TSTP Solution File: ANA009-2 by Moca---0.1

View Problem - Process Solution 
%------------------------------------------------------------------------------
% File     : Moca---0.1
% Problem  : ANA009-2 : TPTP v8.1.0. Released v3.2.0.
% Transfm  : none
% Format   : tptp:raw
% Command  : moca.sh %s

% Computer : n011.cluster.edu
% Model    : x86_64 x86_64
% CPU      : Intel(R) Xeon(R) CPU E5-2620 v4 2.10GHz
% Memory   : 8042.1875MB
% OS       : Linux 3.10.0-693.el7.x86_64
% CPULimit : 300s
% WCLimit  : 600s
% DateTime : Thu Jul 14 19:15:30 EDT 2022

% Result   : Unsatisfiable 1.35s 1.50s
% Output   : Proof 1.35s
% Verified : 
% SZS Type : -

% Comments : 
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%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.00/0.12  % Problem  : ANA009-2 : TPTP v8.1.0. Released v3.2.0.
% 0.12/0.12  % Command  : moca.sh %s
% 0.12/0.33  % Computer : n011.cluster.edu
% 0.12/0.33  % Model    : x86_64 x86_64
% 0.12/0.33  % CPU      : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.12/0.33  % Memory   : 8042.1875MB
% 0.12/0.33  % OS       : Linux 3.10.0-693.el7.x86_64
% 0.12/0.33  % CPULimit : 300
% 0.12/0.33  % WCLimit  : 600
% 0.12/0.33  % DateTime : Fri Jul  8 04:13:09 EDT 2022
% 0.19/0.33  % CPUTime  : 
% 1.35/1.50  % SZS status Unsatisfiable
% 1.35/1.50  % SZS output start Proof
% 1.35/1.50  The input problem is unsatisfiable because
% 1.35/1.50  
% 1.35/1.50  [1] the following set of Horn clauses is unsatisfiable:
% 1.35/1.50  
% 1.35/1.50  	class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a) & c_lessequals(V_a, V_b, T_a) ==> c_lessequals(c_plus(V_a, V_c, T_a), c_plus(V_b, V_c, T_a), T_a)
% 1.35/1.50  	class_OrderedGroup_Oab__group__add(T_a) ==> c_plus(V_a, c_uminus(V_a, T_a), T_a) = c_0
% 1.35/1.50  	c_lessequals(v_lb(V_U), v_f(V_U), t_b)
% 1.35/1.50  	c_lessequals(c_0, c_plus(v_f(v_x), c_uminus(v_lb(v_x), t_b), t_b), t_b) ==> \bottom
% 1.35/1.50  	class_Ring__and__Field_Oordered__idom(T) ==> class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T)
% 1.35/1.50  	class_Ring__and__Field_Oordered__idom(T) ==> class_OrderedGroup_Oab__group__add(T)
% 1.35/1.50  	class_Ring__and__Field_Oordered__idom(t_b)
% 1.35/1.50  
% 1.35/1.50  This holds because
% 1.35/1.50  
% 1.35/1.50  [2] the following E entails the following G (Claessen-Smallbone's transformation (2018)):
% 1.35/1.50  
% 1.35/1.50  E:
% 1.35/1.50  	c_lessequals(v_lb(V_U), v_f(V_U), t_b) = true__
% 1.35/1.50  	class_Ring__and__Field_Oordered__idom(t_b) = true__
% 1.35/1.50  	f1(true__, V_a, V_c, T_a, V_b) = c_lessequals(c_plus(V_a, V_c, T_a), c_plus(V_b, V_c, T_a), T_a)
% 1.35/1.50  	f2(c_lessequals(V_a, V_b, T_a), T_a, V_a, V_c, V_b) = true__
% 1.35/1.50  	f2(true__, T_a, V_a, V_c, V_b) = f1(class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a), V_a, V_c, T_a, V_b)
% 1.35/1.50  	f3(class_OrderedGroup_Oab__group__add(T_a), V_a, T_a) = c_0
% 1.35/1.50  	f3(true__, V_a, T_a) = c_plus(V_a, c_uminus(V_a, T_a), T_a)
% 1.35/1.50  	f4(c_lessequals(c_0, c_plus(v_f(v_x), c_uminus(v_lb(v_x), t_b), t_b), t_b)) = true__
% 1.35/1.50  	f4(true__) = false__
% 1.35/1.50  	f5(class_Ring__and__Field_Oordered__idom(T), T) = true__
% 1.35/1.50  	f5(true__, T) = class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T)
% 1.35/1.50  	f6(class_Ring__and__Field_Oordered__idom(T), T) = true__
% 1.35/1.50  	f6(true__, T) = class_OrderedGroup_Oab__group__add(T)
% 1.35/1.50  G:
% 1.35/1.50  	true__ = false__
% 1.35/1.50  
% 1.35/1.50  This holds because
% 1.35/1.50  
% 1.35/1.50  [3] E entails the following ordered TRS and the lhs and rhs of G join by the TRS:
% 1.35/1.50  
% 1.35/1.50  
% 1.35/1.50  	c_lessequals(c_0, c_plus(Y2, c_uminus(Y0, t_b), t_b), t_b) -> f1(true__, Y0, c_uminus(Y0, t_b), t_b, Y2)
% 1.35/1.50  	c_lessequals(c_plus(V_a, V_c, T_a), c_plus(V_b, V_c, T_a), T_a) -> f1(true__, V_a, V_c, T_a, V_b)
% 1.35/1.50  	c_lessequals(c_plus(Y0, c_uminus(Y1, t_b), t_b), c_0, t_b) -> f1(true__, Y0, c_uminus(Y1, t_b), t_b, Y1)
% 1.35/1.50  	c_lessequals(c_plus(Y0, c_uminus(Y3, Y2), Y2), f3(true__, Y3, Y2), Y2) -> f1(true__, Y0, c_uminus(Y3, Y2), Y2, Y3)
% 1.35/1.50  	c_lessequals(f3(true__, Y0, Y2), c_plus(Y3, c_uminus(Y0, Y2), Y2), Y2) -> f1(true__, Y0, c_uminus(Y0, Y2), Y2, Y3)
% 1.35/1.50  	c_lessequals(v_lb(V_U), v_f(V_U), t_b) -> true__
% 1.35/1.50  	c_plus(V_a, c_uminus(V_a, T_a), T_a) -> f3(true__, V_a, T_a)
% 1.35/1.50  	class_OrderedGroup_Oab__group__add(T) -> f6(true__, T)
% 1.35/1.50  	class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T) -> f5(true__, T)
% 1.35/1.50  	class_Ring__and__Field_Oordered__idom(t_b) -> true__
% 1.35/1.50  	f1(f5(true__, t_b), v_lb(X0), Y3, t_b, v_f(X0)) -> true__
% 1.35/1.50  	f1(true__, Y0, c_uminus(Y0, Y1), Y1, Y0) -> c_lessequals(f3(true__, Y0, Y1), f3(true__, Y0, Y1), Y1)
% 1.35/1.50  	f1(true__, c_0, Y2, t_b, c_plus(c_0, c_uminus(c_plus(v_lb(X0), c_uminus(v_f(X0), t_b), t_b), t_b), t_b)) -> true__
% 1.35/1.50  	f1(true__, c_0, Y2, t_b, c_plus(c_plus(v_f(X1), c_uminus(v_lb(X1), t_b), t_b), c_uminus(c_0, t_b), t_b)) -> true__
% 1.35/1.50  	f1(true__, c_0, Y3, t_b, c_plus(v_f(X0), c_uminus(v_lb(X0), t_b), t_b)) -> true__
% 1.35/1.50  	f1(true__, c_plus(c_0, Y1, t_b), Y4, t_b, c_plus(c_plus(v_f(X1), c_uminus(v_lb(X1), t_b), t_b), Y1, t_b)) -> true__
% 1.35/1.50  	f1(true__, c_plus(c_0, c_uminus(c_plus(v_f(X1), c_uminus(v_lb(X1), t_b), t_b), t_b), t_b), Y2, t_b, c_0) -> true__
% 1.35/1.50  	f1(true__, c_plus(c_plus(v_lb(X0), X1, t_b), Y1, t_b), Y4, t_b, c_plus(c_plus(v_f(X0), X1, t_b), Y1, t_b)) -> true__
% 1.35/1.50  	f1(true__, c_plus(c_plus(v_lb(X0), c_uminus(v_f(X0), t_b), t_b), Y1, t_b), Y4, t_b, c_plus(c_0, Y1, t_b)) -> true__
% 1.35/1.50  	f1(true__, c_plus(v_lb(X0), Y1, t_b), Y4, t_b, c_plus(v_f(X0), Y1, t_b)) -> true__
% 1.35/1.50  	f1(true__, c_plus(v_lb(X0), c_uminus(v_f(X0), t_b), t_b), Y3, t_b, c_0) -> true__
% 1.35/1.50  	f1(true__, v_lb(Y0), Y1, t_b, v_f(Y0)) -> true__
% 1.35/1.50  	f2(c_lessequals(V_a, V_b, T_a), T_a, V_a, V_c, V_b) -> true__
% 1.35/1.50  	f2(f1(true__, X0, X1, Y2, X3), Y2, c_plus(X0, X1, Y2), Y3, c_plus(X3, X1, Y2)) -> true__
% 1.35/1.50  	f2(f1(true__, Y0, c_uminus(Y0, Y2), Y2, Y3), Y2, f3(true__, Y0, Y2), Y4, c_plus(Y3, c_uminus(Y0, Y2), Y2)) -> true__
% 1.35/1.50  	f2(f1(true__, Y0, c_uminus(Y0, t_b), t_b, Y2), t_b, c_0, Y3, c_plus(Y2, c_uminus(Y0, t_b), t_b)) -> true__
% 1.35/1.50  	f2(f1(true__, Y0, c_uminus(Y1, t_b), t_b, Y1), t_b, c_plus(Y0, c_uminus(Y1, t_b), t_b), Y3, c_0) -> true__
% 1.35/1.50  	f2(f1(true__, Y0, c_uminus(Y3, Y2), Y2, Y3), Y2, c_plus(Y0, c_uminus(Y3, Y2), Y2), Y4, f3(true__, Y3, Y2)) -> true__
% 1.35/1.50  	f2(true__, T_a, V_a, V_c, V_b) -> f1(class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a), V_a, V_c, T_a, V_b)
% 1.35/1.50  	f3(class_OrderedGroup_Oab__group__add(T_a), V_a, T_a) -> c_0
% 1.35/1.50  	f3(f6(true__, Y0), Y1, Y0) -> c_0
% 1.35/1.50  	f3(true__, Y1, t_b) -> c_0
% 1.35/1.50  	f4(c_lessequals(c_0, c_plus(v_f(v_x), c_uminus(v_lb(v_x), t_b), t_b), t_b)) -> true__
% 1.35/1.50  	f4(true__) -> false__
% 1.35/1.50  	f5(class_Ring__and__Field_Oordered__idom(T), T) -> true__
% 1.35/1.50  	f5(true__, t_b) -> true__
% 1.35/1.50  	f6(class_Ring__and__Field_Oordered__idom(T), T) -> true__
% 1.35/1.50  	f6(true__, t_b) -> true__
% 1.35/1.50  	false__ -> true__
% 1.35/1.50  with the LPO induced by
% 1.35/1.50  	c_uminus > f3 > c_0 > v_lb > f2 > c_lessequals > f1 > class_OrderedGroup_Opordered__ab__semigroup__add__imp__le > f5 > class_OrderedGroup_Oab__group__add > f6 > class_Ring__and__Field_Oordered__idom > v_x > f4 > t_b > v_f > c_plus > false__ > true__
% 1.35/1.50  
% 1.35/1.50  % SZS output end Proof
% 1.35/1.50  
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