TSTP Solution File: TOP015-1 by Prover9---1109a
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- Process Solution
%------------------------------------------------------------------------------
% File : Prover9---1109a
% Problem : TOP015-1 : TPTP v8.1.0. Released v1.0.0.
% Transfm : none
% Format : tptp:raw
% Command : tptp2X_and_run_prover9 %d %s
% Computer : n024.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 : Thu Jul 21 21:33:50 EDT 2022
% Result : Timeout 300.07s 300.43s
% Output : None
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----No solution output by system
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.12/0.12 % Problem : TOP015-1 : TPTP v8.1.0. Released v1.0.0.
% 0.12/0.13 % Command : tptp2X_and_run_prover9 %d %s
% 0.13/0.34 % Computer : n024.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 May 29 11:56:51 EDT 2022
% 0.13/0.34 % CPUTime :
% 0.72/1.02 ============================== Prover9 ===============================
% 0.72/1.02 Prover9 (32) version 2009-11A, November 2009.
% 0.72/1.02 Process 2676 was started by sandbox on n024.cluster.edu,
% 0.72/1.02 Sun May 29 11:56:52 2022
% 0.72/1.02 The command was "/export/starexec/sandbox/solver/bin/prover9 -t 300 -f /tmp/Prover9_2452_n024.cluster.edu".
% 0.72/1.02 ============================== end of head ===========================
% 0.72/1.02
% 0.72/1.02 ============================== INPUT =================================
% 0.72/1.02
% 0.72/1.02 % Reading from file /tmp/Prover9_2452_n024.cluster.edu
% 0.72/1.02
% 0.72/1.02 set(prolog_style_variables).
% 0.72/1.02 set(auto2).
% 0.72/1.02 % set(auto2) -> set(auto).
% 0.72/1.02 % set(auto) -> set(auto_inference).
% 0.72/1.02 % set(auto) -> set(auto_setup).
% 0.72/1.02 % set(auto_setup) -> set(predicate_elim).
% 0.72/1.02 % set(auto_setup) -> assign(eq_defs, unfold).
% 0.72/1.02 % set(auto) -> set(auto_limits).
% 0.72/1.02 % set(auto_limits) -> assign(max_weight, "100.000").
% 0.72/1.02 % set(auto_limits) -> assign(sos_limit, 20000).
% 0.72/1.02 % set(auto) -> set(auto_denials).
% 0.72/1.02 % set(auto) -> set(auto_process).
% 0.72/1.02 % set(auto2) -> assign(new_constants, 1).
% 0.72/1.02 % set(auto2) -> assign(fold_denial_max, 3).
% 0.72/1.02 % set(auto2) -> assign(max_weight, "200.000").
% 0.72/1.02 % set(auto2) -> assign(max_hours, 1).
% 0.72/1.02 % assign(max_hours, 1) -> assign(max_seconds, 3600).
% 0.72/1.02 % set(auto2) -> assign(max_seconds, 0).
% 0.72/1.02 % set(auto2) -> assign(max_minutes, 5).
% 0.72/1.02 % assign(max_minutes, 5) -> assign(max_seconds, 300).
% 0.72/1.02 % set(auto2) -> set(sort_initial_sos).
% 0.72/1.02 % set(auto2) -> assign(sos_limit, -1).
% 0.72/1.02 % set(auto2) -> assign(lrs_ticks, 3000).
% 0.72/1.02 % set(auto2) -> assign(max_megs, 400).
% 0.72/1.02 % set(auto2) -> assign(stats, some).
% 0.72/1.02 % set(auto2) -> clear(echo_input).
% 0.72/1.02 % set(auto2) -> set(quiet).
% 0.72/1.02 % set(auto2) -> clear(print_initial_clauses).
% 0.72/1.02 % set(auto2) -> clear(print_given).
% 0.72/1.02 assign(lrs_ticks,-1).
% 0.72/1.02 assign(sos_limit,10000).
% 0.72/1.02 assign(order,kbo).
% 0.72/1.02 set(lex_order_vars).
% 0.72/1.02 clear(print_given).
% 0.72/1.02
% 0.72/1.02 % formulas(sos). % not echoed (112 formulas)
% 0.72/1.02
% 0.72/1.02 ============================== end of input ==========================
% 0.72/1.02
% 0.72/1.02 % From the command line: assign(max_seconds, 300).
% 0.72/1.02
% 0.72/1.02 ============================== PROCESS NON-CLAUSAL FORMULAS ==========
% 0.72/1.03
% 0.72/1.03 % Formulas that are not ordinary clauses:
% 0.72/1.03
% 0.72/1.03 ============================== end of process non-clausal formulas ===
% 0.72/1.03
% 0.72/1.03 ============================== PROCESS INITIAL CLAUSES ===============
% 0.72/1.03
% 0.72/1.03 ============================== PREDICATE ELIMINATION =================
% 0.72/1.03 1 topological_space(A,B) | -equal_sets(union_of_members(B),A) | -element_of_collection(empty_set,B) | -element_of_collection(A,B) | element_of_collection(f3(A,B),B) | subset_collections(f5(A,B),B) # label(topological_space_12) # label(axiom). [assumption].
% 0.72/1.03 2 -topological_space(A,B) | -subset_collections(C,B) | element_of_collection(union_of_members(C),B) # label(topological_space_11) # label(axiom). [assumption].
% 0.72/1.03 Derived: topological_space(A,B) | -equal_sets(union_of_members(B),A) | -element_of_collection(empty_set,B) | -element_of_collection(A,B) | element_of_collection(f3(A,B),B) | -topological_space(C,B) | element_of_collection(union_of_members(f5(A,B)),B). [resolve(1,f,2,b)].
% 0.72/1.03 3 topological_space(A,B) | -equal_sets(union_of_members(B),A) | -element_of_collection(empty_set,B) | -element_of_collection(A,B) | element_of_collection(f4(A,B),B) | subset_collections(f5(A,B),B) # label(topological_space_14) # label(axiom). [assumption].
% 0.72/1.03 Derived: topological_space(A,B) | -equal_sets(union_of_members(B),A) | -element_of_collection(empty_set,B) | -element_of_collection(A,B) | element_of_collection(f4(A,B),B) | -topological_space(C,B) | element_of_collection(union_of_members(f5(A,B)),B). [resolve(3,f,2,b)].
% 0.72/1.03 4 topological_space(A,B) | -equal_sets(union_of_members(B),A) | -element_of_collection(empty_set,B) | -element_of_collection(A,B) | -element_of_collection(intersection_of_sets(f3(A,B),f4(A,B)),B) | subset_collections(f5(A,B),B) # label(topological_space_16) # label(axiom). [assumption].
% 0.72/1.03 Derived: topological_space(A,B) | -equal_sets(union_of_members(B),A) | -element_of_collection(empty_set,B) | -element_of_collection(A,B) | -element_of_collection(intersection_of_sets(f3(A,B),f4(A,B)),B) | -topological_space(C,B) | element_of_collection(union_of_members(f5(A,B)),B). [resolve(4,f,2,b)].
% 0.72/1.03 5 -finer(A,B,C) | subset_collections(B,A) # label(finer_topology_26) # label(axiom). [assumption].
% 0.72/1.03 Derived: -finer(A,B,C) | -topological_space(D,A) | element_of_collection(union_of_members(B),A). [resolve(5,b,2,b)].
% 0.72/1.03 6 finer(A,B,C) | -topological_space(C,A) | -topological_space(C,B) | -subset_collections(B,A) # label(finer_topology_27) # label(axiom). [assumption].
% 0.72/1.03 Derived: finer(A,f5(B,A),C) | -topological_space(C,A) | -topological_space(C,f5(B,A)) | topological_space(B,A) | -equal_sets(union_of_members(A),B) | -element_of_collection(empty_set,A) | -element_of_collection(B,A) | element_of_collection(f3(B,A),A). [resolve(6,d,1,f)].
% 0.72/1.03 Derived: finer(A,f5(B,A),C) | -topological_space(C,A) | -topological_space(C,f5(B,A)) | topological_space(B,A) | -equal_sets(union_of_members(A),B) | -element_of_collection(empty_set,A) | -element_of_collection(B,A) | element_of_collection(f4(B,A),A). [resolve(6,d,3,f)].
% 0.72/1.03 Derived: finer(A,f5(B,A),C) | -topological_space(C,A) | -topological_space(C,f5(B,A)) | topological_space(B,A) | -equal_sets(union_of_members(A),B) | -element_of_collection(empty_set,A) | -element_of_collection(B,A) | -element_of_collection(intersection_of_sets(f3(B,A),f4(B,A)),A). [resolve(6,d,4,f)].
% 0.72/1.03 Derived: finer(A,B,C) | -topological_space(C,A) | -topological_space(C,B) | -finer(A,B,D). [resolve(6,d,5,b)].
% 0.72/1.03 7 -open_covering(A,B,C) | subset_collections(A,C) # label(open_covering_97) # label(axiom). [assumption].
% 0.72/1.03 Derived: -open_covering(A,B,C) | -topological_space(D,C) | element_of_collection(union_of_members(A),C). [resolve(7,b,2,b)].
% 0.72/1.03 Derived: -open_covering(A,B,C) | finer(C,A,D) | -topological_space(D,C) | -topological_space(D,A). [resolve(7,b,6,d)].
% 0.72/1.03 8 open_covering(A,B,C) | -topological_space(B,C) | -subset_collections(A,C) | -equal_sets(union_of_members(A),B) # label(open_covering_99) # label(axiom). [assumption].
% 0.72/1.03 Derived: open_covering(f5(A,B),C,B) | -topological_space(C,B) | -equal_sets(union_of_members(f5(A,B)),C) | topological_space(A,B) | -equal_sets(union_of_members(B),A) | -element_of_collection(empty_set,B) | -element_of_collection(A,B) | element_of_collection(f3(A,B),B). [resolve(8,c,1,f)].
% 0.72/1.03 Derived: open_covering(f5(A,B),C,B) | -topological_space(C,B) | -equal_sets(union_of_members(f5(A,B)),C) | topological_space(A,B) | -equal_sets(union_of_members(B),A) | -element_of_collection(empty_set,B) | -element_of_collection(A,B) | element_of_collection(f4(A,B),B). [resolve(8,c,3,f)].
% 0.72/1.03 Derived: open_covering(f5(A,B),C,B) | -topological_space(C,B) | -equal_sets(union_of_members(f5(A,B)),C) | topological_space(A,B) | -equal_sets(union_of_members(B),A) | -element_of_collection(empty_set,B) | -element_of_collection(A,B) | -element_of_collection(intersection_of_sets(f3(A,B),f4(A,B)),B). [resolve(8,c,4,f)].
% 0.72/1.03 Derived: open_covering(A,B,C) | -topological_space(B,C) | -equal_sets(union_of_members(A),B) | -finer(C,A,D). [resolve(8,c,5,b)].
% 0.72/1.03 Derived: open_covering(A,B,C) | -topological_space(B,C) | -equal_sets(union_of_members(A),B) | -open_covering(A,D,C). [resolve(8,c,7,b)].
% 0.72/1.03 9 -compact_space(A,B) | -open_covering(C,A,B) | subset_collections(f23(A,B,C),C) # label(compact_space_102) # label(axiom). [assumption].
% 0.72/1.03 Derived: -compact_space(A,B) | -open_covering(C,A,B) | -topological_space(D,C) | element_of_collection(union_of_members(f23(A,B,C)),C). [resolve(9,c,2,b)].
% 0.72/1.03 Derived: -compact_space(A,B) | -open_covering(C,A,B) | finer(C,f23(A,B,C),D) | -topological_space(D,C) | -topological_space(D,f23(A,B,C)). [resolve(9,c,6,d)].
% 0.72/1.03 Derived: -compact_space(A,B) | -open_covering(C,A,B) | open_covering(f23(A,B,C),D,C) | -topological_space(D,C) | -equal_sets(union_of_members(f23(A,B,C)),D). [resolve(9,c,8,c)].
% 0.72/1.03 10 compact_space(A,B) | -topological_space(A,B) | -finite(C) | -subset_collections(C,f24(A,B)) | -open_covering(C,A,B) # label(compact_space_105) # label(axiom). [assumption].
% 0.72/1.03 Derived: compact_space(A,B) | -topological_space(A,B) | -finite(f5(C,f24(A,B))) | -open_covering(f5(C,f24(A,B)),A,B) | topological_space(C,f24(A,B)) | -equal_sets(union_of_members(f24(A,B)),C) | -element_of_collection(empty_set,f24(A,B)) | -element_of_collection(C,f24(A,B)) | element_of_collection(f3(C,f24(A,B)),f24(A,B)). [resolve(10,d,1,f)].
% 0.72/1.03 Derived: compact_space(A,B) | -topological_space(A,B) | -finite(f5(C,f24(A,B))) | -open_covering(f5(C,f24(A,B)),A,B) | topological_space(C,f24(A,B)) | -equal_sets(union_of_members(f24(A,B)),C) | -element_of_collection(empty_set,f24(A,B)) | -element_of_collection(C,f24(A,B)) | element_of_collection(f4(C,f24(A,B)),f24(A,B)). [resolve(10,d,3,f)].
% 0.72/1.03 Derived: compact_space(A,B) | -topological_space(A,B) | -finite(f5(C,f24(A,B))) | -open_covering(f5(C,f24(A,B)),A,B) | topological_space(C,f24(A,B)) | -equal_sets(union_of_members(f24(A,B)),C) | -element_of_collection(empty_set,f24(A,B)) | -element_of_collection(C,f24(A,B)) | -element_of_collection(intersection_of_sets(f3(C,f24(A,B)),f4(C,f24(A,B))),f24(A,B)). [resolve(10,d,4,f)].
% 0.72/1.03 Derived: compact_space(A,B) | -topological_space(A,B) | -finite(C) | -open_covering(C,A,B) | -finer(f24(A,B),C,D). [resolve(10,d,5,b)].
% 0.72/1.03 Derived: compact_space(A,B) | -topological_space(A,B) | -finite(C) | -open_covering(C,A,B) | -open_covering(C,D,f24(A,B)). [resolve(10,d,7,b)].
% 0.72/1.03 Derived: compact_space(A,B) | -topological_space(A,B) | -finite(f23(C,D,f24(A,B))) | -open_covering(f23(C,D,f24(A,B)),A,B) | -compact_space(C,D) | -open_covering(f24(A,B),C,D). [resolve(10,d,9,c)].
% 0.72/1.03 11 open(A,B,C) | -topological_space(B,C) | -element_of_collection(A,C) # label(open_set_20) # label(axiom). [assumption].
% 0.72/1.03 12 -open(A,B,C) | topological_space(B,C) # label(open_set_18) # label(axiom). [assumption].
% 0.72/1.03 13 -open(A,B,C) | element_of_collection(A,C) # label(open_set_19) # label(axiom). [assumption].
% 0.72/1.03 14 -closed(A,B,C) | open(relative_complement_sets(A,B),B,C) # label(closed_set_22) # label(axiom). [assumption].
% 0.72/1.03 Derived: -closed(A,B,C) | topological_space(B,C). [resolve(14,b,12,a)].
% 0.72/1.03 Derived: -closed(A,B,C) | element_of_collection(relative_complement_sets(A,B),C). [resolve(14,b,13,a)].
% 0.72/1.03 15 closed(A,B,C) | -topological_space(B,C) | -open(relative_complement_sets(A,B),B,C) # label(closed_set_23) # label(axiom). [assumption].
% 0.72/1.03 Derived: closed(A,B,C) | -topological_space(B,C) | -topological_space(B,C) | -element_of_collection(relative_complement_sets(A,B),C). [resolve(15,c,11,a)].
% 0.72/1.03 16 -element_of_set(A,interior(B,C,D)) | open(f13(B,C,D,A),C,D) # label(interior_51) # label(axiom). [assumption].
% 0.72/1.03 Derived: -element_of_set(A,interior(B,C,D)) | topological_space(C,D). [resolve(16,b,12,a)].
% 0.72/1.03 Derived: -element_of_set(A,interior(B,C,D)) | element_of_collection(f13(B,C,D,A),D). [resolve(16,b,13,a)].
% 0.72/1.03 17 element_of_set(A,interior(B,C,D)) | -topological_space(C,D) | -subset_sets(B,C) | -element_of_set(A,E) | -subset_sets(E,B) | -open(E,C,D) # label(interior_52) # label(axiom). [assumption].
% 0.72/1.03 Derived: element_of_set(A,interior(B,C,D)) | -topological_space(C,D) | -subset_sets(B,C) | -element_of_set(A,E) | -subset_sets(E,B) | -topological_space(C,D) | -element_of_collection(E,D). [resolve(17,f,11,a)].
% 0.72/1.03 Derived: element_of_set(A,interior(B,C,D)) | -topological_space(C,D) | -subset_sets(B,C) | -element_of_set(A,relative_complement_sets(E,C)) | -subset_sets(relative_complement_sets(E,C),B) | -closed(E,C,D). [resolve(17,f,14,b)].
% 0.72/1.03 Derived: element_of_set(A,interior(B,C,D)) | -topological_space(C,D) | -subset_sets(B,C) | -element_of_set(A,f13(E,C,D,F)) | -subset_sets(f13(E,C,D,F),B) | -element_of_set(F,interior(E,C,D)). [resolve(17,f,16,b)].
% 0.72/1.03 18 -neighborhood(A,B,C,D) | open(A,C,D) # label(neighborhood_60) # label(axiom). [assumption].
% 0.72/1.03 Derived: -neighborhood(A,B,C,D) | topological_space(C,D). [resolve(18,b,12,a)].
% 0.72/1.03 Derived: -neighborhood(A,B,C,D) | element_of_collection(A,D). [resolve(18,b,13,a)].
% 0.72/1.03 Derived: -neighborhood(relative_complement_sets(A,B),C,B,D) | closed(A,B,D) | -topological_space(B,D). [resolve(18,b,15,c)].
% 0.72/1.03 Derived: -neighborhood(A,B,C,D) | element_of_set(E,interior(F,C,D)) | -topological_space(C,D) | -subset_sets(F,C) | -element_of_set(E,A) | -subset_sets(A,F). [resolve(18,b,17,f)].
% 0.72/1.03 19 neighborhood(A,B,C,D) | -topological_space(C,D) | -open(A,C,D) | -element_of_set(B,A) # label(neighborhood_62) # label(axiom). [assumption].
% 0.72/1.03 Derived: neighborhood(A,B,C,D) | -topological_space(C,D) | -element_of_set(B,A) | -topological_space(C,D) | -element_of_collection(A,D). [resolve(19,c,11,a)].
% 0.72/1.03 Derived: neighborhood(relative_complement_sets(A,B),C,B,D) | -topological_space(B,D) | -element_of_set(C,relative_complement_sets(A,B)) | -closed(A,B,D). [resolve(19,c,14,b)].
% 0.72/1.03 Derived: neighborhood(f13(A,B,C,D),E,B,C) | -topological_space(B,C) | -element_of_set(E,f13(A,B,C,D)) | -element_of_set(D,interior(A,B,C)). [resolve(19,c,16,b)].
% 0.72/1.03 Derived: neighborhood(A,B,C,D) | -topological_space(C,D) | -element_of_set(B,A) | -neighborhood(A,E,C,D). [resolve(19,c,18,b)].
% 0.72/1.03 20 element_of_set(A,closure(B,C,D)) | -topological_space(C,D) | -subset_sets(B,C) | closed(f14(B,C,D,A),C,D) # label(closure_57) # label(axiom). [assumption].
% 0.72/1.03 21 -closed(A,B,C) | topological_space(B,C) # label(closed_set_21) # label(axiom). [assumption].
% 0.72/1.03 22 -element_of_set(A,closure(B,C,D)) | -subset_sets(B,E) | -closed(E,C,D) | element_of_set(A,E) # label(closure_55) # label(axiom). [assumption].
% 0.72/1.03 Derived: element_of_set(A,closure(B,C,D)) | -topological_space(C,D) | -subset_sets(B,C) | -element_of_set(E,closure(F,C,D)) | -subset_sets(F,f14(B,C,D,A)) | element_of_set(E,f14(B,C,D,A)). [resolve(20,d,22,c)].
% 0.72/1.03 23 -closed(A,B,C) | topological_space(B,C). [resolve(14,b,12,a)].
% 0.72/1.03 24 -closed(A,B,C) | element_of_collection(relative_complement_sets(A,B),C). [resolve(14,b,13,a)].
% 0.72/1.03 Derived: element_of_collection(relative_complement_sets(f14(A,B,C,D),B),C) | element_of_set(D,closure(A,B,C)) | -topological_space(B,C) | -subset_sets(A,B). [resolve(24,a,20,d)].
% 0.72/1.03 25 closed(A,B,C) | -topological_space(B,C) | -topological_space(B,C) | -element_of_collection(relative_complement_sets(A,B),C). [resolve(15,c,11,a)].
% 0.72/1.03 Derived: -topological_space(A,B) | -topological_space(A,B) | -element_of_collection(relative_complement_sets(C,A),B) | -element_of_set(D,closure(E,A,B)) | -subset_sets(E,C) | element_of_set(D,C). [resolve(25,a,22,c)].
% 0.72/1.03 26 element_of_set(A,interior(B,C,D)) | -topological_space(C,D) | -subset_sets(B,C) | -element_of_set(A,relative_complement_sets(E,C)) | -subset_sets(relative_complement_sets(E,C),B) | -closed(E,C,D). [resolve(17,f,14,b)].
% 0.72/1.03 Derived: element_of_set(A,interior(B,C,D)) | -topological_space(C,D) | -subset_sets(B,C) | -element_of_set(A,relative_complement_sets(f14(E,C,D,F),C)) | -subset_sets(relative_complement_sets(f14(E,C,D,F),C),B) | element_of_set(F,closure(E,C,D)) | -topological_space(C,D) | -subset_sets(E,C). [resolve(26,f,20,d)].
% 0.72/1.03 Derived: element_of_set(A,interior(B,C,D)) | -topological_space(C,D) | -subset_sets(B,C) | -element_of_set(A,relative_complement_sets(E,C)) | -subset_sets(relative_complement_sets(E,C),B) | -topological_space(C,D) | -topological_space(C,D) | -element_of_collection(relative_complement_sets(E,C),D). [resolve(26,f,25,a)].
% 0.72/1.03 27 -neighborhood(relative_complement_sets(A,B),C,B,D) | closed(A,B,D) | -topological_space(B,D). [resolve(18,b,15,c)].
% 0.72/1.03 Derived: -neighborhood(relative_complement_sets(A,B),C,B,D) | -topological_space(B,D) | -element_of_set(E,closure(F,B,D)) | -subset_sets(F,A) | element_of_set(E,A). [resolve(27,b,22,c)].
% 0.72/1.03 Derived: -neighborhood(relative_complement_sets(A,B),C,B,D) | -topological_space(B,D) | element_of_collection(relative_complement_sets(A,B),D). [resolve(27,b,24,a)].
% 0.72/1.03 28 neighborhood(relative_complement_sets(A,B),C,B,D) | -topological_space(B,D) | -element_of_set(C,relative_complement_sets(A,B)) | -closed(A,B,D). [resolve(19,c,14,b)].
% 0.72/1.03 Derived: neighborhood(relative_complement_sets(f14(A,B,C,D),B),E,B,C) | -topological_space(B,C) | -element_of_set(E,relative_complement_sets(f14(A,B,C,D),B)) | element_of_set(D,closure(A,B,C)) | -topological_space(B,C) | -subset_sets(A,B). [resolve(28,d,20,d)].
% 0.72/1.03 Derived: neighborhood(relative_complement_sets(A,B),C,B,D) | -topological_space(B,D) | -element_of_set(C,relative_complement_sets(A,B)) | -topological_space(B,D) | -topological_space(B,D) | -element_of_collection(relative_complement_sets(A,B),D). [resolve(28,d,25,a)].
% 0.72/1.03 29 basis(A,B) | -equal_sets(union_of_members(B),A) | element_of_set(f7(A,B),A) # label(basis_for_topology_32) # label(axiom). [assumption].
% 0.72/1.04 30 -basis(A,B) | equal_sets(union_of_members(B),A) # label(basis_for_topology_28) # label(axiom). [assumption].
% 0.72/1.04 31 -basis(A,B) | -element_of_set(C,A) | -element_of_collection(D,B) | -element_of_collection(E,B) | -element_of_set(C,intersection_of_sets(D,E)) | element_of_set(C,f6(A,B,C,D,E)) # label(basis_for_topology_29) # label(axiom). [assumption].
% 0.72/1.04 32 -basis(A,B) | -element_of_set(C,A) | -element_of_collection(D,B) | -element_of_collection(E,B) | -element_of_set(C,intersection_of_sets(D,E)) | element_of_collection(f6(A,B,C,D,E),B) # label(basis_for_topology_30) # label(axiom). [assumption].
% 0.72/1.04 33 -basis(A,B) | -element_of_set(C,A) | -element_of_collection(D,B) | -element_of_collection(E,B) | -element_of_set(C,intersection_of_sets(D,E)) | subset_sets(f6(A,B,C,D,E),intersection_of_sets(D,E)) # label(basis_for_topology_31) # label(axiom). [assumption].
% 0.72/1.04 Derived: -equal_sets(union_of_members(A),B) | element_of_set(f7(B,A),B) | -element_of_set(C,B) | -element_of_collection(D,A) | -element_of_collection(E,A) | -element_of_set(C,intersection_of_sets(D,E)) | element_of_set(C,f6(B,A,C,D,E)). [resolve(29,a,31,a)].
% 0.72/1.04 Derived: -equal_sets(union_of_members(A),B) | element_of_set(f7(B,A),B) | -element_of_set(C,B) | -element_of_collection(D,A) | -element_of_collection(E,A) | -element_of_set(C,intersection_of_sets(D,E)) | element_of_collection(f6(B,A,C,D,E),A). [resolve(29,a,32,a)].
% 0.72/1.04 Derived: -equal_sets(union_of_members(A),B) | element_of_set(f7(B,A),B) | -element_of_set(C,B) | -element_of_collection(D,A) | -element_of_collection(E,A) | -element_of_set(C,intersection_of_sets(D,E)) | subset_sets(f6(B,A,C,D,E),intersection_of_sets(D,E)). [resolve(29,a,33,a)].
% 0.72/1.04 34 basis(A,B) | -equal_sets(union_of_members(B),A) | element_of_collection(f8(A,B),B) # label(basis_for_topology_33) # label(axiom). [assumption].
% 0.72/1.04 Derived: -equal_sets(union_of_members(A),B) | element_of_collection(f8(B,A),A) | -element_of_set(C,B) | -element_of_collection(D,A) | -element_of_collection(E,A) | -element_of_set(C,intersection_of_sets(D,E)) | element_of_set(C,f6(B,A,C,D,E)). [resolve(34,a,31,a)].
% 0.72/1.04 Derived: -equal_sets(union_of_members(A),B) | element_of_collection(f8(B,A),A) | -element_of_set(C,B) | -element_of_collection(D,A) | -element_of_collection(E,A) | -element_of_set(C,intersection_of_sets(D,E)) | element_of_collection(f6(B,A,C,D,E),A). [resolve(34,a,32,a)].
% 0.72/1.04 Derived: -equal_sets(union_of_members(A),B) | element_of_collection(f8(B,A),A) | -element_of_set(C,B) | -element_of_collection(D,A) | -element_of_collection(E,A) | -element_of_set(C,intersection_of_sets(D,E)) | subset_sets(f6(B,A,C,D,E),intersection_of_sets(D,E)). [resolve(34,a,33,a)].
% 0.72/1.04 35 basis(A,B) | -equal_sets(union_of_members(B),A) | element_of_collection(f9(A,B),B) # label(basis_for_topology_34) # label(axiom). [assumption].
% 0.72/1.04 Derived: -equal_sets(union_of_members(A),B) | element_of_collection(f9(B,A),A) | -element_of_set(C,B) | -element_of_collection(D,A) | -element_of_collection(E,A) | -element_of_set(C,intersection_of_sets(D,E)) | element_of_set(C,f6(B,A,C,D,E)). [resolve(35,a,31,a)].
% 0.72/1.04 Derived: -equal_sets(union_of_members(A),B) | element_of_collection(f9(B,A),A) | -element_of_set(C,B) | -element_of_collection(D,A) | -element_of_collection(E,A) | -element_of_set(C,intersection_of_sets(D,E)) | element_of_collection(f6(B,A,C,D,E),A). [resolve(35,a,32,a)].
% 0.72/1.04 Derived: -equal_sets(union_of_members(A),B) | element_of_collection(f9(B,A),A) | -element_of_set(C,B) | -element_of_collection(D,A) | -element_of_collection(E,A) | -element_of_set(C,intersection_of_sets(D,E)) | subset_sets(f6(B,A,C,D,E),intersection_of_sets(D,E)). [resolve(35,a,33,a)].
% 0.72/1.04 36 basis(A,B) | -equal_sets(union_of_members(B),A) | element_of_set(f7(A,B),intersection_of_sets(f8(A,B),f9(A,B))) # label(basis_for_topology_35) # label(axiom). [assumption].
% 0.72/1.04 Derived: -equal_sets(union_of_members(A),B) | element_of_set(f7(B,A),intersection_of_sets(f8(B,A),f9(B,A))) | -element_of_set(C,B) | -element_of_collection(D,A) | -element_of_collection(E,A) | -element_of_set(C,intersection_of_sets(D,E)) | element_of_set(C,f6(B,A,C,D,E)). [resolve(36,a,31,a)].
% 0.72/1.04 Derived: -equal_sets(union_of_members(A),B) | element_of_set(f7(B,A),intersection_of_sets(f8(B,A),f9(B,A))) | -element_of_set(C,B) | -element_of_collection(D,A) | -element_of_collection(E,A) | -element_of_set(C,intersection_of_sets(D,E)) | element_of_collection(f6(B,A,C,D,E),A). [resolve(36,a,32,a)].
% 0.72/1.04 Derived: -equal_sets(union_of_members(A),B) | element_of_set(f7(B,A),intersection_of_sets(f8(B,A),f9(B,A))) | -element_of_set(C,B) | -element_of_collection(D,A) | -element_of_collection(E,A) | -element_of_set(C,intersection_of_sets(D,E)) | subset_sets(f6(B,A,C,D,E),intersection_of_sets(D,E)). [resolve(36,a,33,a)].
% 0.72/1.04 37 basis(A,B) | -equal_sets(union_of_members(B),A) | -element_of_set(f7(A,B),C) | -element_of_collection(C,B) | -subset_sets(C,intersection_of_sets(f8(A,B),f9(A,B))) # label(basis_for_topology_36) # label(axiom). [assumption].
% 0.72/1.04 Derived: -equal_sets(union_of_members(A),B) | -element_of_set(f7(B,A),C) | -element_of_collection(C,A) | -subset_sets(C,intersection_of_sets(f8(B,A),f9(B,A))) | -element_of_set(D,B) | -element_of_collection(E,A) | -element_of_collection(F,A) | -element_of_set(D,intersection_of_sets(E,F)) | element_of_set(D,f6(B,A,D,E,F)). [resolve(37,a,31,a)].
% 0.72/1.04 Derived: -equal_sets(union_of_members(A),B) | -element_of_set(f7(B,A),C) | -element_of_collection(C,A) | -subset_sets(C,intersection_of_sets(f8(B,A),f9(B,A))) | -element_of_set(D,B) | -element_of_collection(E,A) | -element_of_collection(F,A) | -element_of_set(D,intersection_of_sets(E,F)) | element_of_collection(f6(B,A,D,E,F),A). [resolve(37,a,32,a)].
% 0.72/1.04 Derived: -equal_sets(union_of_members(A),B) | -element_of_set(f7(B,A),C) | -element_of_collection(C,A) | -subset_sets(C,intersection_of_sets(f8(B,A),f9(B,A))) | -element_of_set(D,B) | -element_of_collection(E,A) | -element_of_collection(F,A) | -element_of_set(D,intersection_of_sets(E,F)) | subset_sets(f6(B,A,D,E,F),intersection_of_sets(E,F)). [resolve(37,a,33,a)].
% 0.72/1.04 38 limit_point(A,B,C,D) | -topological_space(C,D) | -subset_sets(B,C) | neighborhood(f16(A,B,C,D),A,C,D) # label(limit_point_67) # label(axiom). [assumption].
% 0.72/1.04 39 -limit_point(A,B,C,D) | topological_space(C,D) # label(limit_point_63) # label(axiom). [assumption].
% 0.72/1.04 40 -limit_point(A,B,C,D) | subset_sets(B,C) # label(limit_point_64) # label(axiom). [assumption].
% 0.72/1.04 41 -limit_point(A,B,C,D) | -neighborhood(E,A,C,D) | element_of_set(f15(A,B,C,D,E),intersection_of_sets(E,B)) # label(limit_point_65) # label(axiom). [assumption].
% 0.72/1.04 42 -limit_point(A,B,C,D) | -neighborhood(E,A,C,D) | -eq_p(f15(A,B,C,D,E),A) # label(limit_point_66) # label(axiom). [assumption].
% 0.72/1.04 Derived: -topological_space(A,B) | -subset_sets(C,A) | neighborhood(f16(D,C,A,B),D,A,B) | -neighborhood(E,D,A,B) | element_of_set(f15(D,C,A,B,E),intersection_of_sets(E,C)). [resolve(38,a,41,a)].
% 0.72/1.04 Derived: -topological_space(A,B) | -subset_sets(C,A) | neighborhood(f16(D,C,A,B),D,A,B) | -neighborhood(E,D,A,B) | -eq_p(f15(D,C,A,B,E),D). [resolve(38,a,42,a)].
% 0.72/1.04 43 limit_point(A,B,C,D) | -topological_space(C,D) | -subset_sets(B,C) | -element_of_set(E,intersection_of_sets(f16(A,B,C,D),B)) | eq_p(E,A) # label(limit_point_68) # label(axiom). [assumption].
% 0.72/1.04 Derived: -topological_space(A,B) | -subset_sets(C,A) | -element_of_set(D,intersection_of_sets(f16(E,C,A,B),C)) | eq_p(D,E) | -neighborhood(F,E,A,B) | element_of_set(f15(E,C,A,B,F),intersection_of_sets(F,C)). [resolve(43,a,41,a)].
% 0.72/1.04 Derived: -topological_space(A,B) | -subset_sets(C,A) | -element_of_set(D,intersection_of_sets(f16(E,C,A,B),C)) | eq_p(D,E) | -neighborhood(F,E,A,B) | -eq_p(f15(E,C,A,B,F),E). [resolve(43,a,42,a)].
% 0.72/1.04 44 hausdorff(A,B) | -topological_space(A,B) | element_of_set(f19(A,B),A) # label(hausdorff_77) # label(axiom). [assumption].
% 0.72/1.04 45 -hausdorff(A,B) | topological_space(A,B) # label(hausdorff_73) # label(axiom). [assumption].
% 0.72/1.04 46 -hausdorff(A,B) | -element_of_set(C,A) | -element_of_set(D,A) | eq_p(C,D) | neighborhood(f17(A,B,C,D),C,A,B) # label(hausdorff_74) # label(axiom). [assumption].
% 0.72/1.04 47 -hausdorff(A,B) | -element_of_set(C,A) | -element_of_set(D,A) | eq_p(C,D) | neighborhood(f18(A,B,C,D),D,A,B) # label(hausdorff_75) # label(axiom). [assumption].
% 0.72/1.05 48 -hausdorff(A,B) | -element_of_set(C,A) | -element_of_set(D,A) | eq_p(C,D) | disjoint_s(f17(A,B,C,D),f18(A,B,C,D)) # label(hausdorff_76) # label(axiom). [assumption].
% 0.72/1.05 Derived: -topological_space(A,B) | element_of_set(f19(A,B),A) | -element_of_set(C,A) | -element_of_set(D,A) | eq_p(C,D) | neighborhood(f17(A,B,C,D),C,A,B). [resolve(44,a,46,a)].
% 0.72/1.05 Derived: -topological_space(A,B) | element_of_set(f19(A,B),A) | -element_of_set(C,A) | -element_of_set(D,A) | eq_p(C,D) | neighborhood(f18(A,B,C,D),D,A,B). [resolve(44,a,47,a)].
% 0.72/1.05 Derived: -topological_space(A,B) | element_of_set(f19(A,B),A) | -element_of_set(C,A) | -element_of_set(D,A) | eq_p(C,D) | disjoint_s(f17(A,B,C,D),f18(A,B,C,D)). [resolve(44,a,48,a)].
% 0.72/1.05 49 hausdorff(A,B) | -topological_space(A,B) | element_of_set(f20(A,B),A) # label(hausdorff_78) # label(axiom). [assumption].
% 0.72/1.05 Derived: -topological_space(A,B) | element_of_set(f20(A,B),A) | -element_of_set(C,A) | -element_of_set(D,A) | eq_p(C,D) | neighborhood(f17(A,B,C,D),C,A,B). [resolve(49,a,46,a)].
% 0.72/1.05 Derived: -topological_space(A,B) | element_of_set(f20(A,B),A) | -element_of_set(C,A) | -element_of_set(D,A) | eq_p(C,D) | neighborhood(f18(A,B,C,D),D,A,B). [resolve(49,a,47,a)].
% 0.72/1.05 Derived: -topological_space(A,B) | element_of_set(f20(A,B),A) | -element_of_set(C,A) | -element_of_set(D,A) | eq_p(C,D) | disjoint_s(f17(A,B,C,D),f18(A,B,C,D)). [resolve(49,a,48,a)].
% 0.72/1.05 50 hausdorff(A,B) | -topological_space(A,B) | -eq_p(f19(A,B),f20(A,B)) # label(hausdorff_79) # label(axiom). [assumption].
% 0.72/1.05 Derived: -topological_space(A,B) | -eq_p(f19(A,B),f20(A,B)) | -element_of_set(C,A) | -element_of_set(D,A) | eq_p(C,D) | neighborhood(f17(A,B,C,D),C,A,B). [resolve(50,a,46,a)].
% 0.72/1.05 Derived: -topological_space(A,B) | -eq_p(f19(A,B),f20(A,B)) | -element_of_set(C,A) | -element_of_set(D,A) | eq_p(C,D) | neighborhood(f18(A,B,C,D),D,A,B). [resolve(50,a,47,a)].
% 0.72/1.05 Derived: -topological_space(A,B) | -eq_p(f19(A,B),f20(A,B)) | -element_of_set(C,A) | -element_of_set(D,A) | eq_p(C,D) | disjoint_s(f17(A,B,C,D),f18(A,B,C,D)). [resolve(50,a,48,a)].
% 0.72/1.05 51 hausdorff(A,B) | -topological_space(A,B) | -neighborhood(C,f19(A,B),A,B) | -neighborhood(D,f20(A,B),A,B) | -disjoint_s(C,D) # label(hausdorff_80) # label(axiom). [assumption].
% 0.72/1.05 Derived: -topological_space(A,B) | -neighborhood(C,f19(A,B),A,B) | -neighborhood(D,f20(A,B),A,B) | -disjoint_s(C,D) | -element_of_set(E,A) | -element_of_set(F,A) | eq_p(E,F) | neighborhood(f17(A,B,E,F),E,A,B). [resolve(51,a,46,a)].
% 0.72/1.05 Derived: -topological_space(A,B) | -neighborhood(C,f19(A,B),A,B) | -neighborhood(D,f20(A,B),A,B) | -disjoint_s(C,D) | -element_of_set(E,A) | -element_of_set(F,A) | eq_p(E,F) | neighborhood(f18(A,B,E,F),F,A,B). [resolve(51,a,47,a)].
% 0.72/1.05 Derived: -topological_space(A,B) | -neighborhood(C,f19(A,B),A,B) | -neighborhood(D,f20(A,B),A,B) | -disjoint_s(C,D) | -element_of_set(E,A) | -element_of_set(F,A) | eq_p(E,F) | disjoint_s(f17(A,B,E,F),f18(A,B,E,F)). [resolve(51,a,48,a)].
% 0.72/1.05 52 separation(A,B,C,D) | -topological_space(C,D) | equal_sets(A,empty_set) | equal_sets(B,empty_set) | -element_of_collection(A,D) | -element_of_collection(B,D) | -equal_sets(union_of_sets(A,B),C) | -disjoint_s(A,B) # label(separation_88) # label(axiom). [assumption].
% 0.72/1.05 53 -separation(A,B,C,D) | topological_space(C,D) # label(separation_81) # label(axiom). [assumption].
% 0.72/1.05 54 -separation(A,B,C,D) | -equal_sets(A,empty_set) # label(separation_82) # label(axiom). [assumption].
% 0.72/1.05 55 -separation(A,B,C,D) | -equal_sets(B,empty_set) # label(separation_83) # label(axiom). [assumption].
% 0.72/1.05 56 -separation(A,B,C,D) | element_of_collection(A,D) # label(separation_84) # label(axiom). [assumption].
% 0.72/1.05 57 -separation(A,B,C,D) | element_of_collection(B,D) # label(separation_85) # label(axiom). [assumption].
% 0.72/1.05 58 -separation(A,B,C,D) | equal_sets(union_of_sets(A,B),C) # label(separation_86) # label(axiom). [assumption].
% 0.72/1.05 59 -separation(A,B,C,D) | disjoint_s(A,B) # label(separation_87) # label(axiom). [assumption].
% 0.72/1.05 60 -connected_space(A,B) | -separation(C,D,A,B) # label(connected_space_90) # label(axiom). [assumption].
% 0.72/1.05 Derived: -connected_space(A,B) | -topological_space(A,B) | equal_sets(C,empty_set) | equal_sets(D,empty_set) | -element_of_collection(C,B) | -element_of_collection(D,B) | -equal_sets(union_of_sets(C,D),A) | -disjoint_s(C,D). [resolve(60,b,52,a)].
% 0.72/1.05 61 connected_space(A,B) | -topological_space(A,B) | separation(f21(A,B),f22(A,B),A,B) # label(connected_space_91) # label(axiom). [assumption].
% 0.72/1.05 Derived: connected_space(A,B) | -topological_space(A,B) | -equal_sets(f21(A,B),empty_set). [resolve(61,c,54,a)].
% 0.72/1.05 Derived: connected_space(A,B) | -topological_space(A,B) | -equal_sets(f22(A,B),empty_set). [resolve(61,c,55,a)].
% 0.72/1.05 Derived: connected_space(A,B) | -topological_space(A,B) | element_of_collection(f21(A,B),B). [resolve(61,c,56,a)].
% 0.72/1.05 Derived: connected_space(A,B) | -topological_space(A,B) | element_of_collection(f22(A,B),B). [resolve(61,c,57,a)].
% 0.72/1.05 Derived: connected_space(A,B) | -topological_space(A,B) | equal_sets(union_of_sets(f21(A,B),f22(A,B)),A). [resolve(61,c,58,a)].
% 0.72/1.05 Derived: connected_space(A,B) | -topological_space(A,B) | disjoint_s(f21(A,B),f22(A,B)). [resolve(61,c,59,a)].
% 0.72/1.05 62 -connected_set(A,B,C) | connected_space(A,subspace_topology(B,C,A)) # label(connected_set_94) # label(axiom). [assumption].
% 0.72/1.05 63 -connected_space(A,B) | topological_space(A,B) # label(connected_space_89) # label(axiom). [assumption].
% 0.72/1.05 Derived: -connected_set(A,B,C) | topological_space(A,subspace_topology(B,C,A)). [resolve(62,b,63,a)].
% 0.72/1.05 64 connected_set(A,B,C) | -topological_space(B,C) | -subset_sets(A,B) | -connected_space(A,subspace_topology(B,C,A)) # label(connected_set_95) # label(axiom). [assumption].
% 0.72/1.05 65 -connected_space(A,B) | -topological_space(A,B) | equal_sets(C,empty_set) | equal_sets(D,empty_set) | -element_of_collection(C,B) | -element_of_collection(D,B) | -equal_sets(union_of_sets(C,D),A) | -disjoint_s(C,D). [resolve(60,b,52,a)].
% 0.72/1.05 Derived: -topological_space(A,subspace_topology(B,C,A)) | equal_sets(D,empty_set) | equal_sets(E,empty_set) | -element_of_collection(D,subspace_topology(B,C,A)) | -element_of_collection(E,subspace_topology(B,C,A)) | -equal_sets(union_of_sets(D,E),A) | -disjoint_s(D,E) | -connected_set(A,B,C). [resolve(65,a,62,b)].
% 0.72/1.05 66 connected_space(A,B) | -topological_space(A,B) | -equal_sets(f21(A,B),empty_set). [resolve(61,c,54,a)].
% 0.72/1.05 Derived: -topological_space(A,subspace_topology(B,C,A)) | -equal_sets(f21(A,subspace_topology(B,C,A)),empty_set) | connected_set(A,B,C) | -topological_space(B,C) | -subset_sets(A,B). [resolve(66,a,64,d)].
% 0.72/1.05 Derived: -topological_space(A,B) | -equal_sets(f21(A,B),empty_set) | -topological_space(A,B) | equal_sets(C,empty_set) | equal_sets(D,empty_set) | -element_of_collection(C,B) | -element_of_collection(D,B) | -equal_sets(union_of_sets(C,D),A) | -disjoint_s(C,D). [resolve(66,a,65,a)].
% 0.72/1.05 67 connected_space(A,B) | -topological_space(A,B) | -equal_sets(f22(A,B),empty_set). [resolve(61,c,55,a)].
% 0.72/1.05 Derived: -topological_space(A,subspace_topology(B,C,A)) | -equal_sets(f22(A,subspace_topology(B,C,A)),empty_set) | connected_set(A,B,C) | -topological_space(B,C) | -subset_sets(A,B). [resolve(67,a,64,d)].
% 0.72/1.05 Derived: -topological_space(A,B) | -equal_sets(f22(A,B),empty_set) | -topological_space(A,B) | equal_sets(C,empty_set) | equal_sets(D,empty_set) | -element_of_collection(C,B) | -element_of_collection(D,B) | -equal_sets(union_of_sets(C,D),A) | -disjoint_s(C,D). [resolve(67,a,65,a)].
% 0.72/1.05 68 connected_space(A,B) | -topological_space(A,B) | element_of_collection(f21(A,B),B). [resolve(61,c,56,a)].
% 0.72/1.05 Derived: -topological_space(A,subspace_topology(B,C,A)) | element_of_collection(f21(A,subspace_topology(B,C,A)),subspace_topology(B,C,A)) | connected_set(A,B,C) | -topological_space(B,C) | -subset_sets(A,B). [resolve(68,a,64,d)].
% 0.72/1.05 Derived: -topological_space(A,B) | element_of_collection(f21(A,B),B) | -topological_space(A,B) | equal_sets(C,empty_set) | equal_sets(D,empty_set) | -element_of_collection(C,B) | -element_of_collection(D,B) | -equal_sets(union_of_sets(C,D),A) | -disjoint_s(C,D). [resolve(68,a,65,a)].
% 0.72/1.05 69 connected_space(A,B) | -topological_space(A,B) | element_of_collection(f22(A,B),B). [resolve(61,c,57,a)].
% 0.72/1.06 Derived: -topological_space(A,subspace_topology(B,C,A)) | element_of_collection(f22(A,subspace_topology(B,C,A)),subspace_topology(B,C,A)) | connected_set(A,B,C) | -topological_space(B,C) | -subset_sets(A,B). [resolve(69,a,64,d)].
% 0.72/1.06 Derived: -topological_space(A,B) | element_of_collection(f22(A,B),B) | -topological_space(A,B) | equal_sets(C,empty_set) | equal_sets(D,empty_set) | -element_of_collection(C,B) | -element_of_collection(D,B) | -equal_sets(union_of_sets(C,D),A) | -disjoint_s(C,D). [resolve(69,a,65,a)].
% 0.72/1.06 70 connected_space(A,B) | -topological_space(A,B) | equal_sets(union_of_sets(f21(A,B),f22(A,B)),A). [resolve(61,c,58,a)].
% 0.72/1.06 Derived: -topological_space(A,subspace_topology(B,C,A)) | equal_sets(union_of_sets(f21(A,subspace_topology(B,C,A)),f22(A,subspace_topology(B,C,A))),A) | connected_set(A,B,C) | -topological_space(B,C) | -subset_sets(A,B). [resolve(70,a,64,d)].
% 0.72/1.06 Derived: -topological_space(A,B) | equal_sets(union_of_sets(f21(A,B),f22(A,B)),A) | -topological_space(A,B) | equal_sets(C,empty_set) | equal_sets(D,empty_set) | -element_of_collection(C,B) | -element_of_collection(D,B) | -equal_sets(union_of_sets(C,D),A) | -disjoint_s(C,D). [resolve(70,a,65,a)].
% 0.72/1.06 71 connected_space(A,B) | -topological_space(A,B) | disjoint_s(f21(A,B),f22(A,B)). [resolve(61,c,59,a)].
% 0.72/1.06 Derived: -topological_space(A,subspace_topology(B,C,A)) | disjoint_s(f21(A,subspace_topology(B,C,A)),f22(A,subspace_topology(B,C,A))) | connected_set(A,B,C) | -topological_space(B,C) | -subset_sets(A,B). [resolve(71,a,64,d)].
% 0.72/1.06 Derived: -topological_space(A,B) | disjoint_s(f21(A,B),f22(A,B)) | -topological_space(A,B) | equal_sets(C,empty_set) | equal_sets(D,empty_set) | -element_of_collection(C,B) | -element_of_collection(D,B) | -equal_sets(union_of_sets(C,D),A) | -disjoint_s(C,D). [resolve(71,a,65,a)].
% 0.72/1.06 72 -topological_space(A,subspace_topology(B,C,A)) | -equal_sets(f21(A,subspace_topology(B,C,A)),empty_set) | connected_set(A,B,C) | -topological_space(B,C) | -subset_sets(A,B). [resolve(66,a,64,d)].
% 0.72/1.06 73 -connected_set(A,B,C) | topological_space(B,C) # label(connected_set_92) # label(axiom). [assumption].
% 0.72/1.06 74 -connected_set(A,B,C) | subset_sets(A,B) # label(connected_set_93) # label(axiom). [assumption].
% 0.72/1.06 75 -connected_set(A,B,C) | topological_space(A,subspace_topology(B,C,A)). [resolve(62,b,63,a)].
% 0.72/1.06 76 -topological_space(A,subspace_topology(B,C,A)) | equal_sets(D,empty_set) | equal_sets(E,empty_set) | -element_of_collection(D,subspace_topology(B,C,A)) | -element_of_collection(E,subspace_topology(B,C,A)) | -equal_sets(union_of_sets(D,E),A) | -disjoint_s(D,E) | -connected_set(A,B,C). [resolve(65,a,62,b)].
% 0.72/1.06 77 -topological_space(A,subspace_topology(B,C,A)) | -equal_sets(f22(A,subspace_topology(B,C,A)),empty_set) | connected_set(A,B,C) | -topological_space(B,C) | -subset_sets(A,B). [resolve(67,a,64,d)].
% 0.72/1.06 78 -topological_space(A,subspace_topology(B,C,A)) | element_of_collection(f21(A,subspace_topology(B,C,A)),subspace_topology(B,C,A)) | connected_set(A,B,C) | -topological_space(B,C) | -subset_sets(A,B). [resolve(68,a,64,d)].
% 0.72/1.06 79 -topological_space(A,subspace_topology(B,C,A)) | element_of_collection(f22(A,subspace_topology(B,C,A)),subspace_topology(B,C,A)) | connected_set(A,B,C) | -topological_space(B,C) | -subset_sets(A,B). [resolve(69,a,64,d)].
% 0.72/1.06 80 -topological_space(A,subspace_topology(B,C,A)) | equal_sets(union_of_sets(f21(A,subspace_topology(B,C,A)),f22(A,subspace_topology(B,C,A))),A) | connected_set(A,B,C) | -topological_space(B,C) | -subset_sets(A,B). [resolve(70,a,64,d)].
% 0.72/1.06 81 -topological_space(A,subspace_topology(B,C,A)) | disjoint_s(f21(A,subspace_topology(B,C,A)),f22(A,subspace_topology(B,C,A))) | connected_set(A,B,C) | -topological_space(B,C) | -subset_sets(A,B). [resolve(71,a,64,d)].
% 0.72/1.06 82 compact_space(A,B) | -topological_space(A,B) | -finite(f5(C,f24(A,B))) | -open_covering(f5(C,f24(A,B)),A,B) | topological_space(C,f24(A,B)) | -equal_sets(union_of_members(f24(A,B)),C) | -element_of_collection(empty_set,f24(A,B)) | -element_of_collection(C,f24(A,B)) | element_of_collection(f3(C,f24(A,B)),f24(A,B)). [resolve(10,d,1,f)].
% 1.65/1.96 83 -compact_space(A,B) | -open_covering(C,A,B) | finite(f23(A,B,C)) # label(compact_space_101) # label(axiom). [assumption].
% 1.65/1.96 84 compact_space(A,B) | -topological_space(A,B) | -finite(f5(C,f24(A,B))) | -open_covering(f5(C,f24(A,B)),A,B) | topological_space(C,f24(A,B)) | -equal_sets(union_of_members(f24(A,B)),C) | -element_of_collection(empty_set,f24(A,B)) | -element_of_collection(C,f24(A,B)) | element_of_collection(f4(C,f24(A,B)),f24(A,B)). [resolve(10,d,3,f)].
% 1.65/1.96 85 compact_space(A,B) | -topological_space(A,B) | -finite(f5(C,f24(A,B))) | -open_covering(f5(C,f24(A,B)),A,B) | topological_space(C,f24(A,B)) | -equal_sets(union_of_members(f24(A,B)),C) | -element_of_collection(empty_set,f24(A,B)) | -element_of_collection(C,f24(A,B)) | -element_of_collection(intersection_of_sets(f3(C,f24(A,B)),f4(C,f24(A,B))),f24(A,B)). [resolve(10,d,4,f)].
% 1.65/1.96 86 compact_space(A,B) | -topological_space(A,B) | -finite(C) | -open_covering(C,A,B) | -finer(f24(A,B),C,D). [resolve(10,d,5,b)].
% 1.65/1.96 Derived: compact_space(A,B) | -topological_space(A,B) | -open_covering(f23(C,D,E),A,B) | -finer(f24(A,B),f23(C,D,E),F) | -compact_space(C,D) | -open_covering(E,C,D). [resolve(86,c,83,c)].
% 1.65/1.96 87 compact_space(A,B) | -topological_space(A,B) | -finite(C) | -open_covering(C,A,B) | -open_covering(C,D,f24(A,B)). [resolve(10,d,7,b)].
% 1.65/1.96 Derived: compact_space(A,B) | -topological_space(A,B) | -open_covering(f23(C,D,E),A,B) | -open_covering(f23(C,D,E),F,f24(A,B)) | -compact_space(C,D) | -open_covering(E,C,D). [resolve(87,c,83,c)].
% 1.65/1.96 88 compact_space(A,B) | -topological_space(A,B) | -finite(f23(C,D,f24(A,B))) | -open_covering(f23(C,D,f24(A,B)),A,B) | -compact_space(C,D) | -open_covering(f24(A,B),C,D). [resolve(10,d,9,c)].
% 1.65/1.96 Derived: compact_space(A,B) | -topological_space(A,B) | -open_covering(f23(C,D,f24(A,B)),A,B) | -compact_space(C,D) | -open_covering(f24(A,B),C,D) | -compact_space(C,D) | -open_covering(f24(A,B),C,D). [resolve(88,c,83,c)].
% 1.65/1.96 89 compact_set(A,B,C) | -topological_space(B,C) | -subset_sets(A,B) | -compact_space(A,subspace_topology(B,C,A)) # label(compact_set_109) # label(axiom). [assumption].
% 1.65/1.96 90 -compact_set(A,B,C) | topological_space(B,C) # label(compact_set_106) # label(axiom). [assumption].
% 1.65/1.96 91 -compact_set(A,B,C) | subset_sets(A,B) # label(compact_set_107) # label(axiom). [assumption].
% 1.65/1.96 92 -compact_set(A,B,C) | compact_space(A,subspace_topology(B,C,A)) # label(compact_set_108) # label(axiom). [assumption].
% 1.65/1.96
% 1.65/1.96 ============================== end predicate elimination =============
% 1.65/1.96
% 1.65/1.96 Auto_denials: (non-Horn, no changes).
% 1.65/1.96
% 1.65/1.96 Term ordering decisions:
% 1.65/1.96 Function symbol KB weights: empty_set=1. cx=1. a=1. ct=1. intersection_of_sets=1. f5=1. relative_complement_sets=1. f19=1. f20=1. f7=1. f8=1. f9=1. f3=1. f4=1. union_of_sets=1. f24=1. f21=1. f22=1. f1=1. f11=1. f2=1. union_of_members=1. top_of_basis=1. intersection_of_members=1. closure=1. interior=1. f23=1. subspace_topology=1. boundary=1. f10=1. f14=1. f17=1. f18=1. f13=1. f16=1. f12=1. f6=1. f15=1.
% 1.65/1.96
% 1.65/1.96 ============================== end of process initial clauses ========
% 1.65/1.96
% 1.65/1.96 ============================== CLAUSES FOR SEARCH ====================
% 1.65/1.96
% 1.65/1.96 ============================== end of clauses for search =============
% 1.65/1.96
% 1.65/1.96 ============================== SEARCH ================================
% 1.65/1.96
% 1.65/1.96 % Starting search at 0.08 seconds.
% 1.65/1.96
% 1.65/1.96 NOTE: Back_subsumption disabled, ratio of kept to back_subsumed is 253 (0.00 of 0.53 sec).
% 1.65/1.96
% 1.65/1.96 Low Water (keep): wt=71.000, iters=3343
% 1.65/1.96
% 1.65/1.96 Low Water (keep): wt=59.000, iters=3486
% 1.65/1.96
% 1.65/1.96 Low Water (keep): wt=56.000, iters=3347
% 1.65/1.96
% 1.65/1.96 Low Water (keep): wt=53.000, iters=3498
% 1.65/1.96
% 1.65/1.96 Low Water (keep): wt=50.000, iters=3476
% 1.65/1.96
% 1.65/1.96 Low Water (keep): wt=46.000, iters=3466
% 1.65/1.96
% 1.65/1.96 Low Water (keep): wt=44.000, iters=3360
% 1.65/1.96
% 1.65/1.96 Low Water (keep): wt=40.000, iters=3462
% 1.65/1.96
% 1.65/1.96 Low Water (keep): wt=37.000, iters=3585
% 1.65/1.96
% 1.65/1.96 Low Water (displace): id=2639, wt=90.000
% 1.65/1.96
% 1.65/1.96 Low Water (displace): id=3909, wt=84.000
% 1.65/1.96
% 1.65/1.96 Low Water (displace): id=5728, wt=77.000
% 1.65/1.96
% 1.65/1.96 Low Water (displace): id=5725, wt=71.000
% 1.65/1.96
% 1.65/1.96 Low Water (displace): id=2901, wt=70.000
% 1.65/1.96
% 1.65/1.96 Low Water (displace): id=4773, wt=66.000
% 1.65/1.96
% 1.65/1.96 Low Water (displace): id=2634, wt=65.000
% 1.65/1.96
% 1.65/1.96 Low Water (displace):Cputime limit exceeded (core dumped)
%------------------------------------------------------------------------------