TSTP Solution File: RNG023-7 by Moca---0.1

%------------------------------------------------------------------------------
% File     : Moca---0.1
% Problem  : RNG023-7 : TPTP v8.1.0. Released v1.0.0.
% Transfm  : none
% Format   : tptp:raw
% Command  : moca.sh %s

% Computer : n029.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 20:36:19 EDT 2022

% Result   : Unsatisfiable 18.65s 18.63s
% Output   : Proof 18.65s
% Verified : 
% SZS Type : -

% Comments : 
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.06/0.11  % Problem  : RNG023-7 : TPTP v8.1.0. Released v1.0.0.
% 0.06/0.12  % Command  : moca.sh %s
% 0.12/0.33  % Computer : n029.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 : Mon May 30 22:32:44 EDT 2022
% 0.12/0.33  % CPUTime  : 
% 18.65/18.63  % SZS status Unsatisfiable
% 18.65/18.63  % SZS output start Proof
% 18.65/18.63  The input problem is unsatisfiable because
% 18.65/18.63  
% 18.65/18.63  [1] the following set of Horn clauses is unsatisfiable:
% 18.65/18.63  
% 18.65/18.63  	add(additive_identity, X) = X
% 18.65/18.63  	add(X, additive_identity) = X
% 18.65/18.63  	multiply(additive_identity, X) = additive_identity
% 18.65/18.63  	multiply(X, additive_identity) = additive_identity
% 18.65/18.63  	add(additive_inverse(X), X) = additive_identity
% 18.65/18.63  	add(X, additive_inverse(X)) = additive_identity
% 18.65/18.63  	additive_inverse(additive_inverse(X)) = X
% 18.65/18.63  	multiply(X, add(Y, Z)) = add(multiply(X, Y), multiply(X, Z))
% 18.65/18.63  	multiply(add(X, Y), Z) = add(multiply(X, Z), multiply(Y, Z))
% 18.65/18.63  	add(X, Y) = add(Y, X)
% 18.65/18.63  	add(X, add(Y, Z)) = add(add(X, Y), Z)
% 18.65/18.63  	multiply(multiply(X, Y), Y) = multiply(X, multiply(Y, Y))
% 18.65/18.63  	multiply(multiply(X, X), Y) = multiply(X, multiply(X, Y))
% 18.65/18.63  	associator(X, Y, Z) = add(multiply(multiply(X, Y), Z), additive_inverse(multiply(X, multiply(Y, Z))))
% 18.65/18.63  	commutator(X, Y) = add(multiply(Y, X), additive_inverse(multiply(X, Y)))
% 18.65/18.63  	multiply(additive_inverse(X), additive_inverse(Y)) = multiply(X, Y)
% 18.65/18.63  	multiply(additive_inverse(X), Y) = additive_inverse(multiply(X, Y))
% 18.65/18.63  	multiply(X, additive_inverse(Y)) = additive_inverse(multiply(X, Y))
% 18.65/18.63  	multiply(X, add(Y, additive_inverse(Z))) = add(multiply(X, Y), additive_inverse(multiply(X, Z)))
% 18.65/18.63  	multiply(add(X, additive_inverse(Y)), Z) = add(multiply(X, Z), additive_inverse(multiply(Y, Z)))
% 18.65/18.63  	multiply(additive_inverse(X), add(Y, Z)) = add(additive_inverse(multiply(X, Y)), additive_inverse(multiply(X, Z)))
% 18.65/18.63  	multiply(add(X, Y), additive_inverse(Z)) = add(additive_inverse(multiply(X, Z)), additive_inverse(multiply(Y, Z)))
% 18.65/18.63  	associator(x, x, y) = additive_identity ==> \bottom
% 18.65/18.63  
% 18.65/18.63  This holds because
% 18.65/18.63  
% 18.65/18.63  [2] the following E entails the following G (Claessen-Smallbone's transformation (2018)):
% 18.65/18.63  
% 18.65/18.63  E:
% 18.65/18.63  	add(X, Y) = add(Y, X)
% 18.65/18.63  	add(X, add(Y, Z)) = add(add(X, Y), Z)
% 18.65/18.63  	add(X, additive_identity) = X
% 18.65/18.63  	add(X, additive_inverse(X)) = additive_identity
% 18.65/18.63  	add(additive_identity, X) = X
% 18.65/18.63  	add(additive_inverse(X), X) = additive_identity
% 18.65/18.63  	additive_inverse(additive_inverse(X)) = X
% 18.65/18.63  	associator(X, Y, Z) = add(multiply(multiply(X, Y), Z), additive_inverse(multiply(X, multiply(Y, Z))))
% 18.65/18.63  	commutator(X, Y) = add(multiply(Y, X), additive_inverse(multiply(X, Y)))
% 18.65/18.63  	f1(additive_identity) = false__
% 18.65/18.63  	f1(associator(x, x, y)) = true__
% 18.65/18.63  	multiply(X, add(Y, Z)) = add(multiply(X, Y), multiply(X, Z))
% 18.65/18.63  	multiply(X, add(Y, additive_inverse(Z))) = add(multiply(X, Y), additive_inverse(multiply(X, Z)))
% 18.65/18.63  	multiply(X, additive_identity) = additive_identity
% 18.65/18.63  	multiply(X, additive_inverse(Y)) = additive_inverse(multiply(X, Y))
% 18.65/18.63  	multiply(add(X, Y), Z) = add(multiply(X, Z), multiply(Y, Z))
% 18.65/18.63  	multiply(add(X, Y), additive_inverse(Z)) = add(additive_inverse(multiply(X, Z)), additive_inverse(multiply(Y, Z)))
% 18.65/18.63  	multiply(add(X, additive_inverse(Y)), Z) = add(multiply(X, Z), additive_inverse(multiply(Y, Z)))
% 18.65/18.63  	multiply(additive_identity, X) = additive_identity
% 18.65/18.63  	multiply(additive_inverse(X), Y) = additive_inverse(multiply(X, Y))
% 18.65/18.63  	multiply(additive_inverse(X), add(Y, Z)) = add(additive_inverse(multiply(X, Y)), additive_inverse(multiply(X, Z)))
% 18.65/18.63  	multiply(additive_inverse(X), additive_inverse(Y)) = multiply(X, Y)
% 18.65/18.63  	multiply(multiply(X, X), Y) = multiply(X, multiply(X, Y))
% 18.65/18.63  	multiply(multiply(X, Y), Y) = multiply(X, multiply(Y, Y))
% 18.65/18.63  G:
% 18.65/18.63  	true__ = false__
% 18.65/18.63  
% 18.65/18.63  This holds because
% 18.65/18.63  
% 18.65/18.63  [3] E entails the following ordered TRS and the lhs and rhs of G join by the TRS:
% 18.65/18.63  
% 18.65/18.63  	add(X, Y) = add(Y, X)
% 18.65/18.63  	add(Y0, add(Y2, additive_inverse(X0))) = add(additive_inverse(X0), add(Y2, Y0))
% 18.65/18.63  	add(Y0, add(additive_inverse(X1), Y1)) = add(Y1, add(additive_inverse(X1), Y0))
% 18.65/18.63  	add(Y0, add(additive_inverse(X1), additive_inverse(X0))) = add(additive_inverse(X0), add(additive_inverse(X1), Y0))
% 18.65/18.63  	add(Y0, additive_inverse(X1)) = add(additive_inverse(X1), Y0)
% 18.65/18.63  	add(Y1, add(Y0, Y2)) = add(Y0, add(Y1, Y2))
% 18.65/18.63  	add(Y2, add(Y0, Y1)) = add(Y0, add(Y1, Y2))
% 18.65/18.63  	add(X, additive_identity) -> X
% 18.65/18.63  	add(X, additive_inverse(X)) -> additive_identity
% 18.65/18.63  	add(X0, add(X1, add(Y1, add(Y2, add(additive_inverse(X0), additive_inverse(X1)))))) -> add(Y1, Y2)
% 18.65/18.63  	add(X0, add(X1, add(Y1, add(Y2, add(additive_inverse(X1), additive_inverse(X0)))))) -> add(Y1, Y2)
% 18.65/18.63  	add(X0, add(additive_inverse(X0), Y1)) -> Y1
% 18.65/18.63  	add(Y0, add(X1, add(X2, additive_inverse(Y0)))) -> add(X1, X2)
% 18.65/18.63  	add(Y0, add(X1, add(additive_inverse(Y0), Y2))) -> add(X1, Y2)
% 18.65/18.63  	add(Y0, add(Y1, additive_inverse(Y0))) -> Y1
% 18.65/18.63  	add(add(X, Y), Z) -> add(X, add(Y, Z))
% 18.65/18.63  	add(additive_identity, X) -> X
% 18.65/18.63  	add(additive_inverse(X), X) -> additive_identity
% 18.65/18.63  	add(additive_inverse(X0), add(Y1, X0)) -> Y1
% 18.65/18.63  	add(additive_inverse(Y1), add(Y1, Y2)) -> Y2
% 18.65/18.63  	additive_inverse(add(X0, X1)) -> add(additive_inverse(X0), additive_inverse(X1))
% 18.65/18.63  	additive_inverse(add(X1, X0)) -> add(additive_inverse(X0), additive_inverse(X1))
% 18.65/18.63  	additive_inverse(add(additive_inverse(Y0), X1)) -> add(Y0, additive_inverse(X1))
% 18.65/18.63  	additive_inverse(additive_identity) -> additive_identity
% 18.65/18.63  	additive_inverse(additive_inverse(X)) -> X
% 18.65/18.63  	associator(X, Y, Z) -> add(multiply(multiply(X, Y), Z), additive_inverse(multiply(X, multiply(Y, Z))))
% 18.65/18.63  	commutator(X, Y) -> add(multiply(Y, X), additive_inverse(multiply(X, Y)))
% 18.65/18.63  	f1(additive_identity) -> false__
% 18.65/18.63  	f1(associator(x, x, y)) -> true__
% 18.65/18.63  	multiply(X, add(Y, Z)) -> add(multiply(X, Y), multiply(X, Z))
% 18.65/18.63  	multiply(X, additive_identity) -> additive_identity
% 18.65/18.63  	multiply(X, additive_inverse(Y)) -> additive_inverse(multiply(X, Y))
% 18.65/18.63  	multiply(add(X, Y), Z) -> add(multiply(X, Z), multiply(Y, Z))
% 18.65/18.63  	multiply(add(X, Y), additive_inverse(Z)) -> add(additive_inverse(multiply(X, Z)), additive_inverse(multiply(Y, Z)))
% 18.65/18.63  	multiply(additive_identity, X) -> additive_identity
% 18.65/18.63  	multiply(additive_inverse(X), Y) -> additive_inverse(multiply(X, Y))
% 18.65/18.63  	multiply(additive_inverse(X), add(Y, Z)) -> add(additive_inverse(multiply(X, Y)), additive_inverse(multiply(X, Z)))
% 18.65/18.63  	multiply(multiply(X, X), Y) -> multiply(X, multiply(X, Y))
% 18.65/18.63  	multiply(multiply(X, Y), Y) -> multiply(X, multiply(Y, Y))
% 18.65/18.63  	multiply(multiply(X0, multiply(Y1, Y1)), Y1) -> multiply(multiply(X0, Y1), multiply(Y1, Y1))
% 18.65/18.63  	true__ -> false__
% 18.65/18.63  with the LPO induced by
% 18.65/18.63  	associator > commutator > multiply > additive_inverse > add > y > x > additive_identity > f1 > true__ > false__
% 18.65/18.63  
% 18.65/18.63  % SZS output end Proof
% 18.65/18.63  
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