TSTP Solution File: SEU373+2 by SOS---2.0
View Problem
- Process Solution
%------------------------------------------------------------------------------
% File : SOS---2.0
% Problem : SEU373+2 : TPTP v8.1.0. Released v3.3.0.
% Transfm : none
% Format : tptp:raw
% Command : sos-script %s
% Computer : n006.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 : 600s
% DateTime : Tue Jul 19 14:29:11 EDT 2022
% Result : Timeout 300.01s 300.22s
% Output : None
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----No solution output by system
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.03/0.12 % Problem : SEU373+2 : TPTP v8.1.0. Released v3.3.0.
% 0.03/0.13 % Command : sos-script %s
% 0.13/0.34 % Computer : n006.cluster.edu
% 0.13/0.34 % Model : x86_64 x86_64
% 0.13/0.34 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.13/0.34 % Memory : 8042.1875MB
% 0.13/0.34 % OS : Linux 3.10.0-693.el7.x86_64
% 0.13/0.34 % CPULimit : 300
% 0.13/0.34 % WCLimit : 600
% 0.13/0.34 % DateTime : Sun Jun 19 23:14:10 EDT 2022
% 0.13/0.34 % CPUTime :
% 0.70/0.89 ----- Otter 3.2, August 2001 -----
% 0.70/0.89 The process was started by sandbox on n006.cluster.edu,
% 0.70/0.89 Sun Jun 19 23:14:10 2022
% 0.70/0.89 The command was "./sos". The process ID is 13316.
% 0.70/0.89
% 0.70/0.89 set(prolog_style_variables).
% 0.70/0.89 set(auto).
% 0.70/0.89 dependent: set(auto1).
% 0.70/0.89 dependent: set(process_input).
% 0.70/0.89 dependent: clear(print_kept).
% 0.70/0.89 dependent: clear(print_new_demod).
% 0.70/0.89 dependent: clear(print_back_demod).
% 0.70/0.89 dependent: clear(print_back_sub).
% 0.70/0.89 dependent: set(control_memory).
% 0.70/0.89 dependent: assign(max_mem, 12000).
% 0.70/0.89 dependent: assign(pick_given_ratio, 4).
% 0.70/0.89 dependent: assign(stats_level, 1).
% 0.70/0.89 dependent: assign(pick_semantic_ratio, 3).
% 0.70/0.89 dependent: assign(sos_limit, 5000).
% 0.70/0.89 dependent: assign(max_weight, 60).
% 0.70/0.89 clear(print_given).
% 0.70/0.89
% 0.70/0.89 formula_list(usable).
% 0.70/0.89
% 0.70/0.89 SCAN INPUT: prop=0, horn=0, equality=1, symmetry=1, max_lits=23.
% 0.70/0.89
% 0.70/0.89 This ia a non-Horn set with equality. The strategy will be
% 0.70/0.89 Knuth-Bendix, ordered hyper_res, ur_res, factoring, and
% 0.70/0.89 unit deletion, with positive clauses in sos and nonpositive
% 0.70/0.89 clauses in usable.
% 0.70/0.89
% 0.70/0.89 dependent: set(knuth_bendix).
% 0.70/0.89 dependent: set(para_from).
% 0.70/0.89 dependent: set(para_into).
% 0.70/0.89 dependent: clear(para_from_right).
% 0.70/0.89 dependent: clear(para_into_right).
% 0.70/0.89 dependent: set(para_from_vars).
% 0.70/0.89 dependent: set(eq_units_both_ways).
% 0.70/0.89 dependent: set(dynamic_demod_all).
% 0.70/0.89 dependent: set(dynamic_demod).
% 0.70/0.89 dependent: set(order_eq).
% 0.70/0.89 dependent: set(back_demod).
% 0.70/0.89 dependent: set(lrpo).
% 0.70/0.89 dependent: set(hyper_res).
% 0.70/0.89 dependent: set(unit_deletion).
% 0.70/0.89 dependent: set(factor).
% 0.70/0.89
% 0.70/0.89 There is a clause for symmetry of equality, so it is
% 0.70/0.89 assumed that equality is fully axiomatized; therefore,
% 0.70/0.89 paramodulation is disabled.
% 0.70/0.89
% 0.70/0.89 dependent: clear(para_from).
% 0.70/0.89 dependent: clear(para_into).
% 0.70/0.89
% 0.70/0.89 ------------> process usable:
% 0.70/0.89 Following clause subsumed by 62 during input processing: 0 [] {-} -empty(A)| -ordinal(A)|epsilon_transitive(A).
% 0.70/0.89 Following clause subsumed by 63 during input processing: 0 [] {-} -empty(A)| -ordinal(A)|epsilon_connected(A).
% 0.70/0.89 Following clause subsumed by 106 during input processing: 0 [] {-} empty(A)|empty(B)| -relation_of2(C,A,B)| -function(C)| -quasi_total(C,A,B)|v1_partfun1(C,A,B).
% 0.70/0.89 Following clause subsumed by 55 during input processing: 0 [] {-} -latt_str(A)|empty_carrier(A)| -lattice(A)| -distributive_lattstr(A)|join_commutative(A).
% 0.70/0.89 Following clause subsumed by 56 during input processing: 0 [] {-} -latt_str(A)|empty_carrier(A)| -lattice(A)| -distributive_lattstr(A)|join_associative(A).
% 0.70/0.89 Following clause subsumed by 57 during input processing: 0 [] {-} -latt_str(A)|empty_carrier(A)| -lattice(A)| -distributive_lattstr(A)|meet_commutative(A).
% 0.70/0.89 Following clause subsumed by 58 during input processing: 0 [] {-} -latt_str(A)|empty_carrier(A)| -lattice(A)| -distributive_lattstr(A)|meet_associative(A).
% 0.70/0.89 Following clause subsumed by 59 during input processing: 0 [] {-} -latt_str(A)|empty_carrier(A)| -lattice(A)| -distributive_lattstr(A)|meet_absorbing(A).
% 0.70/0.89 Following clause subsumed by 60 during input processing: 0 [] {-} -latt_str(A)|empty_carrier(A)| -lattice(A)| -distributive_lattstr(A)|join_absorbing(A).
% 0.70/0.89 Following clause subsumed by 62 during input processing: 0 [] {-} -ordinal(A)|epsilon_transitive(A).
% 0.70/0.89 Following clause subsumed by 63 during input processing: 0 [] {-} -ordinal(A)|epsilon_connected(A).
% 0.70/0.89 Following clause subsumed by 83 during input processing: 0 [] {-} ordinal(A)| -epsilon_transitive(A)| -epsilon_connected(A).
% 0.70/0.89 Following clause subsumed by 681 during input processing: 0 [] {-} -relation(A)| -relation_empty_yielding(A)|relation(relation_dom_restriction(A,B)).
% 0.70/0.89 Following clause subsumed by 671 during input processing: 0 [] {-} -relation(A)| -function(A)| -relation(B)| -function(B)|relation(relation_composition(A,B)).
% 0.70/0.89 Following clause subsumed by 728 during input processing: 0 [] {-} -empty_carrier(boole_lattice(A)).
% 0.70/0.89 Following clause subsumed by 628 during input processing: 0 [] {-} empty(A)| -relation_of2(B,A,A)|strict_rel_str(rel_str_of(A,B)).
% 0.70/0.89 Following clause subsumed by 306 during input processing: 0 [] {-} empty_carrier(A)| -one_sorted_str(A)| -empty(the_carrier(A)).
% 0.70/0.89 Following clause subsumed by 726 during input processing: 0 [] {-} -empty(powerset(A)).
% 0.70/0.89 Following clause subsumed by 628 during input processing: 0 [] {-} -relation_of2(A,singleton(B),singleton(B))|strict_rel_str(rel_str_of(singleton(B),A)).
% 0.70/0.89 Following clause subsumed by 655 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -latt_str(A)|strict_rel_str(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 656 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -latt_str(A)|reflexive_relstr(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 657 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -latt_str(A)|transitive_relstr(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 658 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -latt_str(A)|antisymmetric_relstr(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 730 during input processing: 0 [] {-} -ordinal(A)| -natural(A)| -empty(succ(A)).
% 0.70/0.89 Following clause subsumed by 708 during input processing: 0 [] {-} empty_carrier(A)| -join_commutative(A)| -join_semilatt_str(A)|function(the_L_join(A)).
% 0.70/0.89 Following clause subsumed by 709 during input processing: 0 [] {-} empty_carrier(A)| -join_commutative(A)| -join_semilatt_str(A)|quasi_total(the_L_join(A),cartesian_product2(the_carrier(A),the_carrier(A)),the_carrier(A)).
% 0.70/0.89 Following clause subsumed by 728 during input processing: 0 [] {-} -empty_carrier(boole_lattice(A)).
% 0.70/0.89 Following clause subsumed by 725 during input processing: 0 [] {-} -empty(singleton(A)).
% 0.70/0.89 Following clause subsumed by 741 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -upper_bounded_semilattstr(A)| -latt_str(A)| -empty_carrier(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 655 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -upper_bounded_semilattstr(A)| -latt_str(A)|strict_rel_str(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 656 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -upper_bounded_semilattstr(A)| -latt_str(A)|reflexive_relstr(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 657 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -upper_bounded_semilattstr(A)| -latt_str(A)|transitive_relstr(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 658 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -upper_bounded_semilattstr(A)| -latt_str(A)|antisymmetric_relstr(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 742 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -upper_bounded_semilattstr(A)| -latt_str(A)|with_suprema_relstr(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 743 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -upper_bounded_semilattstr(A)| -latt_str(A)|with_infima_relstr(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 666 during input processing: 0 [] {-} -relation(A)| -function(A)| -one_to_one(A)|relation(relation_inverse(A)).
% 0.70/0.89 Following clause subsumed by 708 during input processing: 0 [] {-} empty_carrier(A)| -join_associative(A)| -join_semilatt_str(A)|function(the_L_join(A)).
% 0.70/0.89 Following clause subsumed by 709 during input processing: 0 [] {-} empty_carrier(A)| -join_associative(A)| -join_semilatt_str(A)|quasi_total(the_L_join(A),cartesian_product2(the_carrier(A),the_carrier(A)),the_carrier(A)).
% 0.70/0.89 Following clause subsumed by 728 during input processing: 0 [] {-} -empty_carrier(boole_lattice(A)).
% 0.70/0.89 Following clause subsumed by 630 during input processing: 0 [] {-} empty(A)| -function(B)| -quasi_total(B,cartesian_product2(A,A),A)| -relation_of2(B,cartesian_product2(A,A),A)| -function(C)| -quasi_total(C,cartesian_product2(A,A),A)| -relation_of2(C,cartesian_product2(A,A),A)|strict_latt_str(latt_str_of(A,B,C)).
% 0.70/0.89 Following clause subsumed by 628 during input processing: 0 [] {-} -reflexive(A)| -antisymmetric(A)| -transitive(A)| -v1_partfun1(A,B,B)| -relation_of2(A,B,B)|strict_rel_str(rel_str_of(B,A)).
% 0.70/0.89 Following clause subsumed by 730 during input processing: 0 [] {-} -ordinal(A)| -empty(succ(A)).
% 0.70/0.89 Following clause subsumed by 753 during input processing: 0 [] {-} -empty(unordered_pair(A,B)).
% 0.70/0.89 Following clause subsumed by 741 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -lower_bounded_semilattstr(A)| -latt_str(A)| -empty_carrier(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 655 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -lower_bounded_semilattstr(A)| -latt_str(A)|strict_rel_str(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 656 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -lower_bounded_semilattstr(A)| -latt_str(A)|reflexive_relstr(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 657 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -lower_bounded_semilattstr(A)| -latt_str(A)|transitive_relstr(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 658 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -lower_bounded_semilattstr(A)| -latt_str(A)|antisymmetric_relstr(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 742 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -lower_bounded_semilattstr(A)| -latt_str(A)|with_suprema_relstr(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 743 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -lower_bounded_semilattstr(A)| -latt_str(A)|with_infima_relstr(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 681 during input processing: 0 [] {-} -relation(A)| -function(A)|relation(relation_dom_restriction(A,B)).
% 0.70/0.89 Following clause subsumed by 700 during input processing: 0 [] {-} empty_carrier(A)| -meet_commutative(A)| -meet_semilatt_str(A)|function(the_L_meet(A)).
% 0.70/0.89 Following clause subsumed by 701 during input processing: 0 [] {-} empty_carrier(A)| -meet_commutative(A)| -meet_semilatt_str(A)|quasi_total(the_L_meet(A),cartesian_product2(the_carrier(A),the_carrier(A)),the_carrier(A)).
% 0.70/0.89 Following clause subsumed by 741 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -latt_str(A)| -empty_carrier(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 655 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -latt_str(A)|strict_rel_str(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 656 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -latt_str(A)|reflexive_relstr(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 657 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -latt_str(A)|transitive_relstr(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 658 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -latt_str(A)|antisymmetric_relstr(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 741 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -complete_latt_str(A)| -latt_str(A)| -empty_carrier(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 655 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -complete_latt_str(A)| -latt_str(A)|strict_rel_str(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 656 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -complete_latt_str(A)| -latt_str(A)|reflexive_relstr(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 657 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -complete_latt_str(A)| -latt_str(A)|transitive_relstr(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 658 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -complete_latt_str(A)| -latt_str(A)|antisymmetric_relstr(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 742 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -complete_latt_str(A)| -latt_str(A)|with_suprema_relstr(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 743 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -complete_latt_str(A)| -latt_str(A)|with_infima_relstr(poset_of_lattice(A)).
% 0.70/0.89 Following clause subsumed by 686 during input processing: 0 [] {-} -relation(A)| -function(A)|relation(relation_rng_restriction(B,A)).
% 3.13/3.33 Following clause subsumed by 700 during input processing: 0 [] {-} empty_carrier(A)| -meet_associative(A)| -meet_semilatt_str(A)|function(the_L_meet(A)).
% 3.13/3.33 Following clause subsumed by 701 during input processing: 0 [] {-} empty_carrier(A)| -meet_associative(A)| -meet_semilatt_str(A)|quasi_total(the_L_meet(A),cartesian_product2(the_carrier(A),the_carrier(A)),the_carrier(A)).
% 3.13/3.33 Following clause subsumed by 847 during input processing: 0 [] {-} -empty_carrier(boole_POSet(A)).
% 3.13/3.33 Following clause subsumed by 128 during input processing: 0 [] {-} subset(A,singleton(B))|A!=singleton(B).
% 3.13/3.33 Following clause subsumed by 916 during input processing: 0 [] {-} -in(ordered_pair(A,B),cartesian_product2(C,D))|in(A,C).
% 3.13/3.33 Following clause subsumed by 917 during input processing: 0 [] {-} -in(ordered_pair(A,B),cartesian_product2(C,D))|in(B,D).
% 3.13/3.33 Following clause subsumed by 918 during input processing: 0 [] {-} in(ordered_pair(A,B),cartesian_product2(C,D))| -in(A,C)| -in(B,D).
% 3.13/3.33 Following clause subsumed by 414 during input processing: 0 [flip.2] {-} -one_sorted_str(A)|the_carrier(A)=cast_as_carrier_subset(A).
% 3.13/3.33 Following clause subsumed by 718 during input processing: 0 [] {-} -finite(A)|finite(set_intersection2(A,B)).
% 3.13/3.33 Following clause subsumed by 722 during input processing: 0 [] {-} -relation(A)| -function(A)| -finite(B)|finite(relation_image(A,B)).
% 3.13/3.33 Following clause subsumed by 367 during input processing: 0 [] {-} -element(A,B)|empty(B)|in(A,B).
% 3.13/3.33 Following clause subsumed by 623 during input processing: 0 [] {-} -antisymmetric_relstr(A)| -rel_str(A)| -element(B,the_carrier(A))|B!=join_on_relstr(A,C)| -ex_sup_of_relstr_set(A,C)|relstr_set_smaller(A,C,B).
% 3.13/3.33 Following clause subsumed by 624 during input processing: 0 [] {-} -antisymmetric_relstr(A)| -rel_str(A)| -element(B,the_carrier(A))|B!=join_on_relstr(A,C)| -ex_sup_of_relstr_set(A,C)| -element(D,the_carrier(A))| -relstr_set_smaller(A,C,D)|related(A,B,D).
% 3.13/3.33 Following clause subsumed by 897 during input processing: 0 [] {-} set_difference(A,B)!=empty_set|subset(A,B).
% 3.13/3.33 Following clause subsumed by 898 during input processing: 0 [] {-} set_difference(A,B)=empty_set| -subset(A,B).
% 3.13/3.33 Following clause subsumed by 893 during input processing: 0 [] {-} -subset(singleton(A),B)|in(A,B).
% 3.13/3.33 Following clause subsumed by 894 during input processing: 0 [] {-} subset(singleton(A),B)| -in(A,B).
% 3.13/3.33 Following clause subsumed by 913 during input processing: 0 [] {-} -subset(A,singleton(B))|A=empty_set|A=singleton(B).
% 3.13/3.33 Following clause subsumed by 914 during input processing: 0 [] {-} subset(A,singleton(B))|A!=empty_set.
% 3.13/3.33 Following clause subsumed by 128 during input processing: 0 [] {-} subset(A,singleton(B))|A!=singleton(B).
% 3.13/3.33 Following clause subsumed by 4319 during input processing: 0 [] {-} -element(A,powerset(powerset(B)))|A=empty_set|complements_of_subsets(B,A)!=empty_set.
% 3.13/3.33 Following clause subsumed by 886 during input processing: 0 [] {-} -in(A,B)|set_union2(singleton(A),B)=B.
% 3.13/3.33 Following clause subsumed by 51 during input processing: 0 [] {-} empty_carrier(A)| -lattice(A)| -complete_latt_str(A)| -latt_str(A)|lower_bounded_semilattstr(A).
% 3.13/3.33 Following clause subsumed by 843 during input processing: 0 [] {-} -topological_space(A)| -top_str(A)| -element(B,powerset(the_carrier(A)))|open_subset(interior(A,B),A).
% 3.13/3.33 Following clause subsumed by 4417 during input processing: 0 [] {-} -relation(A)| -function(A)| -in(ordered_pair(B,C),A)|in(B,relation_dom(A)).
% 3.13/3.33 Following clause subsumed by 429 during input processing: 0 [] {-} -relation(A)| -function(A)|in(ordered_pair(B,C),A)| -in(B,relation_dom(A))|C!=apply(A,B).
% 3.13/3.33 Following clause subsumed by 915 during input processing: 0 [] {-} -in(A,B)|subset(A,union(B)).
% 3.13/3.33 Following clause subsumed by 4377 during input processing: 0 [] {-} -function(A)| -quasi_total(A,B,C)| -relation_of2_as_subset(A,B,C)| -subset(C,D)|C=empty_set|relation_of2_as_subset(A,B,D).
% 3.13/3.33 Following clause subsumed by 4377 during input processing: 0 [] {-} -function(A)| -quasi_total(A,B,C)| -relation_of2_as_subset(A,B,C)| -subset(C,D)|B!=empty_set|relation_of2_as_subset(A,B,D).
% 3.13/3.33 55 back subsumes 45.
% 3.13/3.33 56 back subsumes 46.
% 3.13/3.33 57 back subsumes 47.
% 3.13/3.33 58 back subsumes 48.
% 3.13/3.33 59 back subsumes 49.
% 241.58/241.82 60 back subsumes 50.
% 241.58/241.82 418 back subsumes 415.
% 241.58/241.82 807 back subsumes 749.
% 241.58/241.82 808 back subsumes 750.
% 241.58/241.82 809 back subsumes 751.
% 241.58/241.82 4406 back subsumes 368.
% 241.58/241.82 4460 back subsumes 811.
% 241.58/241.82 4473 back subsumes 524.
% 241.58/241.82 4474 back subsumes 525.
% 241.58/241.82 4475 back subsumes 831.
% 241.58/241.82 4586 back subsumes 905.
% 241.58/241.82 4634 back subsumes 4412.
% 241.58/241.82 4642 back subsumes 921.
% 241.58/241.82 4643 back subsumes 920.
% 241.58/241.82 4644 back subsumes 922.
% 241.58/241.82 4647 back subsumes 430.
% 241.58/241.82 4677 back subsumes 4676.
% 241.58/241.82 4690 back subsumes 4689.
% 241.58/241.82
% 241.58/241.82 ------------> process sos:
% 241.58/241.82 Following clause subsumed by 14424 during input processing: 0 [] {-} strict_latt_str(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14424 during input processing: 0 [] {-} strict_latt_str(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14451 during input processing: 0 [] {-} empty(empty_set).
% 241.58/241.82 Following clause subsumed by 14441 during input processing: 0 [] {-} relation(identity_relation(A)).
% 241.58/241.82 Following clause subsumed by 14424 during input processing: 0 [] {-} strict_latt_str(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14458 during input processing: 0 [] {-} join_commutative(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14459 during input processing: 0 [] {-} join_associative(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14460 during input processing: 0 [] {-} meet_commutative(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14461 during input processing: 0 [] {-} meet_associative(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14462 during input processing: 0 [] {-} meet_absorbing(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14463 during input processing: 0 [] {-} join_absorbing(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14464 during input processing: 0 [] {-} lattice(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14452 during input processing: 0 [] {-} relation(empty_set).
% 241.58/241.82 Following clause subsumed by 14453 during input processing: 0 [] {-} relation_empty_yielding(empty_set).
% 241.58/241.82 Following clause subsumed by 14451 during input processing: 0 [] {-} empty(empty_set).
% 241.58/241.82 Following clause subsumed by 14441 during input processing: 0 [] {-} relation(identity_relation(A)).
% 241.58/241.82 Following clause subsumed by 14477 during input processing: 0 [] {-} function(identity_relation(A)).
% 241.58/241.82 Following clause subsumed by 14424 during input processing: 0 [] {-} strict_latt_str(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14458 during input processing: 0 [] {-} join_commutative(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14459 during input processing: 0 [] {-} join_associative(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14460 during input processing: 0 [] {-} meet_commutative(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14461 during input processing: 0 [] {-} meet_associative(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14462 during input processing: 0 [] {-} meet_absorbing(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14463 during input processing: 0 [] {-} join_absorbing(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14464 during input processing: 0 [] {-} lattice(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14465 during input processing: 0 [] {-} distributive_lattstr(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14466 during input processing: 0 [] {-} modular_lattstr(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14467 during input processing: 0 [] {-} lower_bounded_semilattstr(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14468 during input processing: 0 [] {-} upper_bounded_semilattstr(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14469 during input processing: 0 [] {-} bounded_lattstr(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14470 during input processing: 0 [] {-} complemented_lattstr(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14471 during input processing: 0 [] {-} boolean_lattstr(boole_lattice(A)).
% 241.58/241.82 Following clause subsumed by 14451 during input processing: 0 [] {-} empty(empty_set).
% 241.58/241.82 Following clause subsumed by 14452 during input processing: 0 [] {-} relation(empty_set).
% 241.58/241.82 Following clause subsumed by 14435 during input processing: 0 [] {-} strict_rel_str(incl_POSet(A)).
% 300.01/300.22 Wow, sos-wrapper got a signal XCPU
%------------------------------------------------------------------------------