TSTP Solution File: NLP150-1 by Mace4---1109a
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- Process Solution
%------------------------------------------------------------------------------
% File : Mace4---1109a
% Problem : NLP150-1 : TPTP v6.4.0. Released v2.4.0.
% Transfm : none
% Format : tptp:raw
% Command : mace4 -t %d -f %s
% Computer : n033.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 09:59:42 EST 2017
% Result : Satisfiable 0.41s
% Output : FiniteModel 0.41s
% Verified :
% SZS Type : None (Parsing solution fails)
% Syntax : Number of formulae : 0
% Comments :
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.00/0.04 % Problem : NLP150-1 : TPTP v6.4.0. Released v2.4.0.
% 0.00/0.04 % Command : mace4 -t %d -f %s
% 0.03/0.24 % Computer : n033.star.cs.uiowa.edu
% 0.03/0.24 % Model : x86_64 x86_64
% 0.03/0.24 % CPU : Intel(R) Xeon(R) CPU E5-2609 0 @ 2.40GHz
% 0.03/0.24 % Memory : 32218.75MB
% 0.03/0.24 % OS : Linux 3.10.0-327.36.3.el7.x86_64
% 0.03/0.24 % CPULimit : 300
% 0.03/0.24 % DateTime : Tue Feb 7 20:15:15 CST 2017
% 0.03/0.24 % CPUTime :
% 0.41/0.66 % SZS status Satisfiable
% 0.41/0.66 ============================== Mace4 =================================
% 0.41/0.66 Mace4 (32) version 2009-11A, November 2009.
% 0.41/0.66 Process 45061 was started by sandbox2 on n033.star.cs.uiowa.edu,
% 0.41/0.66 Tue Feb 7 20:15:16 2017
% 0.41/0.66 The command was "/export/starexec/sandbox2/solver/bin/mace4 -t 300 -f /tmp/Mace4_input_45028_n033.star.cs.uiowa.edu".
% 0.41/0.66 ============================== end of head ===========================
% 0.41/0.66
% 0.41/0.66 ============================== INPUT =================================
% 0.41/0.66
% 0.41/0.66 % Reading from file /tmp/Mace4_input_45028_n033.star.cs.uiowa.edu
% 0.41/0.66
% 0.41/0.66 set(prolog_style_variables).
% 0.41/0.66 set(print_models_tabular).
% 0.41/0.66 % set(print_models_tabular) -> clear(print_models).
% 0.41/0.66
% 0.41/0.66 formulas(sos).
% 0.41/0.66 -member(U,V,V) # label(clause1) # label(axiom).
% 0.41/0.66 -fellow(U,V) | man(U,V) # label(clause2) # label(axiom).
% 0.41/0.66 -man(U,V) | human_person(U,V) # label(clause3) # label(axiom).
% 0.41/0.66 -human_person(U,V) | organism(U,V) # label(clause4) # label(axiom).
% 0.41/0.66 -organism(U,V) | entity(U,V) # label(clause5) # label(axiom).
% 0.41/0.66 -entity(U,V) | thing(U,V) # label(clause6) # label(axiom).
% 0.41/0.66 -thing(U,V) | singleton(U,V) # label(clause7) # label(axiom).
% 0.41/0.66 -entity(U,V) | specific(U,V) # label(clause8) # label(axiom).
% 0.41/0.66 -entity(U,V) | existent(U,V) # label(clause9) # label(axiom).
% 0.41/0.66 -organism(U,V) | impartial(U,V) # label(clause10) # label(axiom).
% 0.41/0.66 -organism(U,V) | living(U,V) # label(clause11) # label(axiom).
% 0.41/0.66 -human_person(U,V) | human(U,V) # label(clause12) # label(axiom).
% 0.41/0.66 -human_person(U,V) | animate(U,V) # label(clause13) # label(axiom).
% 0.41/0.66 -man(U,V) | male(U,V) # label(clause14) # label(axiom).
% 0.41/0.66 -group(U,V) | set(U,V) # label(clause15) # label(axiom).
% 0.41/0.66 -set(U,V) | multiple(U,V) # label(clause16) # label(axiom).
% 0.41/0.66 -two(U,V) | group(U,V) # label(clause17) # label(axiom).
% 0.41/0.66 -state(U,V) | eventuality(U,V) # label(clause18) # label(axiom).
% 0.41/0.66 -eventuality(U,V) | thing(U,V) # label(clause19) # label(axiom).
% 0.41/0.66 -eventuality(U,V) | specific(U,V) # label(clause20) # label(axiom).
% 0.41/0.66 -eventuality(U,V) | nonexistent(U,V) # label(clause21) # label(axiom).
% 0.41/0.66 -eventuality(U,V) | unisex(U,V) # label(clause22) # label(axiom).
% 0.41/0.66 -state(U,V) | event(U,V) # label(clause23) # label(axiom).
% 0.41/0.66 -event(U,V) | eventuality(U,V) # label(clause24) # label(axiom).
% 0.41/0.66 -barrel(U,V) | event(U,V) # label(clause25) # label(axiom).
% 0.41/0.66 -chevy(U,V) | car(U,V) # label(clause26) # label(axiom).
% 0.41/0.66 -car(U,V) | vehicle(U,V) # label(clause27) # label(axiom).
% 0.41/0.66 -vehicle(U,V) | transport(U,V) # label(clause28) # label(axiom).
% 0.41/0.66 -transport(U,V) | instrumentality(U,V) # label(clause29) # label(axiom).
% 0.41/0.66 -instrumentality(U,V) | artifact(U,V) # label(clause30) # label(axiom).
% 0.41/0.66 -artifact(U,V) | object(U,V) # label(clause31) # label(axiom).
% 0.41/0.66 -object(U,V) | entity(U,V) # label(clause32) # label(axiom).
% 0.41/0.66 -object(U,V) | nonliving(U,V) # label(clause33) # label(axiom).
% 0.41/0.66 -object(U,V) | impartial(U,V) # label(clause34) # label(axiom).
% 0.41/0.66 -object(U,V) | unisex(U,V) # label(clause35) # label(axiom).
% 0.41/0.66 -street(U,V) | way(U,V) # label(clause36) # label(axiom).
% 0.41/0.66 -way(U,V) | artifact(U,V) # label(clause37) # label(axiom).
% 0.41/0.66 -placename(U,V) | relname(U,V) # label(clause38) # label(axiom).
% 0.41/0.66 -relname(U,V) | relation(U,V) # label(clause39) # label(axiom).
% 0.41/0.66 -relation(U,V) | abstraction(U,V) # label(clause40) # label(axiom).
% 0.41/0.66 -abstraction(U,V) | thing(U,V) # label(clause41) # label(axiom).
% 0.41/0.66 -abstraction(U,V) | nonhuman(U,V) # label(clause42) # label(axiom).
% 0.41/0.66 -abstraction(U,V) | general(U,V) # label(clause43) # label(axiom).
% 0.41/0.66 -abstraction(U,V) | unisex(U,V) # label(clause44) # label(axiom).
% 0.41/0.66 -hollywood_placename(U,V) | placename(U,V) # label(clause45) # label(axiom).
% 0.41/0.66 -city(U,V) | location(U,V) # label(clause46) # label(axiom).
% 0.41/0.66 -location(U,V) | object(U,V) # label(clause47) # label(axiom).
% 0.41/0.66 -frontseat(U,V) | seat(U,V) # label(clause48) # label(axiom).
% 0.41/0.66 -seat(U,V) | furniture(U,V) # label(clause49) # label(axiom).
% 0.41/0.66 -furniture(U,V) | instrumentality(U,V) # label(clause50) # label(axiom).
% 0.41/0.66 -old(U,V) | -young(U,V) # label(clause51) # label(axiom).
% 0.41/0.66 -male(U,V) | -unisex(U,V) # label(clause52) # label(axiom).
% 0.41/0.66 -general(U,V) | -specific(U,V) # label(clause53) # label(axiom).
% 0.41/0.66 -multiple(U,V) | -singleton(U,V) # label(clause54) # label(axiom).
% 0.41/0.66 -living(U,V) | -nonliving(U,V) # label(clause55) # label(axiom).
% 0.41/0.66 -human(U,V) | -nonhuman(U,V) # label(clause56) # label(axiom).
% 0.41/0.66 -nonexistent(U,V) | -existent(U,V) # label(clause57) # label(axiom).
% 0.41/0.66 -nonliving(U,V) | -animate(U,V) # label(clause58) # label(axiom).
% 0.41/0.66 -be(U,V,W,X) | W = X # label(clause59) # label(axiom).
% 0.41/0.66 -two(U,V) | member(U,skf12(V,U),V) # label(clause60) # label(axiom).
% 0.41/0.66 -two(U,V) | member(U,skf10(V,U),V) # label(clause61) # label(axiom).
% 0.41/0.66 skf12(U,V) != skf10(U,V) | -two(V,U) # label(clause62) # label(axiom).
% 0.41/0.66 -member(U,V,W) | -two(U,W) | V = skf10(W,U) | V = skf12(W,U) # label(clause63) # label(axiom).
% 0.41/0.66 skf13(U,V,W,X) != U | -member(Y,U,Z) | -member(Y,X1,Z) | two(Y,Z) | U = X1 # label(clause64) # label(axiom).
% 0.41/0.66 -member(U,V,W) | -member(U,X,W) | two(U,W) | member(U,skf13(V,X,W,U),W) | V = X # label(clause65) # label(axiom).
% 0.41/0.66 skf13(U,V,W,X) != V | -member(Y,U,Z) | -member(Y,V,Z) | two(Y,Z) | U = V # label(clause66) # label(axiom).
% 0.41/0.66 -placename(U,V) | -of(U,W,X) | -placename(U,W) | -of(U,V,X) | -entity(U,X) | W = V # label(clause67) # label(axiom).
% 0.41/0.66 actual_world(skc5) # label(clause68) # label(negated_conjecture).
% 0.41/0.66 chevy(skc5,skc9) # label(clause69) # label(negated_conjecture).
% 0.41/0.66 placename(skc5,skc8) # label(clause70) # label(negated_conjecture).
% 0.41/0.66 hollywood_placename(skc5,skc8) # label(clause71) # label(negated_conjecture).
% 0.41/0.66 city(skc5,skc7) # label(clause72) # label(negated_conjecture).
% 0.41/0.66 street(skc5,skc7) # label(clause73) # label(negated_conjecture).
% 0.41/0.66 lonely(skc5,skc7) # label(clause74) # label(negated_conjecture).
% 0.41/0.66 white(skc5,skc9) # label(clause75) # label(negated_conjecture).
% 0.41/0.66 dirty(skc5,skc9) # label(clause76) # label(negated_conjecture).
% 0.41/0.66 old(skc5,skc9) # label(clause77) # label(negated_conjecture).
% 0.41/0.66 barrel(skc5,skc6) # label(clause78) # label(negated_conjecture).
% 0.41/0.66 present(skc5,skc6) # label(clause79) # label(negated_conjecture).
% 0.41/0.66 event(skc5,skc6) # label(clause80) # label(negated_conjecture).
% 0.41/0.66 of(skc5,skc8,skc7) # label(clause81) # label(negated_conjecture).
% 0.41/0.66 down(skc5,skc6,skc7) # label(clause82) # label(negated_conjecture).
% 0.41/0.66 in(skc5,skc6,skc7) # label(clause83) # label(negated_conjecture).
% 0.41/0.66 agent(skc5,skc6,skc9) # label(clause84) # label(negated_conjecture).
% 0.41/0.66 ssSkP0(U,V) | frontseat(V,skf8(V,W)) # label(clause85) # label(negated_conjecture).
% 0.41/0.66 ssSkP0(U,V) | member(V,skf8(V,U),U) # label(clause86) # label(negated_conjecture).
% 0.41/0.66 -in(U,V,skf8(U,W)) | -be(U,X,skf8(U,W),V) | -state(U,X) | ssSkP0(Y,U) # label(clause87) # label(negated_conjecture).
% 0.41/0.66 -event(U,V) | -present(U,V) | -barrel(U,V) | -agent(U,V,W) | -old(U,W) | -dirty(U,W) | -white(U,W) | -chevy(U,W) | -in(U,V,X) | -down(U,V,X) | -lonely(U,X) | -street(U,X) | -city(U,X) | -of(U,Y,X) | -hollywood_placename(U,Y) | -placename(U,Y) | -group(U,Z) | -two(U,Z) | -ssSkP0(Z,U) | -actual_world(U) | member(U,skf5(U,Z),Z) # label(clause88) # label(negated_conjecture).
% 0.41/0.66 -event(U,V) | -present(U,V) | -barrel(U,V) | -agent(U,V,W) | -old(U,W) | -dirty(U,W) | -white(U,W) | -chevy(U,W) | -in(U,V,X) | -down(U,V,X) | -lonely(U,X) | -street(U,X) | -city(U,X) | -of(U,Y,X) | -hollywood_placename(U,Y) | -placename(U,Y) | -young(U,skf5(U,Z)) | -fellow(U,skf5(U,Z)) | -group(U,X1) | -two(U,X1) | -ssSkP0(X1,U) | -actual_world(U) # label(clause89) # label(negated_conjecture).
% 0.41/0.66 end_of_list.
% 0.41/0.66
% 0.41/0.66 % From the command line: assign(max_seconds, 300).
% 0.41/0.66
% 0.41/0.66 ============================== end of input ==========================
% 0.41/0.66
% 0.41/0.66 ============================== PROCESS NON-CLAUSAL FORMULAS ==========
% 0.41/0.66
% 0.41/0.66 % Formulas that are not ordinary clauses:
% 0.41/0.66
% 0.41/0.66 ============================== end of process non-clausal formulas ===
% 0.41/0.66
% 0.41/0.66 ============================== CLAUSES FOR SEARCH ====================
% 0.41/0.66
% 0.41/0.66 formulas(mace4_clauses).
% 0.41/0.66 -member(A,B,B) # label(clause1) # label(axiom).
% 0.41/0.66 -fellow(A,B) | man(A,B) # label(clause2) # label(axiom).
% 0.41/0.66 -man(A,B) | human_person(A,B) # label(clause3) # label(axiom).
% 0.41/0.66 -human_person(A,B) | organism(A,B) # label(clause4) # label(axiom).
% 0.41/0.66 -organism(A,B) | entity(A,B) # label(clause5) # label(axiom).
% 0.41/0.66 -entity(A,B) | thing(A,B) # label(clause6) # label(axiom).
% 0.41/0.66 -thing(A,B) | singleton(A,B) # label(clause7) # label(axiom).
% 0.41/0.66 -entity(A,B) | specific(A,B) # label(clause8) # label(axiom).
% 0.41/0.66 -entity(A,B) | existent(A,B) # label(clause9) # label(axiom).
% 0.41/0.66 -organism(A,B) | impartial(A,B) # label(clause10) # label(axiom).
% 0.41/0.66 -organism(A,B) | living(A,B) # label(clause11) # label(axiom).
% 0.41/0.66 -human_person(A,B) | human(A,B) # label(clause12) # label(axiom).
% 0.41/0.66 -human_person(A,B) | animate(A,B) # label(clause13) # label(axiom).
% 0.41/0.66 -man(A,B) | male(A,B) # label(clause14) # label(axiom).
% 0.41/0.66 -group(A,B) | set(A,B) # label(clause15) # label(axiom).
% 0.41/0.66 -set(A,B) | multiple(A,B) # label(clause16) # label(axiom).
% 0.41/0.66 -two(A,B) | group(A,B) # label(clause17) # label(axiom).
% 0.41/0.66 -state(A,B) | eventuality(A,B) # label(clause18) # label(axiom).
% 0.41/0.66 -eventuality(A,B) | thing(A,B) # label(clause19) # label(axiom).
% 0.41/0.66 -eventuality(A,B) | specific(A,B) # label(clause20) # label(axiom).
% 0.41/0.66 -eventuality(A,B) | nonexistent(A,B) # label(clause21) # label(axiom).
% 0.41/0.66 -eventuality(A,B) | unisex(A,B) # label(clause22) # label(axiom).
% 0.41/0.66 -state(A,B) | event(A,B) # label(clause23) # label(axiom).
% 0.41/0.66 -event(A,B) | eventuality(A,B) # label(clause24) # label(axiom).
% 0.41/0.66 -barrel(A,B) | event(A,B) # label(clause25) # label(axiom).
% 0.41/0.66 -chevy(A,B) | car(A,B) # label(clause26) # label(axiom).
% 0.41/0.66 -car(A,B) | vehicle(A,B) # label(clause27) # label(axiom).
% 0.41/0.66 -vehicle(A,B) | transport(A,B) # label(clause28) # label(axiom).
% 0.41/0.66 -transport(A,B) | instrumentality(A,B) # label(clause29) # label(axiom).
% 0.41/0.66 -instrumentality(A,B) | artifact(A,B) # label(clause30) # label(axiom).
% 0.41/0.66 -artifact(A,B) | object(A,B) # label(clause31) # label(axiom).
% 0.41/0.66 -object(A,B) | entity(A,B) # label(clause32) # label(axiom).
% 0.41/0.66 -object(A,B) | nonliving(A,B) # label(clause33) # label(axiom).
% 0.41/0.66 -object(A,B) | impartial(A,B) # label(clause34) # label(axiom).
% 0.41/0.66 -object(A,B) | unisex(A,B) # label(clause35) # label(axiom).
% 0.41/0.66 -street(A,B) | way(A,B) # label(clause36) # label(axiom).
% 0.41/0.66 -way(A,B) | artifact(A,B) # label(clause37) # label(axiom).
% 0.41/0.66 -placename(A,B) | relname(A,B) # label(clause38) # label(axiom).
% 0.41/0.66 -relname(A,B) | relation(A,B) # label(clause39) # label(axiom).
% 0.41/0.66 -relation(A,B) | abstraction(A,B) # label(clause40) # label(axiom).
% 0.41/0.66 -abstraction(A,B) | thing(A,B) # label(clause41) # label(axiom).
% 0.41/0.66 -abstraction(A,B) | nonhuman(A,B) # label(clause42) # label(axiom).
% 0.41/0.66 -abstraction(A,B) | general(A,B) # label(clause43) # label(axiom).
% 0.41/0.66 -abstraction(A,B) | unisex(A,B) # label(clause44) # label(axiom).
% 0.41/0.66 -hollywood_placename(A,B) | placename(A,B) # label(clause45) # label(axiom).
% 0.41/0.66 -city(A,B) | location(A,B) # label(clause46) # label(axiom).
% 0.41/0.66 -location(A,B) | object(A,B) # label(clause47) # label(axiom).
% 0.41/0.66 -frontseat(A,B) | seat(A,B) # label(clause48) # label(axiom).
% 0.41/0.66 -seat(A,B) | furniture(A,B) # label(clause49) # label(axiom).
% 0.41/0.66 -furniture(A,B) | instrumentality(A,B) # label(clause50) # label(axiom).
% 0.41/0.66 -old(A,B) | -young(A,B) # label(clause51) # label(axiom).
% 0.41/0.66 -male(A,B) | -unisex(A,B) # label(clause52) # label(axiom).
% 0.41/0.66 -general(A,B) | -specific(A,B) # label(clause53) # label(axiom).
% 0.41/0.66 -multiple(A,B) | -singleton(A,B) # label(clause54) # label(axiom).
% 0.41/0.66 -living(A,B) | -nonliving(A,B) # label(clause55) # label(axiom).
% 0.41/0.66 -human(A,B) | -nonhuman(A,B) # label(clause56) # label(axiom).
% 0.41/0.66 -nonexistent(A,B) | -existent(A,B) # label(clause57) # label(axiom).
% 0.41/0.66 -nonliving(A,B) | -animate(A,B) # label(clause58) # label(axiom).
% 0.41/0.66 -be(A,B,C,D) | C = D # label(clause59) # label(axiom).
% 0.41/0.66 -two(A,B) | member(A,skf12(B,A),B) # label(clause60) # label(axiom).
% 0.41/0.66 -two(A,B) | member(A,skf10(B,A),B) # label(clause61) # label(axiom).
% 0.41/0.66 skf12(A,B) != skf10(A,B) | -two(B,A) # label(clause62) # label(axiom).
% 0.41/0.66 -member(A,B,C) | -two(A,C) | B = skf10(C,A) | B = skf12(C,A) # label(clause63) # label(axiom).
% 0.41/0.66 skf13(A,B,C,D) != A | -member(E,A,F) | -member(E,V6,F) | two(E,F) | A = V6 # label(clause64) # label(axiom).
% 0.41/0.66 -member(A,B,C) | -member(A,D,C) | two(A,C) | member(A,skf13(B,D,C,A),C) | B = D # label(clause65) # label(axiom).
% 0.41/0.66 skf13(A,B,C,D) != B | -member(E,A,F) | -member(E,B,F) | two(E,F) | A = B # label(clause66) # label(axiom).
% 0.41/0.66 -placename(A,B) | -of(A,C,D) | -placename(A,C) | -of(A,B,D) | -entity(A,D) | C = B # label(clause67) # label(axiom).
% 0.41/0.66 actual_world(skc5) # label(clause68) # label(negated_conjecture).
% 0.41/0.66 chevy(skc5,skc9) # label(clause69) # label(negated_conjecture).
% 0.41/0.66 placename(skc5,skc8) # label(clause70) # label(negated_conjecture).
% 0.41/0.66 hollywood_placename(skc5,skc8) # label(clause71) # label(negated_conjecture).
% 0.41/0.66 city(skc5,skc7) # label(clause72) # label(negated_conjecture).
% 0.41/0.66 street(skc5,skc7) # label(clause73) # label(negated_conjecture).
% 0.41/0.66 lonely(skc5,skc7) # label(clause74) # label(negated_conjecture).
% 0.41/0.66 white(skc5,skc9) # label(clause75) # label(negated_conjecture).
% 0.41/0.66 dirty(skc5,skc9) # label(clause76) # label(negated_conjecture).
% 0.41/0.66 old(skc5,skc9) # label(clause77) # label(negated_conjecture).
% 0.41/0.66 barrel(skc5,skc6) # label(clause78) # label(negated_conjecture).
% 0.41/0.66 present(skc5,skc6) # label(clause79) # label(negated_conjecture).
% 0.41/0.66 event(skc5,skc6) # label(clause80) # label(negated_conjecture).
% 0.41/0.66 of(skc5,skc8,skc7) # label(clause81) # label(negated_conjecture).
% 0.41/0.66 down(skc5,skc6,skc7) # label(clause82) # label(negated_conjecture).
% 0.41/0.66 in(skc5,skc6,skc7) # label(clause83) # label(negated_conjecture).
% 0.41/0.66 agent(skc5,skc6,skc9) # label(clause84) # label(negated_conjecture).
% 0.41/0.66 ssSkP0(A,B) | frontseat(B,skf8(B,C)) # label(clause85) # label(negated_conjecture).
% 0.41/0.66 ssSkP0(A,B) | member(B,skf8(B,A),A) # label(clause86) # label(negated_conjecture).
% 0.41/0.66 -in(A,B,skf8(A,C)) | -be(A,D,skf8(A,C),B) | -state(A,D) | ssSkP0(E,A) # label(clause87) # label(negated_conjecture).
% 0.41/0.66 -event(A,B) | -present(A,B) | -barrel(A,B) | -agent(A,B,C) | -old(A,C) | -dirty(A,C) | -white(A,C) | -chevy(A,C) | -in(A,B,D) | -down(A,B,D) | -lonely(A,D) | -street(A,D) | -city(A,D) | -of(A,E,D) | -hollywood_placename(A,E) | -placename(A,E) | -group(A,F) | -two(A,F) | -ssSkP0(F,A) | -actual_world(A) | member(A,skf5(A,F),F) # label(clause88) # label(negated_conjecture).
% 0.41/0.66 -event(A,B) | -present(A,B) | -barrel(A,B) | -agent(A,B,C) | -old(A,C) | -dirty(A,C) | -white(A,C) | -chevy(A,C) | -in(A,B,D) | -down(A,B,D) | -lonely(A,D) | -street(A,D) | -city(A,D) | -of(A,E,D) | -hollywood_placename(A,E) | -placename(A,E) | -young(A,skf5(A,F)) | -fellow(A,skf5(A,F)) | -group(A,V6) | -two(A,V6) | -ssSkP0(V6,A) | -actual_world(A) # label(clause89) # label(negated_conjecture).
% 0.41/0.66 end_of_list.
% 0.41/0.66
% 0.41/0.66 ============================== end of clauses for search =============
% 0.41/0.66 % SZS output start FiniteModel
% 0.41/0.66
% 0.41/0.66 % There are no natural numbers in the input.
% 0.41/0.66
% 0.41/0.66 skc5 : 0
% 0.41/0.66
% 0.41/0.66 skc6 : 0
% 0.41/0.66
% 0.41/0.66 skc7 : 1
% 0.41/0.66
% 0.41/0.66 skc8 : 2
% 0.41/0.66
% 0.41/0.66 skc9 : 1
% 0.41/0.66
% 0.41/0.66 skf10 :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 skf12 :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 skf5 :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 skf8 :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66 skf13(0,0,0,0) = 0.
% 0.41/0.66 skf13(0,0,0,1) = 0.
% 0.41/0.66 skf13(0,0,0,2) = 0.
% 0.41/0.66 skf13(0,0,1,0) = 0.
% 0.41/0.66 skf13(0,0,1,1) = 0.
% 0.41/0.66 skf13(0,0,1,2) = 0.
% 0.41/0.66 skf13(0,0,2,0) = 0.
% 0.41/0.66 skf13(0,0,2,1) = 0.
% 0.41/0.66 skf13(0,0,2,2) = 0.
% 0.41/0.66 skf13(0,1,0,0) = 0.
% 0.41/0.66 skf13(0,1,0,1) = 0.
% 0.41/0.66 skf13(0,1,0,2) = 0.
% 0.41/0.66 skf13(0,1,1,0) = 0.
% 0.41/0.66 skf13(0,1,1,1) = 0.
% 0.41/0.66 skf13(0,1,1,2) = 0.
% 0.41/0.66 skf13(0,1,2,0) = 0.
% 0.41/0.66 skf13(0,1,2,1) = 0.
% 0.41/0.66 skf13(0,1,2,2) = 0.
% 0.41/0.66 skf13(0,2,0,0) = 0.
% 0.41/0.66 skf13(0,2,0,1) = 0.
% 0.41/0.66 skf13(0,2,0,2) = 0.
% 0.41/0.66 skf13(0,2,1,0) = 0.
% 0.41/0.66 skf13(0,2,1,1) = 0.
% 0.41/0.66 skf13(0,2,1,2) = 0.
% 0.41/0.66 skf13(0,2,2,0) = 0.
% 0.41/0.66 skf13(0,2,2,1) = 0.
% 0.41/0.66 skf13(0,2,2,2) = 0.
% 0.41/0.66 skf13(1,0,0,0) = 0.
% 0.41/0.66 skf13(1,0,0,1) = 0.
% 0.41/0.66 skf13(1,0,0,2) = 0.
% 0.41/0.66 skf13(1,0,1,0) = 0.
% 0.41/0.66 skf13(1,0,1,1) = 0.
% 0.41/0.66 skf13(1,0,1,2) = 0.
% 0.41/0.66 skf13(1,0,2,0) = 0.
% 0.41/0.66 skf13(1,0,2,1) = 0.
% 0.41/0.66 skf13(1,0,2,2) = 0.
% 0.41/0.66 skf13(1,1,0,0) = 0.
% 0.41/0.66 skf13(1,1,0,1) = 0.
% 0.41/0.66 skf13(1,1,0,2) = 0.
% 0.41/0.66 skf13(1,1,1,0) = 0.
% 0.41/0.66 skf13(1,1,1,1) = 0.
% 0.41/0.66 skf13(1,1,1,2) = 0.
% 0.41/0.66 skf13(1,1,2,0) = 0.
% 0.41/0.66 skf13(1,1,2,1) = 0.
% 0.41/0.66 skf13(1,1,2,2) = 0.
% 0.41/0.66 skf13(1,2,0,0) = 0.
% 0.41/0.66 skf13(1,2,0,1) = 0.
% 0.41/0.66 skf13(1,2,0,2) = 0.
% 0.41/0.66 skf13(1,2,1,0) = 0.
% 0.41/0.66 skf13(1,2,1,1) = 0.
% 0.41/0.66 skf13(1,2,1,2) = 0.
% 0.41/0.66 skf13(1,2,2,0) = 0.
% 0.41/0.66 skf13(1,2,2,1) = 0.
% 0.41/0.66 skf13(1,2,2,2) = 0.
% 0.41/0.66 skf13(2,0,0,0) = 0.
% 0.41/0.66 skf13(2,0,0,1) = 0.
% 0.41/0.66 skf13(2,0,0,2) = 0.
% 0.41/0.66 skf13(2,0,1,0) = 0.
% 0.41/0.66 skf13(2,0,1,1) = 0.
% 0.41/0.66 skf13(2,0,1,2) = 0.
% 0.41/0.66 skf13(2,0,2,0) = 0.
% 0.41/0.66 skf13(2,0,2,1) = 0.
% 0.41/0.66 skf13(2,0,2,2) = 0.
% 0.41/0.66 skf13(2,1,0,0) = 0.
% 0.41/0.66 skf13(2,1,0,1) = 0.
% 0.41/0.66 skf13(2,1,0,2) = 0.
% 0.41/0.66 skf13(2,1,1,0) = 0.
% 0.41/0.66 skf13(2,1,1,1) = 0.
% 0.41/0.66 skf13(2,1,1,2) = 0.
% 0.41/0.66 skf13(2,1,2,0) = 0.
% 0.41/0.66 skf13(2,1,2,1) = 0.
% 0.41/0.66 skf13(2,1,2,2) = 0.
% 0.41/0.66 skf13(2,2,0,0) = 0.
% 0.41/0.66 skf13(2,2,0,1) = 0.
% 0.41/0.66 skf13(2,2,0,2) = 0.
% 0.41/0.66 skf13(2,2,1,0) = 0.
% 0.41/0.66 skf13(2,2,1,1) = 0.
% 0.41/0.66 skf13(2,2,1,2) = 0.
% 0.41/0.66 skf13(2,2,2,0) = 0.
% 0.41/0.66 skf13(2,2,2,1) = 0.
% 0.41/0.66 skf13(2,2,2,2) = 0.
% 0.41/0.66
% 0.41/0.66 actual_world :
% 0.41/0.66 0 1 2
% 0.41/0.66 ---------
% 0.41/0.66 1 0 0
% 0.41/0.66
% 0.41/0.66 abstraction :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 1
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 animate :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 artifact :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 1 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 barrel :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 1 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 car :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 1 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 chevy :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 1 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 city :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 1 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 dirty :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 1 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 entity :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 1 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 event :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 1 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 eventuality :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 1 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 existent :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 1 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 fellow :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 frontseat :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 furniture :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 general :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 1
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 group :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 hollywood_placename :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 1
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 human :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 human_person :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 impartial :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 1 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 instrumentality :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 1 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 living :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 location :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 1 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 lonely :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 1 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 male :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 man :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 multiple :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 nonexistent :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 1 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 nonhuman :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 1
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 nonliving :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 1 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 object :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 1 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 old :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 1 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 organism :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 placename :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 1
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 present :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 1 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 relation :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 1
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 relname :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 1
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 seat :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 set :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 singleton :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 1 1 1
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 specific :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 1 1 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 ssSkP0 :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 1 1 1
% 0.41/0.66 1 | 1 1 1
% 0.41/0.66 2 | 1 1 1
% 0.41/0.66
% 0.41/0.66 state :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 street :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 1 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 thing :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 1 1 1
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 transport :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 1 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 two :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 unisex :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 1 1 1
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 vehicle :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 1 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 way :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 1 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 white :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 1 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66
% 0.41/0.66 young :
% 0.41/0.66 | 0 1 2
% 0.41/0.66 --+------
% 0.41/0.66 0 | 0 0 0
% 0.41/0.66 1 | 0 0 0
% 0.41/0.66 2 | 0 0 0
% 0.41/0.66 agent(0,0,0) = 0.
% 0.41/0.66 agent(0,0,1) = 1.
% 0.41/0.66 agent(0,0,2) = 0.
% 0.41/0.66 agent(0,1,0) = 0.
% 0.41/0.66 agent(0,1,1) = 0.
% 0.41/0.66 agent(0,1,2) = 0.
% 0.41/0.66 agent(0,2,0) = 0.
% 0.41/0.66 agent(0,2,1) = 0.
% 0.41/0.66 agent(0,2,2) = 0.
% 0.41/0.66 agent(1,0,0) = 0.
% 0.41/0.66 agent(1,0,1) = 0.
% 0.41/0.66 agent(1,0,2) = 0.
% 0.41/0.66 agent(1,1,0) = 0.
% 0.41/0.66 agent(1,1,1) = 0.
% 0.41/0.66 agent(1,1,2) = 0.
% 0.41/0.66 agent(1,2,0) = 0.
% 0.41/0.66 agent(1,2,1) = 0.
% 0.41/0.66 agent(1,2,2) = 0.
% 0.41/0.66 agent(2,0,0) = 0.
% 0.41/0.66 agent(2,0,1) = 0.
% 0.41/0.66 agent(2,0,2) = 0.
% 0.41/0.66 agent(2,1,0) = 0.
% 0.41/0.66 agent(2,1,1) = 0.
% 0.41/0.66 agent(2,1,2) = 0.
% 0.41/0.66 agent(2,2,0) = 0.
% 0.41/0.66 agent(2,2,1) = 0.
% 0.41/0.66 agent(2,2,2) = 0.
% 0.41/0.66 down(0,0,0) = 0.
% 0.41/0.66 down(0,0,1) = 1.
% 0.41/0.66 down(0,0,2) = 0.
% 0.41/0.66 down(0,1,0) = 0.
% 0.41/0.66 down(0,1,1) = 0.
% 0.41/0.66 down(0,1,2) = 0.
% 0.41/0.66 down(0,2,0) = 0.
% 0.41/0.66 down(0,2,1) = 0.
% 0.41/0.66 down(0,2,2) = 0.
% 0.41/0.66 down(1,0,0) = 0.
% 0.41/0.66 down(1,0,1) = 0.
% 0.41/0.66 down(1,0,2) = 0.
% 0.41/0.66 down(1,1,0) = 0.
% 0.41/0.66 down(1,1,1) = 0.
% 0.41/0.66 down(1,1,2) = 0.
% 0.41/0.66 down(1,2,0) = 0.
% 0.41/0.66 down(1,2,1) = 0.
% 0.41/0.66 down(1,2,2) = 0.
% 0.41/0.66 down(2,0,0) = 0.
% 0.41/0.66 down(2,0,1) = 0.
% 0.41/0.66 down(2,0,2) = 0.
% 0.41/0.66 down(2,1,0) = 0.
% 0.41/0.66 down(2,1,1) = 0.
% 0.41/0.66 down(2,1,2) = 0.
% 0.41/0.66 down(2,2,0) = 0.
% 0.41/0.66 down(2,2,1) = 0.
% 0.41/0.66 down(2,2,2) = 0.
% 0.41/0.66 in(0,0,0) = 0.
% 0.41/0.66 in(0,0,1) = 1.
% 0.41/0.66 in(0,0,2) = 0.
% 0.41/0.66 in(0,1,0) = 0.
% 0.41/0.66 in(0,1,1) = 0.
% 0.41/0.66 in(0,1,2) = 0.
% 0.41/0.66 in(0,2,0) = 0.
% 0.41/0.66 in(0,2,1) = 0.
% 0.41/0.66 in(0,2,2) = 0.
% 0.41/0.66 in(1,0,0) = 0.
% 0.41/0.66 in(1,0,1) = 0.
% 0.41/0.66 in(1,0,2) = 0.
% 0.41/0.66 in(1,1,0) = 0.
% 0.41/0.66 in(1,1,1) = 0.
% 0.41/0.66 in(1,1,2) = 0.
% 0.41/0.66 in(1,2,0) = 0.
% 0.41/0.66 in(1,2,1) = 0.
% 0.41/0.66 in(1,2,2) = 0.
% 0.41/0.66 in(2,0,0) = 0.
% 0.41/0.66 in(2,0,1) = 0.
% 0.41/0.66 in(2,0,2) = 0.
% 0.41/0.66 in(2,1,0) = 0.
% 0.41/0.66 in(2,1,1) = 0.
% 0.41/0.66 in(2,1,2) = 0.
% 0.41/0.66 in(2,2,0) = 0.
% 0.41/0.66 in(2,2,1) = 0.
% 0.41/0.66 in(2,2,2) = 0.
% 0.41/0.66 member(0,0,0) = 0.
% 0.41/0.66 member(0,0,1) = 0.
% 0.41/0.66 member(0,0,2) = 0.
% 0.41/0.66 member(0,1,0) = 0.
% 0.41/0.66 member(0,1,1) = 0.
% 0.41/0.66 member(0,1,2) = 0.
% 0.41/0.66 member(0,2,0) = 0.
% 0.41/0.66 member(0,2,1) = 0.
% 0.41/0.66 member(0,2,2) = 0.
% 0.41/0.66 member(1,0,0) = 0.
% 0.41/0.66 member(1,0,1) = 0.
% 0.41/0.66 member(1,0,2) = 0.
% 0.41/0.66 member(1,1,0) = 0.
% 0.41/0.66 member(1,1,1) = 0.
% 0.41/0.66 member(1,1,2) = 0.
% 0.41/0.66 member(1,2,0) = 0.
% 0.41/0.66 member(1,2,1) = 0.
% 0.41/0.66 member(1,2,2) = 0.
% 0.41/0.66 member(2,0,0) = 0.
% 0.41/0.66 member(2,0,1) = 0.
% 0.41/0.66 member(2,0,2) = 0.
% 0.41/0.66 member(2,1,0) = 0.
% 0.41/0.66 member(2,1,1) = 0.
% 0.41/0.66 member(2,1,2) = 0.
% 0.41/0.66 member(2,2,0) = 0.
% 0.41/0.66 member(2,2,1) = 0.
% 0.41/0.66 member(2,2,2) = 0.
% 0.41/0.66 of(0,0,0) = 0.
% 0.41/0.66 of(0,0,1) = 0.
% 0.41/0.66 of(0,0,2) = 0.
% 0.41/0.66 of(0,1,0) = 0.
% 0.41/0.66 of(0,1,1) = 0.
% 0.41/0.66 of(0,1,2) = 0.
% 0.41/0.66 of(0,2,0) = 0.
% 0.41/0.66 of(0,2,1) = 1.
% 0.41/0.66 of(0,2,2) = 0.
% 0.41/0.66 of(1,0,0) = 0.
% 0.41/0.66 of(1,0,1) = 0.
% 0.41/0.66 of(1,0,2) = 0.
% 0.41/0.66 of(1,1,0) = 0.
% 0.41/0.66 of(1,1,1) = 0.
% 0.41/0.66 of(1,1,2) = 0.
% 0.41/0.66 of(1,2,0) = 0.
% 0.41/0.66 of(1,2,1) = 0.
% 0.41/0.66 of(1,2,2) = 0.
% 0.41/0.66 of(2,0,0) = 0.
% 0.41/0.66 of(2,0,1) = 0.
% 0.41/0.66 of(2,0,2) = 0.
% 0.41/0.66 of(2,1,0) = 0.
% 0.41/0.66 of(2,1,1) = 0.
% 0.41/0.66 of(2,1,2) = 0.
% 0.41/0.66 of(2,2,0) = 0.
% 0.41/0.66 of(2,2,1) = 0.
% 0.41/0.66 of(2,2,2) = 0.
% 0.41/0.66 be(0,0,0,0) = 0.
% 0.41/0.66 be(0,0,0,1) = 0.
% 0.41/0.66 be(0,0,0,2) = 0.
% 0.41/0.66 be(0,0,1,0) = 0.
% 0.41/0.66 be(0,0,1,1) = 0.
% 0.41/0.66 be(0,0,1,2) = 0.
% 0.41/0.66 be(0,0,2,0) = 0.
% 0.41/0.66 be(0,0,2,1) = 0.
% 0.41/0.66 be(0,0,2,2) = 0.
% 0.41/0.66 be(0,1,0,0) = 0.
% 0.41/0.66 be(0,1,0,1) = 0.
% 0.41/0.66 be(0,1,0,2) = 0.
% 0.41/0.66 be(0,1,1,0) = 0.
% 0.41/0.66 be(0,1,1,1) = 0.
% 0.41/0.66 be(0,1,1,2) = 0.
% 0.41/0.66 be(0,1,2,0) = 0.
% 0.41/0.66 be(0,1,2,1) = 0.
% 0.41/0.66 be(0,1,2,2) = 0.
% 0.41/0.66 be(0,2,0,0) = 0.
% 0.41/0.66 be(0,2,0,1) = 0.
% 0.41/0.66 be(0,2,0,2) = 0.
% 0.41/0.66 be(0,2,1,0) = 0.
% 0.41/0.66 be(0,2,1,1) = 0.
% 0.41/0.66 be(0,2,1,2) = 0.
% 0.41/0.66 be(0,2,2,0) = 0.
% 0.41/0.66 be(0,2,2,1) = 0.
% 0.41/0.66 be(0,2,2,2) = 0.
% 0.41/0.66 be(1,0,0,0) = 0.
% 0.41/0.66 be(1,0,0,1) = 0.
% 0.41/0.66 be(1,0,0,2) = 0.
% 0.41/0.66 be(1,0,1,0) = 0.
% 0.41/0.66 be(1,0,1,1) = 0.
% 0.41/0.66 be(1,0,1,2) = 0.
% 0.41/0.66 be(1,0,2,0) = 0.
% 0.41/0.66 be(1,0,2,1) = 0.
% 0.41/0.66 be(1,0,2,2) = 0.
% 0.41/0.66 be(1,1,0,0) = 0.
% 0.41/0.66 be(1,1,0,1) = 0.
% 0.41/0.66 be(1,1,0,2) = 0.
% 0.41/0.66 be(1,1,1,0) = 0.
% 0.41/0.66 be(1,1,1,1) = 0.
% 0.41/0.66 be(1,1,1,2) = 0.
% 0.41/0.66 be(1,1,2,0) = 0.
% 0.41/0.66 be(1,1,2,1) = 0.
% 0.41/0.66 be(1,1,2,2) = 0.
% 0.41/0.66 be(1,2,0,0) = 0.
% 0.41/0.66 be(1,2,0,1) = 0.
% 0.41/0.66 be(1,2,0,2) = 0.
% 0.41/0.66 be(1,2,1,0) = 0.
% 0.41/0.66 be(1,2,1,1) = 0.
% 0.41/0.66 be(1,2,1,2) = 0.
% 0.41/0.66 be(1,2,2,0) = 0.
% 0.41/0.66 be(1,2,2,1) = 0.
% 0.41/0.66 be(1,2,2,2) = 0.
% 0.41/0.66 be(2,0,0,0) = 0.
% 0.41/0.66 be(2,0,0,1) = 0.
% 0.41/0.66 be(2,0,0,2) = 0.
% 0.41/0.66 be(2,0,1,0) = 0.
% 0.41/0.66 be(2,0,1,1) = 0.
% 0.41/0.66 be(2,0,1,2) = 0.
% 0.41/0.66 be(2,0,2,0) = 0.
% 0.41/0.66 be(2,0,2,1) = 0.
% 0.41/0.66 be(2,0,2,2) = 0.
% 0.41/0.66 be(2,1,0,0) = 0.
% 0.41/0.66 be(2,1,0,1) = 0.
% 0.41/0.66 be(2,1,0,2) = 0.
% 0.41/0.66 be(2,1,1,0) = 0.
% 0.41/0.66 be(2,1,1,1) = 0.
% 0.41/0.66 be(2,1,1,2) = 0.
% 0.41/0.66 be(2,1,2,0) = 0.
% 0.41/0.66 be(2,1,2,1) = 0.
% 0.41/0.66 be(2,1,2,2) = 0.
% 0.41/0.66 be(2,2,0,0) = 0.
% 0.41/0.66 be(2,2,0,1) = 0.
% 0.41/0.66 be(2,2,0,2) = 0.
% 0.41/0.66 be(2,2,1,0) = 0.
% 0.41/0.66 be(2,2,1,1) = 0.
% 0.41/0.66 be(2,2,1,2) = 0.
% 0.41/0.66 be(2,2,2,0) = 0.
% 0.41/0.66 be(2,2,2,1) = 0.
% 0.41/0.66 be(2,2,2,2) = 0.
% 0.41/0.66
% 0.41/0.66 % SZS output end FiniteModel
% 0.41/0.66 ------ process 45061 exit (max_models) ------
% 0.41/0.66
% 0.41/0.66 User_CPU=0.19, System_CPU=0.00, Wall_clock=0.
% 0.41/0.66
% 0.41/0.66 Exiting with 1 model.
% 0.41/0.66
% 0.41/0.66 Process 45061 exit (max_models) Tue Feb 7 20:15:16 2017
% 0.41/0.66 The process finished Tue Feb 7 20:15:16 2017
% 0.41/0.66 Mace4 ended
%------------------------------------------------------------------------------