0.00/0.01	% File    : /export/starexec/sandbox2/benchmark/theBenchmark.p
0.00/0.01	% app-encoded or not : original
0.00/0.01	% Variant    : fo
0.00/0.01	% Ordering    : kbo
0.00/0.01	% Command    : 
0.00/0.01	#!/bin/sh
0.00/0.01	
0.00/0.01	./zipperposition.native ${1:+"$1"} \
0.00/0.01	  -i tptp \
0.00/0.01	  -o tptp \
0.00/0.01	  --timeout "$STAREXEC_WALLCLOCK_LIMIT" \
0.00/0.01	  --mem-limit "$STAREXEC_MAX_MEM" \
0.00/0.01	  --no-ho \
0.00/0.01	  --no-avatar \
0.00/0.01	  --no-induction \
0.00/0.01	  --no-unif-pattern \
0.00/0.01	  --ord $2 \
0.00/0.01	  --simultaneous-sup false \
0.00/0.01	  --no-max-vars \
0.00/0.01	  --no-fool
0.00/0.20	% Computer   : n149.star.cs.uiowa.edu
0.00/0.20	% Model      : x86_64 x86_64
0.00/0.20	% CPU        : Intel(R) Xeon(R) CPU E5-2609 0 @ 2.40GHz
0.00/0.20	% Memory     : 32218.625MB
0.00/0.20	% OS         : Linux 3.10.0-693.2.2.el7.x86_64
0.00/0.20	% CPULimit   : 300
0.00/0.20	% DateTime   : Fri Feb  2 14:29:40 CST 2018
1.58/1.78	% done 1074 iterations in 1.574s
1.58/1.78	% SZS status Theorem for '/export/starexec/sandbox2/benchmark/theBenchmark.p'
1.58/1.78	% SZS output start Refutation
1.58/1.78	tff(fact_26_comm__semiring__1__class_Onormalizing__semiring__rules_I19_J, axiom,
1.58/1.78	  (![A:$tType]:
1.58/1.78	     (comm_semiring_1(A) =>
1.58/1.78	      (![Ry:A,Rx:A,Lx:A]:
1.58/1.78	         (times_times(A,Lx,times_times(A,Rx,Ry)) =
1.58/1.78	          times_times(A,Rx,times_times(A,Lx,Ry))))))).
1.58/1.78	tff('0', plain,
1.58/1.78	    ![X72 : $tType, X73 : X72, X74 : X72, X75 : X72]:
1.58/1.78	      (times_times(X72, X74, times_times(X72, X73, X75))
1.58/1.78	        = times_times(X72, X73, times_times(X72, X74, X75))
1.58/1.78	       | ~ comm_semiring_1(X72)),
1.58/1.78	    inference('cnf', [status(esa)],
1.58/1.78	              [fact_26_comm__semiring__1__class_Onormalizing__semiring__rules_I19_J])).
1.58/1.78	tff(conj_0, conjecture,
1.58/1.78	  (power_power(complex,
1.58/1.78	               fFT_Mirabelle_root(times_times(nat,
1.58/1.78	                                              number_number_of(nat,
1.58/1.78	                                                               bit0(bit1(pls))),
1.58/1.78	                                              m)),
1.58/1.78	               times_times(nat,i,
1.58/1.78	                           times_times(nat,
1.58/1.78	                                       number_number_of(nat,bit0(bit1(pls))),
1.58/1.78	                                       j))) =
1.58/1.78	   power_power(complex,
1.58/1.78	               fFT_Mirabelle_root(times_times(nat,
1.58/1.78	                                              number_number_of(nat,
1.58/1.78	                                                               bit0(bit1(pls))),
1.58/1.78	                                              m)),
1.58/1.78	               times_times(nat,number_number_of(nat,bit0(bit1(pls))),
1.58/1.78	                           times_times(nat,i,j))))).
1.58/1.78	tff(zf_stmt_0, negated_conjecture,
1.58/1.78	  (power_power(complex,
1.58/1.78	               fFT_Mirabelle_root(times_times(nat,
1.58/1.78	                                              number_number_of(nat,
1.58/1.78	                                                               bit0(bit1(pls))),
1.58/1.78	                                              m)),
1.58/1.78	               times_times(nat,i,
1.58/1.78	                           times_times(nat,
1.58/1.78	                                       number_number_of(nat,bit0(bit1(pls))),
1.58/1.78	                                       j))) !=
1.58/1.78	   power_power(complex,
1.58/1.78	               fFT_Mirabelle_root(times_times(nat,
1.58/1.79	                                              number_number_of(nat,
1.58/1.79	                                                               bit0(bit1(pls))),
1.58/1.79	                                              m)),
1.58/1.79	               times_times(nat,number_number_of(nat,bit0(bit1(pls))),
1.58/1.79	                           times_times(nat,i,j))))).
1.58/1.79	tff('1', plain,
1.58/1.79	    power_power(complex, 
1.58/1.79	      fFT_Mirabelle_root(
1.58/1.79	        times_times(nat, number_number_of(nat, bit0(bit1(pls))), m)), 
1.58/1.79	      times_times(nat, i, 
1.58/1.79	        times_times(nat, number_number_of(nat, bit0(bit1(pls))), j)))
1.58/1.79	     != power_power(complex, 
1.58/1.79	          fFT_Mirabelle_root(
1.58/1.79	            times_times(nat, number_number_of(nat, bit0(bit1(pls))), m)), 
1.58/1.79	          times_times(nat, number_number_of(nat, bit0(bit1(pls))), 
1.58/1.79	            times_times(nat, i, j))),
1.58/1.79	    inference('cnf', [status(esa)], [zf_stmt_0])).
1.58/1.79	tff('2', plain,
1.58/1.79	    (power_power(complex, 
1.58/1.79	       fFT_Mirabelle_root(
1.58/1.79	         times_times(nat, number_number_of(nat, bit0(bit1(pls))), m)), 
1.58/1.79	       times_times(nat, i, 
1.58/1.79	         times_times(nat, number_number_of(nat, bit0(bit1(pls))), j)))
1.58/1.79	      != power_power(complex, 
1.58/1.79	           fFT_Mirabelle_root(
1.58/1.79	             times_times(nat, number_number_of(nat, bit0(bit1(pls))), m)), 
1.58/1.79	           times_times(nat, i, 
1.58/1.79	             times_times(nat, number_number_of(nat, bit0(bit1(pls))), j)))
1.58/1.79	     | ~ comm_semiring_1(nat)),
1.58/1.79	    inference('sup-', [status(thm)], ['0', '1'])).
1.58/1.79	tff(arity_Nat_Onat___Rings_Ocomm__semiring__1, axiom, (comm_semiring_1(nat))).
1.58/1.79	tff('3', plain, comm_semiring_1(nat),
1.58/1.79	    inference('cnf', [status(esa)],
1.58/1.79	              [arity_Nat_Onat___Rings_Ocomm__semiring__1])).
1.58/1.79	tff('4', plain,
1.58/1.79	    (power_power(complex, 
1.58/1.79	       fFT_Mirabelle_root(
1.58/1.79	         times_times(nat, number_number_of(nat, bit0(bit1(pls))), m)), 
1.58/1.79	       times_times(nat, i, 
1.58/1.79	         times_times(nat, number_number_of(nat, bit0(bit1(pls))), j)))
1.58/1.79	      != power_power(complex, 
1.58/1.79	           fFT_Mirabelle_root(
1.58/1.79	             times_times(nat, number_number_of(nat, bit0(bit1(pls))), m)), 
1.59/1.79	           times_times(nat, i, 
1.59/1.79	             times_times(nat, number_number_of(nat, bit0(bit1(pls))), j)))
1.59/1.79	     | ~ $true),
1.59/1.79	    inference('demod', [status(thm)], ['2', '3'])).
1.59/1.79	tff('5', plain, $false, inference('simplify', [status(thm)], ['4'])).
1.59/1.79	
1.59/1.79	% SZS output end Refutation
1.59/1.79	EOF
