0.00/0.00	% File    : /export/starexec/sandbox2/benchmark/theBenchmark.p
0.00/0.00	% app-encoded or not : original
0.00/0.00	% Variant    : supatvars_ext
0.00/0.00	% Ordering    : rpo6
0.00/0.00	% 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-avatar \
0.00/0.01	  --ho \
0.00/0.01	  --force-ho \
0.00/0.01	  --no-ho-elim-pred-var \
0.00/0.01	  --ho-general-ext-pos \
0.00/0.01	  --no-ho-unif \
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	  --sup-at-vars \
0.00/0.01	  --restrict-hidden-sup-at-vars \
0.00/0.01	  --ho-ext-axiom \
0.00/0.01	  --ho-prim-enum none \
0.00/0.01	  --no-max-vars \
0.00/0.01	  --dont-select-ho-var-lits \
0.00/0.01	  --no-fool
0.00/0.20	% Computer   : n087.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 09:53:08 CST 2018
0.00/0.23	% done 107 iterations in 0.033s
0.00/0.23	% SZS status Theorem for '/export/starexec/sandbox2/benchmark/theBenchmark.p'
0.00/0.23	% SZS output start Refutation
0.00/0.24	tff(conj_0, conjecture,
0.00/0.24	  (power_power(complex,
0.00/0.24	               inverse_divide(complex,v,
0.00/0.24	                              of_real(complex,root(na,norm_norm(complex,b)))),
0.00/0.24	               na) =
0.00/0.24	   inverse_divide(complex,power_power(complex,v,na),
0.00/0.24	                  of_real(complex,norm_norm(complex,b))))).
0.00/0.24	tff(zf_stmt_0, negated_conjecture,
0.00/0.24	  (power_power(complex,
0.00/0.24	               inverse_divide(complex,v,
0.00/0.24	                              of_real(complex,root(na,norm_norm(complex,b)))),
0.00/0.24	               na) !=
0.00/0.24	   inverse_divide(complex,power_power(complex,v,na),
0.00/0.24	                  of_real(complex,norm_norm(complex,b))))).
0.00/0.24	tff('0', plain,
0.00/0.24	    power_power(complex, 
0.00/0.24	      inverse_divide(complex, v, 
0.00/0.24	        of_real(complex, root(na, norm_norm(complex, b)))), na)
0.00/0.24	     != inverse_divide(complex, power_power(complex, v, na), 
0.00/0.24	          of_real(complex, norm_norm(complex, b))),
0.00/0.24	    inference('cnf', [status(esa)], [zf_stmt_0])).
0.00/0.24	tff(arity_Complex_Ocomplex___Fields_Ofield__inverse__zero, axiom,
0.00/0.24	  (field_inverse_zero(complex))).
0.00/0.24	tff('1', plain, field_inverse_zero(complex),
0.00/0.24	    inference('cnf', [status(esa)],
0.00/0.24	              [arity_Complex_Ocomplex___Fields_Ofield__inverse__zero])).
0.00/0.24	tff(fact_13_power__divide, axiom,
0.00/0.24	  (![A:$tType]:
0.00/0.24	     (field_inverse_zero(A) =>
0.00/0.24	      (![N:nat,B:A,A1:A]:
0.00/0.24	         (power_power(A,inverse_divide(A,A1,B),N) =
0.00/0.24	          inverse_divide(A,power_power(A,A1,N),power_power(A,B,N))))))).
0.00/0.24	tff('2', plain,
0.00/0.24	    ![X18 : $tType, X19 : X18, X20 : nat, X21 : X18]:
0.00/0.24	      (power_power(X18, inverse_divide(X18, X19, X21), X20)
0.00/0.24	        = inverse_divide(X18, power_power(X18, X19, X20), 
0.00/0.24	            power_power(X18, X21, X20))
0.00/0.24	       | ~ field_inverse_zero(X18)),
0.00/0.24	    inference('cnf', [status(esa)], [fact_13_power__divide])).
0.00/0.24	tff('3', plain,
0.00/0.24	    ![X0 : nat, X1 : complex, X2 : complex]:
0.00/0.24	      (~ $true
0.00/0.24	       | power_power(complex, inverse_divide(complex, X2, X1), X0)
0.00/0.24	          = inverse_divide(complex, power_power(complex, X2, X0), 
0.00/0.24	              power_power(complex, X1, X0))),
0.00/0.24	    inference('sup-', [status(thm)], ['1', '2'])).
0.00/0.24	tff('4', plain,
0.00/0.24	    ![X0 : nat, X1 : complex, X2 : complex]:
0.00/0.24	      power_power(complex, inverse_divide(complex, X2, X1), X0)
0.00/0.24	       = inverse_divide(complex, power_power(complex, X2, X0), 
0.00/0.24	           power_power(complex, X1, X0)),
0.00/0.24	    inference('simplify', [status(thm)], ['3'])).
0.00/0.24	tff(fact_0__096root_An_A_Icmod_Ab_J_A_094_An_A_061_Acmod_Ab_096, axiom,
0.00/0.24	  (power_power(real,root(na,norm_norm(complex,b)),na) = norm_norm(complex,b))).
0.00/0.24	tff('5', plain,
0.00/0.24	    power_power(real, root(na, norm_norm(complex, b)), na)
0.00/0.24	     = norm_norm(complex, b),
0.00/0.24	    inference('cnf', [status(esa)],
0.00/0.24	              [fact_0__096root_An_A_Icmod_Ab_J_A_094_An_A_061_Acmod_Ab_096])).
0.00/0.24	tff(fact_8_complex__of__real__power, axiom,
0.00/0.24	  (![N:nat,X1:real]:
0.00/0.24	     (power_power(complex,of_real(complex,X1),N) =
0.00/0.24	      of_real(complex,power_power(real,X1,N))))).
0.00/0.24	tff('6', plain,
0.00/0.24	    ![X6 : real, X7 : nat]:
0.00/0.24	      power_power(complex, of_real(complex, X6), X7)
0.00/0.24	       = of_real(complex, power_power(real, X6, X7)),
0.00/0.24	    inference('cnf', [status(esa)], [fact_8_complex__of__real__power])).
0.00/0.24	tff('7', plain,
0.00/0.24	    power_power(complex, of_real(complex, root(na, norm_norm(complex, b))), 
0.00/0.24	      na)
0.00/0.24	     = of_real(complex, norm_norm(complex, b)),
0.00/0.24	    inference('sup+', [status(thm)], ['5', '6'])).
0.00/0.24	tff('8', plain,
0.00/0.24	    inverse_divide(complex, power_power(complex, v, na), 
0.00/0.24	      of_real(complex, norm_norm(complex, b)))
0.00/0.24	     != inverse_divide(complex, power_power(complex, v, na), 
0.00/0.24	          of_real(complex, norm_norm(complex, b))),
0.00/0.24	    inference('demod', [status(thm)], ['0', '4', '7'])).
0.00/0.24	tff('9', plain, $false, inference('simplify', [status(thm)], ['8'])).
0.00/0.24	
0.00/0.24	% SZS output end Refutation
0.00/0.24	EOF
