TSTP Solution File: KRS052+1 by Mace4---1109a
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- Process Solution
%------------------------------------------------------------------------------
% File : Mace4---1109a
% Problem : KRS052+1 : TPTP v6.4.0. Released v3.1.0.
% Transfm : none
% Format : tptp:raw
% Command : mace4 -t %d -f %s
% Computer : n126.star.cs.uiowa.edu
% Model : x86_64 x86_64
% CPU : Intel(R) Xeon(R) CPU E5-2609 0 2.40GHz
% Memory : 32218.75MB
% OS : Linux 3.10.0-327.36.3.el7.x86_64
% CPULimit : 300s
% DateTime : Wed Feb 8 09:56:19 EST 2017
% Result : Satisfiable 0.06s
% Output : FiniteModel 0.06s
% Verified :
% SZS Type : None (Parsing solution fails)
% Syntax : Number of formulae : 0
% Comments :
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.00/0.03 % Problem : KRS052+1 : TPTP v6.4.0. Released v3.1.0.
% 0.00/0.04 % Command : mace4 -t %d -f %s
% 0.03/0.22 % Computer : n126.star.cs.uiowa.edu
% 0.03/0.22 % Model : x86_64 x86_64
% 0.03/0.22 % CPU : Intel(R) Xeon(R) CPU E5-2609 0 @ 2.40GHz
% 0.03/0.22 % Memory : 32218.75MB
% 0.03/0.22 % OS : Linux 3.10.0-327.36.3.el7.x86_64
% 0.03/0.22 % CPULimit : 300
% 0.03/0.22 % DateTime : Tue Feb 7 19:40:00 CST 2017
% 0.03/0.23 % CPUTime :
% 0.06/0.47 % SZS status Satisfiable
% 0.06/0.47 ============================== Mace4 =================================
% 0.06/0.47 Mace4 (32) version 2009-11A, November 2009.
% 0.06/0.47 Process 40111 was started by sandbox2 on n126.star.cs.uiowa.edu,
% 0.06/0.47 Tue Feb 7 19:40:01 2017
% 0.06/0.47 The command was "/export/starexec/sandbox2/solver/bin/mace4 -t 300 -f /tmp/Mace4_input_40078_n126.star.cs.uiowa.edu".
% 0.06/0.47 ============================== end of head ===========================
% 0.06/0.47
% 0.06/0.47 ============================== INPUT =================================
% 0.06/0.47
% 0.06/0.47 % Reading from file /tmp/Mace4_input_40078_n126.star.cs.uiowa.edu
% 0.06/0.47
% 0.06/0.47 set(prolog_style_variables).
% 0.06/0.47 set(print_models_tabular).
% 0.06/0.47 % set(print_models_tabular) -> clear(print_models).
% 0.06/0.47
% 0.06/0.47 formulas(sos).
% 0.06/0.47 (all A all B (A = B & ccardinality_N(A) -> ccardinality_N(B))) # label(ccardinality_N_substitution_1) # label(axiom).
% 0.06/0.47 (all A all B (A = B & ccardinality_N_times_M(A) -> ccardinality_N_times_M(B))) # label(ccardinality_N_times_M_substitution_1) # label(axiom).
% 0.06/0.47 (all A all B (A = B & cinfinite(A) -> cinfinite(B))) # label(cinfinite_substitution_1) # label(axiom).
% 0.06/0.47 (all A all B (A = B & cowlNothing(A) -> cowlNothing(B))) # label(cowlNothing_substitution_1) # label(axiom).
% 0.06/0.47 (all A all B (A = B & cowlThing(A) -> cowlThing(B))) # label(cowlThing_substitution_1) # label(axiom).
% 0.06/0.47 (all A all B all C (A = B & rinvP_1_to_N(A,C) -> rinvP_1_to_N(B,C))) # label(rinvP_1_to_N_substitution_1) # label(axiom).
% 0.06/0.47 (all A all B all C (A = B & rinvP_1_to_N(C,A) -> rinvP_1_to_N(C,B))) # label(rinvP_1_to_N_substitution_2) # label(axiom).
% 0.06/0.47 (all A all B all C (A = B & rinvQ_1_to_M(A,C) -> rinvQ_1_to_M(B,C))) # label(rinvQ_1_to_M_substitution_1) # label(axiom).
% 0.06/0.47 (all A all B all C (A = B & rinvQ_1_to_M(C,A) -> rinvQ_1_to_M(C,B))) # label(rinvQ_1_to_M_substitution_2) # label(axiom).
% 0.06/0.47 (all A all B all C (A = B & rinvR_N_times_M_to_1(A,C) -> rinvR_N_times_M_to_1(B,C))) # label(rinvR_N_times_M_to_1_substitution_1) # label(axiom).
% 0.06/0.47 (all A all B all C (A = B & rinvR_N_times_M_to_1(C,A) -> rinvR_N_times_M_to_1(C,B))) # label(rinvR_N_times_M_to_1_substitution_2) # label(axiom).
% 0.06/0.47 (all A all B all C (A = B & rp_N_to_1(A,C) -> rp_N_to_1(B,C))) # label(rp_N_to_1_substitution_1) # label(axiom).
% 0.06/0.47 (all A all B all C (A = B & rp_N_to_1(C,A) -> rp_N_to_1(C,B))) # label(rp_N_to_1_substitution_2) # label(axiom).
% 0.06/0.47 (all A all B all C (A = B & rq_M_to_1(A,C) -> rq_M_to_1(B,C))) # label(rq_M_to_1_substitution_1) # label(axiom).
% 0.06/0.47 (all A all B all C (A = B & rq_M_to_1(C,A) -> rq_M_to_1(C,B))) # label(rq_M_to_1_substitution_2) # label(axiom).
% 0.06/0.47 (all A all B all C (A = B & rr_N_times_M_to_1(A,C) -> rr_N_times_M_to_1(B,C))) # label(rr_N_times_M_to_1_substitution_1) # label(axiom).
% 0.06/0.47 (all A all B all C (A = B & rr_N_times_M_to_1(C,A) -> rr_N_times_M_to_1(C,B))) # label(rr_N_times_M_to_1_substitution_2) # label(axiom).
% 0.06/0.47 (all A all B (A = B & xsd_integer(A) -> xsd_integer(B))) # label(xsd_integer_substitution_1) # label(axiom).
% 0.06/0.47 (all A all B (A = B & xsd_string(A) -> xsd_string(B))) # label(xsd_string_substitution_1) # label(axiom).
% 0.06/0.47 (all X (cowlThing(X) & -cowlNothing(X))) # label(axiom_0) # label(axiom).
% 0.06/0.47 (all X (xsd_string(X) <-> -xsd_integer(X))) # label(axiom_1) # label(axiom).
% 0.06/0.47 (all X (ccardinality_N(X) <-> (exists Y0 exists Y1 exists Y2 (rinvQ_1_to_M(X,Y0) & rinvQ_1_to_M(X,Y1) & rinvQ_1_to_M(X,Y2) & Y0 != Y1 & Y0 != Y2 & Y1 != Y2)) & (all Y0 all Y1 all Y2 all Y3 (rinvQ_1_to_M(X,Y0) & rinvQ_1_to_M(X,Y1) & rinvQ_1_to_M(X,Y2) & rinvQ_1_to_M(X,Y3) -> Y0 = Y1 | Y0 = Y2 | Y0 = Y3 | Y1 = Y2 | Y1 = Y3 | Y2 = Y3)))) # label(axiom_2) # label(axiom).
% 0.06/0.47 (all X (ccardinality_N(X) <-> (exists Y (rp_N_to_1(X,Y) & cinfinite(Y))))) # label(axiom_3) # label(axiom).
% 0.06/0.47 (all X (ccardinality_N_times_M(X) <-> (exists Y (rq_M_to_1(X,Y) & ccardinality_N(Y))))) # label(axiom_4) # label(axiom).
% 0.06/0.47 (all X (ccardinality_N_times_M(X) <-> (exists Y (rr_N_times_M_to_1(X,Y) & cinfinite(Y))))) # label(axiom_5) # label(axiom).
% 0.06/0.47 (all X (cinfinite(X) <-> (exists Y0 exists Y1 exists Y2 exists Y3 exists Y4 (rinvR_N_times_M_to_1(X,Y0) & rinvR_N_times_M_to_1(X,Y1) & rinvR_N_times_M_to_1(X,Y2) & rinvR_N_times_M_to_1(X,Y3) & rinvR_N_times_M_to_1(X,Y4) & Y0 != Y1 & Y0 != Y2 & Y0 != Y3 & Y0 != Y4 & Y1 != Y2 & Y1 != Y3 & Y1 != Y4 & Y2 != Y3 & Y2 != Y4 & Y3 != Y4)) & (all Y0 all Y1 all Y2 all Y3 all Y4 all Y5 (rinvR_N_times_M_to_1(X,Y0) & rinvR_N_times_M_to_1(X,Y1) & rinvR_N_times_M_to_1(X,Y2) & rinvR_N_times_M_to_1(X,Y3) & rinvR_N_times_M_to_1(X,Y4) & rinvR_N_times_M_to_1(X,Y5) -> Y0 = Y1 | Y0 = Y2 | Y0 = Y3 | Y0 = Y4 | Y0 = Y5 | Y1 = Y2 | Y1 = Y3 | Y1 = Y4 | Y1 = Y5 | Y2 = Y3 | Y2 = Y4 | Y2 = Y5 | Y3 = Y4 | Y3 = Y5 | Y4 = Y5)))) # label(axiom_6) # label(axiom).
% 0.06/0.47 (all X (cinfinite(X) <-> (exists Y0 exists Y1 (rinvP_1_to_N(X,Y0) & rinvP_1_to_N(X,Y1) & Y0 != Y1)) & (all Y0 all Y1 all Y2 (rinvP_1_to_N(X,Y0) & rinvP_1_to_N(X,Y1) & rinvP_1_to_N(X,Y2) -> Y0 = Y1 | Y0 = Y2 | Y1 = Y2)))) # label(axiom_7) # label(axiom).
% 0.06/0.47 (all X all Y all Z (rp_N_to_1(X,Y) & rp_N_to_1(X,Z) -> Y = Z)) # label(axiom_8) # label(axiom).
% 0.06/0.47 (all X all Y (rp_N_to_1(X,Y) -> ccardinality_N(X))) # label(axiom_9) # label(axiom).
% 0.06/0.47 (all X all Y (rp_N_to_1(X,Y) -> cinfinite(Y))) # label(axiom_10) # label(axiom).
% 0.06/0.47 (all X all Y (rp_N_to_1(X,Y) <-> rinvP_1_to_N(Y,X))) # label(axiom_11) # label(axiom).
% 0.06/0.47 (all X all Y all Z (rq_M_to_1(X,Y) & rq_M_to_1(X,Z) -> Y = Z)) # label(axiom_12) # label(axiom).
% 0.06/0.47 (all X all Y (rq_M_to_1(X,Y) -> ccardinality_N_times_M(X))) # label(axiom_13) # label(axiom).
% 0.06/0.47 (all X all Y (rq_M_to_1(X,Y) -> ccardinality_N(Y))) # label(axiom_14) # label(axiom).
% 0.06/0.47 (all X all Y (rq_M_to_1(X,Y) <-> rinvQ_1_to_M(Y,X))) # label(axiom_15) # label(axiom).
% 0.06/0.47 (all X all Y all Z (rr_N_times_M_to_1(X,Y) & rr_N_times_M_to_1(X,Z) -> Y = Z)) # label(axiom_16) # label(axiom).
% 0.06/0.47 (all X all Y (rr_N_times_M_to_1(X,Y) -> ccardinality_N_times_M(X))) # label(axiom_17) # label(axiom).
% 0.06/0.47 (all X all Y (rr_N_times_M_to_1(X,Y) -> cinfinite(Y))) # label(axiom_18) # label(axiom).
% 0.06/0.47 (all X all Y (rr_N_times_M_to_1(X,Y) <-> rinvR_N_times_M_to_1(Y,X))) # label(axiom_19) # label(axiom).
% 0.06/0.47 end_of_list.
% 0.06/0.47
% 0.06/0.47 % From the command line: assign(max_seconds, 300).
% 0.06/0.47
% 0.06/0.47 ============================== end of input ==========================
% 0.06/0.47
% 0.06/0.47 ============================== PROCESS NON-CLAUSAL FORMULAS ==========
% 0.06/0.47
% 0.06/0.47 % Formulas that are not ordinary clauses:
% 0.06/0.47 1 (all A all B (A = B & ccardinality_N(A) -> ccardinality_N(B))) # label(ccardinality_N_substitution_1) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 2 (all A all B (A = B & ccardinality_N_times_M(A) -> ccardinality_N_times_M(B))) # label(ccardinality_N_times_M_substitution_1) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 3 (all A all B (A = B & cinfinite(A) -> cinfinite(B))) # label(cinfinite_substitution_1) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 4 (all A all B (A = B & cowlNothing(A) -> cowlNothing(B))) # label(cowlNothing_substitution_1) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 5 (all A all B (A = B & cowlThing(A) -> cowlThing(B))) # label(cowlThing_substitution_1) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 6 (all A all B all C (A = B & rinvP_1_to_N(A,C) -> rinvP_1_to_N(B,C))) # label(rinvP_1_to_N_substitution_1) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 7 (all A all B all C (A = B & rinvP_1_to_N(C,A) -> rinvP_1_to_N(C,B))) # label(rinvP_1_to_N_substitution_2) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 8 (all A all B all C (A = B & rinvQ_1_to_M(A,C) -> rinvQ_1_to_M(B,C))) # label(rinvQ_1_to_M_substitution_1) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 9 (all A all B all C (A = B & rinvQ_1_to_M(C,A) -> rinvQ_1_to_M(C,B))) # label(rinvQ_1_to_M_substitution_2) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 10 (all A all B all C (A = B & rinvR_N_times_M_to_1(A,C) -> rinvR_N_times_M_to_1(B,C))) # label(rinvR_N_times_M_to_1_substitution_1) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 11 (all A all B all C (A = B & rinvR_N_times_M_to_1(C,A) -> rinvR_N_times_M_to_1(C,B))) # label(rinvR_N_times_M_to_1_substitution_2) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 12 (all A all B all C (A = B & rp_N_to_1(A,C) -> rp_N_to_1(B,C))) # label(rp_N_to_1_substitution_1) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 13 (all A all B all C (A = B & rp_N_to_1(C,A) -> rp_N_to_1(C,B))) # label(rp_N_to_1_substitution_2) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 14 (all A all B all C (A = B & rq_M_to_1(A,C) -> rq_M_to_1(B,C))) # label(rq_M_to_1_substitution_1) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 15 (all A all B all C (A = B & rq_M_to_1(C,A) -> rq_M_to_1(C,B))) # label(rq_M_to_1_substitution_2) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 16 (all A all B all C (A = B & rr_N_times_M_to_1(A,C) -> rr_N_times_M_to_1(B,C))) # label(rr_N_times_M_to_1_substitution_1) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 17 (all A all B all C (A = B & rr_N_times_M_to_1(C,A) -> rr_N_times_M_to_1(C,B))) # label(rr_N_times_M_to_1_substitution_2) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 18 (all A all B (A = B & xsd_integer(A) -> xsd_integer(B))) # label(xsd_integer_substitution_1) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 19 (all A all B (A = B & xsd_string(A) -> xsd_string(B))) # label(xsd_string_substitution_1) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 20 (all X (cowlThing(X) & -cowlNothing(X))) # label(axiom_0) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 21 (all X (xsd_string(X) <-> -xsd_integer(X))) # label(axiom_1) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 22 (all X (ccardinality_N(X) <-> (exists Y0 exists Y1 exists Y2 (rinvQ_1_to_M(X,Y0) & rinvQ_1_to_M(X,Y1) & rinvQ_1_to_M(X,Y2) & Y0 != Y1 & Y0 != Y2 & Y1 != Y2)) & (all Y0 all Y1 all Y2 all Y3 (rinvQ_1_to_M(X,Y0) & rinvQ_1_to_M(X,Y1) & rinvQ_1_to_M(X,Y2) & rinvQ_1_to_M(X,Y3) -> Y0 = Y1 | Y0 = Y2 | Y0 = Y3 | Y1 = Y2 | Y1 = Y3 | Y2 = Y3)))) # label(axiom_2) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 23 (all X (ccardinality_N(X) <-> (exists Y (rp_N_to_1(X,Y) & cinfinite(Y))))) # label(axiom_3) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 24 (all X (ccardinality_N_times_M(X) <-> (exists Y (rq_M_to_1(X,Y) & ccardinality_N(Y))))) # label(axiom_4) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 25 (all X (ccardinality_N_times_M(X) <-> (exists Y (rr_N_times_M_to_1(X,Y) & cinfinite(Y))))) # label(axiom_5) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 26 (all X (cinfinite(X) <-> (exists Y0 exists Y1 exists Y2 exists Y3 exists Y4 (rinvR_N_times_M_to_1(X,Y0) & rinvR_N_times_M_to_1(X,Y1) & rinvR_N_times_M_to_1(X,Y2) & rinvR_N_times_M_to_1(X,Y3) & rinvR_N_times_M_to_1(X,Y4) & Y0 != Y1 & Y0 != Y2 & Y0 != Y3 & Y0 != Y4 & Y1 != Y2 & Y1 != Y3 & Y1 != Y4 & Y2 != Y3 & Y2 != Y4 & Y3 != Y4)) & (all Y0 all Y1 all Y2 all Y3 all Y4 all Y5 (rinvR_N_times_M_to_1(X,Y0) & rinvR_N_times_M_to_1(X,Y1) & rinvR_N_times_M_to_1(X,Y2) & rinvR_N_times_M_to_1(X,Y3) & rinvR_N_times_M_to_1(X,Y4) & rinvR_N_times_M_to_1(X,Y5) -> Y0 = Y1 | Y0 = Y2 | Y0 = Y3 | Y0 = Y4 | Y0 = Y5 | Y1 = Y2 | Y1 = Y3 | Y1 = Y4 | Y1 = Y5 | Y2 = Y3 | Y2 = Y4 | Y2 = Y5 | Y3 = Y4 | Y3 = Y5 | Y4 = Y5)))) # label(axiom_6) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 27 (all X (cinfinite(X) <-> (exists Y0 exists Y1 (rinvP_1_to_N(X,Y0) & rinvP_1_to_N(X,Y1) & Y0 != Y1)) & (all Y0 all Y1 all Y2 (rinvP_1_to_N(X,Y0) & rinvP_1_to_N(X,Y1) & rinvP_1_to_N(X,Y2) -> Y0 = Y1 | Y0 = Y2 | Y1 = Y2)))) # label(axiom_7) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 28 (all X all Y all Z (rp_N_to_1(X,Y) & rp_N_to_1(X,Z) -> Y = Z)) # label(axiom_8) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 29 (all X all Y (rp_N_to_1(X,Y) -> ccardinality_N(X))) # label(axiom_9) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 30 (all X all Y (rp_N_to_1(X,Y) -> cinfinite(Y))) # label(axiom_10) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 31 (all X all Y (rp_N_to_1(X,Y) <-> rinvP_1_to_N(Y,X))) # label(axiom_11) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 32 (all X all Y all Z (rq_M_to_1(X,Y) & rq_M_to_1(X,Z) -> Y = Z)) # label(axiom_12) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 33 (all X all Y (rq_M_to_1(X,Y) -> ccardinality_N_times_M(X))) # label(axiom_13) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 34 (all X all Y (rq_M_to_1(X,Y) -> ccardinality_N(Y))) # label(axiom_14) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 35 (all X all Y (rq_M_to_1(X,Y) <-> rinvQ_1_to_M(Y,X))) # label(axiom_15) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 36 (all X all Y all Z (rr_N_times_M_to_1(X,Y) & rr_N_times_M_to_1(X,Z) -> Y = Z)) # label(axiom_16) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 37 (all X all Y (rr_N_times_M_to_1(X,Y) -> ccardinality_N_times_M(X))) # label(axiom_17) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 38 (all X all Y (rr_N_times_M_to_1(X,Y) -> cinfinite(Y))) # label(axiom_18) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47 39 (all X all Y (rr_N_times_M_to_1(X,Y) <-> rinvR_N_times_M_to_1(Y,X))) # label(axiom_19) # label(axiom) # label(non_clause). [assumption].
% 0.06/0.47
% 0.06/0.47 ============================== end of process non-clausal formulas ===
% 0.06/0.47
% 0.06/0.47 ============================== CLAUSES FOR SEARCH ====================
% 0.06/0.47
% 0.06/0.47 formulas(mace4_clauses).
% 0.06/0.47 A != B | -ccardinality_N(B) | ccardinality_N(A) # label(ccardinality_N_substitution_1) # label(axiom).
% 0.06/0.47 A != B | -ccardinality_N_times_M(B) | ccardinality_N_times_M(A) # label(ccardinality_N_times_M_substitution_1) # label(axiom).
% 0.06/0.47 A != B | -cinfinite(B) | cinfinite(A) # label(cinfinite_substitution_1) # label(axiom).
% 0.06/0.47 A != B | -cowlNothing(B) | cowlNothing(A) # label(cowlNothing_substitution_1) # label(axiom).
% 0.06/0.47 A != B | -cowlThing(B) | cowlThing(A) # label(cowlThing_substitution_1) # label(axiom).
% 0.06/0.47 A != B | -rinvP_1_to_N(B,C) | rinvP_1_to_N(A,C) # label(rinvP_1_to_N_substitution_1) # label(axiom).
% 0.06/0.47 A != B | -rinvP_1_to_N(C,B) | rinvP_1_to_N(C,A) # label(rinvP_1_to_N_substitution_2) # label(axiom).
% 0.06/0.47 A != B | -rinvQ_1_to_M(B,C) | rinvQ_1_to_M(A,C) # label(rinvQ_1_to_M_substitution_1) # label(axiom).
% 0.06/0.47 A != B | -rinvQ_1_to_M(C,B) | rinvQ_1_to_M(C,A) # label(rinvQ_1_to_M_substitution_2) # label(axiom).
% 0.06/0.47 A != B | -rinvR_N_times_M_to_1(B,C) | rinvR_N_times_M_to_1(A,C) # label(rinvR_N_times_M_to_1_substitution_1) # label(axiom).
% 0.06/0.47 A != B | -rinvR_N_times_M_to_1(C,B) | rinvR_N_times_M_to_1(C,A) # label(rinvR_N_times_M_to_1_substitution_2) # label(axiom).
% 0.06/0.47 A != B | -rp_N_to_1(B,C) | rp_N_to_1(A,C) # label(rp_N_to_1_substitution_1) # label(axiom).
% 0.06/0.47 A != B | -rp_N_to_1(C,B) | rp_N_to_1(C,A) # label(rp_N_to_1_substitution_2) # label(axiom).
% 0.06/0.47 A != B | -rq_M_to_1(B,C) | rq_M_to_1(A,C) # label(rq_M_to_1_substitution_1) # label(axiom).
% 0.06/0.47 A != B | -rq_M_to_1(C,B) | rq_M_to_1(C,A) # label(rq_M_to_1_substitution_2) # label(axiom).
% 0.06/0.47 A != B | -rr_N_times_M_to_1(B,C) | rr_N_times_M_to_1(A,C) # label(rr_N_times_M_to_1_substitution_1) # label(axiom).
% 0.06/0.47 A != B | -rr_N_times_M_to_1(C,B) | rr_N_times_M_to_1(C,A) # label(rr_N_times_M_to_1_substitution_2) # label(axiom).
% 0.06/0.47 A != B | -xsd_integer(B) | xsd_integer(A) # label(xsd_integer_substitution_1) # label(axiom).
% 0.06/0.47 A != B | -xsd_string(B) | xsd_string(A) # label(xsd_string_substitution_1) # label(axiom).
% 0.06/0.47 cowlThing(A) # label(axiom_0) # label(axiom).
% 0.06/0.47 -cowlNothing(A) # label(axiom_0) # label(axiom).
% 0.06/0.47 -xsd_string(A) | -xsd_integer(A) # label(axiom_1) # label(axiom).
% 0.06/0.47 xsd_string(A) | xsd_integer(A) # label(axiom_1) # label(axiom).
% 0.06/0.47 -ccardinality_N(A) | rinvQ_1_to_M(A,f1(A)) # label(axiom_2) # label(axiom).
% 0.06/0.47 -ccardinality_N(A) | rinvQ_1_to_M(A,f2(A)) # label(axiom_2) # label(axiom).
% 0.06/0.47 -ccardinality_N(A) | rinvQ_1_to_M(A,f3(A)) # label(axiom_2) # label(axiom).
% 0.06/0.47 -ccardinality_N(A) | f2(A) != f1(A) # label(axiom_2) # label(axiom).
% 0.06/0.47 -ccardinality_N(A) | f3(A) != f1(A) # label(axiom_2) # label(axiom).
% 0.06/0.47 -ccardinality_N(A) | f3(A) != f2(A) # label(axiom_2) # label(axiom).
% 0.06/0.47 -ccardinality_N(A) | -rinvQ_1_to_M(A,B) | -rinvQ_1_to_M(A,C) | -rinvQ_1_to_M(A,D) | -rinvQ_1_to_M(A,E) | C = B | D = B | E = B | D = C | E = C | E = D # label(axiom_2) # label(axiom).
% 0.06/0.47 ccardinality_N(A) | -rinvQ_1_to_M(A,B) | -rinvQ_1_to_M(A,C) | -rinvQ_1_to_M(A,D) | C = B | D = B | D = C | rinvQ_1_to_M(A,f4(A)) # label(axiom_2) # label(axiom).
% 0.06/0.47 ccardinality_N(A) | -rinvQ_1_to_M(A,B) | -rinvQ_1_to_M(A,C) | -rinvQ_1_to_M(A,D) | C = B | D = B | D = C | rinvQ_1_to_M(A,f5(A)) # label(axiom_2) # label(axiom).
% 0.06/0.47 ccardinality_N(A) | -rinvQ_1_to_M(A,B) | -rinvQ_1_to_M(A,C) | -rinvQ_1_to_M(A,D) | C = B | D = B | D = C | rinvQ_1_to_M(A,f6(A)) # label(axiom_2) # label(axiom).
% 0.06/0.48 ccardinality_N(A) | -rinvQ_1_to_M(A,B) | -rinvQ_1_to_M(A,C) | -rinvQ_1_to_M(A,D) | C = B | D = B | D = C | rinvQ_1_to_M(A,f7(A)) # label(axiom_2) # label(axiom).
% 0.06/0.48 ccardinality_N(A) | -rinvQ_1_to_M(A,B) | -rinvQ_1_to_M(A,C) | -rinvQ_1_to_M(A,D) | C = B | D = B | D = C | f5(A) != f4(A) # label(axiom_2) # label(axiom).
% 0.06/0.48 ccardinality_N(A) | -rinvQ_1_to_M(A,B) | -rinvQ_1_to_M(A,C) | -rinvQ_1_to_M(A,D) | C = B | D = B | D = C | f6(A) != f4(A) # label(axiom_2) # label(axiom).
% 0.06/0.48 ccardinality_N(A) | -rinvQ_1_to_M(A,B) | -rinvQ_1_to_M(A,C) | -rinvQ_1_to_M(A,D) | C = B | D = B | D = C | f7(A) != f4(A) # label(axiom_2) # label(axiom).
% 0.06/0.48 ccardinality_N(A) | -rinvQ_1_to_M(A,B) | -rinvQ_1_to_M(A,C) | -rinvQ_1_to_M(A,D) | C = B | D = B | D = C | f6(A) != f5(A) # label(axiom_2) # label(axiom).
% 0.06/0.48 ccardinality_N(A) | -rinvQ_1_to_M(A,B) | -rinvQ_1_to_M(A,C) | -rinvQ_1_to_M(A,D) | C = B | D = B | D = C | f7(A) != f5(A) # label(axiom_2) # label(axiom).
% 0.06/0.48 ccardinality_N(A) | -rinvQ_1_to_M(A,B) | -rinvQ_1_to_M(A,C) | -rinvQ_1_to_M(A,D) | C = B | D = B | D = C | f7(A) != f6(A) # label(axiom_2) # label(axiom).
% 0.06/0.48 -ccardinality_N(A) | rp_N_to_1(A,f8(A)) # label(axiom_3) # label(axiom).
% 0.06/0.48 -ccardinality_N(A) | cinfinite(f8(A)) # label(axiom_3) # label(axiom).
% 0.06/0.48 ccardinality_N(A) | -rp_N_to_1(A,B) | -cinfinite(B) # label(axiom_3) # label(axiom).
% 0.06/0.48 -ccardinality_N_times_M(A) | rq_M_to_1(A,f9(A)) # label(axiom_4) # label(axiom).
% 0.06/0.48 -ccardinality_N_times_M(A) | ccardinality_N(f9(A)) # label(axiom_4) # label(axiom).
% 0.06/0.48 ccardinality_N_times_M(A) | -rq_M_to_1(A,B) | -ccardinality_N(B) # label(axiom_4) # label(axiom).
% 0.06/0.48 -ccardinality_N_times_M(A) | rr_N_times_M_to_1(A,f10(A)) # label(axiom_5) # label(axiom).
% 0.06/0.48 -ccardinality_N_times_M(A) | cinfinite(f10(A)) # label(axiom_5) # label(axiom).
% 0.06/0.48 ccardinality_N_times_M(A) | -rr_N_times_M_to_1(A,B) | -cinfinite(B) # label(axiom_5) # label(axiom).
% 0.06/0.48 -cinfinite(A) | rinvR_N_times_M_to_1(A,f11(A)) # label(axiom_6) # label(axiom).
% 0.06/0.48 -cinfinite(A) | rinvR_N_times_M_to_1(A,f12(A)) # label(axiom_6) # label(axiom).
% 0.06/0.48 -cinfinite(A) | rinvR_N_times_M_to_1(A,f13(A)) # label(axiom_6) # label(axiom).
% 0.06/0.48 -cinfinite(A) | rinvR_N_times_M_to_1(A,f14(A)) # label(axiom_6) # label(axiom).
% 0.06/0.48 -cinfinite(A) | rinvR_N_times_M_to_1(A,f15(A)) # label(axiom_6) # label(axiom).
% 0.06/0.48 -cinfinite(A) | f12(A) != f11(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 -cinfinite(A) | f13(A) != f11(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 -cinfinite(A) | f14(A) != f11(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 -cinfinite(A) | f15(A) != f11(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 -cinfinite(A) | f13(A) != f12(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 -cinfinite(A) | f14(A) != f12(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 -cinfinite(A) | f15(A) != f12(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 -cinfinite(A) | f14(A) != f13(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 -cinfinite(A) | f15(A) != f13(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 -cinfinite(A) | f15(A) != f14(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 -cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | -rinvR_N_times_M_to_1(A,V6) | C = B | D = B | E = B | F = B | V6 = B | D = C | E = C | F = C | V6 = C | E = D | F = D | V6 = D | F = E | V6 = E | V6 = F # label(axiom_6) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | C = B | D = B | E = B | F = B | D = C | E = C | F = C | E = D | F = D | F = E | rinvR_N_times_M_to_1(A,f16(A)) # label(axiom_6) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | C = B | D = B | E = B | F = B | D = C | E = C | F = C | E = D | F = D | F = E | rinvR_N_times_M_to_1(A,f17(A)) # label(axiom_6) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | C = B | D = B | E = B | F = B | D = C | E = C | F = C | E = D | F = D | F = E | rinvR_N_times_M_to_1(A,f18(A)) # label(axiom_6) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | C = B | D = B | E = B | F = B | D = C | E = C | F = C | E = D | F = D | F = E | rinvR_N_times_M_to_1(A,f19(A)) # label(axiom_6) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | C = B | D = B | E = B | F = B | D = C | E = C | F = C | E = D | F = D | F = E | rinvR_N_times_M_to_1(A,f20(A)) # label(axiom_6) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | C = B | D = B | E = B | F = B | D = C | E = C | F = C | E = D | F = D | F = E | rinvR_N_times_M_to_1(A,f21(A)) # label(axiom_6) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | C = B | D = B | E = B | F = B | D = C | E = C | F = C | E = D | F = D | F = E | f17(A) != f16(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | C = B | D = B | E = B | F = B | D = C | E = C | F = C | E = D | F = D | F = E | f18(A) != f16(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | C = B | D = B | E = B | F = B | D = C | E = C | F = C | E = D | F = D | F = E | f19(A) != f16(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | C = B | D = B | E = B | F = B | D = C | E = C | F = C | E = D | F = D | F = E | f20(A) != f16(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | C = B | D = B | E = B | F = B | D = C | E = C | F = C | E = D | F = D | F = E | f21(A) != f16(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | C = B | D = B | E = B | F = B | D = C | E = C | F = C | E = D | F = D | F = E | f18(A) != f17(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | C = B | D = B | E = B | F = B | D = C | E = C | F = C | E = D | F = D | F = E | f19(A) != f17(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | C = B | D = B | E = B | F = B | D = C | E = C | F = C | E = D | F = D | F = E | f20(A) != f17(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | C = B | D = B | E = B | F = B | D = C | E = C | F = C | E = D | F = D | F = E | f21(A) != f17(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | C = B | D = B | E = B | F = B | D = C | E = C | F = C | E = D | F = D | F = E | f19(A) != f18(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | C = B | D = B | E = B | F = B | D = C | E = C | F = C | E = D | F = D | F = E | f20(A) != f18(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | C = B | D = B | E = B | F = B | D = C | E = C | F = C | E = D | F = D | F = E | f21(A) != f18(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | C = B | D = B | E = B | F = B | D = C | E = C | F = C | E = D | F = D | F = E | f20(A) != f19(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | C = B | D = B | E = B | F = B | D = C | E = C | F = C | E = D | F = D | F = E | f21(A) != f19(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvR_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(A,C) | -rinvR_N_times_M_to_1(A,D) | -rinvR_N_times_M_to_1(A,E) | -rinvR_N_times_M_to_1(A,F) | C = B | D = B | E = B | F = B | D = C | E = C | F = C | E = D | F = D | F = E | f21(A) != f20(A) # label(axiom_6) # label(axiom).
% 0.06/0.48 -cinfinite(A) | rinvP_1_to_N(A,f22(A)) # label(axiom_7) # label(axiom).
% 0.06/0.48 -cinfinite(A) | rinvP_1_to_N(A,f23(A)) # label(axiom_7) # label(axiom).
% 0.06/0.48 -cinfinite(A) | f23(A) != f22(A) # label(axiom_7) # label(axiom).
% 0.06/0.48 -cinfinite(A) | -rinvP_1_to_N(A,B) | -rinvP_1_to_N(A,C) | -rinvP_1_to_N(A,D) | C = B | D = B | D = C # label(axiom_7) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvP_1_to_N(A,B) | -rinvP_1_to_N(A,C) | C = B | rinvP_1_to_N(A,f24(A)) # label(axiom_7) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvP_1_to_N(A,B) | -rinvP_1_to_N(A,C) | C = B | rinvP_1_to_N(A,f25(A)) # label(axiom_7) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvP_1_to_N(A,B) | -rinvP_1_to_N(A,C) | C = B | rinvP_1_to_N(A,f26(A)) # label(axiom_7) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvP_1_to_N(A,B) | -rinvP_1_to_N(A,C) | C = B | f25(A) != f24(A) # label(axiom_7) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvP_1_to_N(A,B) | -rinvP_1_to_N(A,C) | C = B | f26(A) != f24(A) # label(axiom_7) # label(axiom).
% 0.06/0.48 cinfinite(A) | -rinvP_1_to_N(A,B) | -rinvP_1_to_N(A,C) | C = B | f26(A) != f25(A) # label(axiom_7) # label(axiom).
% 0.06/0.48 -rp_N_to_1(A,B) | -rp_N_to_1(A,C) | C = B # label(axiom_8) # label(axiom).
% 0.06/0.48 -rp_N_to_1(A,B) | ccardinality_N(A) # label(axiom_9) # label(axiom).
% 0.06/0.48 -rp_N_to_1(A,B) | cinfinite(B) # label(axiom_10) # label(axiom).
% 0.06/0.48 -rp_N_to_1(A,B) | rinvP_1_to_N(B,A) # label(axiom_11) # label(axiom).
% 0.06/0.48 rp_N_to_1(A,B) | -rinvP_1_to_N(B,A) # label(axiom_11) # label(axiom).
% 0.06/0.48 -rq_M_to_1(A,B) | -rq_M_to_1(A,C) | C = B # label(axiom_12) # label(axiom).
% 0.06/0.48 -rq_M_to_1(A,B) | ccardinality_N_times_M(A) # label(axiom_13) # label(axiom).
% 0.06/0.48 -rq_M_to_1(A,B) | ccardinality_N(B) # label(axiom_14) # label(axiom).
% 0.06/0.48 -rq_M_to_1(A,B) | rinvQ_1_to_M(B,A) # label(axiom_15) # label(axiom).
% 0.06/0.48 rq_M_to_1(A,B) | -rinvQ_1_to_M(B,A) # label(axiom_15) # label(axiom).
% 0.06/0.48 -rr_N_times_M_to_1(A,B) | -rr_N_times_M_to_1(A,C) | C = B # label(axiom_16) # label(axiom).
% 0.06/0.48 -rr_N_times_M_to_1(A,B) | ccardinality_N_times_M(A) # label(axiom_17) # label(axiom).
% 0.06/0.48 -rr_N_times_M_to_1(A,B) | cinfinite(B) # label(axiom_18) # label(axiom).
% 0.06/0.48 -rr_N_times_M_to_1(A,B) | rinvR_N_times_M_to_1(B,A) # label(axiom_19) # label(axiom).
% 0.06/0.48 rr_N_times_M_to_1(A,B) | -rinvR_N_times_M_to_1(B,A) # label(axiom_19) # label(axiom).
% 0.06/0.48 end_of_list.
% 0.06/0.48
% 0.06/0.48 ============================== end of clauses for search =============
% 0.06/0.48 % SZS output start FiniteModel
% 0.06/0.48
% 0.06/0.48 % There are no natural numbers in the input.
% 0.06/0.48
% 0.06/0.48 f1 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f2 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f3 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f4 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f5 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f6 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f7 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f8 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f9 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f10 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f11 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f12 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f13 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f14 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f15 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f16 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f17 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f18 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f19 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f20 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f21 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f22 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f23 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f24 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f25 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 f26 :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 ccardinality_N :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 ccardinality_N_times_M :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 cinfinite :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 cowlNothing :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 cowlThing :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 1 1
% 0.06/0.48
% 0.06/0.48 xsd_integer :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 0 0
% 0.06/0.48
% 0.06/0.48 xsd_string :
% 0.06/0.48 0 1
% 0.06/0.48 -------
% 0.06/0.48 1 1
% 0.06/0.48
% 0.06/0.48 rinvP_1_to_N :
% 0.06/0.48 | 0 1
% 0.06/0.48 --+----
% 0.06/0.48 0 | 0 0
% 0.06/0.48 1 | 0 0
% 0.06/0.48
% 0.06/0.48 rinvQ_1_to_M :
% 0.06/0.48 | 0 1
% 0.06/0.48 --+----
% 0.06/0.48 0 | 0 0
% 0.06/0.48 1 | 0 0
% 0.06/0.48
% 0.06/0.48 rinvR_N_times_M_to_1 :
% 0.06/0.48 | 0 1
% 0.06/0.48 --+----
% 0.06/0.48 0 | 0 0
% 0.06/0.48 1 | 0 0
% 0.06/0.48
% 0.06/0.48 rp_N_to_1 :
% 0.06/0.48 | 0 1
% 0.06/0.48 --+----
% 0.06/0.48 0 | 0 0
% 0.06/0.48 1 | 0 0
% 0.06/0.48
% 0.06/0.48 rq_M_to_1 :
% 0.06/0.48 | 0 1
% 0.06/0.48 --+----
% 0.06/0.48 0 | 0 0
% 0.06/0.48 1 | 0 0
% 0.06/0.48
% 0.06/0.48 rr_N_times_M_to_1 :
% 0.06/0.48 | 0 1
% 0.06/0.48 --+----
% 0.06/0.48 0 | 0 0
% 0.06/0.48 1 | 0 0
% 0.06/0.48
% 0.06/0.48 % SZS output end FiniteModel
% 0.06/0.48 ------ process 40111 exit (max_models) ------
% 0.06/0.48
% 0.06/0.48 User_CPU=0.03, System_CPU=0.00, Wall_clock=0.
% 0.06/0.48
% 0.06/0.48 Exiting with 1 model.
% 0.06/0.48
% 0.06/0.48 Process 40111 exit (max_models) Tue Feb 7 19:40:01 2017
% 0.06/0.48 The process finished Tue Feb 7 19:40:01 2017
% 0.06/0.48 Mace4 ended
%------------------------------------------------------------------------------