0.00/0.09	% Problem    : theBenchmark.p : TPTP v0.0.0. Released v0.0.0.
0.00/0.09	% Command    : twee %s --tstp --casc --quiet --explain-encoding --conditional-encoding if --smaller --drop-non-horn
0.09/0.29	% Computer   : n010.cluster.edu
0.09/0.29	% Model      : x86_64 x86_64
0.09/0.29	% CPU        : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
0.09/0.29	% Memory     : 8042.1875MB
0.09/0.29	% OS         : Linux 3.10.0-693.el7.x86_64
0.09/0.29	% CPULimit   : 960
0.09/0.29	% WCLimit    : 120
0.09/0.29	% DateTime   : Thu Jul  2 06:35:27 EDT 2020
0.09/0.29	% CPUTime    : 
217.14/28.06	% SZS status Theorem
217.14/28.06	
217.14/28.06	% SZS output start Proof
217.14/28.06	Take the following subset of the input axioms:
217.93/28.09	  fof(ax1_1085, axiom, ![ARG1]: computerdataartifact(f_urlreferentfn(ARG1))).
217.93/28.09	  fof(ax1_112, axiom, ![OBJ]: (setorcollection(OBJ) => mathematicalthing(OBJ))).
217.93/28.09	  fof(ax1_132, axiom, ![OBJ]: (intangible(OBJ) <= mathematicalorcomputationalthing(OBJ))).
217.93/28.09	  fof(ax1_153, axiom, ![OBJ]: ~(tptpcol_1_1(OBJ) & tptpcol_1_65536(OBJ))).
217.93/28.09	  fof(ax1_167, axiom, ![OBJ]: ~(individual(OBJ) & setorcollection(OBJ))).
217.93/28.09	  fof(ax1_180, axiom, ![OBJ]: (mathematicalorcomputationalthing(OBJ) <= mathematicalthing(OBJ))).
217.93/28.09	  fof(ax1_196, axiom, ![OBJ]: (inanimateobject(OBJ) <= inanimateobject_nonnatural(OBJ))).
217.93/28.09	  fof(ax1_211, axiom, ![OBJ]: (artifact(OBJ) => inanimateobject_nonnatural(OBJ))).
217.93/28.10	  fof(ax1_221, axiom, ![ARG1, ARG2]: (no(ARG1, ARG2) <= disjointwith(ARG1, ARG2))).
217.93/28.10	  fof(ax1_289, axiom, ![OBJ]: ~(individual(OBJ) & collection(OBJ))).
217.93/28.10	  fof(ax1_3, axiom, ![OBJ]: ~(intangible(OBJ) & partiallytangible(OBJ))).
217.93/28.10	  fof(ax1_363, axiom, ![OBJ, COL1, COL2]: ~(isa(OBJ, COL2) & (isa(OBJ, COL1) & disjointwith(COL1, COL2)))).
217.93/28.10	  fof(ax1_488, axiom, ![OBJ]: ~(tptpcol_3_114688(OBJ) & tptpcol_3_98305(OBJ))).
218.04/28.10	  fof(ax1_494, axiom, ![OBJ]: (computerdataartifact(OBJ) => artifact(OBJ))).
218.04/28.10	  fof(ax1_521, axiom, ![X]: ~affiliatedwith(X, X)).
218.04/28.10	  fof(ax1_698, axiom, ![X]: ~objectfoundinlocation(X, X)).
218.04/28.10	  fof(ax1_718, axiom, ![ARG2, INS]: (setorcollection(INS) <= no(INS, ARG2))).
218.04/28.10	  fof(ax1_9, axiom, ![OBJ]: (partiallytangible(OBJ) <= inanimateobject(OBJ))).
218.04/28.10	  fof(ax1_901, axiom, ![X]: ~borderson(X, X)).
218.04/28.10	  fof(query113, conjecture, ~disjointwith(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf)), c_tptpcol_16_118949)).
218.04/28.10	
218.04/28.10	Now clausify the problem and encode Horn clauses using encoding 3 of
218.04/28.10	http://www.cse.chalmers.se/~nicsma/papers/horn.pdf.
218.04/28.10	We repeatedly replace C & s=t => u=v by the two clauses:
218.04/28.10	  fresh(y, y, x1...xn) = u
218.04/28.10	  C => fresh(s, t, x1...xn) = v
218.04/28.10	where fresh is a fresh function symbol and x1..xn are the free
218.04/28.10	variables of u and v.
218.04/28.10	A predicate p(X) is encoded as p(X)=true (this is sound, because the
218.04/28.10	input problem has no model of domain size 1).
218.04/28.10	
218.04/28.10	The encoding turns the above axioms into the following unit equations and goals:
218.04/28.10	
218.04/28.10	Axiom 1 (ax1_112): fresh687(X, X, Y) = true2.
218.04/28.10	Axiom 2 (ax1_132): fresh661(X, X, Y) = true2.
218.04/28.10	Axiom 3 (ax1_180): fresh640(X, X, Y) = true2.
218.04/28.10	Axiom 4 (ax1_196): fresh632(X, X, Y) = true2.
218.04/28.10	Axiom 5 (ax1_211): fresh624(X, X, Y) = true2.
218.04/28.10	Axiom 6 (ax1_221): fresh619(X, X, Y, Z) = true2.
218.04/28.10	Axiom 7 (ax1_494): fresh485(X, X, Y) = true2.
218.04/28.10	Axiom 8 (ax1_718): fresh269(X, X, Y) = true2.
218.04/28.10	Axiom 9 (ax1_9): fresh95(X, X, Y) = true2.
218.04/28.10	Axiom 10 (ax1_196): fresh632(inanimateobject_nonnatural(X), true2, X) = inanimateobject(X).
218.04/28.10	Axiom 11 (ax1_132): fresh661(mathematicalorcomputationalthing(X), true2, X) = intangible(X).
218.04/28.10	Axiom 12 (ax1_112): fresh687(setorcollection(X), true2, X) = mathematicalthing(X).
218.04/28.10	Axiom 13 (ax1_494): fresh485(computerdataartifact(X), true2, X) = artifact(X).
218.04/28.10	Axiom 14 (ax1_9): fresh95(inanimateobject(X), true2, X) = partiallytangible(X).
218.04/28.10	Axiom 15 (ax1_180): fresh640(mathematicalthing(X), true2, X) = mathematicalorcomputationalthing(X).
218.04/28.10	Axiom 16 (ax1_1085): computerdataartifact(f_urlreferentfn(X)) = true2.
218.04/28.10	Axiom 17 (ax1_211): fresh624(artifact(X), true2, X) = inanimateobject_nonnatural(X).
218.04/28.10	Axiom 18 (ax1_221): fresh619(disjointwith(X, Y), true2, X, Y) = no(X, Y).
218.04/28.10	Axiom 19 (ax1_718): fresh269(no(X, Y), true2, X) = setorcollection(X).
218.04/28.11	Axiom 20 (query113): disjointwith(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf)), c_tptpcol_16_118949) = true2.
218.04/28.11	
218.04/28.11	Goal 1 (ax1_3): tuple2(partiallytangible(X), intangible(X)) = tuple2(true2, true2).
218.04/28.11	The goal is true when:
218.04/28.11	  X = f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))
218.04/28.11	
218.04/28.11	Proof:
218.04/28.11	  tuple2(partiallytangible(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), intangible(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))))
218.04/28.11	= { by axiom 14 (ax1_9) }
218.04/28.11	  tuple2(fresh95(inanimateobject(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), intangible(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))))
218.04/28.11	= { by axiom 10 (ax1_196) }
218.04/28.11	  tuple2(fresh95(fresh632(inanimateobject_nonnatural(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), intangible(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))))
218.04/28.11	= { by axiom 17 (ax1_211) }
218.04/28.11	  tuple2(fresh95(fresh632(fresh624(artifact(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), intangible(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))))
218.04/28.11	= { by axiom 13 (ax1_494) }
218.04/28.11	  tuple2(fresh95(fresh632(fresh624(fresh485(computerdataartifact(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), intangible(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))))
218.04/28.11	= { by axiom 16 (ax1_1085) }
218.04/28.11	  tuple2(fresh95(fresh632(fresh624(fresh485(true2, true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), intangible(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))))
218.04/28.11	= { by axiom 7 (ax1_494) }
218.04/28.11	  tuple2(fresh95(fresh632(fresh624(true2, true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), intangible(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))))
218.04/28.11	= { by axiom 5 (ax1_211) }
218.04/28.11	  tuple2(fresh95(fresh632(true2, true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), intangible(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))))
218.04/28.11	= { by axiom 4 (ax1_196) }
218.04/28.11	  tuple2(fresh95(true2, true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), intangible(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))))
218.04/28.11	= { by axiom 9 (ax1_9) }
218.04/28.11	  tuple2(true2, intangible(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))))
218.04/28.11	= { by axiom 11 (ax1_132) }
218.04/28.11	  tuple2(true2, fresh661(mathematicalorcomputationalthing(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))))
218.04/28.11	= { by axiom 15 (ax1_180) }
218.04/28.11	  tuple2(true2, fresh661(fresh640(mathematicalthing(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))))
218.04/28.11	= { by axiom 12 (ax1_112) }
218.04/28.11	  tuple2(true2, fresh661(fresh640(fresh687(setorcollection(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))))
218.04/28.11	= { by axiom 19 (ax1_718) }
218.04/28.11	  tuple2(true2, fresh661(fresh640(fresh687(fresh269(no(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf)), c_tptpcol_16_118949), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))))
218.04/28.11	= { by axiom 18 (ax1_221) }
218.17/28.11	  tuple2(true2, fresh661(fresh640(fresh687(fresh269(fresh619(disjointwith(f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf)), c_tptpcol_16_118949), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf)), c_tptpcol_16_118949), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))))
218.17/28.11	= { by axiom 20 (query113) }
218.17/28.11	  tuple2(true2, fresh661(fresh640(fresh687(fresh269(fresh619(true2, true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf)), c_tptpcol_16_118949), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))))
218.17/28.11	= { by axiom 6 (ax1_221) }
218.17/28.11	  tuple2(true2, fresh661(fresh640(fresh687(fresh269(true2, true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))))
218.17/28.11	= { by axiom 8 (ax1_718) }
218.17/28.11	  tuple2(true2, fresh661(fresh640(fresh687(true2, true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))))
218.17/28.11	= { by axiom 1 (ax1_112) }
218.17/28.11	  tuple2(true2, fresh661(fresh640(true2, true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))), true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))))
218.17/28.11	= { by axiom 3 (ax1_180) }
218.17/28.11	  tuple2(true2, fresh661(true2, true2, f_urlreferentfn(f_urlfn(s_http_fwsistercitiesorgpdfsmbabanembabane20activity20pages2pdf))))
218.17/28.11	= { by axiom 2 (ax1_132) }
218.17/28.11	  tuple2(true2, true2)
218.17/28.11	% SZS output end Proof
218.17/28.11	
218.17/28.11	RESULT: Theorem (the conjecture is true).
218.18/28.17	EOF