TSTP Solution File: SYO070^4.002 by cocATP---0.2.0
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%------------------------------------------------------------------------------
% File : cocATP---0.2.0
% Problem : SYO070^4.002 : TPTP v7.5.0. Released v4.0.0.
% Transfm : none
% Format : tptp:raw
% Command : python CASC.py /export/starexec/sandbox2/benchmark/theBenchmark.p
% 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 : 0s
% DateTime : Tue Mar 29 00:50:35 EDT 2022
% Result : Unknown 0.50s 0.70s
% Output : None
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----No solution output by system
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.03/0.11 % Problem : SYO070^4.002 : TPTP v7.5.0. Released v4.0.0.
% 0.03/0.12 % Command : python CASC.py /export/starexec/sandbox2/benchmark/theBenchmark.p
% 0.12/0.32 % Computer : n029.cluster.edu
% 0.12/0.32 % Model : x86_64 x86_64
% 0.12/0.32 % CPUModel : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.12/0.32 % RAMPerCPU : 8042.1875MB
% 0.12/0.32 % OS : Linux 3.10.0-693.el7.x86_64
% 0.12/0.33 % CPULimit : 300
% 0.12/0.33 % DateTime : Fri Mar 11 13:42:45 EST 2022
% 0.12/0.33 % CPUTime :
% 0.12/0.33 ModuleCmd_Load.c(213):ERROR:105: Unable to locate a modulefile for 'python/python27'
% 0.12/0.34 Python 2.7.5
% 0.40/0.61 Using paths ['/home/cristobal/cocATP/CASC/TPTP/', '/export/starexec/sandbox2/benchmark/', '/export/starexec/sandbox2/benchmark/']
% 0.40/0.61 Failed to open /home/cristobal/cocATP/CASC/TPTP/Axioms/LCL010^0.ax, trying next directory
% 0.40/0.61 FOF formula (<kernel.Constant object at 0x19763b0>, <kernel.DependentProduct object at 0x1976cf8>) of role type named irel_type
% 0.40/0.61 Using role type
% 0.40/0.61 Declaring irel:(fofType->(fofType->Prop))
% 0.40/0.61 FOF formula (forall (X:fofType), ((irel X) X)) of role axiom named refl_axiom
% 0.40/0.61 A new axiom: (forall (X:fofType), ((irel X) X))
% 0.40/0.61 FOF formula (forall (X:fofType) (Y:fofType) (Z:fofType), (((and ((irel X) Y)) ((irel Y) Z))->((irel X) Z))) of role axiom named trans_axiom
% 0.40/0.61 A new axiom: (forall (X:fofType) (Y:fofType) (Z:fofType), (((and ((irel X) Y)) ((irel Y) Z))->((irel X) Z)))
% 0.40/0.61 FOF formula (<kernel.Constant object at 0x1976ab8>, <kernel.DependentProduct object at 0x1976ef0>) of role type named mnot_decl_type
% 0.40/0.61 Using role type
% 0.40/0.61 Declaring mnot:((fofType->Prop)->(fofType->Prop))
% 0.40/0.61 FOF formula (((eq ((fofType->Prop)->(fofType->Prop))) mnot) (fun (X:(fofType->Prop)) (U:fofType)=> ((X U)->False))) of role definition named mnot
% 0.40/0.61 A new definition: (((eq ((fofType->Prop)->(fofType->Prop))) mnot) (fun (X:(fofType->Prop)) (U:fofType)=> ((X U)->False)))
% 0.40/0.61 Defined: mnot:=(fun (X:(fofType->Prop)) (U:fofType)=> ((X U)->False))
% 0.40/0.61 FOF formula (<kernel.Constant object at 0x1976cb0>, <kernel.DependentProduct object at 0x1976dd0>) of role type named mor_decl_type
% 0.40/0.61 Using role type
% 0.40/0.61 Declaring mor:((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))
% 0.40/0.61 FOF formula (((eq ((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))) mor) (fun (X:(fofType->Prop)) (Y:(fofType->Prop)) (U:fofType)=> ((or (X U)) (Y U)))) of role definition named mor
% 0.40/0.61 A new definition: (((eq ((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))) mor) (fun (X:(fofType->Prop)) (Y:(fofType->Prop)) (U:fofType)=> ((or (X U)) (Y U))))
% 0.40/0.61 Defined: mor:=(fun (X:(fofType->Prop)) (Y:(fofType->Prop)) (U:fofType)=> ((or (X U)) (Y U)))
% 0.40/0.61 FOF formula (<kernel.Constant object at 0x1976ab8>, <kernel.DependentProduct object at 0x1976e60>) of role type named mand_decl_type
% 0.40/0.61 Using role type
% 0.40/0.61 Declaring mand:((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))
% 0.40/0.61 FOF formula (((eq ((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))) mand) (fun (X:(fofType->Prop)) (Y:(fofType->Prop)) (U:fofType)=> ((and (X U)) (Y U)))) of role definition named mand
% 0.40/0.61 A new definition: (((eq ((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))) mand) (fun (X:(fofType->Prop)) (Y:(fofType->Prop)) (U:fofType)=> ((and (X U)) (Y U))))
% 0.40/0.61 Defined: mand:=(fun (X:(fofType->Prop)) (Y:(fofType->Prop)) (U:fofType)=> ((and (X U)) (Y U)))
% 0.40/0.61 FOF formula (<kernel.Constant object at 0x1976cb0>, <kernel.DependentProduct object at 0x1976368>) of role type named mimplies_decl_type
% 0.40/0.61 Using role type
% 0.40/0.61 Declaring mimplies:((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))
% 0.40/0.61 FOF formula (((eq ((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))) mimplies) (fun (U:(fofType->Prop)) (V:(fofType->Prop))=> ((mor (mnot U)) V))) of role definition named mimplies
% 0.40/0.61 A new definition: (((eq ((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))) mimplies) (fun (U:(fofType->Prop)) (V:(fofType->Prop))=> ((mor (mnot U)) V)))
% 0.40/0.61 Defined: mimplies:=(fun (U:(fofType->Prop)) (V:(fofType->Prop))=> ((mor (mnot U)) V))
% 0.40/0.61 FOF formula (<kernel.Constant object at 0x1976cb0>, <kernel.DependentProduct object at 0x1976908>) of role type named mbox_s4_decl_type
% 0.40/0.61 Using role type
% 0.40/0.61 Declaring mbox_s4:((fofType->Prop)->(fofType->Prop))
% 0.40/0.61 FOF formula (((eq ((fofType->Prop)->(fofType->Prop))) mbox_s4) (fun (P:(fofType->Prop)) (X:fofType)=> (forall (Y:fofType), (((irel X) Y)->(P Y))))) of role definition named mbox_s4
% 0.40/0.61 A new definition: (((eq ((fofType->Prop)->(fofType->Prop))) mbox_s4) (fun (P:(fofType->Prop)) (X:fofType)=> (forall (Y:fofType), (((irel X) Y)->(P Y)))))
% 0.40/0.61 Defined: mbox_s4:=(fun (P:(fofType->Prop)) (X:fofType)=> (forall (Y:fofType), (((irel X) Y)->(P Y))))
% 0.40/0.61 FOF formula (<kernel.Constant object at 0x19767a0>, <kernel.DependentProduct object at 0x1976d40>) of role type named iatom_type
% 0.40/0.61 Using role type
% 0.40/0.61 Declaring iatom:((fofType->Prop)->(fofType->Prop))
% 0.40/0.62 FOF formula (((eq ((fofType->Prop)->(fofType->Prop))) iatom) (fun (P:(fofType->Prop))=> P)) of role definition named iatom
% 0.40/0.62 A new definition: (((eq ((fofType->Prop)->(fofType->Prop))) iatom) (fun (P:(fofType->Prop))=> P))
% 0.40/0.62 Defined: iatom:=(fun (P:(fofType->Prop))=> P)
% 0.40/0.62 FOF formula (<kernel.Constant object at 0x1976ab8>, <kernel.DependentProduct object at 0x1971e60>) of role type named inot_type
% 0.40/0.62 Using role type
% 0.40/0.62 Declaring inot:((fofType->Prop)->(fofType->Prop))
% 0.40/0.62 FOF formula (((eq ((fofType->Prop)->(fofType->Prop))) inot) (fun (P:(fofType->Prop))=> (mnot (mbox_s4 P)))) of role definition named inot
% 0.40/0.62 A new definition: (((eq ((fofType->Prop)->(fofType->Prop))) inot) (fun (P:(fofType->Prop))=> (mnot (mbox_s4 P))))
% 0.40/0.62 Defined: inot:=(fun (P:(fofType->Prop))=> (mnot (mbox_s4 P)))
% 0.40/0.62 FOF formula (<kernel.Constant object at 0x19765a8>, <kernel.DependentProduct object at 0x19711b8>) of role type named itrue_type
% 0.40/0.62 Using role type
% 0.40/0.62 Declaring itrue:(fofType->Prop)
% 0.40/0.62 FOF formula (((eq (fofType->Prop)) itrue) (fun (W:fofType)=> True)) of role definition named itrue
% 0.40/0.62 A new definition: (((eq (fofType->Prop)) itrue) (fun (W:fofType)=> True))
% 0.40/0.62 Defined: itrue:=(fun (W:fofType)=> True)
% 0.40/0.62 FOF formula (<kernel.Constant object at 0x1976ab8>, <kernel.DependentProduct object at 0x197ab90>) of role type named ifalse_type
% 0.40/0.62 Using role type
% 0.40/0.62 Declaring ifalse:(fofType->Prop)
% 0.40/0.62 FOF formula (((eq (fofType->Prop)) ifalse) (inot itrue)) of role definition named ifalse
% 0.40/0.62 A new definition: (((eq (fofType->Prop)) ifalse) (inot itrue))
% 0.40/0.62 Defined: ifalse:=(inot itrue)
% 0.40/0.62 FOF formula (<kernel.Constant object at 0x1971f38>, <kernel.DependentProduct object at 0x197a710>) of role type named iand_type
% 0.40/0.62 Using role type
% 0.40/0.62 Declaring iand:((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))
% 0.40/0.62 FOF formula (((eq ((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))) iand) (fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> ((mand P) Q))) of role definition named iand
% 0.40/0.62 A new definition: (((eq ((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))) iand) (fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> ((mand P) Q)))
% 0.40/0.62 Defined: iand:=(fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> ((mand P) Q))
% 0.40/0.62 FOF formula (<kernel.Constant object at 0x1971e18>, <kernel.DependentProduct object at 0x197a7a0>) of role type named ior_type
% 0.40/0.62 Using role type
% 0.40/0.62 Declaring ior:((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))
% 0.40/0.62 FOF formula (((eq ((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))) ior) (fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> ((mor (mbox_s4 P)) (mbox_s4 Q)))) of role definition named ior
% 0.40/0.62 A new definition: (((eq ((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))) ior) (fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> ((mor (mbox_s4 P)) (mbox_s4 Q))))
% 0.40/0.62 Defined: ior:=(fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> ((mor (mbox_s4 P)) (mbox_s4 Q)))
% 0.40/0.62 FOF formula (<kernel.Constant object at 0x197a710>, <kernel.DependentProduct object at 0x197ae18>) of role type named iimplies_type
% 0.40/0.62 Using role type
% 0.40/0.62 Declaring iimplies:((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))
% 0.40/0.62 FOF formula (((eq ((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))) iimplies) (fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> ((mimplies (mbox_s4 P)) (mbox_s4 Q)))) of role definition named iimplies
% 0.40/0.62 A new definition: (((eq ((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))) iimplies) (fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> ((mimplies (mbox_s4 P)) (mbox_s4 Q))))
% 0.40/0.62 Defined: iimplies:=(fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> ((mimplies (mbox_s4 P)) (mbox_s4 Q)))
% 0.40/0.62 FOF formula (<kernel.Constant object at 0x197a170>, <kernel.DependentProduct object at 0x197a290>) of role type named iimplied_type
% 0.40/0.62 Using role type
% 0.40/0.62 Declaring iimplied:((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))
% 0.40/0.62 FOF formula (((eq ((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))) iimplied) (fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> ((iimplies Q) P))) of role definition named iimplied
% 0.40/0.62 A new definition: (((eq ((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))) iimplied) (fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> ((iimplies Q) P)))
% 0.46/0.63 Defined: iimplied:=(fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> ((iimplies Q) P))
% 0.46/0.63 FOF formula (<kernel.Constant object at 0x197a170>, <kernel.DependentProduct object at 0x197a0e0>) of role type named iequiv_type
% 0.46/0.63 Using role type
% 0.46/0.63 Declaring iequiv:((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))
% 0.46/0.63 FOF formula (((eq ((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))) iequiv) (fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> ((iand ((iimplies P) Q)) ((iimplies Q) P)))) of role definition named iequiv
% 0.46/0.63 A new definition: (((eq ((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))) iequiv) (fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> ((iand ((iimplies P) Q)) ((iimplies Q) P))))
% 0.46/0.63 Defined: iequiv:=(fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> ((iand ((iimplies P) Q)) ((iimplies Q) P)))
% 0.46/0.63 FOF formula (<kernel.Constant object at 0x197aa70>, <kernel.DependentProduct object at 0x197a5f0>) of role type named ixor_type
% 0.46/0.63 Using role type
% 0.46/0.63 Declaring ixor:((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))
% 0.46/0.63 FOF formula (((eq ((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))) ixor) (fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> (inot ((iequiv P) Q)))) of role definition named ixor
% 0.46/0.63 A new definition: (((eq ((fofType->Prop)->((fofType->Prop)->(fofType->Prop)))) ixor) (fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> (inot ((iequiv P) Q))))
% 0.46/0.63 Defined: ixor:=(fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> (inot ((iequiv P) Q)))
% 0.46/0.63 FOF formula (<kernel.Constant object at 0x197a170>, <kernel.DependentProduct object at 0x197add0>) of role type named ivalid_type
% 0.46/0.63 Using role type
% 0.46/0.63 Declaring ivalid:((fofType->Prop)->Prop)
% 0.46/0.63 FOF formula (((eq ((fofType->Prop)->Prop)) ivalid) (fun (Phi:(fofType->Prop))=> (forall (W:fofType), (Phi W)))) of role definition named ivalid
% 0.46/0.63 A new definition: (((eq ((fofType->Prop)->Prop)) ivalid) (fun (Phi:(fofType->Prop))=> (forall (W:fofType), (Phi W))))
% 0.46/0.63 Defined: ivalid:=(fun (Phi:(fofType->Prop))=> (forall (W:fofType), (Phi W)))
% 0.46/0.63 FOF formula (<kernel.Constant object at 0x197aa70>, <kernel.DependentProduct object at 0x2b3c80c311b8>) of role type named isatisfiable_type
% 0.46/0.63 Using role type
% 0.46/0.63 Declaring isatisfiable:((fofType->Prop)->Prop)
% 0.46/0.63 FOF formula (((eq ((fofType->Prop)->Prop)) isatisfiable) (fun (Phi:(fofType->Prop))=> ((ex fofType) (fun (W:fofType)=> (Phi W))))) of role definition named isatisfiable
% 0.46/0.63 A new definition: (((eq ((fofType->Prop)->Prop)) isatisfiable) (fun (Phi:(fofType->Prop))=> ((ex fofType) (fun (W:fofType)=> (Phi W)))))
% 0.46/0.63 Defined: isatisfiable:=(fun (Phi:(fofType->Prop))=> ((ex fofType) (fun (W:fofType)=> (Phi W))))
% 0.46/0.63 FOF formula (<kernel.Constant object at 0x197a908>, <kernel.DependentProduct object at 0x2b3c80c311b8>) of role type named icountersatisfiable_type
% 0.46/0.63 Using role type
% 0.46/0.63 Declaring icountersatisfiable:((fofType->Prop)->Prop)
% 0.46/0.63 FOF formula (((eq ((fofType->Prop)->Prop)) icountersatisfiable) (fun (Phi:(fofType->Prop))=> ((ex fofType) (fun (W:fofType)=> ((Phi W)->False))))) of role definition named icountersatisfiable
% 0.46/0.63 A new definition: (((eq ((fofType->Prop)->Prop)) icountersatisfiable) (fun (Phi:(fofType->Prop))=> ((ex fofType) (fun (W:fofType)=> ((Phi W)->False)))))
% 0.46/0.63 Defined: icountersatisfiable:=(fun (Phi:(fofType->Prop))=> ((ex fofType) (fun (W:fofType)=> ((Phi W)->False))))
% 0.46/0.63 FOF formula (<kernel.Constant object at 0x2b3c80c31200>, <kernel.DependentProduct object at 0x2b3c80c31440>) of role type named iinvalid_type
% 0.46/0.63 Using role type
% 0.46/0.63 Declaring iinvalid:((fofType->Prop)->Prop)
% 0.46/0.63 FOF formula (((eq ((fofType->Prop)->Prop)) iinvalid) (fun (Phi:(fofType->Prop))=> (forall (W:fofType), ((Phi W)->False)))) of role definition named iinvalid
% 0.46/0.63 A new definition: (((eq ((fofType->Prop)->Prop)) iinvalid) (fun (Phi:(fofType->Prop))=> (forall (W:fofType), ((Phi W)->False))))
% 0.46/0.63 Defined: iinvalid:=(fun (Phi:(fofType->Prop))=> (forall (W:fofType), ((Phi W)->False)))
% 0.46/0.63 FOF formula (<kernel.Constant object at 0x2b3c88704098>, <kernel.DependentProduct object at 0x1c13cb0>) of role type named a0_type
% 0.46/0.63 Using role type
% 0.46/0.63 Declaring a0:(fofType->Prop)
% 0.46/0.63 FOF formula (<kernel.Constant object at 0x2b3c88704758>, <kernel.DependentProduct object at 0x1c13950>) of role type named a1_type
% 0.46/0.63 Using role type
% 0.46/0.63 Declaring a1:(fofType->Prop)
% 0.46/0.63 FOF formula (<kernel.Constant object at 0x2b3c887040e0>, <kernel.DependentProduct object at 0x1c13cf8>) of role type named a2_type
% 0.46/0.63 Using role type
% 0.46/0.63 Declaring a2:(fofType->Prop)
% 0.46/0.63 FOF formula (<kernel.Constant object at 0x2b3c887047e8>, <kernel.DependentProduct object at 0x1c13f38>) of role type named b0_type
% 0.46/0.63 Using role type
% 0.46/0.63 Declaring b0:(fofType->Prop)
% 0.46/0.63 FOF formula (<kernel.Constant object at 0x2b3c88704098>, <kernel.DependentProduct object at 0x1c13e18>) of role type named b1_type
% 0.46/0.63 Using role type
% 0.46/0.63 Declaring b1:(fofType->Prop)
% 0.46/0.63 FOF formula (<kernel.Constant object at 0x2b3c887040e0>, <kernel.DependentProduct object at 0x1c13e60>) of role type named b2_type
% 0.46/0.63 Using role type
% 0.46/0.63 Declaring b2:(fofType->Prop)
% 0.46/0.63 FOF formula (<kernel.Constant object at 0x2b3c88704098>, <kernel.DependentProduct object at 0x1c13dd0>) of role type named f_type
% 0.46/0.63 Using role type
% 0.46/0.63 Declaring f:(fofType->Prop)
% 0.46/0.63 FOF formula (ivalid ((iimplies (iatom a0)) (iatom f))) of role axiom named axiom1
% 0.46/0.63 A new axiom: (ivalid ((iimplies (iatom a0)) (iatom f)))
% 0.46/0.63 FOF formula (ivalid ((iimplies ((iimplies (inot (inot (iatom b2)))) (iatom b0))) (iatom a2))) of role axiom named axiom2
% 0.46/0.63 A new axiom: (ivalid ((iimplies ((iimplies (inot (inot (iatom b2)))) (iatom b0))) (iatom a2)))
% 0.46/0.63 FOF formula (ivalid ((iimplies ((iimplies (inot (inot (iatom b0)))) (iatom a1))) (iatom a0))) of role axiom named axiom3
% 0.46/0.63 A new axiom: (ivalid ((iimplies ((iimplies (inot (inot (iatom b0)))) (iatom a1))) (iatom a0)))
% 0.46/0.63 FOF formula (ivalid ((iimplies ((iimplies (inot (inot (iatom b1)))) (iatom a2))) (iatom a1))) of role axiom named axiom4
% 0.46/0.63 A new axiom: (ivalid ((iimplies ((iimplies (inot (inot (iatom b1)))) (iatom a2))) (iatom a1)))
% 0.46/0.63 FOF formula (ivalid (iatom f)) of role conjecture named con
% 0.46/0.63 Conjecture to prove = (ivalid (iatom f)):Prop
% 0.46/0.63 Parameter fofType_DUMMY:fofType.
% 0.46/0.63 We need to prove ['(ivalid (iatom f))']
% 0.46/0.63 Parameter fofType:Type.
% 0.46/0.63 Parameter irel:(fofType->(fofType->Prop)).
% 0.46/0.63 Axiom refl_axiom:(forall (X:fofType), ((irel X) X)).
% 0.46/0.63 Axiom trans_axiom:(forall (X:fofType) (Y:fofType) (Z:fofType), (((and ((irel X) Y)) ((irel Y) Z))->((irel X) Z))).
% 0.46/0.63 Definition mnot:=(fun (X:(fofType->Prop)) (U:fofType)=> ((X U)->False)):((fofType->Prop)->(fofType->Prop)).
% 0.46/0.63 Definition mor:=(fun (X:(fofType->Prop)) (Y:(fofType->Prop)) (U:fofType)=> ((or (X U)) (Y U))):((fofType->Prop)->((fofType->Prop)->(fofType->Prop))).
% 0.46/0.63 Definition mand:=(fun (X:(fofType->Prop)) (Y:(fofType->Prop)) (U:fofType)=> ((and (X U)) (Y U))):((fofType->Prop)->((fofType->Prop)->(fofType->Prop))).
% 0.46/0.63 Definition mimplies:=(fun (U:(fofType->Prop)) (V:(fofType->Prop))=> ((mor (mnot U)) V)):((fofType->Prop)->((fofType->Prop)->(fofType->Prop))).
% 0.46/0.63 Definition mbox_s4:=(fun (P:(fofType->Prop)) (X:fofType)=> (forall (Y:fofType), (((irel X) Y)->(P Y)))):((fofType->Prop)->(fofType->Prop)).
% 0.46/0.63 Definition iatom:=(fun (P:(fofType->Prop))=> P):((fofType->Prop)->(fofType->Prop)).
% 0.46/0.63 Definition inot:=(fun (P:(fofType->Prop))=> (mnot (mbox_s4 P))):((fofType->Prop)->(fofType->Prop)).
% 0.46/0.63 Definition itrue:=(fun (W:fofType)=> True):(fofType->Prop).
% 0.46/0.63 Definition ifalse:=(inot itrue):(fofType->Prop).
% 0.46/0.63 Definition iand:=(fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> ((mand P) Q)):((fofType->Prop)->((fofType->Prop)->(fofType->Prop))).
% 0.46/0.63 Definition ior:=(fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> ((mor (mbox_s4 P)) (mbox_s4 Q))):((fofType->Prop)->((fofType->Prop)->(fofType->Prop))).
% 0.46/0.63 Definition iimplies:=(fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> ((mimplies (mbox_s4 P)) (mbox_s4 Q))):((fofType->Prop)->((fofType->Prop)->(fofType->Prop))).
% 0.46/0.63 Definition iimplied:=(fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> ((iimplies Q) P)):((fofType->Prop)->((fofType->Prop)->(fofType->Prop))).
% 0.46/0.63 Definition iequiv:=(fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> ((iand ((iimplies P) Q)) ((iimplies Q) P))):((fofType->Prop)->((fofType->Prop)->(fofType->Prop))).
% 0.46/0.63 Definition ixor:=(fun (P:(fofType->Prop)) (Q:(fofType->Prop))=> (inot ((iequiv P) Q))):((fofType->Prop)->((fofType->Prop)->(fofType->Prop))).
% 0.46/0.63 Definition ivalid:=(fun (Phi:(fofType->Prop))=> (forall (W:fofType), (Phi W))):((fofType->Prop)->Prop).
% 0.50/0.69 Definition isatisfiable:=(fun (Phi:(fofType->Prop))=> ((ex fofType) (fun (W:fofType)=> (Phi W)))):((fofType->Prop)->Prop).
% 0.50/0.69 Definition icountersatisfiable:=(fun (Phi:(fofType->Prop))=> ((ex fofType) (fun (W:fofType)=> ((Phi W)->False)))):((fofType->Prop)->Prop).
% 0.50/0.69 Definition iinvalid:=(fun (Phi:(fofType->Prop))=> (forall (W:fofType), ((Phi W)->False))):((fofType->Prop)->Prop).
% 0.50/0.69 Parameter a0:(fofType->Prop).
% 0.50/0.69 Parameter a1:(fofType->Prop).
% 0.50/0.69 Parameter a2:(fofType->Prop).
% 0.50/0.69 Parameter b0:(fofType->Prop).
% 0.50/0.69 Parameter b1:(fofType->Prop).
% 0.50/0.69 Parameter b2:(fofType->Prop).
% 0.50/0.69 Parameter f:(fofType->Prop).
% 0.50/0.69 Axiom axiom1:(ivalid ((iimplies (iatom a0)) (iatom f))).
% 0.50/0.69 Axiom axiom2:(ivalid ((iimplies ((iimplies (inot (inot (iatom b2)))) (iatom b0))) (iatom a2))).
% 0.50/0.69 Axiom axiom3:(ivalid ((iimplies ((iimplies (inot (inot (iatom b0)))) (iatom a1))) (iatom a0))).
% 0.50/0.69 Axiom axiom4:(ivalid ((iimplies ((iimplies (inot (inot (iatom b1)))) (iatom a2))) (iatom a1))).
% 0.50/0.69 Trying to prove (ivalid (iatom f))
% 0.50/0.69 % SZS status GaveUp for /export/starexec/sandbox2/benchmark/theBenchmark.p
%------------------------------------------------------------------------------