219573) {G38,W11,D4,L1,V3,M1} { meet( Z, meet( X, Y ) ) =
% 100.43/100.80 meet( X, meet( Y, Z ) ) }.
% 100.43/100.80 parent1[0; 8]: (219574) {G37,W11,D5,L1,V3,M1} { meet( Z, X ) ==> meet( X,
% 100.43/100.80 meet( join( X, Y ), Z ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := join( Z, T )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := T
% 100.43/100.80 Z := meet( X, Y )
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219595) {G38,W15,D6,L1,V4,M1} { meet( Z, meet( X, meet( Y, join(
% 100.43/100.80 Z, T ) ) ) ) ==> meet( meet( X, Y ), Z ) }.
% 100.43/100.80 parent0[0]: (219577) {G38,W15,D6,L1,V4,M1} { meet( meet( X, Y ), Z ) ==>
% 100.43/100.80 meet( Z, meet( X, meet( Y, join( Z, T ) ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 T := T
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (213741) {G39,W15,D6,L1,V4,M1} P(213725,213438) { meet( X,
% 100.43/100.80 meet( Z, meet( T, join( X, Y ) ) ) ) ==> meet( meet( Z, T ), X ) }.
% 100.43/100.80 parent0: (219595) {G38,W15,D6,L1,V4,M1} { meet( Z, meet( X, meet( Y, join
% 100.43/100.80 ( Z, T ) ) ) ) ==> meet( meet( X, Y ), Z ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := T
% 100.43/100.80 Z := X
% 100.43/100.80 T := Y
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219597) {G38,W11,D4,L1,V3,M1} { meet( Z, meet( X, Y ) ) = meet( X
% 100.43/100.80 , meet( Y, Z ) ) }.
% 100.43/100.80 parent0[0]: (213725) {G38,W11,D4,L1,V3,M1} P(1587,213438);d(213210) { meet
% 100.43/100.80 ( X, meet( Y, Z ) ) = meet( Z, meet( X, Y ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219643) {G37,W15,D6,L1,V4,M1} { meet( X, meet( Y, meet( Z, join
% 100.43/100.80 ( X, T ) ) ) ) = meet( Y, meet( Z, X ) ) }.
% 100.43/100.80 parent0[0]: (213058) {G36,W11,D5,L1,V3,M1} P(3378,212897) { meet( meet( Z,
% 100.43/100.80 join( Y, X ) ), Y ) ==> meet( Z, Y ) }.
% 100.43/100.80 parent1[0; 12]: (219597) {G38,W11,D4,L1,V3,M1} { meet( Z, meet( X, Y ) ) =
% 100.43/100.80 meet( X, meet( Y, Z ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := T
% 100.43/100.80 Y := X
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := meet( Z, join( X, T ) )
% 100.43/100.80 Z := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219644) {G38,W11,D4,L1,V3,M1} { meet( meet( Y, Z ), X ) = meet(
% 100.43/100.80 Y, meet( Z, X ) ) }.
% 100.43/100.80 parent0[0]: (213741) {G39,W15,D6,L1,V4,M1} P(213725,213438) { meet( X, meet
% 100.43/100.80 ( Z, meet( T, join( X, Y ) ) ) ) ==> meet( meet( Z, T ), X ) }.
% 100.43/100.80 parent1[0; 1]: (219643) {G37,W15,D6,L1,V4,M1} { meet( X, meet( Y, meet( Z
% 100.43/100.80 , join( X, T ) ) ) ) = meet( Y, meet( Z, X ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := T
% 100.43/100.80 Z := Y
% 100.43/100.80 T := Z
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 T := T
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219645) {G38,W11,D4,L1,V3,M1} { meet( X, meet( Y, Z ) ) = meet(
% 100.43/100.80 meet( X, Y ), Z ) }.
% 100.43/100.80 parent0[0]: (219644) {G38,W11,D4,L1,V3,M1} { meet( meet( Y, Z ), X ) =
% 100.43/100.80 meet( Y, meet( Z, X ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Z
% 100.43/100.80 Y := X
% 100.43/100.80 Z := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (213744) {G40,W11,D4,L1,V3,M1} P(213058,213725);d(213741) {
% 100.43/100.80 meet( T, meet( X, Y ) ) ==> meet( meet( T, X ), Y ) }.
% 100.43/100.80 parent0: (219645) {G38,W11,D4,L1,V3,M1} { meet( X, meet( Y, Z ) ) = meet(
% 100.43/100.80 meet( X, Y ), Z ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := T
% 100.43/100.80 Y := X
% 100.43/100.80 Z := Y
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219647) {G38,W11,D4,L1,V3,M1} { meet( Z, meet( X, Y ) ) = meet( X
% 100.43/100.80 , meet( Y, Z ) ) }.
% 100.43/100.80 parent0[0]: (213725) {G38,W11,D4,L1,V3,M1} P(1587,213438);d(213210) { meet
% 100.43/100.80 ( X, meet( Y, Z ) ) = meet( Z, meet( X, Y ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219651) {G39,W13,D4,L1,V2,M1} { meet( composition( skol1, top )
% 100.43/100.80 , meet( X, Y ) ) = meet( X, composition( skol1, Y ) ) }.
% 100.43/100.80 parent0[0]: (137234) {G49,W9,D4,L1,V1,M1} P(137152,3434);d(85064);d(137152)
% 100.43/100.80 { meet( X, composition( skol1, top ) ) ==> composition( skol1, X ) }.
% 100.43/100.80 parent1[0; 10]: (219647) {G38,W11,D4,L1,V3,M1} { meet( Z, meet( X, Y ) ) =
% 100.43/100.80 meet( X, meet( Y, Z ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := composition( skol1, top )
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219652) {G40,W13,D5,L1,V2,M1} { meet( meet( composition( skol1,
% 100.43/100.80 top ), X ), Y ) = meet( X, composition( skol1, Y ) ) }.
% 100.43/100.80 parent0[0]: (213744) {G40,W11,D4,L1,V3,M1} P(213058,213725);d(213741) {
% 100.43/100.80 meet( T, meet( X, Y ) ) ==> meet( meet( T, X ), Y ) }.
% 100.43/100.80 parent1[0; 1]: (219651) {G39,W13,D4,L1,V2,M1} { meet( composition( skol1,
% 100.43/100.80 top ), meet( X, Y ) ) = meet( X, composition( skol1, Y ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 Z := Z
% 100.43/100.80 T := composition( skol1, top )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219653) {G41,W11,D4,L1,V2,M1} { meet( composition( skol1, X ), Y
% 100.43/100.80 ) = meet( X, composition( skol1, Y ) ) }.
% 100.43/100.80 parent0[0]: (137152) {G46,W9,D4,L1,V1,M1} P(137140,127029);d(18);d(33452);d
% 100.43/100.80 (26361) { meet( composition( skol1, top ), X ) ==> composition( skol1, X
% 100.43/100.80 ) }.
% 100.43/100.80 parent1[0; 2]: (219652) {G40,W13,D5,L1,V2,M1} { meet( meet( composition(
% 100.43/100.80 skol1, top ), X ), Y ) = meet( X, composition( skol1, Y ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219654) {G41,W11,D4,L1,V2,M1} { meet( X, composition( skol1, Y )
% 100.43/100.80 ) = meet( composition( skol1, X ), Y ) }.
% 100.43/100.80 parent0[0]: (219653) {G41,W11,D4,L1,V2,M1} { meet( composition( skol1, X )
% 100.43/100.80 , Y ) = meet( X, composition( skol1, Y ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (214095) {G50,W11,D4,L1,V2,M1} P(137234,213725);d(213744);d(
% 100.43/100.80 137152) { meet( Y, composition( skol1, X ) ) ==> meet( composition( skol1
% 100.43/100.80 , Y ), X ) }.
% 100.43/100.80 parent0: (219654) {G41,W11,D4,L1,V2,M1} { meet( X, composition( skol1, Y )
% 100.43/100.80 ) = meet( composition( skol1, X ), Y ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := X
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqswap: (219656) {G50,W11,D4,L1,V2,M1} { meet( composition( skol1, X ), Y
% 100.43/100.80 ) ==> meet( X, composition( skol1, Y ) ) }.
% 100.43/100.80 parent0[0]: (214095) {G50,W11,D4,L1,V2,M1} P(137234,213725);d(213744);d(
% 100.43/100.80 137152) { meet( Y, composition( skol1, X ) ) ==> meet( composition( skol1
% 100.43/100.80 , Y ), X ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := X
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219659) {G51,W15,D5,L1,V2,M1} { meet( composition( skol1, X ),
% 100.43/100.80 complement( composition( skol1, Y ) ) ) ==> meet( X, composition( skol1,
% 100.43/100.80 complement( Y ) ) ) }.
% 100.43/100.80 parent0[0]: (137318) {G50,W11,D5,L1,V1,M1} P(137152,10310);d(137234);d(
% 100.43/100.80 137234) { composition( skol1, complement( composition( skol1, X ) ) ) ==>
% 100.43/100.80 composition( skol1, complement( X ) ) }.
% 100.43/100.80 parent1[0; 11]: (219656) {G50,W11,D4,L1,V2,M1} { meet( composition( skol1
% 100.43/100.80 , X ), Y ) ==> meet( X, composition( skol1, Y ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := complement( composition( skol1, Y ) )
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219660) {G51,W15,D5,L1,V2,M1} { meet( composition( skol1, X ),
% 100.43/100.80 complement( composition( skol1, Y ) ) ) ==> meet( composition( skol1, X )
% 100.43/100.80 , complement( Y ) ) }.
% 100.43/100.80 parent0[0]: (214095) {G50,W11,D4,L1,V2,M1} P(137234,213725);d(213744);d(
% 100.43/100.80 137152) { meet( Y, composition( skol1, X ) ) ==> meet( composition( skol1
% 100.43/100.80 , Y ), X ) }.
% 100.43/100.80 parent1[0; 9]: (219659) {G51,W15,D5,L1,V2,M1} { meet( composition( skol1,
% 100.43/100.80 X ), complement( composition( skol1, Y ) ) ) ==> meet( X, composition(
% 100.43/100.80 skol1, complement( Y ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := complement( Y )
% 100.43/100.80 Y := X
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 X := X
% 100.43/100.80 Y := Y
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (215877) {G51,W15,D5,L1,V2,M1} P(137318,214095);d(214095) {
% 100.43/100.80 meet( composition( skol1, Y ), complement( composition( skol1, X ) ) )
% 100.43/100.80 ==> meet( composition( skol1, Y ), complement( X ) ) }.
% 100.43/100.80 parent0: (219660) {G51,W15,D5,L1,V2,M1} { meet( composition( skol1, X ),
% 100.43/100.80 complement( composition( skol1, Y ) ) ) ==> meet( composition( skol1, X )
% 100.43/100.80 , complement( Y ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := Y
% 100.43/100.80 Y := X
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 0 ==> 0
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219671) {G2,W44,D6,L2,V0,M2} { ! join( meet( composition( skol1
% 100.43/100.80 , skol2 ), complement( skol3 ) ), meet( composition( skol1, skol2 ),
% 100.43/100.80 complement( skol3 ) ) ) ==> meet( composition( skol1, skol2 ), complement
% 100.43/100.80 ( skol3 ) ), ! join( meet( composition( skol1, skol2 ), complement( skol3
% 100.43/100.80 ) ), meet( composition( skol1, skol2 ), complement( composition( skol1,
% 100.43/100.80 skol3 ) ) ) ) ==> meet( composition( skol1, skol2 ), complement(
% 100.43/100.80 composition( skol1, skol3 ) ) ) }.
% 100.43/100.80 parent0[0]: (215877) {G51,W15,D5,L1,V2,M1} P(137318,214095);d(214095) {
% 100.43/100.80 meet( composition( skol1, Y ), complement( composition( skol1, X ) ) )
% 100.43/100.80 ==> meet( composition( skol1, Y ), complement( X ) ) }.
% 100.43/100.80 parent1[1; 9]: (99) {G1,W46,D6,L2,V0,M2} P(0,14) { ! join( meet(
% 100.43/100.80 composition( skol1, skol2 ), complement( skol3 ) ), meet( composition(
% 100.43/100.80 skol1, skol2 ), complement( composition( skol1, skol3 ) ) ) ) ==> meet(
% 100.43/100.80 composition( skol1, skol2 ), complement( composition( skol1, skol3 ) ) )
% 100.43/100.80 , ! join( meet( composition( skol1, skol2 ), complement( skol3 ) ), meet
% 100.43/100.80 ( composition( skol1, skol2 ), complement( composition( skol1, skol3 ) )
% 100.43/100.80 ) ) ==> meet( composition( skol1, skol2 ), complement( skol3 ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := skol3
% 100.43/100.80 Y := skol2
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219678) {G3,W42,D6,L2,V0,M2} { ! join( meet( composition( skol1
% 100.43/100.80 , skol2 ), complement( skol3 ) ), meet( composition( skol1, skol2 ),
% 100.43/100.80 complement( composition( skol1, skol3 ) ) ) ) ==> meet( composition(
% 100.43/100.80 skol1, skol2 ), complement( skol3 ) ), ! join( meet( composition( skol1,
% 100.43/100.80 skol2 ), complement( skol3 ) ), meet( composition( skol1, skol2 ),
% 100.43/100.80 complement( skol3 ) ) ) ==> meet( composition( skol1, skol2 ), complement
% 100.43/100.80 ( skol3 ) ) }.
% 100.43/100.80 parent0[0]: (215877) {G51,W15,D5,L1,V2,M1} P(137318,214095);d(214095) {
% 100.43/100.80 meet( composition( skol1, Y ), complement( composition( skol1, X ) ) )
% 100.43/100.80 ==> meet( composition( skol1, Y ), complement( X ) ) }.
% 100.43/100.80 parent1[1; 17]: (219671) {G2,W44,D6,L2,V0,M2} { ! join( meet( composition
% 100.43/100.80 ( skol1, skol2 ), complement( skol3 ) ), meet( composition( skol1, skol2
% 100.43/100.80 ), complement( skol3 ) ) ) ==> meet( composition( skol1, skol2 ),
% 100.43/100.80 complement( skol3 ) ), ! join( meet( composition( skol1, skol2 ),
% 100.43/100.80 complement( skol3 ) ), meet( composition( skol1, skol2 ), complement(
% 100.43/100.80 composition( skol1, skol3 ) ) ) ) ==> meet( composition( skol1, skol2 ),
% 100.43/100.80 complement( composition( skol1, skol3 ) ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := skol3
% 100.43/100.80 Y := skol2
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219679) {G4,W40,D5,L2,V0,M2} { ! join( meet( composition( skol1
% 100.43/100.80 , skol2 ), complement( skol3 ) ), meet( composition( skol1, skol2 ),
% 100.43/100.80 complement( skol3 ) ) ) ==> meet( composition( skol1, skol2 ), complement
% 100.43/100.80 ( skol3 ) ), ! join( meet( composition( skol1, skol2 ), complement( skol3
% 100.43/100.80 ) ), meet( composition( skol1, skol2 ), complement( skol3 ) ) ) ==> meet
% 100.43/100.80 ( composition( skol1, skol2 ), complement( skol3 ) ) }.
% 100.43/100.80 parent0[0]: (215877) {G51,W15,D5,L1,V2,M1} P(137318,214095);d(214095) {
% 100.43/100.80 meet( composition( skol1, Y ), complement( composition( skol1, X ) ) )
% 100.43/100.80 ==> meet( composition( skol1, Y ), complement( X ) ) }.
% 100.43/100.80 parent1[0; 9]: (219678) {G3,W42,D6,L2,V0,M2} { ! join( meet( composition(
% 100.43/100.80 skol1, skol2 ), complement( skol3 ) ), meet( composition( skol1, skol2 )
% 100.43/100.80 , complement( composition( skol1, skol3 ) ) ) ) ==> meet( composition(
% 100.43/100.80 skol1, skol2 ), complement( skol3 ) ), ! join( meet( composition( skol1,
% 100.43/100.80 skol2 ), complement( skol3 ) ), meet( composition( skol1, skol2 ),
% 100.43/100.80 complement( skol3 ) ) ) ==> meet( composition( skol1, skol2 ), complement
% 100.43/100.80 ( skol3 ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := skol3
% 100.43/100.80 Y := skol2
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219683) {G5,W33,D5,L2,V0,M2} { ! meet( composition( skol1, skol2
% 100.43/100.80 ), complement( skol3 ) ) ==> meet( composition( skol1, skol2 ),
% 100.43/100.80 complement( skol3 ) ), ! join( meet( composition( skol1, skol2 ),
% 100.43/100.80 complement( skol3 ) ), meet( composition( skol1, skol2 ), complement(
% 100.43/100.80 skol3 ) ) ) ==> meet( composition( skol1, skol2 ), complement( skol3 ) )
% 100.43/100.80 }.
% 100.43/100.80 parent0[0]: (469) {G17,W5,D3,L1,V1,M1} P(460,140) { join( X, X ) ==> X }.
% 100.43/100.80 parent1[0; 2]: (219679) {G4,W40,D5,L2,V0,M2} { ! join( meet( composition(
% 100.43/100.80 skol1, skol2 ), complement( skol3 ) ), meet( composition( skol1, skol2 )
% 100.43/100.80 , complement( skol3 ) ) ) ==> meet( composition( skol1, skol2 ),
% 100.43/100.80 complement( skol3 ) ), ! join( meet( composition( skol1, skol2 ),
% 100.43/100.80 complement( skol3 ) ), meet( composition( skol1, skol2 ), complement(
% 100.43/100.80 skol3 ) ) ) ==> meet( composition( skol1, skol2 ), complement( skol3 ) )
% 100.43/100.80 }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := meet( composition( skol1, skol2 ), complement( skol3 ) )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 paramod: (219686) {G6,W26,D4,L2,V0,M2} { ! meet( composition( skol1, skol2
% 100.43/100.80 ), complement( skol3 ) ) ==> meet( composition( skol1, skol2 ),
% 100.43/100.80 complement( skol3 ) ), ! meet( composition( skol1, skol2 ), complement(
% 100.43/100.80 skol3 ) ) ==> meet( composition( skol1, skol2 ), complement( skol3 ) )
% 100.43/100.80 }.
% 100.43/100.80 parent0[0]: (469) {G17,W5,D3,L1,V1,M1} P(460,140) { join( X, X ) ==> X }.
% 100.43/100.80 parent1[1; 2]: (219683) {G5,W33,D5,L2,V0,M2} { ! meet( composition( skol1
% 100.43/100.80 , skol2 ), complement( skol3 ) ) ==> meet( composition( skol1, skol2 ),
% 100.43/100.80 complement( skol3 ) ), ! join( meet( composition( skol1, skol2 ),
% 100.43/100.80 complement( skol3 ) ), meet( composition( skol1, skol2 ), complement(
% 100.43/100.80 skol3 ) ) ) ==> meet( composition( skol1, skol2 ), complement( skol3 ) )
% 100.43/100.80 }.
% 100.43/100.80 substitution0:
% 100.43/100.80 X := meet( composition( skol1, skol2 ), complement( skol3 ) )
% 100.43/100.80 end
% 100.43/100.80 substitution1:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqrefl: (219689) {G0,W13,D4,L1,V0,M1} { ! meet( composition( skol1, skol2
% 100.43/100.80 ), complement( skol3 ) ) ==> meet( composition( skol1, skol2 ),
% 100.43/100.80 complement( skol3 ) ) }.
% 100.43/100.80 parent0[0]: (219686) {G6,W26,D4,L2,V0,M2} { ! meet( composition( skol1,
% 100.43/100.80 skol2 ), complement( skol3 ) ) ==> meet( composition( skol1, skol2 ),
% 100.43/100.80 complement( skol3 ) ), ! meet( composition( skol1, skol2 ), complement(
% 100.43/100.80 skol3 ) ) ==> meet( composition( skol1, skol2 ), complement( skol3 ) )
% 100.43/100.80 }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 eqrefl: (219690) {G0,W0,D0,L0,V0,M0} { }.
% 100.43/100.80 parent0[0]: (219689) {G0,W13,D4,L1,V0,M1} { ! meet( composition( skol1,
% 100.43/100.80 skol2 ), complement( skol3 ) ) ==> meet( composition( skol1, skol2 ),
% 100.43/100.80 complement( skol3 ) ) }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 subsumption: (216733) {G52,W0,D0,L0,V0,M0} S(99);d(215877);d(215877);d(469)
% 100.43/100.80 ;d(469);q;q { }.
% 100.43/100.80 parent0: (219690) {G0,W0,D0,L0,V0,M0} { }.
% 100.43/100.80 substitution0:
% 100.43/100.80 end
% 100.43/100.80 permutation0:
% 100.43/100.80 end
% 100.43/100.80
% 100.43/100.80 Proof check complete!
% 100.43/100.80
% 100.43/100.80 Memory use:
% 100.43/100.80
% 100.43/100.80 space for terms: 3021195
% 100.43/100.80 space for clauses: 21768898
% 100.43/100.80
% 100.43/100.80
% 100.43/100.80 clauses generated: 17250810
% 100.43/100.80 clauses kept: 216734
% 100.43/100.80 clauses selected: 9311
% 100.43/100.80 clauses deleted: 86296
% 100.43/100.80 clauses inuse deleted: 4620
% 100.43/100.80
% 100.43/100.80 subsentry: 207360
% 100.43/100.80 literals s-matched: 197957
% 100.43/100.80 literals matched: 196967
% 100.43/100.80 full subsumption: 0
% 100.43/100.80
% 100.43/100.80 checksum: 1348759790
% 100.43/100.80
% 100.43/100.80
% 100.43/100.80 Bliksem ended
%------------------------------------------------------------------------------