TSTP Solution File: PRO009+4 by Bliksem---1.12
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- Process Solution
%------------------------------------------------------------------------------
% File : Bliksem---1.12
% Problem : PRO009+4 : TPTP v8.1.0. Released v4.0.0.
% Transfm : none
% Format : tptp:raw
% Command : bliksem %s
% Computer : n022.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 17:39:55 EDT 2022
% Result : Theorem 9.54s 9.92s
% Output : Refutation 9.54s
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.11/0.12 % Problem : PRO009+4 : TPTP v8.1.0. Released v4.0.0.
% 0.11/0.13 % Command : bliksem %s
% 0.12/0.33 % Computer : n022.cluster.edu
% 0.12/0.33 % Model : x86_64 x86_64
% 0.12/0.33 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.12/0.33 % Memory : 8042.1875MB
% 0.12/0.33 % OS : Linux 3.10.0-693.el7.x86_64
% 0.12/0.33 % CPULimit : 300
% 0.12/0.33 % DateTime : Mon Jun 13 03:21:48 EDT 2022
% 0.12/0.34 % CPUTime :
% 0.44/1.08 *** allocated 10000 integers for termspace/termends
% 0.44/1.08 *** allocated 10000 integers for clauses
% 0.44/1.08 *** allocated 10000 integers for justifications
% 0.44/1.08 Bliksem 1.12
% 0.44/1.08
% 0.44/1.08
% 0.44/1.08 Automatic Strategy Selection
% 0.44/1.08
% 0.44/1.08
% 0.44/1.08 Clauses:
% 0.44/1.08
% 0.44/1.08 { ! occurrence_of( Y, X ), atomic( X ), subactivity_occurrence( skol1( Z, Y
% 0.44/1.08 ), Y ) }.
% 0.44/1.08 { ! occurrence_of( Y, X ), atomic( X ), root( skol1( X, Y ), X ) }.
% 0.44/1.08 { ! occurrence_of( T, X ), ! root_occ( U, T ), ! leaf_occ( Z, T ), !
% 0.44/1.08 subactivity_occurrence( Y, T ), ! min_precedes( U, Y, X ), Y = Z,
% 0.44/1.08 min_precedes( Y, Z, X ) }.
% 0.44/1.08 { ! occurrence_of( T, Z ), ! subactivity_occurrence( X, T ), ! leaf_occ( Y
% 0.44/1.08 , T ), ! arboreal( X ), min_precedes( X, Y, Z ), Y = X }.
% 0.44/1.08 { ! occurrence_of( Y, X ), activity( X ) }.
% 0.44/1.08 { ! occurrence_of( Y, X ), activity_occurrence( Y ) }.
% 0.44/1.08 { ! occurrence_of( T, X ), ! arboreal( Y ), ! arboreal( Z ), !
% 0.44/1.08 subactivity_occurrence( Y, T ), ! subactivity_occurrence( Z, T ),
% 0.44/1.08 min_precedes( Y, Z, X ), min_precedes( Z, Y, X ), Y = Z }.
% 0.44/1.08 { ! root( Y, X ), atocc( Y, skol2( Z, Y ) ) }.
% 0.44/1.08 { ! root( Y, X ), subactivity( skol2( X, Y ), X ) }.
% 0.44/1.08 { ! min_precedes( Y, Z, X ), subactivity_occurrence( Z, skol3( T, U, Z ) )
% 0.44/1.08 }.
% 0.44/1.08 { ! min_precedes( Y, Z, X ), subactivity_occurrence( Y, skol3( T, Y, Z ) )
% 0.44/1.08 }.
% 0.44/1.08 { ! min_precedes( Y, Z, X ), occurrence_of( skol3( X, Y, Z ), X ) }.
% 0.44/1.08 { ! leaf( X, Y ), atomic( Y ), occurrence_of( skol4( Z, Y ), Y ) }.
% 0.44/1.08 { ! leaf( X, Y ), atomic( Y ), leaf_occ( X, skol4( X, Y ) ) }.
% 0.44/1.08 { ! occurrence_of( Z, X ), ! occurrence_of( Z, Y ), X = Y }.
% 0.44/1.08 { ! occurrence_of( Z, Y ), ! leaf_occ( X, Z ), ! min_precedes( X, T, Y ) }
% 0.44/1.08 .
% 0.44/1.08 { ! occurrence_of( Z, Y ), ! root_occ( X, Z ), ! min_precedes( T, X, Y ) }
% 0.44/1.08 .
% 0.44/1.08 { ! subactivity_occurrence( X, Y ), activity_occurrence( X ) }.
% 0.44/1.08 { ! subactivity_occurrence( X, Y ), activity_occurrence( Y ) }.
% 0.44/1.08 { ! activity_occurrence( X ), activity( skol5( Y ) ) }.
% 0.44/1.08 { ! activity_occurrence( X ), occurrence_of( X, skol5( X ) ) }.
% 0.44/1.08 { ! legal( X ), arboreal( X ) }.
% 0.44/1.08 { ! atocc( X, Y ), subactivity( Y, skol6( Z, Y ) ) }.
% 0.44/1.08 { ! atocc( X, Y ), alpha1( X, skol6( X, Y ) ) }.
% 0.44/1.08 { ! subactivity( Y, Z ), ! alpha1( X, Z ), atocc( X, Y ) }.
% 0.44/1.08 { ! alpha1( X, Y ), atomic( Y ) }.
% 0.44/1.08 { ! alpha1( X, Y ), occurrence_of( X, Y ) }.
% 0.44/1.08 { ! atomic( Y ), ! occurrence_of( X, Y ), alpha1( X, Y ) }.
% 0.44/1.08 { ! leaf( X, Y ), alpha2( X, Y ) }.
% 0.44/1.08 { ! leaf( X, Y ), ! min_precedes( X, Z, Y ) }.
% 0.44/1.08 { ! alpha2( X, Y ), min_precedes( X, skol7( X, Y ), Y ), leaf( X, Y ) }.
% 0.44/1.08 { ! alpha2( X, Y ), root( X, Y ), min_precedes( skol8( X, Y ), X, Y ) }.
% 0.44/1.08 { ! root( X, Y ), alpha2( X, Y ) }.
% 0.44/1.08 { ! min_precedes( Z, X, Y ), alpha2( X, Y ) }.
% 0.44/1.08 { ! occurrence_of( X, Y ), ! arboreal( X ), atomic( Y ) }.
% 0.44/1.08 { ! occurrence_of( X, Y ), ! atomic( Y ), arboreal( X ) }.
% 0.44/1.08 { ! root( X, Y ), legal( X ) }.
% 0.44/1.08 { ! leaf_occ( X, Y ), occurrence_of( Y, skol9( Z, Y ) ) }.
% 0.44/1.08 { ! leaf_occ( X, Y ), alpha3( X, Y, skol9( X, Y ) ) }.
% 0.44/1.08 { ! occurrence_of( Y, Z ), ! alpha3( X, Y, Z ), leaf_occ( X, Y ) }.
% 0.44/1.08 { ! alpha3( X, Y, Z ), subactivity_occurrence( X, Y ) }.
% 0.44/1.08 { ! alpha3( X, Y, Z ), leaf( X, Z ) }.
% 0.44/1.08 { ! subactivity_occurrence( X, Y ), ! leaf( X, Z ), alpha3( X, Y, Z ) }.
% 0.44/1.08 { ! root_occ( X, Y ), occurrence_of( Y, skol10( Z, Y ) ) }.
% 0.44/1.08 { ! root_occ( X, Y ), alpha4( X, Y, skol10( X, Y ) ) }.
% 0.44/1.08 { ! occurrence_of( Y, Z ), ! alpha4( X, Y, Z ), root_occ( X, Y ) }.
% 0.44/1.08 { ! alpha4( X, Y, Z ), subactivity_occurrence( X, Y ) }.
% 0.44/1.08 { ! alpha4( X, Y, Z ), root( X, Z ) }.
% 0.44/1.08 { ! subactivity_occurrence( X, Y ), ! root( X, Z ), alpha4( X, Y, Z ) }.
% 0.44/1.08 { ! earlier( X, Y ), ! earlier( Y, X ) }.
% 0.44/1.08 { ! precedes( X, Y ), earlier( X, Y ) }.
% 0.44/1.08 { ! precedes( X, Y ), legal( Y ) }.
% 0.44/1.08 { ! earlier( X, Y ), ! legal( Y ), precedes( X, Y ) }.
% 0.44/1.08 { ! min_precedes( Z, X, Y ), ! root( X, Y ) }.
% 0.44/1.08 { ! min_precedes( Z, X, Y ), root( skol11( T, Y ), Y ) }.
% 0.44/1.08 { ! min_precedes( Z, X, Y ), min_precedes( skol11( X, Y ), X, Y ) }.
% 0.44/1.08 { ! min_precedes( X, Y, Z ), precedes( X, Y ) }.
% 0.44/1.08 { ! next_subocc( X, Y, Z ), arboreal( X ) }.
% 0.44/1.08 { ! next_subocc( X, Y, Z ), arboreal( Y ) }.
% 0.44/1.08 { ! next_subocc( X, Y, Z ), min_precedes( X, Y, Z ) }.
% 0.44/1.08 { ! next_subocc( X, Y, Z ), alpha5( X, Y, Z ) }.
% 0.44/1.08 { ! min_precedes( X, Y, Z ), ! alpha5( X, Y, Z ), next_subocc( X, Y, Z ) }
% 0.44/1.08 .
% 0.44/1.08 { ! alpha5( X, Y, Z ), ! min_precedes( X, T, Z ), ! min_precedes( T, Y, Z )
% 7.83/8.20 }.
% 7.83/8.20 { min_precedes( skol12( T, Y, Z ), Y, Z ), alpha5( X, Y, Z ) }.
% 7.83/8.20 { min_precedes( X, skol12( X, Y, Z ), Z ), alpha5( X, Y, Z ) }.
% 7.83/8.20 { ! min_precedes( X, Z, T ), ! occurrence_of( Y, T ), !
% 7.83/8.20 subactivity_occurrence( Z, Y ), subactivity_occurrence( X, Y ) }.
% 7.83/8.20 { ! occurrence_of( Z, T ), atomic( T ), ! leaf_occ( X, Z ), ! leaf_occ( Y,
% 7.83/8.20 Z ), X = Y }.
% 7.83/8.20 { ! occurrence_of( Z, T ), ! root_occ( X, Z ), ! root_occ( Y, Z ), X = Y }
% 7.83/8.20 .
% 7.83/8.20 { ! earlier( X, Z ), ! earlier( Z, Y ), earlier( X, Y ) }.
% 7.83/8.20 { ! min_precedes( T, X, Z ), ! min_precedes( T, Y, Z ), ! precedes( X, Y )
% 7.83/8.20 , min_precedes( X, Y, Z ) }.
% 7.83/8.20 { ! occurrence_of( X, tptp0 ), alpha6( X, skol13( X ) ) }.
% 7.83/8.20 { ! occurrence_of( X, tptp0 ), alpha7( skol13( X ), skol16( X ) ) }.
% 7.83/8.20 { ! occurrence_of( X, tptp0 ), alpha8( X, skol16( X ) ) }.
% 7.83/8.20 { ! alpha8( X, Y ), alpha9( skol14( Z, T ) ) }.
% 7.83/8.20 { ! alpha8( X, Y ), next_subocc( Y, skol14( Z, Y ), tptp0 ) }.
% 7.83/8.20 { ! alpha8( X, Y ), leaf_occ( skol14( X, Y ), X ) }.
% 7.83/8.20 { ! alpha9( Z ), ! next_subocc( Y, Z, tptp0 ), ! leaf_occ( Z, X ), alpha8(
% 7.83/8.20 X, Y ) }.
% 7.83/8.20 { ! alpha9( X ), occurrence_of( X, tptp2 ), occurrence_of( X, tptp1 ) }.
% 7.83/8.20 { ! occurrence_of( X, tptp2 ), alpha9( X ) }.
% 7.83/8.20 { ! occurrence_of( X, tptp1 ), alpha9( X ) }.
% 7.83/8.20 { ! alpha7( X, Y ), occurrence_of( Y, tptp4 ) }.
% 7.83/8.20 { ! alpha7( X, Y ), next_subocc( X, Y, tptp0 ) }.
% 7.83/8.20 { ! occurrence_of( Y, tptp4 ), ! next_subocc( X, Y, tptp0 ), alpha7( X, Y )
% 7.83/8.20 }.
% 7.83/8.20 { ! alpha6( X, Y ), occurrence_of( Y, tptp3 ) }.
% 7.83/8.20 { ! alpha6( X, Y ), root_occ( Y, X ) }.
% 7.83/8.20 { ! occurrence_of( Y, tptp3 ), ! root_occ( Y, X ), alpha6( X, Y ) }.
% 7.83/8.20 { activity( tptp0 ) }.
% 7.83/8.20 { ! atomic( tptp0 ) }.
% 7.83/8.20 { atomic( tptp4 ) }.
% 7.83/8.20 { atomic( tptp2 ) }.
% 7.83/8.20 { atomic( tptp1 ) }.
% 7.83/8.20 { atomic( tptp3 ) }.
% 7.83/8.20 { ! tptp4 = tptp3 }.
% 7.83/8.20 { ! tptp4 = tptp2 }.
% 7.83/8.20 { ! tptp4 = tptp1 }.
% 7.83/8.20 { ! tptp3 = tptp2 }.
% 7.83/8.20 { ! tptp3 = tptp1 }.
% 7.83/8.20 { ! tptp2 = tptp1 }.
% 7.83/8.20 { occurrence_of( skol15, tptp0 ) }.
% 7.83/8.20 { ! occurrence_of( X, tptp3 ), ! root_occ( X, skol15 ), ! occurrence_of( Y
% 7.83/8.20 , tptp2 ), ! min_precedes( X, Y, tptp0 ), ! leaf_occ( Y, skol15 ) }.
% 7.83/8.20 { ! occurrence_of( X, tptp3 ), ! root_occ( X, skol15 ), ! occurrence_of( Y
% 7.83/8.21 , tptp1 ), ! min_precedes( X, Y, tptp0 ), ! leaf_occ( Y, skol15 ) }.
% 7.83/8.21
% 7.83/8.21 percentage equality = 0.048980, percentage horn = 0.871287
% 7.83/8.21 This is a problem with some equality
% 7.83/8.21
% 7.83/8.21
% 7.83/8.21
% 7.83/8.21 Options Used:
% 7.83/8.21
% 7.83/8.21 useres = 1
% 7.83/8.21 useparamod = 1
% 7.83/8.21 useeqrefl = 1
% 7.83/8.21 useeqfact = 1
% 7.83/8.21 usefactor = 1
% 7.83/8.21 usesimpsplitting = 0
% 7.83/8.21 usesimpdemod = 5
% 7.83/8.21 usesimpres = 3
% 7.83/8.21
% 7.83/8.21 resimpinuse = 1000
% 7.83/8.21 resimpclauses = 20000
% 7.83/8.21 substype = eqrewr
% 7.83/8.21 backwardsubs = 1
% 7.83/8.21 selectoldest = 5
% 7.83/8.21
% 7.83/8.21 litorderings [0] = split
% 7.83/8.21 litorderings [1] = extend the termordering, first sorting on arguments
% 7.83/8.21
% 7.83/8.21 termordering = kbo
% 7.83/8.21
% 7.83/8.21 litapriori = 0
% 7.83/8.21 termapriori = 1
% 7.83/8.21 litaposteriori = 0
% 7.83/8.21 termaposteriori = 0
% 7.83/8.21 demodaposteriori = 0
% 7.83/8.21 ordereqreflfact = 0
% 7.83/8.21
% 7.83/8.21 litselect = negord
% 7.83/8.21
% 7.83/8.21 maxweight = 15
% 7.83/8.21 maxdepth = 30000
% 7.83/8.21 maxlength = 115
% 7.83/8.21 maxnrvars = 195
% 7.83/8.21 excuselevel = 1
% 7.83/8.21 increasemaxweight = 1
% 7.83/8.21
% 7.83/8.21 maxselected = 10000000
% 7.83/8.21 maxnrclauses = 10000000
% 7.83/8.21
% 7.83/8.21 showgenerated = 0
% 7.83/8.21 showkept = 0
% 7.83/8.21 showselected = 0
% 7.83/8.21 showdeleted = 0
% 7.83/8.21 showresimp = 1
% 7.83/8.21 showstatus = 2000
% 7.83/8.21
% 7.83/8.21 prologoutput = 0
% 7.83/8.21 nrgoals = 5000000
% 7.83/8.21 totalproof = 1
% 7.83/8.21
% 7.83/8.21 Symbols occurring in the translation:
% 7.83/8.21
% 7.83/8.21 {} [0, 0] (w:1, o:2, a:1, s:1, b:0),
% 7.83/8.21 . [1, 2] (w:1, o:134, a:1, s:1, b:0),
% 7.83/8.21 ! [4, 1] (w:0, o:120, a:1, s:1, b:0),
% 7.83/8.21 = [13, 2] (w:1, o:0, a:0, s:1, b:0),
% 7.83/8.21 ==> [14, 2] (w:1, o:0, a:0, s:1, b:0),
% 7.83/8.21 occurrence_of [37, 2] (w:1, o:158, a:1, s:1, b:0),
% 7.83/8.21 atomic [38, 1] (w:1, o:125, a:1, s:1, b:0),
% 7.83/8.21 root [40, 2] (w:1, o:159, a:1, s:1, b:0),
% 7.83/8.21 subactivity_occurrence [41, 2] (w:1, o:161, a:1, s:1, b:0),
% 7.83/8.21 root_occ [47, 2] (w:1, o:160, a:1, s:1, b:0),
% 7.83/8.21 leaf_occ [48, 2] (w:1, o:162, a:1, s:1, b:0),
% 7.83/8.21 min_precedes [49, 3] (w:1, o:183, a:1, s:1, b:0),
% 7.83/8.21 arboreal [54, 1] (w:1, o:126, a:1, s:1, b:0),
% 7.83/8.21 activity [57, 1] (w:1, o:127, a:1, s:1, b:0),
% 7.83/8.21 activity_occurrence [58, 1] (w:1, o:128, a:1, s:1, b:0),
% 7.83/8.21 subactivity [66, 2] (w:1, o:163, a:1, s:1, b:0),
% 9.54/9.92 atocc [67, 2] (w:1, o:164, a:1, s:1, b:0),
% 9.54/9.92 leaf [74, 2] (w:1, o:165, a:1, s:1, b:0),
% 9.54/9.92 legal [92, 1] (w:1, o:129, a:1, s:1, b:0),
% 9.54/9.92 earlier [112, 2] (w:1, o:166, a:1, s:1, b:0),
% 9.54/9.92 precedes [115, 2] (w:1, o:167, a:1, s:1, b:0),
% 9.54/9.92 next_subocc [129, 3] (w:1, o:184, a:1, s:1, b:0),
% 9.54/9.92 tptp0 [154, 0] (w:1, o:115, a:1, s:1, b:0),
% 9.54/9.92 tptp3 [158, 0] (w:1, o:118, a:1, s:1, b:0),
% 9.54/9.92 tptp4 [159, 0] (w:1, o:119, a:1, s:1, b:0),
% 9.54/9.92 tptp2 [160, 0] (w:1, o:117, a:1, s:1, b:0),
% 9.54/9.92 tptp1 [161, 0] (w:1, o:116, a:1, s:1, b:0),
% 9.54/9.92 alpha1 [165, 2] (w:1, o:168, a:1, s:1, b:1),
% 9.54/9.92 alpha2 [166, 2] (w:1, o:169, a:1, s:1, b:1),
% 9.54/9.92 alpha3 [167, 3] (w:1, o:185, a:1, s:1, b:1),
% 9.54/9.92 alpha4 [168, 3] (w:1, o:186, a:1, s:1, b:1),
% 9.54/9.92 alpha5 [169, 3] (w:1, o:187, a:1, s:1, b:1),
% 9.54/9.92 alpha6 [170, 2] (w:1, o:170, a:1, s:1, b:1),
% 9.54/9.92 alpha7 [171, 2] (w:1, o:171, a:1, s:1, b:1),
% 9.54/9.92 alpha8 [172, 2] (w:1, o:172, a:1, s:1, b:1),
% 9.54/9.92 alpha9 [173, 1] (w:1, o:130, a:1, s:1, b:1),
% 9.54/9.92 skol1 [174, 2] (w:1, o:173, a:1, s:1, b:1),
% 9.54/9.92 skol2 [175, 2] (w:1, o:177, a:1, s:1, b:1),
% 9.54/9.92 skol3 [176, 3] (w:1, o:188, a:1, s:1, b:1),
% 9.54/9.92 skol4 [177, 2] (w:1, o:178, a:1, s:1, b:1),
% 9.54/9.92 skol5 [178, 1] (w:1, o:131, a:1, s:1, b:1),
% 9.54/9.92 skol6 [179, 2] (w:1, o:179, a:1, s:1, b:1),
% 9.54/9.92 skol7 [180, 2] (w:1, o:180, a:1, s:1, b:1),
% 9.54/9.92 skol8 [181, 2] (w:1, o:181, a:1, s:1, b:1),
% 9.54/9.92 skol9 [182, 2] (w:1, o:182, a:1, s:1, b:1),
% 9.54/9.92 skol10 [183, 2] (w:1, o:174, a:1, s:1, b:1),
% 9.54/9.92 skol11 [184, 2] (w:1, o:175, a:1, s:1, b:1),
% 9.54/9.92 skol12 [185, 3] (w:1, o:189, a:1, s:1, b:1),
% 9.54/9.92 skol13 [186, 1] (w:1, o:132, a:1, s:1, b:1),
% 9.54/9.92 skol14 [187, 2] (w:1, o:176, a:1, s:1, b:1),
% 9.54/9.92 skol15 [188, 0] (w:1, o:114, a:1, s:1, b:1),
% 9.54/9.92 skol16 [189, 1] (w:1, o:133, a:1, s:1, b:1).
% 9.54/9.92
% 9.54/9.92
% 9.54/9.92 Starting Search:
% 9.54/9.92
% 9.54/9.92 *** allocated 15000 integers for clauses
% 9.54/9.92 *** allocated 22500 integers for clauses
% 9.54/9.92 *** allocated 15000 integers for termspace/termends
% 9.54/9.92 *** allocated 33750 integers for clauses
% 9.54/9.92 *** allocated 50625 integers for clauses
% 9.54/9.92 *** allocated 22500 integers for termspace/termends
% 9.54/9.92 Resimplifying inuse:
% 9.54/9.92 Done
% 9.54/9.92
% 9.54/9.92 *** allocated 75937 integers for clauses
% 9.54/9.92 *** allocated 33750 integers for termspace/termends
% 9.54/9.92 *** allocated 113905 integers for clauses
% 9.54/9.92 *** allocated 50625 integers for termspace/termends
% 9.54/9.92
% 9.54/9.92 Intermediate Status:
% 9.54/9.92 Generated: 6257
% 9.54/9.92 Kept: 2004
% 9.54/9.92 Inuse: 317
% 9.54/9.92 Deleted: 10
% 9.54/9.92 Deletedinuse: 6
% 9.54/9.92
% 9.54/9.92 Resimplifying inuse:
% 9.54/9.92 Done
% 9.54/9.92
% 9.54/9.92 *** allocated 170857 integers for clauses
% 9.54/9.92 Resimplifying inuse:
% 9.54/9.92 Done
% 9.54/9.92
% 9.54/9.92 *** allocated 75937 integers for termspace/termends
% 9.54/9.92 *** allocated 256285 integers for clauses
% 9.54/9.92
% 9.54/9.92 Intermediate Status:
% 9.54/9.92 Generated: 36681
% 9.54/9.92 Kept: 4035
% 9.54/9.92 Inuse: 655
% 9.54/9.92 Deleted: 45
% 9.54/9.92 Deletedinuse: 13
% 9.54/9.92
% 9.54/9.92 Resimplifying inuse:
% 9.54/9.92 Done
% 9.54/9.92
% 9.54/9.92 Resimplifying inuse:
% 9.54/9.92 Done
% 9.54/9.92
% 9.54/9.92 *** allocated 113905 integers for termspace/termends
% 9.54/9.92
% 9.54/9.92 Intermediate Status:
% 9.54/9.92 Generated: 55431
% 9.54/9.92 Kept: 6039
% 9.54/9.92 Inuse: 773
% 9.54/9.92 Deleted: 71
% 9.54/9.92 Deletedinuse: 39
% 9.54/9.92
% 9.54/9.92 Resimplifying inuse:
% 9.54/9.92 Done
% 9.54/9.92
% 9.54/9.92 *** allocated 384427 integers for clauses
% 9.54/9.92 Resimplifying inuse:
% 9.54/9.92 Done
% 9.54/9.92
% 9.54/9.92 *** allocated 170857 integers for termspace/termends
% 9.54/9.92
% 9.54/9.92 Intermediate Status:
% 9.54/9.92 Generated: 83091
% 9.54/9.92 Kept: 8141
% 9.54/9.92 Inuse: 945
% 9.54/9.92 Deleted: 74
% 9.54/9.92 Deletedinuse: 39
% 9.54/9.92
% 9.54/9.92 Resimplifying inuse:
% 9.54/9.92 Done
% 9.54/9.92
% 9.54/9.92 Resimplifying inuse:
% 9.54/9.92 Done
% 9.54/9.92
% 9.54/9.92 *** allocated 576640 integers for clauses
% 9.54/9.92
% 9.54/9.92 Intermediate Status:
% 9.54/9.92 Generated: 194038
% 9.54/9.92 Kept: 10148
% 9.54/9.92 Inuse: 1139
% 9.54/9.92 Deleted: 84
% 9.54/9.92 Deletedinuse: 39
% 9.54/9.92
% 9.54/9.92 Resimplifying inuse:
% 9.54/9.92 Done
% 9.54/9.92
% 9.54/9.92 Resimplifying inuse:
% 9.54/9.92 Done
% 9.54/9.92
% 9.54/9.92
% 9.54/9.92 Intermediate Status:
% 9.54/9.92 Generated: 312895
% 9.54/9.92 Kept: 12161
% 9.54/9.92 Inuse: 1347
% 9.54/9.92 Deleted: 104
% 9.54/9.92 Deletedinuse: 41
% 9.54/9.92
% 9.54/9.92 Resimplifying inuse:
% 9.54/9.92 Done
% 9.54/9.92
% 9.54/9.92 *** allocated 256285 integers for termspace/termends
% 9.54/9.92 *** allocated 864960 integers for clauses
% 9.54/9.92
% 9.54/9.92 Intermediate Status:
% 9.54/9.92 Generated: 334715
% 9.54/9.92 Kept: 14374
% 9.54/9.92 Inuse: 1363
% 9.54/9.92 Deleted: 128
% 9.54/9.92 Deletedinuse: 60
% 9.54/9.92
% 9.54/9.92 Resimplifying inuse:
% 9.54/9.92 Done
% 9.54/9.92
% 9.54/9.92 Resimplifying inuse:
% 9.54/9.92 Done
% 9.54/9.92
% 9.54/9.92
% 9.54/9.92 Intermediate Status:
% 9.54/9.92 Generated: 352367
% 9.54/9.92 Kept: 16572
% 9.54/9.92 Inuse: 1378
% 9.54/9.92 Deleted: 137
% 9.54/9.92 Deletedinuse: 64
% 9.54/9.92
% 9.54/9.92 Resimplifying inuse:
% 9.54/9.92 Done
% 9.54/9.92
% 9.54/9.92 *** allocated 384427 integers for termspace/termends
% 9.54/9.92 Resimplifying inuse:
% 9.54/9.92 Done
% 9.54/9.92
% 9.54/9.92
% 9.54/9.92 Intermediate Status:
% 9.54/9.92 Generated: 387746
% 9.54/9.92 Kept: 18670
% 9.54/9.92 Inuse: 1485
% 9.54/9.92 Deleted: 184
% 9.54/9.92 Deletedinuse: 88
% 9.54/9.92
% 9.54/9.92 Resimplifying inuse:
% 9.54/9.92 Done
% 9.54/9.92
% 9.54/9.92 Resimplifying inuse:
% 9.54/9.92 Done
% 9.54/9.92
% 9.54/9.92 Resimplifying clauses:
% 9.54/9.92 Done
% 9.54/9.92
% 9.54/9.92
% 9.54/9.92 Bliksems!, er is een bewijs:
% 9.54/9.92 % SZS status Theorem
% 9.54/9.92 % SZS output start Refutation
% 9.54/9.92
% 9.54/9.92 (3) {G0,W18,D2,L6,V4,M6} I { ! occurrence_of( T, Z ), !
% 9.54/9.92 subactivity_occurrence( X, T ), ! leaf_occ( Y, T ), ! arboreal( X ),
% 9.54/9.92 min_precedes( X, Y, Z ), Y = X }.
% 9.54/9.92 (15) {G0,W10,D2,L3,V4,M3} I { ! occurrence_of( Z, Y ), ! leaf_occ( X, Z ),
% 9.54/9.92 ! min_precedes( X, T, Y ) }.
% 9.54/9.92 (35) {G0,W7,D2,L3,V2,M3} I { ! occurrence_of( X, Y ), ! atomic( Y ),
% 9.54/9.92 arboreal( X ) }.
% 9.54/9.92 (44) {G0,W9,D3,L2,V2,M2} I { ! root_occ( X, Y ), alpha4( X, Y, skol10( X, Y
% 9.54/9.92 ) ) }.
% 9.54/9.92 (46) {G0,W7,D2,L2,V3,M2} I { ! alpha4( X, Y, Z ), subactivity_occurrence( X
% 9.54/9.92 , Y ) }.
% 9.54/9.92 (59) {G0,W8,D2,L2,V3,M2} I { ! next_subocc( X, Y, Z ), min_precedes( X, Y,
% 9.54/9.92 Z ) }.
% 9.54/9.92 (70) {G0,W7,D3,L2,V1,M2} I { ! occurrence_of( X, tptp0 ), alpha6( X, skol13
% 9.54/9.92 ( X ) ) }.
% 9.54/9.92 (71) {G0,W8,D3,L2,V1,M2} I { ! occurrence_of( X, tptp0 ), alpha7( skol13( X
% 9.54/9.92 ), skol16( X ) ) }.
% 9.54/9.92 (72) {G0,W7,D3,L2,V1,M2} I { ! occurrence_of( X, tptp0 ), alpha8( X, skol16
% 9.54/9.92 ( X ) ) }.
% 9.54/9.92 (73) {G0,W7,D3,L2,V4,M2} I { ! alpha8( X, Y ), alpha9( skol14( Z, T ) ) }.
% 9.54/9.92 (75) {G0,W8,D3,L2,V2,M2} I { ! alpha8( X, Y ), leaf_occ( skol14( X, Y ), X
% 9.54/9.92 ) }.
% 9.54/9.92 (77) {G0,W8,D2,L3,V1,M3} I { ! alpha9( X ), occurrence_of( X, tptp2 ),
% 9.54/9.92 occurrence_of( X, tptp1 ) }.
% 9.54/9.92 (81) {G0,W7,D2,L2,V2,M2} I { ! alpha7( X, Y ), next_subocc( X, Y, tptp0 )
% 9.54/9.92 }.
% 9.54/9.92 (83) {G0,W6,D2,L2,V2,M2} I { ! alpha6( X, Y ), occurrence_of( Y, tptp3 )
% 9.54/9.92 }.
% 9.54/9.92 (84) {G0,W6,D2,L2,V2,M2} I { ! alpha6( X, Y ), root_occ( Y, X ) }.
% 9.54/9.92 (91) {G0,W2,D2,L1,V0,M1} I { atomic( tptp3 ) }.
% 9.54/9.92 (98) {G0,W3,D2,L1,V0,M1} I { occurrence_of( skol15, tptp0 ) }.
% 9.54/9.92 (99) {G0,W16,D2,L5,V2,M5} I { ! occurrence_of( X, tptp3 ), ! root_occ( X,
% 9.54/9.92 skol15 ), ! occurrence_of( Y, tptp2 ), ! min_precedes( X, Y, tptp0 ), !
% 9.54/9.92 leaf_occ( Y, skol15 ) }.
% 9.54/9.92 (100) {G0,W16,D2,L5,V2,M5} I { ! occurrence_of( X, tptp3 ), ! root_occ( X,
% 9.54/9.92 skol15 ), ! occurrence_of( Y, tptp1 ), ! min_precedes( X, Y, tptp0 ), !
% 9.54/9.92 leaf_occ( Y, skol15 ) }.
% 9.54/9.92 (145) {G1,W15,D2,L5,V2,M5} R(3,98) { ! subactivity_occurrence( X, skol15 )
% 9.54/9.92 , ! leaf_occ( Y, skol15 ), ! arboreal( X ), min_precedes( X, Y, tptp0 ),
% 9.54/9.92 Y = X }.
% 9.54/9.92 (450) {G1,W7,D2,L2,V2,M2} R(15,98) { ! leaf_occ( X, skol15 ), !
% 9.54/9.92 min_precedes( X, Y, tptp0 ) }.
% 9.54/9.92 (716) {G1,W5,D2,L2,V2,M2} R(35,83);r(91) { arboreal( X ), ! alpha6( Y, X )
% 9.54/9.92 }.
% 9.54/9.92 (959) {G1,W6,D2,L2,V2,M2} R(46,44) { subactivity_occurrence( X, Y ), !
% 9.54/9.92 root_occ( X, Y ) }.
% 9.54/9.92 (971) {G2,W6,D2,L2,V2,M2} R(959,84) { subactivity_occurrence( X, Y ), !
% 9.54/9.92 alpha6( Y, X ) }.
% 9.54/9.92 (1675) {G1,W4,D3,L1,V0,M1} R(70,98) { alpha6( skol15, skol13( skol15 ) )
% 9.54/9.92 }.
% 9.54/9.92 (1691) {G3,W4,D3,L1,V0,M1} R(1675,971) { subactivity_occurrence( skol13(
% 9.54/9.92 skol15 ), skol15 ) }.
% 9.54/9.92 (1694) {G2,W3,D3,L1,V0,M1} R(1675,716) { arboreal( skol13( skol15 ) ) }.
% 9.54/9.92 (1701) {G2,W4,D3,L1,V0,M1} R(1675,83) { occurrence_of( skol13( skol15 ),
% 9.54/9.92 tptp3 ) }.
% 9.54/9.92 (1702) {G2,W4,D3,L1,V0,M1} R(1675,84) { root_occ( skol13( skol15 ), skol15
% 9.54/9.92 ) }.
% 9.54/9.92 (1726) {G1,W5,D3,L1,V0,M1} R(71,98) { alpha7( skol13( skol15 ), skol16(
% 9.54/9.92 skol15 ) ) }.
% 9.54/9.92 (1752) {G1,W4,D3,L1,V0,M1} R(72,98) { alpha8( skol15, skol16( skol15 ) )
% 9.54/9.92 }.
% 9.54/9.92 (1784) {G2,W4,D3,L1,V2,M1} R(73,1752) { alpha9( skol14( X, Y ) ) }.
% 9.54/9.92 (1855) {G2,W6,D4,L1,V0,M1} R(75,1752) { leaf_occ( skol14( skol15, skol16(
% 9.54/9.92 skol15 ) ), skol15 ) }.
% 9.54/9.92 (2059) {G3,W11,D3,L3,V1,M3} R(99,1702);r(1701) { ! occurrence_of( X, tptp2
% 9.54/9.92 ), ! min_precedes( skol13( skol15 ), X, tptp0 ), ! leaf_occ( X, skol15 )
% 9.54/9.92 }.
% 9.54/9.92 (2109) {G3,W11,D3,L3,V1,M3} R(100,1702);r(1701) { ! occurrence_of( X, tptp1
% 9.54/9.92 ), ! min_precedes( skol13( skol15 ), X, tptp0 ), ! leaf_occ( X, skol15 )
% 9.54/9.92 }.
% 9.54/9.92 (2198) {G2,W6,D3,L1,V0,M1} R(1726,81) { next_subocc( skol13( skol15 ),
% 9.54/9.92 skol16( skol15 ), tptp0 ) }.
% 9.54/9.92 (2351) {G3,W6,D3,L1,V0,M1} R(2198,59) { min_precedes( skol13( skol15 ),
% 9.54/9.92 skol16( skol15 ), tptp0 ) }.
% 9.54/9.92 (3069) {G4,W4,D3,L1,V0,M1} R(450,2351) { ! leaf_occ( skol13( skol15 ),
% 9.54/9.92 skol15 ) }.
% 9.54/9.92 (3082) {G5,W11,D3,L3,V1,M3} P(145,3069);f;r(1691) { ! leaf_occ( X, skol15 )
% 9.54/9.92 , ! arboreal( skol13( skol15 ) ), min_precedes( skol13( skol15 ), X,
% 9.54/9.92 tptp0 ) }.
% 9.54/9.92 (20106) {G6,W8,D3,L2,V1,M2} S(3082);r(1694) { ! leaf_occ( X, skol15 ),
% 9.54/9.92 min_precedes( skol13( skol15 ), X, tptp0 ) }.
% 9.54/9.92 (20108) {G7,W6,D2,L2,V1,M2} S(2109);r(20106) { ! occurrence_of( X, tptp1 )
% 9.54/9.92 , ! leaf_occ( X, skol15 ) }.
% 9.54/9.92 (20110) {G7,W6,D2,L2,V1,M2} S(2059);r(20106) { ! occurrence_of( X, tptp2 )
% 9.54/9.92 , ! leaf_occ( X, skol15 ) }.
% 9.54/9.92 (20157) {G8,W5,D2,L2,V1,M2} R(20108,77);r(20110) { ! leaf_occ( X, skol15 )
% 9.54/9.92 , ! alpha9( X ) }.
% 9.54/9.92 (20200) {G9,W0,D0,L0,V0,M0} R(20157,1855);r(1784) { }.
% 9.54/9.92
% 9.54/9.92
% 9.54/9.92 % SZS output end Refutation
% 9.54/9.92 found a proof!
% 9.54/9.92
% 9.54/9.92
% 9.54/9.92 Unprocessed initial clauses:
% 9.54/9.92
% 9.54/9.92 (20202) {G0,W10,D3,L3,V3,M3} { ! occurrence_of( Y, X ), atomic( X ),
% 9.54/9.92 subactivity_occurrence( skol1( Z, Y ), Y ) }.
% 9.54/9.92 (20203) {G0,W10,D3,L3,V2,M3} { ! occurrence_of( Y, X ), atomic( X ), root
% 9.54/9.92 ( skol1( X, Y ), X ) }.
% 9.54/9.92 (20204) {G0,W23,D2,L7,V5,M7} { ! occurrence_of( T, X ), ! root_occ( U, T )
% 9.54/9.92 , ! leaf_occ( Z, T ), ! subactivity_occurrence( Y, T ), ! min_precedes( U
% 9.54/9.92 , Y, X ), Y = Z, min_precedes( Y, Z, X ) }.
% 9.54/9.92 (20205) {G0,W18,D2,L6,V4,M6} { ! occurrence_of( T, Z ), !
% 9.54/9.92 subactivity_occurrence( X, T ), ! leaf_occ( Y, T ), ! arboreal( X ),
% 9.54/9.92 min_precedes( X, Y, Z ), Y = X }.
% 9.54/9.92 (20206) {G0,W5,D2,L2,V2,M2} { ! occurrence_of( Y, X ), activity( X ) }.
% 9.54/9.92 (20207) {G0,W5,D2,L2,V2,M2} { ! occurrence_of( Y, X ), activity_occurrence
% 9.54/9.92 ( Y ) }.
% 9.54/9.92 (20208) {G0,W24,D2,L8,V4,M8} { ! occurrence_of( T, X ), ! arboreal( Y ), !
% 9.54/9.92 arboreal( Z ), ! subactivity_occurrence( Y, T ), !
% 9.54/9.92 subactivity_occurrence( Z, T ), min_precedes( Y, Z, X ), min_precedes( Z
% 9.54/9.92 , Y, X ), Y = Z }.
% 9.54/9.92 (20209) {G0,W8,D3,L2,V3,M2} { ! root( Y, X ), atocc( Y, skol2( Z, Y ) )
% 9.54/9.92 }.
% 9.54/9.92 (20210) {G0,W8,D3,L2,V2,M2} { ! root( Y, X ), subactivity( skol2( X, Y ),
% 9.54/9.92 X ) }.
% 9.54/9.92 (20211) {G0,W10,D3,L2,V5,M2} { ! min_precedes( Y, Z, X ),
% 9.54/9.92 subactivity_occurrence( Z, skol3( T, U, Z ) ) }.
% 9.54/9.92 (20212) {G0,W10,D3,L2,V4,M2} { ! min_precedes( Y, Z, X ),
% 9.54/9.92 subactivity_occurrence( Y, skol3( T, Y, Z ) ) }.
% 9.54/9.92 (20213) {G0,W10,D3,L2,V3,M2} { ! min_precedes( Y, Z, X ), occurrence_of(
% 9.54/9.92 skol3( X, Y, Z ), X ) }.
% 9.54/9.92 (20214) {G0,W10,D3,L3,V3,M3} { ! leaf( X, Y ), atomic( Y ), occurrence_of
% 9.54/9.92 ( skol4( Z, Y ), Y ) }.
% 9.54/9.92 (20215) {G0,W10,D3,L3,V2,M3} { ! leaf( X, Y ), atomic( Y ), leaf_occ( X,
% 9.54/9.92 skol4( X, Y ) ) }.
% 9.54/9.92 (20216) {G0,W9,D2,L3,V3,M3} { ! occurrence_of( Z, X ), ! occurrence_of( Z
% 9.54/9.92 , Y ), X = Y }.
% 9.54/9.92 (20217) {G0,W10,D2,L3,V4,M3} { ! occurrence_of( Z, Y ), ! leaf_occ( X, Z )
% 9.54/9.92 , ! min_precedes( X, T, Y ) }.
% 9.54/9.92 (20218) {G0,W10,D2,L3,V4,M3} { ! occurrence_of( Z, Y ), ! root_occ( X, Z )
% 9.54/9.92 , ! min_precedes( T, X, Y ) }.
% 9.54/9.92 (20219) {G0,W5,D2,L2,V2,M2} { ! subactivity_occurrence( X, Y ),
% 9.54/9.92 activity_occurrence( X ) }.
% 9.54/9.92 (20220) {G0,W5,D2,L2,V2,M2} { ! subactivity_occurrence( X, Y ),
% 9.54/9.92 activity_occurrence( Y ) }.
% 9.54/9.92 (20221) {G0,W5,D3,L2,V2,M2} { ! activity_occurrence( X ), activity( skol5
% 9.54/9.92 ( Y ) ) }.
% 9.54/9.92 (20222) {G0,W6,D3,L2,V1,M2} { ! activity_occurrence( X ), occurrence_of( X
% 9.54/9.92 , skol5( X ) ) }.
% 9.54/9.92 (20223) {G0,W4,D2,L2,V1,M2} { ! legal( X ), arboreal( X ) }.
% 9.54/9.92 (20224) {G0,W8,D3,L2,V3,M2} { ! atocc( X, Y ), subactivity( Y, skol6( Z, Y
% 9.54/9.92 ) ) }.
% 9.54/9.92 (20225) {G0,W8,D3,L2,V2,M2} { ! atocc( X, Y ), alpha1( X, skol6( X, Y ) )
% 9.54/9.92 }.
% 9.54/9.92 (20226) {G0,W9,D2,L3,V3,M3} { ! subactivity( Y, Z ), ! alpha1( X, Z ),
% 9.54/9.92 atocc( X, Y ) }.
% 9.54/9.92 (20227) {G0,W5,D2,L2,V2,M2} { ! alpha1( X, Y ), atomic( Y ) }.
% 9.54/9.92 (20228) {G0,W6,D2,L2,V2,M2} { ! alpha1( X, Y ), occurrence_of( X, Y ) }.
% 9.54/9.92 (20229) {G0,W8,D2,L3,V2,M3} { ! atomic( Y ), ! occurrence_of( X, Y ),
% 9.54/9.92 alpha1( X, Y ) }.
% 9.54/9.92 (20230) {G0,W6,D2,L2,V2,M2} { ! leaf( X, Y ), alpha2( X, Y ) }.
% 9.54/9.92 (20231) {G0,W7,D2,L2,V3,M2} { ! leaf( X, Y ), ! min_precedes( X, Z, Y )
% 9.54/9.92 }.
% 9.54/9.92 (20232) {G0,W12,D3,L3,V2,M3} { ! alpha2( X, Y ), min_precedes( X, skol7( X
% 9.54/9.92 , Y ), Y ), leaf( X, Y ) }.
% 9.54/9.92 (20233) {G0,W12,D3,L3,V2,M3} { ! alpha2( X, Y ), root( X, Y ),
% 9.54/9.92 min_precedes( skol8( X, Y ), X, Y ) }.
% 9.54/9.92 (20234) {G0,W6,D2,L2,V2,M2} { ! root( X, Y ), alpha2( X, Y ) }.
% 9.54/9.92 (20235) {G0,W7,D2,L2,V3,M2} { ! min_precedes( Z, X, Y ), alpha2( X, Y )
% 9.54/9.92 }.
% 9.54/9.92 (20236) {G0,W7,D2,L3,V2,M3} { ! occurrence_of( X, Y ), ! arboreal( X ),
% 9.54/9.92 atomic( Y ) }.
% 9.54/9.92 (20237) {G0,W7,D2,L3,V2,M3} { ! occurrence_of( X, Y ), ! atomic( Y ),
% 9.54/9.92 arboreal( X ) }.
% 9.54/9.92 (20238) {G0,W5,D2,L2,V2,M2} { ! root( X, Y ), legal( X ) }.
% 9.54/9.92 (20239) {G0,W8,D3,L2,V3,M2} { ! leaf_occ( X, Y ), occurrence_of( Y, skol9
% 9.54/9.92 ( Z, Y ) ) }.
% 9.54/9.92 (20240) {G0,W9,D3,L2,V2,M2} { ! leaf_occ( X, Y ), alpha3( X, Y, skol9( X,
% 9.54/9.92 Y ) ) }.
% 9.54/9.92 (20241) {G0,W10,D2,L3,V3,M3} { ! occurrence_of( Y, Z ), ! alpha3( X, Y, Z
% 9.54/9.92 ), leaf_occ( X, Y ) }.
% 9.54/9.92 (20242) {G0,W7,D2,L2,V3,M2} { ! alpha3( X, Y, Z ), subactivity_occurrence
% 9.54/9.92 ( X, Y ) }.
% 9.54/9.92 (20243) {G0,W7,D2,L2,V3,M2} { ! alpha3( X, Y, Z ), leaf( X, Z ) }.
% 9.54/9.92 (20244) {G0,W10,D2,L3,V3,M3} { ! subactivity_occurrence( X, Y ), ! leaf( X
% 9.54/9.92 , Z ), alpha3( X, Y, Z ) }.
% 9.54/9.92 (20245) {G0,W8,D3,L2,V3,M2} { ! root_occ( X, Y ), occurrence_of( Y, skol10
% 9.54/9.92 ( Z, Y ) ) }.
% 9.54/9.92 (20246) {G0,W9,D3,L2,V2,M2} { ! root_occ( X, Y ), alpha4( X, Y, skol10( X
% 9.54/9.92 , Y ) ) }.
% 9.54/9.92 (20247) {G0,W10,D2,L3,V3,M3} { ! occurrence_of( Y, Z ), ! alpha4( X, Y, Z
% 9.54/9.92 ), root_occ( X, Y ) }.
% 9.54/9.92 (20248) {G0,W7,D2,L2,V3,M2} { ! alpha4( X, Y, Z ), subactivity_occurrence
% 9.54/9.92 ( X, Y ) }.
% 9.54/9.92 (20249) {G0,W7,D2,L2,V3,M2} { ! alpha4( X, Y, Z ), root( X, Z ) }.
% 9.54/9.92 (20250) {G0,W10,D2,L3,V3,M3} { ! subactivity_occurrence( X, Y ), ! root( X
% 9.54/9.92 , Z ), alpha4( X, Y, Z ) }.
% 9.54/9.92 (20251) {G0,W6,D2,L2,V2,M2} { ! earlier( X, Y ), ! earlier( Y, X ) }.
% 9.54/9.92 (20252) {G0,W6,D2,L2,V2,M2} { ! precedes( X, Y ), earlier( X, Y ) }.
% 9.54/9.92 (20253) {G0,W5,D2,L2,V2,M2} { ! precedes( X, Y ), legal( Y ) }.
% 9.54/9.92 (20254) {G0,W8,D2,L3,V2,M3} { ! earlier( X, Y ), ! legal( Y ), precedes( X
% 9.54/9.92 , Y ) }.
% 9.54/9.92 (20255) {G0,W7,D2,L2,V3,M2} { ! min_precedes( Z, X, Y ), ! root( X, Y )
% 9.54/9.92 }.
% 9.54/9.92 (20256) {G0,W9,D3,L2,V4,M2} { ! min_precedes( Z, X, Y ), root( skol11( T,
% 9.54/9.92 Y ), Y ) }.
% 9.54/9.92 (20257) {G0,W10,D3,L2,V3,M2} { ! min_precedes( Z, X, Y ), min_precedes(
% 9.54/9.92 skol11( X, Y ), X, Y ) }.
% 9.54/9.92 (20258) {G0,W7,D2,L2,V3,M2} { ! min_precedes( X, Y, Z ), precedes( X, Y )
% 9.54/9.92 }.
% 9.54/9.92 (20259) {G0,W6,D2,L2,V3,M2} { ! next_subocc( X, Y, Z ), arboreal( X ) }.
% 9.54/9.92 (20260) {G0,W6,D2,L2,V3,M2} { ! next_subocc( X, Y, Z ), arboreal( Y ) }.
% 9.54/9.92 (20261) {G0,W8,D2,L2,V3,M2} { ! next_subocc( X, Y, Z ), min_precedes( X, Y
% 9.54/9.92 , Z ) }.
% 9.54/9.92 (20262) {G0,W8,D2,L2,V3,M2} { ! next_subocc( X, Y, Z ), alpha5( X, Y, Z )
% 9.54/9.92 }.
% 9.54/9.92 (20263) {G0,W12,D2,L3,V3,M3} { ! min_precedes( X, Y, Z ), ! alpha5( X, Y,
% 9.54/9.92 Z ), next_subocc( X, Y, Z ) }.
% 9.54/9.92 (20264) {G0,W12,D2,L3,V4,M3} { ! alpha5( X, Y, Z ), ! min_precedes( X, T,
% 9.54/9.92 Z ), ! min_precedes( T, Y, Z ) }.
% 9.54/9.92 (20265) {G0,W11,D3,L2,V4,M2} { min_precedes( skol12( T, Y, Z ), Y, Z ),
% 9.54/9.92 alpha5( X, Y, Z ) }.
% 9.54/9.92 (20266) {G0,W11,D3,L2,V3,M2} { min_precedes( X, skol12( X, Y, Z ), Z ),
% 9.54/9.92 alpha5( X, Y, Z ) }.
% 9.54/9.92 (20267) {G0,W13,D2,L4,V4,M4} { ! min_precedes( X, Z, T ), ! occurrence_of
% 9.54/9.92 ( Y, T ), ! subactivity_occurrence( Z, Y ), subactivity_occurrence( X, Y
% 9.54/9.92 ) }.
% 9.54/9.92 (20268) {G0,W14,D2,L5,V4,M5} { ! occurrence_of( Z, T ), atomic( T ), !
% 9.54/9.92 leaf_occ( X, Z ), ! leaf_occ( Y, Z ), X = Y }.
% 9.54/9.92 (20269) {G0,W12,D2,L4,V4,M4} { ! occurrence_of( Z, T ), ! root_occ( X, Z )
% 9.54/9.92 , ! root_occ( Y, Z ), X = Y }.
% 9.54/9.92 (20270) {G0,W9,D2,L3,V3,M3} { ! earlier( X, Z ), ! earlier( Z, Y ),
% 9.54/9.92 earlier( X, Y ) }.
% 9.54/9.92 (20271) {G0,W15,D2,L4,V4,M4} { ! min_precedes( T, X, Z ), ! min_precedes(
% 9.54/9.92 T, Y, Z ), ! precedes( X, Y ), min_precedes( X, Y, Z ) }.
% 9.54/9.92 (20272) {G0,W7,D3,L2,V1,M2} { ! occurrence_of( X, tptp0 ), alpha6( X,
% 9.54/9.92 skol13( X ) ) }.
% 9.54/9.92 (20273) {G0,W8,D3,L2,V1,M2} { ! occurrence_of( X, tptp0 ), alpha7( skol13
% 9.54/9.92 ( X ), skol16( X ) ) }.
% 9.54/9.92 (20274) {G0,W7,D3,L2,V1,M2} { ! occurrence_of( X, tptp0 ), alpha8( X,
% 9.54/9.92 skol16( X ) ) }.
% 9.54/9.92 (20275) {G0,W7,D3,L2,V4,M2} { ! alpha8( X, Y ), alpha9( skol14( Z, T ) )
% 9.54/9.92 }.
% 9.54/9.92 (20276) {G0,W9,D3,L2,V3,M2} { ! alpha8( X, Y ), next_subocc( Y, skol14( Z
% 9.54/9.92 , Y ), tptp0 ) }.
% 9.54/9.92 (20277) {G0,W8,D3,L2,V2,M2} { ! alpha8( X, Y ), leaf_occ( skol14( X, Y ),
% 9.54/9.92 X ) }.
% 9.54/9.92 (20278) {G0,W12,D2,L4,V3,M4} { ! alpha9( Z ), ! next_subocc( Y, Z, tptp0 )
% 9.54/9.92 , ! leaf_occ( Z, X ), alpha8( X, Y ) }.
% 9.54/9.92 (20279) {G0,W8,D2,L3,V1,M3} { ! alpha9( X ), occurrence_of( X, tptp2 ),
% 9.54/9.92 occurrence_of( X, tptp1 ) }.
% 9.54/9.92 (20280) {G0,W5,D2,L2,V1,M2} { ! occurrence_of( X, tptp2 ), alpha9( X ) }.
% 9.54/9.92 (20281) {G0,W5,D2,L2,V1,M2} { ! occurrence_of( X, tptp1 ), alpha9( X ) }.
% 9.54/9.92 (20282) {G0,W6,D2,L2,V2,M2} { ! alpha7( X, Y ), occurrence_of( Y, tptp4 )
% 9.54/9.92 }.
% 9.54/9.92 (20283) {G0,W7,D2,L2,V2,M2} { ! alpha7( X, Y ), next_subocc( X, Y, tptp0 )
% 9.54/9.92 }.
% 9.54/9.92 (20284) {G0,W10,D2,L3,V2,M3} { ! occurrence_of( Y, tptp4 ), ! next_subocc
% 9.54/9.92 ( X, Y, tptp0 ), alpha7( X, Y ) }.
% 9.54/9.92 (20285) {G0,W6,D2,L2,V2,M2} { ! alpha6( X, Y ), occurrence_of( Y, tptp3 )
% 9.54/9.92 }.
% 9.54/9.92 (20286) {G0,W6,D2,L2,V2,M2} { ! alpha6( X, Y ), root_occ( Y, X ) }.
% 9.54/9.92 (20287) {G0,W9,D2,L3,V2,M3} { ! occurrence_of( Y, tptp3 ), ! root_occ( Y,
% 9.54/9.92 X ), alpha6( X, Y ) }.
% 9.54/9.92 (20288) {G0,W2,D2,L1,V0,M1} { activity( tptp0 ) }.
% 9.54/9.92 (20289) {G0,W2,D2,L1,V0,M1} { ! atomic( tptp0 ) }.
% 9.54/9.92 (20290) {G0,W2,D2,L1,V0,M1} { atomic( tptp4 ) }.
% 9.54/9.92 (20291) {G0,W2,D2,L1,V0,M1} { atomic( tptp2 ) }.
% 9.54/9.92 (20292) {G0,W2,D2,L1,V0,M1} { atomic( tptp1 ) }.
% 9.54/9.92 (20293) {G0,W2,D2,L1,V0,M1} { atomic( tptp3 ) }.
% 9.54/9.92 (20294) {G0,W3,D2,L1,V0,M1} { ! tptp4 = tptp3 }.
% 9.54/9.92 (20295) {G0,W3,D2,L1,V0,M1} { ! tptp4 = tptp2 }.
% 9.54/9.92 (20296) {G0,W3,D2,L1,V0,M1} { ! tptp4 = tptp1 }.
% 9.54/9.92 (20297) {G0,W3,D2,L1,V0,M1} { ! tptp3 = tptp2 }.
% 9.54/9.92 (20298) {G0,W3,D2,L1,V0,M1} { ! tptp3 = tptp1 }.
% 9.54/9.92 (20299) {G0,W3,D2,L1,V0,M1} { ! tptp2 = tptp1 }.
% 9.54/9.92 (20300) {G0,W3,D2,L1,V0,M1} { occurrence_of( skol15, tptp0 ) }.
% 9.54/9.92 (20301) {G0,W16,D2,L5,V2,M5} { ! occurrence_of( X, tptp3 ), ! root_occ( X
% 9.54/9.92 , skol15 ), ! occurrence_of( Y, tptp2 ), ! min_precedes( X, Y, tptp0 ), !
% 9.54/9.92 leaf_occ( Y, skol15 ) }.
% 9.54/9.92 (20302) {G0,W16,D2,L5,V2,M5} { ! occurrence_of( X, tptp3 ), ! root_occ( X
% 9.54/9.92 , skol15 ), ! occurrence_of( Y, tptp1 ), ! min_precedes( X, Y, tptp0 ), !
% 9.54/9.92 leaf_occ( Y, skol15 ) }.
% 9.54/9.92
% 9.54/9.92
% 9.54/9.92 Total Proof:
% 9.54/9.92
% 9.54/9.92 subsumption: (3) {G0,W18,D2,L6,V4,M6} I { ! occurrence_of( T, Z ), !
% 9.54/9.92 subactivity_occurrence( X, T ), ! leaf_occ( Y, T ), ! arboreal( X ),
% 9.54/9.92 min_precedes( X, Y, Z ), Y = X }.
% 9.54/9.92 parent0: (20205) {G0,W18,D2,L6,V4,M6} { ! occurrence_of( T, Z ), !
% 9.54/9.92 subactivity_occurrence( X, T ), ! leaf_occ( Y, T ), ! arboreal( X ),
% 9.54/9.92 min_precedes( X, Y, Z ), Y = X }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 Z := Z
% 9.54/9.92 T := T
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 1 ==> 1
% 9.54/9.92 2 ==> 2
% 9.54/9.92 3 ==> 3
% 9.54/9.92 4 ==> 4
% 9.54/9.92 5 ==> 5
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (15) {G0,W10,D2,L3,V4,M3} I { ! occurrence_of( Z, Y ), !
% 9.54/9.92 leaf_occ( X, Z ), ! min_precedes( X, T, Y ) }.
% 9.54/9.92 parent0: (20217) {G0,W10,D2,L3,V4,M3} { ! occurrence_of( Z, Y ), !
% 9.54/9.92 leaf_occ( X, Z ), ! min_precedes( X, T, Y ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 Z := Z
% 9.54/9.92 T := T
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 1 ==> 1
% 9.54/9.92 2 ==> 2
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (35) {G0,W7,D2,L3,V2,M3} I { ! occurrence_of( X, Y ), ! atomic
% 9.54/9.92 ( Y ), arboreal( X ) }.
% 9.54/9.92 parent0: (20237) {G0,W7,D2,L3,V2,M3} { ! occurrence_of( X, Y ), ! atomic(
% 9.54/9.92 Y ), arboreal( X ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 1 ==> 1
% 9.54/9.92 2 ==> 2
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (44) {G0,W9,D3,L2,V2,M2} I { ! root_occ( X, Y ), alpha4( X, Y
% 9.54/9.92 , skol10( X, Y ) ) }.
% 9.54/9.92 parent0: (20246) {G0,W9,D3,L2,V2,M2} { ! root_occ( X, Y ), alpha4( X, Y,
% 9.54/9.92 skol10( X, Y ) ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 1 ==> 1
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (46) {G0,W7,D2,L2,V3,M2} I { ! alpha4( X, Y, Z ),
% 9.54/9.92 subactivity_occurrence( X, Y ) }.
% 9.54/9.92 parent0: (20248) {G0,W7,D2,L2,V3,M2} { ! alpha4( X, Y, Z ),
% 9.54/9.92 subactivity_occurrence( X, Y ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 Z := Z
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 1 ==> 1
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (59) {G0,W8,D2,L2,V3,M2} I { ! next_subocc( X, Y, Z ),
% 9.54/9.92 min_precedes( X, Y, Z ) }.
% 9.54/9.92 parent0: (20261) {G0,W8,D2,L2,V3,M2} { ! next_subocc( X, Y, Z ),
% 9.54/9.92 min_precedes( X, Y, Z ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 Z := Z
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 1 ==> 1
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (70) {G0,W7,D3,L2,V1,M2} I { ! occurrence_of( X, tptp0 ),
% 9.54/9.92 alpha6( X, skol13( X ) ) }.
% 9.54/9.92 parent0: (20272) {G0,W7,D3,L2,V1,M2} { ! occurrence_of( X, tptp0 ), alpha6
% 9.54/9.92 ( X, skol13( X ) ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 1 ==> 1
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (71) {G0,W8,D3,L2,V1,M2} I { ! occurrence_of( X, tptp0 ),
% 9.54/9.92 alpha7( skol13( X ), skol16( X ) ) }.
% 9.54/9.92 parent0: (20273) {G0,W8,D3,L2,V1,M2} { ! occurrence_of( X, tptp0 ), alpha7
% 9.54/9.92 ( skol13( X ), skol16( X ) ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 1 ==> 1
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (72) {G0,W7,D3,L2,V1,M2} I { ! occurrence_of( X, tptp0 ),
% 9.54/9.92 alpha8( X, skol16( X ) ) }.
% 9.54/9.92 parent0: (20274) {G0,W7,D3,L2,V1,M2} { ! occurrence_of( X, tptp0 ), alpha8
% 9.54/9.92 ( X, skol16( X ) ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 1 ==> 1
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (73) {G0,W7,D3,L2,V4,M2} I { ! alpha8( X, Y ), alpha9( skol14
% 9.54/9.92 ( Z, T ) ) }.
% 9.54/9.92 parent0: (20275) {G0,W7,D3,L2,V4,M2} { ! alpha8( X, Y ), alpha9( skol14( Z
% 9.54/9.92 , T ) ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 Z := Z
% 9.54/9.92 T := T
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 1 ==> 1
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (75) {G0,W8,D3,L2,V2,M2} I { ! alpha8( X, Y ), leaf_occ(
% 9.54/9.92 skol14( X, Y ), X ) }.
% 9.54/9.92 parent0: (20277) {G0,W8,D3,L2,V2,M2} { ! alpha8( X, Y ), leaf_occ( skol14
% 9.54/9.92 ( X, Y ), X ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 1 ==> 1
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (77) {G0,W8,D2,L3,V1,M3} I { ! alpha9( X ), occurrence_of( X,
% 9.54/9.92 tptp2 ), occurrence_of( X, tptp1 ) }.
% 9.54/9.92 parent0: (20279) {G0,W8,D2,L3,V1,M3} { ! alpha9( X ), occurrence_of( X,
% 9.54/9.92 tptp2 ), occurrence_of( X, tptp1 ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 1 ==> 1
% 9.54/9.92 2 ==> 2
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (81) {G0,W7,D2,L2,V2,M2} I { ! alpha7( X, Y ), next_subocc( X
% 9.54/9.92 , Y, tptp0 ) }.
% 9.54/9.92 parent0: (20283) {G0,W7,D2,L2,V2,M2} { ! alpha7( X, Y ), next_subocc( X, Y
% 9.54/9.92 , tptp0 ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 1 ==> 1
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (83) {G0,W6,D2,L2,V2,M2} I { ! alpha6( X, Y ), occurrence_of(
% 9.54/9.92 Y, tptp3 ) }.
% 9.54/9.92 parent0: (20285) {G0,W6,D2,L2,V2,M2} { ! alpha6( X, Y ), occurrence_of( Y
% 9.54/9.92 , tptp3 ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 1 ==> 1
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (84) {G0,W6,D2,L2,V2,M2} I { ! alpha6( X, Y ), root_occ( Y, X
% 9.54/9.92 ) }.
% 9.54/9.92 parent0: (20286) {G0,W6,D2,L2,V2,M2} { ! alpha6( X, Y ), root_occ( Y, X )
% 9.54/9.92 }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 1 ==> 1
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (91) {G0,W2,D2,L1,V0,M1} I { atomic( tptp3 ) }.
% 9.54/9.92 parent0: (20293) {G0,W2,D2,L1,V0,M1} { atomic( tptp3 ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (98) {G0,W3,D2,L1,V0,M1} I { occurrence_of( skol15, tptp0 )
% 9.54/9.92 }.
% 9.54/9.92 parent0: (20300) {G0,W3,D2,L1,V0,M1} { occurrence_of( skol15, tptp0 ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (99) {G0,W16,D2,L5,V2,M5} I { ! occurrence_of( X, tptp3 ), !
% 9.54/9.92 root_occ( X, skol15 ), ! occurrence_of( Y, tptp2 ), ! min_precedes( X, Y
% 9.54/9.92 , tptp0 ), ! leaf_occ( Y, skol15 ) }.
% 9.54/9.92 parent0: (20301) {G0,W16,D2,L5,V2,M5} { ! occurrence_of( X, tptp3 ), !
% 9.54/9.92 root_occ( X, skol15 ), ! occurrence_of( Y, tptp2 ), ! min_precedes( X, Y
% 9.54/9.92 , tptp0 ), ! leaf_occ( Y, skol15 ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 1 ==> 1
% 9.54/9.92 2 ==> 2
% 9.54/9.92 3 ==> 3
% 9.54/9.92 4 ==> 4
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (100) {G0,W16,D2,L5,V2,M5} I { ! occurrence_of( X, tptp3 ), !
% 9.54/9.92 root_occ( X, skol15 ), ! occurrence_of( Y, tptp1 ), ! min_precedes( X, Y
% 9.54/9.92 , tptp0 ), ! leaf_occ( Y, skol15 ) }.
% 9.54/9.92 parent0: (20302) {G0,W16,D2,L5,V2,M5} { ! occurrence_of( X, tptp3 ), !
% 9.54/9.92 root_occ( X, skol15 ), ! occurrence_of( Y, tptp1 ), ! min_precedes( X, Y
% 9.54/9.92 , tptp0 ), ! leaf_occ( Y, skol15 ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 1 ==> 1
% 9.54/9.92 2 ==> 2
% 9.54/9.92 3 ==> 3
% 9.54/9.92 4 ==> 4
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 eqswap: (20564) {G0,W18,D2,L6,V4,M6} { Y = X, ! occurrence_of( Z, T ), !
% 9.54/9.92 subactivity_occurrence( Y, Z ), ! leaf_occ( X, Z ), ! arboreal( Y ),
% 9.54/9.92 min_precedes( Y, X, T ) }.
% 9.54/9.92 parent0[5]: (3) {G0,W18,D2,L6,V4,M6} I { ! occurrence_of( T, Z ), !
% 9.54/9.92 subactivity_occurrence( X, T ), ! leaf_occ( Y, T ), ! arboreal( X ),
% 9.54/9.92 min_precedes( X, Y, Z ), Y = X }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := Y
% 9.54/9.92 Y := X
% 9.54/9.92 Z := T
% 9.54/9.92 T := Z
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 resolution: (20565) {G1,W15,D2,L5,V2,M5} { X = Y, ! subactivity_occurrence
% 9.54/9.92 ( X, skol15 ), ! leaf_occ( Y, skol15 ), ! arboreal( X ), min_precedes( X
% 9.54/9.92 , Y, tptp0 ) }.
% 9.54/9.92 parent0[1]: (20564) {G0,W18,D2,L6,V4,M6} { Y = X, ! occurrence_of( Z, T )
% 9.54/9.92 , ! subactivity_occurrence( Y, Z ), ! leaf_occ( X, Z ), ! arboreal( Y ),
% 9.54/9.92 min_precedes( Y, X, T ) }.
% 9.54/9.92 parent1[0]: (98) {G0,W3,D2,L1,V0,M1} I { occurrence_of( skol15, tptp0 ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := Y
% 9.54/9.92 Y := X
% 9.54/9.92 Z := skol15
% 9.54/9.92 T := tptp0
% 9.54/9.92 end
% 9.54/9.92 substitution1:
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 eqswap: (20566) {G1,W15,D2,L5,V2,M5} { Y = X, ! subactivity_occurrence( X
% 9.54/9.92 , skol15 ), ! leaf_occ( Y, skol15 ), ! arboreal( X ), min_precedes( X, Y
% 9.54/9.92 , tptp0 ) }.
% 9.54/9.92 parent0[0]: (20565) {G1,W15,D2,L5,V2,M5} { X = Y, ! subactivity_occurrence
% 9.54/9.92 ( X, skol15 ), ! leaf_occ( Y, skol15 ), ! arboreal( X ), min_precedes( X
% 9.54/9.92 , Y, tptp0 ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (145) {G1,W15,D2,L5,V2,M5} R(3,98) { ! subactivity_occurrence
% 9.54/9.92 ( X, skol15 ), ! leaf_occ( Y, skol15 ), ! arboreal( X ), min_precedes( X
% 9.54/9.92 , Y, tptp0 ), Y = X }.
% 9.54/9.92 parent0: (20566) {G1,W15,D2,L5,V2,M5} { Y = X, ! subactivity_occurrence( X
% 9.54/9.92 , skol15 ), ! leaf_occ( Y, skol15 ), ! arboreal( X ), min_precedes( X, Y
% 9.54/9.92 , tptp0 ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 4
% 9.54/9.92 1 ==> 0
% 9.54/9.92 2 ==> 1
% 9.54/9.92 3 ==> 2
% 9.54/9.92 4 ==> 3
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 resolution: (20567) {G1,W7,D2,L2,V2,M2} { ! leaf_occ( X, skol15 ), !
% 9.54/9.92 min_precedes( X, Y, tptp0 ) }.
% 9.54/9.92 parent0[0]: (15) {G0,W10,D2,L3,V4,M3} I { ! occurrence_of( Z, Y ), !
% 9.54/9.92 leaf_occ( X, Z ), ! min_precedes( X, T, Y ) }.
% 9.54/9.92 parent1[0]: (98) {G0,W3,D2,L1,V0,M1} I { occurrence_of( skol15, tptp0 ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := tptp0
% 9.54/9.92 Z := skol15
% 9.54/9.92 T := Y
% 9.54/9.92 end
% 9.54/9.92 substitution1:
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (450) {G1,W7,D2,L2,V2,M2} R(15,98) { ! leaf_occ( X, skol15 ),
% 9.54/9.92 ! min_precedes( X, Y, tptp0 ) }.
% 9.54/9.92 parent0: (20567) {G1,W7,D2,L2,V2,M2} { ! leaf_occ( X, skol15 ), !
% 9.54/9.92 min_precedes( X, Y, tptp0 ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 1 ==> 1
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 resolution: (20568) {G1,W7,D2,L3,V2,M3} { ! atomic( tptp3 ), arboreal( X )
% 9.54/9.92 , ! alpha6( Y, X ) }.
% 9.54/9.92 parent0[0]: (35) {G0,W7,D2,L3,V2,M3} I { ! occurrence_of( X, Y ), ! atomic
% 9.54/9.92 ( Y ), arboreal( X ) }.
% 9.54/9.92 parent1[1]: (83) {G0,W6,D2,L2,V2,M2} I { ! alpha6( X, Y ), occurrence_of( Y
% 9.54/9.92 , tptp3 ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := tptp3
% 9.54/9.92 end
% 9.54/9.92 substitution1:
% 9.54/9.92 X := Y
% 9.54/9.92 Y := X
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 resolution: (20569) {G1,W5,D2,L2,V2,M2} { arboreal( X ), ! alpha6( Y, X )
% 9.54/9.92 }.
% 9.54/9.92 parent0[0]: (20568) {G1,W7,D2,L3,V2,M3} { ! atomic( tptp3 ), arboreal( X )
% 9.54/9.92 , ! alpha6( Y, X ) }.
% 9.54/9.92 parent1[0]: (91) {G0,W2,D2,L1,V0,M1} I { atomic( tptp3 ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 end
% 9.54/9.92 substitution1:
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (716) {G1,W5,D2,L2,V2,M2} R(35,83);r(91) { arboreal( X ), !
% 9.54/9.92 alpha6( Y, X ) }.
% 9.54/9.92 parent0: (20569) {G1,W5,D2,L2,V2,M2} { arboreal( X ), ! alpha6( Y, X ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 1 ==> 1
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 resolution: (20570) {G1,W6,D2,L2,V2,M2} { subactivity_occurrence( X, Y ),
% 9.54/9.92 ! root_occ( X, Y ) }.
% 9.54/9.92 parent0[0]: (46) {G0,W7,D2,L2,V3,M2} I { ! alpha4( X, Y, Z ),
% 9.54/9.92 subactivity_occurrence( X, Y ) }.
% 9.54/9.92 parent1[1]: (44) {G0,W9,D3,L2,V2,M2} I { ! root_occ( X, Y ), alpha4( X, Y,
% 9.54/9.92 skol10( X, Y ) ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 Z := skol10( X, Y )
% 9.54/9.92 end
% 9.54/9.92 substitution1:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (959) {G1,W6,D2,L2,V2,M2} R(46,44) { subactivity_occurrence( X
% 9.54/9.92 , Y ), ! root_occ( X, Y ) }.
% 9.54/9.92 parent0: (20570) {G1,W6,D2,L2,V2,M2} { subactivity_occurrence( X, Y ), !
% 9.54/9.92 root_occ( X, Y ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 1 ==> 1
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 resolution: (20571) {G1,W6,D2,L2,V2,M2} { subactivity_occurrence( X, Y ),
% 9.54/9.92 ! alpha6( Y, X ) }.
% 9.54/9.92 parent0[1]: (959) {G1,W6,D2,L2,V2,M2} R(46,44) { subactivity_occurrence( X
% 9.54/9.92 , Y ), ! root_occ( X, Y ) }.
% 9.54/9.92 parent1[1]: (84) {G0,W6,D2,L2,V2,M2} I { ! alpha6( X, Y ), root_occ( Y, X )
% 9.54/9.92 }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 end
% 9.54/9.92 substitution1:
% 9.54/9.92 X := Y
% 9.54/9.92 Y := X
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (971) {G2,W6,D2,L2,V2,M2} R(959,84) { subactivity_occurrence(
% 9.54/9.92 X, Y ), ! alpha6( Y, X ) }.
% 9.54/9.92 parent0: (20571) {G1,W6,D2,L2,V2,M2} { subactivity_occurrence( X, Y ), !
% 9.54/9.92 alpha6( Y, X ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 1 ==> 1
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 resolution: (20572) {G1,W4,D3,L1,V0,M1} { alpha6( skol15, skol13( skol15 )
% 9.54/9.92 ) }.
% 9.54/9.92 parent0[0]: (70) {G0,W7,D3,L2,V1,M2} I { ! occurrence_of( X, tptp0 ),
% 9.54/9.92 alpha6( X, skol13( X ) ) }.
% 9.54/9.92 parent1[0]: (98) {G0,W3,D2,L1,V0,M1} I { occurrence_of( skol15, tptp0 ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := skol15
% 9.54/9.92 end
% 9.54/9.92 substitution1:
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (1675) {G1,W4,D3,L1,V0,M1} R(70,98) { alpha6( skol15, skol13(
% 9.54/9.92 skol15 ) ) }.
% 9.54/9.92 parent0: (20572) {G1,W4,D3,L1,V0,M1} { alpha6( skol15, skol13( skol15 ) )
% 9.54/9.92 }.
% 9.54/9.92 substitution0:
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 resolution: (20573) {G2,W4,D3,L1,V0,M1} { subactivity_occurrence( skol13(
% 9.54/9.92 skol15 ), skol15 ) }.
% 9.54/9.92 parent0[1]: (971) {G2,W6,D2,L2,V2,M2} R(959,84) { subactivity_occurrence( X
% 9.54/9.92 , Y ), ! alpha6( Y, X ) }.
% 9.54/9.92 parent1[0]: (1675) {G1,W4,D3,L1,V0,M1} R(70,98) { alpha6( skol15, skol13(
% 9.54/9.92 skol15 ) ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := skol13( skol15 )
% 9.54/9.92 Y := skol15
% 9.54/9.92 end
% 9.54/9.92 substitution1:
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (1691) {G3,W4,D3,L1,V0,M1} R(1675,971) {
% 9.54/9.92 subactivity_occurrence( skol13( skol15 ), skol15 ) }.
% 9.54/9.92 parent0: (20573) {G2,W4,D3,L1,V0,M1} { subactivity_occurrence( skol13(
% 9.54/9.92 skol15 ), skol15 ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 resolution: (20574) {G2,W3,D3,L1,V0,M1} { arboreal( skol13( skol15 ) ) }.
% 9.54/9.92 parent0[1]: (716) {G1,W5,D2,L2,V2,M2} R(35,83);r(91) { arboreal( X ), !
% 9.54/9.92 alpha6( Y, X ) }.
% 9.54/9.92 parent1[0]: (1675) {G1,W4,D3,L1,V0,M1} R(70,98) { alpha6( skol15, skol13(
% 9.54/9.92 skol15 ) ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := skol13( skol15 )
% 9.54/9.92 Y := skol15
% 9.54/9.92 end
% 9.54/9.92 substitution1:
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (1694) {G2,W3,D3,L1,V0,M1} R(1675,716) { arboreal( skol13(
% 9.54/9.92 skol15 ) ) }.
% 9.54/9.92 parent0: (20574) {G2,W3,D3,L1,V0,M1} { arboreal( skol13( skol15 ) ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 resolution: (20575) {G1,W4,D3,L1,V0,M1} { occurrence_of( skol13( skol15 )
% 9.54/9.92 , tptp3 ) }.
% 9.54/9.92 parent0[0]: (83) {G0,W6,D2,L2,V2,M2} I { ! alpha6( X, Y ), occurrence_of( Y
% 9.54/9.92 , tptp3 ) }.
% 9.54/9.92 parent1[0]: (1675) {G1,W4,D3,L1,V0,M1} R(70,98) { alpha6( skol15, skol13(
% 9.54/9.92 skol15 ) ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := skol15
% 9.54/9.92 Y := skol13( skol15 )
% 9.54/9.92 end
% 9.54/9.92 substitution1:
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (1701) {G2,W4,D3,L1,V0,M1} R(1675,83) { occurrence_of( skol13
% 9.54/9.92 ( skol15 ), tptp3 ) }.
% 9.54/9.92 parent0: (20575) {G1,W4,D3,L1,V0,M1} { occurrence_of( skol13( skol15 ),
% 9.54/9.92 tptp3 ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 resolution: (20576) {G1,W4,D3,L1,V0,M1} { root_occ( skol13( skol15 ),
% 9.54/9.92 skol15 ) }.
% 9.54/9.92 parent0[0]: (84) {G0,W6,D2,L2,V2,M2} I { ! alpha6( X, Y ), root_occ( Y, X )
% 9.54/9.92 }.
% 9.54/9.92 parent1[0]: (1675) {G1,W4,D3,L1,V0,M1} R(70,98) { alpha6( skol15, skol13(
% 9.54/9.92 skol15 ) ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := skol15
% 9.54/9.92 Y := skol13( skol15 )
% 9.54/9.92 end
% 9.54/9.92 substitution1:
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (1702) {G2,W4,D3,L1,V0,M1} R(1675,84) { root_occ( skol13(
% 9.54/9.92 skol15 ), skol15 ) }.
% 9.54/9.92 parent0: (20576) {G1,W4,D3,L1,V0,M1} { root_occ( skol13( skol15 ), skol15
% 9.54/9.92 ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 resolution: (20577) {G1,W5,D3,L1,V0,M1} { alpha7( skol13( skol15 ), skol16
% 9.54/9.92 ( skol15 ) ) }.
% 9.54/9.92 parent0[0]: (71) {G0,W8,D3,L2,V1,M2} I { ! occurrence_of( X, tptp0 ),
% 9.54/9.92 alpha7( skol13( X ), skol16( X ) ) }.
% 9.54/9.92 parent1[0]: (98) {G0,W3,D2,L1,V0,M1} I { occurrence_of( skol15, tptp0 ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := skol15
% 9.54/9.92 end
% 9.54/9.92 substitution1:
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (1726) {G1,W5,D3,L1,V0,M1} R(71,98) { alpha7( skol13( skol15 )
% 9.54/9.92 , skol16( skol15 ) ) }.
% 9.54/9.92 parent0: (20577) {G1,W5,D3,L1,V0,M1} { alpha7( skol13( skol15 ), skol16(
% 9.54/9.92 skol15 ) ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 resolution: (20578) {G1,W4,D3,L1,V0,M1} { alpha8( skol15, skol16( skol15 )
% 9.54/9.92 ) }.
% 9.54/9.92 parent0[0]: (72) {G0,W7,D3,L2,V1,M2} I { ! occurrence_of( X, tptp0 ),
% 9.54/9.92 alpha8( X, skol16( X ) ) }.
% 9.54/9.92 parent1[0]: (98) {G0,W3,D2,L1,V0,M1} I { occurrence_of( skol15, tptp0 ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := skol15
% 9.54/9.92 end
% 9.54/9.92 substitution1:
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (1752) {G1,W4,D3,L1,V0,M1} R(72,98) { alpha8( skol15, skol16(
% 9.54/9.92 skol15 ) ) }.
% 9.54/9.92 parent0: (20578) {G1,W4,D3,L1,V0,M1} { alpha8( skol15, skol16( skol15 ) )
% 9.54/9.92 }.
% 9.54/9.92 substitution0:
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 resolution: (20579) {G1,W4,D3,L1,V2,M1} { alpha9( skol14( X, Y ) ) }.
% 9.54/9.92 parent0[0]: (73) {G0,W7,D3,L2,V4,M2} I { ! alpha8( X, Y ), alpha9( skol14(
% 9.54/9.92 Z, T ) ) }.
% 9.54/9.92 parent1[0]: (1752) {G1,W4,D3,L1,V0,M1} R(72,98) { alpha8( skol15, skol16(
% 9.54/9.92 skol15 ) ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := skol15
% 9.54/9.92 Y := skol16( skol15 )
% 9.54/9.92 Z := X
% 9.54/9.92 T := Y
% 9.54/9.92 end
% 9.54/9.92 substitution1:
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (1784) {G2,W4,D3,L1,V2,M1} R(73,1752) { alpha9( skol14( X, Y )
% 9.54/9.92 ) }.
% 9.54/9.92 parent0: (20579) {G1,W4,D3,L1,V2,M1} { alpha9( skol14( X, Y ) ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := X
% 9.54/9.92 Y := Y
% 9.54/9.92 end
% 9.54/9.92 permutation0:
% 9.54/9.92 0 ==> 0
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 resolution: (20580) {G1,W6,D4,L1,V0,M1} { leaf_occ( skol14( skol15, skol16
% 9.54/9.92 ( skol15 ) ), skol15 ) }.
% 9.54/9.92 parent0[0]: (75) {G0,W8,D3,L2,V2,M2} I { ! alpha8( X, Y ), leaf_occ( skol14
% 9.54/9.92 ( X, Y ), X ) }.
% 9.54/9.92 parent1[0]: (1752) {G1,W4,D3,L1,V0,M1} R(72,98) { alpha8( skol15, skol16(
% 9.54/9.92 skol15 ) ) }.
% 9.54/9.92 substitution0:
% 9.54/9.92 X := skol15
% 9.54/9.92 Y := skol16( skol15 )
% 9.54/9.92 end
% 9.54/9.92 substitution1:
% 9.54/9.92 end
% 9.54/9.92
% 9.54/9.92 subsumption: (1855) {G2,W6,D4,L1,V0,M1} R(75,1752) { leaf_occ( skol14(
% 9.54/9.92 skol15, skol16( skol15 ) ), skol15 ) }.
% 9.54/9.92 parent0: (20580) {G1,W6,D4,L1,V0,M1} { leaf_occ( skol14( skol15, skol16(
% 9.54/9.92 skol15 ) ), skol15 ) }.
% 9.54/9.92 substitution0:
% 9.54/9.93 end
% 9.54/9.93 permutation0:
% 9.54/9.93 0 ==> 0
% 9.54/9.93 end
% 9.54/9.93
% 9.54/9.93 resolution: (20581) {G1,W15,D3,L4,V1,M4} { ! occurrence_of( skol13( skol15
% 9.54/9.93 ), tptp3 ), ! occurrence_of( X, tptp2 ), ! min_precedes( skol13( skol15
% 9.54/9.93 ), X, tptp0 ), ! leaf_occ( X, skol15 ) }.
% 9.54/9.93 parent0[1]: (99) {G0,W16,D2,L5,V2,M5} I { ! occurrence_of( X, tptp3 ), !
% 9.54/9.93 root_occ( X, skol15 ), ! occurrence_of( Y, tptp2 ), ! min_precedes( X, Y
% 9.54/9.93 , tptp0 ), ! leaf_occ( Y, skol15 ) }.
% 9.54/9.93 parent1[0]: (1702) {G2,W4,D3,L1,V0,M1} R(1675,84) { root_occ( skol13(
% 9.54/9.93 skol15 ), skol15 ) }.
% 9.54/9.93 substitution0:
% 9.54/9.93 X := skol13( skol15 )
% 9.54/9.93 Y := X
% 9.54/9.93 end
% 9.54/9.93 substitution1:
% 9.54/9.93 end
% 9.54/9.93
% 9.54/9.93 resolution: (20582) {G2,W11,D3,L3,V1,M3} { ! occurrence_of( X, tptp2 ), !
% 9.54/9.93 min_precedes( skol13( skol15 ), X, tptp0 ), ! leaf_occ( X, skol15 ) }.
% 9.54/9.93 parent0[0]: (20581) {G1,W15,D3,L4,V1,M4} { ! occurrence_of( skol13( skol15
% 9.54/9.93 ), tptp3 ), ! occurrence_of( X, tptp2 ), ! min_precedes( skol13( skol15
% 9.54/9.93 ), X, tptp0 ), ! leaf_occ( X, skol15 ) }.
% 9.54/9.93 parent1[0]: (1701) {G2,W4,D3,L1,V0,M1} R(1675,83) { occurrence_of( skol13(
% 9.54/9.93 skol15 ), tptp3 ) }.
% 9.54/9.93 substitution0:
% 9.54/9.93 X := X
% 9.54/9.93 end
% 9.54/9.93 substitution1:
% 9.54/9.93 end
% 9.54/9.93
% 9.54/9.93 subsumption: (2059) {G3,W11,D3,L3,V1,M3} R(99,1702);r(1701) { !
% 9.54/9.93 occurrence_of( X, tptp2 ), ! min_precedes( skol13( skol15 ), X, tptp0 ),
% 9.54/9.93 ! leaf_occ( X, skol15 ) }.
% 9.54/9.93 parent0: (20582) {G2,W11,D3,L3,V1,M3} { ! occurrence_of( X, tptp2 ), !
% 9.54/9.93 min_precedes( skol13( skol15 ), X, tptp0 ), ! leaf_occ( X, skol15 ) }.
% 9.54/9.93 substitution0:
% 9.54/9.93 X := X
% 9.54/9.93 end
% 9.54/9.93 permutation0:
% 9.54/9.93 0 ==> 0
% 9.54/9.93 1 ==> 1
% 9.54/9.93 2 ==> 2
% 9.54/9.93 end
% 9.54/9.93
% 9.54/9.93 resolution: (20583) {G1,W15,D3,L4,V1,M4} { ! occurrence_of( skol13( skol15
% 9.54/9.93 ), tptp3 ), ! occurrence_of( X, tptp1 ), ! min_precedes( skol13( skol15
% 9.54/9.93 ), X, tptp0 ), ! leaf_occ( X, skol15 ) }.
% 9.54/9.93 parent0[1]: (100) {G0,W16,D2,L5,V2,M5} I { ! occurrence_of( X, tptp3 ), !
% 9.54/9.93 root_occ( X, skol15 ), ! occurrence_of( Y, tptp1 ), ! min_precedes( X, Y
% 9.54/9.93 , tptp0 ), ! leaf_occ( Y, skol15 ) }.
% 9.54/9.93 parent1[0]: (1702) {G2,W4,D3,L1,V0,M1} R(1675,84) { root_occ( skol13(
% 9.54/9.93 skol15 ), skol15 ) }.
% 9.54/9.93 substitution0:
% 9.54/9.93 X := skol13( skol15 )
% 9.54/9.93 Y := X
% 9.54/9.93 end
% 9.54/9.93 substitution1:
% 9.54/9.93 end
% 9.54/9.93
% 9.54/9.93 resolution: (20584) {G2,W11,D3,L3,V1,M3} { ! occurrence_of( X, tptp1 ), !
% 9.54/9.93 min_precedes( skol13( skol15 ), X, tptp0 ), ! leaf_occ( X, skol15 ) }.
% 9.54/9.93 parent0[0]: (20583) {G1,W15,D3,L4,V1,M4} { ! occurrence_of( skol13( skol15
% 9.54/9.93 ), tptp3 ), ! occurrence_of( X, tptp1 ), ! min_precedes( skol13( skol15
% 9.54/9.93 ), X, tptp0 ), ! leaf_occ( X, skol15 ) }.
% 9.54/9.93 parent1[0]: (1701) {G2,W4,D3,L1,V0,M1} R(1675,83) { occurrence_of( skol13(
% 9.54/9.93 skol15 ), tptp3 ) }.
% 9.54/9.93 substitution0:
% 9.54/9.93 X := X
% 9.54/9.93 end
% 9.54/9.93 substitution1:
% 9.54/9.93 end
% 9.54/9.93
% 9.54/9.93 subsumption: (2109) {G3,W11,D3,L3,V1,M3} R(100,1702);r(1701) { !
% 9.54/9.93 occurrence_of( X, tptp1 ), ! min_precedes( skol13( skol15 ), X, tptp0 ),
% 9.54/9.93 ! leaf_occ( X, skol15 ) }.
% 9.54/9.93 parent0: (20584) {G2,W11,D3,L3,V1,M3} { ! occurrence_of( X, tptp1 ), !
% 9.54/9.93 min_precedes( skol13( skol15 ), X, tptp0 ), ! leaf_occ( X, skol15 ) }.
% 9.54/9.93 substitution0:
% 9.54/9.93 X := X
% 9.54/9.93 end
% 9.54/9.93 permutation0:
% 9.54/9.93 0 ==> 0
% 9.54/9.93 1 ==> 1
% 9.54/9.93 2 ==> 2
% 9.54/9.93 end
% 9.54/9.93
% 9.54/9.93 resolution: (20585) {G1,W6,D3,L1,V0,M1} { next_subocc( skol13( skol15 ),
% 9.54/9.93 skol16( skol15 ), tptp0 ) }.
% 9.54/9.93 parent0[0]: (81) {G0,W7,D2,L2,V2,M2} I {Cputime limit exceeded (core dumped)
%------------------------------------------------------------------------------