TSTP Solution File: REL025+2 by Bliksem---1.12

%------------------------------------------------------------------------------
% File     : Bliksem---1.12
% Problem  : REL025+2 : TPTP v8.1.0. Released v4.0.0.
% Transfm  : none
% Format   : tptp:raw
% Command  : bliksem %s

% Computer : n016.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 19:00:28 EDT 2022

% Result   : Theorem 124.25s 124.69s
% Output   : Refutation 124.25s
% Verified : 
% SZS Type : -

% Comments : 
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.07/0.12  % Problem  : REL025+2 : TPTP v8.1.0. Released v4.0.0.
% 0.07/0.13  % Command  : bliksem %s
% 0.12/0.34  % Computer : n016.cluster.edu
% 0.12/0.34  % Model    : x86_64 x86_64
% 0.12/0.34  % CPU      : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.12/0.34  % Memory   : 8042.1875MB
% 0.12/0.34  % OS       : Linux 3.10.0-693.el7.x86_64
% 0.12/0.34  % CPULimit : 300
% 0.12/0.34  % DateTime : Fri Jul  8 15:31:08 EDT 2022
% 0.12/0.34  % CPUTime  : 
% 13.74/14.18  *** allocated 10000 integers for termspace/termends
% 13.74/14.18  *** allocated 10000 integers for clauses
% 13.74/14.18  *** allocated 10000 integers for justifications
% 13.74/14.18  Bliksem 1.12
% 13.74/14.18  
% 13.74/14.18  
% 13.74/14.18  Automatic Strategy Selection
% 13.74/14.18  
% 13.74/14.18  
% 13.74/14.18  Clauses:
% 13.74/14.18  
% 13.74/14.18  { join( X, Y ) = join( Y, X ) }.
% 13.74/14.18  { join( X, join( Y, Z ) ) = join( join( X, Y ), Z ) }.
% 13.74/14.18  { X = join( complement( join( complement( X ), complement( Y ) ) ), 
% 13.74/14.18    complement( join( complement( X ), Y ) ) ) }.
% 13.74/14.18  { meet( X, Y ) = complement( join( complement( X ), complement( Y ) ) ) }.
% 13.74/14.18  { composition( X, composition( Y, Z ) ) = composition( composition( X, Y )
% 13.74/14.18    , Z ) }.
% 13.74/14.18  { composition( X, one ) = X }.
% 13.74/14.18  { composition( join( X, Y ), Z ) = join( composition( X, Z ), composition( 
% 13.74/14.18    Y, Z ) ) }.
% 13.74/14.18  { converse( converse( X ) ) = X }.
% 13.74/14.18  { converse( join( X, Y ) ) = join( converse( X ), converse( Y ) ) }.
% 13.74/14.18  { converse( composition( X, Y ) ) = composition( converse( Y ), converse( X
% 13.74/14.18     ) ) }.
% 13.74/14.18  { join( composition( converse( X ), complement( composition( X, Y ) ) ), 
% 13.74/14.18    complement( Y ) ) = complement( Y ) }.
% 13.74/14.18  { top = join( X, complement( X ) ) }.
% 13.74/14.18  { zero = meet( X, complement( X ) ) }.
% 13.74/14.18  { alpha1( skol1 ), join( skol1, one ) = one }.
% 13.74/14.18  { alpha1( skol1 ), ! join( skol1, converse( skol1 ) ) = converse( skol1 ) }
% 13.74/14.18    .
% 13.74/14.18  { ! alpha1( X ), join( X, one ) = one }.
% 13.74/14.18  { ! alpha1( X ), ! join( converse( X ), X ) = X }.
% 13.74/14.18  { ! join( X, one ) = one, join( converse( X ), X ) = X, alpha1( X ) }.
% 13.74/14.18  
% 13.74/14.18  percentage equality = 0.791667, percentage horn = 0.888889
% 13.74/14.18  This is a problem with some equality
% 13.74/14.18  
% 13.74/14.18  
% 13.74/14.18  
% 13.74/14.18  Options Used:
% 13.74/14.18  
% 13.74/14.18  useres =            1
% 13.74/14.18  useparamod =        1
% 13.74/14.18  useeqrefl =         1
% 13.74/14.18  useeqfact =         1
% 13.74/14.18  usefactor =         1
% 13.74/14.18  usesimpsplitting =  0
% 13.74/14.18  usesimpdemod =      5
% 13.74/14.18  usesimpres =        3
% 13.74/14.18  
% 13.74/14.18  resimpinuse      =  1000
% 13.74/14.18  resimpclauses =     20000
% 13.74/14.18  substype =          eqrewr
% 13.74/14.18  backwardsubs =      1
% 13.74/14.18  selectoldest =      5
% 13.74/14.18  
% 13.74/14.18  litorderings [0] =  split
% 13.74/14.18  litorderings [1] =  extend the termordering, first sorting on arguments
% 13.74/14.18  
% 13.74/14.18  termordering =      kbo
% 13.74/14.18  
% 13.74/14.18  litapriori =        0
% 13.74/14.18  termapriori =       1
% 13.74/14.18  litaposteriori =    0
% 13.74/14.18  termaposteriori =   0
% 13.74/14.18  demodaposteriori =  0
% 13.74/14.18  ordereqreflfact =   0
% 13.74/14.18  
% 13.74/14.18  litselect =         negord
% 13.74/14.18  
% 13.74/14.18  maxweight =         15
% 13.74/14.18  maxdepth =          30000
% 13.74/14.18  maxlength =         115
% 13.74/14.18  maxnrvars =         195
% 13.74/14.18  excuselevel =       1
% 13.74/14.18  increasemaxweight = 1
% 13.74/14.18  
% 13.74/14.18  maxselected =       10000000
% 13.74/14.18  maxnrclauses =      10000000
% 13.74/14.18  
% 13.74/14.18  showgenerated =    0
% 13.74/14.18  showkept =         0
% 13.74/14.18  showselected =     0
% 13.74/14.18  showdeleted =      0
% 13.74/14.18  showresimp =       1
% 13.74/14.18  showstatus =       2000
% 13.74/14.18  
% 13.74/14.18  prologoutput =     0
% 13.74/14.18  nrgoals =          5000000
% 13.74/14.18  totalproof =       1
% 13.74/14.18  
% 13.74/14.18  Symbols occurring in the translation:
% 13.74/14.18  
% 13.74/14.18  {}  [0, 0]      (w:1, o:2, a:1, s:1, b:0), 
% 13.74/14.18  .  [1, 2]      (w:1, o:21, a:1, s:1, b:0), 
% 13.74/14.18  !  [4, 1]      (w:0, o:13, a:1, s:1, b:0), 
% 13.74/14.18  =  [13, 2]      (w:1, o:0, a:0, s:1, b:0), 
% 13.74/14.18  ==>  [14, 2]      (w:1, o:0, a:0, s:1, b:0), 
% 13.74/14.18  join  [37, 2]      (w:1, o:45, a:1, s:1, b:0), 
% 13.74/14.18  complement  [39, 1]      (w:1, o:18, a:1, s:1, b:0), 
% 13.74/14.18  meet  [40, 2]      (w:1, o:46, a:1, s:1, b:0), 
% 13.74/14.18  composition  [41, 2]      (w:1, o:47, a:1, s:1, b:0), 
% 13.74/14.18  one  [42, 0]      (w:1, o:9, a:1, s:1, b:0), 
% 13.74/14.18  converse  [43, 1]      (w:1, o:19, a:1, s:1, b:0), 
% 13.74/14.18  top  [44, 0]      (w:1, o:11, a:1, s:1, b:0), 
% 13.74/14.18  zero  [45, 0]      (w:1, o:12, a:1, s:1, b:0), 
% 13.74/14.18  alpha1  [46, 1]      (w:1, o:20, a:1, s:1, b:1), 
% 13.74/14.18  skol1  [47, 0]      (w:1, o:10, a:1, s:1, b:1).
% 13.74/14.18  
% 13.74/14.18  
% 13.74/14.18  Starting Search:
% 13.74/14.18  
% 13.74/14.18  *** allocated 15000 integers for clauses
% 13.74/14.18  *** allocated 22500 integers for clauses
% 13.74/14.18  *** allocated 33750 integers for clauses
% 13.74/14.18  *** allocated 50625 integers for clauses
% 13.74/14.18  *** allocated 75937 integers for clauses
% 13.74/14.18  *** allocated 15000 integers for termspace/termends
% 13.74/14.18  *** allocated 113905 integers for clauses
% 13.74/14.18  Resimplifying inuse:
% 13.74/14.18  Done
% 13.74/14.18  
% 13.74/14.18  *** allocated 22500 integers for termspace/termends
% 13.74/14.18  *** allocated 170857 integers for clauses
% 13.74/14.18  *** allocated 33750 integers for termspace/termends
% 13.74/14.18  
% 13.74/14.18  Intermediate Status:
% 13.74/14.18  Generated:    16651
% 13.74/14.18  Kept:         2008
% 13.74/14.18  Inuse:        319
% 13.74/14.18  Deleted:      148
% 13.74/14.18  Deletedinuse: 59
% 13.74/14.18  
% 13.74/14.18  Resimplifying inuse:
% 13.74/14.18  Done
% 13.74/14.18  
% 13.74/14.18  *** allocated 256285 integers for clauses
% 13.74/14.18  *** allocated 50625 integers for termspace/termends
% 13.74/14.18  Resimplifying inuse:
% 13.74/14.18  Done
% 13.74/14.18  
% 13.74/14.18  *** allocated 384427 integers for clauses
% 13.74/14.18  
% 13.74/14.18  Intermediate Status:
% 13.74/14.18  Generated:    53391
% 13.74/14.18  Kept:         4009
% 13.74/14.18  Inuse:        590
% 13.74/14.18  Deleted:      411
% 79.15/79.53  Deletedinuse: 174
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  *** allocated 75937 integers for termspace/termends
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  *** allocated 576640 integers for clauses
% 79.15/79.53  *** allocated 113905 integers for termspace/termends
% 79.15/79.53  
% 79.15/79.53  Intermediate Status:
% 79.15/79.53  Generated:    100330
% 79.15/79.53  Kept:         6010
% 79.15/79.53  Inuse:        755
% 79.15/79.53  Deleted:      574
% 79.15/79.53  Deletedinuse: 213
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  
% 79.15/79.53  Intermediate Status:
% 79.15/79.53  Generated:    133402
% 79.15/79.53  Kept:         8015
% 79.15/79.53  Inuse:        850
% 79.15/79.53  Deleted:      734
% 79.15/79.53  Deletedinuse: 242
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  *** allocated 864960 integers for clauses
% 79.15/79.53  *** allocated 170857 integers for termspace/termends
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  
% 79.15/79.53  Intermediate Status:
% 79.15/79.53  Generated:    194707
% 79.15/79.53  Kept:         10015
% 79.15/79.53  Inuse:        1041
% 79.15/79.53  Deleted:      896
% 79.15/79.53  Deletedinuse: 255
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  
% 79.15/79.53  Intermediate Status:
% 79.15/79.53  Generated:    245915
% 79.15/79.53  Kept:         12018
% 79.15/79.53  Inuse:        1121
% 79.15/79.53  Deleted:      936
% 79.15/79.53  Deletedinuse: 270
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  *** allocated 1297440 integers for clauses
% 79.15/79.53  *** allocated 256285 integers for termspace/termends
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  
% 79.15/79.53  Intermediate Status:
% 79.15/79.53  Generated:    305194
% 79.15/79.53  Kept:         14071
% 79.15/79.53  Inuse:        1252
% 79.15/79.53  Deleted:      1110
% 79.15/79.53  Deletedinuse: 362
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  
% 79.15/79.53  Intermediate Status:
% 79.15/79.53  Generated:    361048
% 79.15/79.53  Kept:         16100
% 79.15/79.53  Inuse:        1345
% 79.15/79.53  Deleted:      1288
% 79.15/79.53  Deletedinuse: 364
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  *** allocated 1946160 integers for clauses
% 79.15/79.53  
% 79.15/79.53  Intermediate Status:
% 79.15/79.53  Generated:    402238
% 79.15/79.53  Kept:         18172
% 79.15/79.53  Inuse:        1429
% 79.15/79.53  Deleted:      1300
% 79.15/79.53  Deletedinuse: 365
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  *** allocated 384427 integers for termspace/termends
% 79.15/79.53  Resimplifying clauses:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  
% 79.15/79.53  Intermediate Status:
% 79.15/79.53  Generated:    442625
% 79.15/79.53  Kept:         20188
% 79.15/79.53  Inuse:        1481
% 79.15/79.53  Deleted:      5350
% 79.15/79.53  Deletedinuse: 365
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  
% 79.15/79.53  Intermediate Status:
% 79.15/79.53  Generated:    486293
% 79.15/79.53  Kept:         22192
% 79.15/79.53  Inuse:        1565
% 79.15/79.53  Deleted:      5350
% 79.15/79.53  Deletedinuse: 365
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  
% 79.15/79.53  Intermediate Status:
% 79.15/79.53  Generated:    519431
% 79.15/79.53  Kept:         24221
% 79.15/79.53  Inuse:        1686
% 79.15/79.53  Deleted:      5448
% 79.15/79.53  Deletedinuse: 461
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  *** allocated 2919240 integers for clauses
% 79.15/79.53  
% 79.15/79.53  Intermediate Status:
% 79.15/79.53  Generated:    562550
% 79.15/79.53  Kept:         26297
% 79.15/79.53  Inuse:        1836
% 79.15/79.53  Deleted:      5594
% 79.15/79.53  Deletedinuse: 568
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  
% 79.15/79.53  Intermediate Status:
% 79.15/79.53  Generated:    607814
% 79.15/79.53  Kept:         28359
% 79.15/79.53  Inuse:        1989
% 79.15/79.53  Deleted:      5609
% 79.15/79.53  Deletedinuse: 575
% 79.15/79.53  
% 79.15/79.53  *** allocated 576640 integers for termspace/termends
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  
% 79.15/79.53  Intermediate Status:
% 79.15/79.53  Generated:    657021
% 79.15/79.53  Kept:         30370
% 79.15/79.53  Inuse:        2180
% 79.15/79.53  Deleted:      5624
% 79.15/79.53  Deletedinuse: 579
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  
% 79.15/79.53  Intermediate Status:
% 79.15/79.53  Generated:    712705
% 79.15/79.53  Kept:         32412
% 79.15/79.53  Inuse:        2317
% 79.15/79.53  Deleted:      5632
% 79.15/79.53  Deletedinuse: 581
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.15/79.53  Resimplifying inuse:
% 79.15/79.53  Done
% 79.15/79.53  
% 79.18/79.53  
% 79.18/79.53  Intermediate Status:
% 79.18/79.53  Generated:    765147
% 79.18/79.53  Kept:         34435
% 79.18/79.53  Inuse:        2415
% 79.18/79.53  Deleted:      5634
% 79.18/79.53  Deletedinuse: 583
% 79.18/79.53  
% 79.18/79.53  Resimplifying inuse:
% 79.18/79.53  Done
% 79.18/79.53  
% 79.18/79.53  Resimplifying inuse:
% 79.18/79.53  Done
% 79.18/79.53  
% 79.18/79.53  
% 79.18/79.53  Intermediate Status:
% 79.18/79.53  Generated:    823516
% 79.18/79.53  Kept:         36435
% 79.18/79.53  Inuse:        2519
% 79.18/79.53  Deleted:      5640
% 79.18/79.53  Deletedinuse: 583
% 79.18/79.53  
% 79.18/79.53  Resimplifying inuse:
% 79.18/79.53  Done
% 79.18/79.53  
% 79.18/79.53  Resimplifying inuse:
% 79.18/79.53  Done
% 79.18/79.53  
% 79.18/79.53  
% 79.18/79.53  Intermediate Status:
% 79.18/79.53  Generated:    912857
% 79.18/79.53  Kept:         38438
% 79.18/79.53  Inuse:        2663
% 79.18/79.53  Deleted:      5662
% 79.18/79.53  Deletedinuse: 595
% 79.18/79.53  
% 79.18/79.53  *** allocated 4378860 integers for clauses
% 79.18/79.53  Resimplifying inuse:
% 79.18/79.53  Done
% 79.18/79.53  
% 79.18/79.53  Resimplifying inuse:
% 79.18/79.53  Done
% 79.18/79.53  
% 79.18/79.53  Resimplifying clauses:
% 79.18/79.53  Done
% 79.18/79.53  
% 79.18/79.53  
% 79.18/79.53  Intermediate Status:
% 79.18/79.53  Generated:    988764
% 79.18/79.53  Kept:         40841
% 79.18/79.53  Inuse:        2810
% 79.18/79.53  Deleted:      11042
% 79.18/79.53  Deletedinuse: 595
% 79.18/79.53  
% 79.18/79.53  Resimplifying inuse:
% 79.18/79.53  Done
% 79.18/79.53  
% 79.18/79.53  Resimplifying inuse:
% 79.18/79.53  Done
% 79.18/79.53  
% 79.18/79.53  *** allocated 864960 integers for termspace/termends
% 79.18/79.53  
% 79.18/79.53  Intermediate Status:
% 79.18/79.53  Generated:    1140102
% 79.18/79.53  Kept:         42844
% 79.18/79.53  Inuse:        3086
% 79.18/79.53  Deleted:      11050
% 79.18/79.53  Deletedinuse: 599
% 79.18/79.53  
% 79.18/79.53  Resimplifying inuse:
% 79.18/79.53  Done
% 79.18/79.53  
% 79.18/79.53  Resimplifying inuse:
% 79.18/79.53  Done
% 79.18/79.53  
% 79.18/79.53  
% 79.18/79.53  Intermediate Status:
% 79.18/79.53  Generated:    1218299
% 124.25/124.69  Kept:         44863
% 124.25/124.69  Inuse:        3313
% 124.25/124.69  Deleted:      11062
% 124.25/124.69  Deletedinuse: 610
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    1266145
% 124.25/124.69  Kept:         46865
% 124.25/124.69  Inuse:        3414
% 124.25/124.69  Deleted:      11066
% 124.25/124.69  Deletedinuse: 612
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    1323748
% 124.25/124.69  Kept:         48890
% 124.25/124.69  Inuse:        3530
% 124.25/124.69  Deleted:      11069
% 124.25/124.69  Deletedinuse: 612
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    1392574
% 124.25/124.69  Kept:         50951
% 124.25/124.69  Inuse:        3628
% 124.25/124.69  Deleted:      11076
% 124.25/124.69  Deletedinuse: 616
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    1471844
% 124.25/124.69  Kept:         52980
% 124.25/124.69  Inuse:        3683
% 124.25/124.69  Deleted:      11078
% 124.25/124.69  Deletedinuse: 616
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    1589265
% 124.25/124.69  Kept:         55124
% 124.25/124.69  Inuse:        3762
% 124.25/124.69  Deleted:      11078
% 124.25/124.69  Deletedinuse: 616
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    1688684
% 124.25/124.69  Kept:         57226
% 124.25/124.69  Inuse:        3851
% 124.25/124.69  Deleted:      11078
% 124.25/124.69  Deletedinuse: 616
% 124.25/124.69  
% 124.25/124.69  *** allocated 6568290 integers for clauses
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    1765359
% 124.25/124.69  Kept:         59229
% 124.25/124.69  Inuse:        3970
% 124.25/124.69  Deleted:      11083
% 124.25/124.69  Deletedinuse: 616
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying clauses:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    1842089
% 124.25/124.69  Kept:         61232
% 124.25/124.69  Inuse:        4139
% 124.25/124.69  Deleted:      13265
% 124.25/124.69  Deletedinuse: 624
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  *** allocated 1297440 integers for termspace/termends
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    1932575
% 124.25/124.69  Kept:         63243
% 124.25/124.69  Inuse:        4271
% 124.25/124.69  Deleted:      13265
% 124.25/124.69  Deletedinuse: 624
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    2105920
% 124.25/124.69  Kept:         65336
% 124.25/124.69  Inuse:        4419
% 124.25/124.69  Deleted:      13266
% 124.25/124.69  Deletedinuse: 624
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    2297697
% 124.25/124.69  Kept:         67339
% 124.25/124.69  Inuse:        4751
% 124.25/124.69  Deleted:      13269
% 124.25/124.69  Deletedinuse: 625
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    2615116
% 124.25/124.69  Kept:         69352
% 124.25/124.69  Inuse:        5450
% 124.25/124.69  Deleted:      13273
% 124.25/124.69  Deletedinuse: 628
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    2849062
% 124.25/124.69  Kept:         71389
% 124.25/124.69  Inuse:        5830
% 124.25/124.69  Deleted:      13285
% 124.25/124.69  Deletedinuse: 637
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    2968672
% 124.25/124.69  Kept:         73399
% 124.25/124.69  Inuse:        5919
% 124.25/124.69  Deleted:      13310
% 124.25/124.69  Deletedinuse: 656
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    3124308
% 124.25/124.69  Kept:         75421
% 124.25/124.69  Inuse:        6027
% 124.25/124.69  Deleted:      13310
% 124.25/124.69  Deletedinuse: 656
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    3285564
% 124.25/124.69  Kept:         77498
% 124.25/124.69  Inuse:        6151
% 124.25/124.69  Deleted:      13315
% 124.25/124.69  Deletedinuse: 661
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    3394660
% 124.25/124.69  Kept:         79498
% 124.25/124.69  Inuse:        6241
% 124.25/124.69  Deleted:      13341
% 124.25/124.69  Deletedinuse: 687
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying clauses:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    3472074
% 124.25/124.69  Kept:         81504
% 124.25/124.69  Inuse:        6353
% 124.25/124.69  Deleted:      17183
% 124.25/124.69  Deletedinuse: 764
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    3572922
% 124.25/124.69  Kept:         83533
% 124.25/124.69  Inuse:        6483
% 124.25/124.69  Deleted:      17338
% 124.25/124.69  Deletedinuse: 916
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    3644658
% 124.25/124.69  Kept:         85587
% 124.25/124.69  Inuse:        6567
% 124.25/124.69  Deleted:      17357
% 124.25/124.69  Deletedinuse: 935
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    3726430
% 124.25/124.69  Kept:         87637
% 124.25/124.69  Inuse:        6686
% 124.25/124.69  Deleted:      17357
% 124.25/124.69  Deletedinuse: 935
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    3833040
% 124.25/124.69  Kept:         89640
% 124.25/124.69  Inuse:        6755
% 124.25/124.69  Deleted:      17357
% 124.25/124.69  Deletedinuse: 935
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  *** allocated 9852435 integers for clauses
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    3975697
% 124.25/124.69  Kept:         91642
% 124.25/124.69  Inuse:        6849
% 124.25/124.69  Deleted:      17357
% 124.25/124.69  Deletedinuse: 935
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  *** allocated 1946160 integers for termspace/termends
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    4121802
% 124.25/124.69  Kept:         93757
% 124.25/124.69  Inuse:        6967
% 124.25/124.69  Deleted:      17365
% 124.25/124.69  Deletedinuse: 939
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    4263575
% 124.25/124.69  Kept:         95758
% 124.25/124.69  Inuse:        7118
% 124.25/124.69  Deleted:      17366
% 124.25/124.69  Deletedinuse: 940
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    4398484
% 124.25/124.69  Kept:         97759
% 124.25/124.69  Inuse:        7267
% 124.25/124.69  Deleted:      17374
% 124.25/124.69  Deletedinuse: 944
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    4531001
% 124.25/124.69  Kept:         99779
% 124.25/124.69  Inuse:        7356
% 124.25/124.69  Deleted:      17390
% 124.25/124.69  Deletedinuse: 952
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying clauses:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    4609837
% 124.25/124.69  Kept:         101785
% 124.25/124.69  Inuse:        7408
% 124.25/124.69  Deleted:      24282
% 124.25/124.69  Deletedinuse: 956
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    4697921
% 124.25/124.69  Kept:         103880
% 124.25/124.69  Inuse:        7477
% 124.25/124.69  Deleted:      24333
% 124.25/124.69  Deletedinuse: 1004
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    4819901
% 124.25/124.69  Kept:         105900
% 124.25/124.69  Inuse:        7546
% 124.25/124.69  Deleted:      24338
% 124.25/124.69  Deletedinuse: 1005
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    4917107
% 124.25/124.69  Kept:         107900
% 124.25/124.69  Inuse:        7597
% 124.25/124.69  Deleted:      24338
% 124.25/124.69  Deletedinuse: 1005
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Intermediate Status:
% 124.25/124.69  Generated:    5067278
% 124.25/124.69  Kept:         109957
% 124.25/124.69  Inuse:        7715
% 124.25/124.69  Deleted:      24338
% 124.25/124.69  Deletedinuse: 1005
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  Resimplifying inuse:
% 124.25/124.69  Done
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Bliksems!, er is een bewijs:
% 124.25/124.69  % SZS status Theorem
% 124.25/124.69  % SZS output start Refutation
% 124.25/124.69  
% 124.25/124.69  (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.25/124.69  (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( join( X, Y )
% 124.25/124.69    , Z ) }.
% 124.25/124.69  (2) {G0,W14,D6,L1,V2,M1} I { join( complement( join( complement( X ), 
% 124.25/124.69    complement( Y ) ) ), complement( join( complement( X ), Y ) ) ) ==> X }.
% 124.25/124.69  (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X ), complement
% 124.25/124.69    ( Y ) ) ) ==> meet( X, Y ) }.
% 124.25/124.69  (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z ) ) ==> 
% 124.25/124.69    composition( composition( X, Y ), Z ) }.
% 124.25/124.69  (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 124.25/124.69  (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ), composition( Y, Z )
% 124.25/124.69     ) ==> composition( join( X, Y ), Z ) }.
% 124.25/124.69  (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 124.25/124.69  (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y ) ) ==> 
% 124.25/124.69    converse( join( X, Y ) ) }.
% 124.25/124.69  (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ), converse( X ) ) 
% 124.25/124.69    ==> converse( composition( X, Y ) ) }.
% 124.25/124.69  (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X ), complement
% 124.25/124.69    ( composition( X, Y ) ) ), complement( Y ) ) ==> complement( Y ) }.
% 124.25/124.69  (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top }.
% 124.25/124.69  (12) {G0,W6,D4,L1,V1,M1} I { meet( X, complement( X ) ) ==> zero }.
% 124.25/124.69  (13) {G0,W7,D3,L2,V0,M2} I { alpha1( skol1 ), join( skol1, one ) ==> one
% 124.25/124.69     }.
% 124.25/124.69  (14) {G0,W9,D4,L2,V0,M2} I { alpha1( skol1 ), ! join( skol1, converse( 
% 124.25/124.69    skol1 ) ) ==> converse( skol1 ) }.
% 124.25/124.69  (15) {G0,W7,D3,L2,V1,M2} I { ! alpha1( X ), join( X, one ) ==> one }.
% 124.25/124.69  (16) {G0,W8,D4,L2,V1,M2} I { ! alpha1( X ), ! join( converse( X ), X ) ==> 
% 124.25/124.69    X }.
% 124.25/124.69  (17) {G0,W13,D4,L3,V1,M3} I { ! join( X, one ) ==> one, join( converse( X )
% 124.25/124.69    , X ) ==> X, alpha1( X ) }.
% 124.25/124.69  (18) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X ) ==> top }.
% 124.25/124.69  (19) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) = join( join( Y
% 124.25/124.69    , Z ), X ) }.
% 124.25/124.69  (20) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X ) = join( 
% 124.25/124.69    join( Z, X ), Y ) }.
% 124.25/124.69  (21) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ), complement( X ) ) 
% 124.25/124.69    ==> join( Y, top ) }.
% 124.25/124.69  (22) {G2,W10,D6,L1,V2,M1} P(18,1) { join( join( complement( join( X, Y ) )
% 124.25/124.69    , X ), Y ) ==> top }.
% 124.25/124.69  (23) {G2,W10,D5,L1,V2,M1} P(18,1) { join( join( Y, complement( X ) ), X ) 
% 124.25/124.69    ==> join( Y, top ) }.
% 124.25/124.69  (29) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ), complement( join
% 124.25/124.69    ( complement( X ), Y ) ) ) ==> X }.
% 124.25/124.69  (30) {G1,W5,D3,L1,V0,M1} S(13);r(15) { join( skol1, one ) ==> one }.
% 124.25/124.69  (31) {G2,W9,D4,L1,V1,M1} P(30,1) { join( join( X, skol1 ), one ) ==> join( 
% 124.25/124.69    X, one ) }.
% 124.25/124.69  (32) {G2,W5,D3,L1,V0,M1} P(30,0) { join( one, skol1 ) ==> one }.
% 124.25/124.69  (33) {G3,W9,D4,L1,V1,M1} P(32,1) { join( join( X, one ), skol1 ) ==> join( 
% 124.25/124.69    X, one ) }.
% 124.25/124.69  (38) {G1,W15,D5,L1,V3,M1} P(3,3) { meet( join( complement( X ), complement
% 124.25/124.69    ( Y ) ), Z ) ==> complement( join( meet( X, Y ), complement( Z ) ) ) }.
% 124.25/124.69  (39) {G1,W15,D5,L1,V3,M1} P(3,3) { meet( Z, join( complement( X ), 
% 124.25/124.69    complement( Y ) ) ) ==> complement( join( complement( Z ), meet( X, Y ) )
% 124.25/124.69     ) }.
% 124.25/124.69  (42) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X, Y ) }.
% 124.25/124.69  (44) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==> zero }.
% 124.25/124.69  (45) {G2,W9,D5,L1,V1,M1} P(44,3) { complement( join( zero, complement( X )
% 124.25/124.69     ) ) ==> meet( top, X ) }.
% 124.25/124.69  (46) {G2,W9,D5,L1,V1,M1} P(44,3) { complement( join( complement( X ), zero
% 124.25/124.69     ) ) ==> meet( X, top ) }.
% 124.25/124.69  (48) {G2,W5,D3,L1,V0,M1} P(44,18) { join( zero, top ) ==> top }.
% 124.25/124.69  (62) {G1,W14,D5,L1,V3,M1} P(8,1) { join( join( Z, converse( X ) ), converse
% 124.25/124.69    ( Y ) ) ==> join( Z, converse( join( X, Y ) ) ) }.
% 124.25/124.69  (63) {G1,W9,D4,L1,V2,M1} P(8,0);d(8) { converse( join( X, Y ) ) = converse
% 124.25/124.69    ( join( Y, X ) ) }.
% 124.25/124.69  (64) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X ), Y ) ) ==>
% 124.25/124.69     join( X, converse( Y ) ) }.
% 124.25/124.69  (65) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse( X ) ) ) ==>
% 124.25/124.69     join( converse( Y ), X ) }.
% 124.25/124.69  (73) {G2,W13,D5,L1,V3,M1} P(63,9);d(9) { converse( composition( Z, join( Y
% 124.25/124.69    , X ) ) ) = converse( composition( Z, join( X, Y ) ) ) }.
% 124.25/124.69  (77) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y, converse( X )
% 124.25/124.69     ) ) ==> composition( X, converse( Y ) ) }.
% 124.25/124.69  (78) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( converse( X ), Y
% 124.25/124.69     ) ) ==> composition( converse( Y ), X ) }.
% 124.25/124.69  (91) {G1,W15,D7,L1,V2,M1} P(9,10);d(7) { join( composition( X, complement( 
% 124.25/124.69    converse( composition( Y, X ) ) ) ), complement( converse( Y ) ) ) ==> 
% 124.25/124.69    complement( converse( Y ) ) }.
% 124.25/124.69  (95) {G2,W11,D6,L1,V1,M1} P(44,10) { join( composition( converse( X ), 
% 124.25/124.69    complement( composition( X, top ) ) ), zero ) ==> zero }.
% 124.25/124.69  (98) {G1,W13,D6,L1,V2,M1} P(10,0) { join( complement( Y ), composition( 
% 124.25/124.69    converse( X ), complement( composition( X, Y ) ) ) ) ==> complement( Y )
% 124.25/124.69     }.
% 124.25/124.69  (100) {G1,W11,D5,L1,V1,M1} P(5,10) { join( composition( converse( X ), 
% 124.25/124.69    complement( X ) ), complement( one ) ) ==> complement( one ) }.
% 124.25/124.69  (115) {G4,W9,D4,L1,V1,M1} P(33,0);d(1) { join( join( skol1, X ), one ) ==> 
% 124.25/124.69    join( X, one ) }.
% 124.25/124.69  (123) {G2,W8,D4,L2,V0,M2} R(17,30) { join( converse( skol1 ), skol1 ) ==> 
% 124.25/124.69    skol1, alpha1( skol1 ) }.
% 124.25/124.69  (131) {G3,W6,D3,L2,V0,M2} P(123,63);d(65);d(123) { alpha1( skol1 ), 
% 124.25/124.69    converse( skol1 ) ==> skol1 }.
% 124.25/124.69  (133) {G4,W7,D3,L2,V0,M2} P(123,0);d(131) { alpha1( skol1 ), join( skol1, 
% 124.25/124.69    skol1 ) ==> skol1 }.
% 124.25/124.69  (136) {G5,W2,D2,L1,V0,M1} P(131,14);f;d(133);q { alpha1( skol1 ) }.
% 124.25/124.69  (138) {G6,W6,D4,L1,V0,M1} R(136,16) { ! join( converse( skol1 ), skol1 ) 
% 124.25/124.69    ==> skol1 }.
% 124.25/124.69  (160) {G2,W11,D4,L1,V3,M1} P(0,19) { join( join( Z, X ), Y ) = join( join( 
% 124.25/124.69    Y, X ), Z ) }.
% 124.25/124.69  (172) {G2,W10,D6,L1,V2,M1} P(20,11) { join( join( X, complement( join( X, Y
% 124.25/124.69     ) ) ), Y ) ==> top }.
% 124.25/124.69  (224) {G3,W10,D6,L1,V2,M1} P(22,20) { join( join( complement( join( X, Y )
% 124.25/124.69     ), Y ), X ) ==> top }.
% 124.25/124.69  (389) {G3,W9,D4,L1,V2,M1} P(29,23);d(1);d(11) { join( meet( X, Y ), top ) 
% 124.25/124.69    ==> join( top, Y ) }.
% 124.25/124.69  (393) {G4,W12,D7,L1,V2,M1} P(29,21);d(389) { join( X, complement( 
% 124.25/124.69    complement( join( complement( X ), Y ) ) ) ) ==> join( top, Y ) }.
% 124.25/124.69  (409) {G2,W7,D4,L1,V1,M1} P(18,29);d(44) { join( meet( X, X ), zero ) ==> X
% 124.25/124.69     }.
% 124.25/124.69  (414) {G2,W7,D4,L1,V1,M1} P(12,29);d(3) { join( zero, meet( X, X ) ) ==> X
% 124.25/124.69     }.
% 124.25/124.69  (417) {G4,W8,D4,L1,V1,M1} P(409,21);d(389) { join( X, complement( zero ) ) 
% 124.25/124.69    ==> join( top, X ) }.
% 124.25/124.69  (423) {G3,W8,D5,L1,V1,M1} P(414,21);d(48) { join( X, complement( meet( X, X
% 124.25/124.69     ) ) ) ==> top }.
% 124.25/124.69  (542) {G5,W7,D4,L1,V2,M1} P(39,423);d(393) { join( top, meet( X, Y ) ) ==> 
% 124.25/124.69    top }.
% 124.25/124.69  (562) {G6,W5,D3,L1,V1,M1} P(542,0);d(389) { join( top, Y ) ==> top }.
% 124.25/124.69  (571) {G7,W7,D4,L1,V2,M1} P(562,19);d(562) { join( join( Y, top ), X ) ==> 
% 124.25/124.69    top }.
% 124.25/124.69  (575) {G8,W5,D3,L1,V1,M1} P(562,1);d(571) { join( Y, top ) ==> top }.
% 124.25/124.69  (578) {G9,W7,D4,L1,V1,M1} P(575,29);d(44) { join( meet( X, top ), zero ) 
% 124.25/124.69    ==> X }.
% 124.25/124.69  (637) {G10,W7,D4,L1,V1,M1} P(42,578) { join( meet( top, X ), zero ) ==> X
% 124.25/124.69     }.
% 124.25/124.69  (639) {G10,W7,D4,L1,V1,M1} P(578,0) { join( zero, meet( X, top ) ) ==> X
% 124.25/124.69     }.
% 124.25/124.69  (653) {G11,W7,D4,L1,V1,M1} P(637,0) { join( zero, meet( top, X ) ) ==> X
% 124.25/124.69     }.
% 124.25/124.69  (738) {G9,W7,D4,L1,V1,M1} P(575,64) { join( X, converse( top ) ) ==> 
% 124.25/124.69    converse( top ) }.
% 124.25/124.69  (746) {G2,W9,D6,L1,V1,M1} P(11,64) { join( X, converse( complement( 
% 124.25/124.69    converse( X ) ) ) ) ==> converse( top ) }.
% 124.25/124.69  (752) {G10,W4,D3,L1,V0,M1} P(738,562) { converse( top ) ==> top }.
% 124.25/124.69  (758) {G11,W9,D4,L1,V1,M1} P(752,9) { composition( top, converse( X ) ) ==>
% 124.25/124.69     converse( composition( X, top ) ) }.
% 124.25/124.69  (759) {G11,W9,D4,L1,V1,M1} P(752,9) { composition( converse( X ), top ) ==>
% 124.25/124.69     converse( composition( top, X ) ) }.
% 124.25/124.69  (774) {G11,W8,D6,L1,V1,M1} P(18,65);d(752) { join( converse( complement( 
% 124.25/124.69    converse( X ) ) ), X ) ==> top }.
% 124.25/124.69  (1016) {G7,W6,D4,L1,V1,M1} S(417);d(562) { join( X, complement( zero ) ) 
% 124.25/124.69    ==> top }.
% 124.25/124.69  (1020) {G9,W8,D4,L1,V2,M1} S(21);d(575) { join( join( Y, X ), complement( X
% 124.25/124.69     ) ) ==> top }.
% 124.25/124.69  (1026) {G8,W4,D3,L1,V0,M1} P(1016,10) { complement( zero ) ==> top }.
% 124.25/124.69  (1044) {G3,W11,D4,L1,V3,M1} P(73,7);d(7) { composition( X, join( Z, Y ) ) =
% 124.25/124.69     composition( X, join( Y, Z ) ) }.
% 124.25/124.69  (1268) {G2,W6,D4,L1,V1,M1} P(5,78);d(7) { composition( converse( one ), X )
% 124.25/124.69     ==> X }.
% 124.25/124.69  (1276) {G3,W4,D3,L1,V0,M1} P(1268,5) { converse( one ) ==> one }.
% 124.25/124.69  (1278) {G4,W5,D3,L1,V1,M1} P(1276,1268) { composition( one, X ) ==> X }.
% 124.25/124.69  (1279) {G4,W9,D4,L1,V1,M1} P(1276,65) { join( converse( X ), one ) ==> 
% 124.25/124.69    converse( join( X, one ) ) }.
% 124.25/124.69  (1285) {G5,W8,D4,L1,V1,M1} P(1278,10);d(1268) { join( complement( X ), 
% 124.25/124.69    complement( X ) ) ==> complement( X ) }.
% 124.25/124.69  (1286) {G5,W11,D4,L1,V2,M1} P(1278,6) { join( X, composition( Y, X ) ) = 
% 124.25/124.69    composition( join( one, Y ), X ) }.
% 124.25/124.69  (1287) {G5,W11,D4,L1,V2,M1} P(1278,6) { join( composition( Y, X ), X ) = 
% 124.25/124.69    composition( join( Y, one ), X ) }.
% 124.25/124.69  (1299) {G6,W7,D4,L1,V1,M1} P(1285,3) { complement( complement( X ) ) = meet
% 124.25/124.69    ( X, X ) }.
% 124.25/124.69  (1300) {G6,W11,D4,L1,V2,M1} P(3,1285) { join( meet( X, Y ), meet( X, Y ) ) 
% 124.25/124.69    ==> meet( X, Y ) }.
% 124.25/124.69  (1308) {G7,W7,D4,L1,V1,M1} P(1299,46);d(409) { meet( complement( X ), top )
% 124.25/124.69     ==> complement( X ) }.
% 124.25/124.69  (1333) {G11,W7,D4,L1,V1,M1} P(1308,639) { join( zero, complement( X ) ) ==>
% 124.25/124.69     complement( X ) }.
% 124.25/124.69  (1340) {G12,W5,D3,L1,V1,M1} P(1299,1333);d(414) { meet( X, X ) ==> X }.
% 124.25/124.69  (1344) {G12,W5,D3,L1,V1,M1} P(46,1333);d(639) { meet( X, top ) ==> X }.
% 124.25/124.69  (1345) {G12,W7,D4,L1,V1,M1} P(1333,45) { meet( top, X ) ==> complement( 
% 124.25/124.69    complement( X ) ) }.
% 124.25/124.69  (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { complement( 
% 124.25/124.69    complement( X ) ) ==> X }.
% 124.25/124.69  (1349) {G12,W11,D4,L1,V2,M1} P(1333,20) { join( join( zero, Y ), complement
% 124.25/124.69    ( X ) ) ==> join( complement( X ), Y ) }.
% 124.25/124.69  (1353) {G13,W10,D4,L1,V2,M1} P(1340,39);d(3);d(1300) { join( complement( X
% 124.25/124.69     ), complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 124.25/124.69  (1354) {G13,W5,D3,L1,V1,M1} P(1340,414) { join( zero, X ) ==> X }.
% 124.25/124.69  (1355) {G13,W5,D3,L1,V1,M1} P(1340,409) { join( X, zero ) ==> X }.
% 124.25/124.69  (1361) {G14,W6,D4,L1,V1,M1} P(1355,64);d(7) { join( X, converse( zero ) ) 
% 124.25/124.69    ==> X }.
% 124.25/124.69  (1368) {G14,W5,D3,L1,V1,M1} P(1346,1285) { join( X, X ) ==> X }.
% 124.25/124.69  (1373) {G14,W15,D6,L1,V3,M1} P(1346,39) { complement( join( complement( Y )
% 124.25/124.69    , meet( complement( X ), Z ) ) ) ==> meet( Y, join( X, complement( Z ) )
% 124.25/124.69     ) }.
% 124.25/124.69  (1374) {G14,W15,D6,L1,V3,M1} P(1346,39) { complement( join( complement( Y )
% 124.25/124.69    , meet( Z, complement( X ) ) ) ) ==> meet( Y, join( complement( Z ), X )
% 124.25/124.69     ) }.
% 124.25/124.69  (1375) {G14,W15,D6,L1,V3,M1} P(1346,38) { complement( join( meet( 
% 124.25/124.69    complement( X ), Y ), complement( Z ) ) ) ==> meet( join( X, complement( 
% 124.25/124.69    Y ) ), Z ) }.
% 124.25/124.69  (1379) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( X, complement( Y
% 124.25/124.69     ) ) ) ==> meet( complement( X ), Y ) }.
% 124.25/124.69  (1380) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( complement( Y )
% 124.25/124.69    , X ) ) ==> meet( Y, complement( X ) ) }.
% 124.25/124.69  (1388) {G15,W9,D4,L1,V2,M1} P(1368,20);d(1);d(1368) { join( join( X, Y ), Y
% 124.25/124.69     ) ==> join( X, Y ) }.
% 124.25/124.69  (1391) {G15,W4,D3,L1,V0,M1} P(1361,1354) { converse( zero ) ==> zero }.
% 124.25/124.69  (1397) {G14,W5,D3,L1,V1,M1} S(1345);d(1346) { meet( top, X ) ==> X }.
% 124.25/124.69  (1412) {G12,W8,D6,L1,V0,M1} P(774,31);d(562);d(1279) { converse( join( 
% 124.25/124.69    complement( converse( skol1 ) ), one ) ) ==> top }.
% 124.25/124.69  (1427) {G14,W9,D5,L1,V1,M1} S(95);d(1355) { composition( converse( X ), 
% 124.25/124.69    complement( composition( X, top ) ) ) ==> zero }.
% 124.25/124.69  (1428) {G16,W7,D5,L1,V0,M1} P(1412,774);d(1);d(44);d(1391);d(1333) { join( 
% 124.25/124.69    complement( converse( skol1 ) ), one ) ==> top }.
% 124.25/124.69  (1446) {G17,W7,D4,L1,V0,M1} P(1428,29);d(44);d(1355) { meet( converse( 
% 124.25/124.69    skol1 ), one ) ==> converse( skol1 ) }.
% 124.25/124.69  (1521) {G14,W12,D7,L1,V2,M1} P(1346,98) { join( X, composition( converse( Y
% 124.25/124.69     ), complement( composition( Y, complement( X ) ) ) ) ) ==> X }.
% 124.25/124.69  (1591) {G16,W8,D5,L1,V2,M1} P(29,1388);d(1380) { join( X, meet( X, 
% 124.25/124.69    complement( Y ) ) ) ==> X }.
% 124.25/124.69  (1595) {G17,W7,D4,L1,V2,M1} P(1346,1591) { join( Y, meet( Y, X ) ) ==> Y
% 124.25/124.69     }.
% 124.25/124.69  (1637) {G18,W11,D4,L1,V3,M1} P(1595,20) { join( join( X, Z ), meet( X, Y )
% 124.25/124.69     ) ==> join( X, Z ) }.
% 124.25/124.69  (1639) {G18,W11,D5,L1,V3,M1} P(1595,19) { join( join( meet( X, Y ), Z ), X
% 124.25/124.69     ) ==> join( X, Z ) }.
% 124.25/124.69  (1643) {G18,W7,D4,L1,V2,M1} P(42,1595) { join( X, meet( Y, X ) ) ==> X }.
% 124.25/124.69  (1646) {G19,W8,D5,L1,V2,M1} P(1643,1020) { join( X, complement( meet( Y, X
% 124.25/124.69     ) ) ) ==> top }.
% 124.25/124.69  (1664) {G19,W11,D5,L1,V3,M1} P(1643,19) { join( join( meet( Y, X ), Z ), X
% 124.25/124.69     ) ==> join( X, Z ) }.
% 124.25/124.69  (1665) {G19,W13,D6,L1,V3,M1} P(1643,19) { join( join( meet( Z, join( X, Y )
% 124.25/124.69     ), X ), Y ) ==> join( X, Y ) }.
% 124.25/124.69  (1668) {G19,W7,D4,L1,V2,M1} P(1643,0) { join( meet( Y, X ), X ) ==> X }.
% 124.25/124.69  (1671) {G20,W9,D6,L1,V2,M1} P(1668,65);d(7) { join( converse( meet( X, 
% 124.25/124.69    converse( Y ) ) ), Y ) ==> Y }.
% 124.25/124.69  (1674) {G20,W7,D4,L1,V1,M1} P(1668,31);d(30) { join( meet( X, skol1 ), one
% 124.25/124.69     ) ==> one }.
% 124.25/124.69  (1676) {G20,W11,D5,L1,V3,M1} P(1668,19) { join( join( Z, meet( X, Y ) ), Y
% 124.25/124.69     ) ==> join( Y, Z ) }.
% 124.25/124.69  (1779) {G20,W8,D5,L1,V2,M1} P(1646,22);d(44);d(1349) { join( complement( 
% 124.25/124.69    meet( Y, X ) ), X ) ==> top }.
% 124.25/124.69  (1785) {G20,W10,D5,L1,V3,M1} P(1646,19);d(562) { join( join( Z, X ), 
% 124.25/124.69    complement( meet( Y, X ) ) ) ==> top }.
% 124.25/124.69  (1799) {G21,W8,D5,L1,V2,M1} P(42,1779) { join( complement( meet( Y, X ) ), 
% 124.25/124.69    Y ) ==> top }.
% 124.25/124.69  (1819) {G22,W8,D5,L1,V2,M1} P(1799,3);d(44) { meet( meet( complement( X ), 
% 124.25/124.69    Y ), X ) ==> zero }.
% 124.25/124.69  (1820) {G22,W12,D7,L1,V3,M1} P(1799,1) { join( join( complement( meet( join
% 124.25/124.69    ( X, Y ), Z ) ), X ), Y ) ==> top }.
% 124.25/124.69  (1821) {G23,W8,D4,L1,V2,M1} P(1346,1819) { meet( meet( X, Y ), complement( 
% 124.25/124.69    X ) ) ==> zero }.
% 124.25/124.69  (1822) {G23,W8,D5,L1,V2,M1} P(1819,42) { meet( X, meet( complement( X ), Y
% 124.25/124.69     ) ) ==> zero }.
% 124.25/124.69  (1826) {G24,W8,D4,L1,V2,M1} P(1821,42) { meet( complement( X ), meet( X, Y
% 124.25/124.69     ) ) ==> zero }.
% 124.25/124.69  (1827) {G24,W8,D4,L1,V2,M1} P(42,1821) { meet( meet( Y, X ), complement( X
% 124.25/124.69     ) ) ==> zero }.
% 124.25/124.69  (1834) {G25,W10,D5,L1,V2,M1} P(1826,29);d(1333);d(1380) { meet( complement
% 124.25/124.69    ( X ), complement( meet( X, Y ) ) ) ==> complement( X ) }.
% 124.25/124.69  (1835) {G25,W8,D4,L1,V2,M1} P(42,1826) { meet( complement( X ), meet( Y, X
% 124.25/124.69     ) ) ==> zero }.
% 124.25/124.69  (1839) {G24,W8,D5,L1,V2,M1} P(1822,29);d(1333);d(1373) { meet( X, join( X, 
% 124.25/124.69    complement( Y ) ) ) ==> X }.
% 124.25/124.69  (1841) {G25,W7,D4,L1,V2,M1} P(1346,1839) { meet( Y, join( Y, X ) ) ==> Y
% 124.25/124.69     }.
% 124.25/124.69  (1848) {G26,W8,D5,L1,V2,M1} P(1841,1827) { meet( X, complement( join( X, Y
% 124.25/124.69     ) ) ) ==> zero }.
% 124.25/124.69  (1849) {G26,W8,D5,L1,V2,M1} P(1841,1835) { meet( complement( join( X, Y ) )
% 124.25/124.69    , X ) ==> zero }.
% 124.25/124.69  (1850) {G26,W9,D4,L1,V1,M1} P(1674,1841) { meet( meet( X, skol1 ), one ) 
% 124.25/124.69    ==> meet( X, skol1 ) }.
% 124.25/124.69  (1864) {G26,W7,D4,L1,V2,M1} P(1841,42) { meet( join( X, Y ), X ) ==> X }.
% 124.25/124.69  (1867) {G26,W7,D4,L1,V2,M1} P(0,1841) { meet( X, join( Y, X ) ) ==> X }.
% 124.25/124.69  (1876) {G27,W9,D4,L1,V2,M1} P(1668,1864) { meet( Y, meet( X, Y ) ) ==> meet
% 124.25/124.69    ( X, Y ) }.
% 124.25/124.69  (1890) {G27,W10,D5,L1,V2,M1} P(8,1864) { meet( converse( join( X, Y ) ), 
% 124.25/124.69    converse( X ) ) ==> converse( X ) }.
% 124.25/124.69  (1893) {G27,W7,D4,L1,V2,M1} P(0,1864) { meet( join( Y, X ), X ) ==> X }.
% 124.25/124.69  (1895) {G28,W8,D5,L1,V2,M1} P(1893,1821) { meet( Y, complement( join( X, Y
% 124.25/124.69     ) ) ) ==> zero }.
% 124.25/124.69  (1902) {G28,W9,D5,L1,V3,M1} P(20,1893) { meet( join( join( X, Z ), Y ), Z )
% 124.25/124.69     ==> Z }.
% 124.25/124.69  (1910) {G27,W9,D5,L1,V3,M1} P(20,1867) { meet( Z, join( join( X, Z ), Y ) )
% 124.25/124.69     ==> Z }.
% 124.25/124.69  (1956) {G29,W12,D7,L1,V3,M1} P(62,1895) { meet( converse( Z ), complement( 
% 124.25/124.69    join( X, converse( join( Y, Z ) ) ) ) ) ==> zero }.
% 124.25/124.69  (1965) {G29,W12,D6,L1,V3,M1} P(6,1895) { meet( composition( Z, Y ), 
% 124.25/124.69    complement( composition( join( X, Z ), Y ) ) ) ==> zero }.
% 124.25/124.69  (1968) {G27,W9,D5,L1,V1,M1} P(100,1848);d(1346) { meet( composition( 
% 124.25/124.69    converse( X ), complement( X ) ), one ) ==> zero }.
% 124.25/124.69  (2039) {G15,W10,D5,L1,V2,M1} S(29);d(1380) { join( meet( X, Y ), meet( X, 
% 124.25/124.69    complement( Y ) ) ) ==> X }.
% 124.25/124.69  (2482) {G12,W15,D5,L1,V2,M1} P(759,6) { join( composition( Y, top ), 
% 124.25/124.69    converse( composition( top, X ) ) ) ==> composition( join( Y, converse( X
% 124.25/124.69     ) ), top ) }.
% 124.25/124.69  (2728) {G3,W10,D5,L1,V2,M1} P(160,22) { join( join( Y, X ), complement( 
% 124.25/124.69    join( X, Y ) ) ) ==> top }.
% 124.25/124.69  (3533) {G28,W9,D6,L1,V1,M1} P(1346,1968) { meet( composition( converse( 
% 124.25/124.69    complement( X ) ), X ), one ) ==> zero }.
% 124.25/124.69  (3563) {G15,W8,D5,L1,V0,M1} P(752,1427) { composition( top, complement( 
% 124.25/124.69    composition( top, top ) ) ) ==> zero }.
% 124.25/124.69  (3572) {G16,W8,D5,L1,V1,M1} P(3563,6);d(1355);d(575);d(3563) { composition
% 124.25/124.69    ( X, complement( composition( top, top ) ) ) ==> zero }.
% 124.25/124.69  (3587) {G17,W6,D4,L1,V0,M1} P(3572,1278) { complement( composition( top, 
% 124.25/124.69    top ) ) ==> zero }.
% 124.25/124.69  (3596) {G18,W5,D3,L1,V0,M1} P(3587,1346);d(1026) { composition( top, top ) 
% 124.25/124.69    ==> top }.
% 124.25/124.69  (3597) {G19,W9,D4,L1,V1,M1} P(3596,4) { composition( composition( X, top )
% 124.25/124.69    , top ) ==> composition( X, top ) }.
% 124.25/124.69  (3600) {G20,W13,D5,L1,V2,M1} P(3597,6);d(6) { composition( join( Y, 
% 124.25/124.69    composition( X, top ) ), top ) ==> composition( join( Y, X ), top ) }.
% 124.25/124.69  (3824) {G27,W10,D6,L1,V2,M1} P(1671,1849) { meet( complement( Y ), converse
% 124.25/124.69    ( meet( X, converse( Y ) ) ) ) ==> zero }.
% 124.25/124.69  (3831) {G21,W13,D7,L1,V3,M1} P(1671,20) { join( join( converse( meet( X, 
% 124.25/124.69    converse( Y ) ) ), Z ), Y ) ==> join( Y, Z ) }.
% 124.25/124.69  (3834) {G21,W15,D8,L1,V3,M1} P(63,1671);d(1) { join( join( converse( meet( 
% 124.25/124.69    Z, converse( join( Y, X ) ) ) ), X ), Y ) ==> join( X, Y ) }.
% 124.25/124.69  (3908) {G29,W7,D5,L1,V0,M1} P(5,3533) { meet( converse( complement( one ) )
% 124.25/124.69    , one ) ==> zero }.
% 124.25/124.69  (3912) {G30,W7,D5,L1,V0,M1} P(3908,42) { meet( one, converse( complement( 
% 124.25/124.69    one ) ) ) ==> zero }.
% 124.25/124.69  (4056) {G11,W8,D6,L1,V1,M1} S(746);d(752) { join( X, converse( complement( 
% 124.25/124.69    converse( X ) ) ) ) ==> top }.
% 124.25/124.69  (4368) {G14,W14,D5,L1,V3,M1} P(1353,160) { join( join( Z, complement( Y ) )
% 124.25/124.69    , complement( X ) ) ==> join( complement( meet( X, Y ) ), Z ) }.
% 124.25/124.69  (4372) {G14,W10,D5,L1,V2,M1} P(1346,1353) { complement( meet( complement( X
% 124.25/124.69     ), Y ) ) ==> join( X, complement( Y ) ) }.
% 124.25/124.69  (4373) {G14,W10,D5,L1,V2,M1} P(1346,1353) { complement( meet( Y, complement
% 124.25/124.69    ( X ) ) ) ==> join( complement( Y ), X ) }.
% 124.25/124.69  (4383) {G14,W9,D4,L1,V2,M1} P(1353,0);d(1353) { complement( meet( X, Y ) ) 
% 124.25/124.69    = complement( meet( Y, X ) ) }.
% 124.25/124.69  (4417) {G15,W10,D5,L1,V2,M1} P(4383,11) { join( meet( X, Y ), complement( 
% 124.25/124.69    meet( Y, X ) ) ) ==> top }.
% 124.25/124.69  (4418) {G15,W10,D5,L1,V2,M1} P(4383,12) { meet( meet( X, Y ), complement( 
% 124.25/124.69    meet( Y, X ) ) ) ==> zero }.
% 124.25/124.69  (6985) {G31,W8,D6,L1,V0,M1} P(3912,2039);d(1354) { meet( one, complement( 
% 124.25/124.69    converse( complement( one ) ) ) ) ==> one }.
% 124.25/124.69  (7035) {G16,W10,D5,L1,V2,M1} P(42,2039) { join( meet( Y, X ), meet( X, 
% 124.25/124.69    complement( Y ) ) ) ==> X }.
% 124.25/124.69  (7038) {G32,W9,D5,L1,V0,M1} P(6985,4373) { join( complement( one ), 
% 124.25/124.69    converse( complement( one ) ) ) ==> complement( one ) }.
% 124.25/124.69  (7054) {G32,W9,D5,L1,V0,M1} P(6985,4383);d(4372) { join( converse( 
% 124.25/124.69    complement( one ) ), complement( one ) ) ==> complement( one ) }.
% 124.25/124.69  (7078) {G33,W6,D4,L1,V0,M1} P(7038,65);d(7054) { converse( complement( one
% 124.25/124.69     ) ) ==> complement( one ) }.
% 124.25/124.69  (7096) {G34,W15,D6,L1,V2,M1} P(7078,62) { join( X, converse( join( 
% 124.25/124.69    complement( one ), Y ) ) ) ==> join( join( X, complement( one ) ), 
% 124.25/124.69    converse( Y ) ) }.
% 124.25/124.69  (7146) {G17,W10,D5,L1,V2,M1} P(7035,0) { join( meet( Y, complement( X ) ), 
% 124.25/124.69    meet( X, Y ) ) ==> Y }.
% 124.25/124.69  (7612) {G15,W10,D5,L1,V2,M1} P(2728,1379);d(44) { meet( complement( join( X
% 124.25/124.69    , Y ) ), join( Y, X ) ) ==> zero }.
% 124.25/124.69  (7678) {G15,W10,D4,L1,V2,M1} P(1346,1379) { meet( complement( Y ), 
% 124.25/124.69    complement( X ) ) ==> complement( join( Y, X ) ) }.
% 124.25/124.69  (7681) {G15,W14,D6,L1,V3,M1} P(20,1379) { complement( join( join( X, 
% 124.25/124.69    complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 124.25/124.69  (7750) {G16,W9,D4,L1,V2,M1} P(7678,42);d(7678) { complement( join( X, Y ) )
% 124.25/124.69     = complement( join( Y, X ) ) }.
% 124.25/124.69  (7767) {G21,W10,D5,L1,V3,M1} P(1785,7750);d(44);d(1380) { meet( meet( Z, Y
% 124.25/124.69     ), complement( join( X, Y ) ) ) ==> zero }.
% 124.25/124.69  (7839) {G22,W10,D5,L1,V3,M1} P(7146,7767) { meet( meet( Z, meet( Y, X ) ), 
% 124.25/124.69    complement( X ) ) ==> zero }.
% 124.25/124.69  (7905) {G26,W10,D5,L1,V3,M1} P(1834,7839);d(1346) { meet( meet( Z, 
% 124.25/124.69    complement( X ) ), meet( X, Y ) ) ==> zero }.
% 124.25/124.69  (7937) {G27,W10,D5,L1,V3,M1} P(7905,4418);d(1026);d(1344) { meet( meet( Y, 
% 124.25/124.69    Z ), meet( X, complement( Y ) ) ) ==> zero }.
% 124.25/124.69  (7975) {G27,W10,D6,L1,V3,M1} P(1864,7905) { meet( meet( Z, complement( join
% 124.25/124.69    ( X, Y ) ) ), X ) ==> zero }.
% 124.25/124.69  (8140) {G28,W10,D6,L1,V3,M1} P(1864,7937) { meet( X, meet( Z, complement( 
% 124.25/124.69    join( X, Y ) ) ) ) ==> zero }.
% 124.25/124.69  (8509) {G16,W10,D6,L1,V2,M1} P(1353,7612);d(7678);d(7681);d(1380) { meet( 
% 124.25/124.69    meet( Y, complement( meet( X, Y ) ) ), X ) ==> zero }.
% 124.25/124.69  (10619) {G18,W10,D5,L1,V2,M1} P(8509,7146);d(1355);d(4373) { meet( Y, join
% 124.25/124.69    ( complement( X ), meet( Y, X ) ) ) ==> Y }.
% 124.25/124.69  (10652) {G20,W11,D4,L1,V2,M1} P(10619,1668);d(1);d(1637) { join( complement
% 124.25/124.69    ( Y ), meet( X, Y ) ) ==> join( X, complement( Y ) ) }.
% 124.25/124.69  (10654) {G19,W10,D5,L1,V2,M1} P(42,10619) { meet( X, join( complement( Y )
% 124.25/124.69    , meet( Y, X ) ) ) ==> X }.
% 124.25/124.69  (10655) {G19,W10,D5,L1,V2,M1} P(0,10619) { meet( Y, join( meet( Y, X ), 
% 124.25/124.69    complement( X ) ) ) ==> Y }.
% 124.25/124.69  (10680) {G20,W10,D6,L1,V2,M1} P(10654,4372);d(1346);d(1374) { join( X, meet
% 124.25/124.69    ( Y, join( complement( Y ), X ) ) ) ==> X }.
% 124.25/124.69  (10753) {G20,W10,D6,L1,V2,M1} P(10655,4372);d(1346);d(1375) { join( X, meet
% 124.25/124.69    ( join( X, complement( Y ) ), Y ) ) ==> X }.
% 124.25/124.69  (10802) {G21,W11,D4,L1,V2,M1} P(4417,10753);d(1397) { join( meet( X, Y ), 
% 124.25/124.69    meet( Y, X ) ) ==> meet( X, Y ) }.
% 124.25/124.69  (10821) {G21,W10,D5,L1,V2,M1} P(224,10753);d(1380);d(1397);d(1639) { join( 
% 124.25/124.69    meet( X, complement( Y ) ), Y ) ==> join( X, Y ) }.
% 124.25/124.69  (10822) {G21,W10,D5,L1,V2,M1} P(172,10753);d(1379);d(1397);d(1676) { join( 
% 124.25/124.69    X, meet( complement( X ), Y ) ) ==> join( Y, X ) }.
% 124.25/124.69  (10838) {G21,W10,D5,L1,V2,M1} P(1346,10753) { join( Y, meet( join( Y, X ), 
% 124.25/124.69    complement( X ) ) ) ==> Y }.
% 124.25/124.69  (11775) {G22,W10,D5,L1,V1,M1} P(10821,31);d(31) { join( meet( X, complement
% 124.25/124.69    ( skol1 ) ), one ) ==> join( X, one ) }.
% 124.25/124.69  (11800) {G22,W11,D5,L1,V2,M1} P(7678,10822) { join( X, complement( join( X
% 124.25/124.69    , Y ) ) ) ==> join( complement( Y ), X ) }.
% 124.25/124.69  (11825) {G22,W10,D5,L1,V1,M1} P(10822,115);d(31) { join( meet( complement( 
% 124.25/124.69    skol1 ), X ), one ) ==> join( X, one ) }.
% 124.25/124.69  (11869) {G22,W9,D7,L1,V1,M1} P(4056,10838);d(1397) { join( X, complement( 
% 124.25/124.69    converse( complement( converse( X ) ) ) ) ) ==> X }.
% 124.25/124.69  (11901) {G23,W9,D7,L1,V1,M1} P(11869,1380);d(1346);d(1346) { meet( X, 
% 124.25/124.69    converse( complement( converse( complement( X ) ) ) ) ) ==> X }.
% 124.25/124.69  (11952) {G23,W10,D6,L1,V1,M1} P(7,11869) { join( converse( X ), complement
% 124.25/124.69    ( converse( complement( X ) ) ) ) ==> converse( X ) }.
% 124.25/124.69  (12014) {G24,W7,D5,L1,V1,M1} P(11901,1671);d(11952) { complement( converse
% 124.25/124.69    ( complement( X ) ) ) ==> converse( X ) }.
% 124.25/124.69  (12039) {G25,W12,D6,L1,V2,M1} P(1380,12014) { complement( converse( meet( X
% 124.25/124.69    , complement( Y ) ) ) ) ==> converse( join( complement( X ), Y ) ) }.
% 124.25/124.69  (12105) {G25,W7,D4,L1,V1,M1} P(12014,1346) { converse( complement( X ) ) 
% 124.25/124.69    ==> complement( converse( X ) ) }.
% 124.25/124.69  (12148) {G26,W12,D6,L1,V2,M1} P(12105,77) { converse( composition( Y, 
% 124.25/124.69    complement( converse( X ) ) ) ) ==> composition( complement( X ), 
% 124.25/124.69    converse( Y ) ) }.
% 124.25/124.69  (12154) {G26,W12,D5,L1,V2,M1} P(12105,9) { composition( complement( 
% 124.25/124.69    converse( X ) ), converse( Y ) ) ==> converse( composition( Y, complement
% 124.25/124.69    ( X ) ) ) }.
% 124.25/124.69  (12962) {G23,W10,D5,L1,V1,M1} P(11825,0) { join( one, meet( complement( 
% 124.25/124.69    skol1 ), X ) ) ==> join( X, one ) }.
% 124.25/124.69  (12964) {G28,W10,D5,L1,V1,M1} P(1876,12962);d(11775) { join( one, meet( X, 
% 124.25/124.69    complement( skol1 ) ) ) ==> join( X, one ) }.
% 124.25/124.69  (13424) {G28,W10,D5,L1,V2,M1} P(7,3824) { meet( complement( converse( X ) )
% 124.25/124.69    , converse( meet( Y, X ) ) ) ==> zero }.
% 124.25/124.69  (13461) {G29,W10,D5,L1,V2,M1} P(13424,42) { meet( converse( meet( Y, X ) )
% 124.25/124.69    , complement( converse( X ) ) ) ==> zero }.
% 124.25/124.69  (13512) {G30,W10,D6,L1,V2,M1} P(12105,13461);d(1346) { meet( converse( meet
% 124.25/124.69    ( Y, complement( X ) ) ), converse( X ) ) ==> zero }.
% 124.25/124.69  (13556) {G31,W10,D7,L1,V2,M1} P(7,13512) { meet( converse( meet( Y, 
% 124.25/124.69    complement( converse( X ) ) ) ), X ) ==> zero }.
% 124.25/124.69  (15332) {G22,W11,D4,L1,V3,M1} P(10802,1044);d(10802) { composition( Z, meet
% 124.25/124.69    ( X, Y ) ) = composition( Z, meet( Y, X ) ) }.
% 124.25/124.69  (16035) {G21,W7,D4,L1,V1,M1} P(3597,1286);d(562);d(3600) { composition( 
% 124.25/124.69    join( one, X ), top ) ==> top }.
% 124.25/124.69  (16087) {G9,W9,D4,L1,V1,M1} P(575,1286) { join( X, composition( top, X ) ) 
% 124.25/124.69    ==> composition( top, X ) }.
% 124.25/124.69  (16096) {G6,W7,D4,L1,V1,M1} P(32,1286);d(1278) { join( X, composition( 
% 124.25/124.69    skol1, X ) ) ==> X }.
% 124.25/124.69  (16099) {G6,W10,D5,L1,V1,M1} P(11,1286) { join( X, composition( complement
% 124.25/124.69    ( one ), X ) ) ==> composition( top, X ) }.
% 124.25/124.69  (16101) {G29,W7,D4,L1,V1,M1} P(12964,16035) { composition( join( X, one ), 
% 124.25/124.69    top ) ==> top }.
% 124.25/124.69  (16111) {G30,W8,D5,L1,V1,M1} P(1279,16101);d(759) { converse( composition( 
% 124.25/124.69    top, join( X, one ) ) ) ==> top }.
% 124.25/124.69  (16175) {G27,W9,D4,L1,V1,M1} P(16096,1867) { meet( composition( skol1, X )
% 124.25/124.69    , X ) ==> composition( skol1, X ) }.
% 124.25/124.69  (16184) {G7,W8,D5,L1,V1,M1} P(16096,64);d(7);d(77) { join( X, composition( 
% 124.25/124.69    X, converse( skol1 ) ) ) ==> X }.
% 124.25/124.69  (16406) {G8,W8,D5,L1,V1,M1} P(16184,1286);d(1278);d(1278) { join( X, 
% 124.25/124.69    composition( converse( skol1 ), X ) ) ==> X }.
% 124.25/124.69  (16476) {G9,W7,D4,L1,V1,M1} P(16406,64);d(7);d(77);d(7) { join( X, 
% 124.25/124.69    composition( X, skol1 ) ) ==> X }.
% 124.25/124.69  (16533) {G10,W11,D5,L1,V2,M1} P(16476,160) { join( join( Y, composition( X
% 124.25/124.69    , skol1 ) ), X ) ==> join( X, Y ) }.
% 124.25/124.69  (16544) {G27,W9,D4,L1,V1,M1} P(16476,1867) { meet( composition( X, skol1 )
% 124.25/124.69    , X ) ==> composition( X, skol1 ) }.
% 124.25/124.69  (16875) {G31,W14,D5,L1,V2,M1} P(16111,1671);d(1344) { join( converse( Y ), 
% 124.25/124.69    composition( top, join( X, one ) ) ) ==> composition( top, join( X, one )
% 124.25/124.69     ) }.
% 124.25/124.69  (16894) {G32,W7,D4,L1,V1,M1} P(16111,65);d(575);d(752);d(16875) { 
% 124.25/124.69    composition( top, join( X, one ) ) ==> top }.
% 124.25/124.69  (16903) {G33,W7,D4,L1,V1,M1} P(16894,1044) { composition( top, join( one, X
% 124.25/124.69     ) ) ==> top }.
% 124.25/124.69  (17167) {G28,W10,D6,L1,V2,M1} P(16544,7975) { meet( composition( complement
% 124.25/124.69    ( join( X, Y ) ), skol1 ), X ) ==> zero }.
% 124.25/124.69  (17227) {G32,W9,D5,L1,V1,M1} P(16175,13556);d(12148) { meet( composition( 
% 124.25/124.69    complement( X ), converse( skol1 ) ), X ) ==> zero }.
% 124.25/124.69  (17276) {G29,W10,D6,L1,V2,M1} P(16175,8140) { meet( X, composition( skol1, 
% 124.25/124.69    complement( join( X, Y ) ) ) ) ==> zero }.
% 124.25/124.69  (17365) {G28,W10,D5,L1,V1,M1} P(16087,1890) { meet( converse( composition( 
% 124.25/124.69    top, X ) ), converse( X ) ) ==> converse( X ) }.
% 124.25/124.69  (17366) {G23,W8,D4,L1,V1,M1} P(16087,2728);d(11800) { join( complement( X )
% 124.25/124.69    , composition( top, X ) ) ==> top }.
% 124.25/124.69  (17381) {G29,W9,D5,L1,V2,M1} P(16087,1902) { meet( composition( top, join( 
% 124.25/124.69    X, Y ) ), Y ) ==> Y }.
% 124.25/124.69  (17382) {G28,W9,D5,L1,V2,M1} P(16087,1910) { meet( Y, composition( top, 
% 124.25/124.69    join( X, Y ) ) ) ==> Y }.
% 124.25/124.69  (17454) {G24,W8,D5,L1,V1,M1} P(1346,17366) { join( X, composition( top, 
% 124.25/124.69    complement( X ) ) ) ==> top }.
% 124.25/124.69  (17534) {G27,W8,D5,L1,V1,M1} P(17454,64);d(752);d(12148);d(752) { join( X, 
% 124.25/124.69    composition( complement( X ), top ) ) ==> top }.
% 124.25/124.69  (17564) {G28,W9,D4,L1,V1,M1} P(17534,10680);d(1346);d(1344) { join( 
% 124.25/124.69    composition( X, top ), X ) ==> composition( X, top ) }.
% 124.25/124.69  (18270) {G29,W13,D4,L1,V2,M1} P(17564,160) { join( join( Y, X ), 
% 124.25/124.69    composition( X, top ) ) ==> join( composition( X, top ), Y ) }.
% 124.25/124.69  (19429) {G34,W11,D4,L1,V2,M1} P(1286,17382);d(4);d(16903) { meet( 
% 124.25/124.69    composition( Y, X ), composition( top, X ) ) ==> composition( Y, X ) }.
% 124.25/124.69  (23878) {G21,W10,D6,L1,V2,M1} P(1671,1287);d(1276);d(1278) { join( 
% 124.25/124.69    composition( converse( meet( X, one ) ), Y ), Y ) ==> Y }.
% 124.25/124.69  (28506) {G30,W10,D5,L1,V2,M1} P(1820,1965) { meet( composition( Y, T ), 
% 124.25/124.69    complement( composition( top, T ) ) ) ==> zero }.
% 124.25/124.69  (30380) {G31,W8,D5,L1,V0,M1} P(28506,16544) { composition( complement( 
% 124.25/124.69    composition( top, skol1 ) ), skol1 ) ==> zero }.
% 124.25/124.69  (30402) {G32,W11,D5,L1,V0,M1} P(30380,91);d(1391);d(1026);d(12105);d(1346);
% 124.25/124.69    d(2482) { composition( join( skol1, converse( skol1 ) ), top ) ==> 
% 124.25/124.69    converse( composition( top, skol1 ) ) }.
% 124.25/124.69  (49770) {G22,W9,D5,L1,V2,M1} P(23878,65);d(7);d(77);d(7) { join( 
% 124.25/124.69    composition( Y, meet( X, one ) ), Y ) ==> Y }.
% 124.25/124.69  (49820) {G23,W9,D5,L1,V2,M1} P(49770,1665);d(1664) { join( X, composition( 
% 124.25/124.69    X, meet( Y, one ) ) ) ==> X }.
% 124.25/124.69  (49912) {G24,W9,D5,L1,V2,M1} P(15332,49820) { join( X, composition( X, meet
% 124.25/124.69    ( one, Y ) ) ) ==> X }.
% 124.25/124.69  (49929) {G27,W9,D5,L1,V2,M1} P(1850,49820) { join( Y, composition( Y, meet
% 124.25/124.69    ( X, skol1 ) ) ) ==> Y }.
% 124.25/124.69  (50007) {G30,W15,D5,L1,V2,M1} P(49912,17381) { meet( composition( top, X )
% 124.25/124.69    , composition( X, meet( one, Y ) ) ) ==> composition( X, meet( one, Y ) )
% 124.25/124.69     }.
% 124.25/124.69  (50205) {G28,W11,D5,L1,V3,M1} P(49929,1664);d(1668) { join( Y, composition
% 124.25/124.69    ( meet( X, Y ), meet( Z, skol1 ) ) ) ==> Y }.
% 124.25/124.69  (71487) {G35,W10,D6,L1,V1,M1} P(19429,17167) { composition( complement( 
% 124.25/124.69    join( composition( top, skol1 ), X ) ), skol1 ) ==> zero }.
% 124.25/124.69  (71523) {G35,W9,D6,L1,V0,M1} P(19429,17227);d(758);d(12154) { converse( 
% 124.25/124.69    composition( skol1, complement( composition( skol1, top ) ) ) ) ==> zero
% 124.25/124.69     }.
% 124.25/124.69  (71615) {G36,W8,D5,L1,V0,M1} P(71523,7);d(1391) { composition( skol1, 
% 124.25/124.69    complement( composition( skol1, top ) ) ) ==> zero }.
% 124.25/124.69  (71637) {G37,W8,D4,L1,V0,M1} P(71615,1521);d(1026);d(6);d(30402) { converse
% 124.25/124.69    ( composition( top, skol1 ) ) ==> composition( skol1, top ) }.
% 124.25/124.69  (71687) {G38,W9,D4,L1,V0,M1} P(71637,17365) { meet( composition( skol1, top
% 124.25/124.69     ), converse( skol1 ) ) ==> converse( skol1 ) }.
% 124.25/124.69  (71915) {G39,W14,D5,L1,V1,M1} P(71687,1637) { join( join( composition( 
% 124.25/124.69    skol1, top ), X ), converse( skol1 ) ) ==> join( composition( skol1, top
% 124.25/124.69     ), X ) }.
% 124.25/124.69  (78295) {G17,W13,D5,L1,V3,M1} P(4368,7750);d(1380);d(1380);d(1379) { meet( 
% 124.25/124.69    Z, meet( complement( X ), Y ) ) ==> meet( meet( Z, Y ), complement( X ) )
% 124.25/124.69     }.
% 124.25/124.69  (99674) {G29,W11,D5,L1,V3,M1} P(50205,3834);d(3831);d(50205) { join( 
% 124.25/124.69    composition( meet( Y, X ), meet( Z, skol1 ) ), X ) ==> X }.
% 124.25/124.69  (100003) {G30,W11,D5,L1,V2,M1} P(16544,99674) { join( composition( 
% 124.25/124.69    composition( X, skol1 ), meet( Y, skol1 ) ), X ) ==> X }.
% 124.25/124.69  (109903) {G11,W11,D4,L1,V0,M1} P(16099,16533) { join( composition( top, 
% 124.25/124.69    skol1 ), complement( one ) ) ==> join( complement( one ), skol1 ) }.
% 124.25/124.69  (109979) {G36,W8,D5,L1,V0,M1} P(109903,71487);d(1380) { composition( meet( 
% 124.25/124.69    one, complement( skol1 ) ), skol1 ) ==> zero }.
% 124.25/124.69  (109987) {G31,W8,D5,L1,V0,M1} P(109903,17276);d(1380);d(50007) { 
% 124.25/124.69    composition( skol1, meet( one, complement( skol1 ) ) ) ==> zero }.
% 124.25/124.69  (110099) {G40,W12,D5,L1,V0,M1} P(109979,91);d(1391);d(1026);d(12039);d(7096
% 124.25/124.69    );d(71915) { join( composition( skol1, top ), complement( one ) ) ==> 
% 124.25/124.69    converse( join( complement( one ), skol1 ) ) }.
% 124.25/124.69  (110306) {G41,W10,D5,L1,V0,M1} P(109987,98);d(4373);d(1026);d(759);d(71637)
% 124.25/124.69    ;d(18270);d(110099) { converse( join( complement( one ), skol1 ) ) ==> 
% 124.25/124.69    join( complement( one ), skol1 ) }.
% 124.25/124.69  (110914) {G42,W9,D5,L1,V1,M1} P(110306,1956);d(1);d(7681);d(78295);d(1446)
% 124.25/124.69     { meet( converse( skol1 ), complement( join( X, skol1 ) ) ) ==> zero }.
% 124.25/124.69  (110957) {G43,W7,D4,L1,V0,M1} P(100003,110914) { meet( converse( skol1 ), 
% 124.25/124.69    complement( skol1 ) ) ==> zero }.
% 124.25/124.69  (111010) {G44,W6,D4,L1,V0,M1} P(110957,10652);d(1355);d(1346) { join( 
% 124.25/124.69    converse( skol1 ), skol1 ) ==> skol1 }.
% 124.25/124.69  (111017) {G45,W0,D0,L0,V0,M0} S(111010);r(138) {  }.
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  % SZS output end Refutation
% 124.25/124.69  found a proof!
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Unprocessed initial clauses:
% 124.25/124.69  
% 124.25/124.69  (111019) {G0,W7,D3,L1,V2,M1}  { join( X, Y ) = join( Y, X ) }.
% 124.25/124.69  (111020) {G0,W11,D4,L1,V3,M1}  { join( X, join( Y, Z ) ) = join( join( X, Y
% 124.25/124.69     ), Z ) }.
% 124.25/124.69  (111021) {G0,W14,D6,L1,V2,M1}  { X = join( complement( join( complement( X
% 124.25/124.69     ), complement( Y ) ) ), complement( join( complement( X ), Y ) ) ) }.
% 124.25/124.69  (111022) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) = complement( join( 
% 124.25/124.69    complement( X ), complement( Y ) ) ) }.
% 124.25/124.69  (111023) {G0,W11,D4,L1,V3,M1}  { composition( X, composition( Y, Z ) ) = 
% 124.25/124.69    composition( composition( X, Y ), Z ) }.
% 124.25/124.69  (111024) {G0,W5,D3,L1,V1,M1}  { composition( X, one ) = X }.
% 124.25/124.69  (111025) {G0,W13,D4,L1,V3,M1}  { composition( join( X, Y ), Z ) = join( 
% 124.25/124.69    composition( X, Z ), composition( Y, Z ) ) }.
% 124.25/124.69  (111026) {G0,W5,D4,L1,V1,M1}  { converse( converse( X ) ) = X }.
% 124.25/124.69  (111027) {G0,W10,D4,L1,V2,M1}  { converse( join( X, Y ) ) = join( converse
% 124.25/124.69    ( X ), converse( Y ) ) }.
% 124.25/124.69  (111028) {G0,W10,D4,L1,V2,M1}  { converse( composition( X, Y ) ) = 
% 124.25/124.69    composition( converse( Y ), converse( X ) ) }.
% 124.25/124.69  (111029) {G0,W13,D6,L1,V2,M1}  { join( composition( converse( X ), 
% 124.25/124.69    complement( composition( X, Y ) ) ), complement( Y ) ) = complement( Y )
% 124.25/124.69     }.
% 124.25/124.69  (111030) {G0,W6,D4,L1,V1,M1}  { top = join( X, complement( X ) ) }.
% 124.25/124.69  (111031) {G0,W6,D4,L1,V1,M1}  { zero = meet( X, complement( X ) ) }.
% 124.25/124.69  (111032) {G0,W7,D3,L2,V0,M2}  { alpha1( skol1 ), join( skol1, one ) = one
% 124.25/124.69     }.
% 124.25/124.69  (111033) {G0,W9,D4,L2,V0,M2}  { alpha1( skol1 ), ! join( skol1, converse( 
% 124.25/124.69    skol1 ) ) = converse( skol1 ) }.
% 124.25/124.69  (111034) {G0,W7,D3,L2,V1,M2}  { ! alpha1( X ), join( X, one ) = one }.
% 124.25/124.69  (111035) {G0,W8,D4,L2,V1,M2}  { ! alpha1( X ), ! join( converse( X ), X ) =
% 124.25/124.69     X }.
% 124.25/124.69  (111036) {G0,W13,D4,L3,V1,M3}  { ! join( X, one ) = one, join( converse( X
% 124.25/124.69     ), X ) = X, alpha1( X ) }.
% 124.25/124.69  
% 124.25/124.69  
% 124.25/124.69  Total Proof:
% 124.25/124.69  
% 124.25/124.69  subsumption: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.25/124.69  parent0: (111019) {G0,W7,D3,L1,V2,M1}  { join( X, Y ) = join( Y, X ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join
% 124.25/124.69    ( join( X, Y ), Z ) }.
% 124.25/124.69  parent0: (111020) {G0,W11,D4,L1,V3,M1}  { join( X, join( Y, Z ) ) = join( 
% 124.25/124.69    join( X, Y ), Z ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69     Z := Z
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  eqswap: (111039) {G0,W14,D6,L1,V2,M1}  { join( complement( join( complement
% 124.25/124.69    ( X ), complement( Y ) ) ), complement( join( complement( X ), Y ) ) ) = 
% 124.25/124.69    X }.
% 124.25/124.69  parent0[0]: (111021) {G0,W14,D6,L1,V2,M1}  { X = join( complement( join( 
% 124.25/124.69    complement( X ), complement( Y ) ) ), complement( join( complement( X ), 
% 124.25/124.69    Y ) ) ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (2) {G0,W14,D6,L1,V2,M1} I { join( complement( join( 
% 124.25/124.69    complement( X ), complement( Y ) ) ), complement( join( complement( X ), 
% 124.25/124.69    Y ) ) ) ==> X }.
% 124.25/124.69  parent0: (111039) {G0,W14,D6,L1,V2,M1}  { join( complement( join( 
% 124.25/124.69    complement( X ), complement( Y ) ) ), complement( join( complement( X ), 
% 124.25/124.69    Y ) ) ) = X }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  eqswap: (111042) {G0,W10,D5,L1,V2,M1}  { complement( join( complement( X )
% 124.25/124.69    , complement( Y ) ) ) = meet( X, Y ) }.
% 124.25/124.69  parent0[0]: (111022) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) = complement( 
% 124.25/124.69    join( complement( X ), complement( Y ) ) ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 124.25/124.69    , complement( Y ) ) ) ==> meet( X, Y ) }.
% 124.25/124.69  parent0: (111042) {G0,W10,D5,L1,V2,M1}  { complement( join( complement( X )
% 124.25/124.69    , complement( Y ) ) ) = meet( X, Y ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z
% 124.25/124.69     ) ) ==> composition( composition( X, Y ), Z ) }.
% 124.25/124.69  parent0: (111023) {G0,W11,D4,L1,V3,M1}  { composition( X, composition( Y, Z
% 124.25/124.69     ) ) = composition( composition( X, Y ), Z ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69     Z := Z
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 124.25/124.69  parent0: (111024) {G0,W5,D3,L1,V1,M1}  { composition( X, one ) = X }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  eqswap: (111057) {G0,W13,D4,L1,V3,M1}  { join( composition( X, Z ), 
% 124.25/124.69    composition( Y, Z ) ) = composition( join( X, Y ), Z ) }.
% 124.25/124.69  parent0[0]: (111025) {G0,W13,D4,L1,V3,M1}  { composition( join( X, Y ), Z )
% 124.25/124.69     = join( composition( X, Z ), composition( Y, Z ) ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69     Z := Z
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ), 
% 124.25/124.69    composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 124.25/124.69  parent0: (111057) {G0,W13,D4,L1,V3,M1}  { join( composition( X, Z ), 
% 124.25/124.69    composition( Y, Z ) ) = composition( join( X, Y ), Z ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69     Z := Z
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X
% 124.25/124.69     }.
% 124.25/124.69  parent0: (111026) {G0,W5,D4,L1,V1,M1}  { converse( converse( X ) ) = X }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  eqswap: (111072) {G0,W10,D4,L1,V2,M1}  { join( converse( X ), converse( Y )
% 124.25/124.69     ) = converse( join( X, Y ) ) }.
% 124.25/124.69  parent0[0]: (111027) {G0,W10,D4,L1,V2,M1}  { converse( join( X, Y ) ) = 
% 124.25/124.69    join( converse( X ), converse( Y ) ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y
% 124.25/124.69     ) ) ==> converse( join( X, Y ) ) }.
% 124.25/124.69  parent0: (111072) {G0,W10,D4,L1,V2,M1}  { join( converse( X ), converse( Y
% 124.25/124.69     ) ) = converse( join( X, Y ) ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  eqswap: (111081) {G0,W10,D4,L1,V2,M1}  { composition( converse( Y ), 
% 124.25/124.69    converse( X ) ) = converse( composition( X, Y ) ) }.
% 124.25/124.69  parent0[0]: (111028) {G0,W10,D4,L1,V2,M1}  { converse( composition( X, Y )
% 124.25/124.69     ) = composition( converse( Y ), converse( X ) ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ), 
% 124.25/124.69    converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 124.25/124.69  parent0: (111081) {G0,W10,D4,L1,V2,M1}  { composition( converse( Y ), 
% 124.25/124.69    converse( X ) ) = converse( composition( X, Y ) ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 124.25/124.69    , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement( 
% 124.25/124.69    Y ) }.
% 124.25/124.69  parent0: (111029) {G0,W13,D6,L1,V2,M1}  { join( composition( converse( X )
% 124.25/124.69    , complement( composition( X, Y ) ) ), complement( Y ) ) = complement( Y
% 124.25/124.69     ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  eqswap: (111102) {G0,W6,D4,L1,V1,M1}  { join( X, complement( X ) ) = top
% 124.25/124.69     }.
% 124.25/124.69  parent0[0]: (111030) {G0,W6,D4,L1,V1,M1}  { top = join( X, complement( X )
% 124.25/124.69     ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> 
% 124.25/124.69    top }.
% 124.25/124.69  parent0: (111102) {G0,W6,D4,L1,V1,M1}  { join( X, complement( X ) ) = top
% 124.25/124.69     }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  eqswap: (111114) {G0,W6,D4,L1,V1,M1}  { meet( X, complement( X ) ) = zero
% 124.25/124.69     }.
% 124.25/124.69  parent0[0]: (111031) {G0,W6,D4,L1,V1,M1}  { zero = meet( X, complement( X )
% 124.25/124.69     ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (12) {G0,W6,D4,L1,V1,M1} I { meet( X, complement( X ) ) ==> 
% 124.25/124.69    zero }.
% 124.25/124.69  parent0: (111114) {G0,W6,D4,L1,V1,M1}  { meet( X, complement( X ) ) = zero
% 124.25/124.69     }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (13) {G0,W7,D3,L2,V0,M2} I { alpha1( skol1 ), join( skol1, one
% 124.25/124.69     ) ==> one }.
% 124.25/124.69  parent0: (111032) {G0,W7,D3,L2,V0,M2}  { alpha1( skol1 ), join( skol1, one
% 124.25/124.69     ) = one }.
% 124.25/124.69  substitution0:
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69     1 ==> 1
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (14) {G0,W9,D4,L2,V0,M2} I { alpha1( skol1 ), ! join( skol1, 
% 124.25/124.69    converse( skol1 ) ) ==> converse( skol1 ) }.
% 124.25/124.69  parent0: (111033) {G0,W9,D4,L2,V0,M2}  { alpha1( skol1 ), ! join( skol1, 
% 124.25/124.69    converse( skol1 ) ) = converse( skol1 ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69     1 ==> 1
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (15) {G0,W7,D3,L2,V1,M2} I { ! alpha1( X ), join( X, one ) ==>
% 124.25/124.69     one }.
% 124.25/124.69  parent0: (111034) {G0,W7,D3,L2,V1,M2}  { ! alpha1( X ), join( X, one ) = 
% 124.25/124.69    one }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69     1 ==> 1
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (16) {G0,W8,D4,L2,V1,M2} I { ! alpha1( X ), ! join( converse( 
% 124.25/124.69    X ), X ) ==> X }.
% 124.25/124.69  parent0: (111035) {G0,W8,D4,L2,V1,M2}  { ! alpha1( X ), ! join( converse( X
% 124.25/124.69     ), X ) = X }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69     1 ==> 1
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (17) {G0,W13,D4,L3,V1,M3} I { ! join( X, one ) ==> one, join( 
% 124.25/124.69    converse( X ), X ) ==> X, alpha1( X ) }.
% 124.25/124.69  parent0: (111036) {G0,W13,D4,L3,V1,M3}  { ! join( X, one ) = one, join( 
% 124.25/124.69    converse( X ), X ) = X, alpha1( X ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69     1 ==> 1
% 124.25/124.69     2 ==> 2
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  eqswap: (111192) {G0,W6,D4,L1,V1,M1}  { top ==> join( X, complement( X ) )
% 124.25/124.69     }.
% 124.25/124.69  parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 124.25/124.69     }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  paramod: (111193) {G1,W6,D4,L1,V1,M1}  { top ==> join( complement( X ), X )
% 124.25/124.69     }.
% 124.25/124.69  parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.25/124.69  parent1[0; 2]: (111192) {G0,W6,D4,L1,V1,M1}  { top ==> join( X, complement
% 124.25/124.69    ( X ) ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := complement( X )
% 124.25/124.69  end
% 124.25/124.69  substitution1:
% 124.25/124.69     X := X
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  eqswap: (111196) {G1,W6,D4,L1,V1,M1}  { join( complement( X ), X ) ==> top
% 124.25/124.69     }.
% 124.25/124.69  parent0[0]: (111193) {G1,W6,D4,L1,V1,M1}  { top ==> join( complement( X ), 
% 124.25/124.69    X ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (18) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X ) 
% 124.25/124.69    ==> top }.
% 124.25/124.69  parent0: (111196) {G1,W6,D4,L1,V1,M1}  { join( complement( X ), X ) ==> top
% 124.25/124.69     }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  eqswap: (111197) {G0,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) ==> join( 
% 124.25/124.69    X, join( Y, Z ) ) }.
% 124.25/124.69  parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( 
% 124.25/124.69    join( X, Y ), Z ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69     Z := Z
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  paramod: (111200) {G1,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) ==> join
% 124.25/124.69    ( join( Y, Z ), X ) }.
% 124.25/124.69  parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.25/124.69  parent1[0; 6]: (111197) {G0,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) ==>
% 124.25/124.69     join( X, join( Y, Z ) ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := join( Y, Z )
% 124.25/124.69  end
% 124.25/124.69  substitution1:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69     Z := Z
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (19) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) = 
% 124.25/124.69    join( join( Y, Z ), X ) }.
% 124.25/124.69  parent0: (111200) {G1,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) ==> join
% 124.25/124.69    ( join( Y, Z ), X ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69     Z := Z
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  eqswap: (111214) {G0,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) ==> join( 
% 124.25/124.69    X, join( Y, Z ) ) }.
% 124.25/124.69  parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( 
% 124.25/124.69    join( X, Y ), Z ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69     Z := Z
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  paramod: (111219) {G1,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) ==> join
% 124.25/124.69    ( X, join( Z, Y ) ) }.
% 124.25/124.69  parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.25/124.69  parent1[0; 8]: (111214) {G0,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) ==>
% 124.25/124.69     join( X, join( Y, Z ) ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := Y
% 124.25/124.69     Y := Z
% 124.25/124.69  end
% 124.25/124.69  substitution1:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69     Z := Z
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  paramod: (111232) {G1,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) ==> join
% 124.25/124.69    ( join( X, Z ), Y ) }.
% 124.25/124.69  parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( 
% 124.25/124.69    join( X, Y ), Z ) }.
% 124.25/124.69  parent1[0; 6]: (111219) {G1,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) ==>
% 124.25/124.69     join( X, join( Z, Y ) ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Z
% 124.25/124.69     Z := Y
% 124.25/124.69  end
% 124.25/124.69  substitution1:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69     Z := Z
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (20) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X
% 124.25/124.69     ) = join( join( Z, X ), Y ) }.
% 124.25/124.69  parent0: (111232) {G1,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) ==> join
% 124.25/124.69    ( join( X, Z ), Y ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := Z
% 124.25/124.69     Y := Y
% 124.25/124.69     Z := X
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  eqswap: (111234) {G0,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) ==> join( 
% 124.25/124.69    X, join( Y, Z ) ) }.
% 124.25/124.69  parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( 
% 124.25/124.69    join( X, Y ), Z ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69     Z := Z
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  paramod: (111237) {G1,W10,D4,L1,V2,M1}  { join( join( X, Y ), complement( Y
% 124.25/124.69     ) ) ==> join( X, top ) }.
% 124.25/124.69  parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 124.25/124.69     }.
% 124.25/124.69  parent1[0; 9]: (111234) {G0,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) ==>
% 124.25/124.69     join( X, join( Y, Z ) ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := Y
% 124.25/124.69  end
% 124.25/124.69  substitution1:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69     Z := complement( Y )
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (21) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ), 
% 124.25/124.69    complement( X ) ) ==> join( Y, top ) }.
% 124.25/124.69  parent0: (111237) {G1,W10,D4,L1,V2,M1}  { join( join( X, Y ), complement( Y
% 124.25/124.69     ) ) ==> join( X, top ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := Y
% 124.25/124.69     Y := X
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  eqswap: (111241) {G1,W6,D4,L1,V1,M1}  { top ==> join( complement( X ), X )
% 124.25/124.69     }.
% 124.25/124.69  parent0[0]: (18) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X ) 
% 124.25/124.69    ==> top }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  paramod: (111243) {G1,W10,D6,L1,V2,M1}  { top ==> join( join( complement( 
% 124.25/124.69    join( X, Y ) ), X ), Y ) }.
% 124.25/124.69  parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( 
% 124.25/124.69    join( X, Y ), Z ) }.
% 124.25/124.69  parent1[0; 2]: (111241) {G1,W6,D4,L1,V1,M1}  { top ==> join( complement( X
% 124.25/124.69     ), X ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := complement( join( X, Y ) )
% 124.25/124.69     Y := X
% 124.25/124.69     Z := Y
% 124.25/124.69  end
% 124.25/124.69  substitution1:
% 124.25/124.69     X := join( X, Y )
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  eqswap: (111244) {G1,W10,D6,L1,V2,M1}  { join( join( complement( join( X, Y
% 124.25/124.69     ) ), X ), Y ) ==> top }.
% 124.25/124.69  parent0[0]: (111243) {G1,W10,D6,L1,V2,M1}  { top ==> join( join( complement
% 124.25/124.69    ( join( X, Y ) ), X ), Y ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (22) {G2,W10,D6,L1,V2,M1} P(18,1) { join( join( complement( 
% 124.25/124.69    join( X, Y ) ), X ), Y ) ==> top }.
% 124.25/124.69  parent0: (111244) {G1,W10,D6,L1,V2,M1}  { join( join( complement( join( X, 
% 124.25/124.69    Y ) ), X ), Y ) ==> top }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  eqswap: (111246) {G0,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) ==> join( 
% 124.25/124.69    X, join( Y, Z ) ) }.
% 124.25/124.69  parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( 
% 124.25/124.69    join( X, Y ), Z ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69     Z := Z
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  paramod: (111251) {G1,W10,D5,L1,V2,M1}  { join( join( X, complement( Y ) )
% 124.25/124.69    , Y ) ==> join( X, top ) }.
% 124.25/124.69  parent0[0]: (18) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X ) 
% 124.25/124.69    ==> top }.
% 124.25/124.69  parent1[0; 9]: (111246) {G0,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) ==>
% 124.25/124.69     join( X, join( Y, Z ) ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := Y
% 124.25/124.69  end
% 124.25/124.69  substitution1:
% 124.25/124.69     X := X
% 124.25/124.69     Y := complement( Y )
% 124.25/124.69     Z := Y
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (23) {G2,W10,D5,L1,V2,M1} P(18,1) { join( join( Y, complement
% 124.25/124.69    ( X ) ), X ) ==> join( Y, top ) }.
% 124.25/124.69  parent0: (111251) {G1,W10,D5,L1,V2,M1}  { join( join( X, complement( Y ) )
% 124.25/124.69    , Y ) ==> join( X, top ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := Y
% 124.25/124.69     Y := X
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  paramod: (111257) {G1,W11,D6,L1,V2,M1}  { join( meet( X, Y ), complement( 
% 124.25/124.69    join( complement( X ), Y ) ) ) ==> X }.
% 124.25/124.69  parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 124.25/124.69    , complement( Y ) ) ) ==> meet( X, Y ) }.
% 124.25/124.69  parent1[0; 2]: (2) {G0,W14,D6,L1,V2,M1} I { join( complement( join( 
% 124.25/124.69    complement( X ), complement( Y ) ) ), complement( join( complement( X ), 
% 124.25/124.69    Y ) ) ) ==> X }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69  end
% 124.25/124.69  substitution1:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (29) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ), 
% 124.25/124.69    complement( join( complement( X ), Y ) ) ) ==> X }.
% 124.25/124.69  parent0: (111257) {G1,W11,D6,L1,V2,M1}  { join( meet( X, Y ), complement( 
% 124.25/124.69    join( complement( X ), Y ) ) ) ==> X }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  eqswap: (111260) {G0,W7,D3,L2,V1,M2}  { one ==> join( X, one ), ! alpha1( X
% 124.25/124.69     ) }.
% 124.25/124.69  parent0[1]: (15) {G0,W7,D3,L2,V1,M2} I { ! alpha1( X ), join( X, one ) ==> 
% 124.25/124.69    one }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  resolution: (111261) {G1,W10,D3,L2,V0,M2}  { one ==> join( skol1, one ), 
% 124.25/124.69    join( skol1, one ) ==> one }.
% 124.25/124.69  parent0[1]: (111260) {G0,W7,D3,L2,V1,M2}  { one ==> join( X, one ), ! 
% 124.25/124.69    alpha1( X ) }.
% 124.25/124.69  parent1[0]: (13) {G0,W7,D3,L2,V0,M2} I { alpha1( skol1 ), join( skol1, one
% 124.25/124.69     ) ==> one }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := skol1
% 124.25/124.69  end
% 124.25/124.69  substitution1:
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  eqswap: (111262) {G1,W10,D3,L2,V0,M2}  { join( skol1, one ) ==> one, join( 
% 124.25/124.69    skol1, one ) ==> one }.
% 124.25/124.69  parent0[0]: (111261) {G1,W10,D3,L2,V0,M2}  { one ==> join( skol1, one ), 
% 124.25/124.69    join( skol1, one ) ==> one }.
% 124.25/124.69  substitution0:
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  factor: (111264) {G1,W5,D3,L1,V0,M1}  { join( skol1, one ) ==> one }.
% 124.25/124.69  parent0[0, 1]: (111262) {G1,W10,D3,L2,V0,M2}  { join( skol1, one ) ==> one
% 124.25/124.69    , join( skol1, one ) ==> one }.
% 124.25/124.69  substitution0:
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (30) {G1,W5,D3,L1,V0,M1} S(13);r(15) { join( skol1, one ) ==> 
% 124.25/124.69    one }.
% 124.25/124.69  parent0: (111264) {G1,W5,D3,L1,V0,M1}  { join( skol1, one ) ==> one }.
% 124.25/124.69  substitution0:
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  eqswap: (111267) {G0,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) ==> join( 
% 124.25/124.69    X, join( Y, Z ) ) }.
% 124.25/124.69  parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( 
% 124.25/124.69    join( X, Y ), Z ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69     Y := Y
% 124.25/124.69     Z := Z
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  paramod: (111269) {G1,W9,D4,L1,V1,M1}  { join( join( X, skol1 ), one ) ==> 
% 124.25/124.69    join( X, one ) }.
% 124.25/124.69  parent0[0]: (30) {G1,W5,D3,L1,V0,M1} S(13);r(15) { join( skol1, one ) ==> 
% 124.25/124.69    one }.
% 124.25/124.69  parent1[0; 8]: (111267) {G0,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) ==>
% 124.25/124.69     join( X, join( Y, Z ) ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69  end
% 124.25/124.69  substitution1:
% 124.25/124.69     X := X
% 124.25/124.69     Y := skol1
% 124.25/124.69     Z := one
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  subsumption: (31) {G2,W9,D4,L1,V1,M1} P(30,1) { join( join( X, skol1 ), one
% 124.25/124.69     ) ==> join( X, one ) }.
% 124.25/124.69  parent0: (111269) {G1,W9,D4,L1,V1,M1}  { join( join( X, skol1 ), one ) ==> 
% 124.25/124.69    join( X, one ) }.
% 124.25/124.69  substitution0:
% 124.25/124.69     X := X
% 124.25/124.69  end
% 124.25/124.69  permutation0:
% 124.25/124.69     0 ==> 0
% 124.25/124.69  end
% 124.25/124.69  
% 124.25/124.69  eqswap: (111272) {G1,W5,D3,L1,V0,M1}  { one ==> join( skol1, one ) }.
% 124.25/124.70  parent0[0]: (30) {G1,W5,D3,L1,V0,M1} S(13);r(15) { join( skol1, one ) ==> 
% 124.25/124.70    one }.
% 124.25/124.70  substitution0:
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  paramod: (111273) {G1,W5,D3,L1,V0,M1}  { one ==> join( one, skol1 ) }.
% 124.25/124.70  parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.25/124.70  parent1[0; 2]: (111272) {G1,W5,D3,L1,V0,M1}  { one ==> join( skol1, one )
% 124.25/124.70     }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := skol1
% 124.25/124.70     Y := one
% 124.25/124.70  end
% 124.25/124.70  substitution1:
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  eqswap: (111276) {G1,W5,D3,L1,V0,M1}  { join( one, skol1 ) ==> one }.
% 124.25/124.70  parent0[0]: (111273) {G1,W5,D3,L1,V0,M1}  { one ==> join( one, skol1 ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  subsumption: (32) {G2,W5,D3,L1,V0,M1} P(30,0) { join( one, skol1 ) ==> one
% 124.25/124.70     }.
% 124.25/124.70  parent0: (111276) {G1,W5,D3,L1,V0,M1}  { join( one, skol1 ) ==> one }.
% 124.25/124.70  substitution0:
% 124.25/124.70  end
% 124.25/124.70  permutation0:
% 124.25/124.70     0 ==> 0
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  eqswap: (111278) {G0,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) ==> join( 
% 124.25/124.70    X, join( Y, Z ) ) }.
% 124.25/124.70  parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( 
% 124.25/124.70    join( X, Y ), Z ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70     Y := Y
% 124.25/124.70     Z := Z
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  paramod: (111280) {G1,W9,D4,L1,V1,M1}  { join( join( X, one ), skol1 ) ==> 
% 124.25/124.70    join( X, one ) }.
% 124.25/124.70  parent0[0]: (32) {G2,W5,D3,L1,V0,M1} P(30,0) { join( one, skol1 ) ==> one
% 124.25/124.70     }.
% 124.25/124.70  parent1[0; 8]: (111278) {G0,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) ==>
% 124.25/124.70     join( X, join( Y, Z ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70  end
% 124.25/124.70  substitution1:
% 124.25/124.70     X := X
% 124.25/124.70     Y := one
% 124.25/124.70     Z := skol1
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  subsumption: (33) {G3,W9,D4,L1,V1,M1} P(32,1) { join( join( X, one ), skol1
% 124.25/124.70     ) ==> join( X, one ) }.
% 124.25/124.70  parent0: (111280) {G1,W9,D4,L1,V1,M1}  { join( join( X, one ), skol1 ) ==> 
% 124.25/124.70    join( X, one ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70  end
% 124.25/124.70  permutation0:
% 124.25/124.70     0 ==> 0
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  eqswap: (111283) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> complement( join
% 124.25/124.70    ( complement( X ), complement( Y ) ) ) }.
% 124.25/124.70  parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 124.25/124.70    , complement( Y ) ) ) ==> meet( X, Y ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70     Y := Y
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  paramod: (111286) {G1,W15,D5,L1,V3,M1}  { meet( join( complement( X ), 
% 124.25/124.70    complement( Y ) ), Z ) ==> complement( join( meet( X, Y ), complement( Z
% 124.25/124.70     ) ) ) }.
% 124.25/124.70  parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 124.25/124.70    , complement( Y ) ) ) ==> meet( X, Y ) }.
% 124.25/124.70  parent1[0; 10]: (111283) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> 
% 124.25/124.70    complement( join( complement( X ), complement( Y ) ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70     Y := Y
% 124.25/124.70  end
% 124.25/124.70  substitution1:
% 124.25/124.70     X := join( complement( X ), complement( Y ) )
% 124.25/124.70     Y := Z
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  subsumption: (38) {G1,W15,D5,L1,V3,M1} P(3,3) { meet( join( complement( X )
% 124.25/124.70    , complement( Y ) ), Z ) ==> complement( join( meet( X, Y ), complement( 
% 124.25/124.70    Z ) ) ) }.
% 124.25/124.70  parent0: (111286) {G1,W15,D5,L1,V3,M1}  { meet( join( complement( X ), 
% 124.25/124.70    complement( Y ) ), Z ) ==> complement( join( meet( X, Y ), complement( Z
% 124.25/124.70     ) ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70     Y := Y
% 124.25/124.70     Z := Z
% 124.25/124.70  end
% 124.25/124.70  permutation0:
% 124.25/124.70     0 ==> 0
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  eqswap: (111290) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> complement( join
% 124.25/124.70    ( complement( X ), complement( Y ) ) ) }.
% 124.25/124.70  parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 124.25/124.70    , complement( Y ) ) ) ==> meet( X, Y ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70     Y := Y
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  paramod: (111294) {G1,W15,D5,L1,V3,M1}  { meet( X, join( complement( Y ), 
% 124.25/124.70    complement( Z ) ) ) ==> complement( join( complement( X ), meet( Y, Z ) )
% 124.25/124.70     ) }.
% 124.25/124.70  parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 124.25/124.70    , complement( Y ) ) ) ==> meet( X, Y ) }.
% 124.25/124.70  parent1[0; 12]: (111290) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> 
% 124.25/124.70    complement( join( complement( X ), complement( Y ) ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := Y
% 124.25/124.70     Y := Z
% 124.25/124.70  end
% 124.25/124.70  substitution1:
% 124.25/124.70     X := X
% 124.25/124.70     Y := join( complement( Y ), complement( Z ) )
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  subsumption: (39) {G1,W15,D5,L1,V3,M1} P(3,3) { meet( Z, join( complement( 
% 124.25/124.70    X ), complement( Y ) ) ) ==> complement( join( complement( Z ), meet( X, 
% 124.25/124.70    Y ) ) ) }.
% 124.25/124.70  parent0: (111294) {G1,W15,D5,L1,V3,M1}  { meet( X, join( complement( Y ), 
% 124.25/124.70    complement( Z ) ) ) ==> complement( join( complement( X ), meet( Y, Z ) )
% 124.25/124.70     ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := Z
% 124.25/124.70     Y := X
% 124.25/124.70     Z := Y
% 124.25/124.70  end
% 124.25/124.70  permutation0:
% 124.25/124.70     0 ==> 0
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  eqswap: (111297) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> complement( join
% 124.25/124.70    ( complement( X ), complement( Y ) ) ) }.
% 124.25/124.70  parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 124.25/124.70    , complement( Y ) ) ) ==> meet( X, Y ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70     Y := Y
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  paramod: (111299) {G1,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> complement( join
% 124.25/124.70    ( complement( Y ), complement( X ) ) ) }.
% 124.25/124.70  parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.25/124.70  parent1[0; 5]: (111297) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> complement
% 124.25/124.70    ( join( complement( X ), complement( Y ) ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := complement( X )
% 124.25/124.70     Y := complement( Y )
% 124.25/124.70  end
% 124.25/124.70  substitution1:
% 124.25/124.70     X := X
% 124.25/124.70     Y := Y
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  paramod: (111301) {G1,W7,D3,L1,V2,M1}  { meet( X, Y ) ==> meet( Y, X ) }.
% 124.25/124.70  parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 124.25/124.70    , complement( Y ) ) ) ==> meet( X, Y ) }.
% 124.25/124.70  parent1[0; 4]: (111299) {G1,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> complement
% 124.25/124.70    ( join( complement( Y ), complement( X ) ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := Y
% 124.25/124.70     Y := X
% 124.25/124.70  end
% 124.25/124.70  substitution1:
% 124.25/124.70     X := X
% 124.25/124.70     Y := Y
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  subsumption: (42) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X
% 124.25/124.70    , Y ) }.
% 124.25/124.70  parent0: (111301) {G1,W7,D3,L1,V2,M1}  { meet( X, Y ) ==> meet( Y, X ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := Y
% 124.25/124.70     Y := X
% 124.25/124.70  end
% 124.25/124.70  permutation0:
% 124.25/124.70     0 ==> 0
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  eqswap: (111303) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> complement( join
% 124.25/124.70    ( complement( X ), complement( Y ) ) ) }.
% 124.25/124.70  parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 124.25/124.70    , complement( Y ) ) ) ==> meet( X, Y ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70     Y := Y
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  paramod: (111306) {G1,W7,D4,L1,V1,M1}  { meet( X, complement( X ) ) ==> 
% 124.25/124.70    complement( top ) }.
% 124.25/124.70  parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 124.25/124.70     }.
% 124.25/124.70  parent1[0; 6]: (111303) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> complement
% 124.25/124.70    ( join( complement( X ), complement( Y ) ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := complement( X )
% 124.25/124.70  end
% 124.25/124.70  substitution1:
% 124.25/124.70     X := X
% 124.25/124.70     Y := complement( X )
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  paramod: (111307) {G1,W4,D3,L1,V0,M1}  { zero ==> complement( top ) }.
% 124.25/124.70  parent0[0]: (12) {G0,W6,D4,L1,V1,M1} I { meet( X, complement( X ) ) ==> 
% 124.25/124.70    zero }.
% 124.25/124.70  parent1[0; 1]: (111306) {G1,W7,D4,L1,V1,M1}  { meet( X, complement( X ) ) 
% 124.25/124.70    ==> complement( top ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70  end
% 124.25/124.70  substitution1:
% 124.25/124.70     X := X
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  eqswap: (111308) {G1,W4,D3,L1,V0,M1}  { complement( top ) ==> zero }.
% 124.25/124.70  parent0[0]: (111307) {G1,W4,D3,L1,V0,M1}  { zero ==> complement( top ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  subsumption: (44) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==>
% 124.25/124.70     zero }.
% 124.25/124.70  parent0: (111308) {G1,W4,D3,L1,V0,M1}  { complement( top ) ==> zero }.
% 124.25/124.70  substitution0:
% 124.25/124.70  end
% 124.25/124.70  permutation0:
% 124.25/124.70     0 ==> 0
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  eqswap: (111310) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> complement( join
% 124.25/124.70    ( complement( X ), complement( Y ) ) ) }.
% 124.25/124.70  parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 124.25/124.70    , complement( Y ) ) ) ==> meet( X, Y ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70     Y := Y
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  paramod: (111311) {G1,W9,D5,L1,V1,M1}  { meet( top, X ) ==> complement( 
% 124.25/124.70    join( zero, complement( X ) ) ) }.
% 124.25/124.70  parent0[0]: (44) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==> 
% 124.25/124.70    zero }.
% 124.25/124.70  parent1[0; 6]: (111310) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> complement
% 124.25/124.70    ( join( complement( X ), complement( Y ) ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70  end
% 124.25/124.70  substitution1:
% 124.25/124.70     X := top
% 124.25/124.70     Y := X
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  eqswap: (111313) {G1,W9,D5,L1,V1,M1}  { complement( join( zero, complement
% 124.25/124.70    ( X ) ) ) ==> meet( top, X ) }.
% 124.25/124.70  parent0[0]: (111311) {G1,W9,D5,L1,V1,M1}  { meet( top, X ) ==> complement( 
% 124.25/124.70    join( zero, complement( X ) ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  subsumption: (45) {G2,W9,D5,L1,V1,M1} P(44,3) { complement( join( zero, 
% 124.25/124.70    complement( X ) ) ) ==> meet( top, X ) }.
% 124.25/124.70  parent0: (111313) {G1,W9,D5,L1,V1,M1}  { complement( join( zero, complement
% 124.25/124.70    ( X ) ) ) ==> meet( top, X ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70  end
% 124.25/124.70  permutation0:
% 124.25/124.70     0 ==> 0
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  eqswap: (111316) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> complement( join
% 124.25/124.70    ( complement( X ), complement( Y ) ) ) }.
% 124.25/124.70  parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 124.25/124.70    , complement( Y ) ) ) ==> meet( X, Y ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70     Y := Y
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  paramod: (111318) {G1,W9,D5,L1,V1,M1}  { meet( X, top ) ==> complement( 
% 124.25/124.70    join( complement( X ), zero ) ) }.
% 124.25/124.70  parent0[0]: (44) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==> 
% 124.25/124.70    zero }.
% 124.25/124.70  parent1[0; 8]: (111316) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> complement
% 124.25/124.70    ( join( complement( X ), complement( Y ) ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70  end
% 124.25/124.70  substitution1:
% 124.25/124.70     X := X
% 124.25/124.70     Y := top
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  eqswap: (111320) {G1,W9,D5,L1,V1,M1}  { complement( join( complement( X ), 
% 124.25/124.70    zero ) ) ==> meet( X, top ) }.
% 124.25/124.70  parent0[0]: (111318) {G1,W9,D5,L1,V1,M1}  { meet( X, top ) ==> complement( 
% 124.25/124.70    join( complement( X ), zero ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  subsumption: (46) {G2,W9,D5,L1,V1,M1} P(44,3) { complement( join( 
% 124.25/124.70    complement( X ), zero ) ) ==> meet( X, top ) }.
% 124.25/124.70  parent0: (111320) {G1,W9,D5,L1,V1,M1}  { complement( join( complement( X )
% 124.25/124.70    , zero ) ) ==> meet( X, top ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70  end
% 124.25/124.70  permutation0:
% 124.25/124.70     0 ==> 0
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  eqswap: (111322) {G1,W6,D4,L1,V1,M1}  { top ==> join( complement( X ), X )
% 124.25/124.70     }.
% 124.25/124.70  parent0[0]: (18) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X ) 
% 124.25/124.70    ==> top }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  paramod: (111323) {G2,W5,D3,L1,V0,M1}  { top ==> join( zero, top ) }.
% 124.25/124.70  parent0[0]: (44) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==> 
% 124.25/124.70    zero }.
% 124.25/124.70  parent1[0; 3]: (111322) {G1,W6,D4,L1,V1,M1}  { top ==> join( complement( X
% 124.25/124.70     ), X ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70  end
% 124.25/124.70  substitution1:
% 124.25/124.70     X := top
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  eqswap: (111324) {G2,W5,D3,L1,V0,M1}  { join( zero, top ) ==> top }.
% 124.25/124.70  parent0[0]: (111323) {G2,W5,D3,L1,V0,M1}  { top ==> join( zero, top ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  subsumption: (48) {G2,W5,D3,L1,V0,M1} P(44,18) { join( zero, top ) ==> top
% 124.25/124.70     }.
% 124.25/124.70  parent0: (111324) {G2,W5,D3,L1,V0,M1}  { join( zero, top ) ==> top }.
% 124.25/124.70  substitution0:
% 124.25/124.70  end
% 124.25/124.70  permutation0:
% 124.25/124.70     0 ==> 0
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  eqswap: (111326) {G0,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) ==> join( 
% 124.25/124.70    X, join( Y, Z ) ) }.
% 124.25/124.70  parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( 
% 124.25/124.70    join( X, Y ), Z ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70     Y := Y
% 124.25/124.70     Z := Z
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  paramod: (111330) {G1,W14,D5,L1,V3,M1}  { join( join( X, converse( Y ) ), 
% 124.25/124.70    converse( Z ) ) ==> join( X, converse( join( Y, Z ) ) ) }.
% 124.25/124.70  parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 124.25/124.70     ) ==> converse( join( X, Y ) ) }.
% 124.25/124.70  parent1[0; 10]: (111326) {G0,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) 
% 124.25/124.70    ==> join( X, join( Y, Z ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := Y
% 124.25/124.70     Y := Z
% 124.25/124.70  end
% 124.25/124.70  substitution1:
% 124.25/124.70     X := X
% 124.25/124.70     Y := converse( Y )
% 124.25/124.70     Z := converse( Z )
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  subsumption: (62) {G1,W14,D5,L1,V3,M1} P(8,1) { join( join( Z, converse( X
% 124.25/124.70     ) ), converse( Y ) ) ==> join( Z, converse( join( X, Y ) ) ) }.
% 124.25/124.70  parent0: (111330) {G1,W14,D5,L1,V3,M1}  { join( join( X, converse( Y ) ), 
% 124.25/124.70    converse( Z ) ) ==> join( X, converse( join( Y, Z ) ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := Z
% 124.25/124.70     Y := X
% 124.25/124.70     Z := Y
% 124.25/124.70  end
% 124.25/124.70  permutation0:
% 124.25/124.70     0 ==> 0
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  eqswap: (111333) {G0,W10,D4,L1,V2,M1}  { converse( join( X, Y ) ) ==> join
% 124.25/124.70    ( converse( X ), converse( Y ) ) }.
% 124.25/124.70  parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 124.25/124.70     ) ==> converse( join( X, Y ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70     Y := Y
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  paramod: (111335) {G1,W10,D4,L1,V2,M1}  { converse( join( Y, X ) ) ==> join
% 124.25/124.70    ( converse( X ), converse( Y ) ) }.
% 124.25/124.70  parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.25/124.70  parent1[0; 2]: (111333) {G0,W10,D4,L1,V2,M1}  { converse( join( X, Y ) ) 
% 124.25/124.70    ==> join( converse( X ), converse( Y ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70     Y := Y
% 124.25/124.70  end
% 124.25/124.70  substitution1:
% 124.25/124.70     X := X
% 124.25/124.70     Y := Y
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  paramod: (111337) {G1,W9,D4,L1,V2,M1}  { converse( join( X, Y ) ) ==> 
% 124.25/124.70    converse( join( Y, X ) ) }.
% 124.25/124.70  parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 124.25/124.70     ) ==> converse( join( X, Y ) ) }.
% 124.25/124.70  parent1[0; 5]: (111335) {G1,W10,D4,L1,V2,M1}  { converse( join( Y, X ) ) 
% 124.25/124.70    ==> join( converse( X ), converse( Y ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := Y
% 124.25/124.70     Y := X
% 124.25/124.70  end
% 124.25/124.70  substitution1:
% 124.25/124.70     X := Y
% 124.25/124.70     Y := X
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  subsumption: (63) {G1,W9,D4,L1,V2,M1} P(8,0);d(8) { converse( join( X, Y )
% 124.25/124.70     ) = converse( join( Y, X ) ) }.
% 124.25/124.70  parent0: (111337) {G1,W9,D4,L1,V2,M1}  { converse( join( X, Y ) ) ==> 
% 124.25/124.70    converse( join( Y, X ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70     Y := Y
% 124.25/124.70  end
% 124.25/124.70  permutation0:
% 124.25/124.70     0 ==> 0
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  eqswap: (111339) {G0,W10,D4,L1,V2,M1}  { converse( join( X, Y ) ) ==> join
% 124.25/124.70    ( converse( X ), converse( Y ) ) }.
% 124.25/124.70  parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 124.25/124.70     ) ==> converse( join( X, Y ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70     Y := Y
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  paramod: (111340) {G1,W10,D5,L1,V2,M1}  { converse( join( converse( X ), Y
% 124.25/124.70     ) ) ==> join( X, converse( Y ) ) }.
% 124.25/124.70  parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 124.25/124.70  parent1[0; 7]: (111339) {G0,W10,D4,L1,V2,M1}  { converse( join( X, Y ) ) 
% 124.25/124.70    ==> join( converse( X ), converse( Y ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70  end
% 124.25/124.70  substitution1:
% 124.25/124.70     X := converse( X )
% 124.25/124.70     Y := Y
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  subsumption: (64) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 124.25/124.70     ), Y ) ) ==> join( X, converse( Y ) ) }.
% 124.25/124.70  parent0: (111340) {G1,W10,D5,L1,V2,M1}  { converse( join( converse( X ), Y
% 124.25/124.70     ) ) ==> join( X, converse( Y ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70     Y := Y
% 124.25/124.70  end
% 124.25/124.70  permutation0:
% 124.25/124.70     0 ==> 0
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  eqswap: (111345) {G0,W10,D4,L1,V2,M1}  { converse( join( X, Y ) ) ==> join
% 124.25/124.70    ( converse( X ), converse( Y ) ) }.
% 124.25/124.70  parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 124.25/124.70     ) ==> converse( join( X, Y ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70     Y := Y
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  paramod: (111347) {G1,W10,D5,L1,V2,M1}  { converse( join( X, converse( Y )
% 124.25/124.70     ) ) ==> join( converse( X ), Y ) }.
% 124.25/124.70  parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 124.25/124.70  parent1[0; 9]: (111345) {G0,W10,D4,L1,V2,M1}  { converse( join( X, Y ) ) 
% 124.25/124.70    ==> join( converse( X ), converse( Y ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := Y
% 124.25/124.70  end
% 124.25/124.70  substitution1:
% 124.25/124.70     X := X
% 124.25/124.70     Y := converse( Y )
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  subsumption: (65) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 124.25/124.70    ( X ) ) ) ==> join( converse( Y ), X ) }.
% 124.25/124.70  parent0: (111347) {G1,W10,D5,L1,V2,M1}  { converse( join( X, converse( Y )
% 124.25/124.70     ) ) ==> join( converse( X ), Y ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := Y
% 124.25/124.70     Y := X
% 124.25/124.70  end
% 124.25/124.70  permutation0:
% 124.25/124.70     0 ==> 0
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  eqswap: (111350) {G0,W10,D4,L1,V2,M1}  { converse( composition( Y, X ) ) 
% 124.25/124.70    ==> composition( converse( X ), converse( Y ) ) }.
% 124.25/124.70  parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ), 
% 124.25/124.70    converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := Y
% 124.25/124.70     Y := X
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  paramod: (111352) {G1,W14,D5,L1,V3,M1}  { converse( composition( X, join( Y
% 124.25/124.70    , Z ) ) ) ==> composition( converse( join( Z, Y ) ), converse( X ) ) }.
% 124.25/124.70  parent0[0]: (63) {G1,W9,D4,L1,V2,M1} P(8,0);d(8) { converse( join( X, Y ) )
% 124.25/124.70     = converse( join( Y, X ) ) }.
% 124.25/124.70  parent1[0; 8]: (111350) {G0,W10,D4,L1,V2,M1}  { converse( composition( Y, X
% 124.25/124.70     ) ) ==> composition( converse( X ), converse( Y ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := Y
% 124.25/124.70     Y := Z
% 124.25/124.70  end
% 124.25/124.70  substitution1:
% 124.25/124.70     X := join( Y, Z )
% 124.25/124.70     Y := X
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  paramod: (111358) {G1,W13,D5,L1,V3,M1}  { converse( composition( X, join( Y
% 124.25/124.70    , Z ) ) ) ==> converse( composition( X, join( Z, Y ) ) ) }.
% 124.25/124.70  parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ), 
% 124.25/124.70    converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 124.25/124.70  parent1[0; 7]: (111352) {G1,W14,D5,L1,V3,M1}  { converse( composition( X, 
% 124.25/124.70    join( Y, Z ) ) ) ==> composition( converse( join( Z, Y ) ), converse( X )
% 124.25/124.70     ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := X
% 124.25/124.70     Y := join( Z, Y )
% 124.25/124.70  end
% 124.25/124.70  substitution1:
% 124.25/124.70     X := X
% 124.25/124.70     Y := Y
% 124.25/124.70     Z := Z
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  subsumption: (73) {G2,W13,D5,L1,V3,M1} P(63,9);d(9) { converse( composition
% 124.25/124.70    ( Z, join( Y, X ) ) ) = converse( composition( Z, join( X, Y ) ) ) }.
% 124.25/124.70  parent0: (111358) {G1,W13,D5,L1,V3,M1}  { converse( composition( X, join( Y
% 124.25/124.70    , Z ) ) ) ==> converse( composition( X, join( Z, Y ) ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := Z
% 124.25/124.70     Y := Y
% 124.25/124.70     Z := X
% 124.25/124.70  end
% 124.25/124.70  permutation0:
% 124.25/124.70     0 ==> 0
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  eqswap: (111360) {G0,W10,D4,L1,V2,M1}  { converse( composition( Y, X ) ) 
% 124.25/124.70    ==> composition( converse( X ), converse( Y ) ) }.
% 124.25/124.70  parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ), 
% 124.25/124.70    converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := Y
% 124.25/124.70     Y := X
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  paramod: (111361) {G1,W10,D5,L1,V2,M1}  { converse( composition( X, 
% 124.25/124.70    converse( Y ) ) ) ==> composition( Y, converse( X ) ) }.
% 124.25/124.70  parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 124.25/124.70  parent1[0; 7]: (111360) {G0,W10,D4,L1,V2,M1}  { converse( composition( Y, X
% 124.25/124.70     ) ) ==> composition( converse( X ), converse( Y ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := Y
% 124.25/124.70  end
% 124.25/124.70  substitution1:
% 124.25/124.70     X := converse( Y )
% 124.25/124.70     Y := X
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  subsumption: (77) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y, 
% 124.25/124.70    converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 124.25/124.70  parent0: (111361) {G1,W10,D5,L1,V2,M1}  { converse( composition( X, 
% 124.25/124.70    converse( Y ) ) ) ==> composition( Y, converse( X ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := Y
% 124.25/124.70     Y := X
% 124.25/124.70  end
% 124.25/124.70  permutation0:
% 124.25/124.70     0 ==> 0
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  eqswap: (111366) {G0,W10,D4,L1,V2,M1}  { converse( composition( Y, X ) ) 
% 124.25/124.70    ==> composition( converse( X ), converse( Y ) ) }.
% 124.25/124.70  parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ), 
% 124.25/124.70    converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 124.25/124.70  substitution0:
% 124.25/124.70     X := Y
% 124.25/124.70     Y := X
% 124.25/124.70  end
% 124.25/124.70  
% 124.25/124.70  paramod: (111368) {G1,W10,D5,L1,V2,M1}  { converse( composition( converse( 
% 124.25/124.70    X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 124.34/124.70  parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 124.34/124.70  parent1[0; 9]: (111366) {G0,W10,D4,L1,V2,M1}  { converse( composition( Y, X
% 124.34/124.70     ) ) ==> composition( converse( X ), converse( Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := converse( X )
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (78) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( 
% 124.34/124.70    converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 124.34/124.70  parent0: (111368) {G1,W10,D5,L1,V2,M1}  { converse( composition( converse( 
% 124.34/124.70    X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111372) {G0,W13,D6,L1,V2,M1}  { complement( Y ) ==> join( 
% 124.34/124.70    composition( converse( X ), complement( composition( X, Y ) ) ), 
% 124.34/124.70    complement( Y ) ) }.
% 124.34/124.70  parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 124.34/124.70    , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement( 
% 124.34/124.70    Y ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111374) {G1,W17,D7,L1,V2,M1}  { complement( converse( X ) ) ==> 
% 124.34/124.70    join( composition( converse( converse( Y ) ), complement( converse( 
% 124.34/124.70    composition( X, Y ) ) ) ), complement( converse( X ) ) ) }.
% 124.34/124.70  parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ), 
% 124.34/124.70    converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 124.34/124.70  parent1[0; 10]: (111372) {G0,W13,D6,L1,V2,M1}  { complement( Y ) ==> join( 
% 124.34/124.70    composition( converse( X ), complement( composition( X, Y ) ) ), 
% 124.34/124.70    complement( Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := converse( Y )
% 124.34/124.70     Y := converse( X )
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111375) {G1,W15,D7,L1,V2,M1}  { complement( converse( X ) ) ==> 
% 124.34/124.70    join( composition( Y, complement( converse( composition( X, Y ) ) ) ), 
% 124.34/124.70    complement( converse( X ) ) ) }.
% 124.34/124.70  parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 124.34/124.70  parent1[0; 6]: (111374) {G1,W17,D7,L1,V2,M1}  { complement( converse( X ) )
% 124.34/124.70     ==> join( composition( converse( converse( Y ) ), complement( converse( 
% 124.34/124.70    composition( X, Y ) ) ) ), complement( converse( X ) ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111376) {G1,W15,D7,L1,V2,M1}  { join( composition( Y, complement( 
% 124.34/124.70    converse( composition( X, Y ) ) ) ), complement( converse( X ) ) ) ==> 
% 124.34/124.70    complement( converse( X ) ) }.
% 124.34/124.70  parent0[0]: (111375) {G1,W15,D7,L1,V2,M1}  { complement( converse( X ) ) 
% 124.34/124.70    ==> join( composition( Y, complement( converse( composition( X, Y ) ) ) )
% 124.34/124.70    , complement( converse( X ) ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (91) {G1,W15,D7,L1,V2,M1} P(9,10);d(7) { join( composition( X
% 124.34/124.70    , complement( converse( composition( Y, X ) ) ) ), complement( converse( 
% 124.34/124.70    Y ) ) ) ==> complement( converse( Y ) ) }.
% 124.34/124.70  parent0: (111376) {G1,W15,D7,L1,V2,M1}  { join( composition( Y, complement
% 124.34/124.70    ( converse( composition( X, Y ) ) ) ), complement( converse( X ) ) ) ==> 
% 124.34/124.70    complement( converse( X ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111378) {G0,W13,D6,L1,V2,M1}  { complement( Y ) ==> join( 
% 124.34/124.70    composition( converse( X ), complement( composition( X, Y ) ) ), 
% 124.34/124.70    complement( Y ) ) }.
% 124.34/124.70  parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 124.34/124.70    , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement( 
% 124.34/124.70    Y ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111380) {G1,W12,D6,L1,V1,M1}  { complement( top ) ==> join( 
% 124.34/124.70    composition( converse( X ), complement( composition( X, top ) ) ), zero )
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (44) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==> 
% 124.34/124.70    zero }.
% 124.34/124.70  parent1[0; 11]: (111378) {G0,W13,D6,L1,V2,M1}  { complement( Y ) ==> join( 
% 124.34/124.70    composition( converse( X ), complement( composition( X, Y ) ) ), 
% 124.34/124.70    complement( Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := top
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111381) {G2,W11,D6,L1,V1,M1}  { zero ==> join( composition( 
% 124.34/124.70    converse( X ), complement( composition( X, top ) ) ), zero ) }.
% 124.34/124.70  parent0[0]: (44) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==> 
% 124.34/124.70    zero }.
% 124.34/124.70  parent1[0; 1]: (111380) {G1,W12,D6,L1,V1,M1}  { complement( top ) ==> join
% 124.34/124.70    ( composition( converse( X ), complement( composition( X, top ) ) ), zero
% 124.34/124.70     ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111383) {G2,W11,D6,L1,V1,M1}  { join( composition( converse( X ), 
% 124.34/124.70    complement( composition( X, top ) ) ), zero ) ==> zero }.
% 124.34/124.70  parent0[0]: (111381) {G2,W11,D6,L1,V1,M1}  { zero ==> join( composition( 
% 124.34/124.70    converse( X ), complement( composition( X, top ) ) ), zero ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (95) {G2,W11,D6,L1,V1,M1} P(44,10) { join( composition( 
% 124.34/124.70    converse( X ), complement( composition( X, top ) ) ), zero ) ==> zero }.
% 124.34/124.70  parent0: (111383) {G2,W11,D6,L1,V1,M1}  { join( composition( converse( X )
% 124.34/124.70    , complement( composition( X, top ) ) ), zero ) ==> zero }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111385) {G0,W13,D6,L1,V2,M1}  { complement( Y ) ==> join( 
% 124.34/124.70    composition( converse( X ), complement( composition( X, Y ) ) ), 
% 124.34/124.70    complement( Y ) ) }.
% 124.34/124.70  parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 124.34/124.70    , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement( 
% 124.34/124.70    Y ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111386) {G1,W13,D6,L1,V2,M1}  { complement( X ) ==> join( 
% 124.34/124.70    complement( X ), composition( converse( Y ), complement( composition( Y, 
% 124.34/124.70    X ) ) ) ) }.
% 124.34/124.70  parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.34/124.70  parent1[0; 3]: (111385) {G0,W13,D6,L1,V2,M1}  { complement( Y ) ==> join( 
% 124.34/124.70    composition( converse( X ), complement( composition( X, Y ) ) ), 
% 124.34/124.70    complement( Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := composition( converse( Y ), complement( composition( Y, X ) ) )
% 124.34/124.70     Y := complement( X )
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111389) {G1,W13,D6,L1,V2,M1}  { join( complement( X ), composition
% 124.34/124.70    ( converse( Y ), complement( composition( Y, X ) ) ) ) ==> complement( X
% 124.34/124.70     ) }.
% 124.34/124.70  parent0[0]: (111386) {G1,W13,D6,L1,V2,M1}  { complement( X ) ==> join( 
% 124.34/124.70    complement( X ), composition( converse( Y ), complement( composition( Y, 
% 124.34/124.70    X ) ) ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (98) {G1,W13,D6,L1,V2,M1} P(10,0) { join( complement( Y ), 
% 124.34/124.70    composition( converse( X ), complement( composition( X, Y ) ) ) ) ==> 
% 124.34/124.70    complement( Y ) }.
% 124.34/124.70  parent0: (111389) {G1,W13,D6,L1,V2,M1}  { join( complement( X ), 
% 124.34/124.70    composition( converse( Y ), complement( composition( Y, X ) ) ) ) ==> 
% 124.34/124.70    complement( X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111391) {G0,W13,D6,L1,V2,M1}  { complement( Y ) ==> join( 
% 124.34/124.70    composition( converse( X ), complement( composition( X, Y ) ) ), 
% 124.34/124.70    complement( Y ) ) }.
% 124.34/124.70  parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 124.34/124.70    , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement( 
% 124.34/124.70    Y ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111392) {G1,W11,D5,L1,V1,M1}  { complement( one ) ==> join( 
% 124.34/124.70    composition( converse( X ), complement( X ) ), complement( one ) ) }.
% 124.34/124.70  parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 124.34/124.70  parent1[0; 8]: (111391) {G0,W13,D6,L1,V2,M1}  { complement( Y ) ==> join( 
% 124.34/124.70    composition( converse( X ), complement( composition( X, Y ) ) ), 
% 124.34/124.70    complement( Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := one
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111393) {G1,W11,D5,L1,V1,M1}  { join( composition( converse( X ), 
% 124.34/124.70    complement( X ) ), complement( one ) ) ==> complement( one ) }.
% 124.34/124.70  parent0[0]: (111392) {G1,W11,D5,L1,V1,M1}  { complement( one ) ==> join( 
% 124.34/124.70    composition( converse( X ), complement( X ) ), complement( one ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (100) {G1,W11,D5,L1,V1,M1} P(5,10) { join( composition( 
% 124.34/124.70    converse( X ), complement( X ) ), complement( one ) ) ==> complement( one
% 124.34/124.70     ) }.
% 124.34/124.70  parent0: (111393) {G1,W11,D5,L1,V1,M1}  { join( composition( converse( X )
% 124.34/124.70    , complement( X ) ), complement( one ) ) ==> complement( one ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111394) {G3,W9,D4,L1,V1,M1}  { join( X, one ) ==> join( join( X, 
% 124.34/124.70    one ), skol1 ) }.
% 124.34/124.70  parent0[0]: (33) {G3,W9,D4,L1,V1,M1} P(32,1) { join( join( X, one ), skol1
% 124.34/124.70     ) ==> join( X, one ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111398) {G1,W9,D4,L1,V1,M1}  { join( X, one ) ==> join( skol1, 
% 124.34/124.70    join( X, one ) ) }.
% 124.34/124.70  parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.34/124.70  parent1[0; 4]: (111394) {G3,W9,D4,L1,V1,M1}  { join( X, one ) ==> join( 
% 124.34/124.70    join( X, one ), skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := join( X, one )
% 124.34/124.70     Y := skol1
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111404) {G1,W9,D4,L1,V1,M1}  { join( X, one ) ==> join( join( 
% 124.34/124.70    skol1, X ), one ) }.
% 124.34/124.70  parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( 
% 124.34/124.70    join( X, Y ), Z ) }.
% 124.34/124.70  parent1[0; 4]: (111398) {G1,W9,D4,L1,V1,M1}  { join( X, one ) ==> join( 
% 124.34/124.70    skol1, join( X, one ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := skol1
% 124.34/124.70     Y := X
% 124.34/124.70     Z := one
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111405) {G1,W9,D4,L1,V1,M1}  { join( join( skol1, X ), one ) ==> 
% 124.34/124.70    join( X, one ) }.
% 124.34/124.70  parent0[0]: (111404) {G1,W9,D4,L1,V1,M1}  { join( X, one ) ==> join( join( 
% 124.34/124.70    skol1, X ), one ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (115) {G4,W9,D4,L1,V1,M1} P(33,0);d(1) { join( join( skol1, X
% 124.34/124.70     ), one ) ==> join( X, one ) }.
% 124.34/124.70  parent0: (111405) {G1,W9,D4,L1,V1,M1}  { join( join( skol1, X ), one ) ==> 
% 124.34/124.70    join( X, one ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111406) {G0,W13,D4,L3,V1,M3}  { ! one ==> join( X, one ), join( 
% 124.34/124.70    converse( X ), X ) ==> X, alpha1( X ) }.
% 124.34/124.70  parent0[0]: (17) {G0,W13,D4,L3,V1,M3} I { ! join( X, one ) ==> one, join( 
% 124.34/124.70    converse( X ), X ) ==> X, alpha1( X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111409) {G1,W5,D3,L1,V0,M1}  { one ==> join( skol1, one ) }.
% 124.34/124.70  parent0[0]: (30) {G1,W5,D3,L1,V0,M1} S(13);r(15) { join( skol1, one ) ==> 
% 124.34/124.70    one }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  resolution: (111410) {G1,W8,D4,L2,V0,M2}  { join( converse( skol1 ), skol1
% 124.34/124.70     ) ==> skol1, alpha1( skol1 ) }.
% 124.34/124.70  parent0[0]: (111406) {G0,W13,D4,L3,V1,M3}  { ! one ==> join( X, one ), join
% 124.34/124.70    ( converse( X ), X ) ==> X, alpha1( X ) }.
% 124.34/124.70  parent1[0]: (111409) {G1,W5,D3,L1,V0,M1}  { one ==> join( skol1, one ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := skol1
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (123) {G2,W8,D4,L2,V0,M2} R(17,30) { join( converse( skol1 ), 
% 124.34/124.70    skol1 ) ==> skol1, alpha1( skol1 ) }.
% 124.34/124.70  parent0: (111410) {G1,W8,D4,L2,V0,M2}  { join( converse( skol1 ), skol1 ) 
% 124.34/124.70    ==> skol1, alpha1( skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70     1 ==> 1
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111416) {G2,W10,D5,L2,V0,M2}  { converse( join( skol1, converse( 
% 124.34/124.70    skol1 ) ) ) = converse( skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  parent0[0]: (123) {G2,W8,D4,L2,V0,M2} R(17,30) { join( converse( skol1 ), 
% 124.34/124.70    skol1 ) ==> skol1, alpha1( skol1 ) }.
% 124.34/124.70  parent1[0; 7]: (63) {G1,W9,D4,L1,V2,M1} P(8,0);d(8) { converse( join( X, Y
% 124.34/124.70     ) ) = converse( join( Y, X ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := skol1
% 124.34/124.70     Y := converse( skol1 )
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111417) {G2,W9,D4,L2,V0,M2}  { join( converse( skol1 ), skol1 ) =
% 124.34/124.70     converse( skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  parent0[0]: (65) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 124.34/124.70    ( X ) ) ) ==> join( converse( Y ), X ) }.
% 124.34/124.70  parent1[0; 1]: (111416) {G2,W10,D5,L2,V0,M2}  { converse( join( skol1, 
% 124.34/124.70    converse( skol1 ) ) ) = converse( skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := skol1
% 124.34/124.70     Y := skol1
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111418) {G3,W8,D3,L3,V0,M3}  { skol1 = converse( skol1 ), alpha1
% 124.34/124.70    ( skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  parent0[0]: (123) {G2,W8,D4,L2,V0,M2} R(17,30) { join( converse( skol1 ), 
% 124.34/124.70    skol1 ) ==> skol1, alpha1( skol1 ) }.
% 124.34/124.70  parent1[0; 1]: (111417) {G2,W9,D4,L2,V0,M2}  { join( converse( skol1 ), 
% 124.34/124.70    skol1 ) = converse( skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111419) {G3,W8,D3,L3,V0,M3}  { converse( skol1 ) = skol1, alpha1( 
% 124.34/124.70    skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  parent0[0]: (111418) {G3,W8,D3,L3,V0,M3}  { skol1 = converse( skol1 ), 
% 124.34/124.70    alpha1( skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  factor: (111420) {G3,W6,D3,L2,V0,M2}  { converse( skol1 ) = skol1, alpha1( 
% 124.34/124.70    skol1 ) }.
% 124.34/124.70  parent0[1, 2]: (111419) {G3,W8,D3,L3,V0,M3}  { converse( skol1 ) = skol1, 
% 124.34/124.70    alpha1( skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (131) {G3,W6,D3,L2,V0,M2} P(123,63);d(65);d(123) { alpha1( 
% 124.34/124.70    skol1 ), converse( skol1 ) ==> skol1 }.
% 124.34/124.70  parent0: (111420) {G3,W6,D3,L2,V0,M2}  { converse( skol1 ) = skol1, alpha1
% 124.34/124.70    ( skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 1
% 124.34/124.70     1 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111422) {G2,W8,D4,L2,V0,M2}  { skol1 ==> join( converse( skol1 ), 
% 124.34/124.70    skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  parent0[0]: (123) {G2,W8,D4,L2,V0,M2} R(17,30) { join( converse( skol1 ), 
% 124.34/124.70    skol1 ) ==> skol1, alpha1( skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111424) {G1,W8,D4,L2,V0,M2}  { skol1 ==> join( skol1, converse( 
% 124.34/124.70    skol1 ) ), alpha1( skol1 ) }.
% 124.34/124.70  parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.34/124.70  parent1[0; 2]: (111422) {G2,W8,D4,L2,V0,M2}  { skol1 ==> join( converse( 
% 124.34/124.70    skol1 ), skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := converse( skol1 )
% 124.34/124.70     Y := skol1
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111426) {G2,W9,D3,L3,V0,M3}  { skol1 ==> join( skol1, skol1 ), 
% 124.34/124.70    alpha1( skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  parent0[1]: (131) {G3,W6,D3,L2,V0,M2} P(123,63);d(65);d(123) { alpha1( 
% 124.34/124.70    skol1 ), converse( skol1 ) ==> skol1 }.
% 124.34/124.70  parent1[0; 4]: (111424) {G1,W8,D4,L2,V0,M2}  { skol1 ==> join( skol1, 
% 124.34/124.70    converse( skol1 ) ), alpha1( skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111427) {G2,W9,D3,L3,V0,M3}  { join( skol1, skol1 ) ==> skol1, 
% 124.34/124.70    alpha1( skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  parent0[0]: (111426) {G2,W9,D3,L3,V0,M3}  { skol1 ==> join( skol1, skol1 )
% 124.34/124.70    , alpha1( skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  factor: (111428) {G2,W7,D3,L2,V0,M2}  { join( skol1, skol1 ) ==> skol1, 
% 124.34/124.70    alpha1( skol1 ) }.
% 124.34/124.70  parent0[1, 2]: (111427) {G2,W9,D3,L3,V0,M3}  { join( skol1, skol1 ) ==> 
% 124.34/124.70    skol1, alpha1( skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (133) {G4,W7,D3,L2,V0,M2} P(123,0);d(131) { alpha1( skol1 ), 
% 124.34/124.70    join( skol1, skol1 ) ==> skol1 }.
% 124.34/124.70  parent0: (111428) {G2,W7,D3,L2,V0,M2}  { join( skol1, skol1 ) ==> skol1, 
% 124.34/124.70    alpha1( skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 1
% 124.34/124.70     1 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111431) {G0,W9,D4,L2,V0,M2}  { ! converse( skol1 ) ==> join( skol1
% 124.34/124.70    , converse( skol1 ) ), alpha1( skol1 ) }.
% 124.34/124.70  parent0[1]: (14) {G0,W9,D4,L2,V0,M2} I { alpha1( skol1 ), ! join( skol1, 
% 124.34/124.70    converse( skol1 ) ) ==> converse( skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111434) {G1,W10,D3,L3,V0,M3}  { ! converse( skol1 ) ==> join( 
% 124.34/124.70    skol1, skol1 ), alpha1( skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  parent0[1]: (131) {G3,W6,D3,L2,V0,M2} P(123,63);d(65);d(123) { alpha1( 
% 124.34/124.70    skol1 ), converse( skol1 ) ==> skol1 }.
% 124.34/124.70  parent1[0; 6]: (111431) {G0,W9,D4,L2,V0,M2}  { ! converse( skol1 ) ==> join
% 124.34/124.70    ( skol1, converse( skol1 ) ), alpha1( skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111435) {G2,W11,D3,L4,V0,M4}  { ! skol1 ==> join( skol1, skol1 )
% 124.34/124.70    , alpha1( skol1 ), alpha1( skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  parent0[1]: (131) {G3,W6,D3,L2,V0,M2} P(123,63);d(65);d(123) { alpha1( 
% 124.34/124.70    skol1 ), converse( skol1 ) ==> skol1 }.
% 124.34/124.70  parent1[0; 2]: (111434) {G1,W10,D3,L3,V0,M3}  { ! converse( skol1 ) ==> 
% 124.34/124.70    join( skol1, skol1 ), alpha1( skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111440) {G3,W11,D2,L5,V0,M5}  { ! skol1 ==> skol1, alpha1( skol1
% 124.34/124.70     ), alpha1( skol1 ), alpha1( skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  parent0[1]: (133) {G4,W7,D3,L2,V0,M2} P(123,0);d(131) { alpha1( skol1 ), 
% 124.34/124.70    join( skol1, skol1 ) ==> skol1 }.
% 124.34/124.70  parent1[0; 3]: (111435) {G2,W11,D3,L4,V0,M4}  { ! skol1 ==> join( skol1, 
% 124.34/124.70    skol1 ), alpha1( skol1 ), alpha1( skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  factor: (111441) {G3,W9,D2,L4,V0,M4}  { ! skol1 ==> skol1, alpha1( skol1 )
% 124.34/124.70    , alpha1( skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  parent0[1, 2]: (111440) {G3,W11,D2,L5,V0,M5}  { ! skol1 ==> skol1, alpha1( 
% 124.34/124.70    skol1 ), alpha1( skol1 ), alpha1( skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  factor: (111442) {G3,W7,D2,L3,V0,M3}  { ! skol1 ==> skol1, alpha1( skol1 )
% 124.34/124.70    , alpha1( skol1 ) }.
% 124.34/124.70  parent0[1, 2]: (111441) {G3,W9,D2,L4,V0,M4}  { ! skol1 ==> skol1, alpha1( 
% 124.34/124.70    skol1 ), alpha1( skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  factor: (111443) {G3,W5,D2,L2,V0,M2}  { ! skol1 ==> skol1, alpha1( skol1 )
% 124.34/124.70     }.
% 124.34/124.70  parent0[1, 2]: (111442) {G3,W7,D2,L3,V0,M3}  { ! skol1 ==> skol1, alpha1( 
% 124.34/124.70    skol1 ), alpha1( skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqrefl: (111444) {G0,W2,D2,L1,V0,M1}  { alpha1( skol1 ) }.
% 124.34/124.70  parent0[0]: (111443) {G3,W5,D2,L2,V0,M2}  { ! skol1 ==> skol1, alpha1( 
% 124.34/124.70    skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (136) {G5,W2,D2,L1,V0,M1} P(131,14);f;d(133);q { alpha1( skol1
% 124.34/124.70     ) }.
% 124.34/124.70  parent0: (111444) {G0,W2,D2,L1,V0,M1}  { alpha1( skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111445) {G0,W8,D4,L2,V1,M2}  { ! X ==> join( converse( X ), X ), !
% 124.34/124.70     alpha1( X ) }.
% 124.34/124.70  parent0[1]: (16) {G0,W8,D4,L2,V1,M2} I { ! alpha1( X ), ! join( converse( X
% 124.34/124.70     ), X ) ==> X }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  resolution: (111446) {G1,W6,D4,L1,V0,M1}  { ! skol1 ==> join( converse( 
% 124.34/124.70    skol1 ), skol1 ) }.
% 124.34/124.70  parent0[1]: (111445) {G0,W8,D4,L2,V1,M2}  { ! X ==> join( converse( X ), X
% 124.34/124.70     ), ! alpha1( X ) }.
% 124.34/124.70  parent1[0]: (136) {G5,W2,D2,L1,V0,M1} P(131,14);f;d(133);q { alpha1( skol1
% 124.34/124.70     ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := skol1
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111447) {G1,W6,D4,L1,V0,M1}  { ! join( converse( skol1 ), skol1 ) 
% 124.34/124.70    ==> skol1 }.
% 124.34/124.70  parent0[0]: (111446) {G1,W6,D4,L1,V0,M1}  { ! skol1 ==> join( converse( 
% 124.34/124.70    skol1 ), skol1 ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (138) {G6,W6,D4,L1,V0,M1} R(136,16) { ! join( converse( skol1
% 124.34/124.70     ), skol1 ) ==> skol1 }.
% 124.34/124.70  parent0: (111447) {G1,W6,D4,L1,V0,M1}  { ! join( converse( skol1 ), skol1 )
% 124.34/124.70     ==> skol1 }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111448) {G1,W11,D4,L1,V3,M1}  { join( join( Y, Z ), X ) = join( 
% 124.34/124.70    join( X, Y ), Z ) }.
% 124.34/124.70  parent0[0]: (19) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) = 
% 124.34/124.70    join( join( Y, Z ), X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70     Z := Z
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111450) {G1,W11,D4,L1,V3,M1}  { join( join( Y, X ), Z ) = join( 
% 124.34/124.70    join( Z, X ), Y ) }.
% 124.34/124.70  parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.34/124.70  parent1[0; 2]: (111448) {G1,W11,D4,L1,V3,M1}  { join( join( Y, Z ), X ) = 
% 124.34/124.70    join( join( X, Y ), Z ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := Z
% 124.34/124.70     Y := X
% 124.34/124.70     Z := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (160) {G2,W11,D4,L1,V3,M1} P(0,19) { join( join( Z, X ), Y ) =
% 124.34/124.70     join( join( Y, X ), Z ) }.
% 124.34/124.70  parent0: (111450) {G1,W11,D4,L1,V3,M1}  { join( join( Y, X ), Z ) = join( 
% 124.34/124.70    join( Z, X ), Y ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Z
% 124.34/124.70     Z := Y
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111465) {G0,W6,D4,L1,V1,M1}  { top ==> join( X, complement( X ) )
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 124.34/124.70     }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111466) {G1,W10,D6,L1,V2,M1}  { top ==> join( join( X, complement
% 124.34/124.70    ( join( X, Y ) ) ), Y ) }.
% 124.34/124.70  parent0[0]: (20) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X )
% 124.34/124.70     = join( join( Z, X ), Y ) }.
% 124.34/124.70  parent1[0; 2]: (111465) {G0,W6,D4,L1,V1,M1}  { top ==> join( X, complement
% 124.34/124.70    ( X ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := complement( join( X, Y ) )
% 124.34/124.70     Y := Y
% 124.34/124.70     Z := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := join( X, Y )
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111469) {G1,W10,D6,L1,V2,M1}  { join( join( X, complement( join( X
% 124.34/124.70    , Y ) ) ), Y ) ==> top }.
% 124.34/124.70  parent0[0]: (111466) {G1,W10,D6,L1,V2,M1}  { top ==> join( join( X, 
% 124.34/124.70    complement( join( X, Y ) ) ), Y ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (172) {G2,W10,D6,L1,V2,M1} P(20,11) { join( join( X, 
% 124.34/124.70    complement( join( X, Y ) ) ), Y ) ==> top }.
% 124.34/124.70  parent0: (111469) {G1,W10,D6,L1,V2,M1}  { join( join( X, complement( join( 
% 124.34/124.70    X, Y ) ) ), Y ) ==> top }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111470) {G2,W10,D6,L1,V2,M1}  { top ==> join( join( complement( 
% 124.34/124.70    join( X, Y ) ), X ), Y ) }.
% 124.34/124.70  parent0[0]: (22) {G2,W10,D6,L1,V2,M1} P(18,1) { join( join( complement( 
% 124.34/124.70    join( X, Y ) ), X ), Y ) ==> top }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111471) {G2,W10,D6,L1,V2,M1}  { top ==> join( join( complement( 
% 124.34/124.70    join( X, Y ) ), Y ), X ) }.
% 124.34/124.70  parent0[0]: (20) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X )
% 124.34/124.70     = join( join( Z, X ), Y ) }.
% 124.34/124.70  parent1[0; 2]: (111470) {G2,W10,D6,L1,V2,M1}  { top ==> join( join( 
% 124.34/124.70    complement( join( X, Y ) ), X ), Y ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70     Z := complement( join( X, Y ) )
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111477) {G2,W10,D6,L1,V2,M1}  { join( join( complement( join( X, Y
% 124.34/124.70     ) ), Y ), X ) ==> top }.
% 124.34/124.70  parent0[0]: (111471) {G2,W10,D6,L1,V2,M1}  { top ==> join( join( complement
% 124.34/124.70    ( join( X, Y ) ), Y ), X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (224) {G3,W10,D6,L1,V2,M1} P(22,20) { join( join( complement( 
% 124.34/124.70    join( X, Y ) ), Y ), X ) ==> top }.
% 124.34/124.70  parent0: (111477) {G2,W10,D6,L1,V2,M1}  { join( join( complement( join( X, 
% 124.34/124.70    Y ) ), Y ), X ) ==> top }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111481) {G2,W10,D5,L1,V2,M1}  { join( X, top ) ==> join( join( X, 
% 124.34/124.70    complement( Y ) ), Y ) }.
% 124.34/124.70  parent0[0]: (23) {G2,W10,D5,L1,V2,M1} P(18,1) { join( join( Y, complement( 
% 124.34/124.70    X ) ), X ) ==> join( Y, top ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111484) {G2,W12,D5,L1,V2,M1}  { join( meet( X, Y ), top ) ==> 
% 124.34/124.70    join( X, join( complement( X ), Y ) ) }.
% 124.34/124.70  parent0[0]: (29) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ), 
% 124.34/124.70    complement( join( complement( X ), Y ) ) ) ==> X }.
% 124.34/124.70  parent1[0; 7]: (111481) {G2,W10,D5,L1,V2,M1}  { join( X, top ) ==> join( 
% 124.34/124.70    join( X, complement( Y ) ), Y ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := meet( X, Y )
% 124.34/124.70     Y := join( complement( X ), Y )
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111485) {G1,W12,D5,L1,V2,M1}  { join( meet( X, Y ), top ) ==> 
% 124.34/124.70    join( join( X, complement( X ) ), Y ) }.
% 124.34/124.70  parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( 
% 124.34/124.70    join( X, Y ), Z ) }.
% 124.34/124.70  parent1[0; 6]: (111484) {G2,W12,D5,L1,V2,M1}  { join( meet( X, Y ), top ) 
% 124.34/124.70    ==> join( X, join( complement( X ), Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := complement( X )
% 124.34/124.70     Z := Y
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111486) {G1,W9,D4,L1,V2,M1}  { join( meet( X, Y ), top ) ==> join
% 124.34/124.70    ( top, Y ) }.
% 124.34/124.70  parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 124.34/124.70     }.
% 124.34/124.70  parent1[0; 7]: (111485) {G1,W12,D5,L1,V2,M1}  { join( meet( X, Y ), top ) 
% 124.34/124.70    ==> join( join( X, complement( X ) ), Y ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (389) {G3,W9,D4,L1,V2,M1} P(29,23);d(1);d(11) { join( meet( X
% 124.34/124.70    , Y ), top ) ==> join( top, Y ) }.
% 124.34/124.70  parent0: (111486) {G1,W9,D4,L1,V2,M1}  { join( meet( X, Y ), top ) ==> join
% 124.34/124.70    ( top, Y ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111489) {G1,W10,D4,L1,V2,M1}  { join( X, top ) ==> join( join( X, 
% 124.34/124.70    Y ), complement( Y ) ) }.
% 124.34/124.70  parent0[0]: (21) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ), 
% 124.34/124.70    complement( X ) ) ==> join( Y, top ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111491) {G2,W14,D7,L1,V2,M1}  { join( meet( X, Y ), top ) ==> 
% 124.34/124.70    join( X, complement( complement( join( complement( X ), Y ) ) ) ) }.
% 124.34/124.70  parent0[0]: (29) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ), 
% 124.34/124.70    complement( join( complement( X ), Y ) ) ) ==> X }.
% 124.34/124.70  parent1[0; 7]: (111489) {G1,W10,D4,L1,V2,M1}  { join( X, top ) ==> join( 
% 124.34/124.70    join( X, Y ), complement( Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := meet( X, Y )
% 124.34/124.70     Y := complement( join( complement( X ), Y ) )
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111492) {G3,W12,D7,L1,V2,M1}  { join( top, Y ) ==> join( X, 
% 124.34/124.70    complement( complement( join( complement( X ), Y ) ) ) ) }.
% 124.34/124.70  parent0[0]: (389) {G3,W9,D4,L1,V2,M1} P(29,23);d(1);d(11) { join( meet( X, 
% 124.34/124.70    Y ), top ) ==> join( top, Y ) }.
% 124.34/124.70  parent1[0; 1]: (111491) {G2,W14,D7,L1,V2,M1}  { join( meet( X, Y ), top ) 
% 124.34/124.70    ==> join( X, complement( complement( join( complement( X ), Y ) ) ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111493) {G3,W12,D7,L1,V2,M1}  { join( Y, complement( complement( 
% 124.34/124.70    join( complement( Y ), X ) ) ) ) ==> join( top, X ) }.
% 124.34/124.70  parent0[0]: (111492) {G3,W12,D7,L1,V2,M1}  { join( top, Y ) ==> join( X, 
% 124.34/124.70    complement( complement( join( complement( X ), Y ) ) ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (393) {G4,W12,D7,L1,V2,M1} P(29,21);d(389) { join( X, 
% 124.34/124.70    complement( complement( join( complement( X ), Y ) ) ) ) ==> join( top, Y
% 124.34/124.70     ) }.
% 124.34/124.70  parent0: (111493) {G3,W12,D7,L1,V2,M1}  { join( Y, complement( complement( 
% 124.34/124.70    join( complement( Y ), X ) ) ) ) ==> join( top, X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111495) {G1,W11,D6,L1,V2,M1}  { X ==> join( meet( X, Y ), 
% 124.34/124.70    complement( join( complement( X ), Y ) ) ) }.
% 124.34/124.70  parent0[0]: (29) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ), 
% 124.34/124.70    complement( join( complement( X ), Y ) ) ) ==> X }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111497) {G2,W8,D4,L1,V1,M1}  { X ==> join( meet( X, X ), 
% 124.34/124.70    complement( top ) ) }.
% 124.34/124.70  parent0[0]: (18) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X ) 
% 124.34/124.70    ==> top }.
% 124.34/124.70  parent1[0; 7]: (111495) {G1,W11,D6,L1,V2,M1}  { X ==> join( meet( X, Y ), 
% 124.34/124.70    complement( join( complement( X ), Y ) ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111498) {G2,W7,D4,L1,V1,M1}  { X ==> join( meet( X, X ), zero )
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (44) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==> 
% 124.34/124.70    zero }.
% 124.34/124.70  parent1[0; 6]: (111497) {G2,W8,D4,L1,V1,M1}  { X ==> join( meet( X, X ), 
% 124.34/124.70    complement( top ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111499) {G2,W7,D4,L1,V1,M1}  { join( meet( X, X ), zero ) ==> X
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (111498) {G2,W7,D4,L1,V1,M1}  { X ==> join( meet( X, X ), zero
% 124.34/124.70     ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (409) {G2,W7,D4,L1,V1,M1} P(18,29);d(44) { join( meet( X, X )
% 124.34/124.70    , zero ) ==> X }.
% 124.34/124.70  parent0: (111499) {G2,W7,D4,L1,V1,M1}  { join( meet( X, X ), zero ) ==> X
% 124.34/124.70     }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111501) {G1,W11,D6,L1,V2,M1}  { X ==> join( meet( X, Y ), 
% 124.34/124.70    complement( join( complement( X ), Y ) ) ) }.
% 124.34/124.70  parent0[0]: (29) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ), 
% 124.34/124.70    complement( join( complement( X ), Y ) ) ) ==> X }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111503) {G1,W10,D6,L1,V1,M1}  { X ==> join( zero, complement( 
% 124.34/124.70    join( complement( X ), complement( X ) ) ) ) }.
% 124.34/124.70  parent0[0]: (12) {G0,W6,D4,L1,V1,M1} I { meet( X, complement( X ) ) ==> 
% 124.34/124.70    zero }.
% 124.34/124.70  parent1[0; 3]: (111501) {G1,W11,D6,L1,V2,M1}  { X ==> join( meet( X, Y ), 
% 124.34/124.70    complement( join( complement( X ), Y ) ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := complement( X )
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111504) {G1,W7,D4,L1,V1,M1}  { X ==> join( zero, meet( X, X ) )
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 124.34/124.70    , complement( Y ) ) ) ==> meet( X, Y ) }.
% 124.34/124.70  parent1[0; 4]: (111503) {G1,W10,D6,L1,V1,M1}  { X ==> join( zero, 
% 124.34/124.70    complement( join( complement( X ), complement( X ) ) ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111505) {G1,W7,D4,L1,V1,M1}  { join( zero, meet( X, X ) ) ==> X
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (111504) {G1,W7,D4,L1,V1,M1}  { X ==> join( zero, meet( X, X )
% 124.34/124.70     ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (414) {G2,W7,D4,L1,V1,M1} P(12,29);d(3) { join( zero, meet( X
% 124.34/124.70    , X ) ) ==> X }.
% 124.34/124.70  parent0: (111505) {G1,W7,D4,L1,V1,M1}  { join( zero, meet( X, X ) ) ==> X
% 124.34/124.70     }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111507) {G1,W10,D4,L1,V2,M1}  { join( X, top ) ==> join( join( X, 
% 124.34/124.70    Y ), complement( Y ) ) }.
% 124.34/124.70  parent0[0]: (21) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ), 
% 124.34/124.70    complement( X ) ) ==> join( Y, top ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111509) {G2,W10,D4,L1,V1,M1}  { join( meet( X, X ), top ) ==> 
% 124.34/124.70    join( X, complement( zero ) ) }.
% 124.34/124.70  parent0[0]: (409) {G2,W7,D4,L1,V1,M1} P(18,29);d(44) { join( meet( X, X ), 
% 124.34/124.70    zero ) ==> X }.
% 124.34/124.70  parent1[0; 7]: (111507) {G1,W10,D4,L1,V2,M1}  { join( X, top ) ==> join( 
% 124.34/124.70    join( X, Y ), complement( Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := meet( X, X )
% 124.34/124.70     Y := zero
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111510) {G3,W8,D4,L1,V1,M1}  { join( top, X ) ==> join( X, 
% 124.34/124.70    complement( zero ) ) }.
% 124.34/124.70  parent0[0]: (389) {G3,W9,D4,L1,V2,M1} P(29,23);d(1);d(11) { join( meet( X, 
% 124.34/124.70    Y ), top ) ==> join( top, Y ) }.
% 124.34/124.70  parent1[0; 1]: (111509) {G2,W10,D4,L1,V1,M1}  { join( meet( X, X ), top ) 
% 124.34/124.70    ==> join( X, complement( zero ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111511) {G3,W8,D4,L1,V1,M1}  { join( X, complement( zero ) ) ==> 
% 124.34/124.70    join( top, X ) }.
% 124.34/124.70  parent0[0]: (111510) {G3,W8,D4,L1,V1,M1}  { join( top, X ) ==> join( X, 
% 124.34/124.70    complement( zero ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (417) {G4,W8,D4,L1,V1,M1} P(409,21);d(389) { join( X, 
% 124.34/124.70    complement( zero ) ) ==> join( top, X ) }.
% 124.34/124.70  parent0: (111511) {G3,W8,D4,L1,V1,M1}  { join( X, complement( zero ) ) ==> 
% 124.34/124.70    join( top, X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111513) {G1,W10,D4,L1,V2,M1}  { join( X, top ) ==> join( join( X, 
% 124.34/124.70    Y ), complement( Y ) ) }.
% 124.34/124.70  parent0[0]: (21) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ), 
% 124.34/124.70    complement( X ) ) ==> join( Y, top ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111515) {G2,W10,D5,L1,V1,M1}  { join( zero, top ) ==> join( X, 
% 124.34/124.70    complement( meet( X, X ) ) ) }.
% 124.34/124.70  parent0[0]: (414) {G2,W7,D4,L1,V1,M1} P(12,29);d(3) { join( zero, meet( X, 
% 124.34/124.70    X ) ) ==> X }.
% 124.34/124.70  parent1[0; 5]: (111513) {G1,W10,D4,L1,V2,M1}  { join( X, top ) ==> join( 
% 124.34/124.70    join( X, Y ), complement( Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := zero
% 124.34/124.70     Y := meet( X, X )
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111516) {G3,W8,D5,L1,V1,M1}  { top ==> join( X, complement( meet
% 124.34/124.70    ( X, X ) ) ) }.
% 124.34/124.70  parent0[0]: (48) {G2,W5,D3,L1,V0,M1} P(44,18) { join( zero, top ) ==> top
% 124.34/124.70     }.
% 124.34/124.70  parent1[0; 1]: (111515) {G2,W10,D5,L1,V1,M1}  { join( zero, top ) ==> join
% 124.34/124.70    ( X, complement( meet( X, X ) ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111517) {G3,W8,D5,L1,V1,M1}  { join( X, complement( meet( X, X ) )
% 124.34/124.70     ) ==> top }.
% 124.34/124.70  parent0[0]: (111516) {G3,W8,D5,L1,V1,M1}  { top ==> join( X, complement( 
% 124.34/124.70    meet( X, X ) ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (423) {G3,W8,D5,L1,V1,M1} P(414,21);d(48) { join( X, 
% 124.34/124.70    complement( meet( X, X ) ) ) ==> top }.
% 124.34/124.70  parent0: (111517) {G3,W8,D5,L1,V1,M1}  { join( X, complement( meet( X, X )
% 124.34/124.70     ) ) ==> top }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111519) {G3,W8,D5,L1,V1,M1}  { top ==> join( X, complement( meet( 
% 124.34/124.70    X, X ) ) ) }.
% 124.34/124.70  parent0[0]: (423) {G3,W8,D5,L1,V1,M1} P(414,21);d(48) { join( X, complement
% 124.34/124.70    ( meet( X, X ) ) ) ==> top }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111522) {G2,W20,D9,L1,V2,M1}  { top ==> join( join( complement( X
% 124.34/124.70     ), complement( Y ) ), complement( complement( join( complement( join( 
% 124.34/124.70    complement( X ), complement( Y ) ) ), meet( X, Y ) ) ) ) ) }.
% 124.34/124.70  parent0[0]: (39) {G1,W15,D5,L1,V3,M1} P(3,3) { meet( Z, join( complement( X
% 124.34/124.70     ), complement( Y ) ) ) ==> complement( join( complement( Z ), meet( X, Y
% 124.34/124.70     ) ) ) }.
% 124.34/124.70  parent1[0; 9]: (111519) {G3,W8,D5,L1,V1,M1}  { top ==> join( X, complement
% 124.34/124.70    ( meet( X, X ) ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70     Z := join( complement( X ), complement( Y ) )
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := join( complement( X ), complement( Y ) )
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111523) {G3,W7,D4,L1,V2,M1}  { top ==> join( top, meet( X, Y ) )
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (393) {G4,W12,D7,L1,V2,M1} P(29,21);d(389) { join( X, 
% 124.34/124.70    complement( complement( join( complement( X ), Y ) ) ) ) ==> join( top, Y
% 124.34/124.70     ) }.
% 124.34/124.70  parent1[0; 2]: (111522) {G2,W20,D9,L1,V2,M1}  { top ==> join( join( 
% 124.34/124.70    complement( X ), complement( Y ) ), complement( complement( join( 
% 124.34/124.70    complement( join( complement( X ), complement( Y ) ) ), meet( X, Y ) ) )
% 124.34/124.70     ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := join( complement( X ), complement( Y ) )
% 124.34/124.70     Y := meet( X, Y )
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111524) {G3,W7,D4,L1,V2,M1}  { join( top, meet( X, Y ) ) ==> top
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (111523) {G3,W7,D4,L1,V2,M1}  { top ==> join( top, meet( X, Y )
% 124.34/124.70     ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (542) {G5,W7,D4,L1,V2,M1} P(39,423);d(393) { join( top, meet( 
% 124.34/124.70    X, Y ) ) ==> top }.
% 124.34/124.70  parent0: (111524) {G3,W7,D4,L1,V2,M1}  { join( top, meet( X, Y ) ) ==> top
% 124.34/124.70     }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111525) {G5,W7,D4,L1,V2,M1}  { top ==> join( top, meet( X, Y ) )
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (542) {G5,W7,D4,L1,V2,M1} P(39,423);d(393) { join( top, meet( X
% 124.34/124.70    , Y ) ) ==> top }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111527) {G1,W7,D4,L1,V2,M1}  { top ==> join( meet( X, Y ), top )
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.34/124.70  parent1[0; 2]: (111525) {G5,W7,D4,L1,V2,M1}  { top ==> join( top, meet( X, 
% 124.34/124.70    Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := top
% 124.34/124.70     Y := meet( X, Y )
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111529) {G2,W5,D3,L1,V1,M1}  { top ==> join( top, Y ) }.
% 124.34/124.70  parent0[0]: (389) {G3,W9,D4,L1,V2,M1} P(29,23);d(1);d(11) { join( meet( X, 
% 124.34/124.70    Y ), top ) ==> join( top, Y ) }.
% 124.34/124.70  parent1[0; 2]: (111527) {G1,W7,D4,L1,V2,M1}  { top ==> join( meet( X, Y ), 
% 124.34/124.70    top ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111530) {G2,W5,D3,L1,V1,M1}  { join( top, X ) ==> top }.
% 124.34/124.70  parent0[0]: (111529) {G2,W5,D3,L1,V1,M1}  { top ==> join( top, Y ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (562) {G6,W5,D3,L1,V1,M1} P(542,0);d(389) { join( top, Y ) ==>
% 124.34/124.70     top }.
% 124.34/124.70  parent0: (111530) {G2,W5,D3,L1,V1,M1}  { join( top, X ) ==> top }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111532) {G1,W11,D4,L1,V3,M1}  { join( join( Y, Z ), X ) = join( 
% 124.34/124.70    join( X, Y ), Z ) }.
% 124.34/124.70  parent0[0]: (19) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) = 
% 124.34/124.70    join( join( Y, Z ), X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70     Z := Z
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111534) {G2,W9,D4,L1,V2,M1}  { join( top, Y ) = join( join( Y, 
% 124.34/124.70    top ), X ) }.
% 124.34/124.70  parent0[0]: (562) {G6,W5,D3,L1,V1,M1} P(542,0);d(389) { join( top, Y ) ==> 
% 124.34/124.70    top }.
% 124.34/124.70  parent1[0; 2]: (111532) {G1,W11,D4,L1,V3,M1}  { join( join( Y, Z ), X ) = 
% 124.34/124.70    join( join( X, Y ), Z ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Z
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := top
% 124.34/124.70     Z := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111540) {G3,W7,D4,L1,V2,M1}  { top = join( join( X, top ), Y )
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (562) {G6,W5,D3,L1,V1,M1} P(542,0);d(389) { join( top, Y ) ==> 
% 124.34/124.70    top }.
% 124.34/124.70  parent1[0; 1]: (111534) {G2,W9,D4,L1,V2,M1}  { join( top, Y ) = join( join
% 124.34/124.70    ( Y, top ), X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Z
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111541) {G3,W7,D4,L1,V2,M1}  { join( join( X, top ), Y ) = top }.
% 124.34/124.70  parent0[0]: (111540) {G3,W7,D4,L1,V2,M1}  { top = join( join( X, top ), Y )
% 124.34/124.70     }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (571) {G7,W7,D4,L1,V2,M1} P(562,19);d(562) { join( join( Y, 
% 124.34/124.70    top ), X ) ==> top }.
% 124.34/124.70  parent0: (111541) {G3,W7,D4,L1,V2,M1}  { join( join( X, top ), Y ) = top
% 124.34/124.70     }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111543) {G0,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) ==> join( 
% 124.34/124.70    X, join( Y, Z ) ) }.
% 124.34/124.70  parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( 
% 124.34/124.70    join( X, Y ), Z ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70     Z := Z
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111548) {G1,W9,D4,L1,V2,M1}  { join( join( X, top ), Y ) ==> join
% 124.34/124.70    ( X, top ) }.
% 124.34/124.70  parent0[0]: (562) {G6,W5,D3,L1,V1,M1} P(542,0);d(389) { join( top, Y ) ==> 
% 124.34/124.70    top }.
% 124.34/124.70  parent1[0; 8]: (111543) {G0,W11,D4,L1,V3,M1}  { join( join( X, Y ), Z ) ==>
% 124.34/124.70     join( X, join( Y, Z ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Z
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := top
% 124.34/124.70     Z := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111552) {G2,W5,D3,L1,V1,M1}  { top ==> join( X, top ) }.
% 124.34/124.70  parent0[0]: (571) {G7,W7,D4,L1,V2,M1} P(562,19);d(562) { join( join( Y, top
% 124.34/124.70     ), X ) ==> top }.
% 124.34/124.70  parent1[0; 1]: (111548) {G1,W9,D4,L1,V2,M1}  { join( join( X, top ), Y ) 
% 124.34/124.70    ==> join( X, top ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111553) {G2,W5,D3,L1,V1,M1}  { join( X, top ) ==> top }.
% 124.34/124.70  parent0[0]: (111552) {G2,W5,D3,L1,V1,M1}  { top ==> join( X, top ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (575) {G8,W5,D3,L1,V1,M1} P(562,1);d(571) { join( Y, top ) ==>
% 124.34/124.70     top }.
% 124.34/124.70  parent0: (111553) {G2,W5,D3,L1,V1,M1}  { join( X, top ) ==> top }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111555) {G1,W11,D6,L1,V2,M1}  { X ==> join( meet( X, Y ), 
% 124.34/124.70    complement( join( complement( X ), Y ) ) ) }.
% 124.34/124.70  parent0[0]: (29) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ), 
% 124.34/124.70    complement( join( complement( X ), Y ) ) ) ==> X }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111557) {G2,W8,D4,L1,V1,M1}  { X ==> join( meet( X, top ), 
% 124.34/124.70    complement( top ) ) }.
% 124.34/124.70  parent0[0]: (575) {G8,W5,D3,L1,V1,M1} P(562,1);d(571) { join( Y, top ) ==> 
% 124.34/124.70    top }.
% 124.34/124.70  parent1[0; 7]: (111555) {G1,W11,D6,L1,V2,M1}  { X ==> join( meet( X, Y ), 
% 124.34/124.70    complement( join( complement( X ), Y ) ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := complement( X )
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := top
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111558) {G2,W7,D4,L1,V1,M1}  { X ==> join( meet( X, top ), zero )
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (44) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==> 
% 124.34/124.70    zero }.
% 124.34/124.70  parent1[0; 6]: (111557) {G2,W8,D4,L1,V1,M1}  { X ==> join( meet( X, top ), 
% 124.34/124.70    complement( top ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111559) {G2,W7,D4,L1,V1,M1}  { join( meet( X, top ), zero ) ==> X
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (111558) {G2,W7,D4,L1,V1,M1}  { X ==> join( meet( X, top ), 
% 124.34/124.70    zero ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (578) {G9,W7,D4,L1,V1,M1} P(575,29);d(44) { join( meet( X, top
% 124.34/124.70     ), zero ) ==> X }.
% 124.34/124.70  parent0: (111559) {G2,W7,D4,L1,V1,M1}  { join( meet( X, top ), zero ) ==> X
% 124.34/124.70     }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111560) {G9,W7,D4,L1,V1,M1}  { X ==> join( meet( X, top ), zero )
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (578) {G9,W7,D4,L1,V1,M1} P(575,29);d(44) { join( meet( X, top
% 124.34/124.70     ), zero ) ==> X }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111561) {G2,W7,D4,L1,V1,M1}  { X ==> join( meet( top, X ), zero )
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (42) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X, 
% 124.34/124.70    Y ) }.
% 124.34/124.70  parent1[0; 3]: (111560) {G9,W7,D4,L1,V1,M1}  { X ==> join( meet( X, top ), 
% 124.34/124.70    zero ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := top
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111564) {G2,W7,D4,L1,V1,M1}  { join( meet( top, X ), zero ) ==> X
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (111561) {G2,W7,D4,L1,V1,M1}  { X ==> join( meet( top, X ), 
% 124.34/124.70    zero ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (637) {G10,W7,D4,L1,V1,M1} P(42,578) { join( meet( top, X ), 
% 124.34/124.70    zero ) ==> X }.
% 124.34/124.70  parent0: (111564) {G2,W7,D4,L1,V1,M1}  { join( meet( top, X ), zero ) ==> X
% 124.34/124.70     }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111565) {G9,W7,D4,L1,V1,M1}  { X ==> join( meet( X, top ), zero )
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (578) {G9,W7,D4,L1,V1,M1} P(575,29);d(44) { join( meet( X, top
% 124.34/124.70     ), zero ) ==> X }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111566) {G1,W7,D4,L1,V1,M1}  { X ==> join( zero, meet( X, top ) )
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.34/124.70  parent1[0; 2]: (111565) {G9,W7,D4,L1,V1,M1}  { X ==> join( meet( X, top ), 
% 124.34/124.70    zero ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := meet( X, top )
% 124.34/124.70     Y := zero
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111569) {G1,W7,D4,L1,V1,M1}  { join( zero, meet( X, top ) ) ==> X
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (111566) {G1,W7,D4,L1,V1,M1}  { X ==> join( zero, meet( X, top
% 124.34/124.70     ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (639) {G10,W7,D4,L1,V1,M1} P(578,0) { join( zero, meet( X, top
% 124.34/124.70     ) ) ==> X }.
% 124.34/124.70  parent0: (111569) {G1,W7,D4,L1,V1,M1}  { join( zero, meet( X, top ) ) ==> X
% 124.34/124.70     }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111570) {G10,W7,D4,L1,V1,M1}  { X ==> join( meet( top, X ), zero )
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (637) {G10,W7,D4,L1,V1,M1} P(42,578) { join( meet( top, X ), 
% 124.34/124.70    zero ) ==> X }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111571) {G1,W7,D4,L1,V1,M1}  { X ==> join( zero, meet( top, X ) )
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.34/124.70  parent1[0; 2]: (111570) {G10,W7,D4,L1,V1,M1}  { X ==> join( meet( top, X )
% 124.34/124.70    , zero ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := meet( top, X )
% 124.34/124.70     Y := zero
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111574) {G1,W7,D4,L1,V1,M1}  { join( zero, meet( top, X ) ) ==> X
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (111571) {G1,W7,D4,L1,V1,M1}  { X ==> join( zero, meet( top, X
% 124.34/124.70     ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (653) {G11,W7,D4,L1,V1,M1} P(637,0) { join( zero, meet( top, X
% 124.34/124.70     ) ) ==> X }.
% 124.34/124.70  parent0: (111574) {G1,W7,D4,L1,V1,M1}  { join( zero, meet( top, X ) ) ==> X
% 124.34/124.70     }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111576) {G1,W10,D5,L1,V2,M1}  { join( X, converse( Y ) ) ==> 
% 124.34/124.70    converse( join( converse( X ), Y ) ) }.
% 124.34/124.70  parent0[0]: (64) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 124.34/124.70     ), Y ) ) ==> join( X, converse( Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111577) {G2,W7,D4,L1,V1,M1}  { join( X, converse( top ) ) ==> 
% 124.34/124.70    converse( top ) }.
% 124.34/124.70  parent0[0]: (575) {G8,W5,D3,L1,V1,M1} P(562,1);d(571) { join( Y, top ) ==> 
% 124.34/124.70    top }.
% 124.34/124.70  parent1[0; 6]: (111576) {G1,W10,D5,L1,V2,M1}  { join( X, converse( Y ) ) 
% 124.34/124.70    ==> converse( join( converse( X ), Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := converse( X )
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := top
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (738) {G9,W7,D4,L1,V1,M1} P(575,64) { join( X, converse( top )
% 124.34/124.70     ) ==> converse( top ) }.
% 124.34/124.70  parent0: (111577) {G2,W7,D4,L1,V1,M1}  { join( X, converse( top ) ) ==> 
% 124.34/124.70    converse( top ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111580) {G1,W10,D5,L1,V2,M1}  { join( X, converse( Y ) ) ==> 
% 124.34/124.70    converse( join( converse( X ), Y ) ) }.
% 124.34/124.70  parent0[0]: (64) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 124.34/124.70     ), Y ) ) ==> join( X, converse( Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111581) {G1,W9,D6,L1,V1,M1}  { join( X, converse( complement( 
% 124.34/124.70    converse( X ) ) ) ) ==> converse( top ) }.
% 124.34/124.70  parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 124.34/124.70     }.
% 124.34/124.70  parent1[0; 8]: (111580) {G1,W10,D5,L1,V2,M1}  { join( X, converse( Y ) ) 
% 124.34/124.70    ==> converse( join( converse( X ), Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := converse( X )
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := complement( converse( X ) )
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (746) {G2,W9,D6,L1,V1,M1} P(11,64) { join( X, converse( 
% 124.34/124.70    complement( converse( X ) ) ) ) ==> converse( top ) }.
% 124.34/124.70  parent0: (111581) {G1,W9,D6,L1,V1,M1}  { join( X, converse( complement( 
% 124.34/124.70    converse( X ) ) ) ) ==> converse( top ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111583) {G9,W7,D4,L1,V1,M1}  { converse( top ) ==> join( X, 
% 124.34/124.70    converse( top ) ) }.
% 124.34/124.70  parent0[0]: (738) {G9,W7,D4,L1,V1,M1} P(575,64) { join( X, converse( top )
% 124.34/124.70     ) ==> converse( top ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111585) {G7,W4,D3,L1,V0,M1}  { converse( top ) ==> top }.
% 124.34/124.70  parent0[0]: (562) {G6,W5,D3,L1,V1,M1} P(542,0);d(389) { join( top, Y ) ==> 
% 124.34/124.70    top }.
% 124.34/124.70  parent1[0; 3]: (111583) {G9,W7,D4,L1,V1,M1}  { converse( top ) ==> join( X
% 124.34/124.70    , converse( top ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := converse( top )
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := top
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (752) {G10,W4,D3,L1,V0,M1} P(738,562) { converse( top ) ==> 
% 124.34/124.70    top }.
% 124.34/124.70  parent0: (111585) {G7,W4,D3,L1,V0,M1}  { converse( top ) ==> top }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111588) {G0,W10,D4,L1,V2,M1}  { converse( composition( Y, X ) ) 
% 124.34/124.70    ==> composition( converse( X ), converse( Y ) ) }.
% 124.34/124.70  parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ), 
% 124.34/124.70    converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111589) {G1,W9,D4,L1,V1,M1}  { converse( composition( X, top ) ) 
% 124.34/124.70    ==> composition( top, converse( X ) ) }.
% 124.34/124.70  parent0[0]: (752) {G10,W4,D3,L1,V0,M1} P(738,562) { converse( top ) ==> top
% 124.34/124.70     }.
% 124.34/124.70  parent1[0; 6]: (111588) {G0,W10,D4,L1,V2,M1}  { converse( composition( Y, X
% 124.34/124.70     ) ) ==> composition( converse( X ), converse( Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := top
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111591) {G1,W9,D4,L1,V1,M1}  { composition( top, converse( X ) ) 
% 124.34/124.70    ==> converse( composition( X, top ) ) }.
% 124.34/124.70  parent0[0]: (111589) {G1,W9,D4,L1,V1,M1}  { converse( composition( X, top )
% 124.34/124.70     ) ==> composition( top, converse( X ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (758) {G11,W9,D4,L1,V1,M1} P(752,9) { composition( top, 
% 124.34/124.70    converse( X ) ) ==> converse( composition( X, top ) ) }.
% 124.34/124.70  parent0: (111591) {G1,W9,D4,L1,V1,M1}  { composition( top, converse( X ) ) 
% 124.34/124.70    ==> converse( composition( X, top ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111594) {G0,W10,D4,L1,V2,M1}  { converse( composition( Y, X ) ) 
% 124.34/124.70    ==> composition( converse( X ), converse( Y ) ) }.
% 124.34/124.70  parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ), 
% 124.34/124.70    converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111596) {G1,W9,D4,L1,V1,M1}  { converse( composition( top, X ) ) 
% 124.34/124.70    ==> composition( converse( X ), top ) }.
% 124.34/124.70  parent0[0]: (752) {G10,W4,D3,L1,V0,M1} P(738,562) { converse( top ) ==> top
% 124.34/124.70     }.
% 124.34/124.70  parent1[0; 8]: (111594) {G0,W10,D4,L1,V2,M1}  { converse( composition( Y, X
% 124.34/124.70     ) ) ==> composition( converse( X ), converse( Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := top
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111598) {G1,W9,D4,L1,V1,M1}  { composition( converse( X ), top ) 
% 124.34/124.70    ==> converse( composition( top, X ) ) }.
% 124.34/124.70  parent0[0]: (111596) {G1,W9,D4,L1,V1,M1}  { converse( composition( top, X )
% 124.34/124.70     ) ==> composition( converse( X ), top ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (759) {G11,W9,D4,L1,V1,M1} P(752,9) { composition( converse( X
% 124.34/124.70     ), top ) ==> converse( composition( top, X ) ) }.
% 124.34/124.70  parent0: (111598) {G1,W9,D4,L1,V1,M1}  { composition( converse( X ), top ) 
% 124.34/124.70    ==> converse( composition( top, X ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111600) {G1,W10,D5,L1,V2,M1}  { join( converse( X ), Y ) ==> 
% 124.34/124.70    converse( join( X, converse( Y ) ) ) }.
% 124.34/124.70  parent0[0]: (65) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 124.34/124.70    ( X ) ) ) ==> join( converse( Y ), X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111602) {G2,W9,D6,L1,V1,M1}  { join( converse( complement( 
% 124.34/124.70    converse( X ) ) ), X ) ==> converse( top ) }.
% 124.34/124.70  parent0[0]: (18) {G1,W6,D4,L1,V1,M1} P(0,11) { join( complement( X ), X ) 
% 124.34/124.70    ==> top }.
% 124.34/124.70  parent1[0; 8]: (111600) {G1,W10,D5,L1,V2,M1}  { join( converse( X ), Y ) 
% 124.34/124.70    ==> converse( join( X, converse( Y ) ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := converse( X )
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := complement( converse( X ) )
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111603) {G3,W8,D6,L1,V1,M1}  { join( converse( complement( 
% 124.34/124.70    converse( X ) ) ), X ) ==> top }.
% 124.34/124.70  parent0[0]: (752) {G10,W4,D3,L1,V0,M1} P(738,562) { converse( top ) ==> top
% 124.34/124.70     }.
% 124.34/124.70  parent1[0; 7]: (111602) {G2,W9,D6,L1,V1,M1}  { join( converse( complement( 
% 124.34/124.70    converse( X ) ) ), X ) ==> converse( top ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (774) {G11,W8,D6,L1,V1,M1} P(18,65);d(752) { join( converse( 
% 124.34/124.70    complement( converse( X ) ) ), X ) ==> top }.
% 124.34/124.70  parent0: (111603) {G3,W8,D6,L1,V1,M1}  { join( converse( complement( 
% 124.34/124.70    converse( X ) ) ), X ) ==> top }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111607) {G5,W6,D4,L1,V1,M1}  { join( X, complement( zero ) ) ==> 
% 124.34/124.70    top }.
% 124.34/124.70  parent0[0]: (562) {G6,W5,D3,L1,V1,M1} P(542,0);d(389) { join( top, Y ) ==> 
% 124.34/124.70    top }.
% 124.34/124.70  parent1[0; 5]: (417) {G4,W8,D4,L1,V1,M1} P(409,21);d(389) { join( X, 
% 124.34/124.70    complement( zero ) ) ==> join( top, X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (1016) {G7,W6,D4,L1,V1,M1} S(417);d(562) { join( X, complement
% 124.34/124.70    ( zero ) ) ==> top }.
% 124.34/124.70  parent0: (111607) {G5,W6,D4,L1,V1,M1}  { join( X, complement( zero ) ) ==> 
% 124.34/124.70    top }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111611) {G2,W8,D4,L1,V2,M1}  { join( join( X, Y ), complement( Y
% 124.34/124.70     ) ) ==> top }.
% 124.34/124.70  parent0[0]: (575) {G8,W5,D3,L1,V1,M1} P(562,1);d(571) { join( Y, top ) ==> 
% 124.34/124.70    top }.
% 124.34/124.70  parent1[0; 7]: (21) {G1,W10,D4,L1,V2,M1} P(11,1) { join( join( Y, X ), 
% 124.34/124.70    complement( X ) ) ==> join( Y, top ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Z
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (1020) {G9,W8,D4,L1,V2,M1} S(21);d(575) { join( join( Y, X ), 
% 124.34/124.70    complement( X ) ) ==> top }.
% 124.34/124.70  parent0: (111611) {G2,W8,D4,L1,V2,M1}  { join( join( X, Y ), complement( Y
% 124.34/124.70     ) ) ==> top }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111613) {G7,W6,D4,L1,V1,M1}  { top ==> join( X, complement( zero )
% 124.34/124.70     ) }.
% 124.34/124.70  parent0[0]: (1016) {G7,W6,D4,L1,V1,M1} S(417);d(562) { join( X, complement
% 124.34/124.70    ( zero ) ) ==> top }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111615) {G1,W4,D3,L1,V0,M1}  { top ==> complement( zero ) }.
% 124.34/124.70  parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 124.34/124.70    , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement( 
% 124.34/124.70    Y ) }.
% 124.34/124.70  parent1[0; 2]: (111613) {G7,W6,D4,L1,V1,M1}  { top ==> join( X, complement
% 124.34/124.70    ( zero ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := zero
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := composition( converse( X ), complement( composition( X, zero ) ) )
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111616) {G1,W4,D3,L1,V0,M1}  { complement( zero ) ==> top }.
% 124.34/124.70  parent0[0]: (111615) {G1,W4,D3,L1,V0,M1}  { top ==> complement( zero ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (1026) {G8,W4,D3,L1,V0,M1} P(1016,10) { complement( zero ) ==>
% 124.34/124.70     top }.
% 124.34/124.70  parent0: (111616) {G1,W4,D3,L1,V0,M1}  { complement( zero ) ==> top }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111617) {G0,W5,D4,L1,V1,M1}  { X ==> converse( converse( X ) ) }.
% 124.34/124.70  parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111619) {G1,W13,D6,L1,V3,M1}  { composition( X, join( Y, Z ) ) 
% 124.34/124.70    ==> converse( converse( composition( X, join( Z, Y ) ) ) ) }.
% 124.34/124.70  parent0[0]: (73) {G2,W13,D5,L1,V3,M1} P(63,9);d(9) { converse( composition
% 124.34/124.70    ( Z, join( Y, X ) ) ) = converse( composition( Z, join( X, Y ) ) ) }.
% 124.34/124.70  parent1[0; 7]: (111617) {G0,W5,D4,L1,V1,M1}  { X ==> converse( converse( X
% 124.34/124.70     ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Z
% 124.34/124.70     Y := Y
% 124.34/124.70     Z := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := composition( X, join( Y, Z ) )
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111621) {G1,W11,D4,L1,V3,M1}  { composition( X, join( Y, Z ) ) 
% 124.34/124.70    ==> composition( X, join( Z, Y ) ) }.
% 124.34/124.70  parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 124.34/124.70  parent1[0; 6]: (111619) {G1,W13,D6,L1,V3,M1}  { composition( X, join( Y, Z
% 124.34/124.70     ) ) ==> converse( converse( composition( X, join( Z, Y ) ) ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := composition( X, join( Z, Y ) )
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70     Z := Z
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (1044) {G3,W11,D4,L1,V3,M1} P(73,7);d(7) { composition( X, 
% 124.34/124.70    join( Z, Y ) ) = composition( X, join( Y, Z ) ) }.
% 124.34/124.70  parent0: (111621) {G1,W11,D4,L1,V3,M1}  { composition( X, join( Y, Z ) ) 
% 124.34/124.70    ==> composition( X, join( Z, Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Z
% 124.34/124.70     Z := Y
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111623) {G1,W10,D5,L1,V2,M1}  { composition( converse( Y ), X ) 
% 124.34/124.70    ==> converse( composition( converse( X ), Y ) ) }.
% 124.34/124.70  parent0[0]: (78) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( 
% 124.34/124.70    converse( X ), Y ) ) ==> composition( converse( Y ), X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111626) {G1,W8,D4,L1,V1,M1}  { composition( converse( one ), X ) 
% 124.34/124.70    ==> converse( converse( X ) ) }.
% 124.34/124.70  parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 124.34/124.70  parent1[0; 6]: (111623) {G1,W10,D5,L1,V2,M1}  { composition( converse( Y )
% 124.34/124.70    , X ) ==> converse( composition( converse( X ), Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := converse( X )
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := one
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111627) {G1,W6,D4,L1,V1,M1}  { composition( converse( one ), X ) 
% 124.34/124.70    ==> X }.
% 124.34/124.70  parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 124.34/124.70  parent1[0; 5]: (111626) {G1,W8,D4,L1,V1,M1}  { composition( converse( one )
% 124.34/124.70    , X ) ==> converse( converse( X ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (1268) {G2,W6,D4,L1,V1,M1} P(5,78);d(7) { composition( 
% 124.34/124.70    converse( one ), X ) ==> X }.
% 124.34/124.70  parent0: (111627) {G1,W6,D4,L1,V1,M1}  { composition( converse( one ), X ) 
% 124.34/124.70    ==> X }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111629) {G2,W6,D4,L1,V1,M1}  { X ==> composition( converse( one )
% 124.34/124.70    , X ) }.
% 124.34/124.70  parent0[0]: (1268) {G2,W6,D4,L1,V1,M1} P(5,78);d(7) { composition( converse
% 124.34/124.70    ( one ), X ) ==> X }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111631) {G1,W4,D3,L1,V0,M1}  { one ==> converse( one ) }.
% 124.34/124.70  parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 124.34/124.70  parent1[0; 2]: (111629) {G2,W6,D4,L1,V1,M1}  { X ==> composition( converse
% 124.34/124.70    ( one ), X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := converse( one )
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := one
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111632) {G1,W4,D3,L1,V0,M1}  { converse( one ) ==> one }.
% 124.34/124.70  parent0[0]: (111631) {G1,W4,D3,L1,V0,M1}  { one ==> converse( one ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (1276) {G3,W4,D3,L1,V0,M1} P(1268,5) { converse( one ) ==> one
% 124.34/124.70     }.
% 124.34/124.70  parent0: (111632) {G1,W4,D3,L1,V0,M1}  { converse( one ) ==> one }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111634) {G2,W6,D4,L1,V1,M1}  { X ==> composition( converse( one )
% 124.34/124.70    , X ) }.
% 124.34/124.70  parent0[0]: (1268) {G2,W6,D4,L1,V1,M1} P(5,78);d(7) { composition( converse
% 124.34/124.70    ( one ), X ) ==> X }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111635) {G3,W5,D3,L1,V1,M1}  { X ==> composition( one, X ) }.
% 124.34/124.70  parent0[0]: (1276) {G3,W4,D3,L1,V0,M1} P(1268,5) { converse( one ) ==> one
% 124.34/124.70     }.
% 124.34/124.70  parent1[0; 3]: (111634) {G2,W6,D4,L1,V1,M1}  { X ==> composition( converse
% 124.34/124.70    ( one ), X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111636) {G3,W5,D3,L1,V1,M1}  { composition( one, X ) ==> X }.
% 124.34/124.70  parent0[0]: (111635) {G3,W5,D3,L1,V1,M1}  { X ==> composition( one, X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (1278) {G4,W5,D3,L1,V1,M1} P(1276,1268) { composition( one, X
% 124.34/124.70     ) ==> X }.
% 124.34/124.70  parent0: (111636) {G3,W5,D3,L1,V1,M1}  { composition( one, X ) ==> X }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111638) {G1,W10,D5,L1,V2,M1}  { join( converse( X ), Y ) ==> 
% 124.34/124.70    converse( join( X, converse( Y ) ) ) }.
% 124.34/124.70  parent0[0]: (65) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 124.34/124.70    ( X ) ) ) ==> join( converse( Y ), X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111640) {G2,W9,D4,L1,V1,M1}  { join( converse( X ), one ) ==> 
% 124.34/124.70    converse( join( X, one ) ) }.
% 124.34/124.70  parent0[0]: (1276) {G3,W4,D3,L1,V0,M1} P(1268,5) { converse( one ) ==> one
% 124.34/124.70     }.
% 124.34/124.70  parent1[0; 8]: (111638) {G1,W10,D5,L1,V2,M1}  { join( converse( X ), Y ) 
% 124.34/124.70    ==> converse( join( X, converse( Y ) ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := one
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (1279) {G4,W9,D4,L1,V1,M1} P(1276,65) { join( converse( X ), 
% 124.34/124.70    one ) ==> converse( join( X, one ) ) }.
% 124.34/124.70  parent0: (111640) {G2,W9,D4,L1,V1,M1}  { join( converse( X ), one ) ==> 
% 124.34/124.70    converse( join( X, one ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111644) {G0,W13,D6,L1,V2,M1}  { complement( Y ) ==> join( 
% 124.34/124.70    composition( converse( X ), complement( composition( X, Y ) ) ), 
% 124.34/124.70    complement( Y ) ) }.
% 124.34/124.70  parent0[0]: (10) {G0,W13,D6,L1,V2,M1} I { join( composition( converse( X )
% 124.34/124.70    , complement( composition( X, Y ) ) ), complement( Y ) ) ==> complement( 
% 124.34/124.70    Y ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111646) {G1,W11,D5,L1,V1,M1}  { complement( X ) ==> join( 
% 124.34/124.70    composition( converse( one ), complement( X ) ), complement( X ) ) }.
% 124.34/124.70  parent0[0]: (1278) {G4,W5,D3,L1,V1,M1} P(1276,1268) { composition( one, X )
% 124.34/124.70     ==> X }.
% 124.34/124.70  parent1[0; 8]: (111644) {G0,W13,D6,L1,V2,M1}  { complement( Y ) ==> join( 
% 124.34/124.70    composition( converse( X ), complement( composition( X, Y ) ) ), 
% 124.34/124.70    complement( Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := one
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111647) {G2,W8,D4,L1,V1,M1}  { complement( X ) ==> join( 
% 124.34/124.70    complement( X ), complement( X ) ) }.
% 124.34/124.70  parent0[0]: (1268) {G2,W6,D4,L1,V1,M1} P(5,78);d(7) { composition( converse
% 124.34/124.70    ( one ), X ) ==> X }.
% 124.34/124.70  parent1[0; 4]: (111646) {G1,W11,D5,L1,V1,M1}  { complement( X ) ==> join( 
% 124.34/124.70    composition( converse( one ), complement( X ) ), complement( X ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := complement( X )
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111648) {G2,W8,D4,L1,V1,M1}  { join( complement( X ), complement( 
% 124.34/124.70    X ) ) ==> complement( X ) }.
% 124.34/124.70  parent0[0]: (111647) {G2,W8,D4,L1,V1,M1}  { complement( X ) ==> join( 
% 124.34/124.70    complement( X ), complement( X ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (1285) {G5,W8,D4,L1,V1,M1} P(1278,10);d(1268) { join( 
% 124.34/124.70    complement( X ), complement( X ) ) ==> complement( X ) }.
% 124.34/124.70  parent0: (111648) {G2,W8,D4,L1,V1,M1}  { join( complement( X ), complement
% 124.34/124.70    ( X ) ) ==> complement( X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111650) {G0,W13,D4,L1,V3,M1}  { composition( join( X, Z ), Y ) ==>
% 124.34/124.70     join( composition( X, Y ), composition( Z, Y ) ) }.
% 124.34/124.70  parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ), 
% 124.34/124.70    composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Z
% 124.34/124.70     Z := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111651) {G1,W11,D4,L1,V2,M1}  { composition( join( one, X ), Y ) 
% 124.34/124.70    ==> join( Y, composition( X, Y ) ) }.
% 124.34/124.70  parent0[0]: (1278) {G4,W5,D3,L1,V1,M1} P(1276,1268) { composition( one, X )
% 124.34/124.70     ==> X }.
% 124.34/124.70  parent1[0; 7]: (111650) {G0,W13,D4,L1,V3,M1}  { composition( join( X, Z ), 
% 124.34/124.70    Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := one
% 124.34/124.70     Y := Y
% 124.34/124.70     Z := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111653) {G1,W11,D4,L1,V2,M1}  { join( Y, composition( X, Y ) ) ==>
% 124.34/124.70     composition( join( one, X ), Y ) }.
% 124.34/124.70  parent0[0]: (111651) {G1,W11,D4,L1,V2,M1}  { composition( join( one, X ), Y
% 124.34/124.70     ) ==> join( Y, composition( X, Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (1286) {G5,W11,D4,L1,V2,M1} P(1278,6) { join( X, composition( 
% 124.34/124.70    Y, X ) ) = composition( join( one, Y ), X ) }.
% 124.34/124.70  parent0: (111653) {G1,W11,D4,L1,V2,M1}  { join( Y, composition( X, Y ) ) 
% 124.34/124.70    ==> composition( join( one, X ), Y ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111656) {G0,W13,D4,L1,V3,M1}  { composition( join( X, Z ), Y ) ==>
% 124.34/124.70     join( composition( X, Y ), composition( Z, Y ) ) }.
% 124.34/124.70  parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ), 
% 124.34/124.70    composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Z
% 124.34/124.70     Z := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111658) {G1,W11,D4,L1,V2,M1}  { composition( join( X, one ), Y ) 
% 124.34/124.70    ==> join( composition( X, Y ), Y ) }.
% 124.34/124.70  parent0[0]: (1278) {G4,W5,D3,L1,V1,M1} P(1276,1268) { composition( one, X )
% 124.34/124.70     ==> X }.
% 124.34/124.70  parent1[0; 10]: (111656) {G0,W13,D4,L1,V3,M1}  { composition( join( X, Z )
% 124.34/124.70    , Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70     Z := one
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111660) {G1,W11,D4,L1,V2,M1}  { join( composition( X, Y ), Y ) ==>
% 124.34/124.70     composition( join( X, one ), Y ) }.
% 124.34/124.70  parent0[0]: (111658) {G1,W11,D4,L1,V2,M1}  { composition( join( X, one ), Y
% 124.34/124.70     ) ==> join( composition( X, Y ), Y ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (1287) {G5,W11,D4,L1,V2,M1} P(1278,6) { join( composition( Y, 
% 124.34/124.70    X ), X ) = composition( join( Y, one ), X ) }.
% 124.34/124.70  parent0: (111660) {G1,W11,D4,L1,V2,M1}  { join( composition( X, Y ), Y ) 
% 124.34/124.70    ==> composition( join( X, one ), Y ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := Y
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111662) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> complement( join
% 124.34/124.70    ( complement( X ), complement( Y ) ) ) }.
% 124.34/124.70  parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 124.34/124.70    , complement( Y ) ) ) ==> meet( X, Y ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111677) {G1,W7,D4,L1,V1,M1}  { meet( X, X ) ==> complement( 
% 124.34/124.70    complement( X ) ) }.
% 124.34/124.70  parent0[0]: (1285) {G5,W8,D4,L1,V1,M1} P(1278,10);d(1268) { join( 
% 124.34/124.70    complement( X ), complement( X ) ) ==> complement( X ) }.
% 124.34/124.70  parent1[0; 5]: (111662) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> complement
% 124.34/124.70    ( join( complement( X ), complement( Y ) ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111678) {G1,W7,D4,L1,V1,M1}  { complement( complement( X ) ) ==> 
% 124.34/124.70    meet( X, X ) }.
% 124.34/124.70  parent0[0]: (111677) {G1,W7,D4,L1,V1,M1}  { meet( X, X ) ==> complement( 
% 124.34/124.70    complement( X ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (1299) {G6,W7,D4,L1,V1,M1} P(1285,3) { complement( complement
% 124.34/124.70    ( X ) ) = meet( X, X ) }.
% 124.34/124.70  parent0: (111678) {G1,W7,D4,L1,V1,M1}  { complement( complement( X ) ) ==> 
% 124.34/124.70    meet( X, X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111680) {G5,W8,D4,L1,V1,M1}  { complement( X ) ==> join( 
% 124.34/124.70    complement( X ), complement( X ) ) }.
% 124.34/124.70  parent0[0]: (1285) {G5,W8,D4,L1,V1,M1} P(1278,10);d(1268) { join( 
% 124.34/124.70    complement( X ), complement( X ) ) ==> complement( X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111685) {G1,W17,D6,L1,V2,M1}  { complement( join( complement( X )
% 124.34/124.70    , complement( Y ) ) ) ==> join( complement( join( complement( X ), 
% 124.34/124.70    complement( Y ) ) ), meet( X, Y ) ) }.
% 124.34/124.70  parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 124.34/124.70    , complement( Y ) ) ) ==> meet( X, Y ) }.
% 124.34/124.70  parent1[0; 14]: (111680) {G5,W8,D4,L1,V1,M1}  { complement( X ) ==> join( 
% 124.34/124.70    complement( X ), complement( X ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := join( complement( X ), complement( Y ) )
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111687) {G1,W14,D5,L1,V2,M1}  { complement( join( complement( X )
% 124.34/124.70    , complement( Y ) ) ) ==> join( meet( X, Y ), meet( X, Y ) ) }.
% 124.34/124.70  parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 124.34/124.70    , complement( Y ) ) ) ==> meet( X, Y ) }.
% 124.34/124.70  parent1[0; 8]: (111685) {G1,W17,D6,L1,V2,M1}  { complement( join( 
% 124.34/124.70    complement( X ), complement( Y ) ) ) ==> join( complement( join( 
% 124.34/124.70    complement( X ), complement( Y ) ) ), meet( X, Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111688) {G1,W11,D4,L1,V2,M1}  { meet( X, Y ) ==> join( meet( X, Y
% 124.34/124.70     ), meet( X, Y ) ) }.
% 124.34/124.70  parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 124.34/124.70    , complement( Y ) ) ) ==> meet( X, Y ) }.
% 124.34/124.70  parent1[0; 1]: (111687) {G1,W14,D5,L1,V2,M1}  { complement( join( 
% 124.34/124.70    complement( X ), complement( Y ) ) ) ==> join( meet( X, Y ), meet( X, Y )
% 124.34/124.70     ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111694) {G1,W11,D4,L1,V2,M1}  { join( meet( X, Y ), meet( X, Y ) )
% 124.34/124.70     ==> meet( X, Y ) }.
% 124.34/124.70  parent0[0]: (111688) {G1,W11,D4,L1,V2,M1}  { meet( X, Y ) ==> join( meet( X
% 124.34/124.70    , Y ), meet( X, Y ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (1300) {G6,W11,D4,L1,V2,M1} P(3,1285) { join( meet( X, Y ), 
% 124.34/124.70    meet( X, Y ) ) ==> meet( X, Y ) }.
% 124.34/124.70  parent0: (111694) {G1,W11,D4,L1,V2,M1}  { join( meet( X, Y ), meet( X, Y )
% 124.34/124.70     ) ==> meet( X, Y ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70     Y := Y
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111698) {G2,W9,D5,L1,V1,M1}  { meet( X, top ) ==> complement( join
% 124.34/124.70    ( complement( X ), zero ) ) }.
% 124.34/124.70  parent0[0]: (46) {G2,W9,D5,L1,V1,M1} P(44,3) { complement( join( complement
% 124.34/124.70    ( X ), zero ) ) ==> meet( X, top ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111703) {G3,W11,D5,L1,V1,M1}  { meet( complement( X ), top ) ==> 
% 124.34/124.70    complement( join( meet( X, X ), zero ) ) }.
% 124.34/124.70  parent0[0]: (1299) {G6,W7,D4,L1,V1,M1} P(1285,3) { complement( complement( 
% 124.34/124.70    X ) ) = meet( X, X ) }.
% 124.34/124.70  parent1[0; 7]: (111698) {G2,W9,D5,L1,V1,M1}  { meet( X, top ) ==> 
% 124.34/124.70    complement( join( complement( X ), zero ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := complement( X )
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111704) {G3,W7,D4,L1,V1,M1}  { meet( complement( X ), top ) ==> 
% 124.34/124.70    complement( X ) }.
% 124.34/124.70  parent0[0]: (409) {G2,W7,D4,L1,V1,M1} P(18,29);d(44) { join( meet( X, X ), 
% 124.34/124.70    zero ) ==> X }.
% 124.34/124.70  parent1[0; 6]: (111703) {G3,W11,D5,L1,V1,M1}  { meet( complement( X ), top
% 124.34/124.70     ) ==> complement( join( meet( X, X ), zero ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (1308) {G7,W7,D4,L1,V1,M1} P(1299,46);d(409) { meet( 
% 124.34/124.70    complement( X ), top ) ==> complement( X ) }.
% 124.34/124.70  parent0: (111704) {G3,W7,D4,L1,V1,M1}  { meet( complement( X ), top ) ==> 
% 124.34/124.70    complement( X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111707) {G10,W7,D4,L1,V1,M1}  { X ==> join( zero, meet( X, top ) )
% 124.34/124.70     }.
% 124.34/124.70  parent0[0]: (639) {G10,W7,D4,L1,V1,M1} P(578,0) { join( zero, meet( X, top
% 124.34/124.70     ) ) ==> X }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111708) {G8,W7,D4,L1,V1,M1}  { complement( X ) ==> join( zero, 
% 124.34/124.70    complement( X ) ) }.
% 124.34/124.70  parent0[0]: (1308) {G7,W7,D4,L1,V1,M1} P(1299,46);d(409) { meet( complement
% 124.34/124.70    ( X ), top ) ==> complement( X ) }.
% 124.34/124.70  parent1[0; 5]: (111707) {G10,W7,D4,L1,V1,M1}  { X ==> join( zero, meet( X, 
% 124.34/124.70    top ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := complement( X )
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111709) {G8,W7,D4,L1,V1,M1}  { join( zero, complement( X ) ) ==> 
% 124.34/124.70    complement( X ) }.
% 124.34/124.70  parent0[0]: (111708) {G8,W7,D4,L1,V1,M1}  { complement( X ) ==> join( zero
% 124.34/124.70    , complement( X ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (1333) {G11,W7,D4,L1,V1,M1} P(1308,639) { join( zero, 
% 124.34/124.70    complement( X ) ) ==> complement( X ) }.
% 124.34/124.70  parent0: (111709) {G8,W7,D4,L1,V1,M1}  { join( zero, complement( X ) ) ==> 
% 124.34/124.70    complement( X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111711) {G11,W7,D4,L1,V1,M1}  { complement( X ) ==> join( zero, 
% 124.34/124.70    complement( X ) ) }.
% 124.34/124.70  parent0[0]: (1333) {G11,W7,D4,L1,V1,M1} P(1308,639) { join( zero, 
% 124.34/124.70    complement( X ) ) ==> complement( X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111714) {G7,W9,D4,L1,V1,M1}  { complement( complement( X ) ) ==> 
% 124.34/124.70    join( zero, meet( X, X ) ) }.
% 124.34/124.70  parent0[0]: (1299) {G6,W7,D4,L1,V1,M1} P(1285,3) { complement( complement( 
% 124.34/124.70    X ) ) = meet( X, X ) }.
% 124.34/124.70  parent1[0; 6]: (111711) {G11,W7,D4,L1,V1,M1}  { complement( X ) ==> join( 
% 124.34/124.70    zero, complement( X ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := complement( X )
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111715) {G7,W9,D4,L1,V1,M1}  { meet( X, X ) ==> join( zero, meet
% 124.34/124.70    ( X, X ) ) }.
% 124.34/124.70  parent0[0]: (1299) {G6,W7,D4,L1,V1,M1} P(1285,3) { complement( complement( 
% 124.34/124.70    X ) ) = meet( X, X ) }.
% 124.34/124.70  parent1[0; 1]: (111714) {G7,W9,D4,L1,V1,M1}  { complement( complement( X )
% 124.34/124.70     ) ==> join( zero, meet( X, X ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111718) {G3,W5,D3,L1,V1,M1}  { meet( X, X ) ==> X }.
% 124.34/124.70  parent0[0]: (414) {G2,W7,D4,L1,V1,M1} P(12,29);d(3) { join( zero, meet( X, 
% 124.34/124.70    X ) ) ==> X }.
% 124.34/124.70  parent1[0; 4]: (111715) {G7,W9,D4,L1,V1,M1}  { meet( X, X ) ==> join( zero
% 124.34/124.70    , meet( X, X ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (1340) {G12,W5,D3,L1,V1,M1} P(1299,1333);d(414) { meet( X, X )
% 124.34/124.70     ==> X }.
% 124.34/124.70  parent0: (111718) {G3,W5,D3,L1,V1,M1}  { meet( X, X ) ==> X }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111721) {G11,W7,D4,L1,V1,M1}  { complement( X ) ==> join( zero, 
% 124.34/124.70    complement( X ) ) }.
% 124.34/124.70  parent0[0]: (1333) {G11,W7,D4,L1,V1,M1} P(1308,639) { join( zero, 
% 124.34/124.70    complement( X ) ) ==> complement( X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111724) {G3,W11,D5,L1,V1,M1}  { complement( join( complement( X )
% 124.34/124.70    , zero ) ) ==> join( zero, meet( X, top ) ) }.
% 124.34/124.70  parent0[0]: (46) {G2,W9,D5,L1,V1,M1} P(44,3) { complement( join( complement
% 124.34/124.70    ( X ), zero ) ) ==> meet( X, top ) }.
% 124.34/124.70  parent1[0; 8]: (111721) {G11,W7,D4,L1,V1,M1}  { complement( X ) ==> join( 
% 124.34/124.70    zero, complement( X ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := join( complement( X ), zero )
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111725) {G3,W9,D4,L1,V1,M1}  { meet( X, top ) ==> join( zero, 
% 124.34/124.70    meet( X, top ) ) }.
% 124.34/124.70  parent0[0]: (46) {G2,W9,D5,L1,V1,M1} P(44,3) { complement( join( complement
% 124.34/124.70    ( X ), zero ) ) ==> meet( X, top ) }.
% 124.34/124.70  parent1[0; 1]: (111724) {G3,W11,D5,L1,V1,M1}  { complement( join( 
% 124.34/124.70    complement( X ), zero ) ) ==> join( zero, meet( X, top ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111728) {G4,W5,D3,L1,V1,M1}  { meet( X, top ) ==> X }.
% 124.34/124.70  parent0[0]: (639) {G10,W7,D4,L1,V1,M1} P(578,0) { join( zero, meet( X, top
% 124.34/124.70     ) ) ==> X }.
% 124.34/124.70  parent1[0; 4]: (111725) {G3,W9,D4,L1,V1,M1}  { meet( X, top ) ==> join( 
% 124.34/124.70    zero, meet( X, top ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (1344) {G12,W5,D3,L1,V1,M1} P(46,1333);d(639) { meet( X, top )
% 124.34/124.70     ==> X }.
% 124.34/124.70  parent0: (111728) {G4,W5,D3,L1,V1,M1}  { meet( X, top ) ==> X }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111731) {G2,W9,D5,L1,V1,M1}  { meet( top, X ) ==> complement( join
% 124.34/124.70    ( zero, complement( X ) ) ) }.
% 124.34/124.70  parent0[0]: (45) {G2,W9,D5,L1,V1,M1} P(44,3) { complement( join( zero, 
% 124.34/124.70    complement( X ) ) ) ==> meet( top, X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111738) {G3,W7,D4,L1,V1,M1}  { meet( top, X ) ==> complement( 
% 124.34/124.70    complement( X ) ) }.
% 124.34/124.70  parent0[0]: (1333) {G11,W7,D4,L1,V1,M1} P(1308,639) { join( zero, 
% 124.34/124.70    complement( X ) ) ==> complement( X ) }.
% 124.34/124.70  parent1[0; 5]: (111731) {G2,W9,D5,L1,V1,M1}  { meet( top, X ) ==> 
% 124.34/124.70    complement( join( zero, complement( X ) ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (1345) {G12,W7,D4,L1,V1,M1} P(1333,45) { meet( top, X ) ==> 
% 124.34/124.70    complement( complement( X ) ) }.
% 124.34/124.70  parent0: (111738) {G3,W7,D4,L1,V1,M1}  { meet( top, X ) ==> complement( 
% 124.34/124.70    complement( X ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  eqswap: (111741) {G11,W7,D4,L1,V1,M1}  { complement( X ) ==> join( zero, 
% 124.34/124.70    complement( X ) ) }.
% 124.34/124.70  parent0[0]: (1333) {G11,W7,D4,L1,V1,M1} P(1308,639) { join( zero, 
% 124.34/124.70    complement( X ) ) ==> complement( X ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111746) {G3,W11,D5,L1,V1,M1}  { complement( join( zero, 
% 124.34/124.70    complement( X ) ) ) ==> join( zero, meet( top, X ) ) }.
% 124.34/124.70  parent0[0]: (45) {G2,W9,D5,L1,V1,M1} P(44,3) { complement( join( zero, 
% 124.34/124.70    complement( X ) ) ) ==> meet( top, X ) }.
% 124.34/124.70  parent1[0; 8]: (111741) {G11,W7,D4,L1,V1,M1}  { complement( X ) ==> join( 
% 124.34/124.70    zero, complement( X ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := join( zero, complement( X ) )
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111747) {G3,W9,D4,L1,V1,M1}  { meet( top, X ) ==> join( zero, 
% 124.34/124.70    meet( top, X ) ) }.
% 124.34/124.70  parent0[0]: (45) {G2,W9,D5,L1,V1,M1} P(44,3) { complement( join( zero, 
% 124.34/124.70    complement( X ) ) ) ==> meet( top, X ) }.
% 124.34/124.70  parent1[0; 1]: (111746) {G3,W11,D5,L1,V1,M1}  { complement( join( zero, 
% 124.34/124.70    complement( X ) ) ) ==> join( zero, meet( top, X ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111749) {G4,W5,D3,L1,V1,M1}  { meet( top, X ) ==> X }.
% 124.34/124.70  parent0[0]: (653) {G11,W7,D4,L1,V1,M1} P(637,0) { join( zero, meet( top, X
% 124.34/124.70     ) ) ==> X }.
% 124.34/124.70  parent1[0; 4]: (111747) {G3,W9,D4,L1,V1,M1}  { meet( top, X ) ==> join( 
% 124.34/124.70    zero, meet( top, X ) ) }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111750) {G5,W5,D4,L1,V1,M1}  { complement( complement( X ) ) ==> 
% 124.34/124.70    X }.
% 124.34/124.70  parent0[0]: (1345) {G12,W7,D4,L1,V1,M1} P(1333,45) { meet( top, X ) ==> 
% 124.34/124.70    complement( complement( X ) ) }.
% 124.34/124.70  parent1[0; 1]: (111749) {G4,W5,D3,L1,V1,M1}  { meet( top, X ) ==> X }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  substitution1:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  subsumption: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.34/124.70    complement( complement( X ) ) ==> X }.
% 124.34/124.70  parent0: (111750) {G5,W5,D4,L1,V1,M1}  { complement( complement( X ) ) ==> 
% 124.34/124.70    X }.
% 124.34/124.70  substitution0:
% 124.34/124.70     X := X
% 124.34/124.70  end
% 124.34/124.70  permutation0:
% 124.34/124.70     0 ==> 0
% 124.34/124.70  end
% 124.34/124.70  
% 124.34/124.70  paramod: (111754) {G2,W11,D4,L1,V2,M1}  { join( join( zero, X ), complement
% 124.34/124.70    ( Y ) ) = join( complement( Y ), X ) }.
% 124.34/124.70  parent0[0]: (1333) {G11,W7,D4,L1,V1,M1} P(1308,639) { join( zero, 
% 124.34/124.71    complement( X ) ) ==> complement( X ) }.
% 124.34/124.71  parent1[0; 8]: (20) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), 
% 124.34/124.71    X ) = join( join( Z, X ), Y ) }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := Y
% 124.34/124.71  end
% 124.34/124.71  substitution1:
% 124.34/124.71     X := complement( Y )
% 124.34/124.71     Y := X
% 124.34/124.71     Z := zero
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  subsumption: (1349) {G12,W11,D4,L1,V2,M1} P(1333,20) { join( join( zero, Y
% 124.34/124.71     ), complement( X ) ) ==> join( complement( X ), Y ) }.
% 124.34/124.71  parent0: (111754) {G2,W11,D4,L1,V2,M1}  { join( join( zero, X ), complement
% 124.34/124.71    ( Y ) ) = join( complement( Y ), X ) }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := Y
% 124.34/124.71     Y := X
% 124.34/124.71  end
% 124.34/124.71  permutation0:
% 124.34/124.71     0 ==> 0
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  eqswap: (111755) {G12,W5,D3,L1,V1,M1}  { X ==> meet( X, X ) }.
% 124.34/124.71  parent0[0]: (1340) {G12,W5,D3,L1,V1,M1} P(1299,1333);d(414) { meet( X, X ) 
% 124.34/124.71    ==> X }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  paramod: (111759) {G2,W17,D7,L1,V2,M1}  { join( complement( X ), complement
% 124.34/124.71    ( Y ) ) ==> complement( join( complement( join( complement( X ), 
% 124.34/124.71    complement( Y ) ) ), meet( X, Y ) ) ) }.
% 124.34/124.71  parent0[0]: (39) {G1,W15,D5,L1,V3,M1} P(3,3) { meet( Z, join( complement( X
% 124.34/124.71     ), complement( Y ) ) ) ==> complement( join( complement( Z ), meet( X, Y
% 124.34/124.71     ) ) ) }.
% 124.34/124.71  parent1[0; 6]: (111755) {G12,W5,D3,L1,V1,M1}  { X ==> meet( X, X ) }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71     Y := Y
% 124.34/124.71     Z := join( complement( X ), complement( Y ) )
% 124.34/124.71  end
% 124.34/124.71  substitution1:
% 124.34/124.71     X := join( complement( X ), complement( Y ) )
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  paramod: (111760) {G1,W14,D5,L1,V2,M1}  { join( complement( X ), complement
% 124.34/124.71    ( Y ) ) ==> complement( join( meet( X, Y ), meet( X, Y ) ) ) }.
% 124.34/124.71  parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 124.34/124.71    , complement( Y ) ) ) ==> meet( X, Y ) }.
% 124.34/124.71  parent1[0; 8]: (111759) {G2,W17,D7,L1,V2,M1}  { join( complement( X ), 
% 124.34/124.71    complement( Y ) ) ==> complement( join( complement( join( complement( X )
% 124.34/124.71    , complement( Y ) ) ), meet( X, Y ) ) ) }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71     Y := Y
% 124.34/124.71  end
% 124.34/124.71  substitution1:
% 124.34/124.71     X := X
% 124.34/124.71     Y := Y
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  paramod: (111761) {G2,W10,D4,L1,V2,M1}  { join( complement( X ), complement
% 124.34/124.71    ( Y ) ) ==> complement( meet( X, Y ) ) }.
% 124.34/124.71  parent0[0]: (1300) {G6,W11,D4,L1,V2,M1} P(3,1285) { join( meet( X, Y ), 
% 124.34/124.71    meet( X, Y ) ) ==> meet( X, Y ) }.
% 124.34/124.71  parent1[0; 7]: (111760) {G1,W14,D5,L1,V2,M1}  { join( complement( X ), 
% 124.34/124.71    complement( Y ) ) ==> complement( join( meet( X, Y ), meet( X, Y ) ) )
% 124.34/124.71     }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71     Y := Y
% 124.34/124.71  end
% 124.34/124.71  substitution1:
% 124.34/124.71     X := X
% 124.34/124.71     Y := Y
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  subsumption: (1353) {G13,W10,D4,L1,V2,M1} P(1340,39);d(3);d(1300) { join( 
% 124.34/124.71    complement( X ), complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 124.34/124.71  parent0: (111761) {G2,W10,D4,L1,V2,M1}  { join( complement( X ), complement
% 124.34/124.71    ( Y ) ) ==> complement( meet( X, Y ) ) }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71     Y := Y
% 124.34/124.71  end
% 124.34/124.71  permutation0:
% 124.34/124.71     0 ==> 0
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  eqswap: (111764) {G2,W7,D4,L1,V1,M1}  { X ==> join( zero, meet( X, X ) )
% 124.34/124.71     }.
% 124.34/124.71  parent0[0]: (414) {G2,W7,D4,L1,V1,M1} P(12,29);d(3) { join( zero, meet( X, 
% 124.34/124.71    X ) ) ==> X }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  paramod: (111765) {G3,W5,D3,L1,V1,M1}  { X ==> join( zero, X ) }.
% 124.34/124.71  parent0[0]: (1340) {G12,W5,D3,L1,V1,M1} P(1299,1333);d(414) { meet( X, X ) 
% 124.34/124.71    ==> X }.
% 124.34/124.71  parent1[0; 4]: (111764) {G2,W7,D4,L1,V1,M1}  { X ==> join( zero, meet( X, X
% 124.34/124.71     ) ) }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  substitution1:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  eqswap: (111766) {G3,W5,D3,L1,V1,M1}  { join( zero, X ) ==> X }.
% 124.34/124.71  parent0[0]: (111765) {G3,W5,D3,L1,V1,M1}  { X ==> join( zero, X ) }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  subsumption: (1354) {G13,W5,D3,L1,V1,M1} P(1340,414) { join( zero, X ) ==> 
% 124.34/124.71    X }.
% 124.34/124.71  parent0: (111766) {G3,W5,D3,L1,V1,M1}  { join( zero, X ) ==> X }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  permutation0:
% 124.34/124.71     0 ==> 0
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  eqswap: (111768) {G2,W7,D4,L1,V1,M1}  { X ==> join( meet( X, X ), zero )
% 124.34/124.71     }.
% 124.34/124.71  parent0[0]: (409) {G2,W7,D4,L1,V1,M1} P(18,29);d(44) { join( meet( X, X ), 
% 124.34/124.71    zero ) ==> X }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  paramod: (111769) {G3,W5,D3,L1,V1,M1}  { X ==> join( X, zero ) }.
% 124.34/124.71  parent0[0]: (1340) {G12,W5,D3,L1,V1,M1} P(1299,1333);d(414) { meet( X, X ) 
% 124.34/124.71    ==> X }.
% 124.34/124.71  parent1[0; 3]: (111768) {G2,W7,D4,L1,V1,M1}  { X ==> join( meet( X, X ), 
% 124.34/124.71    zero ) }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  substitution1:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  eqswap: (111770) {G3,W5,D3,L1,V1,M1}  { join( X, zero ) ==> X }.
% 124.34/124.71  parent0[0]: (111769) {G3,W5,D3,L1,V1,M1}  { X ==> join( X, zero ) }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  subsumption: (1355) {G13,W5,D3,L1,V1,M1} P(1340,409) { join( X, zero ) ==> 
% 124.34/124.71    X }.
% 124.34/124.71  parent0: (111770) {G3,W5,D3,L1,V1,M1}  { join( X, zero ) ==> X }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  permutation0:
% 124.34/124.71     0 ==> 0
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  eqswap: (111772) {G1,W10,D5,L1,V2,M1}  { join( X, converse( Y ) ) ==> 
% 124.34/124.71    converse( join( converse( X ), Y ) ) }.
% 124.34/124.71  parent0[0]: (64) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 124.34/124.71     ), Y ) ) ==> join( X, converse( Y ) ) }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71     Y := Y
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  paramod: (111774) {G2,W8,D4,L1,V1,M1}  { join( X, converse( zero ) ) ==> 
% 124.34/124.71    converse( converse( X ) ) }.
% 124.34/124.71  parent0[0]: (1355) {G13,W5,D3,L1,V1,M1} P(1340,409) { join( X, zero ) ==> X
% 124.34/124.71     }.
% 124.34/124.71  parent1[0; 6]: (111772) {G1,W10,D5,L1,V2,M1}  { join( X, converse( Y ) ) 
% 124.34/124.71    ==> converse( join( converse( X ), Y ) ) }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := converse( X )
% 124.34/124.71  end
% 124.34/124.71  substitution1:
% 124.34/124.71     X := X
% 124.34/124.71     Y := zero
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  paramod: (111775) {G1,W6,D4,L1,V1,M1}  { join( X, converse( zero ) ) ==> X
% 124.34/124.71     }.
% 124.34/124.71  parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 124.34/124.71  parent1[0; 5]: (111774) {G2,W8,D4,L1,V1,M1}  { join( X, converse( zero ) ) 
% 124.34/124.71    ==> converse( converse( X ) ) }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  substitution1:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  subsumption: (1361) {G14,W6,D4,L1,V1,M1} P(1355,64);d(7) { join( X, 
% 124.34/124.71    converse( zero ) ) ==> X }.
% 124.34/124.71  parent0: (111775) {G1,W6,D4,L1,V1,M1}  { join( X, converse( zero ) ) ==> X
% 124.34/124.71     }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  permutation0:
% 124.34/124.71     0 ==> 0
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  eqswap: (111778) {G5,W8,D4,L1,V1,M1}  { complement( X ) ==> join( 
% 124.34/124.71    complement( X ), complement( X ) ) }.
% 124.34/124.71  parent0[0]: (1285) {G5,W8,D4,L1,V1,M1} P(1278,10);d(1268) { join( 
% 124.34/124.71    complement( X ), complement( X ) ) ==> complement( X ) }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  paramod: (111781) {G6,W9,D5,L1,V1,M1}  { complement( complement( X ) ) ==> 
% 124.34/124.71    join( complement( complement( X ) ), X ) }.
% 124.34/124.71  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.34/124.71    complement( complement( X ) ) ==> X }.
% 124.34/124.71  parent1[0; 8]: (111778) {G5,W8,D4,L1,V1,M1}  { complement( X ) ==> join( 
% 124.34/124.71    complement( X ), complement( X ) ) }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  substitution1:
% 124.34/124.71     X := complement( X )
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  paramod: (111783) {G7,W7,D4,L1,V1,M1}  { complement( complement( X ) ) ==> 
% 124.34/124.71    join( X, X ) }.
% 124.34/124.71  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.34/124.71    complement( complement( X ) ) ==> X }.
% 124.34/124.71  parent1[0; 5]: (111781) {G6,W9,D5,L1,V1,M1}  { complement( complement( X )
% 124.34/124.71     ) ==> join( complement( complement( X ) ), X ) }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  substitution1:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  paramod: (111784) {G8,W5,D3,L1,V1,M1}  { X ==> join( X, X ) }.
% 124.34/124.71  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.34/124.71    complement( complement( X ) ) ==> X }.
% 124.34/124.71  parent1[0; 1]: (111783) {G7,W7,D4,L1,V1,M1}  { complement( complement( X )
% 124.34/124.71     ) ==> join( X, X ) }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  substitution1:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  eqswap: (111790) {G8,W5,D3,L1,V1,M1}  { join( X, X ) ==> X }.
% 124.34/124.71  parent0[0]: (111784) {G8,W5,D3,L1,V1,M1}  { X ==> join( X, X ) }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  subsumption: (1368) {G14,W5,D3,L1,V1,M1} P(1346,1285) { join( X, X ) ==> X
% 124.34/124.71     }.
% 124.34/124.71  parent0: (111790) {G8,W5,D3,L1,V1,M1}  { join( X, X ) ==> X }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := X
% 124.34/124.71  end
% 124.34/124.71  permutation0:
% 124.34/124.71     0 ==> 0
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  eqswap: (111794) {G1,W15,D5,L1,V3,M1}  { complement( join( complement( X )
% 124.34/124.71    , meet( Y, Z ) ) ) ==> meet( X, join( complement( Y ), complement( Z ) )
% 124.34/124.71     ) }.
% 124.34/124.71  parent0[0]: (39) {G1,W15,D5,L1,V3,M1} P(3,3) { meet( Z, join( complement( X
% 124.34/124.71     ), complement( Y ) ) ) ==> complement( join( complement( Z ), meet( X, Y
% 124.34/124.71     ) ) ) }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := Y
% 124.34/124.71     Y := Z
% 124.34/124.71     Z := X
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  paramod: (111796) {G2,W15,D6,L1,V3,M1}  { complement( join( complement( X )
% 124.34/124.71    , meet( complement( Y ), Z ) ) ) ==> meet( X, join( Y, complement( Z ) )
% 124.34/124.71     ) }.
% 124.34/124.71  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.34/124.71    complement( complement( X ) ) ==> X }.
% 124.34/124.71  parent1[0; 12]: (111794) {G1,W15,D5,L1,V3,M1}  { complement( join( 
% 124.34/124.71    complement( X ), meet( Y, Z ) ) ) ==> meet( X, join( complement( Y ), 
% 124.34/124.71    complement( Z ) ) ) }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := Y
% 124.34/124.71  end
% 124.34/124.71  substitution1:
% 124.34/124.71     X := X
% 124.34/124.71     Y := complement( Y )
% 124.34/124.71     Z := Z
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  subsumption: (1373) {G14,W15,D6,L1,V3,M1} P(1346,39) { complement( join( 
% 124.34/124.71    complement( Y ), meet( complement( X ), Z ) ) ) ==> meet( Y, join( X, 
% 124.34/124.71    complement( Z ) ) ) }.
% 124.34/124.71  parent0: (111796) {G2,W15,D6,L1,V3,M1}  { complement( join( complement( X )
% 124.34/124.71    , meet( complement( Y ), Z ) ) ) ==> meet( X, join( Y, complement( Z ) )
% 124.34/124.71     ) }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := Y
% 124.34/124.71     Y := X
% 124.34/124.71     Z := Z
% 124.34/124.71  end
% 124.34/124.71  permutation0:
% 124.34/124.71     0 ==> 0
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  eqswap: (111802) {G1,W15,D5,L1,V3,M1}  { complement( join( complement( X )
% 124.34/124.71    , meet( Y, Z ) ) ) ==> meet( X, join( complement( Y ), complement( Z ) )
% 124.34/124.71     ) }.
% 124.34/124.71  parent0[0]: (39) {G1,W15,D5,L1,V3,M1} P(3,3) { meet( Z, join( complement( X
% 124.34/124.71     ), complement( Y ) ) ) ==> complement( join( complement( Z ), meet( X, Y
% 124.34/124.71     ) ) ) }.
% 124.34/124.71  substitution0:
% 124.34/124.71     X := Y
% 124.34/124.71     Y := Z
% 124.34/124.71     Z := X
% 124.34/124.71  end
% 124.34/124.71  
% 124.34/124.71  paramod: (111805) {G2,W15,D6,L1,V3,M1}  { complement( join( complement( X )
% 124.36/124.71    , meet( Y, complement( Z ) ) ) ) ==> meet( X, join( complement( Y ), Z )
% 124.36/124.71     ) }.
% 124.36/124.71  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.71    complement( complement( X ) ) ==> X }.
% 124.36/124.71  parent1[0; 14]: (111802) {G1,W15,D5,L1,V3,M1}  { complement( join( 
% 124.36/124.71    complement( X ), meet( Y, Z ) ) ) ==> meet( X, join( complement( Y ), 
% 124.36/124.71    complement( Z ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Z
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := complement( Z )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1374) {G14,W15,D6,L1,V3,M1} P(1346,39) { complement( join( 
% 124.36/124.71    complement( Y ), meet( Z, complement( X ) ) ) ) ==> meet( Y, join( 
% 124.36/124.71    complement( Z ), X ) ) }.
% 124.36/124.71  parent0: (111805) {G2,W15,D6,L1,V3,M1}  { complement( join( complement( X )
% 124.36/124.71    , meet( Y, complement( Z ) ) ) ) ==> meet( X, join( complement( Y ), Z )
% 124.36/124.71     ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := Z
% 124.36/124.71     Z := X
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111810) {G1,W15,D5,L1,V3,M1}  { complement( join( meet( X, Y ), 
% 124.36/124.71    complement( Z ) ) ) ==> meet( join( complement( X ), complement( Y ) ), Z
% 124.36/124.71     ) }.
% 124.36/124.71  parent0[0]: (38) {G1,W15,D5,L1,V3,M1} P(3,3) { meet( join( complement( X )
% 124.36/124.71    , complement( Y ) ), Z ) ==> complement( join( meet( X, Y ), complement( 
% 124.36/124.71    Z ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111812) {G2,W15,D6,L1,V3,M1}  { complement( join( meet( 
% 124.36/124.71    complement( X ), Y ), complement( Z ) ) ) ==> meet( join( X, complement( 
% 124.36/124.71    Y ) ), Z ) }.
% 124.36/124.71  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.71    complement( complement( X ) ) ==> X }.
% 124.36/124.71  parent1[0; 11]: (111810) {G1,W15,D5,L1,V3,M1}  { complement( join( meet( X
% 124.36/124.71    , Y ), complement( Z ) ) ) ==> meet( join( complement( X ), complement( Y
% 124.36/124.71     ) ), Z ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := complement( X )
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1375) {G14,W15,D6,L1,V3,M1} P(1346,38) { complement( join( 
% 124.36/124.71    meet( complement( X ), Y ), complement( Z ) ) ) ==> meet( join( X, 
% 124.36/124.71    complement( Y ) ), Z ) }.
% 124.36/124.71  parent0: (111812) {G2,W15,D6,L1,V3,M1}  { complement( join( meet( 
% 124.36/124.71    complement( X ), Y ), complement( Z ) ) ) ==> meet( join( X, complement( 
% 124.36/124.71    Y ) ), Z ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111818) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> complement( join
% 124.36/124.71    ( complement( X ), complement( Y ) ) ) }.
% 124.36/124.71  parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 124.36/124.71    , complement( Y ) ) ) ==> meet( X, Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111821) {G1,W10,D5,L1,V2,M1}  { meet( complement( X ), Y ) ==> 
% 124.36/124.71    complement( join( X, complement( Y ) ) ) }.
% 124.36/124.71  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.71    complement( complement( X ) ) ==> X }.
% 124.36/124.71  parent1[0; 7]: (111818) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> complement
% 124.36/124.71    ( join( complement( X ), complement( Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := complement( X )
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111823) {G1,W10,D5,L1,V2,M1}  { complement( join( X, complement( Y
% 124.36/124.71     ) ) ) ==> meet( complement( X ), Y ) }.
% 124.36/124.71  parent0[0]: (111821) {G1,W10,D5,L1,V2,M1}  { meet( complement( X ), Y ) ==>
% 124.36/124.71     complement( join( X, complement( Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1379) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( X, 
% 124.36/124.71    complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 124.36/124.71  parent0: (111823) {G1,W10,D5,L1,V2,M1}  { complement( join( X, complement( 
% 124.36/124.71    Y ) ) ) ==> meet( complement( X ), Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111826) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> complement( join
% 124.36/124.71    ( complement( X ), complement( Y ) ) ) }.
% 124.36/124.71  parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 124.36/124.71    , complement( Y ) ) ) ==> meet( X, Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111830) {G1,W10,D5,L1,V2,M1}  { meet( X, complement( Y ) ) ==> 
% 124.36/124.71    complement( join( complement( X ), Y ) ) }.
% 124.36/124.71  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.71    complement( complement( X ) ) ==> X }.
% 124.36/124.71  parent1[0; 9]: (111826) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> complement
% 124.36/124.71    ( join( complement( X ), complement( Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := complement( Y )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111832) {G1,W10,D5,L1,V2,M1}  { complement( join( complement( X )
% 124.36/124.71    , Y ) ) ==> meet( X, complement( Y ) ) }.
% 124.36/124.71  parent0[0]: (111830) {G1,W10,D5,L1,V2,M1}  { meet( X, complement( Y ) ) ==>
% 124.36/124.71     complement( join( complement( X ), Y ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1380) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( 
% 124.36/124.71    complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 124.36/124.71  parent0: (111832) {G1,W10,D5,L1,V2,M1}  { complement( join( complement( X )
% 124.36/124.71    , Y ) ) ==> meet( X, complement( Y ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111833) {G14,W5,D3,L1,V1,M1}  { X ==> join( X, X ) }.
% 124.36/124.71  parent0[0]: (1368) {G14,W5,D3,L1,V1,M1} P(1346,1285) { join( X, X ) ==> X
% 124.36/124.71     }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111836) {G2,W11,D5,L1,V2,M1}  { join( X, Y ) ==> join( join( X, 
% 124.36/124.71    join( X, Y ) ), Y ) }.
% 124.36/124.71  parent0[0]: (20) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X )
% 124.36/124.71     = join( join( Z, X ), Y ) }.
% 124.36/124.71  parent1[0; 4]: (111833) {G14,W5,D3,L1,V1,M1}  { X ==> join( X, X ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := join( X, Y )
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := join( X, Y )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111838) {G1,W11,D5,L1,V2,M1}  { join( X, Y ) ==> join( join( join
% 124.36/124.71    ( X, X ), Y ), Y ) }.
% 124.36/124.71  parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( 
% 124.36/124.71    join( X, Y ), Z ) }.
% 124.36/124.71  parent1[0; 5]: (111836) {G2,W11,D5,L1,V2,M1}  { join( X, Y ) ==> join( join
% 124.36/124.71    ( X, join( X, Y ) ), Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := X
% 124.36/124.71     Z := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111839) {G2,W9,D4,L1,V2,M1}  { join( X, Y ) ==> join( join( X, Y
% 124.36/124.71     ), Y ) }.
% 124.36/124.71  parent0[0]: (1368) {G14,W5,D3,L1,V1,M1} P(1346,1285) { join( X, X ) ==> X
% 124.36/124.71     }.
% 124.36/124.71  parent1[0; 6]: (111838) {G1,W11,D5,L1,V2,M1}  { join( X, Y ) ==> join( join
% 124.36/124.71    ( join( X, X ), Y ), Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111840) {G2,W9,D4,L1,V2,M1}  { join( join( X, Y ), Y ) ==> join( X
% 124.36/124.71    , Y ) }.
% 124.36/124.71  parent0[0]: (111839) {G2,W9,D4,L1,V2,M1}  { join( X, Y ) ==> join( join( X
% 124.36/124.71    , Y ), Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1388) {G15,W9,D4,L1,V2,M1} P(1368,20);d(1);d(1368) { join( 
% 124.36/124.71    join( X, Y ), Y ) ==> join( X, Y ) }.
% 124.36/124.71  parent0: (111840) {G2,W9,D4,L1,V2,M1}  { join( join( X, Y ), Y ) ==> join( 
% 124.36/124.71    X, Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111841) {G14,W6,D4,L1,V1,M1}  { X ==> join( X, converse( zero ) )
% 124.36/124.71     }.
% 124.36/124.71  parent0[0]: (1361) {G14,W6,D4,L1,V1,M1} P(1355,64);d(7) { join( X, converse
% 124.36/124.71    ( zero ) ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111843) {G14,W4,D3,L1,V0,M1}  { zero ==> converse( zero ) }.
% 124.36/124.71  parent0[0]: (1354) {G13,W5,D3,L1,V1,M1} P(1340,414) { join( zero, X ) ==> X
% 124.36/124.71     }.
% 124.36/124.71  parent1[0; 2]: (111841) {G14,W6,D4,L1,V1,M1}  { X ==> join( X, converse( 
% 124.36/124.71    zero ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := converse( zero )
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := zero
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111844) {G14,W4,D3,L1,V0,M1}  { converse( zero ) ==> zero }.
% 124.36/124.71  parent0[0]: (111843) {G14,W4,D3,L1,V0,M1}  { zero ==> converse( zero ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1391) {G15,W4,D3,L1,V0,M1} P(1361,1354) { converse( zero ) 
% 124.36/124.71    ==> zero }.
% 124.36/124.71  parent0: (111844) {G14,W4,D3,L1,V0,M1}  { converse( zero ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111847) {G13,W5,D3,L1,V1,M1}  { meet( top, X ) ==> X }.
% 124.36/124.71  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.71    complement( complement( X ) ) ==> X }.
% 124.36/124.71  parent1[0; 4]: (1345) {G12,W7,D4,L1,V1,M1} P(1333,45) { meet( top, X ) ==> 
% 124.36/124.71    complement( complement( X ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1397) {G14,W5,D3,L1,V1,M1} S(1345);d(1346) { meet( top, X ) 
% 124.36/124.71    ==> X }.
% 124.36/124.71  parent0: (111847) {G13,W5,D3,L1,V1,M1}  { meet( top, X ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111850) {G2,W9,D4,L1,V1,M1}  { join( X, one ) ==> join( join( X, 
% 124.36/124.71    skol1 ), one ) }.
% 124.36/124.71  parent0[0]: (31) {G2,W9,D4,L1,V1,M1} P(30,1) { join( join( X, skol1 ), one
% 124.36/124.71     ) ==> join( X, one ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111854) {G3,W10,D6,L1,V0,M1}  { join( converse( complement( 
% 124.36/124.71    converse( skol1 ) ) ), one ) ==> join( top, one ) }.
% 124.36/124.71  parent0[0]: (774) {G11,W8,D6,L1,V1,M1} P(18,65);d(752) { join( converse( 
% 124.36/124.71    complement( converse( X ) ) ), X ) ==> top }.
% 124.36/124.71  parent1[0; 8]: (111850) {G2,W9,D4,L1,V1,M1}  { join( X, one ) ==> join( 
% 124.36/124.71    join( X, skol1 ), one ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := skol1
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := converse( complement( converse( skol1 ) ) )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111855) {G4,W8,D6,L1,V0,M1}  { join( converse( complement( 
% 124.36/124.71    converse( skol1 ) ) ), one ) ==> top }.
% 124.36/124.71  parent0[0]: (562) {G6,W5,D3,L1,V1,M1} P(542,0);d(389) { join( top, Y ) ==> 
% 124.36/124.71    top }.
% 124.36/124.71  parent1[0; 7]: (111854) {G3,W10,D6,L1,V0,M1}  { join( converse( complement
% 124.36/124.71    ( converse( skol1 ) ) ), one ) ==> join( top, one ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := one
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111856) {G5,W8,D6,L1,V0,M1}  { converse( join( complement( 
% 124.36/124.71    converse( skol1 ) ), one ) ) ==> top }.
% 124.36/124.71  parent0[0]: (1279) {G4,W9,D4,L1,V1,M1} P(1276,65) { join( converse( X ), 
% 124.36/124.71    one ) ==> converse( join( X, one ) ) }.
% 124.36/124.71  parent1[0; 1]: (111855) {G4,W8,D6,L1,V0,M1}  { join( converse( complement( 
% 124.36/124.71    converse( skol1 ) ) ), one ) ==> top }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := complement( converse( skol1 ) )
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1412) {G12,W8,D6,L1,V0,M1} P(774,31);d(562);d(1279) { 
% 124.36/124.71    converse( join( complement( converse( skol1 ) ), one ) ) ==> top }.
% 124.36/124.71  parent0: (111856) {G5,W8,D6,L1,V0,M1}  { converse( join( complement( 
% 124.36/124.71    converse( skol1 ) ), one ) ) ==> top }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111860) {G3,W9,D5,L1,V1,M1}  { composition( converse( X ), 
% 124.36/124.71    complement( composition( X, top ) ) ) ==> zero }.
% 124.36/124.71  parent0[0]: (1355) {G13,W5,D3,L1,V1,M1} P(1340,409) { join( X, zero ) ==> X
% 124.36/124.71     }.
% 124.36/124.71  parent1[0; 1]: (95) {G2,W11,D6,L1,V1,M1} P(44,10) { join( composition( 
% 124.36/124.71    converse( X ), complement( composition( X, top ) ) ), zero ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := composition( converse( X ), complement( composition( X, top ) ) )
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1427) {G14,W9,D5,L1,V1,M1} S(95);d(1355) { composition( 
% 124.36/124.71    converse( X ), complement( composition( X, top ) ) ) ==> zero }.
% 124.36/124.71  parent0: (111860) {G3,W9,D5,L1,V1,M1}  { composition( converse( X ), 
% 124.36/124.71    complement( composition( X, top ) ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111863) {G11,W8,D6,L1,V1,M1}  { top ==> join( converse( complement
% 124.36/124.71    ( converse( X ) ) ), X ) }.
% 124.36/124.71  parent0[0]: (774) {G11,W8,D6,L1,V1,M1} P(18,65);d(752) { join( converse( 
% 124.36/124.71    complement( converse( X ) ) ), X ) ==> top }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111868) {G12,W11,D6,L1,V0,M1}  { top ==> join( converse( 
% 124.36/124.71    complement( top ) ), join( complement( converse( skol1 ) ), one ) ) }.
% 124.36/124.71  parent0[0]: (1412) {G12,W8,D6,L1,V0,M1} P(774,31);d(562);d(1279) { converse
% 124.36/124.71    ( join( complement( converse( skol1 ) ), one ) ) ==> top }.
% 124.36/124.71  parent1[0; 5]: (111863) {G11,W8,D6,L1,V1,M1}  { top ==> join( converse( 
% 124.36/124.71    complement( converse( X ) ) ), X ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := join( complement( converse( skol1 ) ), one )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111869) {G1,W11,D6,L1,V0,M1}  { top ==> join( join( converse( 
% 124.36/124.71    complement( top ) ), complement( converse( skol1 ) ) ), one ) }.
% 124.36/124.71  parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( 
% 124.36/124.71    join( X, Y ), Z ) }.
% 124.36/124.71  parent1[0; 2]: (111868) {G12,W11,D6,L1,V0,M1}  { top ==> join( converse( 
% 124.36/124.71    complement( top ) ), join( complement( converse( skol1 ) ), one ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := converse( complement( top ) )
% 124.36/124.71     Y := complement( converse( skol1 ) )
% 124.36/124.71     Z := one
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111870) {G2,W10,D6,L1,V0,M1}  { top ==> join( join( converse( 
% 124.36/124.71    zero ), complement( converse( skol1 ) ) ), one ) }.
% 124.36/124.71  parent0[0]: (44) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==> 
% 124.36/124.71    zero }.
% 124.36/124.71  parent1[0; 5]: (111869) {G1,W11,D6,L1,V0,M1}  { top ==> join( join( 
% 124.36/124.71    converse( complement( top ) ), complement( converse( skol1 ) ) ), one )
% 124.36/124.71     }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111871) {G3,W9,D6,L1,V0,M1}  { top ==> join( join( zero, 
% 124.36/124.71    complement( converse( skol1 ) ) ), one ) }.
% 124.36/124.71  parent0[0]: (1391) {G15,W4,D3,L1,V0,M1} P(1361,1354) { converse( zero ) ==>
% 124.36/124.71     zero }.
% 124.36/124.71  parent1[0; 4]: (111870) {G2,W10,D6,L1,V0,M1}  { top ==> join( join( 
% 124.36/124.71    converse( zero ), complement( converse( skol1 ) ) ), one ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111872) {G4,W7,D5,L1,V0,M1}  { top ==> join( complement( converse
% 124.36/124.71    ( skol1 ) ), one ) }.
% 124.36/124.71  parent0[0]: (1333) {G11,W7,D4,L1,V1,M1} P(1308,639) { join( zero, 
% 124.36/124.71    complement( X ) ) ==> complement( X ) }.
% 124.36/124.71  parent1[0; 3]: (111871) {G3,W9,D6,L1,V0,M1}  { top ==> join( join( zero, 
% 124.36/124.71    complement( converse( skol1 ) ) ), one ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := converse( skol1 )
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111873) {G4,W7,D5,L1,V0,M1}  { join( complement( converse( skol1 )
% 124.36/124.71     ), one ) ==> top }.
% 124.36/124.71  parent0[0]: (111872) {G4,W7,D5,L1,V0,M1}  { top ==> join( complement( 
% 124.36/124.71    converse( skol1 ) ), one ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1428) {G16,W7,D5,L1,V0,M1} P(1412,774);d(1);d(44);d(1391);d(
% 124.36/124.71    1333) { join( complement( converse( skol1 ) ), one ) ==> top }.
% 124.36/124.71  parent0: (111873) {G4,W7,D5,L1,V0,M1}  { join( complement( converse( skol1
% 124.36/124.71     ) ), one ) ==> top }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111875) {G1,W11,D6,L1,V2,M1}  { X ==> join( meet( X, Y ), 
% 124.36/124.71    complement( join( complement( X ), Y ) ) ) }.
% 124.36/124.71  parent0[0]: (29) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ), 
% 124.36/124.71    complement( join( complement( X ), Y ) ) ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111878) {G2,W10,D5,L1,V0,M1}  { converse( skol1 ) ==> join( meet
% 124.36/124.71    ( converse( skol1 ), one ), complement( top ) ) }.
% 124.36/124.71  parent0[0]: (1428) {G16,W7,D5,L1,V0,M1} P(1412,774);d(1);d(44);d(1391);d(
% 124.36/124.71    1333) { join( complement( converse( skol1 ) ), one ) ==> top }.
% 124.36/124.71  parent1[0; 9]: (111875) {G1,W11,D6,L1,V2,M1}  { X ==> join( meet( X, Y ), 
% 124.36/124.71    complement( join( complement( X ), Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := converse( skol1 )
% 124.36/124.71     Y := one
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111879) {G2,W9,D5,L1,V0,M1}  { converse( skol1 ) ==> join( meet( 
% 124.36/124.71    converse( skol1 ), one ), zero ) }.
% 124.36/124.71  parent0[0]: (44) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==> 
% 124.36/124.71    zero }.
% 124.36/124.71  parent1[0; 8]: (111878) {G2,W10,D5,L1,V0,M1}  { converse( skol1 ) ==> join
% 124.36/124.71    ( meet( converse( skol1 ), one ), complement( top ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111880) {G3,W7,D4,L1,V0,M1}  { converse( skol1 ) ==> meet( 
% 124.36/124.71    converse( skol1 ), one ) }.
% 124.36/124.71  parent0[0]: (1355) {G13,W5,D3,L1,V1,M1} P(1340,409) { join( X, zero ) ==> X
% 124.36/124.71     }.
% 124.36/124.71  parent1[0; 3]: (111879) {G2,W9,D5,L1,V0,M1}  { converse( skol1 ) ==> join( 
% 124.36/124.71    meet( converse( skol1 ), one ), zero ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := meet( converse( skol1 ), one )
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111881) {G3,W7,D4,L1,V0,M1}  { meet( converse( skol1 ), one ) ==> 
% 124.36/124.71    converse( skol1 ) }.
% 124.36/124.71  parent0[0]: (111880) {G3,W7,D4,L1,V0,M1}  { converse( skol1 ) ==> meet( 
% 124.36/124.71    converse( skol1 ), one ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1446) {G17,W7,D4,L1,V0,M1} P(1428,29);d(44);d(1355) { meet( 
% 124.36/124.71    converse( skol1 ), one ) ==> converse( skol1 ) }.
% 124.36/124.71  parent0: (111881) {G3,W7,D4,L1,V0,M1}  { meet( converse( skol1 ), one ) ==>
% 124.36/124.71     converse( skol1 ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111883) {G1,W13,D6,L1,V2,M1}  { complement( X ) ==> join( 
% 124.36/124.71    complement( X ), composition( converse( Y ), complement( composition( Y, 
% 124.36/124.71    X ) ) ) ) }.
% 124.36/124.71  parent0[0]: (98) {G1,W13,D6,L1,V2,M1} P(10,0) { join( complement( Y ), 
% 124.36/124.71    composition( converse( X ), complement( composition( X, Y ) ) ) ) ==> 
% 124.36/124.71    complement( Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111885) {G2,W14,D7,L1,V2,M1}  { complement( complement( X ) ) ==>
% 124.36/124.71     join( X, composition( converse( Y ), complement( composition( Y, 
% 124.36/124.71    complement( X ) ) ) ) ) }.
% 124.36/124.71  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.71    complement( complement( X ) ) ==> X }.
% 124.36/124.71  parent1[0; 5]: (111883) {G1,W13,D6,L1,V2,M1}  { complement( X ) ==> join( 
% 124.36/124.71    complement( X ), composition( converse( Y ), complement( composition( Y, 
% 124.36/124.71    X ) ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := complement( X )
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111886) {G3,W12,D7,L1,V2,M1}  { X ==> join( X, composition( 
% 124.36/124.71    converse( Y ), complement( composition( Y, complement( X ) ) ) ) ) }.
% 124.36/124.71  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.71    complement( complement( X ) ) ==> X }.
% 124.36/124.71  parent1[0; 1]: (111885) {G2,W14,D7,L1,V2,M1}  { complement( complement( X )
% 124.36/124.71     ) ==> join( X, composition( converse( Y ), complement( composition( Y, 
% 124.36/124.71    complement( X ) ) ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111888) {G3,W12,D7,L1,V2,M1}  { join( X, composition( converse( Y
% 124.36/124.71     ), complement( composition( Y, complement( X ) ) ) ) ) ==> X }.
% 124.36/124.71  parent0[0]: (111886) {G3,W12,D7,L1,V2,M1}  { X ==> join( X, composition( 
% 124.36/124.71    converse( Y ), complement( composition( Y, complement( X ) ) ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1521) {G14,W12,D7,L1,V2,M1} P(1346,98) { join( X, composition
% 124.36/124.71    ( converse( Y ), complement( composition( Y, complement( X ) ) ) ) ) ==> 
% 124.36/124.71    X }.
% 124.36/124.71  parent0: (111888) {G3,W12,D7,L1,V2,M1}  { join( X, composition( converse( Y
% 124.36/124.71     ), complement( composition( Y, complement( X ) ) ) ) ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111891) {G15,W9,D4,L1,V2,M1}  { join( X, Y ) ==> join( join( X, Y
% 124.36/124.71     ), Y ) }.
% 124.36/124.71  parent0[0]: (1388) {G15,W9,D4,L1,V2,M1} P(1368,20);d(1);d(1368) { join( 
% 124.36/124.71    join( X, Y ), Y ) ==> join( X, Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111894) {G2,W17,D6,L1,V2,M1}  { join( meet( X, Y ), complement( 
% 124.36/124.71    join( complement( X ), Y ) ) ) ==> join( X, complement( join( complement
% 124.36/124.71    ( X ), Y ) ) ) }.
% 124.36/124.71  parent0[0]: (29) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ), 
% 124.36/124.71    complement( join( complement( X ), Y ) ) ) ==> X }.
% 124.36/124.71  parent1[0; 11]: (111891) {G15,W9,D4,L1,V2,M1}  { join( X, Y ) ==> join( 
% 124.36/124.71    join( X, Y ), Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := meet( X, Y )
% 124.36/124.71     Y := complement( join( complement( X ), Y ) )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111895) {G2,W9,D6,L1,V2,M1}  { X ==> join( X, complement( join( 
% 124.36/124.71    complement( X ), Y ) ) ) }.
% 124.36/124.71  parent0[0]: (29) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ), 
% 124.36/124.71    complement( join( complement( X ), Y ) ) ) ==> X }.
% 124.36/124.71  parent1[0; 1]: (111894) {G2,W17,D6,L1,V2,M1}  { join( meet( X, Y ), 
% 124.36/124.71    complement( join( complement( X ), Y ) ) ) ==> join( X, complement( join
% 124.36/124.71    ( complement( X ), Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111902) {G3,W8,D5,L1,V2,M1}  { X ==> join( X, meet( X, complement
% 124.36/124.71    ( Y ) ) ) }.
% 124.36/124.71  parent0[0]: (1380) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( 
% 124.36/124.71    complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 124.36/124.71  parent1[0; 4]: (111895) {G2,W9,D6,L1,V2,M1}  { X ==> join( X, complement( 
% 124.36/124.71    join( complement( X ), Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111903) {G3,W8,D5,L1,V2,M1}  { join( X, meet( X, complement( Y ) )
% 124.36/124.71     ) ==> X }.
% 124.36/124.71  parent0[0]: (111902) {G3,W8,D5,L1,V2,M1}  { X ==> join( X, meet( X, 
% 124.36/124.71    complement( Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1591) {G16,W8,D5,L1,V2,M1} P(29,1388);d(1380) { join( X, meet
% 124.36/124.71    ( X, complement( Y ) ) ) ==> X }.
% 124.36/124.71  parent0: (111903) {G3,W8,D5,L1,V2,M1}  { join( X, meet( X, complement( Y )
% 124.36/124.71     ) ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111905) {G16,W8,D5,L1,V2,M1}  { X ==> join( X, meet( X, complement
% 124.36/124.71    ( Y ) ) ) }.
% 124.36/124.71  parent0[0]: (1591) {G16,W8,D5,L1,V2,M1} P(29,1388);d(1380) { join( X, meet
% 124.36/124.71    ( X, complement( Y ) ) ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111906) {G14,W7,D4,L1,V2,M1}  { X ==> join( X, meet( X, Y ) ) }.
% 124.36/124.71  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.71    complement( complement( X ) ) ==> X }.
% 124.36/124.71  parent1[0; 6]: (111905) {G16,W8,D5,L1,V2,M1}  { X ==> join( X, meet( X, 
% 124.36/124.71    complement( Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := complement( Y )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111907) {G14,W7,D4,L1,V2,M1}  { join( X, meet( X, Y ) ) ==> X }.
% 124.36/124.71  parent0[0]: (111906) {G14,W7,D4,L1,V2,M1}  { X ==> join( X, meet( X, Y ) )
% 124.36/124.71     }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1595) {G17,W7,D4,L1,V2,M1} P(1346,1591) { join( Y, meet( Y, X
% 124.36/124.71     ) ) ==> Y }.
% 124.36/124.71  parent0: (111907) {G14,W7,D4,L1,V2,M1}  { join( X, meet( X, Y ) ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111916) {G2,W11,D4,L1,V3,M1}  { join( join( X, Y ), meet( X, Z )
% 124.36/124.71     ) = join( X, Y ) }.
% 124.36/124.71  parent0[0]: (1595) {G17,W7,D4,L1,V2,M1} P(1346,1591) { join( Y, meet( Y, X
% 124.36/124.71     ) ) ==> Y }.
% 124.36/124.71  parent1[0; 9]: (20) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), 
% 124.36/124.71    X ) = join( join( Z, X ), Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Z
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := meet( X, Z )
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1637) {G18,W11,D4,L1,V3,M1} P(1595,20) { join( join( X, Z ), 
% 124.36/124.71    meet( X, Y ) ) ==> join( X, Z ) }.
% 124.36/124.71  parent0: (111916) {G2,W11,D4,L1,V3,M1}  { join( join( X, Y ), meet( X, Z )
% 124.36/124.71     ) = join( X, Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Z
% 124.36/124.71     Z := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111918) {G1,W11,D4,L1,V3,M1}  { join( join( Y, Z ), X ) = join( 
% 124.36/124.71    join( X, Y ), Z ) }.
% 124.36/124.71  parent0[0]: (19) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) = 
% 124.36/124.71    join( join( Y, Z ), X ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111934) {G2,W11,D5,L1,V3,M1}  { join( join( meet( X, Y ), Z ), X
% 124.36/124.71     ) = join( X, Z ) }.
% 124.36/124.71  parent0[0]: (1595) {G17,W7,D4,L1,V2,M1} P(1346,1591) { join( Y, meet( Y, X
% 124.36/124.71     ) ) ==> Y }.
% 124.36/124.71  parent1[0; 9]: (111918) {G1,W11,D4,L1,V3,M1}  { join( join( Y, Z ), X ) = 
% 124.36/124.71    join( join( X, Y ), Z ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := meet( X, Y )
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1639) {G18,W11,D5,L1,V3,M1} P(1595,19) { join( join( meet( X
% 124.36/124.71    , Y ), Z ), X ) ==> join( X, Z ) }.
% 124.36/124.71  parent0: (111934) {G2,W11,D5,L1,V3,M1}  { join( join( meet( X, Y ), Z ), X
% 124.36/124.71     ) = join( X, Z ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111939) {G17,W7,D4,L1,V2,M1}  { X ==> join( X, meet( X, Y ) ) }.
% 124.36/124.71  parent0[0]: (1595) {G17,W7,D4,L1,V2,M1} P(1346,1591) { join( Y, meet( Y, X
% 124.36/124.71     ) ) ==> Y }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111940) {G2,W7,D4,L1,V2,M1}  { X ==> join( X, meet( Y, X ) ) }.
% 124.36/124.71  parent0[0]: (42) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X, 
% 124.36/124.71    Y ) }.
% 124.36/124.71  parent1[0; 4]: (111939) {G17,W7,D4,L1,V2,M1}  { X ==> join( X, meet( X, Y )
% 124.36/124.71     ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111943) {G2,W7,D4,L1,V2,M1}  { join( X, meet( Y, X ) ) ==> X }.
% 124.36/124.71  parent0[0]: (111940) {G2,W7,D4,L1,V2,M1}  { X ==> join( X, meet( Y, X ) )
% 124.36/124.71     }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1643) {G18,W7,D4,L1,V2,M1} P(42,1595) { join( X, meet( Y, X )
% 124.36/124.71     ) ==> X }.
% 124.36/124.71  parent0: (111943) {G2,W7,D4,L1,V2,M1}  { join( X, meet( Y, X ) ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111945) {G9,W8,D4,L1,V2,M1}  { top ==> join( join( X, Y ), 
% 124.36/124.71    complement( Y ) ) }.
% 124.36/124.71  parent0[0]: (1020) {G9,W8,D4,L1,V2,M1} S(21);d(575) { join( join( Y, X ), 
% 124.36/124.71    complement( X ) ) ==> top }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111946) {G10,W8,D5,L1,V2,M1}  { top ==> join( X, complement( meet
% 124.36/124.71    ( Y, X ) ) ) }.
% 124.36/124.71  parent0[0]: (1643) {G18,W7,D4,L1,V2,M1} P(42,1595) { join( X, meet( Y, X )
% 124.36/124.71     ) ==> X }.
% 124.36/124.71  parent1[0; 3]: (111945) {G9,W8,D4,L1,V2,M1}  { top ==> join( join( X, Y ), 
% 124.36/124.71    complement( Y ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := meet( Y, X )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111947) {G10,W8,D5,L1,V2,M1}  { join( X, complement( meet( Y, X )
% 124.36/124.71     ) ) ==> top }.
% 124.36/124.71  parent0[0]: (111946) {G10,W8,D5,L1,V2,M1}  { top ==> join( X, complement( 
% 124.36/124.71    meet( Y, X ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1646) {G19,W8,D5,L1,V2,M1} P(1643,1020) { join( X, complement
% 124.36/124.71    ( meet( Y, X ) ) ) ==> top }.
% 124.36/124.71  parent0: (111947) {G10,W8,D5,L1,V2,M1}  { join( X, complement( meet( Y, X )
% 124.36/124.71     ) ) ==> top }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111949) {G1,W11,D4,L1,V3,M1}  { join( join( Y, Z ), X ) = join( 
% 124.36/124.71    join( X, Y ), Z ) }.
% 124.36/124.71  parent0[0]: (19) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) = 
% 124.36/124.71    join( join( Y, Z ), X ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111965) {G2,W11,D5,L1,V3,M1}  { join( join( meet( X, Y ), Z ), Y
% 124.36/124.71     ) = join( Y, Z ) }.
% 124.36/124.71  parent0[0]: (1643) {G18,W7,D4,L1,V2,M1} P(42,1595) { join( X, meet( Y, X )
% 124.36/124.71     ) ==> X }.
% 124.36/124.71  parent1[0; 9]: (111949) {G1,W11,D4,L1,V3,M1}  { join( join( Y, Z ), X ) = 
% 124.36/124.71    join( join( X, Y ), Z ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := meet( X, Y )
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1664) {G19,W11,D5,L1,V3,M1} P(1643,19) { join( join( meet( Y
% 124.36/124.71    , X ), Z ), X ) ==> join( X, Z ) }.
% 124.36/124.71  parent0: (111965) {G2,W11,D5,L1,V3,M1}  { join( join( meet( X, Y ), Z ), Y
% 124.36/124.71     ) = join( Y, Z ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111970) {G18,W7,D4,L1,V2,M1}  { X ==> join( X, meet( Y, X ) ) }.
% 124.36/124.71  parent0[0]: (1643) {G18,W7,D4,L1,V2,M1} P(42,1595) { join( X, meet( Y, X )
% 124.36/124.71     ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111971) {G1,W11,D4,L1,V3,M1}  { join( join( Y, Z ), X ) = join( 
% 124.36/124.71    join( X, Y ), Z ) }.
% 124.36/124.71  parent0[0]: (19) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) = 
% 124.36/124.71    join( join( Y, Z ), X ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111972) {G2,W13,D6,L1,V3,M1}  { join( X, Y ) ==> join( join( meet
% 124.36/124.71    ( Z, join( X, Y ) ), X ), Y ) }.
% 124.36/124.71  parent0[0]: (111971) {G1,W11,D4,L1,V3,M1}  { join( join( Y, Z ), X ) = join
% 124.36/124.71    ( join( X, Y ), Z ) }.
% 124.36/124.71  parent1[0; 4]: (111970) {G18,W7,D4,L1,V2,M1}  { X ==> join( X, meet( Y, X )
% 124.36/124.71     ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := meet( Z, join( X, Y ) )
% 124.36/124.71     Y := X
% 124.36/124.71     Z := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := join( X, Y )
% 124.36/124.71     Y := Z
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111977) {G2,W13,D6,L1,V3,M1}  { join( join( meet( Z, join( X, Y )
% 124.36/124.71     ), X ), Y ) ==> join( X, Y ) }.
% 124.36/124.71  parent0[0]: (111972) {G2,W13,D6,L1,V3,M1}  { join( X, Y ) ==> join( join( 
% 124.36/124.71    meet( Z, join( X, Y ) ), X ), Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1665) {G19,W13,D6,L1,V3,M1} P(1643,19) { join( join( meet( Z
% 124.36/124.71    , join( X, Y ) ), X ), Y ) ==> join( X, Y ) }.
% 124.36/124.71  parent0: (111977) {G2,W13,D6,L1,V3,M1}  { join( join( meet( Z, join( X, Y )
% 124.36/124.71     ), X ), Y ) ==> join( X, Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111978) {G18,W7,D4,L1,V2,M1}  { X ==> join( X, meet( Y, X ) ) }.
% 124.36/124.71  parent0[0]: (1643) {G18,W7,D4,L1,V2,M1} P(42,1595) { join( X, meet( Y, X )
% 124.36/124.71     ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111979) {G1,W7,D4,L1,V2,M1}  { X ==> join( meet( Y, X ), X ) }.
% 124.36/124.71  parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.36/124.71  parent1[0; 2]: (111978) {G18,W7,D4,L1,V2,M1}  { X ==> join( X, meet( Y, X )
% 124.36/124.71     ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := meet( Y, X )
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111982) {G1,W7,D4,L1,V2,M1}  { join( meet( Y, X ), X ) ==> X }.
% 124.36/124.71  parent0[0]: (111979) {G1,W7,D4,L1,V2,M1}  { X ==> join( meet( Y, X ), X )
% 124.36/124.71     }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1668) {G19,W7,D4,L1,V2,M1} P(1643,0) { join( meet( Y, X ), X
% 124.36/124.71     ) ==> X }.
% 124.36/124.71  parent0: (111982) {G1,W7,D4,L1,V2,M1}  { join( meet( Y, X ), X ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111984) {G1,W10,D5,L1,V2,M1}  { join( converse( X ), Y ) ==> 
% 124.36/124.71    converse( join( X, converse( Y ) ) ) }.
% 124.36/124.71  parent0[0]: (65) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 124.36/124.71    ( X ) ) ) ==> join( converse( Y ), X ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111986) {G2,W11,D6,L1,V2,M1}  { join( converse( meet( X, converse
% 124.36/124.71    ( Y ) ) ), Y ) ==> converse( converse( Y ) ) }.
% 124.36/124.71  parent0[0]: (1668) {G19,W7,D4,L1,V2,M1} P(1643,0) { join( meet( Y, X ), X )
% 124.36/124.71     ==> X }.
% 124.36/124.71  parent1[0; 9]: (111984) {G1,W10,D5,L1,V2,M1}  { join( converse( X ), Y ) 
% 124.36/124.71    ==> converse( join( X, converse( Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := converse( Y )
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := meet( X, converse( Y ) )
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111987) {G1,W9,D6,L1,V2,M1}  { join( converse( meet( X, converse
% 124.36/124.71    ( Y ) ) ), Y ) ==> Y }.
% 124.36/124.71  parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 124.36/124.71  parent1[0; 8]: (111986) {G2,W11,D6,L1,V2,M1}  { join( converse( meet( X, 
% 124.36/124.71    converse( Y ) ) ), Y ) ==> converse( converse( Y ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1671) {G20,W9,D6,L1,V2,M1} P(1668,65);d(7) { join( converse( 
% 124.36/124.71    meet( X, converse( Y ) ) ), Y ) ==> Y }.
% 124.36/124.71  parent0: (111987) {G1,W9,D6,L1,V2,M1}  { join( converse( meet( X, converse
% 124.36/124.71    ( Y ) ) ), Y ) ==> Y }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111990) {G2,W9,D4,L1,V1,M1}  { join( X, one ) ==> join( join( X, 
% 124.36/124.71    skol1 ), one ) }.
% 124.36/124.71  parent0[0]: (31) {G2,W9,D4,L1,V1,M1} P(30,1) { join( join( X, skol1 ), one
% 124.36/124.71     ) ==> join( X, one ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111993) {G3,W9,D4,L1,V1,M1}  { join( meet( X, skol1 ), one ) ==> 
% 124.36/124.71    join( skol1, one ) }.
% 124.36/124.71  parent0[0]: (1668) {G19,W7,D4,L1,V2,M1} P(1643,0) { join( meet( Y, X ), X )
% 124.36/124.71     ==> X }.
% 124.36/124.71  parent1[0; 7]: (111990) {G2,W9,D4,L1,V1,M1}  { join( X, one ) ==> join( 
% 124.36/124.71    join( X, skol1 ), one ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := skol1
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := meet( X, skol1 )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111994) {G2,W7,D4,L1,V1,M1}  { join( meet( X, skol1 ), one ) ==> 
% 124.36/124.71    one }.
% 124.36/124.71  parent0[0]: (30) {G1,W5,D3,L1,V0,M1} S(13);r(15) { join( skol1, one ) ==> 
% 124.36/124.71    one }.
% 124.36/124.71  parent1[0; 6]: (111993) {G3,W9,D4,L1,V1,M1}  { join( meet( X, skol1 ), one
% 124.36/124.71     ) ==> join( skol1, one ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1674) {G20,W7,D4,L1,V1,M1} P(1668,31);d(30) { join( meet( X, 
% 124.36/124.71    skol1 ), one ) ==> one }.
% 124.36/124.71  parent0: (111994) {G2,W7,D4,L1,V1,M1}  { join( meet( X, skol1 ), one ) ==> 
% 124.36/124.71    one }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (111997) {G1,W11,D4,L1,V3,M1}  { join( join( Y, Z ), X ) = join( 
% 124.36/124.71    join( X, Y ), Z ) }.
% 124.36/124.71  parent0[0]: (19) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) = 
% 124.36/124.71    join( join( Y, Z ), X ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (111998) {G2,W11,D5,L1,V3,M1}  { join( Y, Z ) = join( join( Z, 
% 124.36/124.71    meet( X, Y ) ), Y ) }.
% 124.36/124.71  parent0[0]: (1668) {G19,W7,D4,L1,V2,M1} P(1643,0) { join( meet( Y, X ), X )
% 124.36/124.71     ==> X }.
% 124.36/124.71  parent1[0; 2]: (111997) {G1,W11,D4,L1,V3,M1}  { join( join( Y, Z ), X ) = 
% 124.36/124.71    join( join( X, Y ), Z ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := Z
% 124.36/124.71     Y := meet( X, Y )
% 124.36/124.71     Z := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112000) {G2,W11,D5,L1,V3,M1}  { join( join( Y, meet( Z, X ) ), X )
% 124.36/124.71     = join( X, Y ) }.
% 124.36/124.71  parent0[0]: (111998) {G2,W11,D5,L1,V3,M1}  { join( Y, Z ) = join( join( Z, 
% 124.36/124.71    meet( X, Y ) ), Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Z
% 124.36/124.71     Y := X
% 124.36/124.71     Z := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1676) {G20,W11,D5,L1,V3,M1} P(1668,19) { join( join( Z, meet
% 124.36/124.71    ( X, Y ) ), Y ) ==> join( Y, Z ) }.
% 124.36/124.71  parent0: (112000) {G2,W11,D5,L1,V3,M1}  { join( join( Y, meet( Z, X ) ), X
% 124.36/124.71     ) = join( X, Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := Z
% 124.36/124.71     Z := X
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112003) {G2,W10,D6,L1,V2,M1}  { top ==> join( join( complement( 
% 124.36/124.71    join( X, Y ) ), X ), Y ) }.
% 124.36/124.71  parent0[0]: (22) {G2,W10,D6,L1,V2,M1} P(18,1) { join( join( complement( 
% 124.36/124.71    join( X, Y ) ), X ), Y ) ==> top }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112006) {G3,W11,D5,L1,V2,M1}  { top ==> join( join( complement( 
% 124.36/124.71    top ), X ), complement( meet( Y, X ) ) ) }.
% 124.36/124.71  parent0[0]: (1646) {G19,W8,D5,L1,V2,M1} P(1643,1020) { join( X, complement
% 124.36/124.71    ( meet( Y, X ) ) ) ==> top }.
% 124.36/124.71  parent1[0; 5]: (112003) {G2,W10,D6,L1,V2,M1}  { top ==> join( join( 
% 124.36/124.71    complement( join( X, Y ) ), X ), Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := complement( meet( Y, X ) )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112007) {G2,W10,D5,L1,V2,M1}  { top ==> join( join( zero, X ), 
% 124.36/124.71    complement( meet( Y, X ) ) ) }.
% 124.36/124.71  parent0[0]: (44) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==> 
% 124.36/124.71    zero }.
% 124.36/124.71  parent1[0; 4]: (112006) {G3,W11,D5,L1,V2,M1}  { top ==> join( join( 
% 124.36/124.71    complement( top ), X ), complement( meet( Y, X ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112008) {G3,W8,D5,L1,V2,M1}  { top ==> join( complement( meet( Y
% 124.36/124.71    , X ) ), X ) }.
% 124.36/124.71  parent0[0]: (1349) {G12,W11,D4,L1,V2,M1} P(1333,20) { join( join( zero, Y )
% 124.36/124.71    , complement( X ) ) ==> join( complement( X ), Y ) }.
% 124.36/124.71  parent1[0; 2]: (112007) {G2,W10,D5,L1,V2,M1}  { top ==> join( join( zero, X
% 124.36/124.71     ), complement( meet( Y, X ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := meet( Y, X )
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112009) {G3,W8,D5,L1,V2,M1}  { join( complement( meet( X, Y ) ), Y
% 124.36/124.71     ) ==> top }.
% 124.36/124.71  parent0[0]: (112008) {G3,W8,D5,L1,V2,M1}  { top ==> join( complement( meet
% 124.36/124.71    ( Y, X ) ), X ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1779) {G20,W8,D5,L1,V2,M1} P(1646,22);d(44);d(1349) { join( 
% 124.36/124.71    complement( meet( Y, X ) ), X ) ==> top }.
% 124.36/124.71  parent0: (112009) {G3,W8,D5,L1,V2,M1}  { join( complement( meet( X, Y ) ), 
% 124.36/124.71    Y ) ==> top }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112011) {G1,W11,D4,L1,V3,M1}  { join( join( Y, Z ), X ) = join( 
% 124.36/124.71    join( X, Y ), Z ) }.
% 124.36/124.71  parent0[0]: (19) {G1,W11,D4,L1,V3,M1} P(1,0) { join( join( X, Y ), Z ) = 
% 124.36/124.71    join( join( Y, Z ), X ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112020) {G2,W12,D5,L1,V3,M1}  { join( top, Z ) = join( join( Z, X
% 124.36/124.71     ), complement( meet( Y, X ) ) ) }.
% 124.36/124.71  parent0[0]: (1646) {G19,W8,D5,L1,V2,M1} P(1643,1020) { join( X, complement
% 124.36/124.71    ( meet( Y, X ) ) ) ==> top }.
% 124.36/124.71  parent1[0; 2]: (112011) {G1,W11,D4,L1,V3,M1}  { join( join( Y, Z ), X ) = 
% 124.36/124.71    join( join( X, Y ), Z ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := Z
% 124.36/124.71     Y := X
% 124.36/124.71     Z := complement( meet( Y, X ) )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112025) {G3,W10,D5,L1,V3,M1}  { top = join( join( X, Y ), 
% 124.36/124.71    complement( meet( Z, Y ) ) ) }.
% 124.36/124.71  parent0[0]: (562) {G6,W5,D3,L1,V1,M1} P(542,0);d(389) { join( top, Y ) ==> 
% 124.36/124.71    top }.
% 124.36/124.71  parent1[0; 1]: (112020) {G2,W12,D5,L1,V3,M1}  { join( top, Z ) = join( join
% 124.36/124.71    ( Z, X ), complement( meet( Y, X ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := T
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := Z
% 124.36/124.71     Z := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112026) {G3,W10,D5,L1,V3,M1}  { join( join( X, Y ), complement( 
% 124.36/124.71    meet( Z, Y ) ) ) = top }.
% 124.36/124.71  parent0[0]: (112025) {G3,W10,D5,L1,V3,M1}  { top = join( join( X, Y ), 
% 124.36/124.71    complement( meet( Z, Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1785) {G20,W10,D5,L1,V3,M1} P(1646,19);d(562) { join( join( Z
% 124.36/124.71    , X ), complement( meet( Y, X ) ) ) ==> top }.
% 124.36/124.71  parent0: (112026) {G3,W10,D5,L1,V3,M1}  { join( join( X, Y ), complement( 
% 124.36/124.71    meet( Z, Y ) ) ) = top }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Z
% 124.36/124.71     Y := X
% 124.36/124.71     Z := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112027) {G20,W8,D5,L1,V2,M1}  { top ==> join( complement( meet( X
% 124.36/124.71    , Y ) ), Y ) }.
% 124.36/124.71  parent0[0]: (1779) {G20,W8,D5,L1,V2,M1} P(1646,22);d(44);d(1349) { join( 
% 124.36/124.71    complement( meet( Y, X ) ), X ) ==> top }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112028) {G2,W8,D5,L1,V2,M1}  { top ==> join( complement( meet( Y
% 124.36/124.71    , X ) ), Y ) }.
% 124.36/124.71  parent0[0]: (42) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X, 
% 124.36/124.71    Y ) }.
% 124.36/124.71  parent1[0; 4]: (112027) {G20,W8,D5,L1,V2,M1}  { top ==> join( complement( 
% 124.36/124.71    meet( X, Y ) ), Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112031) {G2,W8,D5,L1,V2,M1}  { join( complement( meet( X, Y ) ), X
% 124.36/124.71     ) ==> top }.
% 124.36/124.71  parent0[0]: (112028) {G2,W8,D5,L1,V2,M1}  { top ==> join( complement( meet
% 124.36/124.71    ( Y, X ) ), Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1799) {G21,W8,D5,L1,V2,M1} P(42,1779) { join( complement( 
% 124.36/124.71    meet( Y, X ) ), Y ) ==> top }.
% 124.36/124.71  parent0: (112031) {G2,W8,D5,L1,V2,M1}  { join( complement( meet( X, Y ) ), 
% 124.36/124.71    X ) ==> top }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112033) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> complement( join
% 124.36/124.71    ( complement( X ), complement( Y ) ) ) }.
% 124.36/124.71  parent0[0]: (3) {G0,W10,D5,L1,V2,M1} I { complement( join( complement( X )
% 124.36/124.71    , complement( Y ) ) ) ==> meet( X, Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112035) {G1,W9,D5,L1,V2,M1}  { meet( meet( complement( X ), Y ), 
% 124.36/124.71    X ) ==> complement( top ) }.
% 124.36/124.71  parent0[0]: (1799) {G21,W8,D5,L1,V2,M1} P(42,1779) { join( complement( meet
% 124.36/124.71    ( Y, X ) ), Y ) ==> top }.
% 124.36/124.71  parent1[0; 8]: (112033) {G0,W10,D5,L1,V2,M1}  { meet( X, Y ) ==> complement
% 124.36/124.71    ( join( complement( X ), complement( Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := complement( X )
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := meet( complement( X ), Y )
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112036) {G2,W8,D5,L1,V2,M1}  { meet( meet( complement( X ), Y ), 
% 124.36/124.71    X ) ==> zero }.
% 124.36/124.71  parent0[0]: (44) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==> 
% 124.36/124.71    zero }.
% 124.36/124.71  parent1[0; 7]: (112035) {G1,W9,D5,L1,V2,M1}  { meet( meet( complement( X )
% 124.36/124.71    , Y ), X ) ==> complement( top ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1819) {G22,W8,D5,L1,V2,M1} P(1799,3);d(44) { meet( meet( 
% 124.36/124.71    complement( X ), Y ), X ) ==> zero }.
% 124.36/124.71  parent0: (112036) {G2,W8,D5,L1,V2,M1}  { meet( meet( complement( X ), Y ), 
% 124.36/124.71    X ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112038) {G21,W8,D5,L1,V2,M1}  { top ==> join( complement( meet( X
% 124.36/124.71    , Y ) ), X ) }.
% 124.36/124.71  parent0[0]: (1799) {G21,W8,D5,L1,V2,M1} P(42,1779) { join( complement( meet
% 124.36/124.71    ( Y, X ) ), Y ) ==> top }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112040) {G1,W12,D7,L1,V3,M1}  { top ==> join( join( complement( 
% 124.36/124.71    meet( join( X, Y ), Z ) ), X ), Y ) }.
% 124.36/124.71  parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( 
% 124.36/124.71    join( X, Y ), Z ) }.
% 124.36/124.71  parent1[0; 2]: (112038) {G21,W8,D5,L1,V2,M1}  { top ==> join( complement( 
% 124.36/124.71    meet( X, Y ) ), X ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := complement( meet( join( X, Y ), Z ) )
% 124.36/124.71     Y := X
% 124.36/124.71     Z := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := join( X, Y )
% 124.36/124.71     Y := Z
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112041) {G1,W12,D7,L1,V3,M1}  { join( join( complement( meet( join
% 124.36/124.71    ( X, Y ), Z ) ), X ), Y ) ==> top }.
% 124.36/124.71  parent0[0]: (112040) {G1,W12,D7,L1,V3,M1}  { top ==> join( join( complement
% 124.36/124.71    ( meet( join( X, Y ), Z ) ), X ), Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1820) {G22,W12,D7,L1,V3,M1} P(1799,1) { join( join( 
% 124.36/124.71    complement( meet( join( X, Y ), Z ) ), X ), Y ) ==> top }.
% 124.36/124.71  parent0: (112041) {G1,W12,D7,L1,V3,M1}  { join( join( complement( meet( 
% 124.36/124.71    join( X, Y ), Z ) ), X ), Y ) ==> top }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112043) {G22,W8,D5,L1,V2,M1}  { zero ==> meet( meet( complement( X
% 124.36/124.71     ), Y ), X ) }.
% 124.36/124.71  parent0[0]: (1819) {G22,W8,D5,L1,V2,M1} P(1799,3);d(44) { meet( meet( 
% 124.36/124.71    complement( X ), Y ), X ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112044) {G14,W8,D4,L1,V2,M1}  { zero ==> meet( meet( X, Y ), 
% 124.36/124.71    complement( X ) ) }.
% 124.36/124.71  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.71    complement( complement( X ) ) ==> X }.
% 124.36/124.71  parent1[0; 4]: (112043) {G22,W8,D5,L1,V2,M1}  { zero ==> meet( meet( 
% 124.36/124.71    complement( X ), Y ), X ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := complement( X )
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112045) {G14,W8,D4,L1,V2,M1}  { meet( meet( X, Y ), complement( X
% 124.36/124.71     ) ) ==> zero }.
% 124.36/124.71  parent0[0]: (112044) {G14,W8,D4,L1,V2,M1}  { zero ==> meet( meet( X, Y ), 
% 124.36/124.71    complement( X ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1821) {G23,W8,D4,L1,V2,M1} P(1346,1819) { meet( meet( X, Y )
% 124.36/124.71    , complement( X ) ) ==> zero }.
% 124.36/124.71  parent0: (112045) {G14,W8,D4,L1,V2,M1}  { meet( meet( X, Y ), complement( X
% 124.36/124.71     ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112046) {G22,W8,D5,L1,V2,M1}  { zero ==> meet( meet( complement( X
% 124.36/124.71     ), Y ), X ) }.
% 124.36/124.71  parent0[0]: (1819) {G22,W8,D5,L1,V2,M1} P(1799,3);d(44) { meet( meet( 
% 124.36/124.71    complement( X ), Y ), X ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112047) {G2,W8,D5,L1,V2,M1}  { zero ==> meet( X, meet( complement
% 124.36/124.71    ( X ), Y ) ) }.
% 124.36/124.71  parent0[0]: (42) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X, 
% 124.36/124.71    Y ) }.
% 124.36/124.71  parent1[0; 2]: (112046) {G22,W8,D5,L1,V2,M1}  { zero ==> meet( meet( 
% 124.36/124.71    complement( X ), Y ), X ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := meet( complement( X ), Y )
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112051) {G2,W8,D5,L1,V2,M1}  { meet( X, meet( complement( X ), Y )
% 124.36/124.71     ) ==> zero }.
% 124.36/124.71  parent0[0]: (112047) {G2,W8,D5,L1,V2,M1}  { zero ==> meet( X, meet( 
% 124.36/124.71    complement( X ), Y ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1822) {G23,W8,D5,L1,V2,M1} P(1819,42) { meet( X, meet( 
% 124.36/124.71    complement( X ), Y ) ) ==> zero }.
% 124.36/124.71  parent0: (112051) {G2,W8,D5,L1,V2,M1}  { meet( X, meet( complement( X ), Y
% 124.36/124.71     ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112055) {G23,W8,D4,L1,V2,M1}  { zero ==> meet( meet( X, Y ), 
% 124.36/124.71    complement( X ) ) }.
% 124.36/124.71  parent0[0]: (1821) {G23,W8,D4,L1,V2,M1} P(1346,1819) { meet( meet( X, Y ), 
% 124.36/124.71    complement( X ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112056) {G2,W8,D4,L1,V2,M1}  { zero ==> meet( complement( X ), 
% 124.36/124.71    meet( X, Y ) ) }.
% 124.36/124.71  parent0[0]: (42) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X, 
% 124.36/124.71    Y ) }.
% 124.36/124.71  parent1[0; 2]: (112055) {G23,W8,D4,L1,V2,M1}  { zero ==> meet( meet( X, Y )
% 124.36/124.71    , complement( X ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := complement( X )
% 124.36/124.71     Y := meet( X, Y )
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112060) {G2,W8,D4,L1,V2,M1}  { meet( complement( X ), meet( X, Y )
% 124.36/124.71     ) ==> zero }.
% 124.36/124.71  parent0[0]: (112056) {G2,W8,D4,L1,V2,M1}  { zero ==> meet( complement( X )
% 124.36/124.71    , meet( X, Y ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1826) {G24,W8,D4,L1,V2,M1} P(1821,42) { meet( complement( X )
% 124.36/124.71    , meet( X, Y ) ) ==> zero }.
% 124.36/124.71  parent0: (112060) {G2,W8,D4,L1,V2,M1}  { meet( complement( X ), meet( X, Y
% 124.36/124.71     ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112064) {G23,W8,D4,L1,V2,M1}  { zero ==> meet( meet( X, Y ), 
% 124.36/124.71    complement( X ) ) }.
% 124.36/124.71  parent0[0]: (1821) {G23,W8,D4,L1,V2,M1} P(1346,1819) { meet( meet( X, Y ), 
% 124.36/124.71    complement( X ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112066) {G2,W8,D4,L1,V2,M1}  { zero ==> meet( meet( Y, X ), 
% 124.36/124.71    complement( X ) ) }.
% 124.36/124.71  parent0[0]: (42) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X, 
% 124.36/124.71    Y ) }.
% 124.36/124.71  parent1[0; 3]: (112064) {G23,W8,D4,L1,V2,M1}  { zero ==> meet( meet( X, Y )
% 124.36/124.71    , complement( X ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112072) {G2,W8,D4,L1,V2,M1}  { meet( meet( X, Y ), complement( Y )
% 124.36/124.71     ) ==> zero }.
% 124.36/124.71  parent0[0]: (112066) {G2,W8,D4,L1,V2,M1}  { zero ==> meet( meet( Y, X ), 
% 124.36/124.71    complement( X ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1827) {G24,W8,D4,L1,V2,M1} P(42,1821) { meet( meet( Y, X ), 
% 124.36/124.71    complement( X ) ) ==> zero }.
% 124.36/124.71  parent0: (112072) {G2,W8,D4,L1,V2,M1}  { meet( meet( X, Y ), complement( Y
% 124.36/124.71     ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112074) {G1,W11,D6,L1,V2,M1}  { X ==> join( meet( X, Y ), 
% 124.36/124.71    complement( join( complement( X ), Y ) ) ) }.
% 124.36/124.71  parent0[0]: (29) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ), 
% 124.36/124.71    complement( join( complement( X ), Y ) ) ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112077) {G2,W13,D7,L1,V2,M1}  { complement( X ) ==> join( zero, 
% 124.36/124.71    complement( join( complement( complement( X ) ), meet( X, Y ) ) ) ) }.
% 124.36/124.71  parent0[0]: (1826) {G24,W8,D4,L1,V2,M1} P(1821,42) { meet( complement( X )
% 124.36/124.71    , meet( X, Y ) ) ==> zero }.
% 124.36/124.71  parent1[0; 4]: (112074) {G1,W11,D6,L1,V2,M1}  { X ==> join( meet( X, Y ), 
% 124.36/124.71    complement( join( complement( X ), Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := complement( X )
% 124.36/124.71     Y := meet( X, Y )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112078) {G3,W11,D6,L1,V2,M1}  { complement( X ) ==> complement( 
% 124.36/124.71    join( complement( complement( X ) ), meet( X, Y ) ) ) }.
% 124.36/124.71  parent0[0]: (1333) {G11,W7,D4,L1,V1,M1} P(1308,639) { join( zero, 
% 124.36/124.71    complement( X ) ) ==> complement( X ) }.
% 124.36/124.71  parent1[0; 3]: (112077) {G2,W13,D7,L1,V2,M1}  { complement( X ) ==> join( 
% 124.36/124.71    zero, complement( join( complement( complement( X ) ), meet( X, Y ) ) ) )
% 124.36/124.71     }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := join( complement( complement( X ) ), meet( X, Y ) )
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112079) {G4,W10,D5,L1,V2,M1}  { complement( X ) ==> meet( 
% 124.36/124.71    complement( X ), complement( meet( X, Y ) ) ) }.
% 124.36/124.71  parent0[0]: (1380) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( 
% 124.36/124.71    complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 124.36/124.71  parent1[0; 3]: (112078) {G3,W11,D6,L1,V2,M1}  { complement( X ) ==> 
% 124.36/124.71    complement( join( complement( complement( X ) ), meet( X, Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := meet( X, Y )
% 124.36/124.71     Y := complement( X )
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112080) {G4,W10,D5,L1,V2,M1}  { meet( complement( X ), complement
% 124.36/124.71    ( meet( X, Y ) ) ) ==> complement( X ) }.
% 124.36/124.71  parent0[0]: (112079) {G4,W10,D5,L1,V2,M1}  { complement( X ) ==> meet( 
% 124.36/124.71    complement( X ), complement( meet( X, Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1834) {G25,W10,D5,L1,V2,M1} P(1826,29);d(1333);d(1380) { meet
% 124.36/124.71    ( complement( X ), complement( meet( X, Y ) ) ) ==> complement( X ) }.
% 124.36/124.71  parent0: (112080) {G4,W10,D5,L1,V2,M1}  { meet( complement( X ), complement
% 124.36/124.71    ( meet( X, Y ) ) ) ==> complement( X ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112081) {G24,W8,D4,L1,V2,M1}  { zero ==> meet( complement( X ), 
% 124.36/124.71    meet( X, Y ) ) }.
% 124.36/124.71  parent0[0]: (1826) {G24,W8,D4,L1,V2,M1} P(1821,42) { meet( complement( X )
% 124.36/124.71    , meet( X, Y ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112083) {G2,W8,D4,L1,V2,M1}  { zero ==> meet( complement( X ), 
% 124.36/124.71    meet( Y, X ) ) }.
% 124.36/124.71  parent0[0]: (42) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X, 
% 124.36/124.71    Y ) }.
% 124.36/124.71  parent1[0; 5]: (112081) {G24,W8,D4,L1,V2,M1}  { zero ==> meet( complement( 
% 124.36/124.71    X ), meet( X, Y ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112089) {G2,W8,D4,L1,V2,M1}  { meet( complement( X ), meet( Y, X )
% 124.36/124.71     ) ==> zero }.
% 124.36/124.71  parent0[0]: (112083) {G2,W8,D4,L1,V2,M1}  { zero ==> meet( complement( X )
% 124.36/124.71    , meet( Y, X ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1835) {G25,W8,D4,L1,V2,M1} P(42,1826) { meet( complement( X )
% 124.36/124.71    , meet( Y, X ) ) ==> zero }.
% 124.36/124.71  parent0: (112089) {G2,W8,D4,L1,V2,M1}  { meet( complement( X ), meet( Y, X
% 124.36/124.71     ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112091) {G1,W11,D6,L1,V2,M1}  { X ==> join( meet( X, Y ), 
% 124.36/124.71    complement( join( complement( X ), Y ) ) ) }.
% 124.36/124.71  parent0[0]: (29) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ), 
% 124.36/124.71    complement( join( complement( X ), Y ) ) ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112094) {G2,W12,D7,L1,V2,M1}  { X ==> join( zero, complement( 
% 124.36/124.71    join( complement( X ), meet( complement( X ), Y ) ) ) ) }.
% 124.36/124.71  parent0[0]: (1822) {G23,W8,D5,L1,V2,M1} P(1819,42) { meet( X, meet( 
% 124.36/124.71    complement( X ), Y ) ) ==> zero }.
% 124.36/124.71  parent1[0; 3]: (112091) {G1,W11,D6,L1,V2,M1}  { X ==> join( meet( X, Y ), 
% 124.36/124.71    complement( join( complement( X ), Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := meet( complement( X ), Y )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112095) {G3,W10,D6,L1,V2,M1}  { X ==> complement( join( 
% 124.36/124.71    complement( X ), meet( complement( X ), Y ) ) ) }.
% 124.36/124.71  parent0[0]: (1333) {G11,W7,D4,L1,V1,M1} P(1308,639) { join( zero, 
% 124.36/124.71    complement( X ) ) ==> complement( X ) }.
% 124.36/124.71  parent1[0; 2]: (112094) {G2,W12,D7,L1,V2,M1}  { X ==> join( zero, 
% 124.36/124.71    complement( join( complement( X ), meet( complement( X ), Y ) ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := join( complement( X ), meet( complement( X ), Y ) )
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112096) {G4,W8,D5,L1,V2,M1}  { X ==> meet( X, join( X, complement
% 124.36/124.71    ( Y ) ) ) }.
% 124.36/124.71  parent0[0]: (1373) {G14,W15,D6,L1,V3,M1} P(1346,39) { complement( join( 
% 124.36/124.71    complement( Y ), meet( complement( X ), Z ) ) ) ==> meet( Y, join( X, 
% 124.36/124.71    complement( Z ) ) ) }.
% 124.36/124.71  parent1[0; 2]: (112095) {G3,W10,D6,L1,V2,M1}  { X ==> complement( join( 
% 124.36/124.71    complement( X ), meet( complement( X ), Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := X
% 124.36/124.71     Z := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112097) {G4,W8,D5,L1,V2,M1}  { meet( X, join( X, complement( Y ) )
% 124.36/124.71     ) ==> X }.
% 124.36/124.71  parent0[0]: (112096) {G4,W8,D5,L1,V2,M1}  { X ==> meet( X, join( X, 
% 124.36/124.71    complement( Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1839) {G24,W8,D5,L1,V2,M1} P(1822,29);d(1333);d(1373) { meet
% 124.36/124.71    ( X, join( X, complement( Y ) ) ) ==> X }.
% 124.36/124.71  parent0: (112097) {G4,W8,D5,L1,V2,M1}  { meet( X, join( X, complement( Y )
% 124.36/124.71     ) ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112099) {G24,W8,D5,L1,V2,M1}  { X ==> meet( X, join( X, complement
% 124.36/124.71    ( Y ) ) ) }.
% 124.36/124.71  parent0[0]: (1839) {G24,W8,D5,L1,V2,M1} P(1822,29);d(1333);d(1373) { meet( 
% 124.36/124.71    X, join( X, complement( Y ) ) ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112100) {G14,W7,D4,L1,V2,M1}  { X ==> meet( X, join( X, Y ) ) }.
% 124.36/124.71  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.71    complement( complement( X ) ) ==> X }.
% 124.36/124.71  parent1[0; 6]: (112099) {G24,W8,D5,L1,V2,M1}  { X ==> meet( X, join( X, 
% 124.36/124.71    complement( Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := complement( Y )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112101) {G14,W7,D4,L1,V2,M1}  { meet( X, join( X, Y ) ) ==> X }.
% 124.36/124.71  parent0[0]: (112100) {G14,W7,D4,L1,V2,M1}  { X ==> meet( X, join( X, Y ) )
% 124.36/124.71     }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1841) {G25,W7,D4,L1,V2,M1} P(1346,1839) { meet( Y, join( Y, X
% 124.36/124.71     ) ) ==> Y }.
% 124.36/124.71  parent0: (112101) {G14,W7,D4,L1,V2,M1}  { meet( X, join( X, Y ) ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112103) {G24,W8,D4,L1,V2,M1}  { zero ==> meet( meet( X, Y ), 
% 124.36/124.71    complement( Y ) ) }.
% 124.36/124.71  parent0[0]: (1827) {G24,W8,D4,L1,V2,M1} P(42,1821) { meet( meet( Y, X ), 
% 124.36/124.71    complement( X ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112104) {G25,W8,D5,L1,V2,M1}  { zero ==> meet( X, complement( 
% 124.36/124.71    join( X, Y ) ) ) }.
% 124.36/124.71  parent0[0]: (1841) {G25,W7,D4,L1,V2,M1} P(1346,1839) { meet( Y, join( Y, X
% 124.36/124.71     ) ) ==> Y }.
% 124.36/124.71  parent1[0; 3]: (112103) {G24,W8,D4,L1,V2,M1}  { zero ==> meet( meet( X, Y )
% 124.36/124.71    , complement( Y ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := join( X, Y )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112105) {G25,W8,D5,L1,V2,M1}  { meet( X, complement( join( X, Y )
% 124.36/124.71     ) ) ==> zero }.
% 124.36/124.71  parent0[0]: (112104) {G25,W8,D5,L1,V2,M1}  { zero ==> meet( X, complement( 
% 124.36/124.71    join( X, Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1848) {G26,W8,D5,L1,V2,M1} P(1841,1827) { meet( X, complement
% 124.36/124.71    ( join( X, Y ) ) ) ==> zero }.
% 124.36/124.71  parent0: (112105) {G25,W8,D5,L1,V2,M1}  { meet( X, complement( join( X, Y )
% 124.36/124.71     ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112107) {G25,W8,D4,L1,V2,M1}  { zero ==> meet( complement( X ), 
% 124.36/124.71    meet( Y, X ) ) }.
% 124.36/124.71  parent0[0]: (1835) {G25,W8,D4,L1,V2,M1} P(42,1826) { meet( complement( X )
% 124.36/124.71    , meet( Y, X ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112108) {G26,W8,D5,L1,V2,M1}  { zero ==> meet( complement( join( 
% 124.36/124.71    X, Y ) ), X ) }.
% 124.36/124.71  parent0[0]: (1841) {G25,W7,D4,L1,V2,M1} P(1346,1839) { meet( Y, join( Y, X
% 124.36/124.71     ) ) ==> Y }.
% 124.36/124.71  parent1[0; 7]: (112107) {G25,W8,D4,L1,V2,M1}  { zero ==> meet( complement( 
% 124.36/124.71    X ), meet( Y, X ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := join( X, Y )
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112109) {G26,W8,D5,L1,V2,M1}  { meet( complement( join( X, Y ) ), 
% 124.36/124.71    X ) ==> zero }.
% 124.36/124.71  parent0[0]: (112108) {G26,W8,D5,L1,V2,M1}  { zero ==> meet( complement( 
% 124.36/124.71    join( X, Y ) ), X ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1849) {G26,W8,D5,L1,V2,M1} P(1841,1835) { meet( complement( 
% 124.36/124.71    join( X, Y ) ), X ) ==> zero }.
% 124.36/124.71  parent0: (112109) {G26,W8,D5,L1,V2,M1}  { meet( complement( join( X, Y ) )
% 124.36/124.71    , X ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112111) {G25,W7,D4,L1,V2,M1}  { X ==> meet( X, join( X, Y ) ) }.
% 124.36/124.71  parent0[0]: (1841) {G25,W7,D4,L1,V2,M1} P(1346,1839) { meet( Y, join( Y, X
% 124.36/124.71     ) ) ==> Y }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112112) {G21,W9,D4,L1,V1,M1}  { meet( X, skol1 ) ==> meet( meet( 
% 124.36/124.71    X, skol1 ), one ) }.
% 124.36/124.71  parent0[0]: (1674) {G20,W7,D4,L1,V1,M1} P(1668,31);d(30) { join( meet( X, 
% 124.36/124.71    skol1 ), one ) ==> one }.
% 124.36/124.71  parent1[0; 8]: (112111) {G25,W7,D4,L1,V2,M1}  { X ==> meet( X, join( X, Y )
% 124.36/124.71     ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := meet( X, skol1 )
% 124.36/124.71     Y := one
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112113) {G21,W9,D4,L1,V1,M1}  { meet( meet( X, skol1 ), one ) ==> 
% 124.36/124.71    meet( X, skol1 ) }.
% 124.36/124.71  parent0[0]: (112112) {G21,W9,D4,L1,V1,M1}  { meet( X, skol1 ) ==> meet( 
% 124.36/124.71    meet( X, skol1 ), one ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1850) {G26,W9,D4,L1,V1,M1} P(1674,1841) { meet( meet( X, 
% 124.36/124.71    skol1 ), one ) ==> meet( X, skol1 ) }.
% 124.36/124.71  parent0: (112113) {G21,W9,D4,L1,V1,M1}  { meet( meet( X, skol1 ), one ) ==>
% 124.36/124.71     meet( X, skol1 ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112114) {G25,W7,D4,L1,V2,M1}  { X ==> meet( X, join( X, Y ) ) }.
% 124.36/124.71  parent0[0]: (1841) {G25,W7,D4,L1,V2,M1} P(1346,1839) { meet( Y, join( Y, X
% 124.36/124.71     ) ) ==> Y }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112115) {G2,W7,D4,L1,V2,M1}  { X ==> meet( join( X, Y ), X ) }.
% 124.36/124.71  parent0[0]: (42) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X, 
% 124.36/124.71    Y ) }.
% 124.36/124.71  parent1[0; 2]: (112114) {G25,W7,D4,L1,V2,M1}  { X ==> meet( X, join( X, Y )
% 124.36/124.71     ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := join( X, Y )
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112118) {G2,W7,D4,L1,V2,M1}  { meet( join( X, Y ), X ) ==> X }.
% 124.36/124.71  parent0[0]: (112115) {G2,W7,D4,L1,V2,M1}  { X ==> meet( join( X, Y ), X )
% 124.36/124.71     }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1864) {G26,W7,D4,L1,V2,M1} P(1841,42) { meet( join( X, Y ), X
% 124.36/124.71     ) ==> X }.
% 124.36/124.71  parent0: (112118) {G2,W7,D4,L1,V2,M1}  { meet( join( X, Y ), X ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112119) {G25,W7,D4,L1,V2,M1}  { X ==> meet( X, join( X, Y ) ) }.
% 124.36/124.71  parent0[0]: (1841) {G25,W7,D4,L1,V2,M1} P(1346,1839) { meet( Y, join( Y, X
% 124.36/124.71     ) ) ==> Y }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112120) {G1,W7,D4,L1,V2,M1}  { X ==> meet( X, join( Y, X ) ) }.
% 124.36/124.71  parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.36/124.71  parent1[0; 4]: (112119) {G25,W7,D4,L1,V2,M1}  { X ==> meet( X, join( X, Y )
% 124.36/124.71     ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112123) {G1,W7,D4,L1,V2,M1}  { meet( X, join( Y, X ) ) ==> X }.
% 124.36/124.71  parent0[0]: (112120) {G1,W7,D4,L1,V2,M1}  { X ==> meet( X, join( Y, X ) )
% 124.36/124.71     }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1867) {G26,W7,D4,L1,V2,M1} P(0,1841) { meet( X, join( Y, X )
% 124.36/124.71     ) ==> X }.
% 124.36/124.71  parent0: (112123) {G1,W7,D4,L1,V2,M1}  { meet( X, join( Y, X ) ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112125) {G26,W7,D4,L1,V2,M1}  { X ==> meet( join( X, Y ), X ) }.
% 124.36/124.71  parent0[0]: (1864) {G26,W7,D4,L1,V2,M1} P(1841,42) { meet( join( X, Y ), X
% 124.36/124.71     ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112128) {G20,W9,D4,L1,V2,M1}  { meet( X, Y ) ==> meet( Y, meet( X
% 124.36/124.71    , Y ) ) }.
% 124.36/124.71  parent0[0]: (1668) {G19,W7,D4,L1,V2,M1} P(1643,0) { join( meet( Y, X ), X )
% 124.36/124.71     ==> X }.
% 124.36/124.71  parent1[0; 5]: (112125) {G26,W7,D4,L1,V2,M1}  { X ==> meet( join( X, Y ), X
% 124.36/124.71     ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := meet( X, Y )
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112129) {G20,W9,D4,L1,V2,M1}  { meet( Y, meet( X, Y ) ) ==> meet( 
% 124.36/124.71    X, Y ) }.
% 124.36/124.71  parent0[0]: (112128) {G20,W9,D4,L1,V2,M1}  { meet( X, Y ) ==> meet( Y, meet
% 124.36/124.71    ( X, Y ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1876) {G27,W9,D4,L1,V2,M1} P(1668,1864) { meet( Y, meet( X, Y
% 124.36/124.71     ) ) ==> meet( X, Y ) }.
% 124.36/124.71  parent0: (112129) {G20,W9,D4,L1,V2,M1}  { meet( Y, meet( X, Y ) ) ==> meet
% 124.36/124.71    ( X, Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112131) {G26,W7,D4,L1,V2,M1}  { X ==> meet( join( X, Y ), X ) }.
% 124.36/124.71  parent0[0]: (1864) {G26,W7,D4,L1,V2,M1} P(1841,42) { meet( join( X, Y ), X
% 124.36/124.71     ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112132) {G1,W10,D5,L1,V2,M1}  { converse( X ) ==> meet( converse
% 124.36/124.71    ( join( X, Y ) ), converse( X ) ) }.
% 124.36/124.71  parent0[0]: (8) {G0,W10,D4,L1,V2,M1} I { join( converse( X ), converse( Y )
% 124.36/124.71     ) ==> converse( join( X, Y ) ) }.
% 124.36/124.71  parent1[0; 4]: (112131) {G26,W7,D4,L1,V2,M1}  { X ==> meet( join( X, Y ), X
% 124.36/124.71     ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := converse( X )
% 124.36/124.71     Y := converse( Y )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112133) {G1,W10,D5,L1,V2,M1}  { meet( converse( join( X, Y ) ), 
% 124.36/124.71    converse( X ) ) ==> converse( X ) }.
% 124.36/124.71  parent0[0]: (112132) {G1,W10,D5,L1,V2,M1}  { converse( X ) ==> meet( 
% 124.36/124.71    converse( join( X, Y ) ), converse( X ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1890) {G27,W10,D5,L1,V2,M1} P(8,1864) { meet( converse( join
% 124.36/124.71    ( X, Y ) ), converse( X ) ) ==> converse( X ) }.
% 124.36/124.71  parent0: (112133) {G1,W10,D5,L1,V2,M1}  { meet( converse( join( X, Y ) ), 
% 124.36/124.71    converse( X ) ) ==> converse( X ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112134) {G26,W7,D4,L1,V2,M1}  { X ==> meet( join( X, Y ), X ) }.
% 124.36/124.71  parent0[0]: (1864) {G26,W7,D4,L1,V2,M1} P(1841,42) { meet( join( X, Y ), X
% 124.36/124.71     ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112135) {G1,W7,D4,L1,V2,M1}  { X ==> meet( join( Y, X ), X ) }.
% 124.36/124.71  parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.36/124.71  parent1[0; 3]: (112134) {G26,W7,D4,L1,V2,M1}  { X ==> meet( join( X, Y ), X
% 124.36/124.71     ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112138) {G1,W7,D4,L1,V2,M1}  { meet( join( Y, X ), X ) ==> X }.
% 124.36/124.71  parent0[0]: (112135) {G1,W7,D4,L1,V2,M1}  { X ==> meet( join( Y, X ), X )
% 124.36/124.71     }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1893) {G27,W7,D4,L1,V2,M1} P(0,1864) { meet( join( Y, X ), X
% 124.36/124.71     ) ==> X }.
% 124.36/124.71  parent0: (112138) {G1,W7,D4,L1,V2,M1}  { meet( join( Y, X ), X ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112140) {G23,W8,D4,L1,V2,M1}  { zero ==> meet( meet( X, Y ), 
% 124.36/124.71    complement( X ) ) }.
% 124.36/124.71  parent0[0]: (1821) {G23,W8,D4,L1,V2,M1} P(1346,1819) { meet( meet( X, Y ), 
% 124.36/124.71    complement( X ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112141) {G24,W8,D5,L1,V2,M1}  { zero ==> meet( Y, complement( 
% 124.36/124.71    join( X, Y ) ) ) }.
% 124.36/124.71  parent0[0]: (1893) {G27,W7,D4,L1,V2,M1} P(0,1864) { meet( join( Y, X ), X )
% 124.36/124.71     ==> X }.
% 124.36/124.71  parent1[0; 3]: (112140) {G23,W8,D4,L1,V2,M1}  { zero ==> meet( meet( X, Y )
% 124.36/124.71    , complement( X ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := join( X, Y )
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112142) {G24,W8,D5,L1,V2,M1}  { meet( X, complement( join( Y, X )
% 124.36/124.71     ) ) ==> zero }.
% 124.36/124.71  parent0[0]: (112141) {G24,W8,D5,L1,V2,M1}  { zero ==> meet( Y, complement( 
% 124.36/124.71    join( X, Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1895) {G28,W8,D5,L1,V2,M1} P(1893,1821) { meet( Y, complement
% 124.36/124.71    ( join( X, Y ) ) ) ==> zero }.
% 124.36/124.71  parent0: (112142) {G24,W8,D5,L1,V2,M1}  { meet( X, complement( join( Y, X )
% 124.36/124.71     ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112143) {G27,W7,D4,L1,V2,M1}  { Y ==> meet( join( X, Y ), Y ) }.
% 124.36/124.71  parent0[0]: (1893) {G27,W7,D4,L1,V2,M1} P(0,1864) { meet( join( Y, X ), X )
% 124.36/124.71     ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112144) {G2,W9,D5,L1,V3,M1}  { X ==> meet( join( join( Y, X ), Z
% 124.36/124.71     ), X ) }.
% 124.36/124.71  parent0[0]: (20) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X )
% 124.36/124.71     = join( join( Z, X ), Y ) }.
% 124.36/124.71  parent1[0; 3]: (112143) {G27,W7,D4,L1,V2,M1}  { Y ==> meet( join( X, Y ), Y
% 124.36/124.71     ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Z
% 124.36/124.71     Z := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := join( Y, Z )
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112147) {G2,W9,D5,L1,V3,M1}  { meet( join( join( Y, X ), Z ), X ) 
% 124.36/124.71    ==> X }.
% 124.36/124.71  parent0[0]: (112144) {G2,W9,D5,L1,V3,M1}  { X ==> meet( join( join( Y, X )
% 124.36/124.71    , Z ), X ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1902) {G28,W9,D5,L1,V3,M1} P(20,1893) { meet( join( join( X, 
% 124.36/124.71    Z ), Y ), Z ) ==> Z }.
% 124.36/124.71  parent0: (112147) {G2,W9,D5,L1,V3,M1}  { meet( join( join( Y, X ), Z ), X )
% 124.36/124.71     ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Z
% 124.36/124.71     Y := X
% 124.36/124.71     Z := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112148) {G26,W7,D4,L1,V2,M1}  { X ==> meet( X, join( Y, X ) ) }.
% 124.36/124.71  parent0[0]: (1867) {G26,W7,D4,L1,V2,M1} P(0,1841) { meet( X, join( Y, X ) )
% 124.36/124.71     ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112149) {G2,W9,D5,L1,V3,M1}  { X ==> meet( X, join( join( Y, X )
% 124.36/124.71    , Z ) ) }.
% 124.36/124.71  parent0[0]: (20) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X )
% 124.36/124.71     = join( join( Z, X ), Y ) }.
% 124.36/124.71  parent1[0; 4]: (112148) {G26,W7,D4,L1,V2,M1}  { X ==> meet( X, join( Y, X )
% 124.36/124.71     ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Z
% 124.36/124.71     Z := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := join( Y, Z )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112152) {G2,W9,D5,L1,V3,M1}  { meet( X, join( join( Y, X ), Z ) ) 
% 124.36/124.71    ==> X }.
% 124.36/124.71  parent0[0]: (112149) {G2,W9,D5,L1,V3,M1}  { X ==> meet( X, join( join( Y, X
% 124.36/124.71     ), Z ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1910) {G27,W9,D5,L1,V3,M1} P(20,1867) { meet( Z, join( join( 
% 124.36/124.71    X, Z ), Y ) ) ==> Z }.
% 124.36/124.71  parent0: (112152) {G2,W9,D5,L1,V3,M1}  { meet( X, join( join( Y, X ), Z ) )
% 124.36/124.71     ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Z
% 124.36/124.71     Y := X
% 124.36/124.71     Z := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112154) {G28,W8,D5,L1,V2,M1}  { zero ==> meet( X, complement( join
% 124.36/124.71    ( Y, X ) ) ) }.
% 124.36/124.71  parent0[0]: (1895) {G28,W8,D5,L1,V2,M1} P(1893,1821) { meet( Y, complement
% 124.36/124.71    ( join( X, Y ) ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112155) {G2,W12,D7,L1,V3,M1}  { zero ==> meet( converse( X ), 
% 124.36/124.71    complement( join( Y, converse( join( Z, X ) ) ) ) ) }.
% 124.36/124.71  parent0[0]: (62) {G1,W14,D5,L1,V3,M1} P(8,1) { join( join( Z, converse( X )
% 124.36/124.71     ), converse( Y ) ) ==> join( Z, converse( join( X, Y ) ) ) }.
% 124.36/124.71  parent1[0; 6]: (112154) {G28,W8,D5,L1,V2,M1}  { zero ==> meet( X, 
% 124.36/124.71    complement( join( Y, X ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Z
% 124.36/124.71     Y := X
% 124.36/124.71     Z := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := converse( X )
% 124.36/124.71     Y := join( Y, converse( Z ) )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112156) {G2,W12,D7,L1,V3,M1}  { meet( converse( X ), complement( 
% 124.36/124.71    join( Y, converse( join( Z, X ) ) ) ) ) ==> zero }.
% 124.36/124.71  parent0[0]: (112155) {G2,W12,D7,L1,V3,M1}  { zero ==> meet( converse( X ), 
% 124.36/124.71    complement( join( Y, converse( join( Z, X ) ) ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1956) {G29,W12,D7,L1,V3,M1} P(62,1895) { meet( converse( Z )
% 124.36/124.71    , complement( join( X, converse( join( Y, Z ) ) ) ) ) ==> zero }.
% 124.36/124.71  parent0: (112156) {G2,W12,D7,L1,V3,M1}  { meet( converse( X ), complement( 
% 124.36/124.71    join( Y, converse( join( Z, X ) ) ) ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Z
% 124.36/124.71     Y := X
% 124.36/124.71     Z := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112158) {G28,W8,D5,L1,V2,M1}  { zero ==> meet( X, complement( join
% 124.36/124.71    ( Y, X ) ) ) }.
% 124.36/124.71  parent0[0]: (1895) {G28,W8,D5,L1,V2,M1} P(1893,1821) { meet( Y, complement
% 124.36/124.71    ( join( X, Y ) ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112159) {G1,W12,D6,L1,V3,M1}  { zero ==> meet( composition( X, Y
% 124.36/124.71     ), complement( composition( join( Z, X ), Y ) ) ) }.
% 124.36/124.71  parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ), 
% 124.36/124.71    composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 124.36/124.71  parent1[0; 7]: (112158) {G28,W8,D5,L1,V2,M1}  { zero ==> meet( X, 
% 124.36/124.71    complement( join( Y, X ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Z
% 124.36/124.71     Y := X
% 124.36/124.71     Z := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := composition( X, Y )
% 124.36/124.71     Y := composition( Z, Y )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112160) {G1,W12,D6,L1,V3,M1}  { meet( composition( X, Y ), 
% 124.36/124.71    complement( composition( join( Z, X ), Y ) ) ) ==> zero }.
% 124.36/124.71  parent0[0]: (112159) {G1,W12,D6,L1,V3,M1}  { zero ==> meet( composition( X
% 124.36/124.71    , Y ), complement( composition( join( Z, X ), Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1965) {G29,W12,D6,L1,V3,M1} P(6,1895) { meet( composition( Z
% 124.36/124.71    , Y ), complement( composition( join( X, Z ), Y ) ) ) ==> zero }.
% 124.36/124.71  parent0: (112160) {G1,W12,D6,L1,V3,M1}  { meet( composition( X, Y ), 
% 124.36/124.71    complement( composition( join( Z, X ), Y ) ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Z
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := X
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112162) {G26,W8,D5,L1,V2,M1}  { zero ==> meet( X, complement( join
% 124.36/124.71    ( X, Y ) ) ) }.
% 124.36/124.71  parent0[0]: (1848) {G26,W8,D5,L1,V2,M1} P(1841,1827) { meet( X, complement
% 124.36/124.71    ( join( X, Y ) ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112164) {G2,W11,D5,L1,V1,M1}  { zero ==> meet( composition( 
% 124.36/124.71    converse( X ), complement( X ) ), complement( complement( one ) ) ) }.
% 124.36/124.71  parent0[0]: (100) {G1,W11,D5,L1,V1,M1} P(5,10) { join( composition( 
% 124.36/124.71    converse( X ), complement( X ) ), complement( one ) ) ==> complement( one
% 124.36/124.71     ) }.
% 124.36/124.71  parent1[0; 9]: (112162) {G26,W8,D5,L1,V2,M1}  { zero ==> meet( X, 
% 124.36/124.71    complement( join( X, Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := composition( converse( X ), complement( X ) )
% 124.36/124.71     Y := complement( one )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112165) {G3,W9,D5,L1,V1,M1}  { zero ==> meet( composition( 
% 124.36/124.71    converse( X ), complement( X ) ), one ) }.
% 124.36/124.71  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.71    complement( complement( X ) ) ==> X }.
% 124.36/124.71  parent1[0; 8]: (112164) {G2,W11,D5,L1,V1,M1}  { zero ==> meet( composition
% 124.36/124.71    ( converse( X ), complement( X ) ), complement( complement( one ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := one
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112166) {G3,W9,D5,L1,V1,M1}  { meet( composition( converse( X ), 
% 124.36/124.71    complement( X ) ), one ) ==> zero }.
% 124.36/124.71  parent0[0]: (112165) {G3,W9,D5,L1,V1,M1}  { zero ==> meet( composition( 
% 124.36/124.71    converse( X ), complement( X ) ), one ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (1968) {G27,W9,D5,L1,V1,M1} P(100,1848);d(1346) { meet( 
% 124.36/124.71    composition( converse( X ), complement( X ) ), one ) ==> zero }.
% 124.36/124.71  parent0: (112166) {G3,W9,D5,L1,V1,M1}  { meet( composition( converse( X ), 
% 124.36/124.71    complement( X ) ), one ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112169) {G2,W10,D5,L1,V2,M1}  { join( meet( X, Y ), meet( X, 
% 124.36/124.71    complement( Y ) ) ) ==> X }.
% 124.36/124.71  parent0[0]: (1380) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( 
% 124.36/124.71    complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 124.36/124.71  parent1[0; 5]: (29) {G1,W11,D6,L1,V2,M1} S(2);d(3) { join( meet( X, Y ), 
% 124.36/124.71    complement( join( complement( X ), Y ) ) ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (2039) {G15,W10,D5,L1,V2,M1} S(29);d(1380) { join( meet( X, Y
% 124.36/124.71     ), meet( X, complement( Y ) ) ) ==> X }.
% 124.36/124.71  parent0: (112169) {G2,W10,D5,L1,V2,M1}  { join( meet( X, Y ), meet( X, 
% 124.36/124.71    complement( Y ) ) ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112172) {G0,W13,D4,L1,V3,M1}  { composition( join( X, Z ), Y ) ==>
% 124.36/124.71     join( composition( X, Y ), composition( Z, Y ) ) }.
% 124.36/124.71  parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ), 
% 124.36/124.71    composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Z
% 124.36/124.71     Z := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112174) {G1,W15,D5,L1,V2,M1}  { composition( join( X, converse( Y
% 124.36/124.71     ) ), top ) ==> join( composition( X, top ), converse( composition( top, 
% 124.36/124.71    Y ) ) ) }.
% 124.36/124.71  parent0[0]: (759) {G11,W9,D4,L1,V1,M1} P(752,9) { composition( converse( X
% 124.36/124.71     ), top ) ==> converse( composition( top, X ) ) }.
% 124.36/124.71  parent1[0; 11]: (112172) {G0,W13,D4,L1,V3,M1}  { composition( join( X, Z )
% 124.36/124.71    , Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := top
% 124.36/124.71     Z := converse( Y )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112176) {G1,W15,D5,L1,V2,M1}  { join( composition( X, top ), 
% 124.36/124.71    converse( composition( top, Y ) ) ) ==> composition( join( X, converse( Y
% 124.36/124.71     ) ), top ) }.
% 124.36/124.71  parent0[0]: (112174) {G1,W15,D5,L1,V2,M1}  { composition( join( X, converse
% 124.36/124.71    ( Y ) ), top ) ==> join( composition( X, top ), converse( composition( 
% 124.36/124.71    top, Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (2482) {G12,W15,D5,L1,V2,M1} P(759,6) { join( composition( Y, 
% 124.36/124.71    top ), converse( composition( top, X ) ) ) ==> composition( join( Y, 
% 124.36/124.71    converse( X ) ), top ) }.
% 124.36/124.71  parent0: (112176) {G1,W15,D5,L1,V2,M1}  { join( composition( X, top ), 
% 124.36/124.71    converse( composition( top, Y ) ) ) ==> composition( join( X, converse( Y
% 124.36/124.71     ) ), top ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112177) {G2,W10,D6,L1,V2,M1}  { top ==> join( join( complement( 
% 124.36/124.71    join( X, Y ) ), X ), Y ) }.
% 124.36/124.71  parent0[0]: (22) {G2,W10,D6,L1,V2,M1} P(18,1) { join( join( complement( 
% 124.36/124.71    join( X, Y ) ), X ), Y ) ==> top }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112178) {G3,W10,D5,L1,V2,M1}  { top ==> join( join( Y, X ), 
% 124.36/124.71    complement( join( X, Y ) ) ) }.
% 124.36/124.71  parent0[0]: (160) {G2,W11,D4,L1,V3,M1} P(0,19) { join( join( Z, X ), Y ) = 
% 124.36/124.71    join( join( Y, X ), Z ) }.
% 124.36/124.71  parent1[0; 2]: (112177) {G2,W10,D6,L1,V2,M1}  { top ==> join( join( 
% 124.36/124.71    complement( join( X, Y ) ), X ), Y ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := complement( join( X, Y ) )
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112184) {G3,W10,D5,L1,V2,M1}  { join( join( X, Y ), complement( 
% 124.36/124.71    join( Y, X ) ) ) ==> top }.
% 124.36/124.71  parent0[0]: (112178) {G3,W10,D5,L1,V2,M1}  { top ==> join( join( Y, X ), 
% 124.36/124.71    complement( join( X, Y ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (2728) {G3,W10,D5,L1,V2,M1} P(160,22) { join( join( Y, X ), 
% 124.36/124.71    complement( join( X, Y ) ) ) ==> top }.
% 124.36/124.71  parent0: (112184) {G3,W10,D5,L1,V2,M1}  { join( join( X, Y ), complement( 
% 124.36/124.71    join( Y, X ) ) ) ==> top }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112188) {G27,W9,D5,L1,V1,M1}  { zero ==> meet( composition( 
% 124.36/124.71    converse( X ), complement( X ) ), one ) }.
% 124.36/124.71  parent0[0]: (1968) {G27,W9,D5,L1,V1,M1} P(100,1848);d(1346) { meet( 
% 124.36/124.71    composition( converse( X ), complement( X ) ), one ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112189) {G14,W9,D6,L1,V1,M1}  { zero ==> meet( composition( 
% 124.36/124.71    converse( complement( X ) ), X ), one ) }.
% 124.36/124.71  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.71    complement( complement( X ) ) ==> X }.
% 124.36/124.71  parent1[0; 7]: (112188) {G27,W9,D5,L1,V1,M1}  { zero ==> meet( composition
% 124.36/124.71    ( converse( X ), complement( X ) ), one ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := complement( X )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112190) {G14,W9,D6,L1,V1,M1}  { meet( composition( converse( 
% 124.36/124.71    complement( X ) ), X ), one ) ==> zero }.
% 124.36/124.71  parent0[0]: (112189) {G14,W9,D6,L1,V1,M1}  { zero ==> meet( composition( 
% 124.36/124.71    converse( complement( X ) ), X ), one ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (3533) {G28,W9,D6,L1,V1,M1} P(1346,1968) { meet( composition( 
% 124.36/124.71    converse( complement( X ) ), X ), one ) ==> zero }.
% 124.36/124.71  parent0: (112190) {G14,W9,D6,L1,V1,M1}  { meet( composition( converse( 
% 124.36/124.71    complement( X ) ), X ), one ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112192) {G14,W9,D5,L1,V1,M1}  { zero ==> composition( converse( X
% 124.36/124.71     ), complement( composition( X, top ) ) ) }.
% 124.36/124.71  parent0[0]: (1427) {G14,W9,D5,L1,V1,M1} S(95);d(1355) { composition( 
% 124.36/124.71    converse( X ), complement( composition( X, top ) ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112193) {G11,W8,D5,L1,V0,M1}  { zero ==> composition( top, 
% 124.36/124.71    complement( composition( top, top ) ) ) }.
% 124.36/124.71  parent0[0]: (752) {G10,W4,D3,L1,V0,M1} P(738,562) { converse( top ) ==> top
% 124.36/124.71     }.
% 124.36/124.71  parent1[0; 3]: (112192) {G14,W9,D5,L1,V1,M1}  { zero ==> composition( 
% 124.36/124.71    converse( X ), complement( composition( X, top ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := top
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112194) {G11,W8,D5,L1,V0,M1}  { composition( top, complement( 
% 124.36/124.71    composition( top, top ) ) ) ==> zero }.
% 124.36/124.71  parent0[0]: (112193) {G11,W8,D5,L1,V0,M1}  { zero ==> composition( top, 
% 124.36/124.71    complement( composition( top, top ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (3563) {G15,W8,D5,L1,V0,M1} P(752,1427) { composition( top, 
% 124.36/124.71    complement( composition( top, top ) ) ) ==> zero }.
% 124.36/124.71  parent0: (112194) {G11,W8,D5,L1,V0,M1}  { composition( top, complement( 
% 124.36/124.71    composition( top, top ) ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112196) {G0,W13,D4,L1,V3,M1}  { composition( join( X, Z ), Y ) ==>
% 124.36/124.71     join( composition( X, Y ), composition( Z, Y ) ) }.
% 124.36/124.71  parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ), 
% 124.36/124.71    composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Z
% 124.36/124.71     Z := Y
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112201) {G1,W17,D6,L1,V1,M1}  { composition( join( X, top ), 
% 124.36/124.71    complement( composition( top, top ) ) ) ==> join( composition( X, 
% 124.36/124.71    complement( composition( top, top ) ) ), zero ) }.
% 124.36/124.71  parent0[0]: (3563) {G15,W8,D5,L1,V0,M1} P(752,1427) { composition( top, 
% 124.36/124.71    complement( composition( top, top ) ) ) ==> zero }.
% 124.36/124.71  parent1[0; 16]: (112196) {G0,W13,D4,L1,V3,M1}  { composition( join( X, Z )
% 124.36/124.71    , Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := complement( composition( top, top ) )
% 124.36/124.71     Z := top
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112202) {G2,W15,D5,L1,V1,M1}  { composition( join( X, top ), 
% 124.36/124.71    complement( composition( top, top ) ) ) ==> composition( X, complement( 
% 124.36/124.71    composition( top, top ) ) ) }.
% 124.36/124.71  parent0[0]: (1355) {G13,W5,D3,L1,V1,M1} P(1340,409) { join( X, zero ) ==> X
% 124.36/124.71     }.
% 124.36/124.71  parent1[0; 9]: (112201) {G1,W17,D6,L1,V1,M1}  { composition( join( X, top )
% 124.36/124.71    , complement( composition( top, top ) ) ) ==> join( composition( X, 
% 124.36/124.71    complement( composition( top, top ) ) ), zero ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := composition( X, complement( composition( top, top ) ) )
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112203) {G3,W13,D5,L1,V1,M1}  { composition( top, complement( 
% 124.36/124.71    composition( top, top ) ) ) ==> composition( X, complement( composition( 
% 124.36/124.71    top, top ) ) ) }.
% 124.36/124.71  parent0[0]: (575) {G8,W5,D3,L1,V1,M1} P(562,1);d(571) { join( Y, top ) ==> 
% 124.36/124.71    top }.
% 124.36/124.71  parent1[0; 2]: (112202) {G2,W15,D5,L1,V1,M1}  { composition( join( X, top )
% 124.36/124.71    , complement( composition( top, top ) ) ) ==> composition( X, complement
% 124.36/124.71    ( composition( top, top ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := Y
% 124.36/124.71     Y := X
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112204) {G4,W8,D5,L1,V1,M1}  { zero ==> composition( X, 
% 124.36/124.71    complement( composition( top, top ) ) ) }.
% 124.36/124.71  parent0[0]: (3563) {G15,W8,D5,L1,V0,M1} P(752,1427) { composition( top, 
% 124.36/124.71    complement( composition( top, top ) ) ) ==> zero }.
% 124.36/124.71  parent1[0; 1]: (112203) {G3,W13,D5,L1,V1,M1}  { composition( top, 
% 124.36/124.71    complement( composition( top, top ) ) ) ==> composition( X, complement( 
% 124.36/124.71    composition( top, top ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112205) {G4,W8,D5,L1,V1,M1}  { composition( X, complement( 
% 124.36/124.71    composition( top, top ) ) ) ==> zero }.
% 124.36/124.71  parent0[0]: (112204) {G4,W8,D5,L1,V1,M1}  { zero ==> composition( X, 
% 124.36/124.71    complement( composition( top, top ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (3572) {G16,W8,D5,L1,V1,M1} P(3563,6);d(1355);d(575);d(3563)
% 124.36/124.71     { composition( X, complement( composition( top, top ) ) ) ==> zero }.
% 124.36/124.71  parent0: (112205) {G4,W8,D5,L1,V1,M1}  { composition( X, complement( 
% 124.36/124.71    composition( top, top ) ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112206) {G16,W8,D5,L1,V1,M1}  { zero ==> composition( X, 
% 124.36/124.71    complement( composition( top, top ) ) ) }.
% 124.36/124.71  parent0[0]: (3572) {G16,W8,D5,L1,V1,M1} P(3563,6);d(1355);d(575);d(3563) { 
% 124.36/124.71    composition( X, complement( composition( top, top ) ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112208) {G5,W6,D4,L1,V0,M1}  { zero ==> complement( composition( 
% 124.36/124.71    top, top ) ) }.
% 124.36/124.71  parent0[0]: (1278) {G4,W5,D3,L1,V1,M1} P(1276,1268) { composition( one, X )
% 124.36/124.71     ==> X }.
% 124.36/124.71  parent1[0; 2]: (112206) {G16,W8,D5,L1,V1,M1}  { zero ==> composition( X, 
% 124.36/124.71    complement( composition( top, top ) ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := complement( composition( top, top ) )
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := one
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112209) {G5,W6,D4,L1,V0,M1}  { complement( composition( top, top )
% 124.36/124.71     ) ==> zero }.
% 124.36/124.71  parent0[0]: (112208) {G5,W6,D4,L1,V0,M1}  { zero ==> complement( 
% 124.36/124.71    composition( top, top ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (3587) {G17,W6,D4,L1,V0,M1} P(3572,1278) { complement( 
% 124.36/124.71    composition( top, top ) ) ==> zero }.
% 124.36/124.71  parent0: (112209) {G5,W6,D4,L1,V0,M1}  { complement( composition( top, top
% 124.36/124.71     ) ) ==> zero }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112211) {G13,W5,D4,L1,V1,M1}  { X ==> complement( complement( X )
% 124.36/124.71     ) }.
% 124.36/124.71  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.71    complement( complement( X ) ) ==> X }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112213) {G14,W6,D3,L1,V0,M1}  { composition( top, top ) ==> 
% 124.36/124.71    complement( zero ) }.
% 124.36/124.71  parent0[0]: (3587) {G17,W6,D4,L1,V0,M1} P(3572,1278) { complement( 
% 124.36/124.71    composition( top, top ) ) ==> zero }.
% 124.36/124.71  parent1[0; 5]: (112211) {G13,W5,D4,L1,V1,M1}  { X ==> complement( 
% 124.36/124.71    complement( X ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := composition( top, top )
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112214) {G9,W5,D3,L1,V0,M1}  { composition( top, top ) ==> top
% 124.36/124.71     }.
% 124.36/124.71  parent0[0]: (1026) {G8,W4,D3,L1,V0,M1} P(1016,10) { complement( zero ) ==> 
% 124.36/124.71    top }.
% 124.36/124.71  parent1[0; 4]: (112213) {G14,W6,D3,L1,V0,M1}  { composition( top, top ) ==>
% 124.36/124.71     complement( zero ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (3596) {G18,W5,D3,L1,V0,M1} P(3587,1346);d(1026) { composition
% 124.36/124.71    ( top, top ) ==> top }.
% 124.36/124.71  parent0: (112214) {G9,W5,D3,L1,V0,M1}  { composition( top, top ) ==> top
% 124.36/124.71     }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  permutation0:
% 124.36/124.71     0 ==> 0
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  eqswap: (112217) {G0,W11,D4,L1,V3,M1}  { composition( composition( X, Y ), 
% 124.36/124.71    Z ) ==> composition( X, composition( Y, Z ) ) }.
% 124.36/124.71  parent0[0]: (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z
% 124.36/124.71     ) ) ==> composition( composition( X, Y ), Z ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71     X := X
% 124.36/124.71     Y := Y
% 124.36/124.71     Z := Z
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  paramod: (112219) {G1,W9,D4,L1,V1,M1}  { composition( composition( X, top )
% 124.36/124.71    , top ) ==> composition( X, top ) }.
% 124.36/124.71  parent0[0]: (3596) {G18,W5,D3,L1,V0,M1} P(3587,1346);d(1026) { composition
% 124.36/124.71    ( top, top ) ==> top }.
% 124.36/124.71  parent1[0; 8]: (112217) {G0,W11,D4,L1,V3,M1}  { composition( composition( X
% 124.36/124.71    , Y ), Z ) ==> composition( X, composition( Y, Z ) ) }.
% 124.36/124.71  substitution0:
% 124.36/124.71  end
% 124.36/124.71  substitution1:
% 124.36/124.71     X := X
% 124.36/124.71     Y := top
% 124.36/124.71     Z := top
% 124.36/124.71  end
% 124.36/124.71  
% 124.36/124.71  subsumption: (3597) {G19,W9,D4,L1,V1,M1} P(3596,4) { composition( 
% 124.36/124.71    composition( X, top ), top ) ==> composition( X, top ) }.
% 124.36/124.71  parent0: (112219) {G1,W9,D4,L1,V1,M1}  { composition( composition( X, top )
% 124.36/124.71    , top ) ==> composition( X, top ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112223) {G0,W13,D4,L1,V3,M1}  { composition( join( X, Z ), Y ) ==>
% 124.36/124.72     join( composition( X, Y ), composition( Z, Y ) ) }.
% 124.36/124.72  parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ), 
% 124.36/124.72    composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Z
% 124.36/124.72     Z := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112226) {G1,W15,D5,L1,V2,M1}  { composition( join( X, composition
% 124.36/124.72    ( Y, top ) ), top ) ==> join( composition( X, top ), composition( Y, top
% 124.36/124.72     ) ) }.
% 124.36/124.72  parent0[0]: (3597) {G19,W9,D4,L1,V1,M1} P(3596,4) { composition( 
% 124.36/124.72    composition( X, top ), top ) ==> composition( X, top ) }.
% 124.36/124.72  parent1[0; 12]: (112223) {G0,W13,D4,L1,V3,M1}  { composition( join( X, Z )
% 124.36/124.72    , Y ) ==> join( composition( X, Y ), composition( Z, Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := top
% 124.36/124.72     Z := composition( Y, top )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112227) {G1,W13,D5,L1,V2,M1}  { composition( join( X, composition
% 124.36/124.72    ( Y, top ) ), top ) ==> composition( join( X, Y ), top ) }.
% 124.36/124.72  parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ), 
% 124.36/124.72    composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 124.36/124.72  parent1[0; 8]: (112226) {G1,W15,D5,L1,V2,M1}  { composition( join( X, 
% 124.36/124.72    composition( Y, top ) ), top ) ==> join( composition( X, top ), 
% 124.36/124.72    composition( Y, top ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := top
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (3600) {G20,W13,D5,L1,V2,M1} P(3597,6);d(6) { composition( 
% 124.36/124.72    join( Y, composition( X, top ) ), top ) ==> composition( join( Y, X ), 
% 124.36/124.72    top ) }.
% 124.36/124.72  parent0: (112227) {G1,W13,D5,L1,V2,M1}  { composition( join( X, composition
% 124.36/124.72    ( Y, top ) ), top ) ==> composition( join( X, Y ), top ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112230) {G26,W8,D5,L1,V2,M1}  { zero ==> meet( complement( join( X
% 124.36/124.72    , Y ) ), X ) }.
% 124.36/124.72  parent0[0]: (1849) {G26,W8,D5,L1,V2,M1} P(1841,1835) { meet( complement( 
% 124.36/124.72    join( X, Y ) ), X ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112233) {G21,W10,D6,L1,V2,M1}  { zero ==> meet( complement( Y ), 
% 124.36/124.72    converse( meet( X, converse( Y ) ) ) ) }.
% 124.36/124.72  parent0[0]: (1671) {G20,W9,D6,L1,V2,M1} P(1668,65);d(7) { join( converse( 
% 124.36/124.72    meet( X, converse( Y ) ) ), Y ) ==> Y }.
% 124.36/124.72  parent1[0; 4]: (112230) {G26,W8,D5,L1,V2,M1}  { zero ==> meet( complement( 
% 124.36/124.72    join( X, Y ) ), X ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := converse( meet( X, converse( Y ) ) )
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112234) {G21,W10,D6,L1,V2,M1}  { meet( complement( X ), converse( 
% 124.36/124.72    meet( Y, converse( X ) ) ) ) ==> zero }.
% 124.36/124.72  parent0[0]: (112233) {G21,W10,D6,L1,V2,M1}  { zero ==> meet( complement( Y
% 124.36/124.72     ), converse( meet( X, converse( Y ) ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (3824) {G27,W10,D6,L1,V2,M1} P(1671,1849) { meet( complement( 
% 124.36/124.72    Y ), converse( meet( X, converse( Y ) ) ) ) ==> zero }.
% 124.36/124.72  parent0: (112234) {G21,W10,D6,L1,V2,M1}  { meet( complement( X ), converse
% 124.36/124.72    ( meet( Y, converse( X ) ) ) ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112237) {G2,W13,D7,L1,V3,M1}  { join( join( converse( meet( X, 
% 124.36/124.72    converse( Y ) ) ), Z ), Y ) = join( Y, Z ) }.
% 124.36/124.72  parent0[0]: (1671) {G20,W9,D6,L1,V2,M1} P(1668,65);d(7) { join( converse( 
% 124.36/124.72    meet( X, converse( Y ) ) ), Y ) ==> Y }.
% 124.36/124.72  parent1[0; 11]: (20) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y )
% 124.36/124.72    , X ) = join( join( Z, X ), Y ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := Z
% 124.36/124.72     Z := converse( meet( X, converse( Y ) ) )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (3831) {G21,W13,D7,L1,V3,M1} P(1671,20) { join( join( converse
% 124.36/124.72    ( meet( X, converse( Y ) ) ), Z ), Y ) ==> join( Y, Z ) }.
% 124.36/124.72  parent0: (112237) {G2,W13,D7,L1,V3,M1}  { join( join( converse( meet( X, 
% 124.36/124.72    converse( Y ) ) ), Z ), Y ) = join( Y, Z ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := Z
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112238) {G20,W9,D6,L1,V2,M1}  { Y ==> join( converse( meet( X, 
% 124.36/124.72    converse( Y ) ) ), Y ) }.
% 124.36/124.72  parent0[0]: (1671) {G20,W9,D6,L1,V2,M1} P(1668,65);d(7) { join( converse( 
% 124.36/124.72    meet( X, converse( Y ) ) ), Y ) ==> Y }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112240) {G2,W15,D7,L1,V3,M1}  { join( X, Y ) ==> join( converse( 
% 124.36/124.72    meet( Z, converse( join( Y, X ) ) ) ), join( X, Y ) ) }.
% 124.36/124.72  parent0[0]: (63) {G1,W9,D4,L1,V2,M1} P(8,0);d(8) { converse( join( X, Y ) )
% 124.36/124.72     = converse( join( Y, X ) ) }.
% 124.36/124.72  parent1[0; 8]: (112238) {G20,W9,D6,L1,V2,M1}  { Y ==> join( converse( meet
% 124.36/124.72    ( X, converse( Y ) ) ), Y ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := Z
% 124.36/124.72     Y := join( X, Y )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112242) {G1,W15,D8,L1,V3,M1}  { join( X, Y ) ==> join( join( 
% 124.36/124.72    converse( meet( Z, converse( join( Y, X ) ) ) ), X ), Y ) }.
% 124.36/124.72  parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( 
% 124.36/124.72    join( X, Y ), Z ) }.
% 124.36/124.72  parent1[0; 4]: (112240) {G2,W15,D7,L1,V3,M1}  { join( X, Y ) ==> join( 
% 124.36/124.72    converse( meet( Z, converse( join( Y, X ) ) ) ), join( X, Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := converse( meet( Z, converse( join( Y, X ) ) ) )
% 124.36/124.72     Y := X
% 124.36/124.72     Z := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := Z
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112243) {G1,W15,D8,L1,V3,M1}  { join( join( converse( meet( Z, 
% 124.36/124.72    converse( join( Y, X ) ) ) ), X ), Y ) ==> join( X, Y ) }.
% 124.36/124.72  parent0[0]: (112242) {G1,W15,D8,L1,V3,M1}  { join( X, Y ) ==> join( join( 
% 124.36/124.72    converse( meet( Z, converse( join( Y, X ) ) ) ), X ), Y ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := Z
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (3834) {G21,W15,D8,L1,V3,M1} P(63,1671);d(1) { join( join( 
% 124.36/124.72    converse( meet( Z, converse( join( Y, X ) ) ) ), X ), Y ) ==> join( X, Y
% 124.36/124.72     ) }.
% 124.36/124.72  parent0: (112243) {G1,W15,D8,L1,V3,M1}  { join( join( converse( meet( Z, 
% 124.36/124.72    converse( join( Y, X ) ) ) ), X ), Y ) ==> join( X, Y ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := Z
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112245) {G28,W9,D6,L1,V1,M1}  { zero ==> meet( composition( 
% 124.36/124.72    converse( complement( X ) ), X ), one ) }.
% 124.36/124.72  parent0[0]: (3533) {G28,W9,D6,L1,V1,M1} P(1346,1968) { meet( composition( 
% 124.36/124.72    converse( complement( X ) ), X ), one ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112246) {G1,W7,D5,L1,V0,M1}  { zero ==> meet( converse( 
% 124.36/124.72    complement( one ) ), one ) }.
% 124.36/124.72  parent0[0]: (5) {G0,W5,D3,L1,V1,M1} I { composition( X, one ) ==> X }.
% 124.36/124.72  parent1[0; 3]: (112245) {G28,W9,D6,L1,V1,M1}  { zero ==> meet( composition
% 124.36/124.72    ( converse( complement( X ) ), X ), one ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := converse( complement( one ) )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := one
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112247) {G1,W7,D5,L1,V0,M1}  { meet( converse( complement( one ) )
% 124.36/124.72    , one ) ==> zero }.
% 124.36/124.72  parent0[0]: (112246) {G1,W7,D5,L1,V0,M1}  { zero ==> meet( converse( 
% 124.36/124.72    complement( one ) ), one ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (3908) {G29,W7,D5,L1,V0,M1} P(5,3533) { meet( converse( 
% 124.36/124.72    complement( one ) ), one ) ==> zero }.
% 124.36/124.72  parent0: (112247) {G1,W7,D5,L1,V0,M1}  { meet( converse( complement( one )
% 124.36/124.72     ), one ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112248) {G29,W7,D5,L1,V0,M1}  { zero ==> meet( converse( 
% 124.36/124.72    complement( one ) ), one ) }.
% 124.36/124.72  parent0[0]: (3908) {G29,W7,D5,L1,V0,M1} P(5,3533) { meet( converse( 
% 124.36/124.72    complement( one ) ), one ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112249) {G2,W7,D5,L1,V0,M1}  { zero ==> meet( one, converse( 
% 124.36/124.72    complement( one ) ) ) }.
% 124.36/124.72  parent0[0]: (42) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X, 
% 124.36/124.72    Y ) }.
% 124.36/124.72  parent1[0; 2]: (112248) {G29,W7,D5,L1,V0,M1}  { zero ==> meet( converse( 
% 124.36/124.72    complement( one ) ), one ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := one
% 124.36/124.72     Y := converse( complement( one ) )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112252) {G2,W7,D5,L1,V0,M1}  { meet( one, converse( complement( 
% 124.36/124.72    one ) ) ) ==> zero }.
% 124.36/124.72  parent0[0]: (112249) {G2,W7,D5,L1,V0,M1}  { zero ==> meet( one, converse( 
% 124.36/124.72    complement( one ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (3912) {G30,W7,D5,L1,V0,M1} P(3908,42) { meet( one, converse( 
% 124.36/124.72    complement( one ) ) ) ==> zero }.
% 124.36/124.72  parent0: (112252) {G2,W7,D5,L1,V0,M1}  { meet( one, converse( complement( 
% 124.36/124.72    one ) ) ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112255) {G3,W8,D6,L1,V1,M1}  { join( X, converse( complement( 
% 124.36/124.72    converse( X ) ) ) ) ==> top }.
% 124.36/124.72  parent0[0]: (752) {G10,W4,D3,L1,V0,M1} P(738,562) { converse( top ) ==> top
% 124.36/124.72     }.
% 124.36/124.72  parent1[0; 7]: (746) {G2,W9,D6,L1,V1,M1} P(11,64) { join( X, converse( 
% 124.36/124.72    complement( converse( X ) ) ) ) ==> converse( top ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (4056) {G11,W8,D6,L1,V1,M1} S(746);d(752) { join( X, converse
% 124.36/124.72    ( complement( converse( X ) ) ) ) ==> top }.
% 124.36/124.72  parent0: (112255) {G3,W8,D6,L1,V1,M1}  { join( X, converse( complement( 
% 124.36/124.72    converse( X ) ) ) ) ==> top }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112259) {G3,W14,D5,L1,V3,M1}  { join( join( X, complement( Y ) )
% 124.36/124.72    , complement( Z ) ) = join( complement( meet( Z, Y ) ), X ) }.
% 124.36/124.72  parent0[0]: (1353) {G13,W10,D4,L1,V2,M1} P(1340,39);d(3);d(1300) { join( 
% 124.36/124.72    complement( X ), complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 124.36/124.72  parent1[0; 9]: (160) {G2,W11,D4,L1,V3,M1} P(0,19) { join( join( Z, X ), Y )
% 124.36/124.72     = join( join( Y, X ), Z ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Z
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := complement( Y )
% 124.36/124.72     Y := complement( Z )
% 124.36/124.72     Z := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (4368) {G14,W14,D5,L1,V3,M1} P(1353,160) { join( join( Z, 
% 124.36/124.72    complement( Y ) ), complement( X ) ) ==> join( complement( meet( X, Y ) )
% 124.36/124.72    , Z ) }.
% 124.36/124.72  parent0: (112259) {G3,W14,D5,L1,V3,M1}  { join( join( X, complement( Y ) )
% 124.36/124.72    , complement( Z ) ) = join( complement( meet( Z, Y ) ), X ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Z
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112261) {G13,W10,D4,L1,V2,M1}  { complement( meet( X, Y ) ) ==> 
% 124.36/124.72    join( complement( X ), complement( Y ) ) }.
% 124.36/124.72  parent0[0]: (1353) {G13,W10,D4,L1,V2,M1} P(1340,39);d(3);d(1300) { join( 
% 124.36/124.72    complement( X ), complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112262) {G14,W10,D5,L1,V2,M1}  { complement( meet( complement( X
% 124.36/124.72     ), Y ) ) ==> join( X, complement( Y ) ) }.
% 124.36/124.72  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.72    complement( complement( X ) ) ==> X }.
% 124.36/124.72  parent1[0; 7]: (112261) {G13,W10,D4,L1,V2,M1}  { complement( meet( X, Y ) )
% 124.36/124.72     ==> join( complement( X ), complement( Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := complement( X )
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (4372) {G14,W10,D5,L1,V2,M1} P(1346,1353) { complement( meet( 
% 124.36/124.72    complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 124.36/124.72  parent0: (112262) {G14,W10,D5,L1,V2,M1}  { complement( meet( complement( X
% 124.36/124.72     ), Y ) ) ==> join( X, complement( Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112267) {G13,W10,D4,L1,V2,M1}  { complement( meet( X, Y ) ) ==> 
% 124.36/124.72    join( complement( X ), complement( Y ) ) }.
% 124.36/124.72  parent0[0]: (1353) {G13,W10,D4,L1,V2,M1} P(1340,39);d(3);d(1300) { join( 
% 124.36/124.72    complement( X ), complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112269) {G14,W10,D5,L1,V2,M1}  { complement( meet( X, complement
% 124.36/124.72    ( Y ) ) ) ==> join( complement( X ), Y ) }.
% 124.36/124.72  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.72    complement( complement( X ) ) ==> X }.
% 124.36/124.72  parent1[0; 9]: (112267) {G13,W10,D4,L1,V2,M1}  { complement( meet( X, Y ) )
% 124.36/124.72     ==> join( complement( X ), complement( Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := complement( Y )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (4373) {G14,W10,D5,L1,V2,M1} P(1346,1353) { complement( meet( 
% 124.36/124.72    Y, complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 124.36/124.72  parent0: (112269) {G14,W10,D5,L1,V2,M1}  { complement( meet( X, complement
% 124.36/124.72    ( Y ) ) ) ==> join( complement( X ), Y ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112272) {G13,W10,D4,L1,V2,M1}  { complement( meet( X, Y ) ) ==> 
% 124.36/124.72    join( complement( X ), complement( Y ) ) }.
% 124.36/124.72  parent0[0]: (1353) {G13,W10,D4,L1,V2,M1} P(1340,39);d(3);d(1300) { join( 
% 124.36/124.72    complement( X ), complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112274) {G1,W10,D4,L1,V2,M1}  { complement( meet( X, Y ) ) ==> 
% 124.36/124.72    join( complement( Y ), complement( X ) ) }.
% 124.36/124.72  parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.36/124.72  parent1[0; 5]: (112272) {G13,W10,D4,L1,V2,M1}  { complement( meet( X, Y ) )
% 124.36/124.72     ==> join( complement( X ), complement( Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := complement( X )
% 124.36/124.72     Y := complement( Y )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112276) {G2,W9,D4,L1,V2,M1}  { complement( meet( X, Y ) ) ==> 
% 124.36/124.72    complement( meet( Y, X ) ) }.
% 124.36/124.72  parent0[0]: (1353) {G13,W10,D4,L1,V2,M1} P(1340,39);d(3);d(1300) { join( 
% 124.36/124.72    complement( X ), complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 124.36/124.72  parent1[0; 5]: (112274) {G1,W10,D4,L1,V2,M1}  { complement( meet( X, Y ) ) 
% 124.36/124.72    ==> join( complement( Y ), complement( X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (4383) {G14,W9,D4,L1,V2,M1} P(1353,0);d(1353) { complement( 
% 124.36/124.72    meet( X, Y ) ) = complement( meet( Y, X ) ) }.
% 124.36/124.72  parent0: (112276) {G2,W9,D4,L1,V2,M1}  { complement( meet( X, Y ) ) ==> 
% 124.36/124.72    complement( meet( Y, X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112277) {G0,W6,D4,L1,V1,M1}  { top ==> join( X, complement( X ) )
% 124.36/124.72     }.
% 124.36/124.72  parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 124.36/124.72     }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112278) {G1,W10,D5,L1,V2,M1}  { top ==> join( meet( X, Y ), 
% 124.36/124.72    complement( meet( Y, X ) ) ) }.
% 124.36/124.72  parent0[0]: (4383) {G14,W9,D4,L1,V2,M1} P(1353,0);d(1353) { complement( 
% 124.36/124.72    meet( X, Y ) ) = complement( meet( Y, X ) ) }.
% 124.36/124.72  parent1[0; 6]: (112277) {G0,W6,D4,L1,V1,M1}  { top ==> join( X, complement
% 124.36/124.72    ( X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := meet( X, Y )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112281) {G1,W10,D5,L1,V2,M1}  { join( meet( X, Y ), complement( 
% 124.36/124.72    meet( Y, X ) ) ) ==> top }.
% 124.36/124.72  parent0[0]: (112278) {G1,W10,D5,L1,V2,M1}  { top ==> join( meet( X, Y ), 
% 124.36/124.72    complement( meet( Y, X ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (4417) {G15,W10,D5,L1,V2,M1} P(4383,11) { join( meet( X, Y ), 
% 124.36/124.72    complement( meet( Y, X ) ) ) ==> top }.
% 124.36/124.72  parent0: (112281) {G1,W10,D5,L1,V2,M1}  { join( meet( X, Y ), complement( 
% 124.36/124.72    meet( Y, X ) ) ) ==> top }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112282) {G0,W6,D4,L1,V1,M1}  { zero ==> meet( X, complement( X ) )
% 124.36/124.72     }.
% 124.36/124.72  parent0[0]: (12) {G0,W6,D4,L1,V1,M1} I { meet( X, complement( X ) ) ==> 
% 124.36/124.72    zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112283) {G1,W10,D5,L1,V2,M1}  { zero ==> meet( meet( X, Y ), 
% 124.36/124.72    complement( meet( Y, X ) ) ) }.
% 124.36/124.72  parent0[0]: (4383) {G14,W9,D4,L1,V2,M1} P(1353,0);d(1353) { complement( 
% 124.36/124.72    meet( X, Y ) ) = complement( meet( Y, X ) ) }.
% 124.36/124.72  parent1[0; 6]: (112282) {G0,W6,D4,L1,V1,M1}  { zero ==> meet( X, complement
% 124.36/124.72    ( X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := meet( X, Y )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112286) {G1,W10,D5,L1,V2,M1}  { meet( meet( X, Y ), complement( 
% 124.36/124.72    meet( Y, X ) ) ) ==> zero }.
% 124.36/124.72  parent0[0]: (112283) {G1,W10,D5,L1,V2,M1}  { zero ==> meet( meet( X, Y ), 
% 124.36/124.72    complement( meet( Y, X ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (4418) {G15,W10,D5,L1,V2,M1} P(4383,12) { meet( meet( X, Y ), 
% 124.36/124.72    complement( meet( Y, X ) ) ) ==> zero }.
% 124.36/124.72  parent0: (112286) {G1,W10,D5,L1,V2,M1}  { meet( meet( X, Y ), complement( 
% 124.36/124.72    meet( Y, X ) ) ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112288) {G15,W10,D5,L1,V2,M1}  { X ==> join( meet( X, Y ), meet( X
% 124.36/124.72    , complement( Y ) ) ) }.
% 124.36/124.72  parent0[0]: (2039) {G15,W10,D5,L1,V2,M1} S(29);d(1380) { join( meet( X, Y )
% 124.36/124.72    , meet( X, complement( Y ) ) ) ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112290) {G16,W10,D7,L1,V0,M1}  { one ==> join( zero, meet( one, 
% 124.36/124.72    complement( converse( complement( one ) ) ) ) ) }.
% 124.36/124.72  parent0[0]: (3912) {G30,W7,D5,L1,V0,M1} P(3908,42) { meet( one, converse( 
% 124.36/124.72    complement( one ) ) ) ==> zero }.
% 124.36/124.72  parent1[0; 3]: (112288) {G15,W10,D5,L1,V2,M1}  { X ==> join( meet( X, Y ), 
% 124.36/124.72    meet( X, complement( Y ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := one
% 124.36/124.72     Y := converse( complement( one ) )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112291) {G14,W8,D6,L1,V0,M1}  { one ==> meet( one, complement( 
% 124.36/124.72    converse( complement( one ) ) ) ) }.
% 124.36/124.72  parent0[0]: (1354) {G13,W5,D3,L1,V1,M1} P(1340,414) { join( zero, X ) ==> X
% 124.36/124.72     }.
% 124.36/124.72  parent1[0; 2]: (112290) {G16,W10,D7,L1,V0,M1}  { one ==> join( zero, meet( 
% 124.36/124.72    one, complement( converse( complement( one ) ) ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := meet( one, complement( converse( complement( one ) ) ) )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112292) {G14,W8,D6,L1,V0,M1}  { meet( one, complement( converse( 
% 124.36/124.72    complement( one ) ) ) ) ==> one }.
% 124.36/124.72  parent0[0]: (112291) {G14,W8,D6,L1,V0,M1}  { one ==> meet( one, complement
% 124.36/124.72    ( converse( complement( one ) ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (6985) {G31,W8,D6,L1,V0,M1} P(3912,2039);d(1354) { meet( one, 
% 124.36/124.72    complement( converse( complement( one ) ) ) ) ==> one }.
% 124.36/124.72  parent0: (112292) {G14,W8,D6,L1,V0,M1}  { meet( one, complement( converse( 
% 124.36/124.72    complement( one ) ) ) ) ==> one }.
% 124.36/124.72  substitution0:
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112293) {G15,W10,D5,L1,V2,M1}  { X ==> join( meet( X, Y ), meet( X
% 124.36/124.72    , complement( Y ) ) ) }.
% 124.36/124.72  parent0[0]: (2039) {G15,W10,D5,L1,V2,M1} S(29);d(1380) { join( meet( X, Y )
% 124.36/124.72    , meet( X, complement( Y ) ) ) ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112294) {G2,W10,D5,L1,V2,M1}  { X ==> join( meet( Y, X ), meet( X
% 124.36/124.72    , complement( Y ) ) ) }.
% 124.36/124.72  parent0[0]: (42) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X, 
% 124.36/124.72    Y ) }.
% 124.36/124.72  parent1[0; 3]: (112293) {G15,W10,D5,L1,V2,M1}  { X ==> join( meet( X, Y ), 
% 124.36/124.72    meet( X, complement( Y ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112298) {G2,W10,D5,L1,V2,M1}  { join( meet( Y, X ), meet( X, 
% 124.36/124.72    complement( Y ) ) ) ==> X }.
% 124.36/124.72  parent0[0]: (112294) {G2,W10,D5,L1,V2,M1}  { X ==> join( meet( Y, X ), meet
% 124.36/124.72    ( X, complement( Y ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (7035) {G16,W10,D5,L1,V2,M1} P(42,2039) { join( meet( Y, X ), 
% 124.36/124.72    meet( X, complement( Y ) ) ) ==> X }.
% 124.36/124.72  parent0: (112298) {G2,W10,D5,L1,V2,M1}  { join( meet( Y, X ), meet( X, 
% 124.36/124.72    complement( Y ) ) ) ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112303) {G14,W10,D5,L1,V2,M1}  { join( complement( X ), Y ) ==> 
% 124.36/124.72    complement( meet( X, complement( Y ) ) ) }.
% 124.36/124.72  parent0[0]: (4373) {G14,W10,D5,L1,V2,M1} P(1346,1353) { complement( meet( Y
% 124.36/124.72    , complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112304) {G15,W9,D5,L1,V0,M1}  { join( complement( one ), converse
% 124.36/124.72    ( complement( one ) ) ) ==> complement( one ) }.
% 124.36/124.72  parent0[0]: (6985) {G31,W8,D6,L1,V0,M1} P(3912,2039);d(1354) { meet( one, 
% 124.36/124.72    complement( converse( complement( one ) ) ) ) ==> one }.
% 124.36/124.72  parent1[0; 8]: (112303) {G14,W10,D5,L1,V2,M1}  { join( complement( X ), Y )
% 124.36/124.72     ==> complement( meet( X, complement( Y ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := one
% 124.36/124.72     Y := converse( complement( one ) )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (7038) {G32,W9,D5,L1,V0,M1} P(6985,4373) { join( complement( 
% 124.36/124.72    one ), converse( complement( one ) ) ) ==> complement( one ) }.
% 124.36/124.72  parent0: (112304) {G15,W9,D5,L1,V0,M1}  { join( complement( one ), converse
% 124.36/124.72    ( complement( one ) ) ) ==> complement( one ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112309) {G15,W10,D7,L1,V0,M1}  { complement( meet( complement( 
% 124.36/124.72    converse( complement( one ) ) ), one ) ) = complement( one ) }.
% 124.36/124.72  parent0[0]: (6985) {G31,W8,D6,L1,V0,M1} P(3912,2039);d(1354) { meet( one, 
% 124.36/124.72    complement( converse( complement( one ) ) ) ) ==> one }.
% 124.36/124.72  parent1[0; 9]: (4383) {G14,W9,D4,L1,V2,M1} P(1353,0);d(1353) { complement( 
% 124.36/124.72    meet( X, Y ) ) = complement( meet( Y, X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := complement( converse( complement( one ) ) )
% 124.36/124.72     Y := one
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112310) {G15,W9,D5,L1,V0,M1}  { join( converse( complement( one )
% 124.36/124.72     ), complement( one ) ) = complement( one ) }.
% 124.36/124.72  parent0[0]: (4372) {G14,W10,D5,L1,V2,M1} P(1346,1353) { complement( meet( 
% 124.36/124.72    complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 124.36/124.72  parent1[0; 1]: (112309) {G15,W10,D7,L1,V0,M1}  { complement( meet( 
% 124.36/124.72    complement( converse( complement( one ) ) ), one ) ) = complement( one )
% 124.36/124.72     }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := converse( complement( one ) )
% 124.36/124.72     Y := one
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (7054) {G32,W9,D5,L1,V0,M1} P(6985,4383);d(4372) { join( 
% 124.36/124.72    converse( complement( one ) ), complement( one ) ) ==> complement( one )
% 124.36/124.72     }.
% 124.36/124.72  parent0: (112310) {G15,W9,D5,L1,V0,M1}  { join( converse( complement( one )
% 124.36/124.72     ), complement( one ) ) = complement( one ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112313) {G1,W10,D5,L1,V2,M1}  { join( converse( X ), Y ) ==> 
% 124.36/124.72    converse( join( X, converse( Y ) ) ) }.
% 124.36/124.72  parent0[0]: (65) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 124.36/124.72    ( X ) ) ) ==> join( converse( Y ), X ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112315) {G2,W10,D5,L1,V0,M1}  { join( converse( complement( one )
% 124.36/124.72     ), complement( one ) ) ==> converse( complement( one ) ) }.
% 124.36/124.72  parent0[0]: (7038) {G32,W9,D5,L1,V0,M1} P(6985,4373) { join( complement( 
% 124.36/124.72    one ), converse( complement( one ) ) ) ==> complement( one ) }.
% 124.36/124.72  parent1[0; 8]: (112313) {G1,W10,D5,L1,V2,M1}  { join( converse( X ), Y ) 
% 124.36/124.72    ==> converse( join( X, converse( Y ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := complement( one )
% 124.36/124.72     Y := complement( one )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112316) {G3,W6,D4,L1,V0,M1}  { complement( one ) ==> converse( 
% 124.36/124.72    complement( one ) ) }.
% 124.36/124.72  parent0[0]: (7054) {G32,W9,D5,L1,V0,M1} P(6985,4383);d(4372) { join( 
% 124.36/124.72    converse( complement( one ) ), complement( one ) ) ==> complement( one )
% 124.36/124.72     }.
% 124.36/124.72  parent1[0; 1]: (112315) {G2,W10,D5,L1,V0,M1}  { join( converse( complement
% 124.36/124.72    ( one ) ), complement( one ) ) ==> converse( complement( one ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112317) {G3,W6,D4,L1,V0,M1}  { converse( complement( one ) ) ==> 
% 124.36/124.72    complement( one ) }.
% 124.36/124.72  parent0[0]: (112316) {G3,W6,D4,L1,V0,M1}  { complement( one ) ==> converse
% 124.36/124.72    ( complement( one ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (7078) {G33,W6,D4,L1,V0,M1} P(7038,65);d(7054) { converse( 
% 124.36/124.72    complement( one ) ) ==> complement( one ) }.
% 124.36/124.72  parent0: (112317) {G3,W6,D4,L1,V0,M1}  { converse( complement( one ) ) ==> 
% 124.36/124.72    complement( one ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112319) {G1,W14,D5,L1,V3,M1}  { join( X, converse( join( Y, Z ) )
% 124.36/124.72     ) ==> join( join( X, converse( Y ) ), converse( Z ) ) }.
% 124.36/124.72  parent0[0]: (62) {G1,W14,D5,L1,V3,M1} P(8,1) { join( join( Z, converse( X )
% 124.36/124.72     ), converse( Y ) ) ==> join( Z, converse( join( X, Y ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := Z
% 124.36/124.72     Z := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112320) {G2,W15,D6,L1,V2,M1}  { join( X, converse( join( 
% 124.36/124.72    complement( one ), Y ) ) ) ==> join( join( X, complement( one ) ), 
% 124.36/124.72    converse( Y ) ) }.
% 124.36/124.72  parent0[0]: (7078) {G33,W6,D4,L1,V0,M1} P(7038,65);d(7054) { converse( 
% 124.36/124.72    complement( one ) ) ==> complement( one ) }.
% 124.36/124.72  parent1[0; 11]: (112319) {G1,W14,D5,L1,V3,M1}  { join( X, converse( join( Y
% 124.36/124.72    , Z ) ) ) ==> join( join( X, converse( Y ) ), converse( Z ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := complement( one )
% 124.36/124.72     Z := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (7096) {G34,W15,D6,L1,V2,M1} P(7078,62) { join( X, converse( 
% 124.36/124.72    join( complement( one ), Y ) ) ) ==> join( join( X, complement( one ) ), 
% 124.36/124.72    converse( Y ) ) }.
% 124.36/124.72  parent0: (112320) {G2,W15,D6,L1,V2,M1}  { join( X, converse( join( 
% 124.36/124.72    complement( one ), Y ) ) ) ==> join( join( X, complement( one ) ), 
% 124.36/124.72    converse( Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112324) {G16,W10,D5,L1,V2,M1}  { Y ==> join( meet( X, Y ), meet( Y
% 124.36/124.72    , complement( X ) ) ) }.
% 124.36/124.72  parent0[0]: (7035) {G16,W10,D5,L1,V2,M1} P(42,2039) { join( meet( Y, X ), 
% 124.36/124.72    meet( X, complement( Y ) ) ) ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112325) {G1,W10,D5,L1,V2,M1}  { X ==> join( meet( X, complement( 
% 124.36/124.72    Y ) ), meet( Y, X ) ) }.
% 124.36/124.72  parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.36/124.72  parent1[0; 2]: (112324) {G16,W10,D5,L1,V2,M1}  { Y ==> join( meet( X, Y ), 
% 124.36/124.72    meet( Y, complement( X ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := meet( Y, X )
% 124.36/124.72     Y := meet( X, complement( Y ) )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112328) {G1,W10,D5,L1,V2,M1}  { join( meet( X, complement( Y ) ), 
% 124.36/124.72    meet( Y, X ) ) ==> X }.
% 124.36/124.72  parent0[0]: (112325) {G1,W10,D5,L1,V2,M1}  { X ==> join( meet( X, 
% 124.36/124.72    complement( Y ) ), meet( Y, X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (7146) {G17,W10,D5,L1,V2,M1} P(7035,0) { join( meet( Y, 
% 124.36/124.72    complement( X ) ), meet( X, Y ) ) ==> Y }.
% 124.36/124.72  parent0: (112328) {G1,W10,D5,L1,V2,M1}  { join( meet( X, complement( Y ) )
% 124.36/124.72    , meet( Y, X ) ) ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112330) {G14,W10,D5,L1,V2,M1}  { meet( complement( X ), Y ) ==> 
% 124.36/124.72    complement( join( X, complement( Y ) ) ) }.
% 124.36/124.72  parent0[0]: (1379) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( X, 
% 124.36/124.72    complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112333) {G4,W11,D5,L1,V2,M1}  { meet( complement( join( X, Y ) )
% 124.36/124.72    , join( Y, X ) ) ==> complement( top ) }.
% 124.36/124.72  parent0[0]: (2728) {G3,W10,D5,L1,V2,M1} P(160,22) { join( join( Y, X ), 
% 124.36/124.72    complement( join( X, Y ) ) ) ==> top }.
% 124.36/124.72  parent1[0; 10]: (112330) {G14,W10,D5,L1,V2,M1}  { meet( complement( X ), Y
% 124.36/124.72     ) ==> complement( join( X, complement( Y ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := join( X, Y )
% 124.36/124.72     Y := join( Y, X )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112334) {G2,W10,D5,L1,V2,M1}  { meet( complement( join( X, Y ) )
% 124.36/124.72    , join( Y, X ) ) ==> zero }.
% 124.36/124.72  parent0[0]: (44) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==> 
% 124.36/124.72    zero }.
% 124.36/124.72  parent1[0; 9]: (112333) {G4,W11,D5,L1,V2,M1}  { meet( complement( join( X, 
% 124.36/124.72    Y ) ), join( Y, X ) ) ==> complement( top ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (7612) {G15,W10,D5,L1,V2,M1} P(2728,1379);d(44) { meet( 
% 124.36/124.72    complement( join( X, Y ) ), join( Y, X ) ) ==> zero }.
% 124.36/124.72  parent0: (112334) {G2,W10,D5,L1,V2,M1}  { meet( complement( join( X, Y ) )
% 124.36/124.72    , join( Y, X ) ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112337) {G14,W10,D5,L1,V2,M1}  { meet( complement( X ), Y ) ==> 
% 124.36/124.72    complement( join( X, complement( Y ) ) ) }.
% 124.36/124.72  parent0[0]: (1379) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( X, 
% 124.36/124.72    complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112341) {G14,W10,D4,L1,V2,M1}  { meet( complement( X ), 
% 124.36/124.72    complement( Y ) ) ==> complement( join( X, Y ) ) }.
% 124.36/124.72  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.72    complement( complement( X ) ) ==> X }.
% 124.36/124.72  parent1[0; 9]: (112337) {G14,W10,D5,L1,V2,M1}  { meet( complement( X ), Y )
% 124.36/124.72     ==> complement( join( X, complement( Y ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := complement( Y )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (7678) {G15,W10,D4,L1,V2,M1} P(1346,1379) { meet( complement( 
% 124.36/124.72    Y ), complement( X ) ) ==> complement( join( Y, X ) ) }.
% 124.36/124.72  parent0: (112341) {G14,W10,D4,L1,V2,M1}  { meet( complement( X ), 
% 124.36/124.72    complement( Y ) ) ==> complement( join( X, Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112344) {G14,W10,D5,L1,V2,M1}  { meet( complement( X ), Y ) ==> 
% 124.36/124.72    complement( join( X, complement( Y ) ) ) }.
% 124.36/124.72  parent0[0]: (1379) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( X, 
% 124.36/124.72    complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112345) {G2,W14,D6,L1,V3,M1}  { meet( complement( join( X, Y ) )
% 124.36/124.72    , Z ) ==> complement( join( join( X, complement( Z ) ), Y ) ) }.
% 124.36/124.72  parent0[0]: (20) {G1,W11,D4,L1,V3,M1} P(0,1);d(1) { join( join( Z, Y ), X )
% 124.36/124.72     = join( join( Z, X ), Y ) }.
% 124.36/124.72  parent1[0; 8]: (112344) {G14,W10,D5,L1,V2,M1}  { meet( complement( X ), Y )
% 124.36/124.72     ==> complement( join( X, complement( Y ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := complement( Z )
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := join( X, Y )
% 124.36/124.72     Y := Z
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112348) {G2,W14,D6,L1,V3,M1}  { complement( join( join( X, 
% 124.36/124.72    complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 124.36/124.72  parent0[0]: (112345) {G2,W14,D6,L1,V3,M1}  { meet( complement( join( X, Y )
% 124.36/124.72     ), Z ) ==> complement( join( join( X, complement( Z ) ), Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := Z
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (7681) {G15,W14,D6,L1,V3,M1} P(20,1379) { complement( join( 
% 124.36/124.72    join( X, complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z
% 124.36/124.72     ) }.
% 124.36/124.72  parent0: (112348) {G2,W14,D6,L1,V3,M1}  { complement( join( join( X, 
% 124.36/124.72    complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := Z
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112349) {G15,W10,D4,L1,V2,M1}  { complement( join( X, Y ) ) ==> 
% 124.36/124.72    meet( complement( X ), complement( Y ) ) }.
% 124.36/124.72  parent0[0]: (7678) {G15,W10,D4,L1,V2,M1} P(1346,1379) { meet( complement( Y
% 124.36/124.72     ), complement( X ) ) ==> complement( join( Y, X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112351) {G2,W10,D4,L1,V2,M1}  { complement( join( X, Y ) ) ==> 
% 124.36/124.72    meet( complement( Y ), complement( X ) ) }.
% 124.36/124.72  parent0[0]: (42) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X, 
% 124.36/124.72    Y ) }.
% 124.36/124.72  parent1[0; 5]: (112349) {G15,W10,D4,L1,V2,M1}  { complement( join( X, Y ) )
% 124.36/124.72     ==> meet( complement( X ), complement( Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := complement( Y )
% 124.36/124.72     Y := complement( X )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112353) {G3,W9,D4,L1,V2,M1}  { complement( join( X, Y ) ) ==> 
% 124.36/124.72    complement( join( Y, X ) ) }.
% 124.36/124.72  parent0[0]: (7678) {G15,W10,D4,L1,V2,M1} P(1346,1379) { meet( complement( Y
% 124.36/124.72     ), complement( X ) ) ==> complement( join( Y, X ) ) }.
% 124.36/124.72  parent1[0; 5]: (112351) {G2,W10,D4,L1,V2,M1}  { complement( join( X, Y ) ) 
% 124.36/124.72    ==> meet( complement( Y ), complement( X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (7750) {G16,W9,D4,L1,V2,M1} P(7678,42);d(7678) { complement( 
% 124.36/124.72    join( X, Y ) ) = complement( join( Y, X ) ) }.
% 124.36/124.72  parent0: (112353) {G3,W9,D4,L1,V2,M1}  { complement( join( X, Y ) ) ==> 
% 124.36/124.72    complement( join( Y, X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112358) {G17,W12,D6,L1,V3,M1}  { complement( join( complement( 
% 124.36/124.72    meet( X, Y ) ), join( Z, Y ) ) ) = complement( top ) }.
% 124.36/124.72  parent0[0]: (1785) {G20,W10,D5,L1,V3,M1} P(1646,19);d(562) { join( join( Z
% 124.36/124.72    , X ), complement( meet( Y, X ) ) ) ==> top }.
% 124.36/124.72  parent1[0; 11]: (7750) {G16,W9,D4,L1,V2,M1} P(7678,42);d(7678) { complement
% 124.36/124.72    ( join( X, Y ) ) = complement( join( Y, X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72     Z := Z
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := complement( meet( X, Y ) )
% 124.36/124.72     Y := join( Z, Y )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112359) {G2,W11,D6,L1,V3,M1}  { complement( join( complement( 
% 124.36/124.72    meet( X, Y ) ), join( Z, Y ) ) ) = zero }.
% 124.36/124.72  parent0[0]: (44) {G1,W4,D3,L1,V0,M1} P(11,3);d(12) { complement( top ) ==> 
% 124.36/124.72    zero }.
% 124.36/124.72  parent1[0; 10]: (112358) {G17,W12,D6,L1,V3,M1}  { complement( join( 
% 124.36/124.72    complement( meet( X, Y ) ), join( Z, Y ) ) ) = complement( top ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := Z
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112360) {G3,W10,D5,L1,V3,M1}  { meet( meet( X, Y ), complement( 
% 124.36/124.72    join( Z, Y ) ) ) = zero }.
% 124.36/124.72  parent0[0]: (1380) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( 
% 124.36/124.72    complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 124.36/124.72  parent1[0; 1]: (112359) {G2,W11,D6,L1,V3,M1}  { complement( join( 
% 124.36/124.72    complement( meet( X, Y ) ), join( Z, Y ) ) ) = zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := join( Z, Y )
% 124.36/124.72     Y := meet( X, Y )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := Z
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (7767) {G21,W10,D5,L1,V3,M1} P(1785,7750);d(44);d(1380) { meet
% 124.36/124.72    ( meet( Z, Y ), complement( join( X, Y ) ) ) ==> zero }.
% 124.36/124.72  parent0: (112360) {G3,W10,D5,L1,V3,M1}  { meet( meet( X, Y ), complement( 
% 124.36/124.72    join( Z, Y ) ) ) = zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Z
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112363) {G21,W10,D5,L1,V3,M1}  { zero ==> meet( meet( X, Y ), 
% 124.36/124.72    complement( join( Z, Y ) ) ) }.
% 124.36/124.72  parent0[0]: (7767) {G21,W10,D5,L1,V3,M1} P(1785,7750);d(44);d(1380) { meet
% 124.36/124.72    ( meet( Z, Y ), complement( join( X, Y ) ) ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Z
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112368) {G18,W10,D5,L1,V3,M1}  { zero ==> meet( meet( X, meet( Y
% 124.36/124.72    , Z ) ), complement( Z ) ) }.
% 124.36/124.72  parent0[0]: (7146) {G17,W10,D5,L1,V2,M1} P(7035,0) { join( meet( Y, 
% 124.36/124.72    complement( X ) ), meet( X, Y ) ) ==> Y }.
% 124.36/124.72  parent1[0; 9]: (112363) {G21,W10,D5,L1,V3,M1}  { zero ==> meet( meet( X, Y
% 124.36/124.72     ), complement( join( Z, Y ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := Z
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := meet( Y, Z )
% 124.36/124.72     Z := meet( Z, complement( Y ) )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112369) {G18,W10,D5,L1,V3,M1}  { meet( meet( X, meet( Y, Z ) ), 
% 124.36/124.72    complement( Z ) ) ==> zero }.
% 124.36/124.72  parent0[0]: (112368) {G18,W10,D5,L1,V3,M1}  { zero ==> meet( meet( X, meet
% 124.36/124.72    ( Y, Z ) ), complement( Z ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := Z
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (7839) {G22,W10,D5,L1,V3,M1} P(7146,7767) { meet( meet( Z, 
% 124.36/124.72    meet( Y, X ) ), complement( X ) ) ==> zero }.
% 124.36/124.72  parent0: (112369) {G18,W10,D5,L1,V3,M1}  { meet( meet( X, meet( Y, Z ) ), 
% 124.36/124.72    complement( Z ) ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Z
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112371) {G22,W10,D5,L1,V3,M1}  { zero ==> meet( meet( X, meet( Y, 
% 124.36/124.72    Z ) ), complement( Z ) ) }.
% 124.36/124.72  parent0[0]: (7839) {G22,W10,D5,L1,V3,M1} P(7146,7767) { meet( meet( Z, meet
% 124.36/124.72    ( Y, X ) ), complement( X ) ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Z
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112374) {G23,W12,D6,L1,V3,M1}  { zero ==> meet( meet( X, 
% 124.36/124.72    complement( Y ) ), complement( complement( meet( Y, Z ) ) ) ) }.
% 124.36/124.72  parent0[0]: (1834) {G25,W10,D5,L1,V2,M1} P(1826,29);d(1333);d(1380) { meet
% 124.36/124.72    ( complement( X ), complement( meet( X, Y ) ) ) ==> complement( X ) }.
% 124.36/124.72  parent1[0; 5]: (112371) {G22,W10,D5,L1,V3,M1}  { zero ==> meet( meet( X, 
% 124.36/124.72    meet( Y, Z ) ), complement( Z ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := Z
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := complement( Y )
% 124.36/124.72     Z := complement( meet( Y, Z ) )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112375) {G14,W10,D5,L1,V3,M1}  { zero ==> meet( meet( X, 
% 124.36/124.72    complement( Y ) ), meet( Y, Z ) ) }.
% 124.36/124.72  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.72    complement( complement( X ) ) ==> X }.
% 124.36/124.72  parent1[0; 7]: (112374) {G23,W12,D6,L1,V3,M1}  { zero ==> meet( meet( X, 
% 124.36/124.72    complement( Y ) ), complement( complement( meet( Y, Z ) ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := meet( Y, Z )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := Z
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112376) {G14,W10,D5,L1,V3,M1}  { meet( meet( X, complement( Y ) )
% 124.36/124.72    , meet( Y, Z ) ) ==> zero }.
% 124.36/124.72  parent0[0]: (112375) {G14,W10,D5,L1,V3,M1}  { zero ==> meet( meet( X, 
% 124.36/124.72    complement( Y ) ), meet( Y, Z ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := Z
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (7905) {G26,W10,D5,L1,V3,M1} P(1834,7839);d(1346) { meet( meet
% 124.36/124.72    ( Z, complement( X ) ), meet( X, Y ) ) ==> zero }.
% 124.36/124.72  parent0: (112376) {G14,W10,D5,L1,V3,M1}  { meet( meet( X, complement( Y ) )
% 124.36/124.72    , meet( Y, Z ) ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Z
% 124.36/124.72     Y := X
% 124.36/124.72     Z := Y
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112378) {G15,W10,D5,L1,V2,M1}  { zero ==> meet( meet( X, Y ), 
% 124.36/124.72    complement( meet( Y, X ) ) ) }.
% 124.36/124.72  parent0[0]: (4418) {G15,W10,D5,L1,V2,M1} P(4383,12) { meet( meet( X, Y ), 
% 124.36/124.72    complement( meet( Y, X ) ) ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112384) {G16,W13,D6,L1,V3,M1}  { zero ==> meet( meet( meet( X, Y
% 124.36/124.72     ), meet( Z, complement( X ) ) ), complement( zero ) ) }.
% 124.36/124.72  parent0[0]: (7905) {G26,W10,D5,L1,V3,M1} P(1834,7839);d(1346) { meet( meet
% 124.36/124.72    ( Z, complement( X ) ), meet( X, Y ) ) ==> zero }.
% 124.36/124.72  parent1[0; 12]: (112378) {G15,W10,D5,L1,V2,M1}  { zero ==> meet( meet( X, Y
% 124.36/124.72     ), complement( meet( Y, X ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := Z
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := meet( X, Y )
% 124.36/124.72     Y := meet( Z, complement( X ) )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112385) {G9,W12,D6,L1,V3,M1}  { zero ==> meet( meet( meet( X, Y )
% 124.36/124.72    , meet( Z, complement( X ) ) ), top ) }.
% 124.36/124.72  parent0[0]: (1026) {G8,W4,D3,L1,V0,M1} P(1016,10) { complement( zero ) ==> 
% 124.36/124.72    top }.
% 124.36/124.72  parent1[0; 11]: (112384) {G16,W13,D6,L1,V3,M1}  { zero ==> meet( meet( meet
% 124.36/124.72    ( X, Y ), meet( Z, complement( X ) ) ), complement( zero ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := Z
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112386) {G10,W10,D5,L1,V3,M1}  { zero ==> meet( meet( X, Y ), 
% 124.36/124.72    meet( Z, complement( X ) ) ) }.
% 124.36/124.72  parent0[0]: (1344) {G12,W5,D3,L1,V1,M1} P(46,1333);d(639) { meet( X, top ) 
% 124.36/124.72    ==> X }.
% 124.36/124.72  parent1[0; 2]: (112385) {G9,W12,D6,L1,V3,M1}  { zero ==> meet( meet( meet( 
% 124.36/124.72    X, Y ), meet( Z, complement( X ) ) ), top ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := meet( meet( X, Y ), meet( Z, complement( X ) ) )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := Z
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112387) {G10,W10,D5,L1,V3,M1}  { meet( meet( X, Y ), meet( Z, 
% 124.36/124.72    complement( X ) ) ) ==> zero }.
% 124.36/124.72  parent0[0]: (112386) {G10,W10,D5,L1,V3,M1}  { zero ==> meet( meet( X, Y ), 
% 124.36/124.72    meet( Z, complement( X ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := Z
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (7937) {G27,W10,D5,L1,V3,M1} P(7905,4418);d(1026);d(1344) { 
% 124.36/124.72    meet( meet( Y, Z ), meet( X, complement( Y ) ) ) ==> zero }.
% 124.36/124.72  parent0: (112387) {G10,W10,D5,L1,V3,M1}  { meet( meet( X, Y ), meet( Z, 
% 124.36/124.72    complement( X ) ) ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := Z
% 124.36/124.72     Z := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112389) {G26,W10,D5,L1,V3,M1}  { zero ==> meet( meet( X, 
% 124.36/124.72    complement( Y ) ), meet( Y, Z ) ) }.
% 124.36/124.72  parent0[0]: (7905) {G26,W10,D5,L1,V3,M1} P(1834,7839);d(1346) { meet( meet
% 124.36/124.72    ( Z, complement( X ) ), meet( X, Y ) ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := Z
% 124.36/124.72     Z := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112391) {G27,W10,D6,L1,V3,M1}  { zero ==> meet( meet( X, 
% 124.36/124.72    complement( join( Y, Z ) ) ), Y ) }.
% 124.36/124.72  parent0[0]: (1864) {G26,W7,D4,L1,V2,M1} P(1841,42) { meet( join( X, Y ), X
% 124.36/124.72     ) ==> X }.
% 124.36/124.72  parent1[0; 9]: (112389) {G26,W10,D5,L1,V3,M1}  { zero ==> meet( meet( X, 
% 124.36/124.72    complement( Y ) ), meet( Y, Z ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := Z
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := join( Y, Z )
% 124.36/124.72     Z := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112393) {G27,W10,D6,L1,V3,M1}  { meet( meet( X, complement( join( 
% 124.36/124.72    Y, Z ) ) ), Y ) ==> zero }.
% 124.36/124.72  parent0[0]: (112391) {G27,W10,D6,L1,V3,M1}  { zero ==> meet( meet( X, 
% 124.36/124.72    complement( join( Y, Z ) ) ), Y ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := Z
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (7975) {G27,W10,D6,L1,V3,M1} P(1864,7905) { meet( meet( Z, 
% 124.36/124.72    complement( join( X, Y ) ) ), X ) ==> zero }.
% 124.36/124.72  parent0: (112393) {G27,W10,D6,L1,V3,M1}  { meet( meet( X, complement( join
% 124.36/124.72    ( Y, Z ) ) ), Y ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Z
% 124.36/124.72     Y := X
% 124.36/124.72     Z := Y
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112395) {G27,W10,D5,L1,V3,M1}  { zero ==> meet( meet( X, Y ), meet
% 124.36/124.72    ( Z, complement( X ) ) ) }.
% 124.36/124.72  parent0[0]: (7937) {G27,W10,D5,L1,V3,M1} P(7905,4418);d(1026);d(1344) { 
% 124.36/124.72    meet( meet( Y, Z ), meet( X, complement( Y ) ) ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Z
% 124.36/124.72     Y := X
% 124.36/124.72     Z := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112396) {G27,W10,D6,L1,V3,M1}  { zero ==> meet( X, meet( Z, 
% 124.36/124.72    complement( join( X, Y ) ) ) ) }.
% 124.36/124.72  parent0[0]: (1864) {G26,W7,D4,L1,V2,M1} P(1841,42) { meet( join( X, Y ), X
% 124.36/124.72     ) ==> X }.
% 124.36/124.72  parent1[0; 3]: (112395) {G27,W10,D5,L1,V3,M1}  { zero ==> meet( meet( X, Y
% 124.36/124.72     ), meet( Z, complement( X ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := join( X, Y )
% 124.36/124.72     Y := X
% 124.36/124.72     Z := Z
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112398) {G27,W10,D6,L1,V3,M1}  { meet( X, meet( Y, complement( 
% 124.36/124.72    join( X, Z ) ) ) ) ==> zero }.
% 124.36/124.72  parent0[0]: (112396) {G27,W10,D6,L1,V3,M1}  { zero ==> meet( X, meet( Z, 
% 124.36/124.72    complement( join( X, Y ) ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Z
% 124.36/124.72     Z := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (8140) {G28,W10,D6,L1,V3,M1} P(1864,7937) { meet( X, meet( Z, 
% 124.36/124.72    complement( join( X, Y ) ) ) ) ==> zero }.
% 124.36/124.72  parent0: (112398) {G27,W10,D6,L1,V3,M1}  { meet( X, meet( Y, complement( 
% 124.36/124.72    join( X, Z ) ) ) ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Z
% 124.36/124.72     Z := Y
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112401) {G15,W10,D5,L1,V2,M1}  { zero ==> meet( complement( join( 
% 124.36/124.72    X, Y ) ), join( Y, X ) ) }.
% 124.36/124.72  parent0[0]: (7612) {G15,W10,D5,L1,V2,M1} P(2728,1379);d(44) { meet( 
% 124.36/124.72    complement( join( X, Y ) ), join( Y, X ) ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112407) {G14,W13,D6,L1,V2,M1}  { zero ==> meet( complement( join
% 124.36/124.72    ( complement( X ), complement( Y ) ) ), complement( meet( Y, X ) ) ) }.
% 124.36/124.72  parent0[0]: (1353) {G13,W10,D4,L1,V2,M1} P(1340,39);d(3);d(1300) { join( 
% 124.36/124.72    complement( X ), complement( Y ) ) ==> complement( meet( X, Y ) ) }.
% 124.36/124.72  parent1[0; 9]: (112401) {G15,W10,D5,L1,V2,M1}  { zero ==> meet( complement
% 124.36/124.72    ( join( X, Y ) ), join( Y, X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := complement( X )
% 124.36/124.72     Y := complement( Y )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112409) {G15,W12,D6,L1,V2,M1}  { zero ==> complement( join( join
% 124.36/124.72    ( complement( X ), complement( Y ) ), meet( Y, X ) ) ) }.
% 124.36/124.72  parent0[0]: (7678) {G15,W10,D4,L1,V2,M1} P(1346,1379) { meet( complement( Y
% 124.36/124.72     ), complement( X ) ) ==> complement( join( Y, X ) ) }.
% 124.36/124.72  parent1[0; 2]: (112407) {G14,W13,D6,L1,V2,M1}  { zero ==> meet( complement
% 124.36/124.72    ( join( complement( X ), complement( Y ) ) ), complement( meet( Y, X ) )
% 124.36/124.72     ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := meet( Y, X )
% 124.36/124.72     Y := join( complement( X ), complement( Y ) )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112410) {G16,W11,D6,L1,V2,M1}  { zero ==> meet( complement( join
% 124.36/124.72    ( complement( X ), meet( Y, X ) ) ), Y ) }.
% 124.36/124.72  parent0[0]: (7681) {G15,W14,D6,L1,V3,M1} P(20,1379) { complement( join( 
% 124.36/124.72    join( X, complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z
% 124.36/124.72     ) }.
% 124.36/124.72  parent1[0; 2]: (112409) {G15,W12,D6,L1,V2,M1}  { zero ==> complement( join
% 124.36/124.72    ( join( complement( X ), complement( Y ) ), meet( Y, X ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := complement( X )
% 124.36/124.72     Y := meet( Y, X )
% 124.36/124.72     Z := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112411) {G15,W10,D6,L1,V2,M1}  { zero ==> meet( meet( X, 
% 124.36/124.72    complement( meet( Y, X ) ) ), Y ) }.
% 124.36/124.72  parent0[0]: (1380) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( 
% 124.36/124.72    complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 124.36/124.72  parent1[0; 3]: (112410) {G16,W11,D6,L1,V2,M1}  { zero ==> meet( complement
% 124.36/124.72    ( join( complement( X ), meet( Y, X ) ) ), Y ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := meet( Y, X )
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112412) {G15,W10,D6,L1,V2,M1}  { meet( meet( X, complement( meet( 
% 124.36/124.72    Y, X ) ) ), Y ) ==> zero }.
% 124.36/124.72  parent0[0]: (112411) {G15,W10,D6,L1,V2,M1}  { zero ==> meet( meet( X, 
% 124.36/124.72    complement( meet( Y, X ) ) ), Y ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (8509) {G16,W10,D6,L1,V2,M1} P(1353,7612);d(7678);d(7681);d(
% 124.36/124.72    1380) { meet( meet( Y, complement( meet( X, Y ) ) ), X ) ==> zero }.
% 124.36/124.72  parent0: (112412) {G15,W10,D6,L1,V2,M1}  { meet( meet( X, complement( meet
% 124.36/124.72    ( Y, X ) ) ), Y ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112414) {G17,W10,D5,L1,V2,M1}  { X ==> join( meet( X, complement( 
% 124.36/124.72    Y ) ), meet( Y, X ) ) }.
% 124.36/124.72  parent0[0]: (7146) {G17,W10,D5,L1,V2,M1} P(7035,0) { join( meet( Y, 
% 124.36/124.72    complement( X ) ), meet( X, Y ) ) ==> Y }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112418) {G17,W13,D8,L1,V2,M1}  { X ==> join( meet( X, complement
% 124.36/124.72    ( meet( Y, complement( meet( X, Y ) ) ) ) ), zero ) }.
% 124.36/124.72  parent0[0]: (8509) {G16,W10,D6,L1,V2,M1} P(1353,7612);d(7678);d(7681);d(
% 124.36/124.72    1380) { meet( meet( Y, complement( meet( X, Y ) ) ), X ) ==> zero }.
% 124.36/124.72  parent1[0; 12]: (112414) {G17,W10,D5,L1,V2,M1}  { X ==> join( meet( X, 
% 124.36/124.72    complement( Y ) ), meet( Y, X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := meet( Y, complement( meet( X, Y ) ) )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112419) {G14,W11,D7,L1,V2,M1}  { X ==> meet( X, complement( meet
% 124.36/124.72    ( Y, complement( meet( X, Y ) ) ) ) ) }.
% 124.36/124.72  parent0[0]: (1355) {G13,W5,D3,L1,V1,M1} P(1340,409) { join( X, zero ) ==> X
% 124.36/124.72     }.
% 124.36/124.72  parent1[0; 2]: (112418) {G17,W13,D8,L1,V2,M1}  { X ==> join( meet( X, 
% 124.36/124.72    complement( meet( Y, complement( meet( X, Y ) ) ) ) ), zero ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := meet( X, complement( meet( Y, complement( meet( X, Y ) ) ) ) )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112420) {G15,W10,D5,L1,V2,M1}  { X ==> meet( X, join( complement
% 124.36/124.72    ( Y ), meet( X, Y ) ) ) }.
% 124.36/124.72  parent0[0]: (4373) {G14,W10,D5,L1,V2,M1} P(1346,1353) { complement( meet( Y
% 124.36/124.72    , complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 124.36/124.72  parent1[0; 4]: (112419) {G14,W11,D7,L1,V2,M1}  { X ==> meet( X, complement
% 124.36/124.72    ( meet( Y, complement( meet( X, Y ) ) ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := meet( X, Y )
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112421) {G15,W10,D5,L1,V2,M1}  { meet( X, join( complement( Y ), 
% 124.36/124.72    meet( X, Y ) ) ) ==> X }.
% 124.36/124.72  parent0[0]: (112420) {G15,W10,D5,L1,V2,M1}  { X ==> meet( X, join( 
% 124.36/124.72    complement( Y ), meet( X, Y ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (10619) {G18,W10,D5,L1,V2,M1} P(8509,7146);d(1355);d(4373) { 
% 124.36/124.72    meet( Y, join( complement( X ), meet( Y, X ) ) ) ==> Y }.
% 124.36/124.72  parent0: (112421) {G15,W10,D5,L1,V2,M1}  { meet( X, join( complement( Y ), 
% 124.36/124.72    meet( X, Y ) ) ) ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112423) {G19,W7,D4,L1,V2,M1}  { Y ==> join( meet( X, Y ), Y ) }.
% 124.36/124.72  parent0[0]: (1668) {G19,W7,D4,L1,V2,M1} P(1643,0) { join( meet( Y, X ), X )
% 124.36/124.72     ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112426) {G19,W15,D5,L1,V2,M1}  { join( complement( X ), meet( Y, 
% 124.36/124.72    X ) ) ==> join( Y, join( complement( X ), meet( Y, X ) ) ) }.
% 124.36/124.72  parent0[0]: (10619) {G18,W10,D5,L1,V2,M1} P(8509,7146);d(1355);d(4373) { 
% 124.36/124.72    meet( Y, join( complement( X ), meet( Y, X ) ) ) ==> Y }.
% 124.36/124.72  parent1[0; 8]: (112423) {G19,W7,D4,L1,V2,M1}  { Y ==> join( meet( X, Y ), Y
% 124.36/124.72     ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := join( complement( X ), meet( Y, X ) )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112427) {G1,W15,D5,L1,V2,M1}  { join( complement( X ), meet( Y, X
% 124.36/124.72     ) ) ==> join( join( Y, complement( X ) ), meet( Y, X ) ) }.
% 124.36/124.72  parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( 
% 124.36/124.72    join( X, Y ), Z ) }.
% 124.36/124.72  parent1[0; 7]: (112426) {G19,W15,D5,L1,V2,M1}  { join( complement( X ), 
% 124.36/124.72    meet( Y, X ) ) ==> join( Y, join( complement( X ), meet( Y, X ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := complement( X )
% 124.36/124.72     Z := meet( Y, X )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112428) {G2,W11,D4,L1,V2,M1}  { join( complement( X ), meet( Y, X
% 124.36/124.72     ) ) ==> join( Y, complement( X ) ) }.
% 124.36/124.72  parent0[0]: (1637) {G18,W11,D4,L1,V3,M1} P(1595,20) { join( join( X, Z ), 
% 124.36/124.72    meet( X, Y ) ) ==> join( X, Z ) }.
% 124.36/124.72  parent1[0; 7]: (112427) {G1,W15,D5,L1,V2,M1}  { join( complement( X ), meet
% 124.36/124.72    ( Y, X ) ) ==> join( join( Y, complement( X ) ), meet( Y, X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72     Z := complement( X )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (10652) {G20,W11,D4,L1,V2,M1} P(10619,1668);d(1);d(1637) { 
% 124.36/124.72    join( complement( Y ), meet( X, Y ) ) ==> join( X, complement( Y ) ) }.
% 124.36/124.72  parent0: (112428) {G2,W11,D4,L1,V2,M1}  { join( complement( X ), meet( Y, X
% 124.36/124.72     ) ) ==> join( Y, complement( X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112430) {G18,W10,D5,L1,V2,M1}  { X ==> meet( X, join( complement( 
% 124.36/124.72    Y ), meet( X, Y ) ) ) }.
% 124.36/124.72  parent0[0]: (10619) {G18,W10,D5,L1,V2,M1} P(8509,7146);d(1355);d(4373) { 
% 124.36/124.72    meet( Y, join( complement( X ), meet( Y, X ) ) ) ==> Y }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112432) {G2,W10,D5,L1,V2,M1}  { X ==> meet( X, join( complement( 
% 124.36/124.72    Y ), meet( Y, X ) ) ) }.
% 124.36/124.72  parent0[0]: (42) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X, 
% 124.36/124.72    Y ) }.
% 124.36/124.72  parent1[0; 7]: (112430) {G18,W10,D5,L1,V2,M1}  { X ==> meet( X, join( 
% 124.36/124.72    complement( Y ), meet( X, Y ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112438) {G2,W10,D5,L1,V2,M1}  { meet( X, join( complement( Y ), 
% 124.36/124.72    meet( Y, X ) ) ) ==> X }.
% 124.36/124.72  parent0[0]: (112432) {G2,W10,D5,L1,V2,M1}  { X ==> meet( X, join( 
% 124.36/124.72    complement( Y ), meet( Y, X ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (10654) {G19,W10,D5,L1,V2,M1} P(42,10619) { meet( X, join( 
% 124.36/124.72    complement( Y ), meet( Y, X ) ) ) ==> X }.
% 124.36/124.72  parent0: (112438) {G2,W10,D5,L1,V2,M1}  { meet( X, join( complement( Y ), 
% 124.36/124.72    meet( Y, X ) ) ) ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112439) {G18,W10,D5,L1,V2,M1}  { X ==> meet( X, join( complement( 
% 124.36/124.72    Y ), meet( X, Y ) ) ) }.
% 124.36/124.72  parent0[0]: (10619) {G18,W10,D5,L1,V2,M1} P(8509,7146);d(1355);d(4373) { 
% 124.36/124.72    meet( Y, join( complement( X ), meet( Y, X ) ) ) ==> Y }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112440) {G1,W10,D5,L1,V2,M1}  { X ==> meet( X, join( meet( X, Y )
% 124.36/124.72    , complement( Y ) ) ) }.
% 124.36/124.72  parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.36/124.72  parent1[0; 4]: (112439) {G18,W10,D5,L1,V2,M1}  { X ==> meet( X, join( 
% 124.36/124.72    complement( Y ), meet( X, Y ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := complement( Y )
% 124.36/124.72     Y := meet( X, Y )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112443) {G1,W10,D5,L1,V2,M1}  { meet( X, join( meet( X, Y ), 
% 124.36/124.72    complement( Y ) ) ) ==> X }.
% 124.36/124.72  parent0[0]: (112440) {G1,W10,D5,L1,V2,M1}  { X ==> meet( X, join( meet( X, 
% 124.36/124.72    Y ), complement( Y ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (10655) {G19,W10,D5,L1,V2,M1} P(0,10619) { meet( Y, join( meet
% 124.36/124.72    ( Y, X ), complement( X ) ) ) ==> Y }.
% 124.36/124.72  parent0: (112443) {G1,W10,D5,L1,V2,M1}  { meet( X, join( meet( X, Y ), 
% 124.36/124.72    complement( Y ) ) ) ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112445) {G14,W10,D5,L1,V2,M1}  { join( X, complement( Y ) ) ==> 
% 124.36/124.72    complement( meet( complement( X ), Y ) ) }.
% 124.36/124.72  parent0[0]: (4372) {G14,W10,D5,L1,V2,M1} P(1346,1353) { complement( meet( 
% 124.36/124.72    complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112449) {G15,W14,D7,L1,V2,M1}  { join( X, complement( join( 
% 124.36/124.72    complement( Y ), meet( Y, complement( X ) ) ) ) ) ==> complement( 
% 124.36/124.72    complement( X ) ) }.
% 124.36/124.72  parent0[0]: (10654) {G19,W10,D5,L1,V2,M1} P(42,10619) { meet( X, join( 
% 124.36/124.72    complement( Y ), meet( Y, X ) ) ) ==> X }.
% 124.36/124.72  parent1[0; 12]: (112445) {G14,W10,D5,L1,V2,M1}  { join( X, complement( Y )
% 124.36/124.72     ) ==> complement( meet( complement( X ), Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := complement( X )
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := join( complement( Y ), meet( Y, complement( X ) ) )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112450) {G14,W12,D7,L1,V2,M1}  { join( X, complement( join( 
% 124.36/124.72    complement( Y ), meet( Y, complement( X ) ) ) ) ) ==> X }.
% 124.36/124.72  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.72    complement( complement( X ) ) ==> X }.
% 124.36/124.72  parent1[0; 11]: (112449) {G15,W14,D7,L1,V2,M1}  { join( X, complement( join
% 124.36/124.72    ( complement( Y ), meet( Y, complement( X ) ) ) ) ) ==> complement( 
% 124.36/124.72    complement( X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112451) {G15,W10,D6,L1,V2,M1}  { join( X, meet( Y, join( 
% 124.36/124.72    complement( Y ), X ) ) ) ==> X }.
% 124.36/124.72  parent0[0]: (1374) {G14,W15,D6,L1,V3,M1} P(1346,39) { complement( join( 
% 124.36/124.72    complement( Y ), meet( Z, complement( X ) ) ) ) ==> meet( Y, join( 
% 124.36/124.72    complement( Z ), X ) ) }.
% 124.36/124.72  parent1[0; 3]: (112450) {G14,W12,D7,L1,V2,M1}  { join( X, complement( join
% 124.36/124.72    ( complement( Y ), meet( Y, complement( X ) ) ) ) ) ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (10680) {G20,W10,D6,L1,V2,M1} P(10654,4372);d(1346);d(1374) { 
% 124.36/124.72    join( X, meet( Y, join( complement( Y ), X ) ) ) ==> X }.
% 124.36/124.72  parent0: (112451) {G15,W10,D6,L1,V2,M1}  { join( X, meet( Y, join( 
% 124.36/124.72    complement( Y ), X ) ) ) ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112454) {G14,W10,D5,L1,V2,M1}  { join( X, complement( Y ) ) ==> 
% 124.36/124.72    complement( meet( complement( X ), Y ) ) }.
% 124.36/124.72  parent0[0]: (4372) {G14,W10,D5,L1,V2,M1} P(1346,1353) { complement( meet( 
% 124.36/124.72    complement( X ), Y ) ) ==> join( X, complement( Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112458) {G15,W14,D7,L1,V2,M1}  { join( X, complement( join( meet
% 124.36/124.72    ( complement( X ), Y ), complement( Y ) ) ) ) ==> complement( complement
% 124.36/124.72    ( X ) ) }.
% 124.36/124.72  parent0[0]: (10655) {G19,W10,D5,L1,V2,M1} P(0,10619) { meet( Y, join( meet
% 124.36/124.72    ( Y, X ), complement( X ) ) ) ==> Y }.
% 124.36/124.72  parent1[0; 12]: (112454) {G14,W10,D5,L1,V2,M1}  { join( X, complement( Y )
% 124.36/124.72     ) ==> complement( meet( complement( X ), Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := complement( X )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := join( meet( complement( X ), Y ), complement( Y ) )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112459) {G14,W12,D7,L1,V2,M1}  { join( X, complement( join( meet
% 124.36/124.72    ( complement( X ), Y ), complement( Y ) ) ) ) ==> X }.
% 124.36/124.72  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.72    complement( complement( X ) ) ==> X }.
% 124.36/124.72  parent1[0; 11]: (112458) {G15,W14,D7,L1,V2,M1}  { join( X, complement( join
% 124.36/124.72    ( meet( complement( X ), Y ), complement( Y ) ) ) ) ==> complement( 
% 124.36/124.72    complement( X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112460) {G15,W10,D6,L1,V2,M1}  { join( X, meet( join( X, 
% 124.36/124.72    complement( Y ) ), Y ) ) ==> X }.
% 124.36/124.72  parent0[0]: (1375) {G14,W15,D6,L1,V3,M1} P(1346,38) { complement( join( 
% 124.36/124.72    meet( complement( X ), Y ), complement( Z ) ) ) ==> meet( join( X, 
% 124.36/124.72    complement( Y ) ), Z ) }.
% 124.36/124.72  parent1[0; 3]: (112459) {G14,W12,D7,L1,V2,M1}  { join( X, complement( join
% 124.36/124.72    ( meet( complement( X ), Y ), complement( Y ) ) ) ) ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (10753) {G20,W10,D6,L1,V2,M1} P(10655,4372);d(1346);d(1375) { 
% 124.36/124.72    join( X, meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 124.36/124.72  parent0: (112460) {G15,W10,D6,L1,V2,M1}  { join( X, meet( join( X, 
% 124.36/124.72    complement( Y ) ), Y ) ) ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112463) {G20,W10,D6,L1,V2,M1}  { X ==> join( X, meet( join( X, 
% 124.36/124.72    complement( Y ) ), Y ) ) }.
% 124.36/124.72  parent0[0]: (10753) {G20,W10,D6,L1,V2,M1} P(10655,4372);d(1346);d(1375) { 
% 124.36/124.72    join( X, meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112465) {G16,W13,D5,L1,V2,M1}  { meet( X, Y ) ==> join( meet( X, 
% 124.36/124.72    Y ), meet( top, meet( Y, X ) ) ) }.
% 124.36/124.72  parent0[0]: (4417) {G15,W10,D5,L1,V2,M1} P(4383,11) { join( meet( X, Y ), 
% 124.36/124.72    complement( meet( Y, X ) ) ) ==> top }.
% 124.36/124.72  parent1[0; 9]: (112463) {G20,W10,D6,L1,V2,M1}  { X ==> join( X, meet( join
% 124.36/124.72    ( X, complement( Y ) ), Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := meet( X, Y )
% 124.36/124.72     Y := meet( Y, X )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112466) {G15,W11,D4,L1,V2,M1}  { meet( X, Y ) ==> join( meet( X, 
% 124.36/124.72    Y ), meet( Y, X ) ) }.
% 124.36/124.72  parent0[0]: (1397) {G14,W5,D3,L1,V1,M1} S(1345);d(1346) { meet( top, X ) 
% 124.36/124.72    ==> X }.
% 124.36/124.72  parent1[0; 8]: (112465) {G16,W13,D5,L1,V2,M1}  { meet( X, Y ) ==> join( 
% 124.36/124.72    meet( X, Y ), meet( top, meet( Y, X ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := meet( Y, X )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112467) {G15,W11,D4,L1,V2,M1}  { join( meet( X, Y ), meet( Y, X )
% 124.36/124.72     ) ==> meet( X, Y ) }.
% 124.36/124.72  parent0[0]: (112466) {G15,W11,D4,L1,V2,M1}  { meet( X, Y ) ==> join( meet( 
% 124.36/124.72    X, Y ), meet( Y, X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (10802) {G21,W11,D4,L1,V2,M1} P(4417,10753);d(1397) { join( 
% 124.36/124.72    meet( X, Y ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 124.36/124.72  parent0: (112467) {G15,W11,D4,L1,V2,M1}  { join( meet( X, Y ), meet( Y, X )
% 124.36/124.72     ) ==> meet( X, Y ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112469) {G20,W10,D6,L1,V2,M1}  { X ==> join( X, meet( join( X, 
% 124.36/124.72    complement( Y ) ), Y ) ) }.
% 124.36/124.72  parent0[0]: (10753) {G20,W10,D6,L1,V2,M1} P(10655,4372);d(1346);d(1375) { 
% 124.36/124.72    join( X, meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112474) {G4,W19,D7,L1,V2,M1}  { join( complement( join( 
% 124.36/124.72    complement( X ), Y ) ), Y ) ==> join( join( complement( join( complement
% 124.36/124.72    ( X ), Y ) ), Y ), meet( top, X ) ) }.
% 124.36/124.72  parent0[0]: (224) {G3,W10,D6,L1,V2,M1} P(22,20) { join( join( complement( 
% 124.36/124.72    join( X, Y ) ), Y ), X ) ==> top }.
% 124.36/124.72  parent1[0; 17]: (112469) {G20,W10,D6,L1,V2,M1}  { X ==> join( X, meet( join
% 124.36/124.72    ( X, complement( Y ) ), Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := complement( X )
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := join( complement( join( complement( X ), Y ) ), Y )
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112476) {G5,W18,D6,L1,V2,M1}  { join( complement( join( 
% 124.36/124.72    complement( X ), Y ) ), Y ) ==> join( join( meet( X, complement( Y ) ), Y
% 124.36/124.72     ), meet( top, X ) ) }.
% 124.36/124.72  parent0[0]: (1380) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( 
% 124.36/124.72    complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 124.36/124.72  parent1[0; 10]: (112474) {G4,W19,D7,L1,V2,M1}  { join( complement( join( 
% 124.36/124.72    complement( X ), Y ) ), Y ) ==> join( join( complement( join( complement
% 124.36/124.72    ( X ), Y ) ), Y ), meet( top, X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112477) {G6,W17,D6,L1,V2,M1}  { join( meet( X, complement( Y ) )
% 124.36/124.72    , Y ) ==> join( join( meet( X, complement( Y ) ), Y ), meet( top, X ) )
% 124.36/124.72     }.
% 124.36/124.72  parent0[0]: (1380) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( 
% 124.36/124.72    complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 124.36/124.72  parent1[0; 2]: (112476) {G5,W18,D6,L1,V2,M1}  { join( complement( join( 
% 124.36/124.72    complement( X ), Y ) ), Y ) ==> join( join( meet( X, complement( Y ) ), Y
% 124.36/124.72     ), meet( top, X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112481) {G7,W15,D6,L1,V2,M1}  { join( meet( X, complement( Y ) )
% 124.36/124.72    , Y ) ==> join( join( meet( X, complement( Y ) ), Y ), X ) }.
% 124.36/124.72  parent0[0]: (1397) {G14,W5,D3,L1,V1,M1} S(1345);d(1346) { meet( top, X ) 
% 124.36/124.72    ==> X }.
% 124.36/124.72  parent1[0; 14]: (112477) {G6,W17,D6,L1,V2,M1}  { join( meet( X, complement
% 124.36/124.72    ( Y ) ), Y ) ==> join( join( meet( X, complement( Y ) ), Y ), meet( top, 
% 124.36/124.72    X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112482) {G8,W10,D5,L1,V2,M1}  { join( meet( X, complement( Y ) )
% 124.36/124.72    , Y ) ==> join( X, Y ) }.
% 124.36/124.72  parent0[0]: (1639) {G18,W11,D5,L1,V3,M1} P(1595,19) { join( join( meet( X, 
% 124.36/124.72    Y ), Z ), X ) ==> join( X, Z ) }.
% 124.36/124.72  parent1[0; 7]: (112481) {G7,W15,D6,L1,V2,M1}  { join( meet( X, complement( 
% 124.36/124.72    Y ) ), Y ) ==> join( join( meet( X, complement( Y ) ), Y ), X ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := complement( Y )
% 124.36/124.72     Z := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (10821) {G21,W10,D5,L1,V2,M1} P(224,10753);d(1380);d(1397);d(
% 124.36/124.72    1639) { join( meet( X, complement( Y ) ), Y ) ==> join( X, Y ) }.
% 124.36/124.72  parent0: (112482) {G8,W10,D5,L1,V2,M1}  { join( meet( X, complement( Y ) )
% 124.36/124.72    , Y ) ==> join( X, Y ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112485) {G20,W10,D6,L1,V2,M1}  { X ==> join( X, meet( join( X, 
% 124.36/124.72    complement( Y ) ), Y ) ) }.
% 124.36/124.72  parent0[0]: (10753) {G20,W10,D6,L1,V2,M1} P(10655,4372);d(1346);d(1375) { 
% 124.36/124.72    join( X, meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112490) {G3,W19,D7,L1,V2,M1}  { join( X, complement( join( X, 
% 124.36/124.72    complement( Y ) ) ) ) ==> join( join( X, complement( join( X, complement
% 124.36/124.72    ( Y ) ) ) ), meet( top, Y ) ) }.
% 124.36/124.72  parent0[0]: (172) {G2,W10,D6,L1,V2,M1} P(20,11) { join( join( X, complement
% 124.36/124.72    ( join( X, Y ) ) ), Y ) ==> top }.
% 124.36/124.72  parent1[0; 17]: (112485) {G20,W10,D6,L1,V2,M1}  { X ==> join( X, meet( join
% 124.36/124.72    ( X, complement( Y ) ), Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := complement( Y )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := join( X, complement( join( X, complement( Y ) ) ) )
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112492) {G4,W18,D6,L1,V2,M1}  { join( X, complement( join( X, 
% 124.36/124.72    complement( Y ) ) ) ) ==> join( join( X, meet( complement( X ), Y ) ), 
% 124.36/124.72    meet( top, Y ) ) }.
% 124.36/124.72  parent0[0]: (1379) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( X, 
% 124.36/124.72    complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 124.36/124.72  parent1[0; 11]: (112490) {G3,W19,D7,L1,V2,M1}  { join( X, complement( join
% 124.36/124.72    ( X, complement( Y ) ) ) ) ==> join( join( X, complement( join( X, 
% 124.36/124.72    complement( Y ) ) ) ), meet( top, Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112493) {G5,W17,D6,L1,V2,M1}  { join( X, meet( complement( X ), Y
% 124.36/124.72     ) ) ==> join( join( X, meet( complement( X ), Y ) ), meet( top, Y ) )
% 124.36/124.72     }.
% 124.36/124.72  parent0[0]: (1379) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( X, 
% 124.36/124.72    complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 124.36/124.72  parent1[0; 3]: (112492) {G4,W18,D6,L1,V2,M1}  { join( X, complement( join( 
% 124.36/124.72    X, complement( Y ) ) ) ) ==> join( join( X, meet( complement( X ), Y ) )
% 124.36/124.72    , meet( top, Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112497) {G6,W15,D6,L1,V2,M1}  { join( X, meet( complement( X ), Y
% 124.36/124.72     ) ) ==> join( join( X, meet( complement( X ), Y ) ), Y ) }.
% 124.36/124.72  parent0[0]: (1397) {G14,W5,D3,L1,V1,M1} S(1345);d(1346) { meet( top, X ) 
% 124.36/124.72    ==> X }.
% 124.36/124.72  parent1[0; 14]: (112493) {G5,W17,D6,L1,V2,M1}  { join( X, meet( complement
% 124.36/124.72    ( X ), Y ) ) ==> join( join( X, meet( complement( X ), Y ) ), meet( top, 
% 124.36/124.72    Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112498) {G7,W10,D5,L1,V2,M1}  { join( X, meet( complement( X ), Y
% 124.36/124.72     ) ) ==> join( Y, X ) }.
% 124.36/124.72  parent0[0]: (1676) {G20,W11,D5,L1,V3,M1} P(1668,19) { join( join( Z, meet( 
% 124.36/124.72    X, Y ) ), Y ) ==> join( Y, Z ) }.
% 124.36/124.72  parent1[0; 7]: (112497) {G6,W15,D6,L1,V2,M1}  { join( X, meet( complement( 
% 124.36/124.72    X ), Y ) ) ==> join( join( X, meet( complement( X ), Y ) ), Y ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := complement( X )
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (10822) {G21,W10,D5,L1,V2,M1} P(172,10753);d(1379);d(1397);d(
% 124.36/124.72    1676) { join( X, meet( complement( X ), Y ) ) ==> join( Y, X ) }.
% 124.36/124.72  parent0: (112498) {G7,W10,D5,L1,V2,M1}  { join( X, meet( complement( X ), Y
% 124.36/124.72     ) ) ==> join( Y, X ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112501) {G20,W10,D6,L1,V2,M1}  { X ==> join( X, meet( join( X, 
% 124.36/124.72    complement( Y ) ), Y ) ) }.
% 124.36/124.72  parent0[0]: (10753) {G20,W10,D6,L1,V2,M1} P(10655,4372);d(1346);d(1375) { 
% 124.36/124.72    join( X, meet( join( X, complement( Y ) ), Y ) ) ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112502) {G14,W10,D5,L1,V2,M1}  { X ==> join( X, meet( join( X, Y
% 124.36/124.72     ), complement( Y ) ) ) }.
% 124.36/124.72  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.72    complement( complement( X ) ) ==> X }.
% 124.36/124.72  parent1[0; 7]: (112501) {G20,W10,D6,L1,V2,M1}  { X ==> join( X, meet( join
% 124.36/124.72    ( X, complement( Y ) ), Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := complement( Y )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112503) {G14,W10,D5,L1,V2,M1}  { join( X, meet( join( X, Y ), 
% 124.36/124.72    complement( Y ) ) ) ==> X }.
% 124.36/124.72  parent0[0]: (112502) {G14,W10,D5,L1,V2,M1}  { X ==> join( X, meet( join( X
% 124.36/124.72    , Y ), complement( Y ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (10838) {G21,W10,D5,L1,V2,M1} P(1346,10753) { join( Y, meet( 
% 124.36/124.72    join( Y, X ), complement( X ) ) ) ==> Y }.
% 124.36/124.72  parent0: (112503) {G14,W10,D5,L1,V2,M1}  { join( X, meet( join( X, Y ), 
% 124.36/124.72    complement( Y ) ) ) ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112505) {G2,W9,D4,L1,V1,M1}  { join( X, one ) ==> join( join( X, 
% 124.36/124.72    skol1 ), one ) }.
% 124.36/124.72  parent0[0]: (31) {G2,W9,D4,L1,V1,M1} P(30,1) { join( join( X, skol1 ), one
% 124.36/124.72     ) ==> join( X, one ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112509) {G3,W12,D5,L1,V1,M1}  { join( meet( X, complement( skol1
% 124.36/124.72     ) ), one ) ==> join( join( X, skol1 ), one ) }.
% 124.36/124.72  parent0[0]: (10821) {G21,W10,D5,L1,V2,M1} P(224,10753);d(1380);d(1397);d(
% 124.36/124.72    1639) { join( meet( X, complement( Y ) ), Y ) ==> join( X, Y ) }.
% 124.36/124.72  parent1[0; 8]: (112505) {G2,W9,D4,L1,V1,M1}  { join( X, one ) ==> join( 
% 124.36/124.72    join( X, skol1 ), one ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := skol1
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := meet( X, complement( skol1 ) )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112510) {G3,W10,D5,L1,V1,M1}  { join( meet( X, complement( skol1
% 124.36/124.72     ) ), one ) ==> join( X, one ) }.
% 124.36/124.72  parent0[0]: (31) {G2,W9,D4,L1,V1,M1} P(30,1) { join( join( X, skol1 ), one
% 124.36/124.72     ) ==> join( X, one ) }.
% 124.36/124.72  parent1[0; 7]: (112509) {G3,W12,D5,L1,V1,M1}  { join( meet( X, complement( 
% 124.36/124.72    skol1 ) ), one ) ==> join( join( X, skol1 ), one ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (11775) {G22,W10,D5,L1,V1,M1} P(10821,31);d(31) { join( meet( 
% 124.36/124.72    X, complement( skol1 ) ), one ) ==> join( X, one ) }.
% 124.36/124.72  parent0: (112510) {G3,W10,D5,L1,V1,M1}  { join( meet( X, complement( skol1
% 124.36/124.72     ) ), one ) ==> join( X, one ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112513) {G21,W10,D5,L1,V2,M1}  { join( Y, X ) ==> join( X, meet( 
% 124.36/124.72    complement( X ), Y ) ) }.
% 124.36/124.72  parent0[0]: (10822) {G21,W10,D5,L1,V2,M1} P(172,10753);d(1379);d(1397);d(
% 124.36/124.72    1676) { join( X, meet( complement( X ), Y ) ) ==> join( Y, X ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112516) {G16,W11,D5,L1,V2,M1}  { join( complement( X ), Y ) ==> 
% 124.36/124.72    join( Y, complement( join( Y, X ) ) ) }.
% 124.36/124.72  parent0[0]: (7678) {G15,W10,D4,L1,V2,M1} P(1346,1379) { meet( complement( Y
% 124.36/124.72     ), complement( X ) ) ==> complement( join( Y, X ) ) }.
% 124.36/124.72  parent1[0; 7]: (112513) {G21,W10,D5,L1,V2,M1}  { join( Y, X ) ==> join( X, 
% 124.36/124.72    meet( complement( X ), Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := complement( X )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112517) {G16,W11,D5,L1,V2,M1}  { join( Y, complement( join( Y, X )
% 124.36/124.72     ) ) ==> join( complement( X ), Y ) }.
% 124.36/124.72  parent0[0]: (112516) {G16,W11,D5,L1,V2,M1}  { join( complement( X ), Y ) 
% 124.36/124.72    ==> join( Y, complement( join( Y, X ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (11800) {G22,W11,D5,L1,V2,M1} P(7678,10822) { join( X, 
% 124.36/124.72    complement( join( X, Y ) ) ) ==> join( complement( Y ), X ) }.
% 124.36/124.72  parent0: (112517) {G16,W11,D5,L1,V2,M1}  { join( Y, complement( join( Y, X
% 124.36/124.72     ) ) ) ==> join( complement( X ), Y ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112519) {G4,W9,D4,L1,V1,M1}  { join( X, one ) ==> join( join( 
% 124.36/124.72    skol1, X ), one ) }.
% 124.36/124.72  parent0[0]: (115) {G4,W9,D4,L1,V1,M1} P(33,0);d(1) { join( join( skol1, X )
% 124.36/124.72    , one ) ==> join( X, one ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112522) {G5,W12,D5,L1,V1,M1}  { join( meet( complement( skol1 ), 
% 124.36/124.72    X ), one ) ==> join( join( X, skol1 ), one ) }.
% 124.36/124.72  parent0[0]: (10822) {G21,W10,D5,L1,V2,M1} P(172,10753);d(1379);d(1397);d(
% 124.36/124.72    1676) { join( X, meet( complement( X ), Y ) ) ==> join( Y, X ) }.
% 124.36/124.72  parent1[0; 8]: (112519) {G4,W9,D4,L1,V1,M1}  { join( X, one ) ==> join( 
% 124.36/124.72    join( skol1, X ), one ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := skol1
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := meet( complement( skol1 ), X )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112523) {G3,W10,D5,L1,V1,M1}  { join( meet( complement( skol1 ), 
% 124.36/124.72    X ), one ) ==> join( X, one ) }.
% 124.36/124.72  parent0[0]: (31) {G2,W9,D4,L1,V1,M1} P(30,1) { join( join( X, skol1 ), one
% 124.36/124.72     ) ==> join( X, one ) }.
% 124.36/124.72  parent1[0; 7]: (112522) {G5,W12,D5,L1,V1,M1}  { join( meet( complement( 
% 124.36/124.72    skol1 ), X ), one ) ==> join( join( X, skol1 ), one ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (11825) {G22,W10,D5,L1,V1,M1} P(10822,115);d(31) { join( meet
% 124.36/124.72    ( complement( skol1 ), X ), one ) ==> join( X, one ) }.
% 124.36/124.72  parent0: (112523) {G3,W10,D5,L1,V1,M1}  { join( meet( complement( skol1 ), 
% 124.36/124.72    X ), one ) ==> join( X, one ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112526) {G21,W10,D5,L1,V2,M1}  { X ==> join( X, meet( join( X, Y )
% 124.36/124.72    , complement( Y ) ) ) }.
% 124.36/124.72  parent0[0]: (10838) {G21,W10,D5,L1,V2,M1} P(1346,10753) { join( Y, meet( 
% 124.36/124.72    join( Y, X ), complement( X ) ) ) ==> Y }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112528) {G12,W11,D8,L1,V1,M1}  { X ==> join( X, meet( top, 
% 124.36/124.72    complement( converse( complement( converse( X ) ) ) ) ) ) }.
% 124.36/124.72  parent0[0]: (4056) {G11,W8,D6,L1,V1,M1} S(746);d(752) { join( X, converse( 
% 124.36/124.72    complement( converse( X ) ) ) ) ==> top }.
% 124.36/124.72  parent1[0; 5]: (112526) {G21,W10,D5,L1,V2,M1}  { X ==> join( X, meet( join
% 124.36/124.72    ( X, Y ), complement( Y ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := converse( complement( converse( X ) ) )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112529) {G13,W9,D7,L1,V1,M1}  { X ==> join( X, complement( 
% 124.36/124.72    converse( complement( converse( X ) ) ) ) ) }.
% 124.36/124.72  parent0[0]: (1397) {G14,W5,D3,L1,V1,M1} S(1345);d(1346) { meet( top, X ) 
% 124.36/124.72    ==> X }.
% 124.36/124.72  parent1[0; 4]: (112528) {G12,W11,D8,L1,V1,M1}  { X ==> join( X, meet( top, 
% 124.36/124.72    complement( converse( complement( converse( X ) ) ) ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := complement( converse( complement( converse( X ) ) ) )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112530) {G13,W9,D7,L1,V1,M1}  { join( X, complement( converse( 
% 124.36/124.72    complement( converse( X ) ) ) ) ) ==> X }.
% 124.36/124.72  parent0[0]: (112529) {G13,W9,D7,L1,V1,M1}  { X ==> join( X, complement( 
% 124.36/124.72    converse( complement( converse( X ) ) ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (11869) {G22,W9,D7,L1,V1,M1} P(4056,10838);d(1397) { join( X, 
% 124.36/124.72    complement( converse( complement( converse( X ) ) ) ) ) ==> X }.
% 124.36/124.72  parent0: (112530) {G13,W9,D7,L1,V1,M1}  { join( X, complement( converse( 
% 124.36/124.72    complement( converse( X ) ) ) ) ) ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112532) {G14,W10,D5,L1,V2,M1}  { meet( X, complement( Y ) ) ==> 
% 124.36/124.72    complement( join( complement( X ), Y ) ) }.
% 124.36/124.72  parent0[0]: (1380) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( 
% 124.36/124.72    complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112535) {G15,W13,D9,L1,V1,M1}  { meet( X, complement( complement
% 124.36/124.72    ( converse( complement( converse( complement( X ) ) ) ) ) ) ) ==> 
% 124.36/124.72    complement( complement( X ) ) }.
% 124.36/124.72  parent0[0]: (11869) {G22,W9,D7,L1,V1,M1} P(4056,10838);d(1397) { join( X, 
% 124.36/124.72    complement( converse( complement( converse( X ) ) ) ) ) ==> X }.
% 124.36/124.72  parent1[0; 11]: (112532) {G14,W10,D5,L1,V2,M1}  { meet( X, complement( Y )
% 124.36/124.72     ) ==> complement( join( complement( X ), Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := complement( X )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := complement( converse( complement( converse( complement( X ) ) ) ) )
% 124.36/124.72    
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112537) {G14,W11,D9,L1,V1,M1}  { meet( X, complement( complement
% 124.36/124.72    ( converse( complement( converse( complement( X ) ) ) ) ) ) ) ==> X }.
% 124.36/124.72  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.72    complement( complement( X ) ) ==> X }.
% 124.36/124.72  parent1[0; 10]: (112535) {G15,W13,D9,L1,V1,M1}  { meet( X, complement( 
% 124.36/124.72    complement( converse( complement( converse( complement( X ) ) ) ) ) ) ) 
% 124.36/124.72    ==> complement( complement( X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112539) {G14,W9,D7,L1,V1,M1}  { meet( X, converse( complement( 
% 124.36/124.72    converse( complement( X ) ) ) ) ) ==> X }.
% 124.36/124.72  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.72    complement( complement( X ) ) ==> X }.
% 124.36/124.72  parent1[0; 3]: (112537) {G14,W11,D9,L1,V1,M1}  { meet( X, complement( 
% 124.36/124.72    complement( converse( complement( converse( complement( X ) ) ) ) ) ) ) 
% 124.36/124.72    ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := converse( complement( converse( complement( X ) ) ) )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (11901) {G23,W9,D7,L1,V1,M1} P(11869,1380);d(1346);d(1346) { 
% 124.36/124.72    meet( X, converse( complement( converse( complement( X ) ) ) ) ) ==> X
% 124.36/124.72     }.
% 124.36/124.72  parent0: (112539) {G14,W9,D7,L1,V1,M1}  { meet( X, converse( complement( 
% 124.36/124.72    converse( complement( X ) ) ) ) ) ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112542) {G22,W9,D7,L1,V1,M1}  { X ==> join( X, complement( 
% 124.36/124.72    converse( complement( converse( X ) ) ) ) ) }.
% 124.36/124.72  parent0[0]: (11869) {G22,W9,D7,L1,V1,M1} P(4056,10838);d(1397) { join( X, 
% 124.36/124.72    complement( converse( complement( converse( X ) ) ) ) ) ==> X }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112543) {G1,W10,D6,L1,V1,M1}  { converse( X ) ==> join( converse
% 124.36/124.72    ( X ), complement( converse( complement( X ) ) ) ) }.
% 124.36/124.72  parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 124.36/124.72  parent1[0; 9]: (112542) {G22,W9,D7,L1,V1,M1}  { X ==> join( X, complement( 
% 124.36/124.72    converse( complement( converse( X ) ) ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := converse( X )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112544) {G1,W10,D6,L1,V1,M1}  { join( converse( X ), complement( 
% 124.36/124.72    converse( complement( X ) ) ) ) ==> converse( X ) }.
% 124.36/124.72  parent0[0]: (112543) {G1,W10,D6,L1,V1,M1}  { converse( X ) ==> join( 
% 124.36/124.72    converse( X ), complement( converse( complement( X ) ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (11952) {G23,W10,D6,L1,V1,M1} P(7,11869) { join( converse( X )
% 124.36/124.72    , complement( converse( complement( X ) ) ) ) ==> converse( X ) }.
% 124.36/124.72  parent0: (112544) {G1,W10,D6,L1,V1,M1}  { join( converse( X ), complement( 
% 124.36/124.72    converse( complement( X ) ) ) ) ==> converse( X ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112546) {G20,W9,D6,L1,V2,M1}  { Y ==> join( converse( meet( X, 
% 124.36/124.72    converse( Y ) ) ), Y ) }.
% 124.36/124.72  parent0[0]: (1671) {G20,W9,D6,L1,V2,M1} P(1668,65);d(7) { join( converse( 
% 124.36/124.72    meet( X, converse( Y ) ) ), Y ) ==> Y }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112548) {G21,W12,D6,L1,V1,M1}  { complement( converse( complement
% 124.36/124.72    ( X ) ) ) ==> join( converse( X ), complement( converse( complement( X )
% 124.36/124.72     ) ) ) }.
% 124.36/124.72  parent0[0]: (11901) {G23,W9,D7,L1,V1,M1} P(11869,1380);d(1346);d(1346) { 
% 124.36/124.72    meet( X, converse( complement( converse( complement( X ) ) ) ) ) ==> X
% 124.36/124.72     }.
% 124.36/124.72  parent1[0; 7]: (112546) {G20,W9,D6,L1,V2,M1}  { Y ==> join( converse( meet
% 124.36/124.72    ( X, converse( Y ) ) ), Y ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := complement( converse( complement( X ) ) )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112549) {G22,W7,D5,L1,V1,M1}  { complement( converse( complement
% 124.36/124.72    ( X ) ) ) ==> converse( X ) }.
% 124.36/124.72  parent0[0]: (11952) {G23,W10,D6,L1,V1,M1} P(7,11869) { join( converse( X )
% 124.36/124.72    , complement( converse( complement( X ) ) ) ) ==> converse( X ) }.
% 124.36/124.72  parent1[0; 5]: (112548) {G21,W12,D6,L1,V1,M1}  { complement( converse( 
% 124.36/124.72    complement( X ) ) ) ==> join( converse( X ), complement( converse( 
% 124.36/124.72    complement( X ) ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (12014) {G24,W7,D5,L1,V1,M1} P(11901,1671);d(11952) { 
% 124.36/124.72    complement( converse( complement( X ) ) ) ==> converse( X ) }.
% 124.36/124.72  parent0: (112549) {G22,W7,D5,L1,V1,M1}  { complement( converse( complement
% 124.36/124.72    ( X ) ) ) ==> converse( X ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112552) {G24,W7,D5,L1,V1,M1}  { converse( X ) ==> complement( 
% 124.36/124.72    converse( complement( X ) ) ) }.
% 124.36/124.72  parent0[0]: (12014) {G24,W7,D5,L1,V1,M1} P(11901,1671);d(11952) { 
% 124.36/124.72    complement( converse( complement( X ) ) ) ==> converse( X ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112557) {G15,W12,D6,L1,V2,M1}  { converse( join( complement( X )
% 124.36/124.72    , Y ) ) ==> complement( converse( meet( X, complement( Y ) ) ) ) }.
% 124.36/124.72  parent0[0]: (1380) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( 
% 124.36/124.72    complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 124.36/124.72  parent1[0; 8]: (112552) {G24,W7,D5,L1,V1,M1}  { converse( X ) ==> 
% 124.36/124.72    complement( converse( complement( X ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := join( complement( X ), Y )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112558) {G15,W12,D6,L1,V2,M1}  { complement( converse( meet( X, 
% 124.36/124.72    complement( Y ) ) ) ) ==> converse( join( complement( X ), Y ) ) }.
% 124.36/124.72  parent0[0]: (112557) {G15,W12,D6,L1,V2,M1}  { converse( join( complement( X
% 124.36/124.72     ), Y ) ) ==> complement( converse( meet( X, complement( Y ) ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (12039) {G25,W12,D6,L1,V2,M1} P(1380,12014) { complement( 
% 124.36/124.72    converse( meet( X, complement( Y ) ) ) ) ==> converse( join( complement( 
% 124.36/124.72    X ), Y ) ) }.
% 124.36/124.72  parent0: (112558) {G15,W12,D6,L1,V2,M1}  { complement( converse( meet( X, 
% 124.36/124.72    complement( Y ) ) ) ) ==> converse( join( complement( X ), Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112559) {G24,W7,D5,L1,V1,M1}  { converse( X ) ==> complement( 
% 124.36/124.72    converse( complement( X ) ) ) }.
% 124.36/124.72  parent0[0]: (12014) {G24,W7,D5,L1,V1,M1} P(11901,1671);d(11952) { 
% 124.36/124.72    complement( converse( complement( X ) ) ) ==> converse( X ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112561) {G14,W7,D4,L1,V1,M1}  { converse( complement( X ) ) ==> 
% 124.36/124.72    complement( converse( X ) ) }.
% 124.36/124.72  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.72    complement( complement( X ) ) ==> X }.
% 124.36/124.72  parent1[0; 6]: (112559) {G24,W7,D5,L1,V1,M1}  { converse( X ) ==> 
% 124.36/124.72    complement( converse( complement( X ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := complement( X )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (12105) {G25,W7,D4,L1,V1,M1} P(12014,1346) { converse( 
% 124.36/124.72    complement( X ) ) ==> complement( converse( X ) ) }.
% 124.36/124.72  parent0: (112561) {G14,W7,D4,L1,V1,M1}  { converse( complement( X ) ) ==> 
% 124.36/124.72    complement( converse( X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112564) {G1,W10,D5,L1,V2,M1}  { composition( Y, converse( X ) ) 
% 124.36/124.72    ==> converse( composition( X, converse( Y ) ) ) }.
% 124.36/124.72  parent0[0]: (77) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y, 
% 124.36/124.72    converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112568) {G2,W12,D6,L1,V2,M1}  { composition( complement( X ), 
% 124.36/124.72    converse( Y ) ) ==> converse( composition( Y, complement( converse( X ) )
% 124.36/124.72     ) ) }.
% 124.36/124.72  parent0[0]: (12105) {G25,W7,D4,L1,V1,M1} P(12014,1346) { converse( 
% 124.36/124.72    complement( X ) ) ==> complement( converse( X ) ) }.
% 124.36/124.72  parent1[0; 9]: (112564) {G1,W10,D5,L1,V2,M1}  { composition( Y, converse( X
% 124.36/124.72     ) ) ==> converse( composition( X, converse( Y ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := complement( X )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112570) {G2,W12,D6,L1,V2,M1}  { converse( composition( Y, 
% 124.36/124.72    complement( converse( X ) ) ) ) ==> composition( complement( X ), 
% 124.36/124.72    converse( Y ) ) }.
% 124.36/124.72  parent0[0]: (112568) {G2,W12,D6,L1,V2,M1}  { composition( complement( X ), 
% 124.36/124.72    converse( Y ) ) ==> converse( composition( Y, complement( converse( X ) )
% 124.36/124.72     ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (12148) {G26,W12,D6,L1,V2,M1} P(12105,77) { converse( 
% 124.36/124.72    composition( Y, complement( converse( X ) ) ) ) ==> composition( 
% 124.36/124.72    complement( X ), converse( Y ) ) }.
% 124.36/124.72  parent0: (112570) {G2,W12,D6,L1,V2,M1}  { converse( composition( Y, 
% 124.36/124.72    complement( converse( X ) ) ) ) ==> composition( complement( X ), 
% 124.36/124.72    converse( Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112572) {G0,W10,D4,L1,V2,M1}  { converse( composition( Y, X ) ) 
% 124.36/124.72    ==> composition( converse( X ), converse( Y ) ) }.
% 124.36/124.72  parent0[0]: (9) {G0,W10,D4,L1,V2,M1} I { composition( converse( Y ), 
% 124.36/124.72    converse( X ) ) ==> converse( composition( X, Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112573) {G1,W12,D5,L1,V2,M1}  { converse( composition( X, 
% 124.36/124.72    complement( Y ) ) ) ==> composition( complement( converse( Y ) ), 
% 124.36/124.72    converse( X ) ) }.
% 124.36/124.72  parent0[0]: (12105) {G25,W7,D4,L1,V1,M1} P(12014,1346) { converse( 
% 124.36/124.72    complement( X ) ) ==> complement( converse( X ) ) }.
% 124.36/124.72  parent1[0; 7]: (112572) {G0,W10,D4,L1,V2,M1}  { converse( composition( Y, X
% 124.36/124.72     ) ) ==> composition( converse( X ), converse( Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := complement( Y )
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112575) {G1,W12,D5,L1,V2,M1}  { composition( complement( converse
% 124.36/124.72    ( Y ) ), converse( X ) ) ==> converse( composition( X, complement( Y ) )
% 124.36/124.72     ) }.
% 124.36/124.72  parent0[0]: (112573) {G1,W12,D5,L1,V2,M1}  { converse( composition( X, 
% 124.36/124.72    complement( Y ) ) ) ==> composition( complement( converse( Y ) ), 
% 124.36/124.72    converse( X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (12154) {G26,W12,D5,L1,V2,M1} P(12105,9) { composition( 
% 124.36/124.72    complement( converse( X ) ), converse( Y ) ) ==> converse( composition( Y
% 124.36/124.72    , complement( X ) ) ) }.
% 124.36/124.72  parent0: (112575) {G1,W12,D5,L1,V2,M1}  { composition( complement( converse
% 124.36/124.72    ( Y ) ), converse( X ) ) ==> converse( composition( X, complement( Y ) )
% 124.36/124.72     ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112577) {G22,W10,D5,L1,V1,M1}  { join( X, one ) ==> join( meet( 
% 124.36/124.72    complement( skol1 ), X ), one ) }.
% 124.36/124.72  parent0[0]: (11825) {G22,W10,D5,L1,V1,M1} P(10822,115);d(31) { join( meet( 
% 124.36/124.72    complement( skol1 ), X ), one ) ==> join( X, one ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112579) {G1,W10,D5,L1,V1,M1}  { join( X, one ) ==> join( one, 
% 124.36/124.72    meet( complement( skol1 ), X ) ) }.
% 124.36/124.72  parent0[0]: (0) {G0,W7,D3,L1,V2,M1} I { join( X, Y ) = join( Y, X ) }.
% 124.36/124.72  parent1[0; 4]: (112577) {G22,W10,D5,L1,V1,M1}  { join( X, one ) ==> join( 
% 124.36/124.72    meet( complement( skol1 ), X ), one ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := meet( complement( skol1 ), X )
% 124.36/124.72     Y := one
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112585) {G1,W10,D5,L1,V1,M1}  { join( one, meet( complement( skol1
% 124.36/124.72     ), X ) ) ==> join( X, one ) }.
% 124.36/124.72  parent0[0]: (112579) {G1,W10,D5,L1,V1,M1}  { join( X, one ) ==> join( one, 
% 124.36/124.72    meet( complement( skol1 ), X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (12962) {G23,W10,D5,L1,V1,M1} P(11825,0) { join( one, meet( 
% 124.36/124.72    complement( skol1 ), X ) ) ==> join( X, one ) }.
% 124.36/124.72  parent0: (112585) {G1,W10,D5,L1,V1,M1}  { join( one, meet( complement( 
% 124.36/124.72    skol1 ), X ) ) ==> join( X, one ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112587) {G23,W10,D5,L1,V1,M1}  { join( X, one ) ==> join( one, 
% 124.36/124.72    meet( complement( skol1 ), X ) ) }.
% 124.36/124.72  parent0[0]: (12962) {G23,W10,D5,L1,V1,M1} P(11825,0) { join( one, meet( 
% 124.36/124.72    complement( skol1 ), X ) ) ==> join( X, one ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112589) {G24,W13,D5,L1,V1,M1}  { join( meet( X, complement( skol1
% 124.36/124.72     ) ), one ) ==> join( one, meet( X, complement( skol1 ) ) ) }.
% 124.36/124.72  parent0[0]: (1876) {G27,W9,D4,L1,V2,M1} P(1668,1864) { meet( Y, meet( X, Y
% 124.36/124.72     ) ) ==> meet( X, Y ) }.
% 124.36/124.72  parent1[0; 9]: (112587) {G23,W10,D5,L1,V1,M1}  { join( X, one ) ==> join( 
% 124.36/124.72    one, meet( complement( skol1 ), X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := complement( skol1 )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := meet( X, complement( skol1 ) )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112590) {G23,W10,D5,L1,V1,M1}  { join( X, one ) ==> join( one, 
% 124.36/124.72    meet( X, complement( skol1 ) ) ) }.
% 124.36/124.72  parent0[0]: (11775) {G22,W10,D5,L1,V1,M1} P(10821,31);d(31) { join( meet( X
% 124.36/124.72    , complement( skol1 ) ), one ) ==> join( X, one ) }.
% 124.36/124.72  parent1[0; 1]: (112589) {G24,W13,D5,L1,V1,M1}  { join( meet( X, complement
% 124.36/124.72    ( skol1 ) ), one ) ==> join( one, meet( X, complement( skol1 ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112591) {G23,W10,D5,L1,V1,M1}  { join( one, meet( X, complement( 
% 124.36/124.72    skol1 ) ) ) ==> join( X, one ) }.
% 124.36/124.72  parent0[0]: (112590) {G23,W10,D5,L1,V1,M1}  { join( X, one ) ==> join( one
% 124.36/124.72    , meet( X, complement( skol1 ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (12964) {G28,W10,D5,L1,V1,M1} P(1876,12962);d(11775) { join( 
% 124.36/124.72    one, meet( X, complement( skol1 ) ) ) ==> join( X, one ) }.
% 124.36/124.72  parent0: (112591) {G23,W10,D5,L1,V1,M1}  { join( one, meet( X, complement( 
% 124.36/124.72    skol1 ) ) ) ==> join( X, one ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112593) {G27,W10,D6,L1,V2,M1}  { zero ==> meet( complement( X ), 
% 124.36/124.72    converse( meet( Y, converse( X ) ) ) ) }.
% 124.36/124.72  parent0[0]: (3824) {G27,W10,D6,L1,V2,M1} P(1671,1849) { meet( complement( Y
% 124.36/124.72     ), converse( meet( X, converse( Y ) ) ) ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112594) {G1,W10,D5,L1,V2,M1}  { zero ==> meet( complement( 
% 124.36/124.72    converse( X ) ), converse( meet( Y, X ) ) ) }.
% 124.36/124.72  parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 124.36/124.72  parent1[0; 9]: (112593) {G27,W10,D6,L1,V2,M1}  { zero ==> meet( complement
% 124.36/124.72    ( X ), converse( meet( Y, converse( X ) ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := converse( X )
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112595) {G1,W10,D5,L1,V2,M1}  { meet( complement( converse( X ) )
% 124.36/124.72    , converse( meet( Y, X ) ) ) ==> zero }.
% 124.36/124.72  parent0[0]: (112594) {G1,W10,D5,L1,V2,M1}  { zero ==> meet( complement( 
% 124.36/124.72    converse( X ) ), converse( meet( Y, X ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (13424) {G28,W10,D5,L1,V2,M1} P(7,3824) { meet( complement( 
% 124.36/124.72    converse( X ) ), converse( meet( Y, X ) ) ) ==> zero }.
% 124.36/124.72  parent0: (112595) {G1,W10,D5,L1,V2,M1}  { meet( complement( converse( X ) )
% 124.36/124.72    , converse( meet( Y, X ) ) ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112596) {G28,W10,D5,L1,V2,M1}  { zero ==> meet( complement( 
% 124.36/124.72    converse( X ) ), converse( meet( Y, X ) ) ) }.
% 124.36/124.72  parent0[0]: (13424) {G28,W10,D5,L1,V2,M1} P(7,3824) { meet( complement( 
% 124.36/124.72    converse( X ) ), converse( meet( Y, X ) ) ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112597) {G2,W10,D5,L1,V2,M1}  { zero ==> meet( converse( meet( Y
% 124.36/124.72    , X ) ), complement( converse( X ) ) ) }.
% 124.36/124.72  parent0[0]: (42) {G1,W7,D3,L1,V2,M1} P(0,3);d(3) { meet( Y, X ) = meet( X, 
% 124.36/124.72    Y ) }.
% 124.36/124.72  parent1[0; 2]: (112596) {G28,W10,D5,L1,V2,M1}  { zero ==> meet( complement
% 124.36/124.72    ( converse( X ) ), converse( meet( Y, X ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := converse( meet( Y, X ) )
% 124.36/124.72     Y := complement( converse( X ) )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112601) {G2,W10,D5,L1,V2,M1}  { meet( converse( meet( X, Y ) ), 
% 124.36/124.72    complement( converse( Y ) ) ) ==> zero }.
% 124.36/124.72  parent0[0]: (112597) {G2,W10,D5,L1,V2,M1}  { zero ==> meet( converse( meet
% 124.36/124.72    ( Y, X ) ), complement( converse( X ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (13461) {G29,W10,D5,L1,V2,M1} P(13424,42) { meet( converse( 
% 124.36/124.72    meet( Y, X ) ), complement( converse( X ) ) ) ==> zero }.
% 124.36/124.72  parent0: (112601) {G2,W10,D5,L1,V2,M1}  { meet( converse( meet( X, Y ) ), 
% 124.36/124.72    complement( converse( Y ) ) ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112606) {G29,W10,D5,L1,V2,M1}  { zero ==> meet( converse( meet( X
% 124.36/124.72    , Y ) ), complement( converse( Y ) ) ) }.
% 124.36/124.72  parent0[0]: (13461) {G29,W10,D5,L1,V2,M1} P(13424,42) { meet( converse( 
% 124.36/124.72    meet( Y, X ) ), complement( converse( X ) ) ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112608) {G26,W12,D6,L1,V2,M1}  { zero ==> meet( converse( meet( X
% 124.36/124.72    , complement( Y ) ) ), complement( complement( converse( Y ) ) ) ) }.
% 124.36/124.72  parent0[0]: (12105) {G25,W7,D4,L1,V1,M1} P(12014,1346) { converse( 
% 124.36/124.72    complement( X ) ) ==> complement( converse( X ) ) }.
% 124.36/124.72  parent1[0; 9]: (112606) {G29,W10,D5,L1,V2,M1}  { zero ==> meet( converse( 
% 124.36/124.72    meet( X, Y ) ), complement( converse( Y ) ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := complement( Y )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112609) {G14,W10,D6,L1,V2,M1}  { zero ==> meet( converse( meet( X
% 124.36/124.72    , complement( Y ) ) ), converse( Y ) ) }.
% 124.36/124.72  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.72    complement( complement( X ) ) ==> X }.
% 124.36/124.72  parent1[0; 8]: (112608) {G26,W12,D6,L1,V2,M1}  { zero ==> meet( converse( 
% 124.36/124.72    meet( X, complement( Y ) ) ), complement( complement( converse( Y ) ) ) )
% 124.36/124.72     }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := converse( Y )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112610) {G14,W10,D6,L1,V2,M1}  { meet( converse( meet( X, 
% 124.36/124.72    complement( Y ) ) ), converse( Y ) ) ==> zero }.
% 124.36/124.72  parent0[0]: (112609) {G14,W10,D6,L1,V2,M1}  { zero ==> meet( converse( meet
% 124.36/124.72    ( X, complement( Y ) ) ), converse( Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (13512) {G30,W10,D6,L1,V2,M1} P(12105,13461);d(1346) { meet( 
% 124.36/124.72    converse( meet( Y, complement( X ) ) ), converse( X ) ) ==> zero }.
% 124.36/124.72  parent0: (112610) {G14,W10,D6,L1,V2,M1}  { meet( converse( meet( X, 
% 124.36/124.72    complement( Y ) ) ), converse( Y ) ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112612) {G30,W10,D6,L1,V2,M1}  { zero ==> meet( converse( meet( X
% 124.36/124.72    , complement( Y ) ) ), converse( Y ) ) }.
% 124.36/124.72  parent0[0]: (13512) {G30,W10,D6,L1,V2,M1} P(12105,13461);d(1346) { meet( 
% 124.36/124.72    converse( meet( Y, complement( X ) ) ), converse( X ) ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112613) {G1,W10,D7,L1,V2,M1}  { zero ==> meet( converse( meet( X
% 124.36/124.72    , complement( converse( Y ) ) ) ), Y ) }.
% 124.36/124.72  parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 124.36/124.72  parent1[0; 9]: (112612) {G30,W10,D6,L1,V2,M1}  { zero ==> meet( converse( 
% 124.36/124.72    meet( X, complement( Y ) ) ), converse( Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := converse( Y )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112614) {G1,W10,D7,L1,V2,M1}  { meet( converse( meet( X, 
% 124.36/124.72    complement( converse( Y ) ) ) ), Y ) ==> zero }.
% 124.36/124.72  parent0[0]: (112613) {G1,W10,D7,L1,V2,M1}  { zero ==> meet( converse( meet
% 124.36/124.72    ( X, complement( converse( Y ) ) ) ), Y ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (13556) {G31,W10,D7,L1,V2,M1} P(7,13512) { meet( converse( 
% 124.36/124.72    meet( Y, complement( converse( X ) ) ) ), X ) ==> zero }.
% 124.36/124.72  parent0: (112614) {G1,W10,D7,L1,V2,M1}  { meet( converse( meet( X, 
% 124.36/124.72    complement( converse( Y ) ) ) ), Y ) ==> zero }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112618) {G4,W15,D5,L1,V3,M1}  { composition( X, join( meet( Y, Z
% 124.36/124.72     ), meet( Z, Y ) ) ) = composition( X, meet( Z, Y ) ) }.
% 124.36/124.72  parent0[0]: (10802) {G21,W11,D4,L1,V2,M1} P(4417,10753);d(1397) { join( 
% 124.36/124.72    meet( X, Y ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 124.36/124.72  parent1[0; 12]: (1044) {G3,W11,D4,L1,V3,M1} P(73,7);d(7) { composition( X, 
% 124.36/124.72    join( Z, Y ) ) = composition( X, join( Y, Z ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Z
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := meet( Z, Y )
% 124.36/124.72     Z := meet( Y, Z )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112620) {G5,W11,D4,L1,V3,M1}  { composition( X, meet( Y, Z ) ) = 
% 124.36/124.72    composition( X, meet( Z, Y ) ) }.
% 124.36/124.72  parent0[0]: (10802) {G21,W11,D4,L1,V2,M1} P(4417,10753);d(1397) { join( 
% 124.36/124.72    meet( X, Y ), meet( Y, X ) ) ==> meet( X, Y ) }.
% 124.36/124.72  parent1[0; 3]: (112618) {G4,W15,D5,L1,V3,M1}  { composition( X, join( meet
% 124.36/124.72    ( Y, Z ), meet( Z, Y ) ) ) = composition( X, meet( Z, Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := Z
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72     Z := Z
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (15332) {G22,W11,D4,L1,V3,M1} P(10802,1044);d(10802) { 
% 124.36/124.72    composition( Z, meet( X, Y ) ) = composition( Z, meet( Y, X ) ) }.
% 124.36/124.72  parent0: (112620) {G5,W11,D4,L1,V3,M1}  { composition( X, meet( Y, Z ) ) = 
% 124.36/124.72    composition( X, meet( Z, Y ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Z
% 124.36/124.72     Y := X
% 124.36/124.72     Z := Y
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112622) {G5,W11,D4,L1,V2,M1}  { composition( join( one, Y ), X ) =
% 124.36/124.72     join( X, composition( Y, X ) ) }.
% 124.36/124.72  parent0[0]: (1286) {G5,W11,D4,L1,V2,M1} P(1278,6) { join( X, composition( Y
% 124.36/124.72    , X ) ) = composition( join( one, Y ), X ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112635) {G6,W13,D5,L1,V1,M1}  { composition( join( one, 
% 124.36/124.72    composition( X, top ) ), top ) = join( top, composition( X, top ) ) }.
% 124.36/124.72  parent0[0]: (3597) {G19,W9,D4,L1,V1,M1} P(3596,4) { composition( 
% 124.36/124.72    composition( X, top ), top ) ==> composition( X, top ) }.
% 124.36/124.72  parent1[0; 10]: (112622) {G5,W11,D4,L1,V2,M1}  { composition( join( one, Y
% 124.36/124.72     ), X ) = join( X, composition( Y, X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := top
% 124.36/124.72     Y := composition( X, top )
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112636) {G7,W9,D5,L1,V1,M1}  { composition( join( one, 
% 124.36/124.72    composition( X, top ) ), top ) = top }.
% 124.36/124.72  parent0[0]: (562) {G6,W5,D3,L1,V1,M1} P(542,0);d(389) { join( top, Y ) ==> 
% 124.36/124.72    top }.
% 124.36/124.72  parent1[0; 8]: (112635) {G6,W13,D5,L1,V1,M1}  { composition( join( one, 
% 124.36/124.72    composition( X, top ) ), top ) = join( top, composition( X, top ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := composition( X, top )
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112637) {G8,W7,D4,L1,V1,M1}  { composition( join( one, X ), top )
% 124.36/124.72     = top }.
% 124.36/124.72  parent0[0]: (3600) {G20,W13,D5,L1,V2,M1} P(3597,6);d(6) { composition( join
% 124.36/124.72    ( Y, composition( X, top ) ), top ) ==> composition( join( Y, X ), top )
% 124.36/124.72     }.
% 124.36/124.72  parent1[0; 1]: (112636) {G7,W9,D5,L1,V1,M1}  { composition( join( one, 
% 124.36/124.72    composition( X, top ) ), top ) = top }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := one
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  subsumption: (16035) {G21,W7,D4,L1,V1,M1} P(3597,1286);d(562);d(3600) { 
% 124.36/124.72    composition( join( one, X ), top ) ==> top }.
% 124.36/124.72  parent0: (112637) {G8,W7,D4,L1,V1,M1}  { composition( join( one, X ), top )
% 124.36/124.72     = top }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72  end
% 124.36/124.72  permutation0:
% 124.36/124.72     0 ==> 0
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  eqswap: (112640) {G5,W11,D4,L1,V2,M1}  { composition( join( one, Y ), X ) =
% 124.36/124.72     join( X, composition( Y, X ) ) }.
% 124.36/124.72  parent0[0]: (1286) {G5,W11,D4,L1,V2,M1} P(1278,6) { join( X, composition( Y
% 124.36/124.72    , X ) ) = composition( join( one, Y ), X ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := X
% 124.36/124.72     Y := Y
% 124.36/124.72  end
% 124.36/124.72  
% 124.36/124.72  paramod: (112641) {G6,W9,D4,L1,V1,M1}  { composition( top, X ) = join( X, 
% 124.36/124.72    composition( top, X ) ) }.
% 124.36/124.72  parent0[0]: (575) {G8,W5,D3,L1,V1,M1} P(562,1);d(571) { join( Y, top ) ==> 
% 124.36/124.72    top }.
% 124.36/124.72  parent1[0; 2]: (112640) {G5,W11,D4,L1,V2,M1}  { composition( join( one, Y )
% 124.36/124.72    , X ) = join( X, composition( Y, X ) ) }.
% 124.36/124.72  substitution0:
% 124.36/124.72     X := Y
% 124.36/124.72     Y := one
% 124.36/124.72  end
% 124.36/124.72  substitution1:
% 124.36/124.72     X := X
% 124.36/124.72     Y := top
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112642) {G6,W9,D4,L1,V1,M1}  { join( X, composition( top, X ) ) = 
% 124.36/124.73    composition( top, X ) }.
% 124.36/124.73  parent0[0]: (112641) {G6,W9,D4,L1,V1,M1}  { composition( top, X ) = join( X
% 124.36/124.73    , composition( top, X ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (16087) {G9,W9,D4,L1,V1,M1} P(575,1286) { join( X, composition
% 124.36/124.73    ( top, X ) ) ==> composition( top, X ) }.
% 124.36/124.73  parent0: (112642) {G6,W9,D4,L1,V1,M1}  { join( X, composition( top, X ) ) =
% 124.36/124.73     composition( top, X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112644) {G5,W11,D4,L1,V2,M1}  { composition( join( one, Y ), X ) =
% 124.36/124.73     join( X, composition( Y, X ) ) }.
% 124.36/124.73  parent0[0]: (1286) {G5,W11,D4,L1,V2,M1} P(1278,6) { join( X, composition( Y
% 124.36/124.73    , X ) ) = composition( join( one, Y ), X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112646) {G3,W9,D4,L1,V1,M1}  { composition( one, X ) = join( X, 
% 124.36/124.73    composition( skol1, X ) ) }.
% 124.36/124.73  parent0[0]: (32) {G2,W5,D3,L1,V0,M1} P(30,0) { join( one, skol1 ) ==> one
% 124.36/124.73     }.
% 124.36/124.73  parent1[0; 2]: (112644) {G5,W11,D4,L1,V2,M1}  { composition( join( one, Y )
% 124.36/124.73    , X ) = join( X, composition( Y, X ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := skol1
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112647) {G4,W7,D4,L1,V1,M1}  { X = join( X, composition( skol1, X
% 124.36/124.73     ) ) }.
% 124.36/124.73  parent0[0]: (1278) {G4,W5,D3,L1,V1,M1} P(1276,1268) { composition( one, X )
% 124.36/124.73     ==> X }.
% 124.36/124.73  parent1[0; 1]: (112646) {G3,W9,D4,L1,V1,M1}  { composition( one, X ) = join
% 124.36/124.73    ( X, composition( skol1, X ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112648) {G4,W7,D4,L1,V1,M1}  { join( X, composition( skol1, X ) ) 
% 124.36/124.73    = X }.
% 124.36/124.73  parent0[0]: (112647) {G4,W7,D4,L1,V1,M1}  { X = join( X, composition( skol1
% 124.36/124.73    , X ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (16096) {G6,W7,D4,L1,V1,M1} P(32,1286);d(1278) { join( X, 
% 124.36/124.73    composition( skol1, X ) ) ==> X }.
% 124.36/124.73  parent0: (112648) {G4,W7,D4,L1,V1,M1}  { join( X, composition( skol1, X ) )
% 124.36/124.73     = X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112650) {G5,W11,D4,L1,V2,M1}  { composition( join( one, Y ), X ) =
% 124.36/124.73     join( X, composition( Y, X ) ) }.
% 124.36/124.73  parent0[0]: (1286) {G5,W11,D4,L1,V2,M1} P(1278,6) { join( X, composition( Y
% 124.36/124.73    , X ) ) = composition( join( one, Y ), X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112651) {G1,W10,D5,L1,V1,M1}  { composition( top, X ) = join( X, 
% 124.36/124.73    composition( complement( one ), X ) ) }.
% 124.36/124.73  parent0[0]: (11) {G0,W6,D4,L1,V1,M1} I { join( X, complement( X ) ) ==> top
% 124.36/124.73     }.
% 124.36/124.73  parent1[0; 2]: (112650) {G5,W11,D4,L1,V2,M1}  { composition( join( one, Y )
% 124.36/124.73    , X ) = join( X, composition( Y, X ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := one
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := complement( one )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112652) {G1,W10,D5,L1,V1,M1}  { join( X, composition( complement( 
% 124.36/124.73    one ), X ) ) = composition( top, X ) }.
% 124.36/124.73  parent0[0]: (112651) {G1,W10,D5,L1,V1,M1}  { composition( top, X ) = join( 
% 124.36/124.73    X, composition( complement( one ), X ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (16099) {G6,W10,D5,L1,V1,M1} P(11,1286) { join( X, composition
% 124.36/124.73    ( complement( one ), X ) ) ==> composition( top, X ) }.
% 124.36/124.73  parent0: (112652) {G1,W10,D5,L1,V1,M1}  { join( X, composition( complement
% 124.36/124.73    ( one ), X ) ) = composition( top, X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112654) {G21,W7,D4,L1,V1,M1}  { top ==> composition( join( one, X
% 124.36/124.73     ), top ) }.
% 124.36/124.73  parent0[0]: (16035) {G21,W7,D4,L1,V1,M1} P(3597,1286);d(562);d(3600) { 
% 124.36/124.73    composition( join( one, X ), top ) ==> top }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112655) {G22,W7,D4,L1,V1,M1}  { top ==> composition( join( X, one
% 124.36/124.73     ), top ) }.
% 124.36/124.73  parent0[0]: (12964) {G28,W10,D5,L1,V1,M1} P(1876,12962);d(11775) { join( 
% 124.36/124.73    one, meet( X, complement( skol1 ) ) ) ==> join( X, one ) }.
% 124.36/124.73  parent1[0; 3]: (112654) {G21,W7,D4,L1,V1,M1}  { top ==> composition( join( 
% 124.36/124.73    one, X ), top ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := meet( X, complement( skol1 ) )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112656) {G22,W7,D4,L1,V1,M1}  { composition( join( X, one ), top )
% 124.36/124.73     ==> top }.
% 124.36/124.73  parent0[0]: (112655) {G22,W7,D4,L1,V1,M1}  { top ==> composition( join( X, 
% 124.36/124.73    one ), top ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (16101) {G29,W7,D4,L1,V1,M1} P(12964,16035) { composition( 
% 124.36/124.73    join( X, one ), top ) ==> top }.
% 124.36/124.73  parent0: (112656) {G22,W7,D4,L1,V1,M1}  { composition( join( X, one ), top
% 124.36/124.73     ) ==> top }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112658) {G29,W7,D4,L1,V1,M1}  { top ==> composition( join( X, one
% 124.36/124.73     ), top ) }.
% 124.36/124.73  parent0[0]: (16101) {G29,W7,D4,L1,V1,M1} P(12964,16035) { composition( join
% 124.36/124.73    ( X, one ), top ) ==> top }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112660) {G5,W8,D5,L1,V1,M1}  { top ==> composition( converse( 
% 124.36/124.73    join( X, one ) ), top ) }.
% 124.36/124.73  parent0[0]: (1279) {G4,W9,D4,L1,V1,M1} P(1276,65) { join( converse( X ), 
% 124.36/124.73    one ) ==> converse( join( X, one ) ) }.
% 124.36/124.73  parent1[0; 3]: (112658) {G29,W7,D4,L1,V1,M1}  { top ==> composition( join( 
% 124.36/124.73    X, one ), top ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := converse( X )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112661) {G6,W8,D5,L1,V1,M1}  { top ==> converse( composition( top
% 124.36/124.73    , join( X, one ) ) ) }.
% 124.36/124.73  parent0[0]: (759) {G11,W9,D4,L1,V1,M1} P(752,9) { composition( converse( X
% 124.36/124.73     ), top ) ==> converse( composition( top, X ) ) }.
% 124.36/124.73  parent1[0; 2]: (112660) {G5,W8,D5,L1,V1,M1}  { top ==> composition( 
% 124.36/124.73    converse( join( X, one ) ), top ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := join( X, one )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112662) {G6,W8,D5,L1,V1,M1}  { converse( composition( top, join( X
% 124.36/124.73    , one ) ) ) ==> top }.
% 124.36/124.73  parent0[0]: (112661) {G6,W8,D5,L1,V1,M1}  { top ==> converse( composition( 
% 124.36/124.73    top, join( X, one ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (16111) {G30,W8,D5,L1,V1,M1} P(1279,16101);d(759) { converse( 
% 124.36/124.73    composition( top, join( X, one ) ) ) ==> top }.
% 124.36/124.73  parent0: (112662) {G6,W8,D5,L1,V1,M1}  { converse( composition( top, join( 
% 124.36/124.73    X, one ) ) ) ==> top }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112664) {G26,W7,D4,L1,V2,M1}  { X ==> meet( X, join( Y, X ) ) }.
% 124.36/124.73  parent0[0]: (1867) {G26,W7,D4,L1,V2,M1} P(0,1841) { meet( X, join( Y, X ) )
% 124.36/124.73     ==> X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112665) {G7,W9,D4,L1,V1,M1}  { composition( skol1, X ) ==> meet( 
% 124.36/124.73    composition( skol1, X ), X ) }.
% 124.36/124.73  parent0[0]: (16096) {G6,W7,D4,L1,V1,M1} P(32,1286);d(1278) { join( X, 
% 124.36/124.73    composition( skol1, X ) ) ==> X }.
% 124.36/124.73  parent1[0; 8]: (112664) {G26,W7,D4,L1,V2,M1}  { X ==> meet( X, join( Y, X )
% 124.36/124.73     ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := composition( skol1, X )
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112666) {G7,W9,D4,L1,V1,M1}  { meet( composition( skol1, X ), X ) 
% 124.36/124.73    ==> composition( skol1, X ) }.
% 124.36/124.73  parent0[0]: (112665) {G7,W9,D4,L1,V1,M1}  { composition( skol1, X ) ==> 
% 124.36/124.73    meet( composition( skol1, X ), X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (16175) {G27,W9,D4,L1,V1,M1} P(16096,1867) { meet( composition
% 124.36/124.73    ( skol1, X ), X ) ==> composition( skol1, X ) }.
% 124.36/124.73  parent0: (112666) {G7,W9,D4,L1,V1,M1}  { meet( composition( skol1, X ), X )
% 124.36/124.73     ==> composition( skol1, X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112668) {G1,W10,D5,L1,V2,M1}  { join( X, converse( Y ) ) ==> 
% 124.36/124.73    converse( join( converse( X ), Y ) ) }.
% 124.36/124.73  parent0[0]: (64) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 124.36/124.73     ), Y ) ) ==> join( X, converse( Y ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112671) {G2,W11,D6,L1,V1,M1}  { join( X, converse( composition( 
% 124.36/124.73    skol1, converse( X ) ) ) ) ==> converse( converse( X ) ) }.
% 124.36/124.73  parent0[0]: (16096) {G6,W7,D4,L1,V1,M1} P(32,1286);d(1278) { join( X, 
% 124.36/124.73    composition( skol1, X ) ) ==> X }.
% 124.36/124.73  parent1[0; 9]: (112668) {G1,W10,D5,L1,V2,M1}  { join( X, converse( Y ) ) 
% 124.36/124.73    ==> converse( join( converse( X ), Y ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := converse( X )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := composition( skol1, converse( X ) )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112672) {G1,W9,D6,L1,V1,M1}  { join( X, converse( composition( 
% 124.36/124.73    skol1, converse( X ) ) ) ) ==> X }.
% 124.36/124.73  parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 124.36/124.73  parent1[0; 8]: (112671) {G2,W11,D6,L1,V1,M1}  { join( X, converse( 
% 124.36/124.73    composition( skol1, converse( X ) ) ) ) ==> converse( converse( X ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112673) {G2,W8,D5,L1,V1,M1}  { join( X, composition( X, converse
% 124.36/124.73    ( skol1 ) ) ) ==> X }.
% 124.36/124.73  parent0[0]: (77) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y, 
% 124.36/124.73    converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 124.36/124.73  parent1[0; 3]: (112672) {G1,W9,D6,L1,V1,M1}  { join( X, converse( 
% 124.36/124.73    composition( skol1, converse( X ) ) ) ) ==> X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := skol1
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (16184) {G7,W8,D5,L1,V1,M1} P(16096,64);d(7);d(77) { join( X, 
% 124.36/124.73    composition( X, converse( skol1 ) ) ) ==> X }.
% 124.36/124.73  parent0: (112673) {G2,W8,D5,L1,V1,M1}  { join( X, composition( X, converse
% 124.36/124.73    ( skol1 ) ) ) ==> X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112676) {G5,W11,D4,L1,V2,M1}  { composition( join( one, Y ), X ) =
% 124.36/124.73     join( X, composition( Y, X ) ) }.
% 124.36/124.73  parent0[0]: (1286) {G5,W11,D4,L1,V2,M1} P(1278,6) { join( X, composition( Y
% 124.36/124.73    , X ) ) = composition( join( one, Y ), X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112681) {G6,W12,D6,L1,V1,M1}  { composition( one, X ) = join( X, 
% 124.36/124.73    composition( composition( one, converse( skol1 ) ), X ) ) }.
% 124.36/124.73  parent0[0]: (16184) {G7,W8,D5,L1,V1,M1} P(16096,64);d(7);d(77) { join( X, 
% 124.36/124.73    composition( X, converse( skol1 ) ) ) ==> X }.
% 124.36/124.73  parent1[0; 2]: (112676) {G5,W11,D4,L1,V2,M1}  { composition( join( one, Y )
% 124.36/124.73    , X ) = join( X, composition( Y, X ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := one
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := composition( one, converse( skol1 ) )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112684) {G5,W10,D5,L1,V1,M1}  { composition( one, X ) = join( X, 
% 124.36/124.73    composition( converse( skol1 ), X ) ) }.
% 124.36/124.73  parent0[0]: (1278) {G4,W5,D3,L1,V1,M1} P(1276,1268) { composition( one, X )
% 124.36/124.73     ==> X }.
% 124.36/124.73  parent1[0; 7]: (112681) {G6,W12,D6,L1,V1,M1}  { composition( one, X ) = 
% 124.36/124.73    join( X, composition( composition( one, converse( skol1 ) ), X ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := converse( skol1 )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112686) {G5,W8,D5,L1,V1,M1}  { X = join( X, composition( converse
% 124.36/124.73    ( skol1 ), X ) ) }.
% 124.36/124.73  parent0[0]: (1278) {G4,W5,D3,L1,V1,M1} P(1276,1268) { composition( one, X )
% 124.36/124.73     ==> X }.
% 124.36/124.73  parent1[0; 1]: (112684) {G5,W10,D5,L1,V1,M1}  { composition( one, X ) = 
% 124.36/124.73    join( X, composition( converse( skol1 ), X ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112687) {G5,W8,D5,L1,V1,M1}  { join( X, composition( converse( 
% 124.36/124.73    skol1 ), X ) ) = X }.
% 124.36/124.73  parent0[0]: (112686) {G5,W8,D5,L1,V1,M1}  { X = join( X, composition( 
% 124.36/124.73    converse( skol1 ), X ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (16406) {G8,W8,D5,L1,V1,M1} P(16184,1286);d(1278);d(1278) { 
% 124.36/124.73    join( X, composition( converse( skol1 ), X ) ) ==> X }.
% 124.36/124.73  parent0: (112687) {G5,W8,D5,L1,V1,M1}  { join( X, composition( converse( 
% 124.36/124.73    skol1 ), X ) ) = X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112689) {G1,W10,D5,L1,V2,M1}  { join( X, converse( Y ) ) ==> 
% 124.36/124.73    converse( join( converse( X ), Y ) ) }.
% 124.36/124.73  parent0[0]: (64) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 124.36/124.73     ), Y ) ) ==> join( X, converse( Y ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112693) {G2,W12,D6,L1,V1,M1}  { join( X, converse( composition( 
% 124.36/124.73    converse( skol1 ), converse( X ) ) ) ) ==> converse( converse( X ) ) }.
% 124.36/124.73  parent0[0]: (16406) {G8,W8,D5,L1,V1,M1} P(16184,1286);d(1278);d(1278) { 
% 124.36/124.73    join( X, composition( converse( skol1 ), X ) ) ==> X }.
% 124.36/124.73  parent1[0; 10]: (112689) {G1,W10,D5,L1,V2,M1}  { join( X, converse( Y ) ) 
% 124.36/124.73    ==> converse( join( converse( X ), Y ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := converse( X )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := composition( converse( skol1 ), converse( X ) )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112694) {G1,W10,D6,L1,V1,M1}  { join( X, converse( composition( 
% 124.36/124.73    converse( skol1 ), converse( X ) ) ) ) ==> X }.
% 124.36/124.73  parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 124.36/124.73  parent1[0; 9]: (112693) {G2,W12,D6,L1,V1,M1}  { join( X, converse( 
% 124.36/124.73    composition( converse( skol1 ), converse( X ) ) ) ) ==> converse( 
% 124.36/124.73    converse( X ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112695) {G2,W9,D6,L1,V1,M1}  { join( X, composition( X, converse
% 124.36/124.73    ( converse( skol1 ) ) ) ) ==> X }.
% 124.36/124.73  parent0[0]: (77) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y, 
% 124.36/124.73    converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 124.36/124.73  parent1[0; 3]: (112694) {G1,W10,D6,L1,V1,M1}  { join( X, converse( 
% 124.36/124.73    composition( converse( skol1 ), converse( X ) ) ) ) ==> X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := converse( skol1 )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112696) {G1,W7,D4,L1,V1,M1}  { join( X, composition( X, skol1 ) )
% 124.36/124.73     ==> X }.
% 124.36/124.73  parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 124.36/124.73  parent1[0; 5]: (112695) {G2,W9,D6,L1,V1,M1}  { join( X, composition( X, 
% 124.36/124.73    converse( converse( skol1 ) ) ) ) ==> X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := skol1
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (16476) {G9,W7,D4,L1,V1,M1} P(16406,64);d(7);d(77);d(7) { join
% 124.36/124.73    ( X, composition( X, skol1 ) ) ==> X }.
% 124.36/124.73  parent0: (112696) {G1,W7,D4,L1,V1,M1}  { join( X, composition( X, skol1 ) )
% 124.36/124.73     ==> X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112706) {G3,W11,D5,L1,V2,M1}  { join( join( X, composition( Y, 
% 124.36/124.73    skol1 ) ), Y ) = join( Y, X ) }.
% 124.36/124.73  parent0[0]: (16476) {G9,W7,D4,L1,V1,M1} P(16406,64);d(7);d(77);d(7) { join
% 124.36/124.73    ( X, composition( X, skol1 ) ) ==> X }.
% 124.36/124.73  parent1[0; 9]: (160) {G2,W11,D4,L1,V3,M1} P(0,19) { join( join( Z, X ), Y )
% 124.36/124.73     = join( join( Y, X ), Z ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := composition( Y, skol1 )
% 124.36/124.73     Y := Y
% 124.36/124.73     Z := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (16533) {G10,W11,D5,L1,V2,M1} P(16476,160) { join( join( Y, 
% 124.36/124.73    composition( X, skol1 ) ), X ) ==> join( X, Y ) }.
% 124.36/124.73  parent0: (112706) {G3,W11,D5,L1,V2,M1}  { join( join( X, composition( Y, 
% 124.36/124.73    skol1 ) ), Y ) = join( Y, X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112708) {G26,W7,D4,L1,V2,M1}  { X ==> meet( X, join( Y, X ) ) }.
% 124.36/124.73  parent0[0]: (1867) {G26,W7,D4,L1,V2,M1} P(0,1841) { meet( X, join( Y, X ) )
% 124.36/124.73     ==> X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112709) {G10,W9,D4,L1,V1,M1}  { composition( X, skol1 ) ==> meet
% 124.36/124.73    ( composition( X, skol1 ), X ) }.
% 124.36/124.73  parent0[0]: (16476) {G9,W7,D4,L1,V1,M1} P(16406,64);d(7);d(77);d(7) { join
% 124.36/124.73    ( X, composition( X, skol1 ) ) ==> X }.
% 124.36/124.73  parent1[0; 8]: (112708) {G26,W7,D4,L1,V2,M1}  { X ==> meet( X, join( Y, X )
% 124.36/124.73     ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := composition( X, skol1 )
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112710) {G10,W9,D4,L1,V1,M1}  { meet( composition( X, skol1 ), X )
% 124.36/124.73     ==> composition( X, skol1 ) }.
% 124.36/124.73  parent0[0]: (112709) {G10,W9,D4,L1,V1,M1}  { composition( X, skol1 ) ==> 
% 124.36/124.73    meet( composition( X, skol1 ), X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (16544) {G27,W9,D4,L1,V1,M1} P(16476,1867) { meet( composition
% 124.36/124.73    ( X, skol1 ), X ) ==> composition( X, skol1 ) }.
% 124.36/124.73  parent0: (112710) {G10,W9,D4,L1,V1,M1}  { meet( composition( X, skol1 ), X
% 124.36/124.73     ) ==> composition( X, skol1 ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112712) {G20,W9,D6,L1,V2,M1}  { Y ==> join( converse( meet( X, 
% 124.36/124.73    converse( Y ) ) ), Y ) }.
% 124.36/124.73  parent0[0]: (1671) {G20,W9,D6,L1,V2,M1} P(1668,65);d(7) { join( converse( 
% 124.36/124.73    meet( X, converse( Y ) ) ), Y ) ==> Y }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112715) {G21,W16,D5,L1,V2,M1}  { composition( top, join( X, one )
% 124.36/124.73     ) ==> join( converse( meet( Y, top ) ), composition( top, join( X, one )
% 124.36/124.73     ) ) }.
% 124.36/124.73  parent0[0]: (16111) {G30,W8,D5,L1,V1,M1} P(1279,16101);d(759) { converse( 
% 124.36/124.73    composition( top, join( X, one ) ) ) ==> top }.
% 124.36/124.73  parent1[0; 10]: (112712) {G20,W9,D6,L1,V2,M1}  { Y ==> join( converse( meet
% 124.36/124.73    ( X, converse( Y ) ) ), Y ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := composition( top, join( X, one ) )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112716) {G13,W14,D5,L1,V2,M1}  { composition( top, join( X, one )
% 124.36/124.73     ) ==> join( converse( Y ), composition( top, join( X, one ) ) ) }.
% 124.36/124.73  parent0[0]: (1344) {G12,W5,D3,L1,V1,M1} P(46,1333);d(639) { meet( X, top ) 
% 124.36/124.73    ==> X }.
% 124.36/124.73  parent1[0; 8]: (112715) {G21,W16,D5,L1,V2,M1}  { composition( top, join( X
% 124.36/124.73    , one ) ) ==> join( converse( meet( Y, top ) ), composition( top, join( X
% 124.36/124.73    , one ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112717) {G13,W14,D5,L1,V2,M1}  { join( converse( Y ), composition
% 124.36/124.73    ( top, join( X, one ) ) ) ==> composition( top, join( X, one ) ) }.
% 124.36/124.73  parent0[0]: (112716) {G13,W14,D5,L1,V2,M1}  { composition( top, join( X, 
% 124.36/124.73    one ) ) ==> join( converse( Y ), composition( top, join( X, one ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (16875) {G31,W14,D5,L1,V2,M1} P(16111,1671);d(1344) { join( 
% 124.36/124.73    converse( Y ), composition( top, join( X, one ) ) ) ==> composition( top
% 124.36/124.73    , join( X, one ) ) }.
% 124.36/124.73  parent0: (112717) {G13,W14,D5,L1,V2,M1}  { join( converse( Y ), composition
% 124.36/124.73    ( top, join( X, one ) ) ) ==> composition( top, join( X, one ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112719) {G1,W10,D5,L1,V2,M1}  { join( converse( X ), Y ) ==> 
% 124.36/124.73    converse( join( X, converse( Y ) ) ) }.
% 124.36/124.73  parent0[0]: (65) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 124.36/124.73    ( X ) ) ) ==> join( converse( Y ), X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112724) {G2,W13,D5,L1,V2,M1}  { join( converse( X ), composition
% 124.36/124.73    ( top, join( Y, one ) ) ) ==> converse( join( X, top ) ) }.
% 124.36/124.73  parent0[0]: (16111) {G30,W8,D5,L1,V1,M1} P(1279,16101);d(759) { converse( 
% 124.36/124.73    composition( top, join( X, one ) ) ) ==> top }.
% 124.36/124.73  parent1[0; 12]: (112719) {G1,W10,D5,L1,V2,M1}  { join( converse( X ), Y ) 
% 124.36/124.73    ==> converse( join( X, converse( Y ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := composition( top, join( Y, one ) )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112725) {G3,W11,D5,L1,V2,M1}  { join( converse( X ), composition
% 124.36/124.73    ( top, join( Y, one ) ) ) ==> converse( top ) }.
% 124.36/124.73  parent0[0]: (575) {G8,W5,D3,L1,V1,M1} P(562,1);d(571) { join( Y, top ) ==> 
% 124.36/124.73    top }.
% 124.36/124.73  parent1[0; 10]: (112724) {G2,W13,D5,L1,V2,M1}  { join( converse( X ), 
% 124.36/124.73    composition( top, join( Y, one ) ) ) ==> converse( join( X, top ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Z
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112726) {G4,W10,D5,L1,V2,M1}  { join( converse( X ), composition
% 124.36/124.73    ( top, join( Y, one ) ) ) ==> top }.
% 124.36/124.73  parent0[0]: (752) {G10,W4,D3,L1,V0,M1} P(738,562) { converse( top ) ==> top
% 124.36/124.73     }.
% 124.36/124.73  parent1[0; 9]: (112725) {G3,W11,D5,L1,V2,M1}  { join( converse( X ), 
% 124.36/124.73    composition( top, join( Y, one ) ) ) ==> converse( top ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112727) {G5,W7,D4,L1,V1,M1}  { composition( top, join( Y, one ) )
% 124.36/124.73     ==> top }.
% 124.36/124.73  parent0[0]: (16875) {G31,W14,D5,L1,V2,M1} P(16111,1671);d(1344) { join( 
% 124.36/124.73    converse( Y ), composition( top, join( X, one ) ) ) ==> composition( top
% 124.36/124.73    , join( X, one ) ) }.
% 124.36/124.73  parent1[0; 1]: (112726) {G4,W10,D5,L1,V2,M1}  { join( converse( X ), 
% 124.36/124.73    composition( top, join( Y, one ) ) ) ==> top }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (16894) {G32,W7,D4,L1,V1,M1} P(16111,65);d(575);d(752);d(16875
% 124.36/124.73    ) { composition( top, join( X, one ) ) ==> top }.
% 124.36/124.73  parent0: (112727) {G5,W7,D4,L1,V1,M1}  { composition( top, join( Y, one ) )
% 124.36/124.73     ==> top }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112729) {G32,W7,D4,L1,V1,M1}  { top ==> composition( top, join( X
% 124.36/124.73    , one ) ) }.
% 124.36/124.73  parent0[0]: (16894) {G32,W7,D4,L1,V1,M1} P(16111,65);d(575);d(752);d(16875)
% 124.36/124.73     { composition( top, join( X, one ) ) ==> top }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112730) {G4,W7,D4,L1,V1,M1}  { top ==> composition( top, join( 
% 124.36/124.73    one, X ) ) }.
% 124.36/124.73  parent0[0]: (1044) {G3,W11,D4,L1,V3,M1} P(73,7);d(7) { composition( X, join
% 124.36/124.73    ( Z, Y ) ) = composition( X, join( Y, Z ) ) }.
% 124.36/124.73  parent1[0; 2]: (112729) {G32,W7,D4,L1,V1,M1}  { top ==> composition( top, 
% 124.36/124.73    join( X, one ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := top
% 124.36/124.73     Y := one
% 124.36/124.73     Z := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112733) {G4,W7,D4,L1,V1,M1}  { composition( top, join( one, X ) ) 
% 124.36/124.73    ==> top }.
% 124.36/124.73  parent0[0]: (112730) {G4,W7,D4,L1,V1,M1}  { top ==> composition( top, join
% 124.36/124.73    ( one, X ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (16903) {G33,W7,D4,L1,V1,M1} P(16894,1044) { composition( top
% 124.36/124.73    , join( one, X ) ) ==> top }.
% 124.36/124.73  parent0: (112733) {G4,W7,D4,L1,V1,M1}  { composition( top, join( one, X ) )
% 124.36/124.73     ==> top }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112735) {G27,W10,D6,L1,V3,M1}  { zero ==> meet( meet( X, 
% 124.36/124.73    complement( join( Y, Z ) ) ), Y ) }.
% 124.36/124.73  parent0[0]: (7975) {G27,W10,D6,L1,V3,M1} P(1864,7905) { meet( meet( Z, 
% 124.36/124.73    complement( join( X, Y ) ) ), X ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := Z
% 124.36/124.73     Z := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112736) {G28,W10,D6,L1,V2,M1}  { zero ==> meet( composition( 
% 124.36/124.73    complement( join( X, Y ) ), skol1 ), X ) }.
% 124.36/124.73  parent0[0]: (16544) {G27,W9,D4,L1,V1,M1} P(16476,1867) { meet( composition
% 124.36/124.73    ( X, skol1 ), X ) ==> composition( X, skol1 ) }.
% 124.36/124.73  parent1[0; 3]: (112735) {G27,W10,D6,L1,V3,M1}  { zero ==> meet( meet( X, 
% 124.36/124.73    complement( join( Y, Z ) ) ), Y ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := complement( join( X, Y ) )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := composition( complement( join( X, Y ) ), skol1 )
% 124.36/124.73     Y := X
% 124.36/124.73     Z := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112737) {G28,W10,D6,L1,V2,M1}  { meet( composition( complement( 
% 124.36/124.73    join( X, Y ) ), skol1 ), X ) ==> zero }.
% 124.36/124.73  parent0[0]: (112736) {G28,W10,D6,L1,V2,M1}  { zero ==> meet( composition( 
% 124.36/124.73    complement( join( X, Y ) ), skol1 ), X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (17167) {G28,W10,D6,L1,V2,M1} P(16544,7975) { meet( 
% 124.36/124.73    composition( complement( join( X, Y ) ), skol1 ), X ) ==> zero }.
% 124.36/124.73  parent0: (112737) {G28,W10,D6,L1,V2,M1}  { meet( composition( complement( 
% 124.36/124.73    join( X, Y ) ), skol1 ), X ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112739) {G31,W10,D7,L1,V2,M1}  { zero ==> meet( converse( meet( X
% 124.36/124.73    , complement( converse( Y ) ) ) ), Y ) }.
% 124.36/124.73  parent0[0]: (13556) {G31,W10,D7,L1,V2,M1} P(7,13512) { meet( converse( meet
% 124.36/124.73    ( Y, complement( converse( X ) ) ) ), X ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112741) {G28,W10,D7,L1,V1,M1}  { zero ==> meet( converse( 
% 124.36/124.73    composition( skol1, complement( converse( X ) ) ) ), X ) }.
% 124.36/124.73  parent0[0]: (16175) {G27,W9,D4,L1,V1,M1} P(16096,1867) { meet( composition
% 124.36/124.73    ( skol1, X ), X ) ==> composition( skol1, X ) }.
% 124.36/124.73  parent1[0; 4]: (112739) {G31,W10,D7,L1,V2,M1}  { zero ==> meet( converse( 
% 124.36/124.73    meet( X, complement( converse( Y ) ) ) ), Y ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := complement( converse( X ) )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := composition( skol1, complement( converse( X ) ) )
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112742) {G27,W9,D5,L1,V1,M1}  { zero ==> meet( composition( 
% 124.36/124.73    complement( X ), converse( skol1 ) ), X ) }.
% 124.36/124.73  parent0[0]: (12148) {G26,W12,D6,L1,V2,M1} P(12105,77) { converse( 
% 124.36/124.73    composition( Y, complement( converse( X ) ) ) ) ==> composition( 
% 124.36/124.73    complement( X ), converse( Y ) ) }.
% 124.36/124.73  parent1[0; 3]: (112741) {G28,W10,D7,L1,V1,M1}  { zero ==> meet( converse( 
% 124.36/124.73    composition( skol1, complement( converse( X ) ) ) ), X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := skol1
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112743) {G27,W9,D5,L1,V1,M1}  { meet( composition( complement( X )
% 124.36/124.73    , converse( skol1 ) ), X ) ==> zero }.
% 124.36/124.73  parent0[0]: (112742) {G27,W9,D5,L1,V1,M1}  { zero ==> meet( composition( 
% 124.36/124.73    complement( X ), converse( skol1 ) ), X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (17227) {G32,W9,D5,L1,V1,M1} P(16175,13556);d(12148) { meet( 
% 124.36/124.73    composition( complement( X ), converse( skol1 ) ), X ) ==> zero }.
% 124.36/124.73  parent0: (112743) {G27,W9,D5,L1,V1,M1}  { meet( composition( complement( X
% 124.36/124.73     ), converse( skol1 ) ), X ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112745) {G28,W10,D6,L1,V3,M1}  { zero ==> meet( X, meet( Y, 
% 124.36/124.73    complement( join( X, Z ) ) ) ) }.
% 124.36/124.73  parent0[0]: (8140) {G28,W10,D6,L1,V3,M1} P(1864,7937) { meet( X, meet( Z, 
% 124.36/124.73    complement( join( X, Y ) ) ) ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Z
% 124.36/124.73     Z := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112746) {G28,W10,D6,L1,V2,M1}  { zero ==> meet( X, composition( 
% 124.36/124.73    skol1, complement( join( X, Y ) ) ) ) }.
% 124.36/124.73  parent0[0]: (16175) {G27,W9,D4,L1,V1,M1} P(16096,1867) { meet( composition
% 124.36/124.73    ( skol1, X ), X ) ==> composition( skol1, X ) }.
% 124.36/124.73  parent1[0; 4]: (112745) {G28,W10,D6,L1,V3,M1}  { zero ==> meet( X, meet( Y
% 124.36/124.73    , complement( join( X, Z ) ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := complement( join( X, Y ) )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := composition( skol1, complement( join( X, Y ) ) )
% 124.36/124.73     Z := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112747) {G28,W10,D6,L1,V2,M1}  { meet( X, composition( skol1, 
% 124.36/124.73    complement( join( X, Y ) ) ) ) ==> zero }.
% 124.36/124.73  parent0[0]: (112746) {G28,W10,D6,L1,V2,M1}  { zero ==> meet( X, composition
% 124.36/124.73    ( skol1, complement( join( X, Y ) ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (17276) {G29,W10,D6,L1,V2,M1} P(16175,8140) { meet( X, 
% 124.36/124.73    composition( skol1, complement( join( X, Y ) ) ) ) ==> zero }.
% 124.36/124.73  parent0: (112747) {G28,W10,D6,L1,V2,M1}  { meet( X, composition( skol1, 
% 124.36/124.73    complement( join( X, Y ) ) ) ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112749) {G27,W10,D5,L1,V2,M1}  { converse( X ) ==> meet( converse
% 124.36/124.73    ( join( X, Y ) ), converse( X ) ) }.
% 124.36/124.73  parent0[0]: (1890) {G27,W10,D5,L1,V2,M1} P(8,1864) { meet( converse( join( 
% 124.36/124.73    X, Y ) ), converse( X ) ) ==> converse( X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112750) {G10,W10,D5,L1,V1,M1}  { converse( X ) ==> meet( converse
% 124.36/124.73    ( composition( top, X ) ), converse( X ) ) }.
% 124.36/124.73  parent0[0]: (16087) {G9,W9,D4,L1,V1,M1} P(575,1286) { join( X, composition
% 124.36/124.73    ( top, X ) ) ==> composition( top, X ) }.
% 124.36/124.73  parent1[0; 5]: (112749) {G27,W10,D5,L1,V2,M1}  { converse( X ) ==> meet( 
% 124.36/124.73    converse( join( X, Y ) ), converse( X ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := composition( top, X )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112751) {G10,W10,D5,L1,V1,M1}  { meet( converse( composition( top
% 124.36/124.73    , X ) ), converse( X ) ) ==> converse( X ) }.
% 124.36/124.73  parent0[0]: (112750) {G10,W10,D5,L1,V1,M1}  { converse( X ) ==> meet( 
% 124.36/124.73    converse( composition( top, X ) ), converse( X ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (17365) {G28,W10,D5,L1,V1,M1} P(16087,1890) { meet( converse( 
% 124.36/124.73    composition( top, X ) ), converse( X ) ) ==> converse( X ) }.
% 124.36/124.73  parent0: (112751) {G10,W10,D5,L1,V1,M1}  { meet( converse( composition( top
% 124.36/124.73    , X ) ), converse( X ) ) ==> converse( X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112753) {G3,W10,D5,L1,V2,M1}  { top ==> join( join( X, Y ), 
% 124.36/124.73    complement( join( Y, X ) ) ) }.
% 124.36/124.73  parent0[0]: (2728) {G3,W10,D5,L1,V2,M1} P(160,22) { join( join( Y, X ), 
% 124.36/124.73    complement( join( X, Y ) ) ) ==> top }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112755) {G4,W12,D6,L1,V1,M1}  { top ==> join( composition( top, X
% 124.36/124.73     ), complement( join( composition( top, X ), X ) ) ) }.
% 124.36/124.73  parent0[0]: (16087) {G9,W9,D4,L1,V1,M1} P(575,1286) { join( X, composition
% 124.36/124.73    ( top, X ) ) ==> composition( top, X ) }.
% 124.36/124.73  parent1[0; 3]: (112753) {G3,W10,D5,L1,V2,M1}  { top ==> join( join( X, Y )
% 124.36/124.73    , complement( join( Y, X ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := composition( top, X )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112757) {G5,W8,D4,L1,V1,M1}  { top ==> join( complement( X ), 
% 124.36/124.73    composition( top, X ) ) }.
% 124.36/124.73  parent0[0]: (11800) {G22,W11,D5,L1,V2,M1} P(7678,10822) { join( X, 
% 124.36/124.73    complement( join( X, Y ) ) ) ==> join( complement( Y ), X ) }.
% 124.36/124.73  parent1[0; 2]: (112755) {G4,W12,D6,L1,V1,M1}  { top ==> join( composition( 
% 124.36/124.73    top, X ), complement( join( composition( top, X ), X ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := composition( top, X )
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112758) {G5,W8,D4,L1,V1,M1}  { join( complement( X ), composition
% 124.36/124.73    ( top, X ) ) ==> top }.
% 124.36/124.73  parent0[0]: (112757) {G5,W8,D4,L1,V1,M1}  { top ==> join( complement( X ), 
% 124.36/124.73    composition( top, X ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (17366) {G23,W8,D4,L1,V1,M1} P(16087,2728);d(11800) { join( 
% 124.36/124.73    complement( X ), composition( top, X ) ) ==> top }.
% 124.36/124.73  parent0: (112758) {G5,W8,D4,L1,V1,M1}  { join( complement( X ), composition
% 124.36/124.73    ( top, X ) ) ==> top }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112760) {G28,W9,D5,L1,V3,M1}  { Y ==> meet( join( join( X, Y ), Z
% 124.36/124.73     ), Y ) }.
% 124.36/124.73  parent0[0]: (1902) {G28,W9,D5,L1,V3,M1} P(20,1893) { meet( join( join( X, Z
% 124.36/124.73     ), Y ), Z ) ==> Z }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Z
% 124.36/124.73     Z := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112761) {G10,W9,D5,L1,V2,M1}  { X ==> meet( composition( top, 
% 124.36/124.73    join( Y, X ) ), X ) }.
% 124.36/124.73  parent0[0]: (16087) {G9,W9,D4,L1,V1,M1} P(575,1286) { join( X, composition
% 124.36/124.73    ( top, X ) ) ==> composition( top, X ) }.
% 124.36/124.73  parent1[0; 3]: (112760) {G28,W9,D5,L1,V3,M1}  { Y ==> meet( join( join( X, 
% 124.36/124.73    Y ), Z ), Y ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := join( Y, X )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73     Z := composition( top, join( Y, X ) )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112763) {G10,W9,D5,L1,V2,M1}  { meet( composition( top, join( Y, X
% 124.36/124.73     ) ), X ) ==> X }.
% 124.36/124.73  parent0[0]: (112761) {G10,W9,D5,L1,V2,M1}  { X ==> meet( composition( top, 
% 124.36/124.73    join( Y, X ) ), X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (17381) {G29,W9,D5,L1,V2,M1} P(16087,1902) { meet( composition
% 124.36/124.73    ( top, join( X, Y ) ), Y ) ==> Y }.
% 124.36/124.73  parent0: (112763) {G10,W9,D5,L1,V2,M1}  { meet( composition( top, join( Y, 
% 124.36/124.73    X ) ), X ) ==> X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112766) {G27,W9,D5,L1,V3,M1}  { X ==> meet( X, join( join( Y, X )
% 124.36/124.73    , Z ) ) }.
% 124.36/124.73  parent0[0]: (1910) {G27,W9,D5,L1,V3,M1} P(20,1867) { meet( Z, join( join( X
% 124.36/124.73    , Z ), Y ) ) ==> Z }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := Z
% 124.36/124.73     Z := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112767) {G10,W9,D5,L1,V2,M1}  { X ==> meet( X, composition( top, 
% 124.36/124.73    join( Y, X ) ) ) }.
% 124.36/124.73  parent0[0]: (16087) {G9,W9,D4,L1,V1,M1} P(575,1286) { join( X, composition
% 124.36/124.73    ( top, X ) ) ==> composition( top, X ) }.
% 124.36/124.73  parent1[0; 4]: (112766) {G27,W9,D5,L1,V3,M1}  { X ==> meet( X, join( join( 
% 124.36/124.73    Y, X ), Z ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := join( Y, X )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73     Z := composition( top, join( Y, X ) )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112769) {G10,W9,D5,L1,V2,M1}  { meet( X, composition( top, join( Y
% 124.36/124.73    , X ) ) ) ==> X }.
% 124.36/124.73  parent0[0]: (112767) {G10,W9,D5,L1,V2,M1}  { X ==> meet( X, composition( 
% 124.36/124.73    top, join( Y, X ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (17382) {G28,W9,D5,L1,V2,M1} P(16087,1910) { meet( Y, 
% 124.36/124.73    composition( top, join( X, Y ) ) ) ==> Y }.
% 124.36/124.73  parent0: (112769) {G10,W9,D5,L1,V2,M1}  { meet( X, composition( top, join( 
% 124.36/124.73    Y, X ) ) ) ==> X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112772) {G23,W8,D4,L1,V1,M1}  { top ==> join( complement( X ), 
% 124.36/124.73    composition( top, X ) ) }.
% 124.36/124.73  parent0[0]: (17366) {G23,W8,D4,L1,V1,M1} P(16087,2728);d(11800) { join( 
% 124.36/124.73    complement( X ), composition( top, X ) ) ==> top }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112773) {G14,W8,D5,L1,V1,M1}  { top ==> join( X, composition( top
% 124.36/124.73    , complement( X ) ) ) }.
% 124.36/124.73  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.73    complement( complement( X ) ) ==> X }.
% 124.36/124.73  parent1[0; 3]: (112772) {G23,W8,D4,L1,V1,M1}  { top ==> join( complement( X
% 124.36/124.73     ), composition( top, X ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := complement( X )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112774) {G14,W8,D5,L1,V1,M1}  { join( X, composition( top, 
% 124.36/124.73    complement( X ) ) ) ==> top }.
% 124.36/124.73  parent0[0]: (112773) {G14,W8,D5,L1,V1,M1}  { top ==> join( X, composition( 
% 124.36/124.73    top, complement( X ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (17454) {G24,W8,D5,L1,V1,M1} P(1346,17366) { join( X, 
% 124.36/124.73    composition( top, complement( X ) ) ) ==> top }.
% 124.36/124.73  parent0: (112774) {G14,W8,D5,L1,V1,M1}  { join( X, composition( top, 
% 124.36/124.73    complement( X ) ) ) ==> top }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112776) {G1,W10,D5,L1,V2,M1}  { join( X, converse( Y ) ) ==> 
% 124.36/124.73    converse( join( converse( X ), Y ) ) }.
% 124.36/124.73  parent0[0]: (64) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( converse( X
% 124.36/124.73     ), Y ) ) ==> join( X, converse( Y ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112780) {G2,W11,D7,L1,V1,M1}  { join( X, converse( composition( 
% 124.36/124.73    top, complement( converse( X ) ) ) ) ) ==> converse( top ) }.
% 124.36/124.73  parent0[0]: (17454) {G24,W8,D5,L1,V1,M1} P(1346,17366) { join( X, 
% 124.36/124.73    composition( top, complement( X ) ) ) ==> top }.
% 124.36/124.73  parent1[0; 10]: (112776) {G1,W10,D5,L1,V2,M1}  { join( X, converse( Y ) ) 
% 124.36/124.73    ==> converse( join( converse( X ), Y ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := converse( X )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := composition( top, complement( converse( X ) ) )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112781) {G3,W10,D7,L1,V1,M1}  { join( X, converse( composition( 
% 124.36/124.73    top, complement( converse( X ) ) ) ) ) ==> top }.
% 124.36/124.73  parent0[0]: (752) {G10,W4,D3,L1,V0,M1} P(738,562) { converse( top ) ==> top
% 124.36/124.73     }.
% 124.36/124.73  parent1[0; 9]: (112780) {G2,W11,D7,L1,V1,M1}  { join( X, converse( 
% 124.36/124.73    composition( top, complement( converse( X ) ) ) ) ) ==> converse( top )
% 124.36/124.73     }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112782) {G4,W9,D5,L1,V1,M1}  { join( X, composition( complement( 
% 124.36/124.73    X ), converse( top ) ) ) ==> top }.
% 124.36/124.73  parent0[0]: (12148) {G26,W12,D6,L1,V2,M1} P(12105,77) { converse( 
% 124.36/124.73    composition( Y, complement( converse( X ) ) ) ) ==> composition( 
% 124.36/124.73    complement( X ), converse( Y ) ) }.
% 124.36/124.73  parent1[0; 3]: (112781) {G3,W10,D7,L1,V1,M1}  { join( X, converse( 
% 124.36/124.73    composition( top, complement( converse( X ) ) ) ) ) ==> top }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := top
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112783) {G5,W8,D5,L1,V1,M1}  { join( X, composition( complement( 
% 124.36/124.73    X ), top ) ) ==> top }.
% 124.36/124.73  parent0[0]: (752) {G10,W4,D3,L1,V0,M1} P(738,562) { converse( top ) ==> top
% 124.36/124.73     }.
% 124.36/124.73  parent1[0; 6]: (112782) {G4,W9,D5,L1,V1,M1}  { join( X, composition( 
% 124.36/124.73    complement( X ), converse( top ) ) ) ==> top }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (17534) {G27,W8,D5,L1,V1,M1} P(17454,64);d(752);d(12148);d(752
% 124.36/124.73    ) { join( X, composition( complement( X ), top ) ) ==> top }.
% 124.36/124.73  parent0: (112783) {G5,W8,D5,L1,V1,M1}  { join( X, composition( complement( 
% 124.36/124.73    X ), top ) ) ==> top }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112786) {G20,W10,D6,L1,V2,M1}  { X ==> join( X, meet( Y, join( 
% 124.36/124.73    complement( Y ), X ) ) ) }.
% 124.36/124.73  parent0[0]: (10680) {G20,W10,D6,L1,V2,M1} P(10654,4372);d(1346);d(1374) { 
% 124.36/124.73    join( X, meet( Y, join( complement( Y ), X ) ) ) ==> X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112789) {G21,W15,D6,L1,V1,M1}  { composition( complement( 
% 124.36/124.73    complement( X ) ), top ) ==> join( composition( complement( complement( X
% 124.36/124.73     ) ), top ), meet( X, top ) ) }.
% 124.36/124.73  parent0[0]: (17534) {G27,W8,D5,L1,V1,M1} P(17454,64);d(752);d(12148);d(752)
% 124.36/124.73     { join( X, composition( complement( X ), top ) ) ==> top }.
% 124.36/124.73  parent1[0; 14]: (112786) {G20,W10,D6,L1,V2,M1}  { X ==> join( X, meet( Y, 
% 124.36/124.73    join( complement( Y ), X ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := complement( X )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := composition( complement( complement( X ) ), top )
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112791) {G14,W13,D5,L1,V1,M1}  { composition( complement( 
% 124.36/124.73    complement( X ) ), top ) ==> join( composition( X, top ), meet( X, top )
% 124.36/124.73     ) }.
% 124.36/124.73  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.73    complement( complement( X ) ) ==> X }.
% 124.36/124.73  parent1[0; 8]: (112789) {G21,W15,D6,L1,V1,M1}  { composition( complement( 
% 124.36/124.73    complement( X ) ), top ) ==> join( composition( complement( complement( X
% 124.36/124.73     ) ), top ), meet( X, top ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112792) {G14,W11,D4,L1,V1,M1}  { composition( X, top ) ==> join( 
% 124.36/124.73    composition( X, top ), meet( X, top ) ) }.
% 124.36/124.73  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.73    complement( complement( X ) ) ==> X }.
% 124.36/124.73  parent1[0; 2]: (112791) {G14,W13,D5,L1,V1,M1}  { composition( complement( 
% 124.36/124.73    complement( X ) ), top ) ==> join( composition( X, top ), meet( X, top )
% 124.36/124.73     ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112795) {G13,W9,D4,L1,V1,M1}  { composition( X, top ) ==> join( 
% 124.36/124.73    composition( X, top ), X ) }.
% 124.36/124.73  parent0[0]: (1344) {G12,W5,D3,L1,V1,M1} P(46,1333);d(639) { meet( X, top ) 
% 124.36/124.73    ==> X }.
% 124.36/124.73  parent1[0; 8]: (112792) {G14,W11,D4,L1,V1,M1}  { composition( X, top ) ==> 
% 124.36/124.73    join( composition( X, top ), meet( X, top ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112796) {G13,W9,D4,L1,V1,M1}  { join( composition( X, top ), X ) 
% 124.36/124.73    ==> composition( X, top ) }.
% 124.36/124.73  parent0[0]: (112795) {G13,W9,D4,L1,V1,M1}  { composition( X, top ) ==> join
% 124.36/124.73    ( composition( X, top ), X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (17564) {G28,W9,D4,L1,V1,M1} P(17534,10680);d(1346);d(1344) { 
% 124.36/124.73    join( composition( X, top ), X ) ==> composition( X, top ) }.
% 124.36/124.73  parent0: (112796) {G13,W9,D4,L1,V1,M1}  { join( composition( X, top ), X ) 
% 124.36/124.73    ==> composition( X, top ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112799) {G3,W13,D4,L1,V2,M1}  { join( join( X, Y ), composition( 
% 124.36/124.73    Y, top ) ) = join( composition( Y, top ), X ) }.
% 124.36/124.73  parent0[0]: (17564) {G28,W9,D4,L1,V1,M1} P(17534,10680);d(1346);d(1344) { 
% 124.36/124.73    join( composition( X, top ), X ) ==> composition( X, top ) }.
% 124.36/124.73  parent1[0; 9]: (160) {G2,W11,D4,L1,V3,M1} P(0,19) { join( join( Z, X ), Y )
% 124.36/124.73     = join( join( Y, X ), Z ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := composition( Y, top )
% 124.36/124.73     Z := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (18270) {G29,W13,D4,L1,V2,M1} P(17564,160) { join( join( Y, X
% 124.36/124.73     ), composition( X, top ) ) ==> join( composition( X, top ), Y ) }.
% 124.36/124.73  parent0: (112799) {G3,W13,D4,L1,V2,M1}  { join( join( X, Y ), composition( 
% 124.36/124.73    Y, top ) ) = join( composition( Y, top ), X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112801) {G28,W9,D5,L1,V2,M1}  { X ==> meet( X, composition( top, 
% 124.36/124.73    join( Y, X ) ) ) }.
% 124.36/124.73  parent0[0]: (17382) {G28,W9,D5,L1,V2,M1} P(16087,1910) { meet( Y, 
% 124.36/124.73    composition( top, join( X, Y ) ) ) ==> Y }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112804) {G6,W15,D6,L1,V2,M1}  { composition( X, Y ) ==> meet( 
% 124.36/124.73    composition( X, Y ), composition( top, composition( join( one, X ), Y ) )
% 124.36/124.73     ) }.
% 124.36/124.73  parent0[0]: (1286) {G5,W11,D4,L1,V2,M1} P(1278,6) { join( X, composition( Y
% 124.36/124.73    , X ) ) = composition( join( one, Y ), X ) }.
% 124.36/124.73  parent1[0; 10]: (112801) {G28,W9,D5,L1,V2,M1}  { X ==> meet( X, composition
% 124.36/124.73    ( top, join( Y, X ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := composition( X, Y )
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112805) {G1,W15,D6,L1,V2,M1}  { composition( X, Y ) ==> meet( 
% 124.36/124.73    composition( X, Y ), composition( composition( top, join( one, X ) ), Y )
% 124.36/124.73     ) }.
% 124.36/124.73  parent0[0]: (4) {G0,W11,D4,L1,V3,M1} I { composition( X, composition( Y, Z
% 124.36/124.73     ) ) ==> composition( composition( X, Y ), Z ) }.
% 124.36/124.73  parent1[0; 8]: (112804) {G6,W15,D6,L1,V2,M1}  { composition( X, Y ) ==> 
% 124.36/124.73    meet( composition( X, Y ), composition( top, composition( join( one, X )
% 124.36/124.73    , Y ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := top
% 124.36/124.73     Y := join( one, X )
% 124.36/124.73     Z := Y
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112806) {G2,W11,D4,L1,V2,M1}  { composition( X, Y ) ==> meet( 
% 124.36/124.73    composition( X, Y ), composition( top, Y ) ) }.
% 124.36/124.73  parent0[0]: (16903) {G33,W7,D4,L1,V1,M1} P(16894,1044) { composition( top, 
% 124.36/124.73    join( one, X ) ) ==> top }.
% 124.36/124.73  parent1[0; 9]: (112805) {G1,W15,D6,L1,V2,M1}  { composition( X, Y ) ==> 
% 124.36/124.73    meet( composition( X, Y ), composition( composition( top, join( one, X )
% 124.36/124.73     ), Y ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112807) {G2,W11,D4,L1,V2,M1}  { meet( composition( X, Y ), 
% 124.36/124.73    composition( top, Y ) ) ==> composition( X, Y ) }.
% 124.36/124.73  parent0[0]: (112806) {G2,W11,D4,L1,V2,M1}  { composition( X, Y ) ==> meet( 
% 124.36/124.73    composition( X, Y ), composition( top, Y ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (19429) {G34,W11,D4,L1,V2,M1} P(1286,17382);d(4);d(16903) { 
% 124.36/124.73    meet( composition( Y, X ), composition( top, X ) ) ==> composition( Y, X
% 124.36/124.73     ) }.
% 124.36/124.73  parent0: (112807) {G2,W11,D4,L1,V2,M1}  { meet( composition( X, Y ), 
% 124.36/124.73    composition( top, Y ) ) ==> composition( X, Y ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112809) {G5,W11,D4,L1,V2,M1}  { composition( join( X, one ), Y ) =
% 124.36/124.73     join( composition( X, Y ), Y ) }.
% 124.36/124.73  parent0[0]: (1287) {G5,W11,D4,L1,V2,M1} P(1278,6) { join( composition( Y, X
% 124.36/124.73     ), X ) = composition( join( Y, one ), X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112812) {G6,W13,D7,L1,V2,M1}  { composition( one, Y ) = join( 
% 124.36/124.73    composition( converse( meet( X, converse( one ) ) ), Y ), Y ) }.
% 124.36/124.73  parent0[0]: (1671) {G20,W9,D6,L1,V2,M1} P(1668,65);d(7) { join( converse( 
% 124.36/124.73    meet( X, converse( Y ) ) ), Y ) ==> Y }.
% 124.36/124.73  parent1[0; 2]: (112809) {G5,W11,D4,L1,V2,M1}  { composition( join( X, one )
% 124.36/124.73    , Y ) = join( composition( X, Y ), Y ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := one
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := converse( meet( X, converse( one ) ) )
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112813) {G4,W12,D6,L1,V2,M1}  { composition( one, X ) = join( 
% 124.36/124.73    composition( converse( meet( Y, one ) ), X ), X ) }.
% 124.36/124.73  parent0[0]: (1276) {G3,W4,D3,L1,V0,M1} P(1268,5) { converse( one ) ==> one
% 124.36/124.73     }.
% 124.36/124.73  parent1[0; 9]: (112812) {G6,W13,D7,L1,V2,M1}  { composition( one, Y ) = 
% 124.36/124.73    join( composition( converse( meet( X, converse( one ) ) ), Y ), Y ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112814) {G5,W10,D6,L1,V2,M1}  { X = join( composition( converse( 
% 124.36/124.73    meet( Y, one ) ), X ), X ) }.
% 124.36/124.73  parent0[0]: (1278) {G4,W5,D3,L1,V1,M1} P(1276,1268) { composition( one, X )
% 124.36/124.73     ==> X }.
% 124.36/124.73  parent1[0; 1]: (112813) {G4,W12,D6,L1,V2,M1}  { composition( one, X ) = 
% 124.36/124.73    join( composition( converse( meet( Y, one ) ), X ), X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112815) {G5,W10,D6,L1,V2,M1}  { join( composition( converse( meet
% 124.36/124.73    ( Y, one ) ), X ), X ) = X }.
% 124.36/124.73  parent0[0]: (112814) {G5,W10,D6,L1,V2,M1}  { X = join( composition( 
% 124.36/124.73    converse( meet( Y, one ) ), X ), X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (23878) {G21,W10,D6,L1,V2,M1} P(1671,1287);d(1276);d(1278) { 
% 124.36/124.73    join( composition( converse( meet( X, one ) ), Y ), Y ) ==> Y }.
% 124.36/124.73  parent0: (112815) {G5,W10,D6,L1,V2,M1}  { join( composition( converse( meet
% 124.36/124.73    ( Y, one ) ), X ), X ) = X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112817) {G29,W12,D6,L1,V3,M1}  { zero ==> meet( composition( X, Y
% 124.36/124.73     ), complement( composition( join( Z, X ), Y ) ) ) }.
% 124.36/124.73  parent0[0]: (1965) {G29,W12,D6,L1,V3,M1} P(6,1895) { meet( composition( Z, 
% 124.36/124.73    Y ), complement( composition( join( X, Z ), Y ) ) ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Z
% 124.36/124.73     Y := Y
% 124.36/124.73     Z := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112818) {G23,W10,D5,L1,V2,M1}  { zero ==> meet( composition( X, Y
% 124.36/124.73     ), complement( composition( top, Y ) ) ) }.
% 124.36/124.73  parent0[0]: (1820) {G22,W12,D7,L1,V3,M1} P(1799,1) { join( join( complement
% 124.36/124.73    ( meet( join( X, Y ), Z ) ), X ), Y ) ==> top }.
% 124.36/124.73  parent1[0; 8]: (112817) {G29,W12,D6,L1,V3,M1}  { zero ==> meet( composition
% 124.36/124.73    ( X, Y ), complement( composition( join( Z, X ), Y ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Z
% 124.36/124.73     Y := X
% 124.36/124.73     Z := T
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73     Z := join( complement( meet( join( Z, X ), T ) ), Z )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112819) {G23,W10,D5,L1,V2,M1}  { meet( composition( X, Y ), 
% 124.36/124.73    complement( composition( top, Y ) ) ) ==> zero }.
% 124.36/124.73  parent0[0]: (112818) {G23,W10,D5,L1,V2,M1}  { zero ==> meet( composition( X
% 124.36/124.73    , Y ), complement( composition( top, Y ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (28506) {G30,W10,D5,L1,V2,M1} P(1820,1965) { meet( composition
% 124.36/124.73    ( Y, T ), complement( composition( top, T ) ) ) ==> zero }.
% 124.36/124.73  parent0: (112819) {G23,W10,D5,L1,V2,M1}  { meet( composition( X, Y ), 
% 124.36/124.73    complement( composition( top, Y ) ) ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := T
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112820) {G30,W10,D5,L1,V2,M1}  { zero ==> meet( composition( X, Y
% 124.36/124.73     ), complement( composition( top, Y ) ) ) }.
% 124.36/124.73  parent0[0]: (28506) {G30,W10,D5,L1,V2,M1} P(1820,1965) { meet( composition
% 124.36/124.73    ( Y, T ), complement( composition( top, T ) ) ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Z
% 124.36/124.73     Y := X
% 124.36/124.73     Z := T
% 124.36/124.73     T := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112822) {G28,W8,D5,L1,V0,M1}  { zero ==> composition( complement
% 124.36/124.73    ( composition( top, skol1 ) ), skol1 ) }.
% 124.36/124.73  parent0[0]: (16544) {G27,W9,D4,L1,V1,M1} P(16476,1867) { meet( composition
% 124.36/124.73    ( X, skol1 ), X ) ==> composition( X, skol1 ) }.
% 124.36/124.73  parent1[0; 2]: (112820) {G30,W10,D5,L1,V2,M1}  { zero ==> meet( composition
% 124.36/124.73    ( X, Y ), complement( composition( top, Y ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := complement( composition( top, skol1 ) )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := complement( composition( top, skol1 ) )
% 124.36/124.73     Y := skol1
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112823) {G28,W8,D5,L1,V0,M1}  { composition( complement( 
% 124.36/124.73    composition( top, skol1 ) ), skol1 ) ==> zero }.
% 124.36/124.73  parent0[0]: (112822) {G28,W8,D5,L1,V0,M1}  { zero ==> composition( 
% 124.36/124.73    complement( composition( top, skol1 ) ), skol1 ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (30380) {G31,W8,D5,L1,V0,M1} P(28506,16544) { composition( 
% 124.36/124.73    complement( composition( top, skol1 ) ), skol1 ) ==> zero }.
% 124.36/124.73  parent0: (112823) {G28,W8,D5,L1,V0,M1}  { composition( complement( 
% 124.36/124.73    composition( top, skol1 ) ), skol1 ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112825) {G1,W15,D7,L1,V2,M1}  { complement( converse( Y ) ) ==> 
% 124.36/124.73    join( composition( X, complement( converse( composition( Y, X ) ) ) ), 
% 124.36/124.73    complement( converse( Y ) ) ) }.
% 124.36/124.73  parent0[0]: (91) {G1,W15,D7,L1,V2,M1} P(9,10);d(7) { join( composition( X, 
% 124.36/124.73    complement( converse( composition( Y, X ) ) ) ), complement( converse( Y
% 124.36/124.73     ) ) ) ==> complement( converse( Y ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112831) {G2,W19,D7,L1,V0,M1}  { complement( converse( complement
% 124.36/124.73    ( composition( top, skol1 ) ) ) ) ==> join( composition( skol1, 
% 124.36/124.73    complement( converse( zero ) ) ), complement( converse( complement( 
% 124.36/124.73    composition( top, skol1 ) ) ) ) ) }.
% 124.36/124.73  parent0[0]: (30380) {G31,W8,D5,L1,V0,M1} P(28506,16544) { composition( 
% 124.36/124.73    complement( composition( top, skol1 ) ), skol1 ) ==> zero }.
% 124.36/124.73  parent1[0; 12]: (112825) {G1,W15,D7,L1,V2,M1}  { complement( converse( Y )
% 124.36/124.73     ) ==> join( composition( X, complement( converse( composition( Y, X ) )
% 124.36/124.73     ) ), complement( converse( Y ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := skol1
% 124.36/124.73     Y := complement( composition( top, skol1 ) )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112832) {G3,W18,D7,L1,V0,M1}  { complement( converse( complement
% 124.36/124.73    ( composition( top, skol1 ) ) ) ) ==> join( composition( skol1, 
% 124.36/124.73    complement( zero ) ), complement( converse( complement( composition( top
% 124.36/124.73    , skol1 ) ) ) ) ) }.
% 124.36/124.73  parent0[0]: (1391) {G15,W4,D3,L1,V0,M1} P(1361,1354) { converse( zero ) ==>
% 124.36/124.73     zero }.
% 124.36/124.73  parent1[0; 11]: (112831) {G2,W19,D7,L1,V0,M1}  { complement( converse( 
% 124.36/124.73    complement( composition( top, skol1 ) ) ) ) ==> join( composition( skol1
% 124.36/124.73    , complement( converse( zero ) ) ), complement( converse( complement( 
% 124.36/124.73    composition( top, skol1 ) ) ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112833) {G4,W17,D7,L1,V0,M1}  { complement( converse( complement
% 124.36/124.73    ( composition( top, skol1 ) ) ) ) ==> join( composition( skol1, top ), 
% 124.36/124.73    complement( converse( complement( composition( top, skol1 ) ) ) ) ) }.
% 124.36/124.73  parent0[0]: (1026) {G8,W4,D3,L1,V0,M1} P(1016,10) { complement( zero ) ==> 
% 124.36/124.73    top }.
% 124.36/124.73  parent1[0; 10]: (112832) {G3,W18,D7,L1,V0,M1}  { complement( converse( 
% 124.36/124.73    complement( composition( top, skol1 ) ) ) ) ==> join( composition( skol1
% 124.36/124.73    , complement( zero ) ), complement( converse( complement( composition( 
% 124.36/124.73    top, skol1 ) ) ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112835) {G5,W17,D7,L1,V0,M1}  { complement( converse( complement
% 124.36/124.73    ( composition( top, skol1 ) ) ) ) ==> join( composition( skol1, top ), 
% 124.36/124.73    complement( complement( converse( composition( top, skol1 ) ) ) ) ) }.
% 124.36/124.73  parent0[0]: (12105) {G25,W7,D4,L1,V1,M1} P(12014,1346) { converse( 
% 124.36/124.73    complement( X ) ) ==> complement( converse( X ) ) }.
% 124.36/124.73  parent1[0; 12]: (112833) {G4,W17,D7,L1,V0,M1}  { complement( converse( 
% 124.36/124.73    complement( composition( top, skol1 ) ) ) ) ==> join( composition( skol1
% 124.36/124.73    , top ), complement( converse( complement( composition( top, skol1 ) ) )
% 124.36/124.73     ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := composition( top, skol1 )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112836) {G6,W17,D7,L1,V0,M1}  { complement( complement( converse
% 124.36/124.73    ( composition( top, skol1 ) ) ) ) ==> join( composition( skol1, top ), 
% 124.36/124.73    complement( complement( converse( composition( top, skol1 ) ) ) ) ) }.
% 124.36/124.73  parent0[0]: (12105) {G25,W7,D4,L1,V1,M1} P(12014,1346) { converse( 
% 124.36/124.73    complement( X ) ) ==> complement( converse( X ) ) }.
% 124.36/124.73  parent1[0; 2]: (112835) {G5,W17,D7,L1,V0,M1}  { complement( converse( 
% 124.36/124.73    complement( composition( top, skol1 ) ) ) ) ==> join( composition( skol1
% 124.36/124.73    , top ), complement( complement( converse( composition( top, skol1 ) ) )
% 124.36/124.73     ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := composition( top, skol1 )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112841) {G7,W15,D6,L1,V0,M1}  { complement( complement( converse
% 124.36/124.73    ( composition( top, skol1 ) ) ) ) ==> join( composition( skol1, top ), 
% 124.36/124.73    converse( composition( top, skol1 ) ) ) }.
% 124.36/124.73  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.73    complement( complement( X ) ) ==> X }.
% 124.36/124.73  parent1[0; 11]: (112836) {G6,W17,D7,L1,V0,M1}  { complement( complement( 
% 124.36/124.73    converse( composition( top, skol1 ) ) ) ) ==> join( composition( skol1, 
% 124.36/124.73    top ), complement( complement( converse( composition( top, skol1 ) ) ) )
% 124.36/124.73     ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := converse( composition( top, skol1 ) )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112842) {G8,W13,D5,L1,V0,M1}  { converse( composition( top, skol1
% 124.36/124.73     ) ) ==> join( composition( skol1, top ), converse( composition( top, 
% 124.36/124.73    skol1 ) ) ) }.
% 124.36/124.73  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.73    complement( complement( X ) ) ==> X }.
% 124.36/124.73  parent1[0; 1]: (112841) {G7,W15,D6,L1,V0,M1}  { complement( complement( 
% 124.36/124.73    converse( composition( top, skol1 ) ) ) ) ==> join( composition( skol1, 
% 124.36/124.73    top ), converse( composition( top, skol1 ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := converse( composition( top, skol1 ) )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112845) {G9,W11,D5,L1,V0,M1}  { converse( composition( top, skol1
% 124.36/124.73     ) ) ==> composition( join( skol1, converse( skol1 ) ), top ) }.
% 124.36/124.73  parent0[0]: (2482) {G12,W15,D5,L1,V2,M1} P(759,6) { join( composition( Y, 
% 124.36/124.73    top ), converse( composition( top, X ) ) ) ==> composition( join( Y, 
% 124.36/124.73    converse( X ) ), top ) }.
% 124.36/124.73  parent1[0; 5]: (112842) {G8,W13,D5,L1,V0,M1}  { converse( composition( top
% 124.36/124.73    , skol1 ) ) ==> join( composition( skol1, top ), converse( composition( 
% 124.36/124.73    top, skol1 ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := skol1
% 124.36/124.73     Y := skol1
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112846) {G9,W11,D5,L1,V0,M1}  { composition( join( skol1, converse
% 124.36/124.73    ( skol1 ) ), top ) ==> converse( composition( top, skol1 ) ) }.
% 124.36/124.73  parent0[0]: (112845) {G9,W11,D5,L1,V0,M1}  { converse( composition( top, 
% 124.36/124.73    skol1 ) ) ==> composition( join( skol1, converse( skol1 ) ), top ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (30402) {G32,W11,D5,L1,V0,M1} P(30380,91);d(1391);d(1026);d(
% 124.36/124.73    12105);d(1346);d(2482) { composition( join( skol1, converse( skol1 ) ), 
% 124.36/124.73    top ) ==> converse( composition( top, skol1 ) ) }.
% 124.36/124.73  parent0: (112846) {G9,W11,D5,L1,V0,M1}  { composition( join( skol1, 
% 124.36/124.73    converse( skol1 ) ), top ) ==> converse( composition( top, skol1 ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112848) {G1,W10,D5,L1,V2,M1}  { join( converse( X ), Y ) ==> 
% 124.36/124.73    converse( join( X, converse( Y ) ) ) }.
% 124.36/124.73  parent0[0]: (65) {G1,W10,D5,L1,V2,M1} P(7,8) { converse( join( Y, converse
% 124.36/124.73    ( X ) ) ) ==> join( converse( Y ), X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112852) {G2,W14,D7,L1,V2,M1}  { join( converse( composition( 
% 124.36/124.73    converse( meet( X, one ) ), converse( Y ) ) ), Y ) ==> converse( converse
% 124.36/124.73    ( Y ) ) }.
% 124.36/124.73  parent0[0]: (23878) {G21,W10,D6,L1,V2,M1} P(1671,1287);d(1276);d(1278) { 
% 124.36/124.73    join( composition( converse( meet( X, one ) ), Y ), Y ) ==> Y }.
% 124.36/124.73  parent1[0; 12]: (112848) {G1,W10,D5,L1,V2,M1}  { join( converse( X ), Y ) 
% 124.36/124.73    ==> converse( join( X, converse( Y ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := converse( Y )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := composition( converse( meet( X, one ) ), converse( Y ) )
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112853) {G1,W12,D7,L1,V2,M1}  { join( converse( composition( 
% 124.36/124.73    converse( meet( X, one ) ), converse( Y ) ) ), Y ) ==> Y }.
% 124.36/124.73  parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 124.36/124.73  parent1[0; 11]: (112852) {G2,W14,D7,L1,V2,M1}  { join( converse( 
% 124.36/124.73    composition( converse( meet( X, one ) ), converse( Y ) ) ), Y ) ==> 
% 124.36/124.73    converse( converse( Y ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112854) {G2,W11,D7,L1,V2,M1}  { join( composition( Y, converse( 
% 124.36/124.73    converse( meet( X, one ) ) ) ), Y ) ==> Y }.
% 124.36/124.73  parent0[0]: (77) {G1,W10,D5,L1,V2,M1} P(7,9) { converse( composition( Y, 
% 124.36/124.73    converse( X ) ) ) ==> composition( X, converse( Y ) ) }.
% 124.36/124.73  parent1[0; 2]: (112853) {G1,W12,D7,L1,V2,M1}  { join( converse( composition
% 124.36/124.73    ( converse( meet( X, one ) ), converse( Y ) ) ), Y ) ==> Y }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := converse( meet( X, one ) )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112855) {G1,W9,D5,L1,V2,M1}  { join( composition( X, meet( Y, one
% 124.36/124.73     ) ), X ) ==> X }.
% 124.36/124.73  parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 124.36/124.73  parent1[0; 4]: (112854) {G2,W11,D7,L1,V2,M1}  { join( composition( Y, 
% 124.36/124.73    converse( converse( meet( X, one ) ) ) ), Y ) ==> Y }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := meet( Y, one )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (49770) {G22,W9,D5,L1,V2,M1} P(23878,65);d(7);d(77);d(7) { 
% 124.36/124.73    join( composition( Y, meet( X, one ) ), Y ) ==> Y }.
% 124.36/124.73  parent0: (112855) {G1,W9,D5,L1,V2,M1}  { join( composition( X, meet( Y, one
% 124.36/124.73     ) ), X ) ==> X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112858) {G19,W13,D6,L1,V3,M1}  { join( Y, Z ) ==> join( join( meet
% 124.36/124.73    ( X, join( Y, Z ) ), Y ), Z ) }.
% 124.36/124.73  parent0[0]: (1665) {G19,W13,D6,L1,V3,M1} P(1643,19) { join( join( meet( Z, 
% 124.36/124.73    join( X, Y ) ), X ), Y ) ==> join( X, Y ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := Z
% 124.36/124.73     Z := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112861) {G20,W19,D6,L1,V3,M1}  { join( composition( X, meet( Y, 
% 124.36/124.73    one ) ), X ) ==> join( join( meet( Z, X ), composition( X, meet( Y, one )
% 124.36/124.73     ) ), X ) }.
% 124.36/124.73  parent0[0]: (49770) {G22,W9,D5,L1,V2,M1} P(23878,65);d(7);d(77);d(7) { join
% 124.36/124.73    ( composition( Y, meet( X, one ) ), Y ) ==> Y }.
% 124.36/124.73  parent1[0; 12]: (112858) {G19,W13,D6,L1,V3,M1}  { join( Y, Z ) ==> join( 
% 124.36/124.73    join( meet( X, join( Y, Z ) ), Y ), Z ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := Z
% 124.36/124.73     Y := composition( X, meet( Y, one ) )
% 124.36/124.73     Z := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112862) {G21,W13,D6,L1,V3,M1}  { X ==> join( join( meet( Z, X ), 
% 124.36/124.73    composition( X, meet( Y, one ) ) ), X ) }.
% 124.36/124.73  parent0[0]: (49770) {G22,W9,D5,L1,V2,M1} P(23878,65);d(7);d(77);d(7) { join
% 124.36/124.73    ( composition( Y, meet( X, one ) ), Y ) ==> Y }.
% 124.36/124.73  parent1[0; 1]: (112861) {G20,W19,D6,L1,V3,M1}  { join( composition( X, meet
% 124.36/124.73    ( Y, one ) ), X ) ==> join( join( meet( Z, X ), composition( X, meet( Y, 
% 124.36/124.73    one ) ) ), X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73     Z := Z
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112865) {G20,W9,D5,L1,V2,M1}  { X ==> join( X, composition( X, 
% 124.36/124.73    meet( Z, one ) ) ) }.
% 124.36/124.73  parent0[0]: (1664) {G19,W11,D5,L1,V3,M1} P(1643,19) { join( join( meet( Y, 
% 124.36/124.73    X ), Z ), X ) ==> join( X, Z ) }.
% 124.36/124.73  parent1[0; 2]: (112862) {G21,W13,D6,L1,V3,M1}  { X ==> join( join( meet( Z
% 124.36/124.73    , X ), composition( X, meet( Y, one ) ) ), X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73     Z := composition( X, meet( Z, one ) )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Z
% 124.36/124.73     Z := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112866) {G20,W9,D5,L1,V2,M1}  { join( X, composition( X, meet( Y, 
% 124.36/124.73    one ) ) ) ==> X }.
% 124.36/124.73  parent0[0]: (112865) {G20,W9,D5,L1,V2,M1}  { X ==> join( X, composition( X
% 124.36/124.73    , meet( Z, one ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Z
% 124.36/124.73     Z := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (49820) {G23,W9,D5,L1,V2,M1} P(49770,1665);d(1664) { join( X, 
% 124.36/124.73    composition( X, meet( Y, one ) ) ) ==> X }.
% 124.36/124.73  parent0: (112866) {G20,W9,D5,L1,V2,M1}  { join( X, composition( X, meet( Y
% 124.36/124.73    , one ) ) ) ==> X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112867) {G23,W9,D5,L1,V2,M1}  { X ==> join( X, composition( X, 
% 124.36/124.73    meet( Y, one ) ) ) }.
% 124.36/124.73  parent0[0]: (49820) {G23,W9,D5,L1,V2,M1} P(49770,1665);d(1664) { join( X, 
% 124.36/124.73    composition( X, meet( Y, one ) ) ) ==> X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112868) {G23,W9,D5,L1,V2,M1}  { X ==> join( X, composition( X, 
% 124.36/124.73    meet( one, Y ) ) ) }.
% 124.36/124.73  parent0[0]: (15332) {G22,W11,D4,L1,V3,M1} P(10802,1044);d(10802) { 
% 124.36/124.73    composition( Z, meet( X, Y ) ) = composition( Z, meet( Y, X ) ) }.
% 124.36/124.73  parent1[0; 4]: (112867) {G23,W9,D5,L1,V2,M1}  { X ==> join( X, composition
% 124.36/124.73    ( X, meet( Y, one ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := one
% 124.36/124.73     Z := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112871) {G23,W9,D5,L1,V2,M1}  { join( X, composition( X, meet( one
% 124.36/124.73    , Y ) ) ) ==> X }.
% 124.36/124.73  parent0[0]: (112868) {G23,W9,D5,L1,V2,M1}  { X ==> join( X, composition( X
% 124.36/124.73    , meet( one, Y ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (49912) {G24,W9,D5,L1,V2,M1} P(15332,49820) { join( X, 
% 124.36/124.73    composition( X, meet( one, Y ) ) ) ==> X }.
% 124.36/124.73  parent0: (112871) {G23,W9,D5,L1,V2,M1}  { join( X, composition( X, meet( 
% 124.36/124.73    one, Y ) ) ) ==> X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112873) {G23,W9,D5,L1,V2,M1}  { X ==> join( X, composition( X, 
% 124.36/124.73    meet( Y, one ) ) ) }.
% 124.36/124.73  parent0[0]: (49820) {G23,W9,D5,L1,V2,M1} P(49770,1665);d(1664) { join( X, 
% 124.36/124.73    composition( X, meet( Y, one ) ) ) ==> X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112874) {G24,W9,D5,L1,V2,M1}  { X ==> join( X, composition( X, 
% 124.36/124.73    meet( Y, skol1 ) ) ) }.
% 124.36/124.73  parent0[0]: (1850) {G26,W9,D4,L1,V1,M1} P(1674,1841) { meet( meet( X, skol1
% 124.36/124.73     ), one ) ==> meet( X, skol1 ) }.
% 124.36/124.73  parent1[0; 6]: (112873) {G23,W9,D5,L1,V2,M1}  { X ==> join( X, composition
% 124.36/124.73    ( X, meet( Y, one ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := meet( Y, skol1 )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112875) {G24,W9,D5,L1,V2,M1}  { join( X, composition( X, meet( Y, 
% 124.36/124.73    skol1 ) ) ) ==> X }.
% 124.36/124.73  parent0[0]: (112874) {G24,W9,D5,L1,V2,M1}  { X ==> join( X, composition( X
% 124.36/124.73    , meet( Y, skol1 ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (49929) {G27,W9,D5,L1,V2,M1} P(1850,49820) { join( Y, 
% 124.36/124.73    composition( Y, meet( X, skol1 ) ) ) ==> Y }.
% 124.36/124.73  parent0: (112875) {G24,W9,D5,L1,V2,M1}  { join( X, composition( X, meet( Y
% 124.36/124.73    , skol1 ) ) ) ==> X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112877) {G29,W9,D5,L1,V2,M1}  { Y ==> meet( composition( top, join
% 124.36/124.73    ( X, Y ) ), Y ) }.
% 124.36/124.73  parent0[0]: (17381) {G29,W9,D5,L1,V2,M1} P(16087,1902) { meet( composition
% 124.36/124.73    ( top, join( X, Y ) ), Y ) ==> Y }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112878) {G25,W15,D5,L1,V2,M1}  { composition( X, meet( one, Y ) )
% 124.36/124.73     ==> meet( composition( top, X ), composition( X, meet( one, Y ) ) ) }.
% 124.36/124.73  parent0[0]: (49912) {G24,W9,D5,L1,V2,M1} P(15332,49820) { join( X, 
% 124.36/124.73    composition( X, meet( one, Y ) ) ) ==> X }.
% 124.36/124.73  parent1[0; 9]: (112877) {G29,W9,D5,L1,V2,M1}  { Y ==> meet( composition( 
% 124.36/124.73    top, join( X, Y ) ), Y ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := composition( X, meet( one, Y ) )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112879) {G25,W15,D5,L1,V2,M1}  { meet( composition( top, X ), 
% 124.36/124.73    composition( X, meet( one, Y ) ) ) ==> composition( X, meet( one, Y ) )
% 124.36/124.73     }.
% 124.36/124.73  parent0[0]: (112878) {G25,W15,D5,L1,V2,M1}  { composition( X, meet( one, Y
% 124.36/124.73     ) ) ==> meet( composition( top, X ), composition( X, meet( one, Y ) ) )
% 124.36/124.73     }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (50007) {G30,W15,D5,L1,V2,M1} P(49912,17381) { meet( 
% 124.36/124.73    composition( top, X ), composition( X, meet( one, Y ) ) ) ==> composition
% 124.36/124.73    ( X, meet( one, Y ) ) }.
% 124.36/124.73  parent0: (112879) {G25,W15,D5,L1,V2,M1}  { meet( composition( top, X ), 
% 124.36/124.73    composition( X, meet( one, Y ) ) ) ==> composition( X, meet( one, Y ) )
% 124.36/124.73     }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112881) {G19,W11,D5,L1,V3,M1}  { join( Y, Z ) ==> join( join( meet
% 124.36/124.73    ( X, Y ), Z ), Y ) }.
% 124.36/124.73  parent0[0]: (1664) {G19,W11,D5,L1,V3,M1} P(1643,19) { join( join( meet( Y, 
% 124.36/124.73    X ), Z ), X ) ==> join( X, Z ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73     Z := Z
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112884) {G20,W15,D5,L1,V3,M1}  { join( X, composition( meet( Y, X
% 124.36/124.73     ), meet( Z, skol1 ) ) ) ==> join( meet( Y, X ), X ) }.
% 124.36/124.73  parent0[0]: (49929) {G27,W9,D5,L1,V2,M1} P(1850,49820) { join( Y, 
% 124.36/124.73    composition( Y, meet( X, skol1 ) ) ) ==> Y }.
% 124.36/124.73  parent1[0; 11]: (112881) {G19,W11,D5,L1,V3,M1}  { join( Y, Z ) ==> join( 
% 124.36/124.73    join( meet( X, Y ), Z ), Y ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Z
% 124.36/124.73     Y := meet( Y, X )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73     Z := composition( meet( Y, X ), meet( Z, skol1 ) )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112885) {G20,W11,D5,L1,V3,M1}  { join( X, composition( meet( Y, X
% 124.36/124.73     ), meet( Z, skol1 ) ) ) ==> X }.
% 124.36/124.73  parent0[0]: (1668) {G19,W7,D4,L1,V2,M1} P(1643,0) { join( meet( Y, X ), X )
% 124.36/124.73     ==> X }.
% 124.36/124.73  parent1[0; 10]: (112884) {G20,W15,D5,L1,V3,M1}  { join( X, composition( 
% 124.36/124.73    meet( Y, X ), meet( Z, skol1 ) ) ) ==> join( meet( Y, X ), X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73     Z := Z
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (50205) {G28,W11,D5,L1,V3,M1} P(49929,1664);d(1668) { join( Y
% 124.36/124.73    , composition( meet( X, Y ), meet( Z, skol1 ) ) ) ==> Y }.
% 124.36/124.73  parent0: (112885) {G20,W11,D5,L1,V3,M1}  { join( X, composition( meet( Y, X
% 124.36/124.73     ), meet( Z, skol1 ) ) ) ==> X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73     Z := Z
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112887) {G34,W11,D4,L1,V2,M1}  { composition( X, Y ) ==> meet( 
% 124.36/124.73    composition( X, Y ), composition( top, Y ) ) }.
% 124.36/124.73  parent0[0]: (19429) {G34,W11,D4,L1,V2,M1} P(1286,17382);d(4);d(16903) { 
% 124.36/124.73    meet( composition( Y, X ), composition( top, X ) ) ==> composition( Y, X
% 124.36/124.73     ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112889) {G29,W10,D6,L1,V1,M1}  { composition( complement( join( 
% 124.36/124.73    composition( top, skol1 ), X ) ), skol1 ) ==> zero }.
% 124.36/124.73  parent0[0]: (17167) {G28,W10,D6,L1,V2,M1} P(16544,7975) { meet( composition
% 124.36/124.73    ( complement( join( X, Y ) ), skol1 ), X ) ==> zero }.
% 124.36/124.73  parent1[0; 9]: (112887) {G34,W11,D4,L1,V2,M1}  { composition( X, Y ) ==> 
% 124.36/124.73    meet( composition( X, Y ), composition( top, Y ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := composition( top, skol1 )
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := complement( join( composition( top, skol1 ), X ) )
% 124.36/124.73     Y := skol1
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (71487) {G35,W10,D6,L1,V1,M1} P(19429,17167) { composition( 
% 124.36/124.73    complement( join( composition( top, skol1 ), X ) ), skol1 ) ==> zero }.
% 124.36/124.73  parent0: (112889) {G29,W10,D6,L1,V1,M1}  { composition( complement( join( 
% 124.36/124.73    composition( top, skol1 ), X ) ), skol1 ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112891) {G34,W11,D4,L1,V2,M1}  { composition( X, Y ) ==> meet( 
% 124.36/124.73    composition( X, Y ), composition( top, Y ) ) }.
% 124.36/124.73  parent0[0]: (19429) {G34,W11,D4,L1,V2,M1} P(1286,17382);d(4);d(16903) { 
% 124.36/124.73    meet( composition( Y, X ), composition( top, X ) ) ==> composition( Y, X
% 124.36/124.73     ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112895) {G33,W10,D6,L1,V0,M1}  { composition( complement( 
% 124.36/124.73    composition( top, converse( skol1 ) ) ), converse( skol1 ) ) ==> zero }.
% 124.36/124.73  parent0[0]: (17227) {G32,W9,D5,L1,V1,M1} P(16175,13556);d(12148) { meet( 
% 124.36/124.73    composition( complement( X ), converse( skol1 ) ), X ) ==> zero }.
% 124.36/124.73  parent1[0; 9]: (112891) {G34,W11,D4,L1,V2,M1}  { composition( X, Y ) ==> 
% 124.36/124.73    meet( composition( X, Y ), composition( top, Y ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := composition( top, converse( skol1 ) )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := complement( composition( top, converse( skol1 ) ) )
% 124.36/124.73     Y := converse( skol1 )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112896) {G12,W10,D6,L1,V0,M1}  { composition( complement( 
% 124.36/124.73    converse( composition( skol1, top ) ) ), converse( skol1 ) ) ==> zero }.
% 124.36/124.73  parent0[0]: (758) {G11,W9,D4,L1,V1,M1} P(752,9) { composition( top, 
% 124.36/124.73    converse( X ) ) ==> converse( composition( X, top ) ) }.
% 124.36/124.73  parent1[0; 3]: (112895) {G33,W10,D6,L1,V0,M1}  { composition( complement( 
% 124.36/124.73    composition( top, converse( skol1 ) ) ), converse( skol1 ) ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := skol1
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112897) {G13,W9,D6,L1,V0,M1}  { converse( composition( skol1, 
% 124.36/124.73    complement( composition( skol1, top ) ) ) ) ==> zero }.
% 124.36/124.73  parent0[0]: (12154) {G26,W12,D5,L1,V2,M1} P(12105,9) { composition( 
% 124.36/124.73    complement( converse( X ) ), converse( Y ) ) ==> converse( composition( Y
% 124.36/124.73    , complement( X ) ) ) }.
% 124.36/124.73  parent1[0; 1]: (112896) {G12,W10,D6,L1,V0,M1}  { composition( complement( 
% 124.36/124.73    converse( composition( skol1, top ) ) ), converse( skol1 ) ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := composition( skol1, top )
% 124.36/124.73     Y := skol1
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (71523) {G35,W9,D6,L1,V0,M1} P(19429,17227);d(758);d(12154) { 
% 124.36/124.73    converse( composition( skol1, complement( composition( skol1, top ) ) ) )
% 124.36/124.73     ==> zero }.
% 124.36/124.73  parent0: (112897) {G13,W9,D6,L1,V0,M1}  { converse( composition( skol1, 
% 124.36/124.73    complement( composition( skol1, top ) ) ) ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112900) {G0,W5,D4,L1,V1,M1}  { X ==> converse( converse( X ) ) }.
% 124.36/124.73  parent0[0]: (7) {G0,W5,D4,L1,V1,M1} I { converse( converse( X ) ) ==> X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112902) {G1,W9,D5,L1,V0,M1}  { composition( skol1, complement( 
% 124.36/124.73    composition( skol1, top ) ) ) ==> converse( zero ) }.
% 124.36/124.73  parent0[0]: (71523) {G35,W9,D6,L1,V0,M1} P(19429,17227);d(758);d(12154) { 
% 124.36/124.73    converse( composition( skol1, complement( composition( skol1, top ) ) ) )
% 124.36/124.73     ==> zero }.
% 124.36/124.73  parent1[0; 8]: (112900) {G0,W5,D4,L1,V1,M1}  { X ==> converse( converse( X
% 124.36/124.73     ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := composition( skol1, complement( composition( skol1, top ) ) )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112903) {G2,W8,D5,L1,V0,M1}  { composition( skol1, complement( 
% 124.36/124.73    composition( skol1, top ) ) ) ==> zero }.
% 124.36/124.73  parent0[0]: (1391) {G15,W4,D3,L1,V0,M1} P(1361,1354) { converse( zero ) ==>
% 124.36/124.73     zero }.
% 124.36/124.73  parent1[0; 7]: (112902) {G1,W9,D5,L1,V0,M1}  { composition( skol1, 
% 124.36/124.73    complement( composition( skol1, top ) ) ) ==> converse( zero ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (71615) {G36,W8,D5,L1,V0,M1} P(71523,7);d(1391) { composition
% 124.36/124.73    ( skol1, complement( composition( skol1, top ) ) ) ==> zero }.
% 124.36/124.73  parent0: (112903) {G2,W8,D5,L1,V0,M1}  { composition( skol1, complement( 
% 124.36/124.73    composition( skol1, top ) ) ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112906) {G14,W12,D7,L1,V2,M1}  { X ==> join( X, composition( 
% 124.36/124.73    converse( Y ), complement( composition( Y, complement( X ) ) ) ) ) }.
% 124.36/124.73  parent0[0]: (1521) {G14,W12,D7,L1,V2,M1} P(1346,98) { join( X, composition
% 124.36/124.73    ( converse( Y ), complement( composition( Y, complement( X ) ) ) ) ) ==> 
% 124.36/124.73    X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112910) {G15,W13,D5,L1,V0,M1}  { composition( skol1, top ) ==> 
% 124.36/124.73    join( composition( skol1, top ), composition( converse( skol1 ), 
% 124.36/124.73    complement( zero ) ) ) }.
% 124.36/124.73  parent0[0]: (71615) {G36,W8,D5,L1,V0,M1} P(71523,7);d(1391) { composition( 
% 124.36/124.73    skol1, complement( composition( skol1, top ) ) ) ==> zero }.
% 124.36/124.73  parent1[0; 12]: (112906) {G14,W12,D7,L1,V2,M1}  { X ==> join( X, 
% 124.36/124.73    composition( converse( Y ), complement( composition( Y, complement( X ) )
% 124.36/124.73     ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := composition( skol1, top )
% 124.36/124.73     Y := skol1
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112911) {G9,W12,D5,L1,V0,M1}  { composition( skol1, top ) ==> 
% 124.36/124.73    join( composition( skol1, top ), composition( converse( skol1 ), top ) )
% 124.36/124.73     }.
% 124.36/124.73  parent0[0]: (1026) {G8,W4,D3,L1,V0,M1} P(1016,10) { complement( zero ) ==> 
% 124.36/124.73    top }.
% 124.36/124.73  parent1[0; 11]: (112910) {G15,W13,D5,L1,V0,M1}  { composition( skol1, top )
% 124.36/124.73     ==> join( composition( skol1, top ), composition( converse( skol1 ), 
% 124.36/124.73    complement( zero ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112912) {G1,W10,D5,L1,V0,M1}  { composition( skol1, top ) ==> 
% 124.36/124.73    composition( join( skol1, converse( skol1 ) ), top ) }.
% 124.36/124.73  parent0[0]: (6) {G0,W13,D4,L1,V3,M1} I { join( composition( X, Z ), 
% 124.36/124.73    composition( Y, Z ) ) ==> composition( join( X, Y ), Z ) }.
% 124.36/124.73  parent1[0; 4]: (112911) {G9,W12,D5,L1,V0,M1}  { composition( skol1, top ) 
% 124.36/124.73    ==> join( composition( skol1, top ), composition( converse( skol1 ), top
% 124.36/124.73     ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := skol1
% 124.36/124.73     Y := converse( skol1 )
% 124.36/124.73     Z := top
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112913) {G2,W8,D4,L1,V0,M1}  { composition( skol1, top ) ==> 
% 124.36/124.73    converse( composition( top, skol1 ) ) }.
% 124.36/124.73  parent0[0]: (30402) {G32,W11,D5,L1,V0,M1} P(30380,91);d(1391);d(1026);d(
% 124.36/124.73    12105);d(1346);d(2482) { composition( join( skol1, converse( skol1 ) ), 
% 124.36/124.73    top ) ==> converse( composition( top, skol1 ) ) }.
% 124.36/124.73  parent1[0; 4]: (112912) {G1,W10,D5,L1,V0,M1}  { composition( skol1, top ) 
% 124.36/124.73    ==> composition( join( skol1, converse( skol1 ) ), top ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112914) {G2,W8,D4,L1,V0,M1}  { converse( composition( top, skol1 )
% 124.36/124.73     ) ==> composition( skol1, top ) }.
% 124.36/124.73  parent0[0]: (112913) {G2,W8,D4,L1,V0,M1}  { composition( skol1, top ) ==> 
% 124.36/124.73    converse( composition( top, skol1 ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (71637) {G37,W8,D4,L1,V0,M1} P(71615,1521);d(1026);d(6);d(
% 124.36/124.73    30402) { converse( composition( top, skol1 ) ) ==> composition( skol1, 
% 124.36/124.73    top ) }.
% 124.36/124.73  parent0: (112914) {G2,W8,D4,L1,V0,M1}  { converse( composition( top, skol1
% 124.36/124.73     ) ) ==> composition( skol1, top ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112916) {G28,W10,D5,L1,V1,M1}  { converse( X ) ==> meet( converse
% 124.36/124.73    ( composition( top, X ) ), converse( X ) ) }.
% 124.36/124.73  parent0[0]: (17365) {G28,W10,D5,L1,V1,M1} P(16087,1890) { meet( converse( 
% 124.36/124.73    composition( top, X ) ), converse( X ) ) ==> converse( X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112919) {G29,W9,D4,L1,V0,M1}  { converse( skol1 ) ==> meet( 
% 124.36/124.73    composition( skol1, top ), converse( skol1 ) ) }.
% 124.36/124.73  parent0[0]: (71637) {G37,W8,D4,L1,V0,M1} P(71615,1521);d(1026);d(6);d(30402
% 124.36/124.73    ) { converse( composition( top, skol1 ) ) ==> composition( skol1, top )
% 124.36/124.73     }.
% 124.36/124.73  parent1[0; 4]: (112916) {G28,W10,D5,L1,V1,M1}  { converse( X ) ==> meet( 
% 124.36/124.73    converse( composition( top, X ) ), converse( X ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := skol1
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112924) {G29,W9,D4,L1,V0,M1}  { meet( composition( skol1, top ), 
% 124.36/124.73    converse( skol1 ) ) ==> converse( skol1 ) }.
% 124.36/124.73  parent0[0]: (112919) {G29,W9,D4,L1,V0,M1}  { converse( skol1 ) ==> meet( 
% 124.36/124.73    composition( skol1, top ), converse( skol1 ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (71687) {G38,W9,D4,L1,V0,M1} P(71637,17365) { meet( 
% 124.36/124.73    composition( skol1, top ), converse( skol1 ) ) ==> converse( skol1 ) }.
% 124.36/124.73  parent0: (112924) {G29,W9,D4,L1,V0,M1}  { meet( composition( skol1, top ), 
% 124.36/124.73    converse( skol1 ) ) ==> converse( skol1 ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112926) {G18,W11,D4,L1,V3,M1}  { join( X, Y ) ==> join( join( X, Y
% 124.36/124.73     ), meet( X, Z ) ) }.
% 124.36/124.73  parent0[0]: (1637) {G18,W11,D4,L1,V3,M1} P(1595,20) { join( join( X, Z ), 
% 124.36/124.73    meet( X, Y ) ) ==> join( X, Z ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Z
% 124.36/124.73     Z := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112927) {G19,W14,D5,L1,V1,M1}  { join( composition( skol1, top )
% 124.36/124.73    , X ) ==> join( join( composition( skol1, top ), X ), converse( skol1 ) )
% 124.36/124.73     }.
% 124.36/124.73  parent0[0]: (71687) {G38,W9,D4,L1,V0,M1} P(71637,17365) { meet( composition
% 124.36/124.73    ( skol1, top ), converse( skol1 ) ) ==> converse( skol1 ) }.
% 124.36/124.73  parent1[0; 12]: (112926) {G18,W11,D4,L1,V3,M1}  { join( X, Y ) ==> join( 
% 124.36/124.73    join( X, Y ), meet( X, Z ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := composition( skol1, top )
% 124.36/124.73     Y := X
% 124.36/124.73     Z := converse( skol1 )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112928) {G19,W14,D5,L1,V1,M1}  { join( join( composition( skol1, 
% 124.36/124.73    top ), X ), converse( skol1 ) ) ==> join( composition( skol1, top ), X )
% 124.36/124.73     }.
% 124.36/124.73  parent0[0]: (112927) {G19,W14,D5,L1,V1,M1}  { join( composition( skol1, top
% 124.36/124.73     ), X ) ==> join( join( composition( skol1, top ), X ), converse( skol1 )
% 124.36/124.73     ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (71915) {G39,W14,D5,L1,V1,M1} P(71687,1637) { join( join( 
% 124.36/124.73    composition( skol1, top ), X ), converse( skol1 ) ) ==> join( composition
% 124.36/124.73    ( skol1, top ), X ) }.
% 124.36/124.73  parent0: (112928) {G19,W14,D5,L1,V1,M1}  { join( join( composition( skol1, 
% 124.36/124.73    top ), X ), converse( skol1 ) ) ==> join( composition( skol1, top ), X )
% 124.36/124.73     }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112938) {G15,W16,D6,L1,V3,M1}  { complement( join( complement( X
% 124.36/124.73     ), join( Y, complement( Z ) ) ) ) = complement( join( complement( meet( 
% 124.36/124.73    X, Z ) ), Y ) ) }.
% 124.36/124.73  parent0[0]: (4368) {G14,W14,D5,L1,V3,M1} P(1353,160) { join( join( Z, 
% 124.36/124.73    complement( Y ) ), complement( X ) ) ==> join( complement( meet( X, Y ) )
% 124.36/124.73    , Z ) }.
% 124.36/124.73  parent1[0; 10]: (7750) {G16,W9,D4,L1,V2,M1} P(7678,42);d(7678) { complement
% 124.36/124.73    ( join( X, Y ) ) = complement( join( Y, X ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Z
% 124.36/124.73     Z := Y
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := complement( X )
% 124.36/124.73     Y := join( Y, complement( Z ) )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112940) {G15,W15,D6,L1,V3,M1}  { complement( join( complement( X
% 124.36/124.73     ), join( Y, complement( Z ) ) ) ) = meet( meet( X, Z ), complement( Y )
% 124.36/124.73     ) }.
% 124.36/124.73  parent0[0]: (1380) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( 
% 124.36/124.73    complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 124.36/124.73  parent1[0; 9]: (112938) {G15,W16,D6,L1,V3,M1}  { complement( join( 
% 124.36/124.73    complement( X ), join( Y, complement( Z ) ) ) ) = complement( join( 
% 124.36/124.73    complement( meet( X, Z ) ), Y ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := meet( X, Z )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73     Z := Z
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112942) {G15,W14,D6,L1,V3,M1}  { meet( X, complement( join( Y, 
% 124.36/124.73    complement( Z ) ) ) ) = meet( meet( X, Z ), complement( Y ) ) }.
% 124.36/124.73  parent0[0]: (1380) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( 
% 124.36/124.73    complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 124.36/124.73  parent1[0; 1]: (112940) {G15,W15,D6,L1,V3,M1}  { complement( join( 
% 124.36/124.73    complement( X ), join( Y, complement( Z ) ) ) ) = meet( meet( X, Z ), 
% 124.36/124.73    complement( Y ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := join( Y, complement( Z ) )
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73     Z := Z
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112943) {G15,W13,D5,L1,V3,M1}  { meet( X, meet( complement( Y ), 
% 124.36/124.73    Z ) ) = meet( meet( X, Z ), complement( Y ) ) }.
% 124.36/124.73  parent0[0]: (1379) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( X, 
% 124.36/124.73    complement( Y ) ) ) ==> meet( complement( X ), Y ) }.
% 124.36/124.73  parent1[0; 3]: (112942) {G15,W14,D6,L1,V3,M1}  { meet( X, complement( join
% 124.36/124.73    ( Y, complement( Z ) ) ) ) = meet( meet( X, Z ), complement( Y ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := Z
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73     Z := Z
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (78295) {G17,W13,D5,L1,V3,M1} P(4368,7750);d(1380);d(1380);d(
% 124.36/124.73    1379) { meet( Z, meet( complement( X ), Y ) ) ==> meet( meet( Z, Y ), 
% 124.36/124.73    complement( X ) ) }.
% 124.36/124.73  parent0: (112943) {G15,W13,D5,L1,V3,M1}  { meet( X, meet( complement( Y ), 
% 124.36/124.73    Z ) ) = meet( meet( X, Z ), complement( Y ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Z
% 124.36/124.73     Y := X
% 124.36/124.73     Z := Y
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112946) {G21,W15,D8,L1,V3,M1}  { join( Z, Y ) ==> join( join( 
% 124.36/124.73    converse( meet( X, converse( join( Y, Z ) ) ) ), Z ), Y ) }.
% 124.36/124.73  parent0[0]: (3834) {G21,W15,D8,L1,V3,M1} P(63,1671);d(1) { join( join( 
% 124.36/124.73    converse( meet( Z, converse( join( Y, X ) ) ) ), X ), Y ) ==> join( X, Y
% 124.36/124.73     ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Z
% 124.36/124.73     Y := Y
% 124.36/124.73     Z := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112950) {G22,W25,D7,L1,V4,M1}  { join( composition( meet( X, Y )
% 124.36/124.73    , meet( Z, skol1 ) ), Y ) ==> join( join( converse( meet( T, converse( Y
% 124.36/124.73     ) ) ), composition( meet( X, Y ), meet( Z, skol1 ) ) ), Y ) }.
% 124.36/124.73  parent0[0]: (50205) {G28,W11,D5,L1,V3,M1} P(49929,1664);d(1668) { join( Y, 
% 124.36/124.73    composition( meet( X, Y ), meet( Z, skol1 ) ) ) ==> Y }.
% 124.36/124.73  parent1[0; 16]: (112946) {G21,W15,D8,L1,V3,M1}  { join( Z, Y ) ==> join( 
% 124.36/124.73    join( converse( meet( X, converse( join( Y, Z ) ) ) ), Z ), Y ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73     Z := Z
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := T
% 124.36/124.73     Y := Y
% 124.36/124.73     Z := composition( meet( X, Y ), meet( Z, skol1 ) )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112951) {G22,W19,D5,L1,V3,M1}  { join( composition( meet( X, Y )
% 124.36/124.73    , meet( Z, skol1 ) ), Y ) ==> join( Y, composition( meet( X, Y ), meet( Z
% 124.36/124.73    , skol1 ) ) ) }.
% 124.36/124.73  parent0[0]: (3831) {G21,W13,D7,L1,V3,M1} P(1671,20) { join( join( converse
% 124.36/124.73    ( meet( X, converse( Y ) ) ), Z ), Y ) ==> join( Y, Z ) }.
% 124.36/124.73  parent1[0; 10]: (112950) {G22,W25,D7,L1,V4,M1}  { join( composition( meet( 
% 124.36/124.73    X, Y ), meet( Z, skol1 ) ), Y ) ==> join( join( converse( meet( T, 
% 124.36/124.73    converse( Y ) ) ), composition( meet( X, Y ), meet( Z, skol1 ) ) ), Y )
% 124.36/124.73     }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := T
% 124.36/124.73     Y := Y
% 124.36/124.73     Z := composition( meet( X, Y ), meet( Z, skol1 ) )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73     Z := Z
% 124.36/124.73     T := T
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112952) {G23,W11,D5,L1,V3,M1}  { join( composition( meet( X, Y )
% 124.36/124.73    , meet( Z, skol1 ) ), Y ) ==> Y }.
% 124.36/124.73  parent0[0]: (50205) {G28,W11,D5,L1,V3,M1} P(49929,1664);d(1668) { join( Y, 
% 124.36/124.73    composition( meet( X, Y ), meet( Z, skol1 ) ) ) ==> Y }.
% 124.36/124.73  parent1[0; 10]: (112951) {G22,W19,D5,L1,V3,M1}  { join( composition( meet( 
% 124.36/124.73    X, Y ), meet( Z, skol1 ) ), Y ) ==> join( Y, composition( meet( X, Y ), 
% 124.36/124.73    meet( Z, skol1 ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73     Z := Z
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73     Z := Z
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (99674) {G29,W11,D5,L1,V3,M1} P(50205,3834);d(3831);d(50205)
% 124.36/124.73     { join( composition( meet( Y, X ), meet( Z, skol1 ) ), X ) ==> X }.
% 124.36/124.73  parent0: (112952) {G23,W11,D5,L1,V3,M1}  { join( composition( meet( X, Y )
% 124.36/124.73    , meet( Z, skol1 ) ), Y ) ==> Y }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73     Z := Z
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112955) {G29,W11,D5,L1,V3,M1}  { Y ==> join( composition( meet( X
% 124.36/124.73    , Y ), meet( Z, skol1 ) ), Y ) }.
% 124.36/124.73  parent0[0]: (99674) {G29,W11,D5,L1,V3,M1} P(50205,3834);d(3831);d(50205) { 
% 124.36/124.73    join( composition( meet( Y, X ), meet( Z, skol1 ) ), X ) ==> X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73     Z := Z
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112956) {G28,W11,D5,L1,V2,M1}  { X ==> join( composition( 
% 124.36/124.73    composition( X, skol1 ), meet( Y, skol1 ) ), X ) }.
% 124.36/124.73  parent0[0]: (16544) {G27,W9,D4,L1,V1,M1} P(16476,1867) { meet( composition
% 124.36/124.73    ( X, skol1 ), X ) ==> composition( X, skol1 ) }.
% 124.36/124.73  parent1[0; 4]: (112955) {G29,W11,D5,L1,V3,M1}  { Y ==> join( composition( 
% 124.36/124.73    meet( X, Y ), meet( Z, skol1 ) ), Y ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := composition( X, skol1 )
% 124.36/124.73     Y := X
% 124.36/124.73     Z := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112958) {G28,W11,D5,L1,V2,M1}  { join( composition( composition( X
% 124.36/124.73    , skol1 ), meet( Y, skol1 ) ), X ) ==> X }.
% 124.36/124.73  parent0[0]: (112956) {G28,W11,D5,L1,V2,M1}  { X ==> join( composition( 
% 124.36/124.73    composition( X, skol1 ), meet( Y, skol1 ) ), X ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (100003) {G30,W11,D5,L1,V2,M1} P(16544,99674) { join( 
% 124.36/124.73    composition( composition( X, skol1 ), meet( Y, skol1 ) ), X ) ==> X }.
% 124.36/124.73  parent0: (112958) {G28,W11,D5,L1,V2,M1}  { join( composition( composition( 
% 124.36/124.73    X, skol1 ), meet( Y, skol1 ) ), X ) ==> X }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112961) {G10,W11,D5,L1,V2,M1}  { join( Y, X ) ==> join( join( X, 
% 124.36/124.73    composition( Y, skol1 ) ), Y ) }.
% 124.36/124.73  parent0[0]: (16533) {G10,W11,D5,L1,V2,M1} P(16476,160) { join( join( Y, 
% 124.36/124.73    composition( X, skol1 ) ), X ) ==> join( X, Y ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112963) {G7,W11,D4,L1,V0,M1}  { join( complement( one ), skol1 ) 
% 124.36/124.73    ==> join( composition( top, skol1 ), complement( one ) ) }.
% 124.36/124.73  parent0[0]: (16099) {G6,W10,D5,L1,V1,M1} P(11,1286) { join( X, composition
% 124.36/124.73    ( complement( one ), X ) ) ==> composition( top, X ) }.
% 124.36/124.73  parent1[0; 6]: (112961) {G10,W11,D5,L1,V2,M1}  { join( Y, X ) ==> join( 
% 124.36/124.73    join( X, composition( Y, skol1 ) ), Y ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := skol1
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := skol1
% 124.36/124.73     Y := complement( one )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112965) {G7,W11,D4,L1,V0,M1}  { join( composition( top, skol1 ), 
% 124.36/124.73    complement( one ) ) ==> join( complement( one ), skol1 ) }.
% 124.36/124.73  parent0[0]: (112963) {G7,W11,D4,L1,V0,M1}  { join( complement( one ), skol1
% 124.36/124.73     ) ==> join( composition( top, skol1 ), complement( one ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (109903) {G11,W11,D4,L1,V0,M1} P(16099,16533) { join( 
% 124.36/124.73    composition( top, skol1 ), complement( one ) ) ==> join( complement( one
% 124.36/124.73     ), skol1 ) }.
% 124.36/124.73  parent0: (112965) {G7,W11,D4,L1,V0,M1}  { join( composition( top, skol1 ), 
% 124.36/124.73    complement( one ) ) ==> join( complement( one ), skol1 ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112967) {G35,W10,D6,L1,V1,M1}  { zero ==> composition( complement
% 124.36/124.73    ( join( composition( top, skol1 ), X ) ), skol1 ) }.
% 124.36/124.73  parent0[0]: (71487) {G35,W10,D6,L1,V1,M1} P(19429,17167) { composition( 
% 124.36/124.73    complement( join( composition( top, skol1 ), X ) ), skol1 ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112969) {G12,W9,D6,L1,V0,M1}  { zero ==> composition( complement
% 124.36/124.73    ( join( complement( one ), skol1 ) ), skol1 ) }.
% 124.36/124.73  parent0[0]: (109903) {G11,W11,D4,L1,V0,M1} P(16099,16533) { join( 
% 124.36/124.73    composition( top, skol1 ), complement( one ) ) ==> join( complement( one
% 124.36/124.73     ), skol1 ) }.
% 124.36/124.73  parent1[0; 4]: (112967) {G35,W10,D6,L1,V1,M1}  { zero ==> composition( 
% 124.36/124.73    complement( join( composition( top, skol1 ), X ) ), skol1 ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := complement( one )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112970) {G13,W8,D5,L1,V0,M1}  { zero ==> composition( meet( one, 
% 124.36/124.73    complement( skol1 ) ), skol1 ) }.
% 124.36/124.73  parent0[0]: (1380) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( 
% 124.36/124.73    complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 124.36/124.73  parent1[0; 3]: (112969) {G12,W9,D6,L1,V0,M1}  { zero ==> composition( 
% 124.36/124.73    complement( join( complement( one ), skol1 ) ), skol1 ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := skol1
% 124.36/124.73     Y := one
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112971) {G13,W8,D5,L1,V0,M1}  { composition( meet( one, complement
% 124.36/124.73    ( skol1 ) ), skol1 ) ==> zero }.
% 124.36/124.73  parent0[0]: (112970) {G13,W8,D5,L1,V0,M1}  { zero ==> composition( meet( 
% 124.36/124.73    one, complement( skol1 ) ), skol1 ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (109979) {G36,W8,D5,L1,V0,M1} P(109903,71487);d(1380) { 
% 124.36/124.73    composition( meet( one, complement( skol1 ) ), skol1 ) ==> zero }.
% 124.36/124.73  parent0: (112971) {G13,W8,D5,L1,V0,M1}  { composition( meet( one, 
% 124.36/124.73    complement( skol1 ) ), skol1 ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112973) {G29,W10,D6,L1,V2,M1}  { zero ==> meet( X, composition( 
% 124.36/124.73    skol1, complement( join( X, Y ) ) ) ) }.
% 124.36/124.73  parent0[0]: (17276) {G29,W10,D6,L1,V2,M1} P(16175,8140) { meet( X, 
% 124.36/124.73    composition( skol1, complement( join( X, Y ) ) ) ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112976) {G12,W13,D7,L1,V0,M1}  { zero ==> meet( composition( top
% 124.36/124.73    , skol1 ), composition( skol1, complement( join( complement( one ), skol1
% 124.36/124.73     ) ) ) ) }.
% 124.36/124.73  parent0[0]: (109903) {G11,W11,D4,L1,V0,M1} P(16099,16533) { join( 
% 124.36/124.73    composition( top, skol1 ), complement( one ) ) ==> join( complement( one
% 124.36/124.73     ), skol1 ) }.
% 124.36/124.73  parent1[0; 9]: (112973) {G29,W10,D6,L1,V2,M1}  { zero ==> meet( X, 
% 124.36/124.73    composition( skol1, complement( join( X, Y ) ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := composition( top, skol1 )
% 124.36/124.73     Y := complement( one )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112977) {G13,W12,D6,L1,V0,M1}  { zero ==> meet( composition( top
% 124.36/124.73    , skol1 ), composition( skol1, meet( one, complement( skol1 ) ) ) ) }.
% 124.36/124.73  parent0[0]: (1380) {G14,W10,D5,L1,V2,M1} P(1346,3) { complement( join( 
% 124.36/124.73    complement( Y ), X ) ) ==> meet( Y, complement( X ) ) }.
% 124.36/124.73  parent1[0; 8]: (112976) {G12,W13,D7,L1,V0,M1}  { zero ==> meet( composition
% 124.36/124.73    ( top, skol1 ), composition( skol1, complement( join( complement( one ), 
% 124.36/124.73    skol1 ) ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := skol1
% 124.36/124.73     Y := one
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112978) {G14,W8,D5,L1,V0,M1}  { zero ==> composition( skol1, meet
% 124.36/124.73    ( one, complement( skol1 ) ) ) }.
% 124.36/124.73  parent0[0]: (50007) {G30,W15,D5,L1,V2,M1} P(49912,17381) { meet( 
% 124.36/124.73    composition( top, X ), composition( X, meet( one, Y ) ) ) ==> composition
% 124.36/124.73    ( X, meet( one, Y ) ) }.
% 124.36/124.73  parent1[0; 2]: (112977) {G13,W12,D6,L1,V0,M1}  { zero ==> meet( composition
% 124.36/124.73    ( top, skol1 ), composition( skol1, meet( one, complement( skol1 ) ) ) )
% 124.36/124.73     }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := skol1
% 124.36/124.73     Y := complement( skol1 )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112979) {G14,W8,D5,L1,V0,M1}  { composition( skol1, meet( one, 
% 124.36/124.73    complement( skol1 ) ) ) ==> zero }.
% 124.36/124.73  parent0[0]: (112978) {G14,W8,D5,L1,V0,M1}  { zero ==> composition( skol1, 
% 124.36/124.73    meet( one, complement( skol1 ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (109987) {G31,W8,D5,L1,V0,M1} P(109903,17276);d(1380);d(50007)
% 124.36/124.73     { composition( skol1, meet( one, complement( skol1 ) ) ) ==> zero }.
% 124.36/124.73  parent0: (112979) {G14,W8,D5,L1,V0,M1}  { composition( skol1, meet( one, 
% 124.36/124.73    complement( skol1 ) ) ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112981) {G1,W15,D7,L1,V2,M1}  { complement( converse( Y ) ) ==> 
% 124.36/124.73    join( composition( X, complement( converse( composition( Y, X ) ) ) ), 
% 124.36/124.73    complement( converse( Y ) ) ) }.
% 124.36/124.73  parent0[0]: (91) {G1,W15,D7,L1,V2,M1} P(9,10);d(7) { join( composition( X, 
% 124.36/124.73    complement( converse( composition( Y, X ) ) ) ), complement( converse( Y
% 124.36/124.73     ) ) ) ==> complement( converse( Y ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := Y
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112987) {G2,W19,D7,L1,V0,M1}  { complement( converse( meet( one, 
% 124.36/124.73    complement( skol1 ) ) ) ) ==> join( composition( skol1, complement( 
% 124.36/124.73    converse( zero ) ) ), complement( converse( meet( one, complement( skol1
% 124.36/124.73     ) ) ) ) ) }.
% 124.36/124.73  parent0[0]: (109979) {G36,W8,D5,L1,V0,M1} P(109903,71487);d(1380) { 
% 124.36/124.73    composition( meet( one, complement( skol1 ) ), skol1 ) ==> zero }.
% 124.36/124.73  parent1[0; 12]: (112981) {G1,W15,D7,L1,V2,M1}  { complement( converse( Y )
% 124.36/124.73     ) ==> join( composition( X, complement( converse( composition( Y, X ) )
% 124.36/124.73     ) ), complement( converse( Y ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := skol1
% 124.36/124.73     Y := meet( one, complement( skol1 ) )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112988) {G3,W18,D7,L1,V0,M1}  { complement( converse( meet( one, 
% 124.36/124.73    complement( skol1 ) ) ) ) ==> join( composition( skol1, complement( zero
% 124.36/124.73     ) ), complement( converse( meet( one, complement( skol1 ) ) ) ) ) }.
% 124.36/124.73  parent0[0]: (1391) {G15,W4,D3,L1,V0,M1} P(1361,1354) { converse( zero ) ==>
% 124.36/124.73     zero }.
% 124.36/124.73  parent1[0; 11]: (112987) {G2,W19,D7,L1,V0,M1}  { complement( converse( meet
% 124.36/124.73    ( one, complement( skol1 ) ) ) ) ==> join( composition( skol1, complement
% 124.36/124.73    ( converse( zero ) ) ), complement( converse( meet( one, complement( 
% 124.36/124.73    skol1 ) ) ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112989) {G4,W17,D7,L1,V0,M1}  { complement( converse( meet( one, 
% 124.36/124.73    complement( skol1 ) ) ) ) ==> join( composition( skol1, top ), complement
% 124.36/124.73    ( converse( meet( one, complement( skol1 ) ) ) ) ) }.
% 124.36/124.73  parent0[0]: (1026) {G8,W4,D3,L1,V0,M1} P(1016,10) { complement( zero ) ==> 
% 124.36/124.73    top }.
% 124.36/124.73  parent1[0; 10]: (112988) {G3,W18,D7,L1,V0,M1}  { complement( converse( meet
% 124.36/124.73    ( one, complement( skol1 ) ) ) ) ==> join( composition( skol1, complement
% 124.36/124.73    ( zero ) ), complement( converse( meet( one, complement( skol1 ) ) ) ) )
% 124.36/124.73     }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112991) {G5,W16,D6,L1,V0,M1}  { complement( converse( meet( one, 
% 124.36/124.73    complement( skol1 ) ) ) ) ==> join( composition( skol1, top ), converse( 
% 124.36/124.73    join( complement( one ), skol1 ) ) ) }.
% 124.36/124.73  parent0[0]: (12039) {G25,W12,D6,L1,V2,M1} P(1380,12014) { complement( 
% 124.36/124.73    converse( meet( X, complement( Y ) ) ) ) ==> converse( join( complement( 
% 124.36/124.73    X ), Y ) ) }.
% 124.36/124.73  parent1[0; 11]: (112989) {G4,W17,D7,L1,V0,M1}  { complement( converse( meet
% 124.36/124.73    ( one, complement( skol1 ) ) ) ) ==> join( composition( skol1, top ), 
% 124.36/124.73    complement( converse( meet( one, complement( skol1 ) ) ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := one
% 124.36/124.73     Y := skol1
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112992) {G6,W15,D6,L1,V0,M1}  { converse( join( complement( one )
% 124.36/124.73    , skol1 ) ) ==> join( composition( skol1, top ), converse( join( 
% 124.36/124.73    complement( one ), skol1 ) ) ) }.
% 124.36/124.73  parent0[0]: (12039) {G25,W12,D6,L1,V2,M1} P(1380,12014) { complement( 
% 124.36/124.73    converse( meet( X, complement( Y ) ) ) ) ==> converse( join( complement( 
% 124.36/124.73    X ), Y ) ) }.
% 124.36/124.73  parent1[0; 1]: (112991) {G5,W16,D6,L1,V0,M1}  { complement( converse( meet
% 124.36/124.73    ( one, complement( skol1 ) ) ) ) ==> join( composition( skol1, top ), 
% 124.36/124.73    converse( join( complement( one ), skol1 ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := one
% 124.36/124.73     Y := skol1
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112996) {G7,W15,D5,L1,V0,M1}  { converse( join( complement( one )
% 124.36/124.73    , skol1 ) ) ==> join( join( composition( skol1, top ), complement( one )
% 124.36/124.73     ), converse( skol1 ) ) }.
% 124.36/124.73  parent0[0]: (7096) {G34,W15,D6,L1,V2,M1} P(7078,62) { join( X, converse( 
% 124.36/124.73    join( complement( one ), Y ) ) ) ==> join( join( X, complement( one ) ), 
% 124.36/124.73    converse( Y ) ) }.
% 124.36/124.73  parent1[0; 6]: (112992) {G6,W15,D6,L1,V0,M1}  { converse( join( complement
% 124.36/124.73    ( one ), skol1 ) ) ==> join( composition( skol1, top ), converse( join( 
% 124.36/124.73    complement( one ), skol1 ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := composition( skol1, top )
% 124.36/124.73     Y := skol1
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (112997) {G8,W12,D5,L1,V0,M1}  { converse( join( complement( one )
% 124.36/124.73    , skol1 ) ) ==> join( composition( skol1, top ), complement( one ) ) }.
% 124.36/124.73  parent0[0]: (71915) {G39,W14,D5,L1,V1,M1} P(71687,1637) { join( join( 
% 124.36/124.73    composition( skol1, top ), X ), converse( skol1 ) ) ==> join( composition
% 124.36/124.73    ( skol1, top ), X ) }.
% 124.36/124.73  parent1[0; 6]: (112996) {G7,W15,D5,L1,V0,M1}  { converse( join( complement
% 124.36/124.73    ( one ), skol1 ) ) ==> join( join( composition( skol1, top ), complement
% 124.36/124.73    ( one ) ), converse( skol1 ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := complement( one )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (112998) {G8,W12,D5,L1,V0,M1}  { join( composition( skol1, top ), 
% 124.36/124.73    complement( one ) ) ==> converse( join( complement( one ), skol1 ) ) }.
% 124.36/124.73  parent0[0]: (112997) {G8,W12,D5,L1,V0,M1}  { converse( join( complement( 
% 124.36/124.73    one ), skol1 ) ) ==> join( composition( skol1, top ), complement( one ) )
% 124.36/124.73     }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (110099) {G40,W12,D5,L1,V0,M1} P(109979,91);d(1391);d(1026);d(
% 124.36/124.73    12039);d(7096);d(71915) { join( composition( skol1, top ), complement( 
% 124.36/124.73    one ) ) ==> converse( join( complement( one ), skol1 ) ) }.
% 124.36/124.73  parent0: (112998) {G8,W12,D5,L1,V0,M1}  { join( composition( skol1, top ), 
% 124.36/124.73    complement( one ) ) ==> converse( join( complement( one ), skol1 ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (113000) {G1,W13,D6,L1,V2,M1}  { complement( X ) ==> join( 
% 124.36/124.73    complement( X ), composition( converse( Y ), complement( composition( Y, 
% 124.36/124.73    X ) ) ) ) }.
% 124.36/124.73  parent0[0]: (98) {G1,W13,D6,L1,V2,M1} P(10,0) { join( complement( Y ), 
% 124.36/124.73    composition( converse( X ), complement( composition( X, Y ) ) ) ) ==> 
% 124.36/124.73    complement( Y ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (113007) {G2,W17,D6,L1,V0,M1}  { complement( meet( one, complement
% 124.36/124.73    ( skol1 ) ) ) ==> join( complement( meet( one, complement( skol1 ) ) ), 
% 124.36/124.73    composition( converse( skol1 ), complement( zero ) ) ) }.
% 124.36/124.73  parent0[0]: (109987) {G31,W8,D5,L1,V0,M1} P(109903,17276);d(1380);d(50007)
% 124.36/124.73     { composition( skol1, meet( one, complement( skol1 ) ) ) ==> zero }.
% 124.36/124.73  parent1[0; 16]: (113000) {G1,W13,D6,L1,V2,M1}  { complement( X ) ==> join( 
% 124.36/124.73    complement( X ), composition( converse( Y ), complement( composition( Y, 
% 124.36/124.73    X ) ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := meet( one, complement( skol1 ) )
% 124.36/124.73     Y := skol1
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (113009) {G3,W16,D5,L1,V0,M1}  { complement( meet( one, complement
% 124.36/124.73    ( skol1 ) ) ) ==> join( join( complement( one ), skol1 ), composition( 
% 124.36/124.73    converse( skol1 ), complement( zero ) ) ) }.
% 124.36/124.73  parent0[0]: (4373) {G14,W10,D5,L1,V2,M1} P(1346,1353) { complement( meet( Y
% 124.36/124.73    , complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 124.36/124.73  parent1[0; 7]: (113007) {G2,W17,D6,L1,V0,M1}  { complement( meet( one, 
% 124.36/124.73    complement( skol1 ) ) ) ==> join( complement( meet( one, complement( 
% 124.36/124.73    skol1 ) ) ), composition( converse( skol1 ), complement( zero ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := skol1
% 124.36/124.73     Y := one
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (113010) {G4,W15,D5,L1,V0,M1}  { join( complement( one ), skol1 ) 
% 124.36/124.73    ==> join( join( complement( one ), skol1 ), composition( converse( skol1
% 124.36/124.73     ), complement( zero ) ) ) }.
% 124.36/124.73  parent0[0]: (4373) {G14,W10,D5,L1,V2,M1} P(1346,1353) { complement( meet( Y
% 124.36/124.73    , complement( X ) ) ) ==> join( complement( Y ), X ) }.
% 124.36/124.73  parent1[0; 1]: (113009) {G3,W16,D5,L1,V0,M1}  { complement( meet( one, 
% 124.36/124.73    complement( skol1 ) ) ) ==> join( join( complement( one ), skol1 ), 
% 124.36/124.73    composition( converse( skol1 ), complement( zero ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := skol1
% 124.36/124.73     Y := one
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (113017) {G5,W14,D5,L1,V0,M1}  { join( complement( one ), skol1 ) 
% 124.36/124.73    ==> join( join( complement( one ), skol1 ), composition( converse( skol1
% 124.36/124.73     ), top ) ) }.
% 124.36/124.73  parent0[0]: (1026) {G8,W4,D3,L1,V0,M1} P(1016,10) { complement( zero ) ==> 
% 124.36/124.73    top }.
% 124.36/124.73  parent1[0; 13]: (113010) {G4,W15,D5,L1,V0,M1}  { join( complement( one ), 
% 124.36/124.73    skol1 ) ==> join( join( complement( one ), skol1 ), composition( converse
% 124.36/124.73    ( skol1 ), complement( zero ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (113018) {G6,W14,D5,L1,V0,M1}  { join( complement( one ), skol1 ) 
% 124.36/124.73    ==> join( join( complement( one ), skol1 ), converse( composition( top, 
% 124.36/124.73    skol1 ) ) ) }.
% 124.36/124.73  parent0[0]: (759) {G11,W9,D4,L1,V1,M1} P(752,9) { composition( converse( X
% 124.36/124.73     ), top ) ==> converse( composition( top, X ) ) }.
% 124.36/124.73  parent1[0; 10]: (113017) {G5,W14,D5,L1,V0,M1}  { join( complement( one ), 
% 124.36/124.73    skol1 ) ==> join( join( complement( one ), skol1 ), composition( converse
% 124.36/124.73    ( skol1 ), top ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := skol1
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (113019) {G7,W13,D5,L1,V0,M1}  { join( complement( one ), skol1 ) 
% 124.36/124.73    ==> join( join( complement( one ), skol1 ), composition( skol1, top ) )
% 124.36/124.73     }.
% 124.36/124.73  parent0[0]: (71637) {G37,W8,D4,L1,V0,M1} P(71615,1521);d(1026);d(6);d(30402
% 124.36/124.73    ) { converse( composition( top, skol1 ) ) ==> composition( skol1, top )
% 124.36/124.73     }.
% 124.36/124.73  parent1[0; 10]: (113018) {G6,W14,D5,L1,V0,M1}  { join( complement( one ), 
% 124.36/124.73    skol1 ) ==> join( join( complement( one ), skol1 ), converse( composition
% 124.36/124.73    ( top, skol1 ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (113020) {G8,W11,D4,L1,V0,M1}  { join( complement( one ), skol1 ) 
% 124.36/124.73    ==> join( composition( skol1, top ), complement( one ) ) }.
% 124.36/124.73  parent0[0]: (18270) {G29,W13,D4,L1,V2,M1} P(17564,160) { join( join( Y, X )
% 124.36/124.73    , composition( X, top ) ) ==> join( composition( X, top ), Y ) }.
% 124.36/124.73  parent1[0; 5]: (113019) {G7,W13,D5,L1,V0,M1}  { join( complement( one ), 
% 124.36/124.73    skol1 ) ==> join( join( complement( one ), skol1 ), composition( skol1, 
% 124.36/124.73    top ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := skol1
% 124.36/124.73     Y := complement( one )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (113021) {G9,W10,D5,L1,V0,M1}  { join( complement( one ), skol1 ) 
% 124.36/124.73    ==> converse( join( complement( one ), skol1 ) ) }.
% 124.36/124.73  parent0[0]: (110099) {G40,W12,D5,L1,V0,M1} P(109979,91);d(1391);d(1026);d(
% 124.36/124.73    12039);d(7096);d(71915) { join( composition( skol1, top ), complement( 
% 124.36/124.73    one ) ) ==> converse( join( complement( one ), skol1 ) ) }.
% 124.36/124.73  parent1[0; 5]: (113020) {G8,W11,D4,L1,V0,M1}  { join( complement( one ), 
% 124.36/124.73    skol1 ) ==> join( composition( skol1, top ), complement( one ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (113022) {G9,W10,D5,L1,V0,M1}  { converse( join( complement( one )
% 124.36/124.73    , skol1 ) ) ==> join( complement( one ), skol1 ) }.
% 124.36/124.73  parent0[0]: (113021) {G9,W10,D5,L1,V0,M1}  { join( complement( one ), skol1
% 124.36/124.73     ) ==> converse( join( complement( one ), skol1 ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (110306) {G41,W10,D5,L1,V0,M1} P(109987,98);d(4373);d(1026);d(
% 124.36/124.73    759);d(71637);d(18270);d(110099) { converse( join( complement( one ), 
% 124.36/124.73    skol1 ) ) ==> join( complement( one ), skol1 ) }.
% 124.36/124.73  parent0: (113022) {G9,W10,D5,L1,V0,M1}  { converse( join( complement( one )
% 124.36/124.73    , skol1 ) ) ==> join( complement( one ), skol1 ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (113024) {G29,W12,D7,L1,V3,M1}  { zero ==> meet( converse( X ), 
% 124.36/124.73    complement( join( Y, converse( join( Z, X ) ) ) ) ) }.
% 124.36/124.73  parent0[0]: (1956) {G29,W12,D7,L1,V3,M1} P(62,1895) { meet( converse( Z ), 
% 124.36/124.73    complement( join( X, converse( join( Y, Z ) ) ) ) ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := Y
% 124.36/124.73     Y := Z
% 124.36/124.73     Z := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (113030) {G30,W12,D7,L1,V1,M1}  { zero ==> meet( converse( skol1 )
% 124.36/124.73    , complement( join( X, join( complement( one ), skol1 ) ) ) ) }.
% 124.36/124.73  parent0[0]: (110306) {G41,W10,D5,L1,V0,M1} P(109987,98);d(4373);d(1026);d(
% 124.36/124.73    759);d(71637);d(18270);d(110099) { converse( join( complement( one ), 
% 124.36/124.73    skol1 ) ) ==> join( complement( one ), skol1 ) }.
% 124.36/124.73  parent1[0; 8]: (113024) {G29,W12,D7,L1,V3,M1}  { zero ==> meet( converse( X
% 124.36/124.73     ), complement( join( Y, converse( join( Z, X ) ) ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := skol1
% 124.36/124.73     Y := X
% 124.36/124.73     Z := complement( one )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (113031) {G1,W12,D7,L1,V1,M1}  { zero ==> meet( converse( skol1 )
% 124.36/124.73    , complement( join( join( X, complement( one ) ), skol1 ) ) ) }.
% 124.36/124.73  parent0[0]: (1) {G0,W11,D4,L1,V3,M1} I { join( X, join( Y, Z ) ) ==> join( 
% 124.36/124.73    join( X, Y ), Z ) }.
% 124.36/124.73  parent1[0; 6]: (113030) {G30,W12,D7,L1,V1,M1}  { zero ==> meet( converse( 
% 124.36/124.73    skol1 ), complement( join( X, join( complement( one ), skol1 ) ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := complement( one )
% 124.36/124.73     Z := skol1
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (113032) {G2,W11,D6,L1,V1,M1}  { zero ==> meet( converse( skol1 )
% 124.36/124.73    , meet( complement( join( X, skol1 ) ), one ) ) }.
% 124.36/124.73  parent0[0]: (7681) {G15,W14,D6,L1,V3,M1} P(20,1379) { complement( join( 
% 124.36/124.73    join( X, complement( Z ) ), Y ) ) ==> meet( complement( join( X, Y ) ), Z
% 124.36/124.73     ) }.
% 124.36/124.73  parent1[0; 5]: (113031) {G1,W12,D7,L1,V1,M1}  { zero ==> meet( converse( 
% 124.36/124.73    skol1 ), complement( join( join( X, complement( one ) ), skol1 ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73     Y := skol1
% 124.36/124.73     Z := one
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (113033) {G3,W11,D5,L1,V1,M1}  { zero ==> meet( meet( converse( 
% 124.36/124.73    skol1 ), one ), complement( join( X, skol1 ) ) ) }.
% 124.36/124.73  parent0[0]: (78295) {G17,W13,D5,L1,V3,M1} P(4368,7750);d(1380);d(1380);d(
% 124.36/124.73    1379) { meet( Z, meet( complement( X ), Y ) ) ==> meet( meet( Z, Y ), 
% 124.36/124.73    complement( X ) ) }.
% 124.36/124.73  parent1[0; 2]: (113032) {G2,W11,D6,L1,V1,M1}  { zero ==> meet( converse( 
% 124.36/124.73    skol1 ), meet( complement( join( X, skol1 ) ), one ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := join( X, skol1 )
% 124.36/124.73     Y := one
% 124.36/124.73     Z := converse( skol1 )
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (113034) {G4,W9,D5,L1,V1,M1}  { zero ==> meet( converse( skol1 ), 
% 124.36/124.73    complement( join( X, skol1 ) ) ) }.
% 124.36/124.73  parent0[0]: (1446) {G17,W7,D4,L1,V0,M1} P(1428,29);d(44);d(1355) { meet( 
% 124.36/124.73    converse( skol1 ), one ) ==> converse( skol1 ) }.
% 124.36/124.73  parent1[0; 3]: (113033) {G3,W11,D5,L1,V1,M1}  { zero ==> meet( meet( 
% 124.36/124.73    converse( skol1 ), one ), complement( join( X, skol1 ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (113035) {G4,W9,D5,L1,V1,M1}  { meet( converse( skol1 ), complement
% 124.36/124.73    ( join( X, skol1 ) ) ) ==> zero }.
% 124.36/124.73  parent0[0]: (113034) {G4,W9,D5,L1,V1,M1}  { zero ==> meet( converse( skol1
% 124.36/124.73     ), complement( join( X, skol1 ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  subsumption: (110914) {G42,W9,D5,L1,V1,M1} P(110306,1956);d(1);d(7681);d(
% 124.36/124.73    78295);d(1446) { meet( converse( skol1 ), complement( join( X, skol1 ) )
% 124.36/124.73     ) ==> zero }.
% 124.36/124.73  parent0: (113035) {G4,W9,D5,L1,V1,M1}  { meet( converse( skol1 ), 
% 124.36/124.73    complement( join( X, skol1 ) ) ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  permutation0:
% 124.36/124.73     0 ==> 0
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (113037) {G42,W9,D5,L1,V1,M1}  { zero ==> meet( converse( skol1 ), 
% 124.36/124.73    complement( join( X, skol1 ) ) ) }.
% 124.36/124.73  parent0[0]: (110914) {G42,W9,D5,L1,V1,M1} P(110306,1956);d(1);d(7681);d(
% 124.36/124.73    78295);d(1446) { meet( converse( skol1 ), complement( join( X, skol1 ) )
% 124.36/124.73     ) ==> zero }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := X
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  paramod: (113038) {G31,W7,D4,L1,V0,M1}  { zero ==> meet( converse( skol1 )
% 124.36/124.73    , complement( skol1 ) ) }.
% 124.36/124.73  parent0[0]: (100003) {G30,W11,D5,L1,V2,M1} P(16544,99674) { join( 
% 124.36/124.73    composition( composition( X, skol1 ), meet( Y, skol1 ) ), X ) ==> X }.
% 124.36/124.73  parent1[0; 6]: (113037) {G42,W9,D5,L1,V1,M1}  { zero ==> meet( converse( 
% 124.36/124.73    skol1 ), complement( join( X, skol1 ) ) ) }.
% 124.36/124.73  substitution0:
% 124.36/124.73     X := skol1
% 124.36/124.73     Y := X
% 124.36/124.73  end
% 124.36/124.73  substitution1:
% 124.36/124.73     X := composition( composition( skol1, skol1 ), meet( X, skol1 ) )
% 124.36/124.73  end
% 124.36/124.73  
% 124.36/124.73  eqswap: (113039) {G31,W7,D4,L1,V0,M1}  { meet( converse( skol1 ), 
% 124.36/124.73    complement( skol1 ) ) ==> zero }.
% 124.36/124.73  parent0[0]: (113038) {G31,W7,D4,L1,V0,M1}  { zero ==> meet( converse( skol1
% 124.36/124.73     ), complement( skol1 ) ) }.
% 124.36/124.74  substitution0:
% 124.36/124.74  end
% 124.36/124.74  
% 124.36/124.74  subsumption: (110957) {G43,W7,D4,L1,V0,M1} P(100003,110914) { meet( 
% 124.36/124.74    converse( skol1 ), complement( skol1 ) ) ==> zero }.
% 124.36/124.74  parent0: (113039) {G31,W7,D4,L1,V0,M1}  { meet( converse( skol1 ), 
% 124.36/124.74    complement( skol1 ) ) ==> zero }.
% 124.36/124.74  substitution0:
% 124.36/124.74  end
% 124.36/124.74  permutation0:
% 124.36/124.74     0 ==> 0
% 124.36/124.74  end
% 124.36/124.74  
% 124.36/124.74  eqswap: (113041) {G20,W11,D4,L1,V2,M1}  { join( Y, complement( X ) ) ==> 
% 124.36/124.74    join( complement( X ), meet( Y, X ) ) }.
% 124.36/124.74  parent0[0]: (10652) {G20,W11,D4,L1,V2,M1} P(10619,1668);d(1);d(1637) { join
% 124.36/124.74    ( complement( Y ), meet( X, Y ) ) ==> join( X, complement( Y ) ) }.
% 124.36/124.74  substitution0:
% 124.36/124.74     X := Y
% 124.36/124.74     Y := X
% 124.36/124.74  end
% 124.36/124.74  
% 124.36/124.74  paramod: (113044) {G21,W12,D5,L1,V0,M1}  { join( converse( skol1 ), 
% 124.36/124.74    complement( complement( skol1 ) ) ) ==> join( complement( complement( 
% 124.36/124.74    skol1 ) ), zero ) }.
% 124.36/124.74  parent0[0]: (110957) {G43,W7,D4,L1,V0,M1} P(100003,110914) { meet( converse
% 124.36/124.74    ( skol1 ), complement( skol1 ) ) ==> zero }.
% 124.36/124.74  parent1[0; 11]: (113041) {G20,W11,D4,L1,V2,M1}  { join( Y, complement( X )
% 124.36/124.74     ) ==> join( complement( X ), meet( Y, X ) ) }.
% 124.36/124.74  substitution0:
% 124.36/124.74  end
% 124.36/124.74  substitution1:
% 124.36/124.74     X := complement( skol1 )
% 124.36/124.74     Y := converse( skol1 )
% 124.36/124.74  end
% 124.36/124.74  
% 124.36/124.74  paramod: (113045) {G14,W10,D5,L1,V0,M1}  { join( converse( skol1 ), 
% 124.36/124.74    complement( complement( skol1 ) ) ) ==> complement( complement( skol1 ) )
% 124.36/124.74     }.
% 124.36/124.74  parent0[0]: (1355) {G13,W5,D3,L1,V1,M1} P(1340,409) { join( X, zero ) ==> X
% 124.36/124.74     }.
% 124.36/124.74  parent1[0; 7]: (113044) {G21,W12,D5,L1,V0,M1}  { join( converse( skol1 ), 
% 124.36/124.74    complement( complement( skol1 ) ) ) ==> join( complement( complement( 
% 124.36/124.74    skol1 ) ), zero ) }.
% 124.36/124.74  substitution0:
% 124.36/124.74     X := complement( complement( skol1 ) )
% 124.36/124.74  end
% 124.36/124.74  substitution1:
% 124.36/124.74  end
% 124.36/124.74  
% 124.36/124.74  paramod: (113047) {G14,W8,D5,L1,V0,M1}  { join( converse( skol1 ), 
% 124.36/124.74    complement( complement( skol1 ) ) ) ==> skol1 }.
% 124.36/124.74  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.74    complement( complement( X ) ) ==> X }.
% 124.36/124.74  parent1[0; 7]: (113045) {G14,W10,D5,L1,V0,M1}  { join( converse( skol1 ), 
% 124.36/124.74    complement( complement( skol1 ) ) ) ==> complement( complement( skol1 ) )
% 124.36/124.74     }.
% 124.36/124.74  substitution0:
% 124.36/124.74     X := skol1
% 124.36/124.74  end
% 124.36/124.74  substitution1:
% 124.36/124.74  end
% 124.36/124.74  
% 124.36/124.74  paramod: (113048) {G14,W6,D4,L1,V0,M1}  { join( converse( skol1 ), skol1 ) 
% 124.36/124.74    ==> skol1 }.
% 124.36/124.74  parent0[0]: (1346) {G13,W5,D4,L1,V1,M1} P(45,1333);d(653);d(1345) { 
% 124.36/124.74    complement( complement( X ) ) ==> X }.
% 124.36/124.74  parent1[0; 4]: (113047) {G14,W8,D5,L1,V0,M1}  { join( converse( skol1 ), 
% 124.36/124.74    complement( complement( skol1 ) ) ) ==> skol1 }.
% 124.36/124.74  substitution0:
% 124.36/124.74     X := skol1
% 124.36/124.74  end
% 124.36/124.74  substitution1:
% 124.36/124.74  end
% 124.36/124.74  
% 124.36/124.74  subsumption: (111010) {G44,W6,D4,L1,V0,M1} P(110957,10652);d(1355);d(1346)
% 124.36/124.74     { join( converse( skol1 ), skol1 ) ==> skol1 }.
% 124.36/124.74  parent0: (113048) {G14,W6,D4,L1,V0,M1}  { join( converse( skol1 ), skol1 ) 
% 124.36/124.74    ==> skol1 }.
% 124.36/124.74  substitution0:
% 124.36/124.74  end
% 124.36/124.74  permutation0:
% 124.36/124.74     0 ==> 0
% 124.36/124.74  end
% 124.36/124.74  
% 124.36/124.74  resolution: (113054) {G7,W0,D0,L0,V0,M0}  {  }.
% 124.36/124.74  parent0[0]: (138) {G6,W6,D4,L1,V0,M1} R(136,16) { ! join( converse( skol1 )
% 124.36/124.74    , skol1 ) ==> skol1 }.
% 124.36/124.74  parent1[0]: (111010) {G44,W6,D4,L1,V0,M1} P(110957,10652);d(1355);d(1346)
% 124.36/124.74     { join( converse( skol1 ), skol1 ) ==> skol1 }.
% 124.36/124.74  substitution0:
% 124.36/124.74  end
% 124.36/124.74  substitution1:
% 124.36/124.74  end
% 124.36/124.74  
% 124.36/124.74  subsumption: (111017) {G45,W0,D0,L0,V0,M0} S(111010);r(138) {  }.
% 124.36/124.74  parent0: (113054) {G7,W0,D0,L0,V0,M0}  {  }.
% 124.36/124.74  substitution0:
% 124.36/124.74  end
% 124.36/124.74  permutation0:
% 124.36/124.74  end
% 124.36/124.74  
% 124.36/124.74  Proof check complete!
% 124.36/124.74  
% 124.36/124.74  Memory use:
% 124.36/124.74  
% 124.36/124.74  space for terms:        1562745
% 124.36/124.74  space for clauses:      7847075
% 124.36/124.74  
% 124.36/124.74  
% 124.36/124.74  clauses generated:      5108951
% 124.36/124.74  clauses kept:           111018
% 124.36/124.74  clauses selected:       7751
% 124.36/124.74  clauses deleted:        24344
% 124.36/124.74  clauses inuse deleted:  1008
% 124.36/124.74  
% 124.36/124.74  subsentry:          3820542
% 124.36/124.74  literals s-matched: 2764376
% 124.36/124.74  literals matched:   2756815
% 124.36/124.74  full subsumption:   353641
% 124.36/124.74  
% 124.36/124.74  checksum:           1949040815
% 124.36/124.74  
% 124.36/124.74  
% 124.36/124.74  Bliksem ended
%------------------------------------------------------------------------------