TSTP Solution File: MGT038+2 by E-Darwin---1.5
View Problem
- Process Solution
%------------------------------------------------------------------------------
% File : E-Darwin---1.5
% Problem : MGT038+2 : TPTP v6.1.0. Released v2.0.0.
% Transfm : none
% Format : tptp:raw
% Command : e-darwin -pev TPTP -pmd true -if tptp -pl 2 -pc false -ps false %s
% Computer : n004.star.cs.uiowa.edu
% Model : x86_64 x86_64
% CPU : Intel(R) Xeon(R) CPU E5-2609 0 2.40GHz
% Memory : 16127.75MB
% OS : Linux 2.6.32-431.20.3.el6.x86_64
% CPULimit : 300s
% DateTime : Fri Aug 1 22:05:56 EDT 2014
% Result : CounterSatisfiable 16.55s
% Output : Model 16.55s
% Verified :
% SZS Type : None (Parsing solution fails)
% Syntax : Number of formulae : 0
% Comments :
%------------------------------------------------------------------------------
%----ERROR: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% % Problem : MGT038+2 : TPTP v6.1.0. Released v2.0.0.
% % Command : e-darwin -pev TPTP -pmd true -if tptp -pl 2 -pc false -ps false %s
% % Computer : n004.star.cs.uiowa.edu
% % Model : x86_64 x86_64
% % CPU : Intel(R) Xeon(R) CPU E5-2609 0 @ 2.40GHz
% % Memory : 16127.75MB
% % OS : Linux 2.6.32-431.20.3.el6.x86_64
% % CPULimit : 300
% % DateTime : Fri Jul 25 18:25:16 CDT 2014
% % CPUTime : 16.55
% E-Darwin 1.5 2012/06/20 (based on Darwin 1.3)
%
%
% Defaulting to tptp format.
% Parsing /export/starexec/sandbox/benchmark/theBenchmark.p ...
%
%
%
% Proving ...
%
% % SZS status CounterSatisfiable for /export/starexec/sandbox/benchmark/theBenchmark.p
%
% START OF MODEL (DIG):
% (sK2(sK4(sK6), sK6) = sK4(sK6))
% (sK5(sK6) = sK2(sK5(sK6), sK6))
% (sK5(sK6) = sK1(sK5(sK6), sK6))
% (sK1(sK4(sK6), sK6) = sK4(sK6))
% (appear(efficient_producers, sK6) = sK2(appear(efficient_producers, sK6), sK6))
% (appear(efficient_producers, sK6) = sK1(appear(efficient_producers, sK6), sK6))
% (appear(efficient_producers, e) = sK2(appear(efficient_producers, e), sK6))
% (appear(efficient_producers, e) = sK1(appear(efficient_producers, e), sK6))
% (appear(first_movers, sK6) = sK2(appear(first_movers, sK6), sK6))
% (appear(first_movers, sK6) = sK1(appear(first_movers, sK6), sK6))
% environment(sK6)
% finite_set(first_movers)
% greater(sK4(sK6), equilibrium(sK6))
% greater(sK4(sK6), appear(efficient_producers, e))
% greater(sK4(sK6), appear(first_movers, sK6))
% greater(growth_rate(efficient_producers, sK2(sK5(sK6), sK6)), growth_rate(first_movers, sK2(sK5(sK6), sK6)))
% greater(growth_rate(efficient_producers, sK5(sK6)), growth_rate(first_movers, sK5(sK6)))
% greater(growth_rate(efficient_producers, appear(efficient_producers, sK6)), growth_rate(first_movers, appear(efficient_producers, sK6)))
% greater(sK5(sK6), sK4(sK6))
% greater(sK5(sK6), equilibrium(sK6))
% greater(sK5(sK6), appear(efficient_producers, e))
% greater(sK5(sK6), appear(first_movers, sK6))
% greater(appear(efficient_producers, e), appear(first_movers, sK6))
% greater(appear(efficient_producers, sK6), sK4(sK6))
% greater(appear(efficient_producers, sK6), equilibrium(sK6))
% greater(appear(efficient_producers, sK6), sK5(sK6))
% greater(appear(efficient_producers, sK6), appear(efficient_producers, e))
% greater(appear(efficient_producers, sK6), appear(first_movers, sK6))
% greater(cardinality_at_time(efficient_producers, appear(efficient_producers, sK6)), zero)
% greater(cardinality_at_time(first_movers, sK4(sK6)), zero)
% greater(cardinality_at_time(first_movers, sK1(sK4(sK6), sK6)), zero)
% greater(cardinality_at_time(first_movers, sK1(sK5(sK6), sK6)), zero)
% greater(cardinality_at_time(first_movers, sK1(appear(efficient_producers, sK6), sK6)), zero)
% greater(cardinality_at_time(first_movers, sK1(appear(efficient_producers, e), sK6)), zero)
% greater(cardinality_at_time(first_movers, sK1(appear(first_movers, sK6), sK6)), zero)
% greater(cardinality_at_time(first_movers, sK5(sK6)), zero)
% greater(cardinality_at_time(first_movers, appear(efficient_producers, sK6)), zero)
% greater(cardinality_at_time(first_movers, appear(efficient_producers, e)), zero)
% greater(cardinality_at_time(first_movers, appear(first_movers, sK6)), zero)
% greater_or_equal(_0, _0)
% greater_or_equal(sK4(sK6), equilibrium(sK6))
% greater_or_equal(sK4(sK6), appear(efficient_producers, e))
% greater_or_equal(sK4(sK6), appear(first_movers, sK6))
% greater_or_equal(sK2(sK4(sK6), sK6), sK4(sK6))
% greater_or_equal(sK2(sK5(sK6), sK6), sK5(sK6))
% greater_or_equal(sK2(appear(efficient_producers, sK6), sK6), appear(efficient_producers, sK6))
% greater_or_equal(sK2(appear(efficient_producers, e), sK6), appear(efficient_producers, e))
% greater_or_equal(sK2(appear(first_movers, sK6), sK6), appear(first_movers, sK6))
% greater_or_equal(growth_rate(efficient_producers, sK2(sK5(sK6), sK6)), growth_rate(first_movers, sK2(sK5(sK6), sK6)))
% greater_or_equal(growth_rate(efficient_producers, sK5(sK6)), growth_rate(first_movers, sK5(sK6)))
% greater_or_equal(growth_rate(efficient_producers, appear(efficient_producers, sK6)), growth_rate(first_movers, appear(efficient_producers, sK6)))
% greater_or_equal(sK1(sK4(sK6), sK6), sK4(sK6))
% greater_or_equal(sK1(sK5(sK6), sK6), sK5(sK6))
% greater_or_equal(sK1(appear(efficient_producers, sK6), sK6), appear(efficient_producers, sK6))
% greater_or_equal(sK1(appear(efficient_producers, e), sK6), appear(efficient_producers, e))
% greater_or_equal(sK1(appear(first_movers, sK6), sK6), appear(first_movers, sK6))
% greater_or_equal(sK5(sK6), sK4(sK6))
% greater_or_equal(sK5(sK6), equilibrium(sK6))
% greater_or_equal(sK5(sK6), appear(efficient_producers, e))
% greater_or_equal(sK5(sK6), appear(first_movers, sK6))
% greater_or_equal(appear(efficient_producers, e), appear(first_movers, sK6))
% greater_or_equal(appear(efficient_producers, sK6), sK4(sK6))
% greater_or_equal(appear(efficient_producers, sK6), equilibrium(sK6))
% greater_or_equal(appear(efficient_producers, sK6), sK5(sK6))
% greater_or_equal(appear(efficient_producers, sK6), appear(efficient_producers, e))
% greater_or_equal(appear(efficient_producers, sK6), appear(first_movers, sK6))
% greater_or_equal(cardinality_at_time(efficient_producers, appear(efficient_producers, sK6)), zero)
% greater_or_equal(cardinality_at_time(first_movers, sK4(sK6)), zero)
% greater_or_equal(cardinality_at_time(first_movers, sK1(sK4(sK6), sK6)), zero)
% greater_or_equal(cardinality_at_time(first_movers, sK1(sK5(sK6), sK6)), zero)
% greater_or_equal(cardinality_at_time(first_movers, sK1(appear(efficient_producers, sK6), sK6)), zero)
% greater_or_equal(cardinality_at_time(first_movers, sK1(appear(efficient_producers, e), sK6)), zero)
% greater_or_equal(cardinality_at_time(first_movers, sK1(appear(first_movers, sK6), sK6)), zero)
% greater_or_equal(cardinality_at_time(first_movers, sK5(sK6)), zero)
% greater_or_equal(cardinality_at_time(first_movers, appear(efficient_producers, sK6)), zero)
% greater_or_equal(cardinality_at_time(first_movers, appear(efficient_producers, e)), zero)
% greater_or_equal(cardinality_at_time(first_movers, appear(first_movers, sK6)), zero)
% in_environment(sK6, sK4(sK6))
% in_environment(sK6, sK5(sK6))
% in_environment(sK6, appear(efficient_producers, sK6))
% in_environment(sK6, appear(efficient_producers, e))
% in_environment(sK6, appear(first_movers, sK6))
% sP0(sK4(sK6), sK6)
% sP0(sK5(sK6), sK6)
% sP0(appear(efficient_producers, sK6), sK6)
% sP0(appear(efficient_producers, e), sK6)
% sP0(appear(first_movers, sK6), sK6)
% stable(sK6)
% subpopulations(first_movers, efficient_producers, sK6, sK2(sK4(sK6), sK6))
% subpopulations(first_movers, efficient_producers, sK6, sK2(sK5(sK6), sK6))
% subpopulations(first_movers, efficient_producers, sK6, sK2(appear(efficient_producers, sK6), sK6))
% subpopulations(first_movers, efficient_producers, sK6, sK2(appear(efficient_producers, e), sK6))
% subpopulations(first_movers, efficient_producers, sK6, sK2(appear(first_movers, sK6), sK6))
% subpopulations(first_movers, efficient_producers, sK6, sK4(sK6))
% subpopulations(first_movers, efficient_producers, sK6, sK5(sK6))
% subpopulations(first_movers, efficient_producers, sK6, appear(efficient_producers, sK6))
% subpopulations(first_movers, efficient_producers, sK6, appear(efficient_producers, e))
% subpopulations(first_movers, efficient_producers, sK6, appear(first_movers, sK6))
% END OF MODEL
% EOF
%------------------------------------------------------------------------------