TSTP Solution File: SEU389+1 by Bliksem---1.12
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- Process Solution
%------------------------------------------------------------------------------
% File : Bliksem---1.12
% Problem : SEU389+1 : TPTP v8.1.0. Released v3.3.0.
% Transfm : none
% Format : tptp:raw
% Command : bliksem %s
% Computer : n014.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 : Tue Jul 19 07:13:00 EDT 2022
% Result : Timeout 292.13s 292.52s
% Output : None
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----No solution output by system
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.11/0.12 % Problem : SEU389+1 : TPTP v8.1.0. Released v3.3.0.
% 0.11/0.13 % Command : bliksem %s
% 0.12/0.34 % Computer : n014.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 : Sun Jun 19 14:39:33 EDT 2022
% 0.12/0.34 % CPUTime :
% 0.71/1.17 *** allocated 10000 integers for termspace/termends
% 0.71/1.17 *** allocated 10000 integers for clauses
% 0.71/1.17 *** allocated 10000 integers for justifications
% 0.71/1.17 Bliksem 1.12
% 0.71/1.17
% 0.71/1.17
% 0.71/1.17 Automatic Strategy Selection
% 0.71/1.17
% 0.71/1.17 *** allocated 15000 integers for termspace/termends
% 0.71/1.17 *** allocated 22500 integers for termspace/termends
% 0.71/1.17
% 0.71/1.17 Clauses:
% 0.71/1.17
% 0.71/1.17 { ! rel_str( X ), ! strict_rel_str( X ), X = rel_str_of( the_carrier( X ),
% 0.71/1.17 the_InternalRel( X ) ) }.
% 0.71/1.17 { ! in( X, Y ), ! in( Y, X ) }.
% 0.71/1.17 { ! rel_str( X ), empty_carrier( X ), ! reflexive_relstr( X ), !
% 0.71/1.17 complete_relstr( X ), alpha5( X ) }.
% 0.71/1.17 { ! rel_str( X ), empty_carrier( X ), ! reflexive_relstr( X ), !
% 0.71/1.17 complete_relstr( X ), join_complete_relstr( X ) }.
% 0.71/1.17 { ! alpha5( X ), ! empty_carrier( X ) }.
% 0.71/1.17 { ! alpha5( X ), reflexive_relstr( X ) }.
% 0.71/1.17 { ! alpha5( X ), up_complete_relstr( X ) }.
% 0.71/1.17 { empty_carrier( X ), ! reflexive_relstr( X ), ! up_complete_relstr( X ),
% 0.71/1.17 alpha5( X ) }.
% 0.71/1.17 { ! rel_str( X ), empty_carrier( X ), ! reflexive_relstr( X ), !
% 0.71/1.17 join_complete_relstr( X ), ! empty_carrier( X ) }.
% 0.71/1.17 { ! rel_str( X ), empty_carrier( X ), ! reflexive_relstr( X ), !
% 0.71/1.17 join_complete_relstr( X ), reflexive_relstr( X ) }.
% 0.71/1.17 { ! rel_str( X ), empty_carrier( X ), ! reflexive_relstr( X ), !
% 0.71/1.17 join_complete_relstr( X ), lower_bounded_relstr( X ) }.
% 0.71/1.17 { ! rel_str( X ), empty_carrier( X ), ! reflexive_relstr( X ), !
% 0.71/1.17 transitive_relstr( X ), ! antisymmetric_relstr( X ), !
% 0.71/1.17 with_suprema_relstr( X ), ! lower_bounded_relstr( X ), !
% 0.71/1.17 up_complete_relstr( X ), alpha6( X ) }.
% 0.71/1.17 { ! rel_str( X ), empty_carrier( X ), ! reflexive_relstr( X ), !
% 0.71/1.17 transitive_relstr( X ), ! antisymmetric_relstr( X ), !
% 0.71/1.17 with_suprema_relstr( X ), ! lower_bounded_relstr( X ), !
% 0.71/1.17 up_complete_relstr( X ), bounded_relstr( X ) }.
% 0.71/1.17 { ! alpha6( X ), alpha26( X ) }.
% 0.71/1.17 { ! alpha6( X ), upper_bounded_relstr( X ) }.
% 0.71/1.17 { ! alpha26( X ), ! upper_bounded_relstr( X ), alpha6( X ) }.
% 0.71/1.17 { ! alpha26( X ), alpha37( X ) }.
% 0.71/1.17 { ! alpha26( X ), lower_bounded_relstr( X ) }.
% 0.71/1.17 { ! alpha37( X ), ! lower_bounded_relstr( X ), alpha26( X ) }.
% 0.71/1.17 { ! alpha37( X ), alpha44( X ) }.
% 0.71/1.17 { ! alpha37( X ), complete_relstr( X ) }.
% 0.71/1.17 { ! alpha44( X ), ! complete_relstr( X ), alpha37( X ) }.
% 0.71/1.17 { ! alpha44( X ), alpha50( X ) }.
% 0.71/1.17 { ! alpha44( X ), with_infima_relstr( X ) }.
% 0.71/1.17 { ! alpha50( X ), ! with_infima_relstr( X ), alpha44( X ) }.
% 0.71/1.17 { ! alpha50( X ), alpha55( X ) }.
% 0.71/1.17 { ! alpha50( X ), with_suprema_relstr( X ) }.
% 0.71/1.17 { ! alpha55( X ), ! with_suprema_relstr( X ), alpha50( X ) }.
% 0.71/1.17 { ! alpha55( X ), alpha59( X ) }.
% 0.71/1.17 { ! alpha55( X ), antisymmetric_relstr( X ) }.
% 0.71/1.17 { ! alpha59( X ), ! antisymmetric_relstr( X ), alpha55( X ) }.
% 0.71/1.17 { ! alpha59( X ), ! empty_carrier( X ) }.
% 0.71/1.17 { ! alpha59( X ), reflexive_relstr( X ) }.
% 0.71/1.17 { ! alpha59( X ), transitive_relstr( X ) }.
% 0.71/1.17 { empty_carrier( X ), ! reflexive_relstr( X ), ! transitive_relstr( X ),
% 0.71/1.17 alpha59( X ) }.
% 0.71/1.17 { ! rel_str( X ), empty_carrier( X ), ! reflexive_relstr( X ), !
% 0.71/1.17 antisymmetric_relstr( X ), ! join_complete_relstr( X ), alpha7( X ) }.
% 0.71/1.17 { ! rel_str( X ), empty_carrier( X ), ! reflexive_relstr( X ), !
% 0.71/1.17 antisymmetric_relstr( X ), ! join_complete_relstr( X ),
% 0.71/1.17 with_infima_relstr( X ) }.
% 0.71/1.17 { ! alpha7( X ), ! empty_carrier( X ) }.
% 0.71/1.17 { ! alpha7( X ), reflexive_relstr( X ) }.
% 0.71/1.17 { ! alpha7( X ), antisymmetric_relstr( X ) }.
% 0.71/1.17 { empty_carrier( X ), ! reflexive_relstr( X ), ! antisymmetric_relstr( X )
% 0.71/1.17 , alpha7( X ) }.
% 0.71/1.17 { ! rel_str( X ), empty_carrier( X ), ! reflexive_relstr( X ), !
% 0.71/1.17 antisymmetric_relstr( X ), ! upper_bounded_relstr( X ), !
% 0.71/1.17 join_complete_relstr( X ), alpha8( X ) }.
% 0.71/1.17 { ! rel_str( X ), empty_carrier( X ), ! reflexive_relstr( X ), !
% 0.71/1.17 antisymmetric_relstr( X ), ! upper_bounded_relstr( X ), !
% 0.71/1.17 join_complete_relstr( X ), upper_bounded_relstr( X ) }.
% 0.71/1.17 { ! alpha8( X ), alpha27( X ) }.
% 0.71/1.17 { ! alpha8( X ), with_suprema_relstr( X ) }.
% 0.71/1.17 { ! alpha27( X ), ! with_suprema_relstr( X ), alpha8( X ) }.
% 0.71/1.17 { ! alpha27( X ), ! empty_carrier( X ) }.
% 0.71/1.17 { ! alpha27( X ), reflexive_relstr( X ) }.
% 0.71/1.17 { ! alpha27( X ), antisymmetric_relstr( X ) }.
% 0.71/1.17 { empty_carrier( X ), ! reflexive_relstr( X ), ! antisymmetric_relstr( X )
% 0.71/1.17 , alpha27( X ) }.
% 0.71/1.17 { ! empty( X ), finite( X ) }.
% 0.71/1.17 { ! rel_str( X ), ! with_suprema_relstr( X ), ! empty_carrier( X ) }.
% 0.71/1.17 { ! empty( X ), relation( X ) }.
% 0.71/1.17 { ! element( X, powerset( cartesian_product2( Y, Z ) ) ), relation( X ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), ! element( Y, powerset(
% 0.71/1.17 the_carrier( X ) ) ), ! empty( Y ), open_subset( Y, X ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), ! element( Y, powerset(
% 0.71/1.17 the_carrier( X ) ) ), ! empty( Y ), closed_subset( Y, X ) }.
% 0.71/1.17 { ! rel_str( X ), empty_carrier( X ), ! complete_relstr( X ), !
% 0.71/1.17 empty_carrier( X ) }.
% 0.71/1.17 { ! rel_str( X ), empty_carrier( X ), ! complete_relstr( X ),
% 0.71/1.17 with_suprema_relstr( X ) }.
% 0.71/1.17 { ! rel_str( X ), empty_carrier( X ), ! complete_relstr( X ),
% 0.71/1.17 with_infima_relstr( X ) }.
% 0.71/1.17 { ! finite( X ), ! element( Y, powerset( X ) ), finite( Y ) }.
% 0.71/1.17 { ! rel_str( X ), ! with_infima_relstr( X ), ! empty_carrier( X ) }.
% 0.71/1.17 { ! top_str( X ), ! element( Y, powerset( the_carrier( X ) ) ), ! empty( Y
% 0.71/1.17 ), boundary_set( Y, X ) }.
% 0.71/1.17 { ! rel_str( X ), empty_carrier( X ), ! reflexive_relstr( X ), !
% 0.71/1.17 trivial_carrier( X ), alpha9( X ) }.
% 0.71/1.17 { ! rel_str( X ), empty_carrier( X ), ! reflexive_relstr( X ), !
% 0.71/1.17 trivial_carrier( X ), complete_relstr( X ) }.
% 0.71/1.17 { ! alpha9( X ), alpha28( X ) }.
% 0.71/1.17 { ! alpha9( X ), antisymmetric_relstr( X ) }.
% 0.71/1.17 { ! alpha28( X ), ! antisymmetric_relstr( X ), alpha9( X ) }.
% 0.71/1.17 { ! alpha28( X ), ! empty_carrier( X ) }.
% 0.71/1.17 { ! alpha28( X ), reflexive_relstr( X ) }.
% 0.71/1.17 { ! alpha28( X ), transitive_relstr( X ) }.
% 0.71/1.17 { empty_carrier( X ), ! reflexive_relstr( X ), ! transitive_relstr( X ),
% 0.71/1.17 alpha28( X ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), ! element( Y, powerset(
% 0.71/1.17 the_carrier( X ) ) ), ! empty( Y ), nowhere_dense( Y, X ) }.
% 0.71/1.17 { ! rel_str( X ), empty_carrier( X ), ! complete_relstr( X ), !
% 0.71/1.17 empty_carrier( X ) }.
% 0.71/1.17 { ! rel_str( X ), empty_carrier( X ), ! complete_relstr( X ),
% 0.71/1.17 bounded_relstr( X ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), ! element( Y, powerset(
% 0.71/1.17 the_carrier( X ) ) ), ! nowhere_dense( Y, X ), boundary_set( Y, X ) }.
% 0.71/1.17 { ! rel_str( X ), ! bounded_relstr( X ), lower_bounded_relstr( X ) }.
% 0.71/1.17 { ! rel_str( X ), ! bounded_relstr( X ), upper_bounded_relstr( X ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), ! element( Y, powerset(
% 0.71/1.17 the_carrier( X ) ) ), ! closed_subset( Y, X ), ! boundary_set( Y, X ),
% 0.71/1.17 boundary_set( Y, X ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), ! element( Y, powerset(
% 0.71/1.17 the_carrier( X ) ) ), ! closed_subset( Y, X ), ! boundary_set( Y, X ),
% 0.71/1.17 nowhere_dense( Y, X ) }.
% 0.71/1.17 { ! rel_str( X ), empty_carrier( X ), ! reflexive_relstr( X ), !
% 0.71/1.17 trivial_carrier( X ), ! empty_carrier( X ) }.
% 0.71/1.17 { ! rel_str( X ), empty_carrier( X ), ! reflexive_relstr( X ), !
% 0.71/1.17 trivial_carrier( X ), reflexive_relstr( X ) }.
% 0.71/1.17 { ! rel_str( X ), empty_carrier( X ), ! reflexive_relstr( X ), !
% 0.71/1.17 trivial_carrier( X ), connected_relstr( X ) }.
% 0.71/1.17 { ! rel_str( X ), ! lower_bounded_relstr( X ), ! upper_bounded_relstr( X )
% 0.71/1.17 , bounded_relstr( X ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), ! element( Y, powerset(
% 0.71/1.17 the_carrier( X ) ) ), ! open_subset( Y, X ), ! nowhere_dense( Y, X ),
% 0.71/1.17 alpha10( X, Y ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), ! element( Y, powerset(
% 0.71/1.17 the_carrier( X ) ) ), ! open_subset( Y, X ), ! nowhere_dense( Y, X ),
% 0.71/1.17 nowhere_dense( Y, X ) }.
% 0.71/1.17 { ! alpha10( X, Y ), alpha29( X, Y ) }.
% 0.71/1.17 { ! alpha10( X, Y ), boundary_set( Y, X ) }.
% 0.71/1.17 { ! alpha29( X, Y ), ! boundary_set( Y, X ), alpha10( X, Y ) }.
% 0.71/1.17 { ! alpha29( X, Y ), alpha38( X, Y ) }.
% 0.71/1.17 { ! alpha29( X, Y ), v5_membered( Y ) }.
% 0.71/1.17 { ! alpha38( X, Y ), ! v5_membered( Y ), alpha29( X, Y ) }.
% 0.71/1.17 { ! alpha38( X, Y ), alpha45( X, Y ) }.
% 0.71/1.17 { ! alpha38( X, Y ), v4_membered( Y ) }.
% 0.71/1.17 { ! alpha45( X, Y ), ! v4_membered( Y ), alpha38( X, Y ) }.
% 0.71/1.17 { ! alpha45( X, Y ), alpha51( X, Y ) }.
% 0.71/1.17 { ! alpha45( X, Y ), v3_membered( Y ) }.
% 0.71/1.17 { ! alpha51( X, Y ), ! v3_membered( Y ), alpha45( X, Y ) }.
% 0.71/1.17 { ! alpha51( X, Y ), alpha56( X, Y ) }.
% 0.71/1.17 { ! alpha51( X, Y ), v2_membered( Y ) }.
% 0.71/1.17 { ! alpha56( X, Y ), ! v2_membered( Y ), alpha51( X, Y ) }.
% 0.71/1.17 { ! alpha56( X, Y ), alpha60( X, Y ) }.
% 0.71/1.17 { ! alpha56( X, Y ), v1_membered( Y ) }.
% 0.71/1.17 { ! alpha60( X, Y ), ! v1_membered( Y ), alpha56( X, Y ) }.
% 0.71/1.17 { ! alpha60( X, Y ), empty( Y ) }.
% 0.71/1.17 { ! alpha60( X, Y ), open_subset( Y, X ) }.
% 0.71/1.17 { ! alpha60( X, Y ), closed_subset( Y, X ) }.
% 0.71/1.17 { ! empty( Y ), ! open_subset( Y, X ), ! closed_subset( Y, X ), alpha60( X
% 0.71/1.17 , Y ) }.
% 0.71/1.17 { ! rel_str( X ), ! reflexive_relstr( X ), ! with_suprema_relstr( X ), !
% 0.71/1.17 up_complete_relstr( X ), alpha11( X ) }.
% 0.71/1.17 { ! rel_str( X ), ! reflexive_relstr( X ), ! with_suprema_relstr( X ), !
% 0.71/1.17 up_complete_relstr( X ), upper_bounded_relstr( X ) }.
% 0.71/1.17 { ! alpha11( X ), ! empty_carrier( X ) }.
% 0.71/1.17 { ! alpha11( X ), reflexive_relstr( X ) }.
% 0.71/1.17 { ! alpha11( X ), with_suprema_relstr( X ) }.
% 0.71/1.17 { empty_carrier( X ), ! reflexive_relstr( X ), ! with_suprema_relstr( X ),
% 0.71/1.17 alpha11( X ) }.
% 0.71/1.17 { empty_carrier( X ), ! topological_space( X ), ! top_str( X ), ! element(
% 0.71/1.17 Y, the_carrier( X ) ), ! element( Z, powerset( the_carrier( X ) ) ), !
% 0.71/1.17 point_neighbourhood( Z, X, Y ), in( Y, interior( X, Z ) ) }.
% 0.71/1.17 { empty_carrier( X ), ! topological_space( X ), ! top_str( X ), ! element(
% 0.71/1.17 Y, the_carrier( X ) ), ! element( Z, powerset( the_carrier( X ) ) ), ! in
% 0.71/1.17 ( Y, interior( X, Z ) ), point_neighbourhood( Z, X, Y ) }.
% 0.71/1.17 { empty_carrier( X ), ! topological_space( X ), ! top_str( X ), ! element(
% 0.71/1.17 Y, the_carrier( X ) ), neighborhood_system( X, Y ) = a_2_0_yellow19( X, Y
% 0.71/1.17 ) }.
% 0.71/1.17 { ! subset( X, Y ), ! in( Z, X ), in( Z, Y ) }.
% 0.71/1.17 { ! in( skol1( Z, Y ), Y ), subset( X, Y ) }.
% 0.71/1.17 { in( skol1( X, Y ), X ), subset( X, Y ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), ! is_a_convergence_point_of_set
% 0.71/1.17 ( X, Y, Z ), ! element( T, powerset( the_carrier( X ) ) ), alpha3( X, Y,
% 0.71/1.17 Z, T ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), element( skol2( X, T, U ),
% 0.71/1.17 powerset( the_carrier( X ) ) ), is_a_convergence_point_of_set( X, Y, Z )
% 0.71/1.17 }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), ! alpha3( X, Y, Z, skol2( X, Y
% 0.71/1.17 , Z ) ), is_a_convergence_point_of_set( X, Y, Z ) }.
% 0.71/1.17 { ! alpha3( X, Y, Z, T ), ! alpha1( X, Z, T ), in( T, Y ) }.
% 0.71/1.17 { alpha1( X, Z, T ), alpha3( X, Y, Z, T ) }.
% 0.71/1.17 { ! in( T, Y ), alpha3( X, Y, Z, T ) }.
% 0.71/1.17 { ! alpha1( X, Y, Z ), open_subset( Z, X ) }.
% 0.71/1.17 { ! alpha1( X, Y, Z ), in( Y, Z ) }.
% 0.71/1.17 { ! open_subset( Z, X ), ! in( Y, Z ), alpha1( X, Y, Z ) }.
% 0.71/1.17 { ! relation_of2( Y, X, X ), strict_rel_str( rel_str_of( X, Y ) ) }.
% 0.71/1.17 { ! relation_of2( Y, X, X ), rel_str( rel_str_of( X, Y ) ) }.
% 0.71/1.17 { ! top_str( X ), ! element( Y, powerset( the_carrier( X ) ) ), element(
% 0.71/1.17 interior( X, Y ), powerset( the_carrier( X ) ) ) }.
% 0.71/1.17 { && }.
% 0.71/1.17 { empty_carrier( X ), ! topological_space( X ), ! top_str( X ), ! element(
% 0.71/1.17 Y, the_carrier( X ) ), element( neighborhood_system( X, Y ), powerset(
% 0.71/1.17 the_carrier( boole_POSet( cast_as_carrier_subset( X ) ) ) ) ) }.
% 0.71/1.17 { && }.
% 0.71/1.17 { ! one_sorted_str( X ), element( cast_as_carrier_subset( X ), powerset(
% 0.71/1.17 the_carrier( X ) ) ) }.
% 0.71/1.17 { && }.
% 0.71/1.17 { strict_rel_str( boole_POSet( X ) ) }.
% 0.71/1.17 { rel_str( boole_POSet( X ) ) }.
% 0.71/1.17 { ! rel_str( X ), one_sorted_str( X ) }.
% 0.71/1.17 { ! top_str( X ), one_sorted_str( X ) }.
% 0.71/1.17 { && }.
% 0.71/1.17 { empty_carrier( X ), ! topological_space( X ), ! top_str( X ), ! element(
% 0.71/1.17 Y, the_carrier( X ) ), ! point_neighbourhood( Z, X, Y ), element( Z,
% 0.71/1.17 powerset( the_carrier( X ) ) ) }.
% 0.71/1.17 { && }.
% 0.71/1.17 { && }.
% 0.71/1.17 { ! relation_of2_as_subset( Z, X, Y ), element( Z, powerset(
% 0.71/1.17 cartesian_product2( X, Y ) ) ) }.
% 0.71/1.17 { ! rel_str( X ), relation_of2_as_subset( the_InternalRel( X ), the_carrier
% 0.71/1.17 ( X ), the_carrier( X ) ) }.
% 0.71/1.17 { && }.
% 0.71/1.17 { rel_str( skol3 ) }.
% 0.71/1.17 { top_str( skol4 ) }.
% 0.71/1.17 { one_sorted_str( skol5 ) }.
% 0.71/1.17 { empty_carrier( X ), ! topological_space( X ), ! top_str( X ), ! element(
% 0.71/1.17 Y, the_carrier( X ) ), point_neighbourhood( skol6( X, Y ), X, Y ) }.
% 0.71/1.17 { relation_of2( skol7( X, Y ), X, Y ) }.
% 0.71/1.17 { element( skol8( X ), X ) }.
% 0.71/1.17 { relation_of2_as_subset( skol9( X, Y ), X, Y ) }.
% 0.71/1.17 { ! top_str( X ), ! boundary_set( Y, X ), ! element( Y, powerset(
% 0.71/1.17 the_carrier( X ) ) ), alpha12( X, Y ) }.
% 0.71/1.17 { ! top_str( X ), ! boundary_set( Y, X ), ! element( Y, powerset(
% 0.71/1.17 the_carrier( X ) ) ), boundary_set( interior( X, Y ), X ) }.
% 0.71/1.17 { ! alpha12( X, Y ), alpha30( X, Y ) }.
% 0.71/1.17 { ! alpha12( X, Y ), v5_membered( interior( X, Y ) ) }.
% 0.71/1.17 { ! alpha30( X, Y ), ! v5_membered( interior( X, Y ) ), alpha12( X, Y ) }.
% 0.71/1.17 { ! alpha30( X, Y ), alpha39( X, Y ) }.
% 0.71/1.17 { ! alpha30( X, Y ), v4_membered( interior( X, Y ) ) }.
% 0.71/1.17 { ! alpha39( X, Y ), ! v4_membered( interior( X, Y ) ), alpha30( X, Y ) }.
% 0.71/1.17 { ! alpha39( X, Y ), alpha46( X, Y ) }.
% 0.71/1.17 { ! alpha39( X, Y ), v3_membered( interior( X, Y ) ) }.
% 0.71/1.17 { ! alpha46( X, Y ), ! v3_membered( interior( X, Y ) ), alpha39( X, Y ) }.
% 0.71/1.17 { ! alpha46( X, Y ), empty( interior( X, Y ) ) }.
% 0.71/1.17 { ! alpha46( X, Y ), v1_membered( interior( X, Y ) ) }.
% 0.71/1.17 { ! alpha46( X, Y ), v2_membered( interior( X, Y ) ) }.
% 0.71/1.17 { ! empty( interior( X, Y ) ), ! v1_membered( interior( X, Y ) ), !
% 0.71/1.17 v2_membered( interior( X, Y ) ), alpha46( X, Y ) }.
% 0.71/1.17 { empty( empty_set ) }.
% 0.71/1.17 { relation( empty_set ) }.
% 0.71/1.17 { relation_empty_yielding( empty_set ) }.
% 0.71/1.17 { ! finite( X ), ! finite( Y ), finite( cartesian_product2( X, Y ) ) }.
% 0.71/1.17 { empty_carrier( X ), ! rel_str( X ), ! empty( cast_as_carrier_subset( X )
% 0.71/1.17 ) }.
% 0.71/1.17 { empty_carrier( X ), ! rel_str( X ), lower_relstr_subset(
% 0.71/1.17 cast_as_carrier_subset( X ), X ) }.
% 0.71/1.17 { empty_carrier( X ), ! rel_str( X ), upper_relstr_subset(
% 0.71/1.17 cast_as_carrier_subset( X ), X ) }.
% 0.71/1.17 { empty_carrier( X ), ! one_sorted_str( X ), ! empty( the_carrier( X ) ) }
% 0.71/1.17 .
% 0.71/1.17 { ! empty( powerset( X ) ) }.
% 0.71/1.17 { ! empty_carrier( boole_POSet( X ) ) }.
% 0.71/1.17 { strict_rel_str( boole_POSet( X ) ) }.
% 0.71/1.17 { reflexive_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { transitive_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { antisymmetric_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { lower_bounded_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { upper_bounded_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { bounded_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { up_complete_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { join_complete_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { ! v1_yellow_3( boole_POSet( X ) ) }.
% 0.71/1.17 { distributive_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { heyting_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { complemented_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { boolean_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { with_suprema_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { with_infima_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { complete_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { empty_carrier( X ), ! topological_space( X ), ! top_str( X ), ! element(
% 0.71/1.17 Y, the_carrier( X ) ), alpha13( X, Y ) }.
% 0.71/1.17 { empty_carrier( X ), ! topological_space( X ), ! top_str( X ), ! element(
% 0.71/1.17 Y, the_carrier( X ) ), proper_element( neighborhood_system( X, Y ),
% 0.71/1.17 powerset( the_carrier( boole_POSet( cast_as_carrier_subset( X ) ) ) ) ) }
% 0.71/1.17 .
% 0.71/1.17 { ! alpha13( X, Y ), ! empty( neighborhood_system( X, Y ) ) }.
% 0.71/1.17 { ! alpha13( X, Y ), filtered_subset( neighborhood_system( X, Y ),
% 0.71/1.17 boole_POSet( cast_as_carrier_subset( X ) ) ) }.
% 0.71/1.17 { ! alpha13( X, Y ), upper_relstr_subset( neighborhood_system( X, Y ),
% 0.71/1.17 boole_POSet( cast_as_carrier_subset( X ) ) ) }.
% 0.71/1.17 { empty( neighborhood_system( X, Y ) ), ! filtered_subset(
% 0.71/1.17 neighborhood_system( X, Y ), boole_POSet( cast_as_carrier_subset( X ) ) )
% 0.71/1.17 , ! upper_relstr_subset( neighborhood_system( X, Y ), boole_POSet(
% 0.71/1.17 cast_as_carrier_subset( X ) ) ), alpha13( X, Y ) }.
% 0.71/1.17 { empty_carrier( X ), ! one_sorted_str( X ), ! empty(
% 0.71/1.17 cast_as_carrier_subset( X ) ) }.
% 0.71/1.17 { ! with_suprema_relstr( X ), ! rel_str( X ), ! empty(
% 0.71/1.17 cast_as_carrier_subset( X ) ) }.
% 0.71/1.17 { ! with_suprema_relstr( X ), ! rel_str( X ), directed_subset(
% 0.71/1.17 cast_as_carrier_subset( X ), X ) }.
% 0.71/1.17 { empty( X ), alpha14( X ) }.
% 0.71/1.17 { empty( X ), complete_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { ! alpha14( X ), alpha31( X ) }.
% 0.71/1.17 { ! alpha14( X ), with_infima_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { ! alpha31( X ), ! with_infima_relstr( boole_POSet( X ) ), alpha14( X ) }
% 0.71/1.17 .
% 0.71/1.17 { ! alpha31( X ), alpha40( X ) }.
% 0.71/1.17 { ! alpha31( X ), with_suprema_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { ! alpha40( X ), ! with_suprema_relstr( boole_POSet( X ) ), alpha31( X ) }
% 0.71/1.17 .
% 0.71/1.17 { ! alpha40( X ), alpha47( X ) }.
% 0.71/1.17 { ! alpha40( X ), boolean_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { ! alpha47( X ), ! boolean_relstr( boole_POSet( X ) ), alpha40( X ) }.
% 0.71/1.17 { ! alpha47( X ), alpha52( X ) }.
% 0.71/1.17 { ! alpha47( X ), complemented_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { ! alpha52( X ), ! complemented_relstr( boole_POSet( X ) ), alpha47( X ) }
% 0.71/1.17 .
% 0.71/1.17 { ! alpha52( X ), alpha57( X ) }.
% 0.71/1.17 { ! alpha52( X ), heyting_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { ! alpha57( X ), ! heyting_relstr( boole_POSet( X ) ), alpha52( X ) }.
% 0.71/1.17 { ! alpha57( X ), alpha61( X ) }.
% 0.71/1.17 { ! alpha57( X ), distributive_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { ! alpha61( X ), ! distributive_relstr( boole_POSet( X ) ), alpha57( X ) }
% 0.71/1.17 .
% 0.71/1.17 { ! alpha61( X ), alpha63( X ) }.
% 0.71/1.17 { ! alpha61( X ), ! v1_yellow_3( boole_POSet( X ) ) }.
% 0.71/1.17 { ! alpha63( X ), v1_yellow_3( boole_POSet( X ) ), alpha61( X ) }.
% 0.71/1.17 { ! alpha63( X ), alpha65( X ) }.
% 0.71/1.17 { ! alpha63( X ), join_complete_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { ! alpha65( X ), ! join_complete_relstr( boole_POSet( X ) ), alpha63( X )
% 0.71/1.17 }.
% 0.71/1.17 { ! alpha65( X ), alpha66( X ) }.
% 0.71/1.17 { ! alpha65( X ), up_complete_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { ! alpha66( X ), ! up_complete_relstr( boole_POSet( X ) ), alpha65( X ) }
% 0.71/1.17 .
% 0.71/1.17 { ! alpha66( X ), alpha67( X ) }.
% 0.71/1.17 { ! alpha66( X ), bounded_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { ! alpha67( X ), ! bounded_relstr( boole_POSet( X ) ), alpha66( X ) }.
% 0.71/1.17 { ! alpha67( X ), alpha68( X ) }.
% 0.71/1.17 { ! alpha67( X ), upper_bounded_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { ! alpha68( X ), ! upper_bounded_relstr( boole_POSet( X ) ), alpha67( X )
% 0.71/1.17 }.
% 0.71/1.17 { ! alpha68( X ), alpha69( X ) }.
% 0.71/1.17 { ! alpha68( X ), lower_bounded_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { ! alpha69( X ), ! lower_bounded_relstr( boole_POSet( X ) ), alpha68( X )
% 0.71/1.17 }.
% 0.71/1.17 { ! alpha69( X ), alpha70( X ) }.
% 0.71/1.17 { ! alpha69( X ), antisymmetric_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { ! alpha70( X ), ! antisymmetric_relstr( boole_POSet( X ) ), alpha69( X )
% 0.71/1.17 }.
% 0.71/1.17 { ! alpha70( X ), alpha71( X ) }.
% 0.71/1.17 { ! alpha70( X ), transitive_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { ! alpha71( X ), ! transitive_relstr( boole_POSet( X ) ), alpha70( X ) }.
% 0.71/1.17 { ! alpha71( X ), alpha72( X ) }.
% 0.71/1.17 { ! alpha71( X ), reflexive_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { ! alpha72( X ), ! reflexive_relstr( boole_POSet( X ) ), alpha71( X ) }.
% 0.71/1.17 { ! alpha72( X ), ! empty_carrier( boole_POSet( X ) ) }.
% 0.71/1.17 { ! alpha72( X ), ! trivial_carrier( boole_POSet( X ) ) }.
% 0.71/1.17 { ! alpha72( X ), strict_rel_str( boole_POSet( X ) ) }.
% 0.71/1.17 { empty_carrier( boole_POSet( X ) ), trivial_carrier( boole_POSet( X ) ), !
% 0.71/1.17 strict_rel_str( boole_POSet( X ) ), alpha72( X ) }.
% 0.71/1.17 { empty_carrier( X ), ! rel_str( X ), ! empty( cast_as_carrier_subset( X )
% 0.71/1.17 ) }.
% 0.71/1.17 { empty_carrier( X ), ! upper_bounded_relstr( X ), ! rel_str( X ), ! empty
% 0.71/1.17 ( cast_as_carrier_subset( X ) ) }.
% 0.71/1.17 { empty_carrier( X ), ! upper_bounded_relstr( X ), ! rel_str( X ),
% 0.71/1.17 directed_subset( cast_as_carrier_subset( X ), X ) }.
% 0.71/1.17 { empty( empty_set ) }.
% 0.71/1.17 { relation( empty_set ) }.
% 0.71/1.17 { empty( X ), empty( Y ), ! empty( cartesian_product2( X, Y ) ) }.
% 0.71/1.17 { ! with_infima_relstr( X ), ! rel_str( X ), ! empty(
% 0.71/1.17 cast_as_carrier_subset( X ) ) }.
% 0.71/1.17 { ! with_infima_relstr( X ), ! rel_str( X ), filtered_subset(
% 0.71/1.17 cast_as_carrier_subset( X ), X ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), closed_subset(
% 0.71/1.17 cast_as_carrier_subset( X ), X ) }.
% 0.71/1.17 { empty_carrier( X ), ! lower_bounded_relstr( X ), ! rel_str( X ), ! empty
% 0.71/1.17 ( cast_as_carrier_subset( X ) ) }.
% 0.71/1.17 { empty_carrier( X ), ! lower_bounded_relstr( X ), ! rel_str( X ),
% 0.71/1.17 filtered_subset( cast_as_carrier_subset( X ), X ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), ! element( Y, powerset(
% 0.71/1.17 the_carrier( X ) ) ), open_subset( interior( X, Y ), X ) }.
% 0.71/1.17 { ! empty_carrier( boole_POSet( X ) ) }.
% 0.71/1.17 { strict_rel_str( boole_POSet( X ) ) }.
% 0.71/1.17 { reflexive_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { transitive_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { antisymmetric_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), open_subset(
% 0.71/1.17 cast_as_carrier_subset( X ), X ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), closed_subset(
% 0.71/1.17 cast_as_carrier_subset( X ), X ) }.
% 0.71/1.17 { ! empty_carrier( boole_POSet( X ) ) }.
% 0.71/1.17 { strict_rel_str( boole_POSet( X ) ) }.
% 0.71/1.17 { reflexive_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { transitive_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { antisymmetric_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { lower_bounded_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { upper_bounded_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { bounded_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { with_suprema_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { with_infima_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { complete_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { ! empty_carrier( boole_POSet( X ) ) }.
% 0.71/1.17 { strict_rel_str( boole_POSet( X ) ) }.
% 0.71/1.17 { reflexive_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { transitive_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { antisymmetric_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { lower_bounded_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { upper_bounded_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { bounded_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { directed_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { up_complete_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { join_complete_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { ! v1_yellow_3( boole_POSet( X ) ) }.
% 0.71/1.17 { with_suprema_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { with_infima_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { complete_relstr( boole_POSet( X ) ) }.
% 0.71/1.17 { ! top_str( X ), dense( cast_as_carrier_subset( X ), X ) }.
% 0.71/1.17 { empty_carrier( X ), ! topological_space( X ), ! top_str( X ), ! element(
% 0.71/1.17 Y, the_carrier( X ) ), ! in( Z, a_2_0_yellow19( X, Y ) ), Z = skol10( T,
% 0.71/1.17 U, Z ) }.
% 0.71/1.17 { empty_carrier( X ), ! topological_space( X ), ! top_str( X ), ! element(
% 0.71/1.17 Y, the_carrier( X ) ), ! in( Z, a_2_0_yellow19( X, Y ) ),
% 0.71/1.17 point_neighbourhood( skol10( X, Y, Z ), X, Y ) }.
% 0.71/1.17 { empty_carrier( X ), ! topological_space( X ), ! top_str( X ), ! element(
% 0.71/1.17 Y, the_carrier( X ) ), ! point_neighbourhood( T, X, Y ), ! Z = T, in( Z,
% 0.71/1.17 a_2_0_yellow19( X, Y ) ) }.
% 0.71/1.17 { ! relation_of2( Y, X, X ), ! rel_str_of( X, Y ) = rel_str_of( Z, T ), X =
% 0.71/1.17 Z }.
% 0.71/1.17 { ! relation_of2( Y, X, X ), ! rel_str_of( X, Y ) = rel_str_of( Z, T ), Y =
% 0.71/1.17 T }.
% 0.71/1.17 { empty_carrier( X ), ! reflexive_relstr( X ), ! transitive_relstr( X ), !
% 0.71/1.17 rel_str( X ), alpha15( X, skol11( X ) ) }.
% 0.71/1.17 { empty_carrier( X ), ! reflexive_relstr( X ), ! transitive_relstr( X ), !
% 0.71/1.17 rel_str( X ), upper_relstr_subset( skol11( X ), X ) }.
% 0.71/1.17 { ! alpha15( X, Y ), element( Y, powerset( the_carrier( X ) ) ) }.
% 0.71/1.17 { ! alpha15( X, Y ), ! empty( Y ) }.
% 0.71/1.17 { ! alpha15( X, Y ), filtered_subset( Y, X ) }.
% 0.71/1.17 { ! element( Y, powerset( the_carrier( X ) ) ), empty( Y ), !
% 0.71/1.17 filtered_subset( Y, X ), alpha15( X, Y ) }.
% 0.71/1.17 { ! reflexive_relstr( X ), ! transitive_relstr( X ), ! antisymmetric_relstr
% 0.71/1.17 ( X ), ! with_suprema_relstr( X ), ! with_infima_relstr( X ), ! rel_str(
% 0.71/1.17 X ), alpha16( X, skol12( X ) ) }.
% 0.71/1.17 { ! reflexive_relstr( X ), ! transitive_relstr( X ), ! antisymmetric_relstr
% 0.71/1.17 ( X ), ! with_suprema_relstr( X ), ! with_infima_relstr( X ), ! rel_str(
% 0.71/1.17 X ), upper_relstr_subset( skol12( X ), X ) }.
% 0.71/1.17 { ! alpha16( X, Y ), alpha32( X, Y ) }.
% 0.71/1.17 { ! alpha16( X, Y ), lower_relstr_subset( Y, X ) }.
% 0.71/1.17 { ! alpha32( X, Y ), ! lower_relstr_subset( Y, X ), alpha16( X, Y ) }.
% 0.71/1.17 { ! alpha32( X, Y ), alpha41( X, Y ) }.
% 0.71/1.17 { ! alpha32( X, Y ), filtered_subset( Y, X ) }.
% 0.71/1.17 { ! alpha41( X, Y ), ! filtered_subset( Y, X ), alpha32( X, Y ) }.
% 0.71/1.17 { ! alpha41( X, Y ), element( Y, powerset( the_carrier( X ) ) ) }.
% 0.71/1.17 { ! alpha41( X, Y ), ! empty( Y ) }.
% 0.71/1.17 { ! alpha41( X, Y ), directed_subset( Y, X ) }.
% 0.71/1.17 { ! element( Y, powerset( the_carrier( X ) ) ), empty( Y ), !
% 0.71/1.17 directed_subset( Y, X ), alpha41( X, Y ) }.
% 0.71/1.17 { rel_str( skol13 ) }.
% 0.71/1.17 { ! empty_carrier( skol13 ) }.
% 0.71/1.17 { reflexive_relstr( skol13 ) }.
% 0.71/1.17 { transitive_relstr( skol13 ) }.
% 0.71/1.17 { antisymmetric_relstr( skol13 ) }.
% 0.71/1.17 { connected_relstr( skol13 ) }.
% 0.71/1.17 { rel_str( skol14 ) }.
% 0.71/1.17 { ! empty_carrier( skol14 ) }.
% 0.71/1.17 { strict_rel_str( skol14 ) }.
% 0.71/1.17 { reflexive_relstr( skol14 ) }.
% 0.71/1.17 { transitive_relstr( skol14 ) }.
% 0.71/1.17 { antisymmetric_relstr( skol14 ) }.
% 0.71/1.17 { with_suprema_relstr( skol14 ) }.
% 0.71/1.17 { with_infima_relstr( skol14 ) }.
% 0.71/1.17 { complete_relstr( skol14 ) }.
% 0.71/1.17 { lower_bounded_relstr( skol14 ) }.
% 0.71/1.17 { upper_bounded_relstr( skol14 ) }.
% 0.71/1.17 { bounded_relstr( skol14 ) }.
% 0.71/1.17 { up_complete_relstr( skol14 ) }.
% 0.71/1.17 { join_complete_relstr( skol14 ) }.
% 0.71/1.17 { ! empty( skol15 ) }.
% 0.71/1.17 { finite( skol15 ) }.
% 0.71/1.17 { rel_str( skol16 ) }.
% 0.71/1.17 { ! empty_carrier( skol16 ) }.
% 0.71/1.17 { strict_rel_str( skol16 ) }.
% 0.71/1.17 { reflexive_relstr( skol16 ) }.
% 0.71/1.17 { transitive_relstr( skol16 ) }.
% 0.71/1.17 { antisymmetric_relstr( skol16 ) }.
% 0.71/1.17 { complete_relstr( skol16 ) }.
% 0.71/1.17 { empty( skol17 ) }.
% 0.71/1.17 { relation( skol17 ) }.
% 0.71/1.17 { empty( X ), ! empty( skol18( Y ) ) }.
% 0.71/1.17 { empty( X ), element( skol18( X ), powerset( X ) ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), element( skol19( X ), powerset
% 0.71/1.17 ( the_carrier( X ) ) ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), open_subset( skol19( X ), X ) }
% 0.71/1.17 .
% 0.71/1.17 { ! rel_str( X ), element( skol20( X ), powerset( the_carrier( X ) ) ) }.
% 0.71/1.17 { ! rel_str( X ), directed_subset( skol20( X ), X ) }.
% 0.71/1.17 { ! rel_str( X ), filtered_subset( skol20( X ), X ) }.
% 0.71/1.17 { rel_str( skol21 ) }.
% 0.71/1.17 { ! empty_carrier( skol21 ) }.
% 0.71/1.17 { ! trivial_carrier( skol21 ) }.
% 0.71/1.17 { strict_rel_str( skol21 ) }.
% 0.71/1.17 { reflexive_relstr( skol21 ) }.
% 0.71/1.17 { transitive_relstr( skol21 ) }.
% 0.71/1.17 { antisymmetric_relstr( skol21 ) }.
% 0.71/1.17 { lower_bounded_relstr( skol21 ) }.
% 0.71/1.17 { upper_bounded_relstr( skol21 ) }.
% 0.71/1.17 { bounded_relstr( skol21 ) }.
% 0.71/1.17 { ! v1_yellow_3( skol21 ) }.
% 0.71/1.17 { distributive_relstr( skol21 ) }.
% 0.71/1.17 { heyting_relstr( skol21 ) }.
% 0.71/1.17 { complemented_relstr( skol21 ) }.
% 0.71/1.17 { boolean_relstr( skol21 ) }.
% 0.71/1.17 { with_suprema_relstr( skol21 ) }.
% 0.71/1.17 { with_infima_relstr( skol21 ) }.
% 0.71/1.17 { rel_str( skol22 ) }.
% 0.71/1.17 { ! empty_carrier( skol22 ) }.
% 0.71/1.17 { strict_rel_str( skol22 ) }.
% 0.71/1.17 { reflexive_relstr( skol22 ) }.
% 0.71/1.17 { transitive_relstr( skol22 ) }.
% 0.71/1.17 { antisymmetric_relstr( skol22 ) }.
% 0.71/1.17 { with_suprema_relstr( skol22 ) }.
% 0.71/1.17 { with_infima_relstr( skol22 ) }.
% 0.71/1.17 { complete_relstr( skol22 ) }.
% 0.71/1.17 { trivial_carrier( skol22 ) }.
% 0.71/1.17 { rel_str( skol23 ) }.
% 0.71/1.17 { ! empty_carrier( skol23 ) }.
% 0.71/1.17 { strict_rel_str( skol23 ) }.
% 0.71/1.17 { reflexive_relstr( skol23 ) }.
% 0.71/1.17 { transitive_relstr( skol23 ) }.
% 0.71/1.17 { antisymmetric_relstr( skol23 ) }.
% 0.71/1.17 { with_suprema_relstr( skol23 ) }.
% 0.71/1.17 { with_infima_relstr( skol23 ) }.
% 0.71/1.17 { complete_relstr( skol23 ) }.
% 0.71/1.17 { ! empty( skol24 ) }.
% 0.71/1.17 { relation( skol24 ) }.
% 0.71/1.17 { empty( skol25( Y ) ) }.
% 0.71/1.17 { element( skol25( X ), powerset( X ) ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), element( skol26( X ), powerset
% 0.71/1.17 ( the_carrier( X ) ) ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), open_subset( skol26( X ), X ) }
% 0.71/1.17 .
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), closed_subset( skol26( X ), X )
% 0.71/1.17 }.
% 0.71/1.17 { empty_carrier( X ), ! reflexive_relstr( X ), ! rel_str( X ), alpha17( X,
% 0.71/1.17 skol27( X ) ) }.
% 0.71/1.17 { empty_carrier( X ), ! reflexive_relstr( X ), ! rel_str( X ),
% 0.71/1.17 filtered_subset( skol27( X ), X ) }.
% 0.71/1.17 { ! alpha17( X, Y ), alpha33( X, Y ) }.
% 0.71/1.17 { ! alpha17( X, Y ), directed_subset( Y, X ) }.
% 0.71/1.17 { ! alpha33( X, Y ), ! directed_subset( Y, X ), alpha17( X, Y ) }.
% 0.71/1.17 { ! alpha33( X, Y ), element( Y, powerset( the_carrier( X ) ) ) }.
% 0.71/1.17 { ! alpha33( X, Y ), ! empty( Y ) }.
% 0.71/1.17 { ! alpha33( X, Y ), finite( Y ) }.
% 0.71/1.17 { ! element( Y, powerset( the_carrier( X ) ) ), empty( Y ), ! finite( Y ),
% 0.71/1.17 alpha33( X, Y ) }.
% 0.71/1.17 { ! empty( skol28( Y ) ) }.
% 0.71/1.17 { finite( skol28( Y ) ) }.
% 0.71/1.17 { element( skol28( X ), powerset( powerset( X ) ) ) }.
% 0.71/1.17 { rel_str( skol29 ) }.
% 0.71/1.17 { ! empty_carrier( skol29 ) }.
% 0.71/1.17 { reflexive_relstr( skol29 ) }.
% 0.71/1.17 { transitive_relstr( skol29 ) }.
% 0.71/1.17 { antisymmetric_relstr( skol29 ) }.
% 0.71/1.17 { with_suprema_relstr( skol29 ) }.
% 0.71/1.17 { with_infima_relstr( skol29 ) }.
% 0.71/1.17 { complete_relstr( skol29 ) }.
% 0.71/1.17 { lower_bounded_relstr( skol29 ) }.
% 0.71/1.17 { upper_bounded_relstr( skol29 ) }.
% 0.71/1.17 { bounded_relstr( skol29 ) }.
% 0.71/1.17 { empty( X ), ! empty( skol30( Y ) ) }.
% 0.71/1.17 { empty( X ), finite( skol30( Y ) ) }.
% 0.71/1.17 { empty( X ), element( skol30( X ), powerset( X ) ) }.
% 0.71/1.17 { relation( skol31 ) }.
% 0.71/1.17 { relation_empty_yielding( skol31 ) }.
% 0.71/1.17 { one_sorted_str( skol32 ) }.
% 0.71/1.17 { ! empty_carrier( skol32 ) }.
% 0.71/1.17 { empty_carrier( X ), ! topological_space( X ), ! top_str( X ), alpha18( X
% 0.71/1.17 , skol33( X ) ) }.
% 0.71/1.17 { empty_carrier( X ), ! topological_space( X ), ! top_str( X ),
% 0.71/1.17 closed_subset( skol33( X ), X ) }.
% 0.71/1.17 { ! alpha18( X, Y ), element( Y, powerset( the_carrier( X ) ) ) }.
% 0.71/1.17 { ! alpha18( X, Y ), ! empty( Y ) }.
% 0.71/1.17 { ! alpha18( X, Y ), open_subset( Y, X ) }.
% 0.71/1.17 { ! element( Y, powerset( the_carrier( X ) ) ), empty( Y ), ! open_subset(
% 0.71/1.17 Y, X ), alpha18( X, Y ) }.
% 0.71/1.17 { ! one_sorted_str( X ), ! empty( skol34( Y ) ) }.
% 0.71/1.17 { ! one_sorted_str( X ), finite( skol34( Y ) ) }.
% 0.71/1.17 { ! one_sorted_str( X ), element( skol34( X ), powerset( powerset(
% 0.71/1.17 the_carrier( X ) ) ) ) }.
% 0.71/1.17 { empty( X ), ! empty( skol35( Y ) ) }.
% 0.71/1.17 { empty( X ), finite( skol35( Y ) ) }.
% 0.71/1.17 { empty( X ), element( skol35( X ), powerset( X ) ) }.
% 0.71/1.17 { ! top_str( X ), alpha19( X, skol36( X ) ) }.
% 0.71/1.17 { ! top_str( X ), boundary_set( skol36( X ), X ) }.
% 0.71/1.17 { ! alpha19( X, Y ), alpha34( X, Y ) }.
% 0.71/1.17 { ! alpha19( X, Y ), v5_membered( Y ) }.
% 0.71/1.17 { ! alpha34( X, Y ), ! v5_membered( Y ), alpha19( X, Y ) }.
% 0.71/1.17 { ! alpha34( X, Y ), alpha42( X, Y ) }.
% 0.71/1.17 { ! alpha34( X, Y ), v4_membered( Y ) }.
% 0.71/1.17 { ! alpha42( X, Y ), ! v4_membered( Y ), alpha34( X, Y ) }.
% 0.71/1.17 { ! alpha42( X, Y ), alpha48( X, Y ) }.
% 0.71/1.17 { ! alpha42( X, Y ), v3_membered( Y ) }.
% 0.71/1.17 { ! alpha48( X, Y ), ! v3_membered( Y ), alpha42( X, Y ) }.
% 0.71/1.17 { ! alpha48( X, Y ), alpha53( X, Y ) }.
% 0.71/1.17 { ! alpha48( X, Y ), v2_membered( Y ) }.
% 0.71/1.17 { ! alpha53( X, Y ), ! v2_membered( Y ), alpha48( X, Y ) }.
% 0.71/1.17 { ! alpha53( X, Y ), element( Y, powerset( the_carrier( X ) ) ) }.
% 0.71/1.17 { ! alpha53( X, Y ), empty( Y ) }.
% 0.71/1.17 { ! alpha53( X, Y ), v1_membered( Y ) }.
% 0.71/1.17 { ! element( Y, powerset( the_carrier( X ) ) ), ! empty( Y ), ! v1_membered
% 0.71/1.17 ( Y ), alpha53( X, Y ) }.
% 0.71/1.17 { empty_carrier( X ), trivial_carrier( X ), ! reflexive_relstr( X ), !
% 0.71/1.17 transitive_relstr( X ), ! antisymmetric_relstr( X ), !
% 0.71/1.17 upper_bounded_relstr( X ), ! rel_str( X ), alpha20( X, skol37( X ) ) }.
% 0.71/1.17 { empty_carrier( X ), trivial_carrier( X ), ! reflexive_relstr( X ), !
% 0.71/1.17 transitive_relstr( X ), ! antisymmetric_relstr( X ), !
% 0.71/1.17 upper_bounded_relstr( X ), ! rel_str( X ), upper_relstr_subset( skol37( X
% 0.71/1.17 ), X ) }.
% 0.71/1.17 { ! alpha20( X, Y ), alpha35( X, Y ) }.
% 0.71/1.17 { ! alpha20( X, Y ), filtered_subset( Y, X ) }.
% 0.71/1.17 { ! alpha35( X, Y ), ! filtered_subset( Y, X ), alpha20( X, Y ) }.
% 0.71/1.17 { ! alpha35( X, Y ), element( Y, powerset( the_carrier( X ) ) ) }.
% 0.71/1.17 { ! alpha35( X, Y ), ! empty( Y ) }.
% 0.71/1.17 { ! alpha35( X, Y ), proper_element( Y, powerset( the_carrier( X ) ) ) }.
% 0.71/1.17 { ! element( Y, powerset( the_carrier( X ) ) ), empty( Y ), !
% 0.71/1.17 proper_element( Y, powerset( the_carrier( X ) ) ), alpha35( X, Y ) }.
% 0.71/1.17 { rel_str( skol38 ) }.
% 0.71/1.17 { ! empty_carrier( skol38 ) }.
% 0.71/1.17 { strict_rel_str( skol38 ) }.
% 0.71/1.17 { transitive_relstr( skol38 ) }.
% 0.71/1.17 { directed_relstr( skol38 ) }.
% 0.71/1.17 { empty_carrier( X ), ! one_sorted_str( X ), ! empty( skol39( Y ) ) }.
% 0.71/1.17 { empty_carrier( X ), ! one_sorted_str( X ), element( skol39( X ), powerset
% 0.71/1.17 ( the_carrier( X ) ) ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), alpha21( X, skol40( X ) ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), nowhere_dense( skol40( X ), X )
% 0.71/1.17 }.
% 0.71/1.17 { ! alpha21( X, Y ), alpha36( X, Y ) }.
% 0.71/1.17 { ! alpha21( X, Y ), boundary_set( Y, X ) }.
% 0.71/1.17 { ! alpha36( X, Y ), ! boundary_set( Y, X ), alpha21( X, Y ) }.
% 0.71/1.17 { ! alpha36( X, Y ), alpha43( X, Y ) }.
% 0.71/1.17 { ! alpha36( X, Y ), v5_membered( Y ) }.
% 0.71/1.17 { ! alpha43( X, Y ), ! v5_membered( Y ), alpha36( X, Y ) }.
% 0.71/1.17 { ! alpha43( X, Y ), alpha49( X, Y ) }.
% 0.71/1.17 { ! alpha43( X, Y ), v4_membered( Y ) }.
% 0.71/1.17 { ! alpha49( X, Y ), ! v4_membered( Y ), alpha43( X, Y ) }.
% 0.71/1.17 { ! alpha49( X, Y ), alpha54( X, Y ) }.
% 0.71/1.17 { ! alpha49( X, Y ), v3_membered( Y ) }.
% 0.71/1.17 { ! alpha54( X, Y ), ! v3_membered( Y ), alpha49( X, Y ) }.
% 0.71/1.17 { ! alpha54( X, Y ), alpha58( X, Y ) }.
% 0.71/1.17 { ! alpha54( X, Y ), v2_membered( Y ) }.
% 0.71/1.17 { ! alpha58( X, Y ), ! v2_membered( Y ), alpha54( X, Y ) }.
% 0.71/1.17 { ! alpha58( X, Y ), alpha62( X, Y ) }.
% 0.71/1.17 { ! alpha58( X, Y ), v1_membered( Y ) }.
% 0.71/1.17 { ! alpha62( X, Y ), ! v1_membered( Y ), alpha58( X, Y ) }.
% 0.71/1.17 { ! alpha62( X, Y ), alpha64( X, Y ) }.
% 0.71/1.17 { ! alpha62( X, Y ), closed_subset( Y, X ) }.
% 0.71/1.17 { ! alpha64( X, Y ), ! closed_subset( Y, X ), alpha62( X, Y ) }.
% 0.71/1.17 { ! alpha64( X, Y ), element( Y, powerset( the_carrier( X ) ) ) }.
% 0.71/1.17 { ! alpha64( X, Y ), empty( Y ) }.
% 0.71/1.17 { ! alpha64( X, Y ), open_subset( Y, X ) }.
% 0.71/1.17 { ! element( Y, powerset( the_carrier( X ) ) ), ! empty( Y ), ! open_subset
% 0.71/1.17 ( Y, X ), alpha64( X, Y ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), element( skol41( X ), powerset
% 0.71/1.17 ( the_carrier( X ) ) ) }.
% 0.71/1.17 { ! topological_space( X ), ! top_str( X ), closed_subset( skol41( X ), X )
% 0.71/1.17 }.
% 0.71/1.17 { empty_carrier( X ), ! topological_space( X ), ! top_str( X ), ! empty(
% 0.71/1.17 skol42( Y ) ) }.
% 0.71/1.17 { empty_carrier( X ), ! topological_space( X ), ! top_str( X ), element(
% 0.71/1.17 skol42( X ), powerset( the_carrier( X ) ) ) }.
% 0.71/1.17 { empty_carrier( X ), ! topological_space( X ), ! top_str( X ),
% 0.71/1.17 closed_subset( skol42( X ), X ) }.
% 0.71/1.17 { ! rel_str( X ), element( skol43( X ), powerset( the_carrier( X ) ) ) }.
% 0.71/1.17 { ! rel_str( X ), lower_relstr_subset( skol43( X ), X ) }.
% 0.71/1.17 { ! rel_str( X ), upper_relstr_subset( skol43( X ), X ) }.
% 0.71/1.17 { empty_carrier( X ), ! rel_str( X ), alpha22( X, skol44( X ) ) }.
% 0.71/1.17 { empty_carrier( X ), ! rel_str( X ), upper_relstr_subset( skol44( X ), X )
% 0.71/1.17 }.
% 0.71/1.17 { ! alpha22( X, Y ), element( Y, powerset( the_carrier( X ) ) ) }.
% 0.71/1.17 { ! alpha22( X, Y ), ! empty( Y ) }.
% 0.71/1.17 { ! alpha22( X, Y ), lower_relstr_subset( Y, X ) }.
% 0.71/1.17 { ! element( Y, powerset( the_carrier( X ) ) ), empty( Y ), !
% 0.71/1.17 lower_relstr_subset( Y, X ), alpha22( X, Y ) }.
% 0.71/1.17 { empty_carrier( X ), ! reflexive_relstr( X ), ! transitive_relstr( X ), !
% 0.71/1.17 rel_str( X ), alpha23( X, skol45( X ) ) }.
% 0.71/1.17 { empty_carrier( X ), ! reflexive_relstr( X ), ! transitive_relstr( X ), !
% 0.71/1.17 rel_str( X ), lower_relstr_subset( skol45( X ), X ) }.
% 0.71/1.17 { ! alpha23( X, Y ), element( Y, powerset( the_carrier( X ) ) ) }.
% 0.71/1.17 { ! alpha23( X, Y ), ! empty( Y ) }.
% 0.71/1.17 { ! alpha23( X, Y ), directed_subset( Y, X ) }.
% 0.71/1.17 { ! element( Y, powerset( the_carrier( X ) ) ), empty( Y ), !
% 0.71/1.17 directed_subset( Y, X ), alpha23( X, Y ) }.
% 0.71/1.17 { ! relation_of2_as_subset( Z, X, Y ), relation_of2( Z, X, Y ) }.
% 0.71/1.17 { ! relation_of2( Z, X, Y ), relation_of2_as_subset( Z, X, Y ) }.
% 0.71/1.17 { subset( X, X ) }.
% 0.71/1.17 { ! element( Y, powerset( the_carrier( boole_POSet( X ) ) ) ), !
% 0.71/1.17 upper_relstr_subset( Y, boole_POSet( X ) ), ! alpha2( X, Y, Z ), in( Z, Y
% 0.71/1.17 ) }.
% 0.71/1.17 { ! element( Y, powerset( the_carrier( boole_POSet( X ) ) ) ), ! in( skol46
% 0.71/1.17 ( Z, Y ), Y ), upper_relstr_subset( Y, boole_POSet( X ) ) }.
% 0.71/1.17 { ! element( Y, powerset( the_carrier( boole_POSet( X ) ) ) ), alpha2( X, Y
% 0.71/1.17 , skol46( X, Y ) ), upper_relstr_subset( Y, boole_POSet( X ) ) }.
% 0.71/1.17 { ! alpha2( X, Y, Z ), subset( skol47( T, U, Z ), Z ) }.
% 0.71/1.17 { ! alpha2( X, Y, Z ), alpha4( X, Y, Z, skol47( X, Y, Z ) ) }.
% 0.71/1.17 { ! subset( T, Z ), ! alpha4( X, Y, Z, T ), alpha2( X, Y, Z ) }.
% 0.71/1.17 { ! alpha4( X, Y, Z, T ), subset( Z, X ) }.
% 0.71/1.17 { ! alpha4( X, Y, Z, T ), in( T, Y ) }.
% 0.71/1.17 { ! subset( Z, X ), ! in( T, Y ), alpha4( X, Y, Z, T ) }.
% 0.71/1.17 { ! one_sorted_str( X ), cast_as_carrier_subset( X ) = the_carrier( X ) }.
% 0.71/1.17 { ! in( X, Y ), element( X, Y ) }.
% 0.71/1.17 { ! element( X, Y ), empty( Y ), in( X, Y ) }.
% 0.71/1.17 { alpha24( X, Y, skol48( X, Y ) ), in( skol48( X, Y ), Y ), X = Y }.
% 0.71/1.17 { alpha24( X, Y, skol48( X, Y ) ), ! in( skol48( X, Y ), X ), X = Y }.
% 0.71/1.17 { ! alpha24( X, Y, Z ), in( Z, X ) }.
% 0.71/1.17 { ! alpha24( X, Y, Z ), ! in( Z, Y ) }.
% 0.71/1.17 { ! in( Z, X ), in( Z, Y ), alpha24( X, Y, Z ) }.
% 0.71/1.17 { ! element( X, powerset( Y ) ), subset( X, Y ) }.
% 0.71/1.17 { ! subset( X, Y ), element( X, powerset( Y ) ) }.
% 0.71/1.17 { empty_carrier( X ), ! topological_space( X ), ! top_str( X ), ! element(
% 0.71/1.17 Y, the_carrier( X ) ), ! in( Z, neighborhood_system( X, Y ) ),
% 0.71/1.17 point_neighbourhood( Z, X, Y ) }.
% 0.71/1.17 { empty_carrier( X ), ! topological_space( X ), ! top_str( X ), ! element(
% 0.71/1.17 Y, the_carrier( X ) ), ! point_neighbourhood( Z, X, Y ), in( Z,
% 0.71/1.17 neighborhood_system( X, Y ) ) }.
% 0.71/1.17 { ! top_str( X ), ! element( Y, powerset( the_carrier( X ) ) ), subset(
% 0.71/1.17 interior( X, Y ), Y ) }.
% 0.71/1.17 { ! in( X, Z ), ! element( Z, powerset( Y ) ), element( X, Y ) }.
% 0.71/1.17 { ! empty_carrier( skol49 ) }.
% 0.71/1.17 { topological_space( skol49 ) }.
% 0.71/1.17 { top_str( skol49 ) }.
% 0.71/1.17 { element( skol50, the_carrier( skol49 ) ) }.
% 0.71/1.17 { upper_relstr_subset( skol51, boole_POSet( cast_as_carrier_subset( skol49
% 0.71/1.17 ) ) ) }.
% 0.71/1.17 { element( skol51, powerset( the_carrier( boole_POSet(
% 0.71/1.17 cast_as_carrier_subset( skol49 ) ) ) ) ) }.
% 0.71/1.17 { alpha25( skol49, skol50, skol51 ), subset( neighborhood_system( skol49,
% 0.71/1.17 skol50 ), skol51 ) }.
% 0.71/1.17 { alpha25( skol49, skol50, skol51 ), ! is_a_convergence_point_of_set(
% 0.71/1.17 skol49, skol51, skol50 ) }.
% 0.71/1.17 { ! alpha25( X, Y, Z ), is_a_convergence_point_of_set( X, Z, Y ) }.
% 0.71/1.17 { ! alpha25( X, Y, Z ), ! subset( neighborhood_system( X, Y ), Z ) }.
% 0.71/1.17 { ! is_a_convergence_point_of_set( X, Z, Y ), subset( neighborhood_system(
% 0.71/1.17 X, Y ), Z ), alpha25( X, Y, Z ) }.
% 0.71/1.17 { empty_carrier( X ), ! topological_space( X ), ! top_str( X ), ! element(
% 0.71/1.17 Y, powerset( the_carrier( X ) ) ), ! element( Z, the_carrier( X ) ), !
% 0.71/1.17 open_subset( Y, X ), ! in( Z, Y ), point_neighbourhood( Y, X, Z ) }.
% 0.71/1.17 { ! in( X, Y ), ! element( Y, powerset( Z ) ), ! empty( Z ) }.
% 0.71/1.17 { ! empty( X ), X = empty_set }.
% 0.71/1.17 { ! in( X, Y ), ! empty( Y ) }.
% 0.71/1.17 { ! empty( X ), X = Y, ! empty( Y ) }.
% 0.71/1.17
% 0.71/1.17 *** allocated 15000 integers for clauses
% 0.71/1.17 *** allocated 22500 integers for clauses
% 0.71/1.17 percentage equality = 0.010744, percentage horn = 0.840319
% 0.71/1.17 This is a problem with some equality
% 0.71/1.17
% 0.71/1.17
% 0.71/1.17
% 0.71/1.17 Options Used:
% 0.71/1.17
% 0.71/1.17 useres = 1
% 0.71/1.17 useparamod = 1
% 0.71/1.17 useeqrefl = 1
% 0.71/1.17 useeqfact = 1
% 0.71/1.17 usefactor = 1
% 0.71/1.17 usesimpsplitting = 0
% 0.71/1.17 usesimpdemod = 5
% 0.71/1.17 usesimpres = 3
% 0.71/1.17
% 0.71/1.17 resimpinuse = 1000
% 0.71/1.17 resimpclauses = 20000
% 0.71/1.17 substype = eqrewr
% 0.71/1.17 backwardsubs = 1
% 0.71/1.17 selectoldest = 5
% 0.71/1.17
% 0.71/1.17 litorderings [0] = split
% 0.71/1.17 litorderings [1] = extend the termordering, first sorting on arguments
% 0.71/1.17
% 0.71/1.17 termordering = kbo
% 0.71/1.17
% 0.71/1.17 litapriori = 0
% 0.71/1.17 termapriori = 1
% 0.71/1.17 litaposteriori = 0
% 0.71/1.17 termaposteriori = 0
% 0.71/1.17 demodaposteriori = 0
% 0.71/1.17 ordereqreflfact = 0
% 0.71/1.17
% 0.71/1.17 litselect = negord
% 0.71/1.17
% 0.71/1.17 maxweight = 15
% 0.71/1.17 maxdepth = 30000
% 0.71/1.17 maxlength = 115
% 0.71/1.17 maxnrvars = 195
% 0.71/1.17 excuselevel = 1
% 0.71/1.17 increasemaxweight = 1
% 0.71/1.17
% 0.71/1.17 maxselected = 10000000
% 0.71/1.17 maxnrclauses = 10000000
% 0.71/1.17
% 0.71/1.17 showgenerated = 0
% 0.71/1.17 showkept = 0
% 0.71/1.17 showselected = 0
% 0.71/1.17 showdeleted = 0
% 0.71/1.17 showresimp = 1
% 0.71/1.17 showstatus = 2000
% 0.71/1.17
% 0.71/1.17 prologoutput = 0
% 0.71/1.17 nrgoals = 5000000
% 0.71/1.17 totalproof = 1
% 0.71/1.17
% 0.71/1.17 Symbols occurring in the translation:
% 0.71/1.17
% 0.71/1.17 {} [0, 0] (w:1, o:2, a:1, s:1, b:0),
% 0.71/1.17 . [1, 2] (w:1, o:127, a:1, s:1, b:0),
% 0.71/1.17 && [3, 0] (w:1, o:4, a:1, s:1, b:0),
% 0.71/1.17 ! [4, 1] (w:0, o:30, a:1, s:1, b:0),
% 0.71/1.17 = [13, 2] (w:1, o:0, a:0, s:1, b:0),
% 0.71/1.17 ==> [14, 2] (w:1, o:0, a:0, s:1, b:0),
% 0.71/1.17 rel_str [36, 1] (w:1, o:35, a:1, s:1, b:0),
% 0.71/1.17 strict_rel_str [37, 1] (w:1, o:39, a:1, s:1, b:0),
% 0.71/1.17 the_carrier [38, 1] (w:1, o:63, a:1, s:1, b:0),
% 0.71/1.17 the_InternalRel [39, 1] (w:1, o:64, a:1, s:1, b:0),
% 0.71/1.17 rel_str_of [40, 2] (w:1, o:151, a:1, s:1, b:0),
% 0.71/1.17 in [42, 2] (w:1, o:152, a:1, s:1, b:0),
% 0.71/1.17 empty_carrier [43, 1] (w:1, o:99, a:1, s:1, b:0),
% 0.71/1.17 reflexive_relstr [44, 1] (w:1, o:36, a:1, s:1, b:0),
% 0.71/1.17 complete_relstr [45, 1] (w:1, o:102, a:1, s:1, b:0),
% 0.71/1.17 up_complete_relstr [46, 1] (w:1, o:107, a:1, s:1, b:0),
% 0.71/1.17 join_complete_relstr [47, 1] (w:1, o:108, a:1, s:1, b:0),
% 0.71/1.17 lower_bounded_relstr [48, 1] (w:1, o:109, a:1, s:1, b:0),
% 0.71/1.17 transitive_relstr [49, 1] (w:1, o:103, a:1, s:1, b:0),
% 0.71/1.17 antisymmetric_relstr [50, 1] (w:1, o:110, a:1, s:1, b:0),
% 0.71/1.17 with_suprema_relstr [51, 1] (w:1, o:117, a:1, s:1, b:0),
% 0.71/1.17 with_infima_relstr [52, 1] (w:1, o:118, a:1, s:1, b:0),
% 0.71/1.17 upper_bounded_relstr [53, 1] (w:1, o:119, a:1, s:1, b:0),
% 0.71/1.17 bounded_relstr [54, 1] (w:1, o:100, a:1, s:1, b:0),
% 0.71/1.17 empty [55, 1] (w:1, o:120, a:1, s:1, b:0),
% 0.71/1.17 finite [56, 1] (w:1, o:121, a:1, s:1, b:0),
% 0.71/1.17 relation [57, 1] (w:1, o:37, a:1, s:1, b:0),
% 0.71/1.17 cartesian_product2 [59, 2] (w:1, o:191, a:1, s:1, b:0),
% 0.71/1.17 powerset [60, 1] (w:1, o:123, a:1, s:1, b:0),
% 0.71/1.17 element [61, 2] (w:1, o:194, a:1, s:1, b:0),
% 0.71/1.17 topological_space [62, 1] (w:1, o:104, a:1, s:1, b:0),
% 0.71/1.17 top_str [63, 1] (w:1, o:105, a:1, s:1, b:0),
% 0.71/1.17 open_subset [64, 2] (w:1, o:197, a:1, s:1, b:0),
% 0.71/1.17 closed_subset [65, 2] (w:1, o:198, a:1, s:1, b:0),
% 0.71/1.17 boundary_set [66, 2] (w:1, o:190, a:1, s:1, b:0),
% 0.71/1.17 trivial_carrier [67, 1] (w:1, o:106, a:1, s:1, b:0),
% 0.71/1.17 nowhere_dense [68, 2] (w:1, o:195, a:1, s:1, b:0),
% 0.71/1.17 connected_relstr [69, 1] (w:1, o:124, a:1, s:1, b:0),
% 0.71/1.17 v1_membered [70, 1] (w:1, o:111, a:1, s:1, b:0),
% 0.71/1.17 v2_membered [71, 1] (w:1, o:113, a:1, s:1, b:0),
% 0.71/1.17 v3_membered [72, 1] (w:1, o:114, a:1, s:1, b:0),
% 0.71/1.17 v4_membered [73, 1] (w:1, o:115, a:1, s:1, b:0),
% 0.71/1.17 v5_membered [74, 1] (w:1, o:116, a:1, s:1, b:0),
% 0.71/1.17 point_neighbourhood [75, 3] (w:1, o:211, a:1, s:1, b:0),
% 0.71/1.17 interior [76, 2] (w:1, o:199, a:1, s:1, b:0),
% 0.71/1.17 neighborhood_system [77, 2] (w:1, o:196, a:1, s:1, b:0),
% 0.71/1.17 a_2_0_yellow19 [78, 2] (w:1, o:153, a:1, s:1, b:0),
% 0.71/1.17 subset [79, 2] (w:1, o:200, a:1, s:1, b:0),
% 0.71/1.17 is_a_convergence_point_of_set [80, 3] (w:1, o:212, a:1, s:1, b:0),
% 0.71/1.17 relation_of2 [82, 3] (w:1, o:213, a:1, s:1, b:0),
% 0.71/1.17 cast_as_carrier_subset [83, 1] (w:1, o:125, a:1, s:1, b:0),
% 0.71/1.17 boole_POSet [84, 1] (w:1, o:101, a:1, s:1, b:0),
% 0.71/1.17 one_sorted_str [85, 1] (w:1, o:122, a:1, s:1, b:0),
% 0.71/1.17 relation_of2_as_subset [86, 3] (w:1, o:214, a:1, s:1, b:0),
% 0.71/1.17 empty_set [87, 0] (w:1, o:10, a:1, s:1, b:0),
% 0.71/1.17 relation_empty_yielding [88, 1] (w:1, o:38, a:1, s:1, b:0),
% 0.71/1.17 lower_relstr_subset [89, 2] (w:1, o:201, a:1, s:1, b:0),
% 0.77/1.50 upper_relstr_subset [90, 2] (w:1, o:202, a:1, s:1, b:0),
% 0.77/1.50 v1_yellow_3 [91, 1] (w:1, o:112, a:1, s:1, b:0),
% 0.77/1.50 distributive_relstr [92, 1] (w:1, o:98, a:1, s:1, b:0),
% 0.77/1.50 heyting_relstr [93, 1] (w:1, o:126, a:1, s:1, b:0),
% 0.77/1.50 complemented_relstr [94, 1] (w:1, o:96, a:1, s:1, b:0),
% 0.77/1.50 boolean_relstr [95, 1] (w:1, o:95, a:1, s:1, b:0),
% 0.77/1.50 filtered_subset [96, 2] (w:1, o:203, a:1, s:1, b:0),
% 0.77/1.50 proper_element [97, 2] (w:1, o:204, a:1, s:1, b:0),
% 0.77/1.50 directed_subset [98, 2] (w:1, o:192, a:1, s:1, b:0),
% 0.77/1.50 directed_relstr [99, 1] (w:1, o:97, a:1, s:1, b:0),
% 0.77/1.50 dense [100, 2] (w:1, o:193, a:1, s:1, b:0),
% 0.77/1.50 alpha1 [101, 3] (w:1, o:215, a:1, s:1, b:1),
% 0.77/1.50 alpha2 [102, 3] (w:1, o:216, a:1, s:1, b:1),
% 0.77/1.50 alpha3 [103, 4] (w:1, o:222, a:1, s:1, b:1),
% 0.77/1.50 alpha4 [104, 4] (w:1, o:223, a:1, s:1, b:1),
% 0.77/1.50 alpha5 [105, 1] (w:1, o:68, a:1, s:1, b:1),
% 0.77/1.50 alpha6 [106, 1] (w:1, o:74, a:1, s:1, b:1),
% 0.77/1.50 alpha7 [107, 1] (w:1, o:82, a:1, s:1, b:1),
% 0.77/1.50 alpha8 [108, 1] (w:1, o:86, a:1, s:1, b:1),
% 0.77/1.50 alpha9 [109, 1] (w:1, o:87, a:1, s:1, b:1),
% 0.77/1.50 alpha10 [110, 2] (w:1, o:154, a:1, s:1, b:1),
% 0.77/1.50 alpha11 [111, 1] (w:1, o:88, a:1, s:1, b:1),
% 0.77/1.50 alpha12 [112, 2] (w:1, o:155, a:1, s:1, b:1),
% 0.77/1.50 alpha13 [113, 2] (w:1, o:156, a:1, s:1, b:1),
% 0.77/1.50 alpha14 [114, 1] (w:1, o:89, a:1, s:1, b:1),
% 0.77/1.50 alpha15 [115, 2] (w:1, o:157, a:1, s:1, b:1),
% 0.77/1.50 alpha16 [116, 2] (w:1, o:158, a:1, s:1, b:1),
% 0.77/1.50 alpha17 [117, 2] (w:1, o:159, a:1, s:1, b:1),
% 0.77/1.50 alpha18 [118, 2] (w:1, o:160, a:1, s:1, b:1),
% 0.77/1.50 alpha19 [119, 2] (w:1, o:161, a:1, s:1, b:1),
% 0.77/1.50 alpha20 [120, 2] (w:1, o:162, a:1, s:1, b:1),
% 0.77/1.50 alpha21 [121, 2] (w:1, o:163, a:1, s:1, b:1),
% 0.77/1.50 alpha22 [122, 2] (w:1, o:164, a:1, s:1, b:1),
% 0.77/1.50 alpha23 [123, 2] (w:1, o:165, a:1, s:1, b:1),
% 0.77/1.50 alpha24 [124, 3] (w:1, o:217, a:1, s:1, b:1),
% 0.77/1.50 alpha25 [125, 3] (w:1, o:218, a:1, s:1, b:1),
% 0.77/1.50 alpha26 [126, 1] (w:1, o:90, a:1, s:1, b:1),
% 0.77/1.50 alpha27 [127, 1] (w:1, o:91, a:1, s:1, b:1),
% 0.77/1.50 alpha28 [128, 1] (w:1, o:92, a:1, s:1, b:1),
% 0.77/1.50 alpha29 [129, 2] (w:1, o:166, a:1, s:1, b:1),
% 0.77/1.50 alpha30 [130, 2] (w:1, o:167, a:1, s:1, b:1),
% 0.77/1.50 alpha31 [131, 1] (w:1, o:93, a:1, s:1, b:1),
% 0.77/1.50 alpha32 [132, 2] (w:1, o:168, a:1, s:1, b:1),
% 0.77/1.50 alpha33 [133, 2] (w:1, o:169, a:1, s:1, b:1),
% 0.77/1.50 alpha34 [134, 2] (w:1, o:170, a:1, s:1, b:1),
% 0.77/1.50 alpha35 [135, 2] (w:1, o:171, a:1, s:1, b:1),
% 0.77/1.50 alpha36 [136, 2] (w:1, o:172, a:1, s:1, b:1),
% 0.77/1.50 alpha37 [137, 1] (w:1, o:94, a:1, s:1, b:1),
% 0.77/1.50 alpha38 [138, 2] (w:1, o:173, a:1, s:1, b:1),
% 0.77/1.50 alpha39 [139, 2] (w:1, o:174, a:1, s:1, b:1),
% 0.77/1.50 alpha40 [140, 1] (w:1, o:65, a:1, s:1, b:1),
% 0.77/1.50 alpha41 [141, 2] (w:1, o:175, a:1, s:1, b:1),
% 0.77/1.50 alpha42 [142, 2] (w:1, o:176, a:1, s:1, b:1),
% 0.77/1.50 alpha43 [143, 2] (w:1, o:177, a:1, s:1, b:1),
% 0.77/1.50 alpha44 [144, 1] (w:1, o:66, a:1, s:1, b:1),
% 0.77/1.50 alpha45 [145, 2] (w:1, o:178, a:1, s:1, b:1),
% 0.77/1.50 alpha46 [146, 2] (w:1, o:179, a:1, s:1, b:1),
% 0.77/1.50 alpha47 [147, 1] (w:1, o:67, a:1, s:1, b:1),
% 0.77/1.50 alpha48 [148, 2] (w:1, o:180, a:1, s:1, b:1),
% 0.77/1.50 alpha49 [149, 2] (w:1, o:181, a:1, s:1, b:1),
% 0.77/1.50 alpha50 [150, 1] (w:1, o:69, a:1, s:1, b:1),
% 0.77/1.50 alpha51 [151, 2] (w:1, o:182, a:1, s:1, b:1),
% 0.77/1.50 alpha52 [152, 1] (w:1, o:70, a:1, s:1, b:1),
% 0.77/1.50 alpha53 [153, 2] (w:1, o:183, a:1, s:1, b:1),
% 0.77/1.50 alpha54 [154, 2] (w:1, o:184, a:1, s:1, b:1),
% 0.77/1.50 alpha55 [155, 1] (w:1, o:71, a:1, s:1, b:1),
% 0.77/1.50 alpha56 [156, 2] (w:1, o:185, a:1, s:1, b:1),
% 0.77/1.50 alpha57 [157, 1] (w:1, o:72, a:1, s:1, b:1),
% 0.77/1.50 alpha58 [158, 2] (w:1, o:186, a:1, s:1, b:1),
% 0.77/1.50 alpha59 [159, 1] (w:1, o:73, a:1, s:1, b:1),
% 0.77/1.50 alpha60 [160, 2] (w:1, o:187, a:1, s:1, b:1),
% 0.77/1.50 alpha61 [161, 1] (w:1, o:75, a:1, s:1, b:1),
% 0.77/1.50 alpha62 [162, 2] (w:1, o:188, a:1, s:1, b:1),
% 0.77/1.50 alpha63 [163, 1] (w:1, o:76, a:1, s:1, b:1),
% 0.77/1.50 alpha64 [164, 2] (w:1, o:189, a:1, s:1, b:1),
% 0.77/1.50 alpha65 [165, 1] (w:1, o:77, a:1, s:1, b:1),
% 0.77/1.50 alpha66 [166, 1] (w:1, o:78, a:1, s:1, b:1),
% 9.13/9.53 alpha67 [167, 1] (w:1, o:79, a:1, s:1, b:1),
% 9.13/9.53 alpha68 [168, 1] (w:1, o:80, a:1, s:1, b:1),
% 9.13/9.53 alpha69 [169, 1] (w:1, o:81, a:1, s:1, b:1),
% 9.13/9.53 alpha70 [170, 1] (w:1, o:83, a:1, s:1, b:1),
% 9.13/9.53 alpha71 [171, 1] (w:1, o:84, a:1, s:1, b:1),
% 9.13/9.53 alpha72 [172, 1] (w:1, o:85, a:1, s:1, b:1),
% 9.13/9.53 skol1 [173, 2] (w:1, o:205, a:1, s:1, b:1),
% 9.13/9.53 skol2 [174, 3] (w:1, o:220, a:1, s:1, b:1),
% 9.13/9.53 skol3 [175, 0] (w:1, o:16, a:1, s:1, b:1),
% 9.13/9.53 skol4 [176, 0] (w:1, o:20, a:1, s:1, b:1),
% 9.13/9.53 skol5 [177, 0] (w:1, o:22, a:1, s:1, b:1),
% 9.13/9.53 skol6 [178, 2] (w:1, o:206, a:1, s:1, b:1),
% 9.13/9.53 skol7 [179, 2] (w:1, o:207, a:1, s:1, b:1),
% 9.13/9.53 skol8 [180, 1] (w:1, o:40, a:1, s:1, b:1),
% 9.13/9.53 skol9 [181, 2] (w:1, o:208, a:1, s:1, b:1),
% 9.13/9.53 skol10 [182, 3] (w:1, o:219, a:1, s:1, b:1),
% 9.13/9.53 skol11 [183, 1] (w:1, o:41, a:1, s:1, b:1),
% 9.13/9.53 skol12 [184, 1] (w:1, o:42, a:1, s:1, b:1),
% 9.13/9.53 skol13 [185, 0] (w:1, o:23, a:1, s:1, b:1),
% 9.13/9.53 skol14 [186, 0] (w:1, o:24, a:1, s:1, b:1),
% 9.13/9.53 skol15 [187, 0] (w:1, o:25, a:1, s:1, b:1),
% 9.13/9.53 skol16 [188, 0] (w:1, o:26, a:1, s:1, b:1),
% 9.13/9.53 skol17 [189, 0] (w:1, o:27, a:1, s:1, b:1),
% 9.13/9.53 skol18 [190, 1] (w:1, o:43, a:1, s:1, b:1),
% 9.13/9.53 skol19 [191, 1] (w:1, o:44, a:1, s:1, b:1),
% 9.13/9.53 skol20 [192, 1] (w:1, o:45, a:1, s:1, b:1),
% 9.13/9.53 skol21 [193, 0] (w:1, o:11, a:1, s:1, b:1),
% 9.13/9.53 skol22 [194, 0] (w:1, o:12, a:1, s:1, b:1),
% 9.13/9.53 skol23 [195, 0] (w:1, o:13, a:1, s:1, b:1),
% 9.13/9.53 skol24 [196, 0] (w:1, o:14, a:1, s:1, b:1),
% 9.13/9.53 skol25 [197, 1] (w:1, o:46, a:1, s:1, b:1),
% 9.13/9.53 skol26 [198, 1] (w:1, o:47, a:1, s:1, b:1),
% 9.13/9.53 skol27 [199, 1] (w:1, o:48, a:1, s:1, b:1),
% 9.13/9.53 skol28 [200, 1] (w:1, o:49, a:1, s:1, b:1),
% 9.13/9.53 skol29 [201, 0] (w:1, o:15, a:1, s:1, b:1),
% 9.13/9.53 skol30 [202, 1] (w:1, o:50, a:1, s:1, b:1),
% 9.13/9.53 skol31 [203, 0] (w:1, o:17, a:1, s:1, b:1),
% 9.13/9.53 skol32 [204, 0] (w:1, o:18, a:1, s:1, b:1),
% 9.13/9.53 skol33 [205, 1] (w:1, o:51, a:1, s:1, b:1),
% 9.13/9.53 skol34 [206, 1] (w:1, o:52, a:1, s:1, b:1),
% 9.13/9.53 skol35 [207, 1] (w:1, o:53, a:1, s:1, b:1),
% 9.13/9.53 skol36 [208, 1] (w:1, o:54, a:1, s:1, b:1),
% 9.13/9.53 skol37 [209, 1] (w:1, o:55, a:1, s:1, b:1),
% 9.13/9.53 skol38 [210, 0] (w:1, o:19, a:1, s:1, b:1),
% 9.13/9.53 skol39 [211, 1] (w:1, o:56, a:1, s:1, b:1),
% 9.13/9.53 skol40 [212, 1] (w:1, o:57, a:1, s:1, b:1),
% 9.13/9.53 skol41 [213, 1] (w:1, o:58, a:1, s:1, b:1),
% 9.13/9.53 skol42 [214, 1] (w:1, o:59, a:1, s:1, b:1),
% 9.13/9.53 skol43 [215, 1] (w:1, o:60, a:1, s:1, b:1),
% 9.13/9.53 skol44 [216, 1] (w:1, o:61, a:1, s:1, b:1),
% 9.13/9.53 skol45 [217, 1] (w:1, o:62, a:1, s:1, b:1),
% 9.13/9.53 skol46 [218, 2] (w:1, o:209, a:1, s:1, b:1),
% 9.13/9.53 skol47 [219, 3] (w:1, o:221, a:1, s:1, b:1),
% 9.13/9.53 skol48 [220, 2] (w:1, o:210, a:1, s:1, b:1),
% 9.13/9.53 skol49 [221, 0] (w:1, o:21, a:1, s:1, b:1),
% 9.13/9.53 skol50 [222, 0] (w:1, o:28, a:1, s:1, b:1),
% 9.13/9.53 skol51 [223, 0] (w:1, o:29, a:1, s:1, b:1).
% 9.13/9.53
% 9.13/9.53
% 9.13/9.53 Starting Search:
% 9.13/9.53
% 9.13/9.53 *** allocated 33750 integers for clauses
% 9.13/9.53 *** allocated 50625 integers for clauses
% 9.13/9.53 Resimplifying inuse:
% 9.13/9.53 Done
% 9.13/9.53
% 9.13/9.53 *** allocated 75937 integers for clauses
% 9.13/9.53 *** allocated 33750 integers for termspace/termends
% 9.13/9.53 *** allocated 113905 integers for clauses
% 9.13/9.53
% 9.13/9.53 Intermediate Status:
% 9.13/9.53 Generated: 7454
% 9.13/9.53 Kept: 2022
% 9.13/9.53 Inuse: 647
% 9.13/9.53 Deleted: 4
% 9.13/9.53 Deletedinuse: 0
% 9.13/9.53
% 9.13/9.53 Resimplifying inuse:
% 9.13/9.53 Done
% 9.13/9.53
% 9.13/9.53 *** allocated 170857 integers for clauses
% 9.13/9.53 *** allocated 50625 integers for termspace/termends
% 9.13/9.53 *** allocated 75937 integers for termspace/termends
% 9.13/9.53 Resimplifying inuse:
% 9.13/9.53 Done
% 9.13/9.53
% 9.13/9.53 *** allocated 256285 integers for clauses
% 9.13/9.53
% 9.13/9.53 Intermediate Status:
% 9.13/9.53 Generated: 13486
% 9.13/9.53 Kept: 4090
% 9.13/9.53 Inuse: 875
% 9.13/9.53 Deleted: 17
% 9.13/9.53 Deletedinuse: 1
% 9.13/9.53
% 9.13/9.53 Resimplifying inuse:
% 9.13/9.53 Done
% 9.13/9.53
% 9.13/9.53 *** allocated 113905 integers for termspace/termends
% 9.13/9.53 Resimplifying inuse:
% 9.13/9.53 Done
% 9.13/9.53
% 9.13/9.53 *** allocated 384427 integers for clauses
% 9.13/9.53
% 9.13/9.53 Intermediate Status:
% 9.13/9.53 Generated: 20183
% 9.13/9.53 Kept: 6111
% 9.13/9.53 Inuse: 1235
% 9.13/9.53 Deleted: 20
% 9.13/9.53 Deletedinuse: 4
% 9.13/9.53
% 9.13/9.53 Resimplifying inuse:
% 9.13/9.53 Done
% 9.13/9.53
% 9.13/9.53 Resimplifying inuse:
% 9.13/9.53 Done
% 9.13/9.53
% 9.13/9.53 *** allocated 170857 integers for termspace/termends
% 9.13/9.53
% 9.13/9.53 Intermediate Status:
% 9.13/9.53 Generated: 25074
% 9.13/9.53 Kept: 8124
% 9.13/9.53 Inuse: 1515
% 25.43/25.84 Deleted: 103
% 25.43/25.84 Deletedinuse: 22
% 25.43/25.84
% 25.43/25.84 *** allocated 576640 integers for clauses
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84
% 25.43/25.84 Intermediate Status:
% 25.43/25.84 Generated: 28082
% 25.43/25.84 Kept: 10133
% 25.43/25.84 Inuse: 1557
% 25.43/25.84 Deleted: 262
% 25.43/25.84 Deletedinuse: 173
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 *** allocated 256285 integers for termspace/termends
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84
% 25.43/25.84 Intermediate Status:
% 25.43/25.84 Generated: 33579
% 25.43/25.84 Kept: 12134
% 25.43/25.84 Inuse: 1683
% 25.43/25.84 Deleted: 376
% 25.43/25.84 Deletedinuse: 255
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 *** allocated 864960 integers for clauses
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84
% 25.43/25.84 Intermediate Status:
% 25.43/25.84 Generated: 40031
% 25.43/25.84 Kept: 14138
% 25.43/25.84 Inuse: 1854
% 25.43/25.84 Deleted: 403
% 25.43/25.84 Deletedinuse: 257
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84
% 25.43/25.84 Intermediate Status:
% 25.43/25.84 Generated: 46395
% 25.43/25.84 Kept: 16141
% 25.43/25.84 Inuse: 2022
% 25.43/25.84 Deleted: 432
% 25.43/25.84 Deletedinuse: 258
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 *** allocated 384427 integers for termspace/termends
% 25.43/25.84
% 25.43/25.84 Intermediate Status:
% 25.43/25.84 Generated: 52409
% 25.43/25.84 Kept: 18141
% 25.43/25.84 Inuse: 2175
% 25.43/25.84 Deleted: 448
% 25.43/25.84 Deletedinuse: 258
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 Resimplifying clauses:
% 25.43/25.84 *** allocated 1297440 integers for clauses
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84
% 25.43/25.84 Intermediate Status:
% 25.43/25.84 Generated: 58228
% 25.43/25.84 Kept: 20770
% 25.43/25.84 Inuse: 2279
% 25.43/25.84 Deleted: 3104
% 25.43/25.84 Deletedinuse: 264
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84
% 25.43/25.84 Intermediate Status:
% 25.43/25.84 Generated: 66238
% 25.43/25.84 Kept: 22771
% 25.43/25.84 Inuse: 2442
% 25.43/25.84 Deleted: 3139
% 25.43/25.84 Deletedinuse: 299
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84
% 25.43/25.84 Intermediate Status:
% 25.43/25.84 Generated: 79636
% 25.43/25.84 Kept: 24777
% 25.43/25.84 Inuse: 2723
% 25.43/25.84 Deleted: 3141
% 25.43/25.84 Deletedinuse: 300
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84
% 25.43/25.84 Intermediate Status:
% 25.43/25.84 Generated: 88131
% 25.43/25.84 Kept: 26794
% 25.43/25.84 Inuse: 2843
% 25.43/25.84 Deleted: 3141
% 25.43/25.84 Deletedinuse: 300
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84
% 25.43/25.84 Intermediate Status:
% 25.43/25.84 Generated: 102350
% 25.43/25.84 Kept: 28802
% 25.43/25.84 Inuse: 3077
% 25.43/25.84 Deleted: 3141
% 25.43/25.84 Deletedinuse: 300
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 *** allocated 576640 integers for termspace/termends
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84
% 25.43/25.84 Intermediate Status:
% 25.43/25.84 Generated: 114294
% 25.43/25.84 Kept: 30824
% 25.43/25.84 Inuse: 3268
% 25.43/25.84 Deleted: 3141
% 25.43/25.84 Deletedinuse: 300
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 *** allocated 1946160 integers for clauses
% 25.43/25.84
% 25.43/25.84 Intermediate Status:
% 25.43/25.84 Generated: 122646
% 25.43/25.84 Kept: 32827
% 25.43/25.84 Inuse: 3431
% 25.43/25.84 Deleted: 3141
% 25.43/25.84 Deletedinuse: 300
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84
% 25.43/25.84 Intermediate Status:
% 25.43/25.84 Generated: 139150
% 25.43/25.84 Kept: 34848
% 25.43/25.84 Inuse: 3691
% 25.43/25.84 Deleted: 3143
% 25.43/25.84 Deletedinuse: 300
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84
% 25.43/25.84 Intermediate Status:
% 25.43/25.84 Generated: 145986
% 25.43/25.84 Kept: 36858
% 25.43/25.84 Inuse: 3765
% 25.43/25.84 Deleted: 3143
% 25.43/25.84 Deletedinuse: 300
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84
% 25.43/25.84 Intermediate Status:
% 25.43/25.84 Generated: 172650
% 25.43/25.84 Kept: 38877
% 25.43/25.84 Inuse: 4157
% 25.43/25.84 Deleted: 3143
% 25.43/25.84 Deletedinuse: 300
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84
% 25.43/25.84 Intermediate Status:
% 25.43/25.84 Generated: 179650
% 25.43/25.84 Kept: 40934
% 25.43/25.84 Inuse: 4244
% 25.43/25.84 Deleted: 3146
% 25.43/25.84 Deletedinuse: 300
% 25.43/25.84
% 25.43/25.84 Resimplifying clauses:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84
% 25.43/25.84 Intermediate Status:
% 25.43/25.84 Generated: 182238
% 25.43/25.84 Kept: 43135
% 25.43/25.84 Inuse: 4254
% 25.43/25.84 Deleted: 11661
% 25.43/25.84 Deletedinuse: 300
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84
% 25.43/25.84 Intermediate Status:
% 25.43/25.84 Generated: 185316
% 25.43/25.84 Kept: 45145
% 25.43/25.84 Inuse: 4275
% 25.43/25.84 Deleted: 11661
% 25.43/25.84 Deletedinuse: 300
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 *** allocated 864960 integers for termspace/termends
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84
% 25.43/25.84 Intermediate Status:
% 25.43/25.84 Generated: 188974
% 25.43/25.84 Kept: 47153
% 25.43/25.84 Inuse: 4317
% 25.43/25.84 Deleted: 11661
% 25.43/25.84 Deletedinuse: 300
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84
% 25.43/25.84 Intermediate Status:
% 25.43/25.84 Generated: 193675
% 25.43/25.84 Kept: 49276
% 25.43/25.84 Inuse: 4375
% 25.43/25.84 Deleted: 11661
% 25.43/25.84 Deletedinuse: 300
% 25.43/25.84
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84 *** allocated 2919240 integers for clauses
% 25.43/25.84 Resimplifying inuse:
% 25.43/25.84 Done
% 25.43/25.84
% 25.43/25.84
% 25.43/25.84 Intermediate Status:
% 25.43/25.84 Generated: 196487
% 25.43/25.84 Kept: 51308
% 123.02/123.44 Inuse: 4388
% 123.02/123.44 Deleted: 11661
% 123.02/123.44 Deletedinuse: 300
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 201911
% 123.02/123.44 Kept: 53379
% 123.02/123.44 Inuse: 4442
% 123.02/123.44 Deleted: 11661
% 123.02/123.44 Deletedinuse: 300
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 206743
% 123.02/123.44 Kept: 55409
% 123.02/123.44 Inuse: 4492
% 123.02/123.44 Deleted: 11661
% 123.02/123.44 Deletedinuse: 300
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 215521
% 123.02/123.44 Kept: 57419
% 123.02/123.44 Inuse: 4568
% 123.02/123.44 Deleted: 11661
% 123.02/123.44 Deletedinuse: 300
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 227636
% 123.02/123.44 Kept: 59421
% 123.02/123.44 Inuse: 4704
% 123.02/123.44 Deleted: 11661
% 123.02/123.44 Deletedinuse: 300
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 232228
% 123.02/123.44 Kept: 61614
% 123.02/123.44 Inuse: 4739
% 123.02/123.44 Deleted: 11661
% 123.02/123.44 Deletedinuse: 300
% 123.02/123.44
% 123.02/123.44 Resimplifying clauses:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 236869
% 123.02/123.44 Kept: 63625
% 123.02/123.44 Inuse: 4775
% 123.02/123.44 Deleted: 24272
% 123.02/123.44 Deletedinuse: 300
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 247868
% 123.02/123.44 Kept: 65625
% 123.02/123.44 Inuse: 4912
% 123.02/123.44 Deleted: 24273
% 123.02/123.44 Deletedinuse: 300
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 264365
% 123.02/123.44 Kept: 67632
% 123.02/123.44 Inuse: 5195
% 123.02/123.44 Deleted: 24273
% 123.02/123.44 Deletedinuse: 300
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 280354
% 123.02/123.44 Kept: 69647
% 123.02/123.44 Inuse: 5470
% 123.02/123.44 Deleted: 24273
% 123.02/123.44 Deletedinuse: 300
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 *** allocated 1297440 integers for termspace/termends
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 289439
% 123.02/123.44 Kept: 71661
% 123.02/123.44 Inuse: 5633
% 123.02/123.44 Deleted: 24281
% 123.02/123.44 Deletedinuse: 306
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 294417
% 123.02/123.44 Kept: 73714
% 123.02/123.44 Inuse: 5724
% 123.02/123.44 Deleted: 24281
% 123.02/123.44 Deletedinuse: 306
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 301697
% 123.02/123.44 Kept: 75721
% 123.02/123.44 Inuse: 5781
% 123.02/123.44 Deleted: 24281
% 123.02/123.44 Deletedinuse: 306
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 *** allocated 4378860 integers for clauses
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 307405
% 123.02/123.44 Kept: 77785
% 123.02/123.44 Inuse: 5858
% 123.02/123.44 Deleted: 24281
% 123.02/123.44 Deletedinuse: 306
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 313357
% 123.02/123.44 Kept: 79939
% 123.02/123.44 Inuse: 5923
% 123.02/123.44 Deleted: 24281
% 123.02/123.44 Deletedinuse: 306
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 317897
% 123.02/123.44 Kept: 81995
% 123.02/123.44 Inuse: 5968
% 123.02/123.44 Deleted: 24281
% 123.02/123.44 Deletedinuse: 306
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying clauses:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 325693
% 123.02/123.44 Kept: 84030
% 123.02/123.44 Inuse: 6053
% 123.02/123.44 Deleted: 29137
% 123.02/123.44 Deletedinuse: 306
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 334403
% 123.02/123.44 Kept: 86036
% 123.02/123.44 Inuse: 6145
% 123.02/123.44 Deleted: 29137
% 123.02/123.44 Deletedinuse: 306
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 348070
% 123.02/123.44 Kept: 88049
% 123.02/123.44 Inuse: 6249
% 123.02/123.44 Deleted: 29137
% 123.02/123.44 Deletedinuse: 306
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 352048
% 123.02/123.44 Kept: 90050
% 123.02/123.44 Inuse: 6294
% 123.02/123.44 Deleted: 29137
% 123.02/123.44 Deletedinuse: 306
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 355128
% 123.02/123.44 Kept: 92163
% 123.02/123.44 Inuse: 6312
% 123.02/123.44 Deleted: 29137
% 123.02/123.44 Deletedinuse: 306
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 357754
% 123.02/123.44 Kept: 94322
% 123.02/123.44 Inuse: 6325
% 123.02/123.44 Deleted: 29137
% 123.02/123.44 Deletedinuse: 306
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 123.02/123.44 Generated: 362241
% 123.02/123.44 Kept: 96352
% 123.02/123.44 Inuse: 6381
% 123.02/123.44 Deleted: 29137
% 123.02/123.44 Deletedinuse: 306
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44 Resimplifying inuse:
% 123.02/123.44 Done
% 123.02/123.44
% 123.02/123.44
% 123.02/123.44 Intermediate Status:
% 292.13/292.52 Generated: 369715
% 292.13/292.52 Kept: 98410
% 292.13/292.52 Inuse: 6435
% 292.13/292.52 Deleted: 29137
% 292.13/292.52 Deletedinuse: 306
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 375389
% 292.13/292.52 Kept: 100464
% 292.13/292.52 Inuse: 6457
% 292.13/292.52 Deleted: 29137
% 292.13/292.52 Deletedinuse: 306
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 379788
% 292.13/292.52 Kept: 103657
% 292.13/292.52 Inuse: 6468
% 292.13/292.52 Deleted: 29137
% 292.13/292.52 Deletedinuse: 306
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 Resimplifying clauses:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 383851
% 292.13/292.52 Kept: 106646
% 292.13/292.52 Inuse: 6473
% 292.13/292.52 Deleted: 35255
% 292.13/292.52 Deletedinuse: 306
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 *** allocated 1946160 integers for termspace/termends
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 386903
% 292.13/292.52 Kept: 108855
% 292.13/292.52 Inuse: 6503
% 292.13/292.52 Deleted: 35255
% 292.13/292.52 Deletedinuse: 306
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 391198
% 292.13/292.52 Kept: 111372
% 292.13/292.52 Inuse: 6538
% 292.13/292.52 Deleted: 35255
% 292.13/292.52 Deletedinuse: 306
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 *** allocated 6568290 integers for clauses
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 393972
% 292.13/292.52 Kept: 113905
% 292.13/292.52 Inuse: 6558
% 292.13/292.52 Deleted: 35255
% 292.13/292.52 Deletedinuse: 306
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 396728
% 292.13/292.52 Kept: 116439
% 292.13/292.52 Inuse: 6578
% 292.13/292.52 Deleted: 35255
% 292.13/292.52 Deletedinuse: 306
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 399484
% 292.13/292.52 Kept: 118973
% 292.13/292.52 Inuse: 6598
% 292.13/292.52 Deleted: 35255
% 292.13/292.52 Deletedinuse: 306
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 402054
% 292.13/292.52 Kept: 121139
% 292.13/292.52 Inuse: 6618
% 292.13/292.52 Deleted: 35255
% 292.13/292.52 Deletedinuse: 306
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 409736
% 292.13/292.52 Kept: 123390
% 292.13/292.52 Inuse: 6683
% 292.13/292.52 Deleted: 35255
% 292.13/292.52 Deletedinuse: 306
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 Resimplifying clauses:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 412624
% 292.13/292.52 Kept: 125647
% 292.13/292.52 Inuse: 6708
% 292.13/292.52 Deleted: 35587
% 292.13/292.52 Deletedinuse: 306
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 415331
% 292.13/292.52 Kept: 127786
% 292.13/292.52 Inuse: 6733
% 292.13/292.52 Deleted: 35587
% 292.13/292.52 Deletedinuse: 306
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 418306
% 292.13/292.52 Kept: 129919
% 292.13/292.52 Inuse: 6763
% 292.13/292.52 Deleted: 35587
% 292.13/292.52 Deletedinuse: 306
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 420890
% 292.13/292.52 Kept: 132191
% 292.13/292.52 Inuse: 6798
% 292.13/292.52 Deleted: 35592
% 292.13/292.52 Deletedinuse: 311
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 425170
% 292.13/292.52 Kept: 134529
% 292.13/292.52 Inuse: 6828
% 292.13/292.52 Deleted: 35592
% 292.13/292.52 Deletedinuse: 311
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 429430
% 292.13/292.52 Kept: 136578
% 292.13/292.52 Inuse: 6853
% 292.13/292.52 Deleted: 35592
% 292.13/292.52 Deletedinuse: 311
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 432718
% 292.13/292.52 Kept: 138591
% 292.13/292.52 Inuse: 6903
% 292.13/292.52 Deleted: 35592
% 292.13/292.52 Deletedinuse: 311
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 446388
% 292.13/292.52 Kept: 140691
% 292.13/292.52 Inuse: 7094
% 292.13/292.52 Deleted: 35592
% 292.13/292.52 Deletedinuse: 311
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 492092
% 292.13/292.52 Kept: 147080
% 292.13/292.52 Inuse: 7368
% 292.13/292.52 Deleted: 35592
% 292.13/292.52 Deletedinuse: 311
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 Resimplifying clauses:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 584598
% 292.13/292.52 Kept: 149085
% 292.13/292.52 Inuse: 7673
% 292.13/292.52 Deleted: 35696
% 292.13/292.52 Deletedinuse: 311
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 606456
% 292.13/292.52 Kept: 151104
% 292.13/292.52 Inuse: 7944
% 292.13/292.52 Deleted: 35696
% 292.13/292.52 Deletedinuse: 311
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52
% 292.13/292.52 Intermediate Status:
% 292.13/292.52 Generated: 648246
% 292.13/292.52 Kept: 153104
% 292.13/292.52 Inuse: 8347
% 292.13/292.52 Deleted: 35696
% 292.13/292.52 Deletedinuse: 311
% 292.13/292.52
% 292.13/292.52 Resimplifying inuse:
% 292.13/292.52 Done
% 292.13/292.52
% 292.13/292.52 ResimpCputime limit exceeded (core dumped)
%------------------------------------------------------------------------------