TSTP Solution File: GRP174-1 by CiME---2.01

%------------------------------------------------------------------------------
% File     : CiME---2.01
% Problem  : GRP174-1 : TPTP v6.0.0. Bugfixed v1.2.1.
% Transfm  : none
% Format   : tptp:raw
% Command  : tptp2X_and_run_cime %s

% Computer : n078.star.cs.uiowa.edu
% Model    : x86_64 x86_64
% CPU      : Intel(R) Xeon(R) CPU E5-2609 0 2.40GHz
% Memory   : 32286.75MB
% OS       : Linux 2.6.32-431.11.2.el6.x86_64
% CPULimit : 300s
% DateTime : Tue Jun 10 00:22:31 EDT 2014

% Result   : Unsatisfiable 1.39s
% Output   : Refutation 1.39s
% Verified : 
% SZS Type : None (Parsing solution fails)
% Syntax   : Number of formulae    : 0

% Comments : 
%------------------------------------------------------------------------------
%----ERROR: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% % Problem  : GRP174-1 : TPTP v6.0.0. Bugfixed v1.2.1.
% % Command  : tptp2X_and_run_cime %s
% % Computer : n078.star.cs.uiowa.edu
% % Model    : x86_64 x86_64
% % CPU      : Intel(R) Xeon(R) CPU E5-2609 0 @ 2.40GHz
% % Memory   : 32286.75MB
% % OS       : Linux 2.6.32-431.11.2.el6.x86_64
% % CPULimit : 300
% % DateTime : Fri Jun  6 06:11:13 CDT 2014
% % CPUTime  : 1.39 
% Processing problem /tmp/CiME_26175_n078.star.cs.uiowa.edu
% #verbose 1;
% let F = signature " least_upper_bound,greatest_lower_bound : AC; a,identity : constant;  inverse : 1;  multiply : 2;";
% let X = vars "X Y Z";
% let Axioms = equations F X "
% multiply(multiply(X,Y),Z) = multiply(X,multiply(Y,Z));
% multiply(identity,X) = X;
% multiply(inverse(X),X) = identity;
% X least_upper_bound X = X;
% X greatest_lower_bound X = X;
% X least_upper_bound (X greatest_lower_bound Y) = X;
% X greatest_lower_bound (X least_upper_bound Y) = X;
% multiply(X,Y least_upper_bound Z) = multiply(X,Y) least_upper_bound multiply(X,Z);
% multiply(X,Y greatest_lower_bound Z) = multiply(X,Y) greatest_lower_bound multiply(X,Z);
% multiply(Y least_upper_bound Z,X) = multiply(Y,X) least_upper_bound multiply(Z,X);
% multiply(Y greatest_lower_bound Z,X) = multiply(Y,X) greatest_lower_bound multiply(Z,X);
% identity greatest_lower_bound a = a;
% identity greatest_lower_bound inverse(a) = inverse(a);
% ";
% 
% let s1 = status F "
% a lr_lex;
% inverse lr_lex;
% identity lr_lex;
% least_upper_bound mul;
% greatest_lower_bound mul;
% multiply mul;
% ";
% 
% let p1 = precedence F "
% multiply > inverse > greatest_lower_bound > least_upper_bound > identity > a";
% 
% let s2 = status F "
% a mul;
% least_upper_bound mul;
% greatest_lower_bound mul;
% inverse mul;
% multiply mul;
% identity mul;
% ";
% 
% let p2 = precedence F "
% multiply > inverse > greatest_lower_bound > least_upper_bound > identity = a";
% 
% let o_auto = AUTO Axioms;
% 
% let o = LEX o_auto (LEX (ACRPO s1 p1) (ACRPO s2 p2));
% 
% let Conjectures = equations F X " identity = a;"
% ;
% (*
% let Red_Axioms = normalize_equations Defining_rules Axioms;
% 
% let Red_Conjectures =  normalize_equations Defining_rules Conjectures;
% *)
% #time on;
% 
% let res = prove_conj_by_ordered_completion o Axioms Conjectures;
% 
% #time off;
% 
% 
% let status = if res then "unsatisfiable" else "satisfiable";
% #quit;
% Verbose level is now 1
% 
% F : signature = <signature>
% X : variable_set = <variable set>
% 
% Axioms : (F,X) equations = { multiply(multiply(X,Y),Z) =
% multiply(X,multiply(Y,Z)),
% multiply(identity,X) = X,
% multiply(inverse(X),X) = identity,
% X least_upper_bound X = X,
% X greatest_lower_bound X = X,
% (X greatest_lower_bound Y) least_upper_bound X =
% X,
% (X least_upper_bound Y) greatest_lower_bound X =
% X,
% multiply(X,Y least_upper_bound Z) =
% multiply(X,Y) least_upper_bound multiply(X,Z),
% multiply(X,Y greatest_lower_bound Z) =
% multiply(X,Y) greatest_lower_bound multiply(X,Z),
% multiply(Y least_upper_bound Z,X) =
% multiply(Y,X) least_upper_bound multiply(Z,X),
% multiply(Y greatest_lower_bound Z,X) =
% multiply(Y,X) greatest_lower_bound multiply(Z,X),
% a greatest_lower_bound identity = a,
% identity greatest_lower_bound inverse(a) =
% inverse(a) } (13 equation(s))
% s1 : F status = <status>
% p1 : F precedence = <precedence>
% s2 : F status = <status>
% p2 : F precedence = <precedence>
% o_auto : F term_ordering = <term ordering>
% o : F term_ordering = <term ordering>
% Conjectures : (F,X) equations = { identity = a } (1 equation(s))
% time is now on
% 
% Initializing completion ...
% New rule produced : [1] X least_upper_bound X -> X
% Current number of equations to process: 0
% Current number of ordered equations: 12
% Current number of rules: 1
% New rule produced : [2] X greatest_lower_bound X -> X
% Current number of equations to process: 0
% Current number of ordered equations: 11
% Current number of rules: 2
% New rule produced : [3] a greatest_lower_bound identity -> a
% Current number of equations to process: 0
% Current number of ordered equations: 10
% Current number of rules: 3
% New rule produced : [4] multiply(identity,X) -> X
% Current number of equations to process: 0
% Current number of ordered equations: 9
% Current number of rules: 4
% New rule produced : [5] multiply(inverse(X),X) -> identity
% Current number of equations to process: 0
% Current number of ordered equations: 8
% Current number of rules: 5
% New rule produced :
% [6] identity greatest_lower_bound inverse(a) -> inverse(a)
% Current number of equations to process: 0
% Current number of ordered equations: 7
% Current number of rules: 6
% New rule produced : [7] (X greatest_lower_bound Y) least_upper_bound X -> X
% Current number of equations to process: 0
% Current number of ordered equations: 6
% Current number of rules: 7
% New rule produced : [8] (X least_upper_bound Y) greatest_lower_bound X -> X
% Current number of equations to process: 0
% Current number of ordered equations: 5
% Current number of rules: 8
% New rule produced :
% [9] multiply(multiply(X,Y),Z) -> multiply(X,multiply(Y,Z))
% Current number of equations to process: 0
% Current number of ordered equations: 4
% Current number of rules: 9
% New rule produced :
% [10]
% multiply(X,Y least_upper_bound Z) ->
% multiply(X,Y) least_upper_bound multiply(X,Z)
% Current number of equations to process: 0
% Current number of ordered equations: 3
% Current number of rules: 10
% New rule produced :
% [11]
% multiply(X,Y greatest_lower_bound Z) ->
% multiply(X,Y) greatest_lower_bound multiply(X,Z)
% Current number of equations to process: 0
% Current number of ordered equations: 2
% Current number of rules: 11
% New rule produced :
% [12]
% multiply(Y least_upper_bound Z,X) ->
% multiply(Y,X) least_upper_bound multiply(Z,X)
% Current number of equations to process: 0
% Current number of ordered equations: 1
% Current number of rules: 12
% New rule produced :
% [13]
% multiply(Y greatest_lower_bound Z,X) ->
% multiply(Y,X) greatest_lower_bound multiply(Z,X)
% Current number of equations to process: 0
% Current number of ordered equations: 0
% Current number of rules: 13
% New rule produced : [14] a least_upper_bound identity -> identity
% Current number of equations to process: 18
% Current number of ordered equations: 0
% Current number of rules: 14
% New rule produced : [15] identity least_upper_bound inverse(a) -> identity
% Current number of equations to process: 25
% Current number of ordered equations: 0
% Current number of rules: 15
% New rule produced :
% [16] (a greatest_lower_bound X) least_upper_bound identity -> identity
% Current number of equations to process: 67
% Current number of ordered equations: 0
% Current number of rules: 16
% New rule produced :
% [17] (identity least_upper_bound X) greatest_lower_bound a -> a
% Current number of equations to process: 66
% Current number of ordered equations: 0
% Current number of rules: 17
% New rule produced :
% [18]
% (inverse(a) greatest_lower_bound X) least_upper_bound identity -> identity
% Current number of equations to process: 64
% Current number of ordered equations: 0
% Current number of rules: 18
% New rule produced :
% [19]
% (identity least_upper_bound X) greatest_lower_bound inverse(a) -> inverse(a)
% Current number of equations to process: 63
% Current number of ordered equations: 0
% Current number of rules: 19
% New rule produced : [20] multiply(inverse(Y),multiply(Y,X)) -> X
% Current number of equations to process: 63
% Current number of ordered equations: 0
% Current number of rules: 20
% New rule produced :
% [21]
% (a greatest_lower_bound X) least_upper_bound (identity greatest_lower_bound X)
% -> identity greatest_lower_bound X
% Current number of equations to process: 60
% Current number of ordered equations: 0
% Current number of rules: 21
% New rule produced :
% [22] multiply(X,a) greatest_lower_bound multiply(X,identity) -> multiply(X,a)
% Current number of equations to process: 66
% Current number of ordered equations: 0
% Current number of rules: 22
% New rule produced :
% [23] multiply(a,X) greatest_lower_bound X -> multiply(a,X)
% Current number of equations to process: 69
% Current number of ordered equations: 0
% Current number of rules: 23
% New rule produced :
% [24] multiply(inverse(a),X) greatest_lower_bound X -> multiply(inverse(a),X)
% Current number of equations to process: 71
% Current number of ordered equations: 0
% Current number of rules: 24
% New rule produced : [25] multiply(a,X) least_upper_bound X -> X
% Current number of equations to process: 83
% Current number of ordered equations: 0
% Current number of rules: 25
% New rule produced : [26] multiply(inverse(a),X) least_upper_bound X -> X
% Current number of equations to process: 94
% Current number of ordered equations: 0
% Current number of rules: 26
% New rule produced : [27] multiply(inverse(identity),X) -> X
% Current number of equations to process: 143
% Current number of ordered equations: 0
% Current number of rules: 27
% New rule produced : [28] multiply(inverse(inverse(X)),identity) -> X
% Current number of equations to process: 143
% Current number of ordered equations: 0
% Current number of rules: 28
% New rule produced : [29] multiply(inverse(inverse(X)),Y) -> multiply(X,Y)
% Rule [28] multiply(inverse(inverse(X)),identity) -> X collapsed.
% Current number of equations to process: 143
% Current number of ordered equations: 0
% Current number of rules: 28
% New rule produced : [30] multiply(X,identity) -> X
% Rule
% [22] multiply(X,a) greatest_lower_bound multiply(X,identity) -> multiply(X,a)
% collapsed.
% Current number of equations to process: 143
% Current number of ordered equations: 0
% Current number of rules: 28
% New rule produced :
% [31] multiply(X,a) greatest_lower_bound X -> multiply(X,a)
% Current number of equations to process: 142
% Current number of ordered equations: 0
% Current number of rules: 29
% New rule produced :
% [32]
% (a least_upper_bound X) greatest_lower_bound (identity least_upper_bound X)
% -> a least_upper_bound X
% Current number of equations to process: 168
% Current number of ordered equations: 0
% Current number of rules: 30
% New rule produced : [33] multiply(X,a) least_upper_bound X -> X
% Current number of equations to process: 167
% Current number of ordered equations: 0
% Current number of rules: 31
% New rule produced :
% [34] identity greatest_lower_bound multiply(a,a) -> multiply(a,a)
% Current number of equations to process: 186
% Current number of ordered equations: 0
% Current number of rules: 32
% New rule produced :
% [35] (multiply(a,X) greatest_lower_bound Y) least_upper_bound X -> X
% Current number of equations to process: 185
% Current number of ordered equations: 0
% Current number of rules: 33
% New rule produced : [36] identity least_upper_bound multiply(a,a) -> identity
% Current number of equations to process: 193
% Current number of ordered equations: 0
% Current number of rules: 34
% New rule produced :
% [37] identity least_upper_bound multiply(a,inverse(a)) -> identity
% Current number of equations to process: 198
% Current number of ordered equations: 0
% Current number of rules: 35
% New rule produced : [38] a -> identity
% Rule [3] a greatest_lower_bound identity -> a collapsed.
% Rule [6] identity greatest_lower_bound inverse(a) -> inverse(a) collapsed.
% Rule [14] a least_upper_bound identity -> identity collapsed.
% Rule [15] identity least_upper_bound inverse(a) -> identity collapsed.
% Rule [16] (a greatest_lower_bound X) least_upper_bound identity -> identity
% collapsed.
% Rule [17] (identity least_upper_bound X) greatest_lower_bound a -> a
% collapsed.
% Rule
% [18]
% (inverse(a) greatest_lower_bound X) least_upper_bound identity -> identity
% collapsed.
% Rule
% [19]
% (identity least_upper_bound X) greatest_lower_bound inverse(a) -> inverse(a)
% collapsed.
% Rule
% [21]
% (a greatest_lower_bound X) least_upper_bound (identity greatest_lower_bound X)
% -> identity greatest_lower_bound X collapsed.
% Rule [23] multiply(a,X) greatest_lower_bound X -> multiply(a,X) collapsed.
% Rule
% [24] multiply(inverse(a),X) greatest_lower_bound X -> multiply(inverse(a),X)
% collapsed.
% Rule [25] multiply(a,X) least_upper_bound X -> X collapsed.
% Rule [26] multiply(inverse(a),X) least_upper_bound X -> X collapsed.
% Rule [31] multiply(X,a) greatest_lower_bound X -> multiply(X,a) collapsed.
% Rule
% [32]
% (a least_upper_bound X) greatest_lower_bound (identity least_upper_bound X)
% -> a least_upper_bound X collapsed.
% Rule [33] multiply(X,a) least_upper_bound X -> X collapsed.
% Rule [34] identity greatest_lower_bound multiply(a,a) -> multiply(a,a)
% collapsed.
% Rule [35] (multiply(a,X) greatest_lower_bound Y) least_upper_bound X -> X
% collapsed.
% Rule [36] identity least_upper_bound multiply(a,a) -> identity collapsed.
% Rule [37] identity least_upper_bound multiply(a,inverse(a)) -> identity
% collapsed.
% The conjecture has been reduced. 
% Conjecture is now:
% Trivial
% 
% Current number of equations to process: 207
% Current number of ordered equations: 0
% Current number of rules: 16
% The current conjecture is true and the solution is the identity
% % SZS output start Refutation
% 
% The following 5 rules have been used:
% [5] 
% multiply(inverse(X),X) -> identity; trace = in the starting set
% [6] identity greatest_lower_bound inverse(a) -> inverse(a); trace = in the starting set
% [13] multiply(Y greatest_lower_bound Z,X) ->
% multiply(Y,X) greatest_lower_bound multiply(Z,X); trace = in the starting set
% [24] multiply(inverse(a),X) greatest_lower_bound X -> multiply(inverse(a),X); trace = Cp of 13 and 6
% [38] a -> identity; trace = Cp of 24 and 5
% % SZS output end Refutation
% All conjectures have been proven
% 
% Execution time: 0.270000 sec
% res : bool = true
% time is now off
% 
% status : string = "unsatisfiable"
% % SZS status Unsatisfiable
% CiME interrupted
% 
% EOF
%------------------------------------------------------------------------------