TSTP Solution File: NUM046-1 by Prover9---1109a

View Problem - Process Solution 
%------------------------------------------------------------------------------
% File     : Prover9---1109a
% Problem  : NUM046-1 : TPTP v8.1.0. Bugfixed v2.1.0.
% Transfm  : none
% Format   : tptp:raw
% Command  : tptp2X_and_run_prover9 %d %s

% Computer : n005.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 : Mon Jul 18 13:24:51 EDT 2022

% Result   : Timeout 300.10s 300.36s
% Output   : None 
% Verified : 
% SZS Type : -

% Comments : 
%------------------------------------------------------------------------------
%----No solution output by system
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.03/0.12  % Problem  : NUM046-1 : TPTP v8.1.0. Bugfixed v2.1.0.
% 0.03/0.13  % Command  : tptp2X_and_run_prover9 %d %s
% 0.13/0.34  % Computer : n005.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 : Thu Jul  7 21:22:07 EDT 2022
% 0.13/0.34  % CPUTime  : 
% 0.76/1.04  ============================== Prover9 ===============================
% 0.76/1.04  Prover9 (32) version 2009-11A, November 2009.
% 0.76/1.04  Process 14113 was started by sandbox on n005.cluster.edu,
% 0.76/1.04  Thu Jul  7 21:22:08 2022
% 0.76/1.04  The command was "/export/starexec/sandbox/solver/bin/prover9 -t 300 -f /tmp/Prover9_13959_n005.cluster.edu".
% 0.76/1.04  ============================== end of head ===========================
% 0.76/1.04  
% 0.76/1.04  ============================== INPUT =================================
% 0.76/1.04  
% 0.76/1.04  % Reading from file /tmp/Prover9_13959_n005.cluster.edu
% 0.76/1.04  
% 0.76/1.04  set(prolog_style_variables).
% 0.76/1.04  set(auto2).
% 0.76/1.04      % set(auto2) -> set(auto).
% 0.76/1.04      % set(auto) -> set(auto_inference).
% 0.76/1.04      % set(auto) -> set(auto_setup).
% 0.76/1.04      % set(auto_setup) -> set(predicate_elim).
% 0.76/1.04      % set(auto_setup) -> assign(eq_defs, unfold).
% 0.76/1.04      % set(auto) -> set(auto_limits).
% 0.76/1.04      % set(auto_limits) -> assign(max_weight, "100.000").
% 0.76/1.04      % set(auto_limits) -> assign(sos_limit, 20000).
% 0.76/1.04      % set(auto) -> set(auto_denials).
% 0.76/1.04      % set(auto) -> set(auto_process).
% 0.76/1.04      % set(auto2) -> assign(new_constants, 1).
% 0.76/1.04      % set(auto2) -> assign(fold_denial_max, 3).
% 0.76/1.04      % set(auto2) -> assign(max_weight, "200.000").
% 0.76/1.04      % set(auto2) -> assign(max_hours, 1).
% 0.76/1.04      % assign(max_hours, 1) -> assign(max_seconds, 3600).
% 0.76/1.04      % set(auto2) -> assign(max_seconds, 0).
% 0.76/1.04      % set(auto2) -> assign(max_minutes, 5).
% 0.76/1.04      % assign(max_minutes, 5) -> assign(max_seconds, 300).
% 0.76/1.04      % set(auto2) -> set(sort_initial_sos).
% 0.76/1.04      % set(auto2) -> assign(sos_limit, -1).
% 0.76/1.04      % set(auto2) -> assign(lrs_ticks, 3000).
% 0.76/1.04      % set(auto2) -> assign(max_megs, 400).
% 0.76/1.04      % set(auto2) -> assign(stats, some).
% 0.76/1.04      % set(auto2) -> clear(echo_input).
% 0.76/1.04      % set(auto2) -> set(quiet).
% 0.76/1.04      % set(auto2) -> clear(print_initial_clauses).
% 0.76/1.04      % set(auto2) -> clear(print_given).
% 0.76/1.04  assign(lrs_ticks,-1).
% 0.76/1.04  assign(sos_limit,10000).
% 0.76/1.04  assign(order,kbo).
% 0.76/1.04  set(lex_order_vars).
% 0.76/1.04  clear(print_given).
% 0.76/1.04  
% 0.76/1.04  % formulas(sos).  % not echoed (163 formulas)
% 0.76/1.04  
% 0.76/1.04  ============================== end of input ==========================
% 0.76/1.04  
% 0.76/1.04  % From the command line: assign(max_seconds, 300).
% 0.76/1.04  
% 0.76/1.04  ============================== PROCESS NON-CLAUSAL FORMULAS ==========
% 0.76/1.04  
% 0.76/1.04  % Formulas that are not ordinary clauses:
% 0.76/1.04  
% 0.76/1.04  ============================== end of process non-clausal formulas ===
% 0.76/1.04  
% 0.76/1.04  ============================== PROCESS INITIAL CLAUSES ===============
% 0.76/1.04  
% 0.76/1.04  ============================== PREDICATE ELIMINATION =================
% 0.76/1.04  1 -member(null_class,A) | -subclass(image(successor_relation,A),A) | inductive(A) # label(inductive3) # label(axiom).  [assumption].
% 0.76/1.04  2 -inductive(A) | member(null_class,A) # label(inductive1) # label(axiom).  [assumption].
% 0.76/1.04  3 -inductive(A) | subclass(image(successor_relation,A),A) # label(inductive2) # label(axiom).  [assumption].
% 0.76/1.04  4 inductive(omega) # label(omega_is_inductive1) # label(axiom).  [assumption].
% 0.76/1.04  Derived: member(null_class,omega).  [resolve(4,a,2,a)].
% 0.76/1.04  Derived: subclass(image(successor_relation,omega),omega).  [resolve(4,a,3,a)].
% 0.76/1.04  5 -inductive(A) | subclass(omega,A) # label(omega_is_inductive2) # label(axiom).  [assumption].
% 0.76/1.04  Derived: subclass(omega,A) | -member(null_class,A) | -subclass(image(successor_relation,A),A).  [resolve(5,a,1,c)].
% 0.76/1.04  Derived: subclass(omega,omega).  [resolve(5,a,4,a)].
% 0.76/1.04  6 -subclass(compose(A,inverse(A)),identity_relation) | single_valued_class(A) # label(single_valued_class2) # label(axiom).  [assumption].
% 0.76/1.04  7 -single_valued_class(A) | subclass(compose(A,inverse(A)),identity_relation) # label(single_valued_class1) # label(axiom).  [assumption].
% 0.76/1.04  8 -function(inverse(A)) | -function(A) | one_to_one(A) # label(one_to_one3) # label(axiom).  [assumption].
% 0.76/1.04  9 -one_to_one(A) | function(A) # label(one_to_one1) # label(axiom).  [assumption].
% 0.76/1.04  10 -one_to_one(A) | function(inverse(A)) # label(one_to_one2) # label(axiom).  [assumption].
% 0.76/1.04  11 -function(A) | domain_of(domain_of(B)) != domain_of(A) | -subclass(range_of(A),domain_of(domain_of(C))) | compatible(A,B,C) # label(compatible4) # label(axiom).  [assumption].
% 0.76/1.04  12 -compatible(A,B,C) | function(A) # label(compatible1) # label(axiom).  [assumption].
% 0.76/1.04  13 -compatible(A,B,C) | domain_of(domain_of(B)) = domain_of(A) # label(compatible2) # label(axiom).  [assumption].
% 0.76/1.05  14 -compatible(A,B,C) | subclass(range_of(A),domain_of(domain_of(C))) # label(compatible3) # label(axiom).  [assumption].
% 0.76/1.05  15 -homomorphism(A,B,C) | compatible(A,B,C) # label(homomorphism3) # label(axiom).  [assumption].
% 0.76/1.05  Derived: -homomorphism(A,B,C) | function(A).  [resolve(15,b,12,a)].
% 0.76/1.05  Derived: -homomorphism(A,B,C) | domain_of(domain_of(B)) = domain_of(A).  [resolve(15,b,13,a)].
% 0.76/1.05  Derived: -homomorphism(A,B,C) | subclass(range_of(A),domain_of(domain_of(C))).  [resolve(15,b,14,a)].
% 0.76/1.05  16 -operation(A) | -operation(B) | -compatible(C,A,B) | member(ordered_pair(not_homomorphism1(C,A,B),not_homomorphism2(C,A,B)),domain_of(A)) | homomorphism(C,A,B) # label(homomorphism5) # label(axiom).  [assumption].
% 0.76/1.05  Derived: -operation(A) | -operation(B) | member(ordered_pair(not_homomorphism1(C,A,B),not_homomorphism2(C,A,B)),domain_of(A)) | homomorphism(C,A,B) | -function(C) | domain_of(domain_of(A)) != domain_of(C) | -subclass(range_of(C),domain_of(domain_of(B))).  [resolve(16,c,11,d)].
% 0.76/1.05  17 -operation(A) | -operation(B) | -compatible(C,A,B) | apply(B,ordered_pair(apply(C,not_homomorphism1(C,A,B)),apply(C,not_homomorphism2(C,A,B)))) != apply(C,apply(A,ordered_pair(not_homomorphism1(C,A,B),not_homomorphism2(C,A,B)))) | homomorphism(C,A,B) # label(homomorphism6) # label(axiom).  [assumption].
% 0.76/1.05  Derived: -operation(A) | -operation(B) | apply(B,ordered_pair(apply(C,not_homomorphism1(C,A,B)),apply(C,not_homomorphism2(C,A,B)))) != apply(C,apply(A,ordered_pair(not_homomorphism1(C,A,B),not_homomorphism2(C,A,B)))) | homomorphism(C,A,B) | -function(C) | domain_of(domain_of(A)) != domain_of(C) | -subclass(range_of(C),domain_of(domain_of(B))).  [resolve(17,c,11,d)].
% 0.76/1.05  18 -operation(A) | -operation(B) | member(ordered_pair(not_homomorphism1(C,A,B),not_homomorphism2(C,A,B)),domain_of(A)) | homomorphism(C,A,B) | -function(C) | domain_of(domain_of(A)) != domain_of(C) | -subclass(range_of(C),domain_of(domain_of(B))).  [resolve(16,c,11,d)].
% 0.76/1.05  19 -homomorphism(A,B,C) | operation(B) # label(homomorphism1) # label(axiom).  [assumption].
% 0.76/1.05  20 -homomorphism(A,B,C) | operation(C) # label(homomorphism2) # label(axiom).  [assumption].
% 0.76/1.05  21 -homomorphism(A,B,C) | -member(ordered_pair(D,E),domain_of(B)) | apply(C,ordered_pair(apply(A,D),apply(A,E))) = apply(A,apply(B,ordered_pair(D,E))) # label(homomorphism4) # label(axiom).  [assumption].
% 0.76/1.05  22 -homomorphism(A,B,C) | function(A).  [resolve(15,b,12,a)].
% 0.76/1.05  23 -homomorphism(A,B,C) | domain_of(domain_of(B)) = domain_of(A).  [resolve(15,b,13,a)].
% 0.76/1.05  24 -homomorphism(A,B,C) | subclass(range_of(A),domain_of(domain_of(C))).  [resolve(15,b,14,a)].
% 0.76/1.05  Derived: -operation(A) | -operation(B) | member(ordered_pair(not_homomorphism1(C,A,B),not_homomorphism2(C,A,B)),domain_of(A)) | -function(C) | domain_of(domain_of(A)) != domain_of(C) | -subclass(range_of(C),domain_of(domain_of(B))) | -member(ordered_pair(D,E),domain_of(A)) | apply(B,ordered_pair(apply(C,D),apply(C,E))) = apply(C,apply(A,ordered_pair(D,E))).  [resolve(18,d,21,a)].
% 0.76/1.05  25 -operation(A) | -operation(B) | apply(B,ordered_pair(apply(C,not_homomorphism1(C,A,B)),apply(C,not_homomorphism2(C,A,B)))) != apply(C,apply(A,ordered_pair(not_homomorphism1(C,A,B),not_homomorphism2(C,A,B)))) | homomorphism(C,A,B) | -function(C) | domain_of(domain_of(A)) != domain_of(C) | -subclass(range_of(C),domain_of(domain_of(B))).  [resolve(17,c,11,d)].
% 0.76/1.05  Derived: -operation(A) | -operation(B) | apply(B,ordered_pair(apply(C,not_homomorphism1(C,A,B)),apply(C,not_homomorphism2(C,A,B)))) != apply(C,apply(A,ordered_pair(not_homomorphism1(C,A,B),not_homomorphism2(C,A,B)))) | -function(C) | domain_of(domain_of(A)) != domain_of(C) | -subclass(range_of(C),domain_of(domain_of(B))) | -member(ordered_pair(D,E),domain_of(A)) | apply(B,ordered_pair(apply(C,D),apply(C,E))) = apply(C,apply(A,ordered_pair(D,E))).  [resolve(25,d,21,a)].
% 0.76/1.05  26 -function(A) | -subclass(range_of(A),B) | maps(A,domain_of(A),B) # label(maps4) # label(axiom).  [assumption].
% 0.76/1.05  27 -maps(A,B,C) | function(A) # label(maps1) # label(axiom).  [assumption].
% 0.76/1.05  28 -maps(A,B,C) | domain_of(A) = B # label(maps2) # label(axiom).  [assumption].
% 0.76/1.05  29 -maps(A,B,C) | subclass(range_of(A),C) # label(maps3) # label(axiom).  [assumption].
% 0.81/1.09  Derived: -function(A) | -subclass(range_of(A),B) | domain_of(A) = domain_of(A).  [resolve(26,c,28,a)].
% 0.81/1.09  30 -subclass(restrict(A,B,B),complement(identity_relation)) | irreflexive(A,B) # label(irreflexive2) # label(axiom).  [assumption].
% 0.81/1.09  31 -irreflexive(A,B) | subclass(restrict(A,B,B),complement(identity_relation)) # label(irreflexive1) # label(axiom).  [assumption].
% 0.81/1.09  32 -subclass(cross_product(A,A),union(identity_relation,symmetrization_of(B))) | connected(B,A) # label(connected2) # label(axiom).  [assumption].
% 0.81/1.09  33 -connected(A,B) | subclass(cross_product(B,B),union(identity_relation,symmetrization_of(A))) # label(connected1) # label(axiom).  [assumption].
% 0.81/1.09  34 -well_ordering(A,B) | connected(A,B) # label(well_ordering1) # label(axiom).  [assumption].
% 0.81/1.09  Derived: -well_ordering(A,B) | subclass(cross_product(B,B),union(identity_relation,symmetrization_of(A))).  [resolve(34,b,33,a)].
% 0.81/1.09  35 -connected(A,B) | not_well_ordering(A,B) != null_class | well_ordering(A,B) # label(well_ordering6) # label(axiom).  [assumption].
% 0.81/1.09  Derived: not_well_ordering(A,B) != null_class | well_ordering(A,B) | -subclass(cross_product(B,B),union(identity_relation,symmetrization_of(A))).  [resolve(35,a,32,b)].
% 0.81/1.09  36 -connected(A,B) | subclass(not_well_ordering(A,B),B) | well_ordering(A,B) # label(well_ordering7) # label(axiom).  [assumption].
% 0.81/1.09  Derived: subclass(not_well_ordering(A,B),B) | well_ordering(A,B) | -subclass(cross_product(B,B),union(identity_relation,symmetrization_of(A))).  [resolve(36,a,32,b)].
% 0.81/1.09  37 -member(A,not_well_ordering(B,C)) | segment(B,not_well_ordering(B,C),A) != null_class | -connected(B,C) | well_ordering(B,C) # label(well_ordering8) # label(axiom).  [assumption].
% 0.81/1.09  Derived: -member(A,not_well_ordering(B,C)) | segment(B,not_well_ordering(B,C),A) != null_class | well_ordering(B,C) | -subclass(cross_product(C,C),union(identity_relation,symmetrization_of(B))).  [resolve(37,c,32,b)].
% 0.81/1.09  38 connected(x,y) # label(prove_connect_class_property1_1) # label(negated_conjecture).  [assumption].
% 0.81/1.09  Derived: subclass(cross_product(y,y),union(identity_relation,symmetrization_of(x))).  [resolve(38,a,33,a)].
% 0.81/1.09  Derived: not_well_ordering(x,y) != null_class | well_ordering(x,y).  [resolve(38,a,35,a)].
% 0.81/1.09  Derived: subclass(not_well_ordering(x,y),y) | well_ordering(x,y).  [resolve(38,a,36,a)].
% 0.81/1.09  Derived: -member(A,not_well_ordering(x,y)) | segment(x,not_well_ordering(x,y),A) != null_class | well_ordering(x,y).  [resolve(38,a,37,c)].
% 0.81/1.09  39 -subclass(compose(restrict(A,B,B),restrict(A,B,B)),restrict(A,B,B)) | transitive(A,B) # label(transitive2) # label(axiom).  [assumption].
% 0.81/1.09  40 -transitive(A,B) | subclass(compose(restrict(A,B,B),restrict(A,B,B)),restrict(A,B,B)) # label(transitive1) # label(axiom).  [assumption].
% 0.81/1.09  41 restrict(intersection(A,inverse(A)),B,B) != null_class | asymmetric(A,B) # label(asymmetric2) # label(axiom).  [assumption].
% 0.81/1.09  42 -asymmetric(A,B) | restrict(intersection(A,inverse(A)),B,B) = null_class # label(asymmetric1) # label(axiom).  [assumption].
% 0.81/1.09  43 -subclass(A,B) | -subclass(domain_of(restrict(C,B,A)),A) | section(C,A,B) # label(section3) # label(axiom).  [assumption].
% 0.81/1.09  44 -section(A,B,C) | subclass(B,C) # label(section1) # label(axiom).  [assumption].
% 0.81/1.09  45 -section(A,B,C) | subclass(domain_of(restrict(A,C,B)),B) # label(section2) # label(axiom).  [assumption].
% 0.81/1.09  
% 0.81/1.09  ============================== end predicate elimination =============
% 0.81/1.09  
% 0.81/1.09  Auto_denials:  (non-Horn, no changes).
% 0.81/1.09  
% 0.81/1.09  Term ordering decisions:
% 0.81/1.09  Function symbol KB weights:  universal_class=1. null_class=1. element_relation=1. identity_relation=1. y=1. omega=1. ordinal_numbers=1. x=1. successor_relation=1. union_of_range_map=1. application_function=1. composition_function=1. domain_relation=1. rest_relation=1. subset_relation=1. choice=1. kind_1_ordinals=1. add_relation=1. limit_ordinals=1. singleton_relation=1. u=1. v=1. ordered_pair=1. cross_product=1. apply=1. intersection=1. compose=1. image=1. union=1. not_well_ordering=1. unordered_pair=1. not_subclass_element=1. least=1. ordinal_add=1. ordinal_multiply=1. symmetric_difference=1. domain_of=1. complemeCputime limit exceeded (core dumped)
%------------------------------------------------------------------------------